KPL/FK FILE: ndosl_190716_v02.tf This file was created by PINPOINT. PINPOINT Version 3.2.0 --- September 6, 2016 PINPOINT RUN DATE/TIME: 2019-11-27T08:42:05 PINPOINT DEFINITIONS FILE: ndosl_190716_v02.input PINPOINT PCK FILE: earth_wgs84.tpc PINPOINT SPK FILE: ndosl_190716_v02.bsp The input definitions file is appended to this file as a comment block. Body-name mapping follows: \begindata NAIF_BODY_NAME += 'NDOSL_AC2J' NAIF_BODY_CODE += 399100208 NAIF_BODY_NAME += 'NDOSL_ACN3' NAIF_BODY_CODE += 399101306 NAIF_BODY_NAME += 'NDOSL_ACNJ' NAIF_BODY_CODE += 399100207 NAIF_BODY_NAME += 'NDOSL_ADRQ' NAIF_BODY_CODE += 399104284 NAIF_BODY_NAME += 'NDOSL_AG1S' NAIF_BODY_CODE += 399101701 NAIF_BODY_NAME += 'NDOSL_AG23' NAIF_BODY_CODE += 399101377 NAIF_BODY_NAME += 'NDOSL_AG33' NAIF_BODY_CODE += 399101404 NAIF_BODY_NAME += 'NDOSL_AGO3' NAIF_BODY_CODE += 399101319 NAIF_BODY_NAME += 'NDOSL_AGOS' NAIF_BODY_CODE += 399101318 NAIF_BODY_NAME += 'NDOSL_AGU3' NAIF_BODY_CODE += 399101319 NAIF_BODY_NAME += 'NDOSL_AGUS' NAIF_BODY_CODE += 399101321 NAIF_BODY_NAME += 'NDOSL_AL2J' NAIF_BODY_CODE += 399100209 NAIF_BODY_NAME += 'NDOSL_ALAY' NAIF_BODY_CODE += 399101707 NAIF_BODY_NAME += 'NDOSL_ALSJ' NAIF_BODY_CODE += 399100204 NAIF_BODY_NAME += 'NDOSL_AMSJ' NAIF_BODY_CODE += 399100205 NAIF_BODY_NAME += 'NDOSL_AN3S' NAIF_BODY_CODE += 399101704 NAIF_BODY_NAME += 'NDOSL_AN8S' NAIF_BODY_CODE += 399101705 NAIF_BODY_NAME += 'NDOSL_ANRQ' NAIF_BODY_CODE += 399104082 NAIF_BODY_NAME += 'NDOSL_ANTQ' NAIF_BODY_CODE += 399104087 NAIF_BODY_NAME += 'NDOSL_APLS' NAIF_BODY_CODE += 399101725 NAIF_BODY_NAME += 'NDOSL_AS2Q' NAIF_BODY_CODE += 399104765 NAIF_BODY_NAME += 'NDOSL_AS2S' NAIF_BODY_CODE += 399101743 NAIF_BODY_NAME += 'NDOSL_AS3S' NAIF_BODY_CODE += 399101744 NAIF_BODY_NAME += 'NDOSL_ASCQ' NAIF_BODY_CODE += 399104045 NAIF_BODY_NAME += 'NDOSL_ASFS' NAIF_BODY_CODE += 399101720 NAIF_BODY_NAME += 'NDOSL_ASNS' NAIF_BODY_CODE += 399101726 NAIF_BODY_NAME += 'NDOSL_ATDQ' NAIF_BODY_CODE += 399104862 NAIF_BODY_NAME += 'NDOSL_ATDS' NAIF_BODY_CODE += 399104862 NAIF_BODY_NAME += 'NDOSL_ATFS' NAIF_BODY_CODE += 399101972 NAIF_BODY_NAME += 'NDOSL_ATLS' NAIF_BODY_CODE += 399101736 NAIF_BODY_NAME += 'NDOSL_ATMY' NAIF_BODY_CODE += 399101708 NAIF_BODY_NAME += 'NDOSL_AUSS' NAIF_BODY_CODE += 399104259 NAIF_BODY_NAME += 'NDOSL_AUWS' NAIF_BODY_CODE += 399101902 NAIF_BODY_NAME += 'NDOSL_BANF' NAIF_BODY_CODE += 399104020 NAIF_BODY_NAME += 'NDOSL_BD1S' NAIF_BODY_CODE += 399104056 NAIF_BODY_NAME += 'NDOSL_BDA3' NAIF_BODY_CODE += 399101303 NAIF_BODY_NAME += 'NDOSL_BDAA' NAIF_BODY_CODE += 399101360 NAIF_BODY_NAME += 'NDOSL_BDAQ' NAIF_BODY_CODE += 399104760 NAIF_BODY_NAME += 'NDOSL_BDDQ' NAIF_BODY_CODE += 399104760 NAIF_BODY_NAME += 'NDOSL_BLKQ' NAIF_BODY_CODE += 399104263 NAIF_BODY_NAME += 'NDOSL_BLT3' NAIF_BODY_CODE += 399101915 NAIF_BODY_NAME += 'NDOSL_BLTA' NAIF_BODY_CODE += 399101316 NAIF_BODY_NAME += 'NDOSL_BLTD' NAIF_BODY_CODE += 399101315 NAIF_BODY_NAME += 'NDOSL_BLTJ' NAIF_BODY_CODE += 399100290 NAIF_BODY_NAME += 'NDOSL_BP1K' NAIF_BODY_CODE += 399104754 NAIF_BODY_NAME += 'NDOSL_BP1S' NAIF_BODY_CODE += 399101322 NAIF_BODY_NAME += 'NDOSL_BP2K' NAIF_BODY_CODE += 399104755 NAIF_BODY_NAME += 'NDOSL_BP2S' NAIF_BODY_CODE += 399101323 NAIF_BODY_NAME += 'NDOSL_BREQ' NAIF_BODY_CODE += 399104283 NAIF_BODY_NAME += 'NDOSL_BRKS' NAIF_BODY_CODE += 399101732 NAIF_BODY_NAME += 'NDOSL_CA2F' NAIF_BODY_CODE += 399104241 NAIF_BODY_NAME += 'NDOSL_CALF' NAIF_BODY_CODE += 399104018 NAIF_BODY_NAME += 'NDOSL_CALT' NAIF_BODY_CODE += 399104280 NAIF_BODY_NAME += 'NDOSL_CALY' NAIF_BODY_CODE += 399101835 NAIF_BODY_NAME += 'NDOSL_CANS' NAIF_BODY_CODE += 399104723 NAIF_BODY_NAME += 'NDOSL_CB1D' NAIF_BODY_CODE += 399101567 NAIF_BODY_NAME += 'NDOSL_CHAS' NAIF_BODY_CODE += 399101340 NAIF_BODY_NAME += 'NDOSL_CN2F' NAIF_BODY_CODE += 399104088 NAIF_BODY_NAME += 'NDOSL_CN4F' NAIF_BODY_CODE += 399104223 NAIF_BODY_NAME += 'NDOSL_CN5F' NAIF_BODY_CODE += 399104344 NAIF_BODY_NAME += 'NDOSL_CNVF' NAIF_BODY_CODE += 399104041 NAIF_BODY_NAME += 'NDOSL_COCS' NAIF_BODY_CODE += 399104085 NAIF_BODY_NAME += 'NDOSL_CT2J' NAIF_BODY_CODE += 399100294 NAIF_BODY_NAME += 'NDOSL_CTSS' NAIF_BODY_CODE += 399101756 NAIF_BODY_NAME += 'NDOSL_CTVJ' NAIF_BODY_CODE += 399100293 NAIF_BODY_NAME += 'NDOSL_D26D' NAIF_BODY_CODE += 399101526 NAIF_BODY_NAME += 'NDOSL_D27D' NAIF_BODY_CODE += 399101516 NAIF_BODY_NAME += 'NDOSL_D36D' NAIF_BODY_CODE += 399101536 NAIF_BODY_NAME += 'NDOSL_DAKS' NAIF_BODY_CODE += 399104072 NAIF_BODY_NAME += 'NDOSL_DFRS' NAIF_BODY_CODE += 399104067 NAIF_BODY_NAME += 'NDOSL_DGIS' NAIF_BODY_CODE += 399104073 NAIF_BODY_NAME += 'NDOSL_DS12' NAIF_BODY_CODE += 399101612 NAIF_BODY_NAME += 'NDOSL_DS14' NAIF_BODY_CODE += 399101514 NAIF_BODY_NAME += 'NDOSL_DS15' NAIF_BODY_CODE += 399101515 NAIF_BODY_NAME += 'NDOSL_DS16' NAIF_BODY_CODE += 399101312 NAIF_BODY_NAME += 'NDOSL_DS17' NAIF_BODY_CODE += 399101327 NAIF_BODY_NAME += 'NDOSL_DS24' NAIF_BODY_CODE += 399104252 NAIF_BODY_NAME += 'NDOSL_DS25' NAIF_BODY_CODE += 399101525 NAIF_BODY_NAME += 'NDOSL_DS34' NAIF_BODY_CODE += 399101534 NAIF_BODY_NAME += 'NDOSL_DS35' NAIF_BODY_CODE += 399101535 NAIF_BODY_NAME += 'NDOSL_DS42' NAIF_BODY_CODE += 399101547 NAIF_BODY_NAME += 'NDOSL_DS43' NAIF_BODY_CODE += 399101548 NAIF_BODY_NAME += 'NDOSL_DS45' NAIF_BODY_CODE += 399101549 NAIF_BODY_NAME += 'NDOSL_DS46' NAIF_BODY_CODE += 399101546 NAIF_BODY_NAME += 'NDOSL_DS54' NAIF_BODY_CODE += 399101554 NAIF_BODY_NAME += 'NDOSL_DS55' NAIF_BODY_CODE += 399101555 NAIF_BODY_NAME += 'NDOSL_DS61' NAIF_BODY_CODE += 399101662 NAIF_BODY_NAME += 'NDOSL_DS63' NAIF_BODY_CODE += 399101564 NAIF_BODY_NAME += 'NDOSL_DS65' NAIF_BODY_CODE += 399101565 NAIF_BODY_NAME += 'NDOSL_DS66' NAIF_BODY_CODE += 399101566 NAIF_BODY_NAME += 'NDOSL_DS87' NAIF_BODY_CODE += 399101587 NAIF_BODY_NAME += 'NDOSL_DX2S' NAIF_BODY_CODE += 399101715 NAIF_BODY_NAME += 'NDOSL_DXAS' NAIF_BODY_CODE += 399101711 NAIF_BODY_NAME += 'NDOSL_EA2F' NAIF_BODY_CODE += 399104065 NAIF_BODY_NAME += 'NDOSL_EA3F' NAIF_BODY_CODE += 399104221 NAIF_BODY_NAME += 'NDOSL_EAFF' NAIF_BODY_CODE += 399104064 NAIF_BODY_NAME += 'NDOSL_EG2F' NAIF_BODY_CODE += 399104345 NAIF_BODY_NAME += 'NDOSL_EG3F' NAIF_BODY_CODE += 399104346 NAIF_BODY_NAME += 'NDOSL_ET1S' NAIF_BODY_CODE += 399101973 NAIF_BODY_NAME += 'NDOSL_ET2S' NAIF_BODY_CODE += 399101974 NAIF_BODY_NAME += 'NDOSL_EULY' NAIF_BODY_CODE += 399104205 NAIF_BODY_NAME += 'NDOSL_EVCS' NAIF_BODY_CODE += 399101363 NAIF_BODY_NAME += 'NDOSL_FR1X' NAIF_BODY_CODE += 399101844 NAIF_BODY_NAME += 'NDOSL_FR2F' NAIF_BODY_CODE += 399104249 NAIF_BODY_NAME += 'NDOSL_FR2X' NAIF_BODY_CODE += 399101845 NAIF_BODY_NAME += 'NDOSL_FRCF' NAIF_BODY_CODE += 399104069 NAIF_BODY_NAME += 'NDOSL_FT2F' NAIF_BODY_CODE += 399104138 NAIF_BODY_NAME += 'NDOSL_FTHF' NAIF_BODY_CODE += 399104115 NAIF_BODY_NAME += 'NDOSL_GB2Y' NAIF_BODY_CODE += 399101814 NAIF_BODY_NAME += 'NDOSL_GBIQ' NAIF_BODY_CODE += 399104013 NAIF_BODY_NAME += 'NDOSL_GBIY' NAIF_BODY_CODE += 399101813 NAIF_BODY_NAME += 'NDOSL_GD28' NAIF_BODY_CODE += 399101517 NAIF_BODY_NAME += 'NDOSL_GDSA' NAIF_BODY_CODE += 399101317 NAIF_BODY_NAME += 'NDOSL_GILD' NAIF_BODY_CODE += 399107225 NAIF_BODY_NAME += 'NDOSL_GILE' NAIF_BODY_CODE += 399104047 NAIF_BODY_NAME += 'NDOSL_GLAS' NAIF_BODY_CODE += 399101712 NAIF_BODY_NAME += 'NDOSL_GLBS' NAIF_BODY_CODE += 399101713 NAIF_BODY_NAME += 'NDOSL_GLCS' NAIF_BODY_CODE += 399101714 NAIF_BODY_NAME += 'NDOSL_GT2S' NAIF_BODY_CODE += 399101375 NAIF_BODY_NAME += 'NDOSL_GTKQ' NAIF_BODY_CODE += 399104086 NAIF_BODY_NAME += 'NDOSL_GTSS' NAIF_BODY_CODE += 399101368 NAIF_BODY_NAME += 'NDOSL_GW1J' NAIF_BODY_CODE += 399101971 NAIF_BODY_NAME += 'NDOSL_GW2J' NAIF_BODY_CODE += 399100210 NAIF_BODY_NAME += 'NDOSL_GW2K' NAIF_BODY_CODE += 399101968 NAIF_BODY_NAME += 'NDOSL_GW2S' NAIF_BODY_CODE += 399101969 NAIF_BODY_NAME += 'NDOSL_GW3S' NAIF_BODY_CODE += 399101970 NAIF_BODY_NAME += 'NDOSL_GWE2' NAIF_BODY_CODE += 399101936 NAIF_BODY_NAME += 'NDOSL_GWM3' NAIF_BODY_CODE += 399101309 NAIF_BODY_NAME += 'NDOSL_GWMK' NAIF_BODY_CODE += 399101965 NAIF_BODY_NAME += 'NDOSL_GWMS' NAIF_BODY_CODE += 399101966 NAIF_BODY_NAME += 'NDOSL_HAW3' NAIF_BODY_CODE += 399101311 NAIF_BODY_NAME += 'NDOSL_HAWQ' NAIF_BODY_CODE += 399104285 NAIF_BODY_NAME += 'NDOSL_HAWS' NAIF_BODY_CODE += 399101706 NAIF_BODY_NAME += 'NDOSL_HB33' NAIF_BODY_CODE += 399101325 NAIF_BODY_NAME += 'NDOSL_HB4S' NAIF_BODY_CODE += 399101378 NAIF_BODY_NAME += 'NDOSL_HB5S' NAIF_BODY_CODE += 399101403 NAIF_BODY_NAME += 'NDOSL_HBK3' NAIF_BODY_CODE += 399101324 NAIF_BODY_NAME += 'NDOSL_HBKS' NAIF_BODY_CODE += 399101402 NAIF_BODY_NAME += 'NDOSL_HOLF' NAIF_BODY_CODE += 399104144 NAIF_BODY_NAME += 'NDOSL_HR1S' NAIF_BODY_CODE += 399101718 NAIF_BODY_NAME += 'NDOSL_HR2S' NAIF_BODY_CODE += 399101719 NAIF_BODY_NAME += 'NDOSL_HR3S' NAIF_BODY_CODE += 399101749 NAIF_BODY_NAME += 'NDOSL_HT2S' NAIF_BODY_CODE += 399101373 NAIF_BODY_NAME += 'NDOSL_HTSS' NAIF_BODY_CODE += 399101367 NAIF_BODY_NAME += 'NDOSL_HWIS' NAIF_BODY_CODE += 399101903 NAIF_BODY_NAME += 'NDOSL_JD2Y' NAIF_BODY_CODE += 399101818 NAIF_BODY_NAME += 'NDOSL_JDIQ' NAIF_BODY_CODE += 399104248 NAIF_BODY_NAME += 'NDOSL_JDIY' NAIF_BODY_CODE += 399101817 NAIF_BODY_NAME += 'NDOSL_JSCJ' NAIF_BODY_CODE += 399100291 NAIF_BODY_NAME += 'NDOSL_KA2S' NAIF_BODY_CODE += 399101735 NAIF_BODY_NAME += 'NDOSL_KENS' NAIF_BODY_CODE += 399104722 NAIF_BODY_NAME += 'NDOSL_KERS' NAIF_BODY_CODE += 399104253 NAIF_BODY_NAME += 'NDOSL_KGLQ' NAIF_BODY_CODE += 399104261 NAIF_BODY_NAME += 'NDOSL_KI2S' NAIF_BODY_CODE += 399101727 NAIF_BODY_NAME += 'NDOSL_KICS' NAIF_BODY_CODE += 399104255 NAIF_BODY_NAME += 'NDOSL_KILS' NAIF_BODY_CODE += 399104256 NAIF_BODY_NAME += 'NDOSL_KIXS' NAIF_BODY_CODE += 399104257 NAIF_BODY_NAME += 'NDOSL_KLMS' NAIF_BODY_CODE += 399101710 NAIF_BODY_NAME += 'NDOSL_KM2F' NAIF_BODY_CODE += 399104971 NAIF_BODY_NAME += 'NDOSL_KMPF' NAIF_BODY_CODE += 399104110 NAIF_BODY_NAME += 'NDOSL_KMQF' NAIF_BODY_CODE += 399104111 NAIF_BODY_NAME += 'NDOSL_KMRF' NAIF_BODY_CODE += 399104968 NAIF_BODY_NAME += 'NDOSL_KMRQ' NAIF_BODY_CODE += 399104969 NAIF_BODY_NAME += 'NDOSL_KMRT' NAIF_BODY_CODE += 399104970 NAIF_BODY_NAME += 'NDOSL_KPTQ' NAIF_BODY_CODE += 399104282 NAIF_BODY_NAME += 'NDOSL_KRCS' NAIF_BODY_CODE += 399101797 NAIF_BODY_NAME += 'NDOSL_KRUF' NAIF_BODY_CODE += 399108501 NAIF_BODY_NAME += 'NDOSL_KRUS' NAIF_BODY_CODE += 399104258 NAIF_BODY_NAME += 'NDOSL_KSWC' NAIF_BODY_CODE += 399101855 NAIF_BODY_NAME += 'NDOSL_KU1S' NAIF_BODY_CODE += 399101905 NAIF_BODY_NAME += 'NDOSL_KU2S' NAIF_BODY_CODE += 399101906 NAIF_BODY_NAME += 'NDOSL_KU3S' NAIF_BODY_CODE += 399101909 NAIF_BODY_NAME += 'NDOSL_KUSS' NAIF_BODY_CODE += 399104055 NAIF_BODY_NAME += 'NDOSL_LANS' NAIF_BODY_CODE += 399101728 NAIF_BODY_NAME += 'NDOSL_LBVS' NAIF_BODY_CODE += 399104250 NAIF_BODY_NAME += 'NDOSL_LE1S' NAIF_BODY_CODE += 399101721 NAIF_BODY_NAME += 'NDOSL_LE2S' NAIF_BODY_CODE += 399101722 NAIF_BODY_NAME += 'NDOSL_MAD8' NAIF_BODY_CODE += 399101307 NAIF_BODY_NAME += 'NDOSL_MC1S' NAIF_BODY_CODE += 399104848 NAIF_BODY_NAME += 'NDOSL_MCMS' NAIF_BODY_CODE += 399104847 NAIF_BODY_NAME += 'NDOSL_MDLS' NAIF_BODY_CODE += 399101904 NAIF_BODY_NAME += 'NDOSL_MG1D' NAIF_BODY_CODE += 399101574 NAIF_BODY_NAME += 'NDOSL_MIL3' NAIF_BODY_CODE += 399101301 NAIF_BODY_NAME += 'NDOSL_MILA' NAIF_BODY_CODE += 399101901 NAIF_BODY_NAME += 'NDOSL_MILJ' NAIF_BODY_CODE += 399100292 NAIF_BODY_NAME += 'NDOSL_MIMF' NAIF_BODY_CODE += 399104220 NAIF_BODY_NAME += 'NDOSL_MLAQ' NAIF_BODY_CODE += 399104084 NAIF_BODY_NAME += 'NDOSL_MMTF' NAIF_BODY_CODE += 399104347 NAIF_BODY_NAME += 'NDOSL_MPLS' NAIF_BODY_CODE += 399101967 NAIF_BODY_NAME += 'NDOSL_MTLF' NAIF_BODY_CODE += 399104155 NAIF_BODY_NAME += 'NDOSL_MTLS' NAIF_BODY_CODE += 399104156 NAIF_BODY_NAME += 'NDOSL_NH2S' NAIF_BODY_CODE += 399101374 NAIF_BODY_NAME += 'NDOSL_NHSS' NAIF_BODY_CODE += 399101366 NAIF_BODY_NAME += 'NDOSL_NN1D' NAIF_BODY_CODE += 399101573 NAIF_BODY_NAME += 'NDOSL_NSGS' NAIF_BODY_CODE += 399101724 NAIF_BODY_NAME += 'NDOSL_ORR3' NAIF_BODY_CODE += 399101320 NAIF_BODY_NAME += 'NDOSL_OTSS' NAIF_BODY_CODE += 399101364 NAIF_BODY_NAME += 'NDOSL_PA2Q' NAIF_BODY_CODE += 399104089 NAIF_BODY_NAME += 'NDOSL_PATQ' NAIF_BODY_CODE += 399104060 NAIF_BODY_NAME += 'NDOSL_PDLS' NAIF_BODY_CODE += 399104054 NAIF_BODY_NAME += 'NDOSL_PFTQ' NAIF_BODY_CODE += 399104864 NAIF_BODY_NAME += 'NDOSL_PFTS' NAIF_BODY_CODE += 399104864 NAIF_BODY_NAME += 'NDOSL_PIOD' NAIF_BODY_CODE += 399101511 NAIF_BODY_NAME += 'NDOSL_PM2F' NAIF_BODY_CODE += 399104445 NAIF_BODY_NAME += 'NDOSL_PM3F' NAIF_BODY_CODE += 399104446 NAIF_BODY_NAME += 'NDOSL_PM4F' NAIF_BODY_CODE += 399104441 NAIF_BODY_NAME += 'NDOSL_PMKS' NAIF_BODY_CODE += 399101729 NAIF_BODY_NAME += 'NDOSL_PP2F' NAIF_BODY_CODE += 399107399 NAIF_BODY_NAME += 'NDOSL_PPTF' NAIF_BODY_CODE += 399104240 NAIF_BODY_NAME += 'NDOSL_PPTQ' NAIF_BODY_CODE += 399104260 NAIF_BODY_NAME += 'NDOSL_PPTY' NAIF_BODY_CODE += 399104216 NAIF_BODY_NAME += 'NDOSL_PRTS' NAIF_BODY_CODE += 399101342 NAIF_BODY_NAME += 'NDOSL_RALS' NAIF_BODY_CODE += 399101700 NAIF_BODY_NAME += 'NDOSL_RGTS' NAIF_BODY_CODE += 399101963 NAIF_BODY_NAME += 'NDOSL_RTKS' NAIF_BODY_CODE += 399101964 NAIF_BODY_NAME += 'NDOSL_S22S' NAIF_BODY_CODE += 399101734 NAIF_BODY_NAME += 'NDOSL_SARS' NAIF_BODY_CODE += 399101739 NAIF_BODY_NAME += 'NDOSL_SEYS' NAIF_BODY_CODE += 399104071 NAIF_BODY_NAME += 'NDOSL_SF1S' NAIF_BODY_CODE += 399101703 NAIF_BODY_NAME += 'NDOSL_SF2S' NAIF_BODY_CODE += 399101716 NAIF_BODY_NAME += 'NDOSL_SG1S' NAIF_BODY_CODE += 399101702 NAIF_BODY_NAME += 'NDOSL_SG3S' NAIF_BODY_CODE += 399101733 NAIF_BODY_NAME += 'NDOSL_SG4S' NAIF_BODY_CODE += 399101723 NAIF_BODY_NAME += 'NDOSL_SG6S' NAIF_BODY_CODE += 399101750 NAIF_BODY_NAME += 'NDOSL_SI1S' NAIF_BODY_CODE += 399101742 NAIF_BODY_NAME += 'NDOSL_SIPQ' NAIF_BODY_CODE += 399104003 NAIF_BODY_NAME += 'NDOSL_SN2F' NAIF_BODY_CODE += 399104443 NAIF_BODY_NAME += 'NDOSL_SN3F' NAIF_BODY_CODE += 399104444 NAIF_BODY_NAME += 'NDOSL_SNIF' NAIF_BODY_CODE += 399104442 NAIF_BODY_NAME += 'NDOSL_SOCA' NAIF_BODY_CODE += 399104139 NAIF_BODY_NAME += 'NDOSL_ST1F' NAIF_BODY_CODE += 399104224 NAIF_BODY_NAME += 'NDOSL_ST2K' NAIF_BODY_CODE += 399104751 NAIF_BODY_NAME += 'NDOSL_ST3K' NAIF_BODY_CODE += 399104752 NAIF_BODY_NAME += 'NDOSL_STE1' NAIF_BODY_CODE += 399101934 NAIF_BODY_NAME += 'NDOSL_STE2' NAIF_BODY_CODE += 399101935 NAIF_BODY_NAME += 'NDOSL_STGK' NAIF_BODY_CODE += 399104750 NAIF_BODY_NAME += 'NDOSL_STGS' NAIF_BODY_CODE += 399104753 NAIF_BODY_NAME += 'NDOSL_STSS' NAIF_BODY_CODE += 399101741 NAIF_BODY_NAME += 'NDOSL_STWS' NAIF_BODY_CODE += 399101740 NAIF_BODY_NAME += 'NDOSL_SWNS' NAIF_BODY_CODE += 399101796 NAIF_BODY_NAME += 'NDOSL_SYOQ' NAIF_BODY_CODE += 399104262 NAIF_BODY_NAME += 'NDOSL_TH2S' NAIF_BODY_CODE += 399101731 NAIF_BODY_NAME += 'NDOSL_THUS' NAIF_BODY_CODE += 399101730 NAIF_BODY_NAME += 'NDOSL_TR2S' NAIF_BODY_CODE += 399101738 NAIF_BODY_NAME += 'NDOSL_TR3S' NAIF_BODY_CODE += 399101748 NAIF_BODY_NAME += 'NDOSL_TSMF' NAIF_BODY_CODE += 399104080 NAIF_BODY_NAME += 'NDOSL_TT2S' NAIF_BODY_CODE += 399101376 NAIF_BODY_NAME += 'NDOSL_TTSS' NAIF_BODY_CODE += 399101369 NAIF_BODY_NAME += 'NDOSL_TULF' NAIF_BODY_CODE += 399104151 NAIF_BODY_NAME += 'NDOSL_TULS' NAIF_BODY_CODE += 399104078 NAIF_BODY_NAME += 'NDOSL_U2HS' NAIF_BODY_CODE += 399101779 NAIF_BODY_NAME += 'NDOSL_U2PS' NAIF_BODY_CODE += 399101771 NAIF_BODY_NAME += 'NDOSL_U3AS' NAIF_BODY_CODE += 399101745 NAIF_BODY_NAME += 'NDOSL_U4AS' NAIF_BODY_CODE += 399101746 NAIF_BODY_NAME += 'NDOSL_U5AS' NAIF_BODY_CODE += 399101747 NAIF_BODY_NAME += 'NDOSL_UL1S' NAIF_BODY_CODE += 399101854 NAIF_BODY_NAME += 'NDOSL_UL23' NAIF_BODY_CODE += 399101371 NAIF_BODY_NAME += 'NDOSL_UL33' NAIF_BODY_CODE += 399101332 NAIF_BODY_NAME += 'NDOSL_ULA3' NAIF_BODY_CODE += 399101328 NAIF_BODY_NAME += 'NDOSL_ULA4' NAIF_BODY_CODE += 399101401 NAIF_BODY_NAME += 'NDOSL_ULAE' NAIF_BODY_CODE += 399101853 NAIF_BODY_NAME += 'NDOSL_USAS' NAIF_BODY_CODE += 399101709 NAIF_BODY_NAME += 'NDOSL_USDS' NAIF_BODY_CODE += 399101717 NAIF_BODY_NAME += 'NDOSL_USHS' NAIF_BODY_CODE += 399101778 NAIF_BODY_NAME += 'NDOSL_USPS' NAIF_BODY_CODE += 399101770 NAIF_BODY_NAME += 'NDOSL_VD2F' NAIF_BODY_CODE += 399104247 NAIF_BODY_NAME += 'NDOSL_VD3F' NAIF_BODY_CODE += 399104251 NAIF_BODY_NAME += 'NDOSL_VD4F' NAIF_BODY_CODE += 399104254 NAIF_BODY_NAME += 'NDOSL_VDB3' NAIF_BODY_CODE += 399101333 NAIF_BODY_NAME += 'NDOSL_VDBF' NAIF_BODY_CODE += 399104246 NAIF_BODY_NAME += 'NDOSL_VEND' NAIF_BODY_CODE += 399101513 NAIF_BODY_NAME += 'NDOSL_VT2S' NAIF_BODY_CODE += 399101372 NAIF_BODY_NAME += 'NDOSL_VTSS' NAIF_BODY_CODE += 399101365 NAIF_BODY_NAME += 'NDOSL_WAPS' NAIF_BODY_CODE += 399101341 NAIF_BODY_NAME += 'NDOSL_WD3F' NAIF_BODY_CODE += 399104846 NAIF_BODY_NAME += 'NDOSL_WD4F' NAIF_BODY_CODE += 399104843 NAIF_BODY_NAME += 'NDOSL_WH2J' NAIF_BODY_CODE += 399100202 NAIF_BODY_NAME += 'NDOSL_WH2K' NAIF_BODY_CODE += 399101921 NAIF_BODY_NAME += 'NDOSL_WH2S' NAIF_BODY_CODE += 399101962 NAIF_BODY_NAME += 'NDOSL_WH3K' NAIF_BODY_CODE += 399101922 NAIF_BODY_NAME += 'NDOSL_WH4K' NAIF_BODY_CODE += 399101925 NAIF_BODY_NAME += 'NDOSL_WH5K' NAIF_BODY_CODE += 399101940 NAIF_BODY_NAME += 'NDOSL_WH6F' NAIF_BODY_CODE += 399104145 NAIF_BODY_NAME += 'NDOSL_WH6K' NAIF_BODY_CODE += 399101941 NAIF_BODY_NAME += 'NDOSL_WH7F' NAIF_BODY_CODE += 399104147 NAIF_BODY_NAME += 'NDOSL_WH9F' NAIF_BODY_CODE += 399104146 NAIF_BODY_NAME += 'NDOSL_WHSF' NAIF_BODY_CODE += 399104143 NAIF_BODY_NAME += 'NDOSL_WHSJ' NAIF_BODY_CODE += 399100201 NAIF_BODY_NAME += 'NDOSL_WHSK' NAIF_BODY_CODE += 399101920 NAIF_BODY_NAME += 'NDOSL_WHSS' NAIF_BODY_CODE += 399101961 NAIF_BODY_NAME += 'NDOSL_WL2F' NAIF_BODY_CODE += 399104841 NAIF_BODY_NAME += 'NDOSL_WL2S' NAIF_BODY_CODE += 399104206 NAIF_BODY_NAME += 'NDOSL_WL3F' NAIF_BODY_CODE += 399104845 NAIF_BODY_NAME += 'NDOSL_WL3S' NAIF_BODY_CODE += 399104207 NAIF_BODY_NAME += 'NDOSL_WL4F' NAIF_BODY_CODE += 399104842 NAIF_BODY_NAME += 'NDOSL_WL4S' NAIF_BODY_CODE += 399104208 NAIF_BODY_NAME += 'NDOSL_WL53' NAIF_BODY_CODE += 399104209 NAIF_BODY_NAME += 'NDOSL_WL6S' NAIF_BODY_CODE += 399104210 NAIF_BODY_NAME += 'NDOSL_WLPF' NAIF_BODY_CODE += 399104840 NAIF_BODY_NAME += 'NDOSL_WLPQ' NAIF_BODY_CODE += 399104860 NAIF_BODY_NAME += 'NDOSL_WP2S' NAIF_BODY_CODE += 399101337 NAIF_BODY_NAME += 'NDOSL_WP2Y' NAIF_BODY_CODE += 399101838 NAIF_BODY_NAME += 'NDOSL_WP2Z' NAIF_BODY_CODE += 399101840 NAIF_BODY_NAME += 'NDOSL_WP3S' NAIF_BODY_CODE += 399101338 NAIF_BODY_NAME += 'NDOSL_WP3Z' NAIF_BODY_CODE += 399101841 NAIF_BODY_NAME += 'NDOSL_WPDA' NAIF_BODY_CODE += 399101339 NAIF_BODY_NAME += 'NDOSL_WPS8' NAIF_BODY_CODE += 399101336 NAIF_BODY_NAME += 'NDOSL_WPSA' NAIF_BODY_CODE += 399101334 NAIF_BODY_NAME += 'NDOSL_WPSS' NAIF_BODY_CODE += 399101335 NAIF_BODY_NAME += 'NDOSL_WS1S' NAIF_BODY_CODE += 399101931 NAIF_BODY_NAME += 'NDOSL_WSCZ' NAIF_BODY_CODE += 399101871 NAIF_BODY_NAME += 'NDOSL_WSE1' NAIF_BODY_CODE += 399101932 NAIF_BODY_NAME += 'NDOSL_WSE2' NAIF_BODY_CODE += 399101933 NAIF_BODY_NAME += 'NDOSL_WSSH' NAIF_BODY_CODE += 399101870 NAIF_BODY_NAME += 'NDOSL_WT1S' NAIF_BODY_CODE += 399104865 NAIF_BODY_NAME += 'NDOSL_WT2S' NAIF_BODY_CODE += 399104866 NAIF_BODY_NAME += 'NDOSL_WT3S' NAIF_BODY_CODE += 399104867 NAIF_BODY_NAME += 'NDOSL_WTDQ' NAIF_BODY_CODE += 399104861 NAIF_BODY_NAME += 'NDOSL_WTDS' NAIF_BODY_CODE += 399104861 NAIF_BODY_NAME += 'NDOSL_WU1S' NAIF_BODY_CODE += 399101907 NAIF_BODY_NAME += 'NDOSL_WU2S' NAIF_BODY_CODE += 399101908 NAIF_BODY_NAME += 'NDOSL_WULY' NAIF_BODY_CODE += 399104215 NAIF_BODY_NAME += 'NDOSL_YARZ' NAIF_BODY_CODE += 399108566 \begintext Reference frame specifications follow: Topocentric frame NDOSL_AC2J_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AC2J_TOPO is centered at the site NDOSL_AC2J, which has Cartesian coordinates X (km): 0.6119570413739E+04 Y (km): -0.1570187617951E+04 Z (km): -0.8727990256209E+03 and planetodetic coordinates Longitude (deg): -14.3907679167000 Latitude (deg): -7.9179155833000 Altitude (km): 0.7146999999813E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AC2J_TOPO = 399100208 FRAME_399100208_NAME = 'NDOSL_AC2J_TOPO' FRAME_399100208_CLASS = 4 FRAME_399100208_CLASS_ID = 399100208 FRAME_399100208_CENTER = 399100208 OBJECT_399100208_FRAME = 'NDOSL_AC2J_TOPO' TKFRAME_399100208_RELATIVE = 'ITRF93' TKFRAME_399100208_SPEC = 'ANGLES' TKFRAME_399100208_UNITS = 'DEGREES' TKFRAME_399100208_AXES = ( 3, 2, 3 ) TKFRAME_399100208_ANGLES = ( -345.6092320833001, -97.9179155833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ACN3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ACN3_TOPO is centered at the site NDOSL_ACN3, which has Cartesian coordinates X (km): 0.6121234542823E+04 Y (km): -0.1563367223538E+04 Z (km): -0.8769160856396E+03 and planetodetic coordinates Longitude (deg): -14.3271032778000 Latitude (deg): -7.9548824722000 Altitude (km): 0.5614030000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ACN3_TOPO = 399101306 FRAME_399101306_NAME = 'NDOSL_ACN3_TOPO' FRAME_399101306_CLASS = 4 FRAME_399101306_CLASS_ID = 399101306 FRAME_399101306_CENTER = 399101306 OBJECT_399101306_FRAME = 'NDOSL_ACN3_TOPO' TKFRAME_399101306_RELATIVE = 'ITRF93' TKFRAME_399101306_SPEC = 'ANGLES' TKFRAME_399101306_UNITS = 'DEGREES' TKFRAME_399101306_AXES = ( 3, 2, 3 ) TKFRAME_399101306_ANGLES = ( -345.6728967222000, -97.9548824722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ACNJ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ACNJ_TOPO is centered at the site NDOSL_ACNJ, which has Cartesian coordinates X (km): 0.6119570413739E+04 Y (km): -0.1570187617951E+04 Z (km): -0.8727990256209E+03 and planetodetic coordinates Longitude (deg): -14.3907679167000 Latitude (deg): -7.9179155833000 Altitude (km): 0.7146999999813E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ACNJ_TOPO = 399100207 FRAME_399100207_NAME = 'NDOSL_ACNJ_TOPO' FRAME_399100207_CLASS = 4 FRAME_399100207_CLASS_ID = 399100207 FRAME_399100207_CENTER = 399100207 OBJECT_399100207_FRAME = 'NDOSL_ACNJ_TOPO' TKFRAME_399100207_RELATIVE = 'ITRF93' TKFRAME_399100207_SPEC = 'ANGLES' TKFRAME_399100207_UNITS = 'DEGREES' TKFRAME_399100207_AXES = ( 3, 2, 3 ) TKFRAME_399100207_ANGLES = ( -345.6092320833001, -97.9179155833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ADRQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ADRQ_TOPO is centered at the site NDOSL_ADRQ, which has Cartesian coordinates X (km): 0.3844942160449E+04 Y (km): -0.5056062777585E+04 Z (km): 0.5752169085049E+03 and planetodetic coordinates Longitude (deg): -52.7484011111000 Latitude (deg): 5.2091272500000 Altitude (km): -0.1380799999758E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ADRQ_TOPO = 399104284 FRAME_399104284_NAME = 'NDOSL_ADRQ_TOPO' FRAME_399104284_CLASS = 4 FRAME_399104284_CLASS_ID = 399104284 FRAME_399104284_CENTER = 399104284 OBJECT_399104284_FRAME = 'NDOSL_ADRQ_TOPO' TKFRAME_399104284_RELATIVE = 'ITRF93' TKFRAME_399104284_SPEC = 'ANGLES' TKFRAME_399104284_UNITS = 'DEGREES' TKFRAME_399104284_AXES = ( 3, 2, 3 ) TKFRAME_399104284_ANGLES = ( -307.2515988889000, -84.7908727500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AG1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AG1S_TOPO is centered at the site NDOSL_AG1S, which has Cartesian coordinates X (km): -0.2268877449289E+04 Y (km): -0.1447595088577E+04 Z (km): 0.5763592809979E+04 and planetodetic coordinates Longitude (deg): -147.4612041667000 Latitude (deg): 65.1167002778000 Altitude (km): 0.4366999999990E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AG1S_TOPO = 399101701 FRAME_399101701_NAME = 'NDOSL_AG1S_TOPO' FRAME_399101701_CLASS = 4 FRAME_399101701_CLASS_ID = 399101701 FRAME_399101701_CENTER = 399101701 OBJECT_399101701_FRAME = 'NDOSL_AG1S_TOPO' TKFRAME_399101701_RELATIVE = 'ITRF93' TKFRAME_399101701_SPEC = 'ANGLES' TKFRAME_399101701_UNITS = 'DEGREES' TKFRAME_399101701_AXES = ( 3, 2, 3 ) TKFRAME_399101701_ANGLES = ( -212.5387958333000, -24.8832997222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AG23_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AG23_TOPO is centered at the site NDOSL_AG23, which has Cartesian coordinates X (km): 0.1769774590285E+04 Y (km): -0.5044455083031E+04 Z (km): -0.3468464580699E+04 and planetodetic coordinates Longitude (deg): -70.6673116944000 Latitude (deg): -33.1517941389000 Altitude (km): 0.7300000000013E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AG23_TOPO = 399101377 FRAME_399101377_NAME = 'NDOSL_AG23_TOPO' FRAME_399101377_CLASS = 4 FRAME_399101377_CLASS_ID = 399101377 FRAME_399101377_CENTER = 399101377 OBJECT_399101377_FRAME = 'NDOSL_AG23_TOPO' TKFRAME_399101377_RELATIVE = 'ITRF93' TKFRAME_399101377_SPEC = 'ANGLES' TKFRAME_399101377_UNITS = 'DEGREES' TKFRAME_399101377_AXES = ( 3, 2, 3 ) TKFRAME_399101377_ANGLES = ( -289.3326883056000, -123.1517941389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AG33_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AG33_TOPO is centered at the site NDOSL_AG33, which has Cartesian coordinates X (km): 0.1769693485867E+04 Y (km): -0.5044504581442E+04 Z (km): -0.3468435737926E+04 and planetodetic coordinates Longitude (deg): -70.6683075556000 Latitude (deg): -33.1514785278000 Altitude (km): 0.7308530000010E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AG33_TOPO = 399101404 FRAME_399101404_NAME = 'NDOSL_AG33_TOPO' FRAME_399101404_CLASS = 4 FRAME_399101404_CLASS_ID = 399101404 FRAME_399101404_CENTER = 399101404 OBJECT_399101404_FRAME = 'NDOSL_AG33_TOPO' TKFRAME_399101404_RELATIVE = 'ITRF93' TKFRAME_399101404_SPEC = 'ANGLES' TKFRAME_399101404_UNITS = 'DEGREES' TKFRAME_399101404_AXES = ( 3, 2, 3 ) TKFRAME_399101404_ANGLES = ( -289.3316924444000, -123.1514785278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AGO3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AGO3_TOPO is centered at the site NDOSL_AGO3, which has Cartesian coordinates X (km): 0.1769869297973E+04 Y (km): -0.5044468924434E+04 Z (km): -0.3468402618379E+04 and planetodetic coordinates Longitude (deg): -70.6664030000000 Latitude (deg): -33.1511074722000 Altitude (km): 0.7333010000016E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AGO3_TOPO = 399101319 FRAME_399101319_NAME = 'NDOSL_AGO3_TOPO' FRAME_399101319_CLASS = 4 FRAME_399101319_CLASS_ID = 399101319 FRAME_399101319_CENTER = 399101319 OBJECT_399101319_FRAME = 'NDOSL_AGO3_TOPO' TKFRAME_399101319_RELATIVE = 'ITRF93' TKFRAME_399101319_SPEC = 'ANGLES' TKFRAME_399101319_UNITS = 'DEGREES' TKFRAME_399101319_AXES = ( 3, 2, 3 ) TKFRAME_399101319_ANGLES = ( -289.3335970000000, -123.1511074722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AGOS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AGOS_TOPO is centered at the site NDOSL_AGOS, which has Cartesian coordinates X (km): 0.1769816188074E+04 Y (km): -0.5044663834943E+04 Z (km): -0.3468142343257E+04 and planetodetic coordinates Longitude (deg): -70.6676316667000 Latitude (deg): -33.1483228333000 Altitude (km): 0.7302399999991E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AGOS_TOPO = 399101318 FRAME_399101318_NAME = 'NDOSL_AGOS_TOPO' FRAME_399101318_CLASS = 4 FRAME_399101318_CLASS_ID = 399101318 FRAME_399101318_CENTER = 399101318 OBJECT_399101318_FRAME = 'NDOSL_AGOS_TOPO' TKFRAME_399101318_RELATIVE = 'ITRF93' TKFRAME_399101318_SPEC = 'ANGLES' TKFRAME_399101318_UNITS = 'DEGREES' TKFRAME_399101318_AXES = ( 3, 2, 3 ) TKFRAME_399101318_ANGLES = ( -289.3323683333000, -123.1483228333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AGU3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AGU3_TOPO is centered at the site NDOSL_AGU3, which has Cartesian coordinates X (km): 0.1769869297973E+04 Y (km): -0.5044468924434E+04 Z (km): -0.3468402618379E+04 and planetodetic coordinates Longitude (deg): -70.6664030000000 Latitude (deg): -33.1511074722000 Altitude (km): 0.7333010000016E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AGU3_TOPO = 399101319 FRAME_399101319_NAME = 'NDOSL_AGU3_TOPO' FRAME_399101319_CLASS = 4 FRAME_399101319_CLASS_ID = 399101319 FRAME_399101319_CENTER = 399101319 OBJECT_399101319_FRAME = 'NDOSL_AGU3_TOPO' TKFRAME_399101319_RELATIVE = 'ITRF93' TKFRAME_399101319_SPEC = 'ANGLES' TKFRAME_399101319_UNITS = 'DEGREES' TKFRAME_399101319_AXES = ( 3, 2, 3 ) TKFRAME_399101319_ANGLES = ( -289.3335970000000, -123.1511074722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AGUS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AGUS_TOPO is centered at the site NDOSL_AGUS, which has Cartesian coordinates X (km): 0.1769816188074E+04 Y (km): -0.5044663834943E+04 Z (km): -0.3468142343257E+04 and planetodetic coordinates Longitude (deg): -70.6676316667000 Latitude (deg): -33.1483228333000 Altitude (km): 0.7302399999991E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AGUS_TOPO = 399101321 FRAME_399101321_NAME = 'NDOSL_AGUS_TOPO' FRAME_399101321_CLASS = 4 FRAME_399101321_CLASS_ID = 399101321 FRAME_399101321_CENTER = 399101321 OBJECT_399101321_FRAME = 'NDOSL_AGUS_TOPO' TKFRAME_399101321_RELATIVE = 'ITRF93' TKFRAME_399101321_SPEC = 'ANGLES' TKFRAME_399101321_UNITS = 'DEGREES' TKFRAME_399101321_AXES = ( 3, 2, 3 ) TKFRAME_399101321_ANGLES = ( -289.3323683333000, -123.1483228333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AL2J_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AL2J_TOPO is centered at the site NDOSL_AL2J, which has Cartesian coordinates X (km): -0.4049081850691E+04 Y (km): 0.4210177112064E+04 Z (km): -0.2554089086883E+04 and planetodetic coordinates Longitude (deg): 133.8825985000000 Latitude (deg): -23.7588104444000 Altitude (km): 0.5765420000016E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AL2J_TOPO = 399100209 FRAME_399100209_NAME = 'NDOSL_AL2J_TOPO' FRAME_399100209_CLASS = 4 FRAME_399100209_CLASS_ID = 399100209 FRAME_399100209_CENTER = 399100209 OBJECT_399100209_FRAME = 'NDOSL_AL2J_TOPO' TKFRAME_399100209_RELATIVE = 'ITRF93' TKFRAME_399100209_SPEC = 'ANGLES' TKFRAME_399100209_UNITS = 'DEGREES' TKFRAME_399100209_AXES = ( 3, 2, 3 ) TKFRAME_399100209_ANGLES = ( -133.8825985000000, -113.7588104444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ALAY_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ALAY_TOPO is centered at the site NDOSL_ALAY, which has Cartesian coordinates X (km): -0.1461765185387E+04 Y (km): -0.5161511749025E+04 Z (km): 0.3443611939191E+04 and planetodetic coordinates Longitude (deg): -105.8123794722000 Latitude (deg): 32.8725331111000 Altitude (km): 0.2796240000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ALAY_TOPO = 399101707 FRAME_399101707_NAME = 'NDOSL_ALAY_TOPO' FRAME_399101707_CLASS = 4 FRAME_399101707_CLASS_ID = 399101707 FRAME_399101707_CENTER = 399101707 OBJECT_399101707_FRAME = 'NDOSL_ALAY_TOPO' TKFRAME_399101707_RELATIVE = 'ITRF93' TKFRAME_399101707_SPEC = 'ANGLES' TKFRAME_399101707_UNITS = 'DEGREES' TKFRAME_399101707_AXES = ( 3, 2, 3 ) TKFRAME_399101707_ANGLES = ( -254.1876205278000, -57.1274668889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ALSJ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ALSJ_TOPO is centered at the site NDOSL_ALSJ, which has Cartesian coordinates X (km): -0.4049081850691E+04 Y (km): 0.4210177112064E+04 Z (km): -0.2554089086883E+04 and planetodetic coordinates Longitude (deg): 133.8825985000000 Latitude (deg): -23.7588104444000 Altitude (km): 0.5765420000016E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ALSJ_TOPO = 399100204 FRAME_399100204_NAME = 'NDOSL_ALSJ_TOPO' FRAME_399100204_CLASS = 4 FRAME_399100204_CLASS_ID = 399100204 FRAME_399100204_CENTER = 399100204 OBJECT_399100204_FRAME = 'NDOSL_ALSJ_TOPO' TKFRAME_399100204_RELATIVE = 'ITRF93' TKFRAME_399100204_SPEC = 'ANGLES' TKFRAME_399100204_UNITS = 'DEGREES' TKFRAME_399100204_AXES = ( 3, 2, 3 ) TKFRAME_399100204_ANGLES = ( -133.8825985000000, -113.7588104444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AMSJ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AMSJ_TOPO is centered at the site NDOSL_AMSJ, which has Cartesian coordinates X (km): -0.6100064718053E+04 Y (km): -0.9968013704571E+03 Z (km): -0.1568551672624E+04 and planetodetic coordinates Longitude (deg): -170.7194166667000 Latitude (deg): -14.3314444444000 Altitude (km): 0.5540000000053E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AMSJ_TOPO = 399100205 FRAME_399100205_NAME = 'NDOSL_AMSJ_TOPO' FRAME_399100205_CLASS = 4 FRAME_399100205_CLASS_ID = 399100205 FRAME_399100205_CENTER = 399100205 OBJECT_399100205_FRAME = 'NDOSL_AMSJ_TOPO' TKFRAME_399100205_RELATIVE = 'ITRF93' TKFRAME_399100205_SPEC = 'ANGLES' TKFRAME_399100205_UNITS = 'DEGREES' TKFRAME_399100205_AXES = ( 3, 2, 3 ) TKFRAME_399100205_ANGLES = ( -189.2805833333000, -104.3314444444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AN3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AN3S_TOPO is centered at the site NDOSL_AN3S, which has Cartesian coordinates X (km): 0.2883416802262E+04 Y (km): -0.5371773801799E+04 Z (km): 0.1867317298805E+04 and planetodetic coordinates Longitude (deg): -61.7743500000000 Latitude (deg): 17.1369508333000 Altitude (km): -0.1659000000000E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AN3S_TOPO = 399101704 FRAME_399101704_NAME = 'NDOSL_AN3S_TOPO' FRAME_399101704_CLASS = 4 FRAME_399101704_CLASS_ID = 399101704 FRAME_399101704_CENTER = 399101704 OBJECT_399101704_FRAME = 'NDOSL_AN3S_TOPO' TKFRAME_399101704_RELATIVE = 'ITRF93' TKFRAME_399101704_SPEC = 'ANGLES' TKFRAME_399101704_UNITS = 'DEGREES' TKFRAME_399101704_AXES = ( 3, 2, 3 ) TKFRAME_399101704_ANGLES = ( -298.2256500000000, -72.8630491667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AN8S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AN8S_TOPO is centered at the site NDOSL_AN8S, which has Cartesian coordinates X (km): 0.2883432907041E+04 Y (km): -0.5371790267874E+04 Z (km): 0.1867286372514E+04 and planetodetic coordinates Longitude (deg): -61.7742898333000 Latitude (deg): 17.1366248889000 Altitude (km): -0.4559999998497E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AN8S_TOPO = 399101705 FRAME_399101705_NAME = 'NDOSL_AN8S_TOPO' FRAME_399101705_CLASS = 4 FRAME_399101705_CLASS_ID = 399101705 FRAME_399101705_CENTER = 399101705 OBJECT_399101705_FRAME = 'NDOSL_AN8S_TOPO' TKFRAME_399101705_RELATIVE = 'ITRF93' TKFRAME_399101705_SPEC = 'ANGLES' TKFRAME_399101705_UNITS = 'DEGREES' TKFRAME_399101705_AXES = ( 3, 2, 3 ) TKFRAME_399101705_ANGLES = ( -298.2257101667000, -72.8633751111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ANRQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ANRQ_TOPO is centered at the site NDOSL_ANRQ, which has Cartesian coordinates X (km): 0.2883329360936E+04 Y (km): -0.5371807396626E+04 Z (km): 0.1867352947646E+04 and planetodetic coordinates Longitude (deg): -61.7752233611000 Latitude (deg): 17.1372899444000 Altitude (km): -0.1731800000005E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ANRQ_TOPO = 399104082 FRAME_399104082_NAME = 'NDOSL_ANRQ_TOPO' FRAME_399104082_CLASS = 4 FRAME_399104082_CLASS_ID = 399104082 FRAME_399104082_CENTER = 399104082 OBJECT_399104082_FRAME = 'NDOSL_ANRQ_TOPO' TKFRAME_399104082_RELATIVE = 'ITRF93' TKFRAME_399104082_SPEC = 'ANGLES' TKFRAME_399104082_UNITS = 'DEGREES' TKFRAME_399104082_AXES = ( 3, 2, 3 ) TKFRAME_399104082_ANGLES = ( -298.2247766389000, -72.8627100556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ANTQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ANTQ_TOPO is centered at the site NDOSL_ANTQ, which has Cartesian coordinates X (km): 0.2881619667768E+04 Y (km): -0.5372512005660E+04 Z (km): 0.1868031848047E+04 and planetodetic coordinates Longitude (deg): -61.7925125000000 Latitude (deg): 17.1436511111000 Altitude (km): 0.3630000001819E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ANTQ_TOPO = 399104087 FRAME_399104087_NAME = 'NDOSL_ANTQ_TOPO' FRAME_399104087_CLASS = 4 FRAME_399104087_CLASS_ID = 399104087 FRAME_399104087_CENTER = 399104087 OBJECT_399104087_FRAME = 'NDOSL_ANTQ_TOPO' TKFRAME_399104087_RELATIVE = 'ITRF93' TKFRAME_399104087_SPEC = 'ANGLES' TKFRAME_399104087_UNITS = 'DEGREES' TKFRAME_399104087_AXES = ( 3, 2, 3 ) TKFRAME_399104087_ANGLES = ( -298.2074875000000, -72.8563488889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_APLS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_APLS_TOPO is centered at the site NDOSL_APLS, which has Cartesian coordinates X (km): 0.1189543057898E+04 Y (km): -0.4806720480844E+04 Z (km): 0.4006835132777E+04 and planetodetic coordinates Longitude (deg): -76.1000000000000 Latitude (deg): 39.1674000000000 Altitude (km): 0.1465099999989E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_APLS_TOPO = 399101725 FRAME_399101725_NAME = 'NDOSL_APLS_TOPO' FRAME_399101725_CLASS = 4 FRAME_399101725_CLASS_ID = 399101725 FRAME_399101725_CENTER = 399101725 OBJECT_399101725_FRAME = 'NDOSL_APLS_TOPO' TKFRAME_399101725_RELATIVE = 'ITRF93' TKFRAME_399101725_SPEC = 'ANGLES' TKFRAME_399101725_UNITS = 'DEGREES' TKFRAME_399101725_AXES = ( 3, 2, 3 ) TKFRAME_399101725_ANGLES = ( -283.9000000000000, -50.8326000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AS2Q_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AS2Q_TOPO is centered at the site NDOSL_AS2Q, which has Cartesian coordinates X (km): 0.6118547564472E+04 Y (km): -0.1571084239160E+04 Z (km): -0.8788214681405E+03 and planetodetic coordinates Longitude (deg): -14.4009508611000 Latitude (deg): -7.9728062500000 Altitude (km): 0.1434999999993E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AS2Q_TOPO = 399104765 FRAME_399104765_NAME = 'NDOSL_AS2Q_TOPO' FRAME_399104765_CLASS = 4 FRAME_399104765_CLASS_ID = 399104765 FRAME_399104765_CENTER = 399104765 OBJECT_399104765_FRAME = 'NDOSL_AS2Q_TOPO' TKFRAME_399104765_RELATIVE = 'ITRF93' TKFRAME_399104765_SPEC = 'ANGLES' TKFRAME_399104765_UNITS = 'DEGREES' TKFRAME_399104765_AXES = ( 3, 2, 3 ) TKFRAME_399104765_ANGLES = ( -345.5990491389000, -97.9728062500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AS2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AS2S_TOPO is centered at the site NDOSL_AS2S, which has Cartesian coordinates X (km): -0.2300576852987E+04 Y (km): -0.1445962561576E+04 Z (km): 0.5751285700240E+04 and planetodetic coordinates Longitude (deg): -147.8497456667000 Latitude (deg): 64.8594608056000 Altitude (km): 0.2377699999995E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AS2S_TOPO = 399101743 FRAME_399101743_NAME = 'NDOSL_AS2S_TOPO' FRAME_399101743_CLASS = 4 FRAME_399101743_CLASS_ID = 399101743 FRAME_399101743_CENTER = 399101743 OBJECT_399101743_FRAME = 'NDOSL_AS2S_TOPO' TKFRAME_399101743_RELATIVE = 'ITRF93' TKFRAME_399101743_SPEC = 'ANGLES' TKFRAME_399101743_UNITS = 'DEGREES' TKFRAME_399101743_AXES = ( 3, 2, 3 ) TKFRAME_399101743_ANGLES = ( -212.1502543333000, -25.1405391944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AS3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AS3S_TOPO is centered at the site NDOSL_AS3S, which has Cartesian coordinates X (km): -0.2300730832123E+04 Y (km): -0.1445814583816E+04 Z (km): 0.5751242080179E+04 and planetodetic coordinates Longitude (deg): -147.8541151111000 Latitude (deg): 64.8588753889000 Altitude (km): 0.2202169999993E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AS3S_TOPO = 399101744 FRAME_399101744_NAME = 'NDOSL_AS3S_TOPO' FRAME_399101744_CLASS = 4 FRAME_399101744_CLASS_ID = 399101744 FRAME_399101744_CENTER = 399101744 OBJECT_399101744_FRAME = 'NDOSL_AS3S_TOPO' TKFRAME_399101744_RELATIVE = 'ITRF93' TKFRAME_399101744_SPEC = 'ANGLES' TKFRAME_399101744_UNITS = 'DEGREES' TKFRAME_399101744_AXES = ( 3, 2, 3 ) TKFRAME_399101744_ANGLES = ( -212.1458848889000, -25.1411246111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ASCQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ASCQ_TOPO is centered at the site NDOSL_ASCQ, which has Cartesian coordinates X (km): 0.6119400266460E+04 Y (km): -0.1571479554715E+04 Z (km): -0.8715612021930E+03 and planetodetic coordinates Longitude (deg): -14.4025000000000 Latitude (deg): -7.9066351944000 Altitude (km): 0.5600000000038E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ASCQ_TOPO = 399104045 FRAME_399104045_NAME = 'NDOSL_ASCQ_TOPO' FRAME_399104045_CLASS = 4 FRAME_399104045_CLASS_ID = 399104045 FRAME_399104045_CENTER = 399104045 OBJECT_399104045_FRAME = 'NDOSL_ASCQ_TOPO' TKFRAME_399104045_RELATIVE = 'ITRF93' TKFRAME_399104045_SPEC = 'ANGLES' TKFRAME_399104045_UNITS = 'DEGREES' TKFRAME_399104045_AXES = ( 3, 2, 3 ) TKFRAME_399104045_ANGLES = ( -345.5975000000000, -97.9066351944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ASFS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ASFS_TOPO is centered at the site NDOSL_ASFS, which has Cartesian coordinates X (km): -0.2300831617542E+04 Y (km): -0.1445682989806E+04 Z (km): 0.5751231884968E+04 and planetodetic coordinates Longitude (deg): -147.8575951667000 Latitude (deg): 64.8587121389000 Altitude (km): 0.2174970000002E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ASFS_TOPO = 399101720 FRAME_399101720_NAME = 'NDOSL_ASFS_TOPO' FRAME_399101720_CLASS = 4 FRAME_399101720_CLASS_ID = 399101720 FRAME_399101720_CENTER = 399101720 OBJECT_399101720_FRAME = 'NDOSL_ASFS_TOPO' TKFRAME_399101720_RELATIVE = 'ITRF93' TKFRAME_399101720_SPEC = 'ANGLES' TKFRAME_399101720_UNITS = 'DEGREES' TKFRAME_399101720_AXES = ( 3, 2, 3 ) TKFRAME_399101720_ANGLES = ( -212.1424048333000, -25.1412878611000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ASNS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ASNS_TOPO is centered at the site NDOSL_ASNS, which has Cartesian coordinates X (km): 0.6121113246886E+04 Y (km): -0.1564045258689E+04 Z (km): -0.8726555957437E+03 and planetodetic coordinates Longitude (deg): -14.3333333333000 Latitude (deg): -7.9166671667000 Altitude (km): 0.2300400000147E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ASNS_TOPO = 399101726 FRAME_399101726_NAME = 'NDOSL_ASNS_TOPO' FRAME_399101726_CLASS = 4 FRAME_399101726_CLASS_ID = 399101726 FRAME_399101726_CENTER = 399101726 OBJECT_399101726_FRAME = 'NDOSL_ASNS_TOPO' TKFRAME_399101726_RELATIVE = 'ITRF93' TKFRAME_399101726_SPEC = 'ANGLES' TKFRAME_399101726_UNITS = 'DEGREES' TKFRAME_399101726_AXES = ( 3, 2, 3 ) TKFRAME_399101726_ANGLES = ( -345.6666666667000, -97.9166671667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ATDQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ATDQ_TOPO is centered at the site NDOSL_ATDQ, which has Cartesian coordinates X (km): 0.5437781023940E+03 Y (km): -0.5269794707794E+04 Z (km): 0.3540245970337E+04 and planetodetic coordinates Longitude (deg): -84.1086299444000 Latitude (deg): 33.9308841667000 Altitude (km): 0.2826370000010E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ATDQ_TOPO = 399104862 FRAME_399104862_NAME = 'NDOSL_ATDQ_TOPO' FRAME_399104862_CLASS = 4 FRAME_399104862_CLASS_ID = 399104862 FRAME_399104862_CENTER = 399104862 OBJECT_399104862_FRAME = 'NDOSL_ATDQ_TOPO' TKFRAME_399104862_RELATIVE = 'ITRF93' TKFRAME_399104862_SPEC = 'ANGLES' TKFRAME_399104862_UNITS = 'DEGREES' TKFRAME_399104862_AXES = ( 3, 2, 3 ) TKFRAME_399104862_ANGLES = ( -275.8913700556000, -56.0691158333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ATDS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ATDS_TOPO is centered at the site NDOSL_ATDS, which has Cartesian coordinates X (km): 0.5437781023940E+03 Y (km): -0.5269794707794E+04 Z (km): 0.3540245970337E+04 and planetodetic coordinates Longitude (deg): -84.1086299444000 Latitude (deg): 33.9308841667000 Altitude (km): 0.2826370000010E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ATDS_TOPO = 399104862 FRAME_399104862_NAME = 'NDOSL_ATDS_TOPO' FRAME_399104862_CLASS = 4 FRAME_399104862_CLASS_ID = 399104862 FRAME_399104862_CENTER = 399104862 OBJECT_399104862_FRAME = 'NDOSL_ATDS_TOPO' TKFRAME_399104862_RELATIVE = 'ITRF93' TKFRAME_399104862_SPEC = 'ANGLES' TKFRAME_399104862_UNITS = 'DEGREES' TKFRAME_399104862_AXES = ( 3, 2, 3 ) TKFRAME_399104862_ANGLES = ( -275.8913700556000, -56.0691158333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ATFS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ATFS_TOPO is centered at the site NDOSL_ATFS, which has Cartesian coordinates X (km): -0.2389442918439E+04 Y (km): 0.5043221402395E+04 Z (km): -0.3078376807670E+04 and planetodetic coordinates Longitude (deg): 115.3512658889000 Latitude (deg): -29.0449400278000 Altitude (km): 0.2473600000009E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ATFS_TOPO = 399101972 FRAME_399101972_NAME = 'NDOSL_ATFS_TOPO' FRAME_399101972_CLASS = 4 FRAME_399101972_CLASS_ID = 399101972 FRAME_399101972_CENTER = 399101972 OBJECT_399101972_FRAME = 'NDOSL_ATFS_TOPO' TKFRAME_399101972_RELATIVE = 'ITRF93' TKFRAME_399101972_SPEC = 'ANGLES' TKFRAME_399101972_UNITS = 'DEGREES' TKFRAME_399101972_AXES = ( 3, 2, 3 ) TKFRAME_399101972_ANGLES = ( -115.3512658889000, -119.0449400278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ATLS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ATLS_TOPO is centered at the site NDOSL_ATLS, which has Cartesian coordinates X (km): 0.5438005007104E+03 Y (km): -0.5269774603914E+04 Z (km): 0.3540231723899E+04 and planetodetic coordinates Longitude (deg): -84.1083666667000 Latitude (deg): 33.9308666667000 Altitude (km): 0.2599999999996E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ATLS_TOPO = 399101736 FRAME_399101736_NAME = 'NDOSL_ATLS_TOPO' FRAME_399101736_CLASS = 4 FRAME_399101736_CLASS_ID = 399101736 FRAME_399101736_CENTER = 399101736 OBJECT_399101736_FRAME = 'NDOSL_ATLS_TOPO' TKFRAME_399101736_RELATIVE = 'ITRF93' TKFRAME_399101736_SPEC = 'ANGLES' TKFRAME_399101736_UNITS = 'DEGREES' TKFRAME_399101736_AXES = ( 3, 2, 3 ) TKFRAME_399101736_ANGLES = ( -275.8916333333000, -56.0691333333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ATMY_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ATMY_TOPO is centered at the site NDOSL_ATMY, which has Cartesian coordinates X (km): -0.1496460772736E+04 Y (km): -0.5096174488535E+04 Z (km): 0.3523797487376E+04 and planetodetic coordinates Longitude (deg): -106.3645568333000 Latitude (deg): 33.7396298056000 Altitude (km): 0.2395244000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ATMY_TOPO = 399101708 FRAME_399101708_NAME = 'NDOSL_ATMY_TOPO' FRAME_399101708_CLASS = 4 FRAME_399101708_CLASS_ID = 399101708 FRAME_399101708_CENTER = 399101708 OBJECT_399101708_FRAME = 'NDOSL_ATMY_TOPO' TKFRAME_399101708_RELATIVE = 'ITRF93' TKFRAME_399101708_SPEC = 'ANGLES' TKFRAME_399101708_UNITS = 'DEGREES' TKFRAME_399101708_AXES = ( 3, 2, 3 ) TKFRAME_399101708_ANGLES = ( -253.6354431667000, -56.2603701944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AUSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AUSS_TOPO is centered at the site NDOSL_AUSS, which has Cartesian coordinates X (km): 0.4637942463764E+04 Y (km): 0.1214011679224E+03 Z (km): 0.4362391022791E+04 and planetodetic coordinates Longitude (deg): 1.4994120000000 Latitude (deg): 43.4286960000000 Altitude (km): 0.2604790000002E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AUSS_TOPO = 399104259 FRAME_399104259_NAME = 'NDOSL_AUSS_TOPO' FRAME_399104259_CLASS = 4 FRAME_399104259_CLASS_ID = 399104259 FRAME_399104259_CENTER = 399104259 OBJECT_399104259_FRAME = 'NDOSL_AUSS_TOPO' TKFRAME_399104259_RELATIVE = 'ITRF93' TKFRAME_399104259_SPEC = 'ANGLES' TKFRAME_399104259_UNITS = 'DEGREES' TKFRAME_399104259_AXES = ( 3, 2, 3 ) TKFRAME_399104259_ANGLES = ( -1.4994120000000, -46.5713040000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_AUWS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_AUWS_TOPO is centered at the site NDOSL_AUWS, which has Cartesian coordinates X (km): -0.2389196387747E+04 Y (km): 0.5043292025947E+04 Z (km): -0.3078458620129E+04 and planetodetic coordinates Longitude (deg): 115.3486680556000 Latitude (deg): -29.0457680833000 Altitude (km): 0.2505999999996E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_AUWS_TOPO = 399101902 FRAME_399101902_NAME = 'NDOSL_AUWS_TOPO' FRAME_399101902_CLASS = 4 FRAME_399101902_CLASS_ID = 399101902 FRAME_399101902_CENTER = 399101902 OBJECT_399101902_FRAME = 'NDOSL_AUWS_TOPO' TKFRAME_399101902_RELATIVE = 'ITRF93' TKFRAME_399101902_SPEC = 'ANGLES' TKFRAME_399101902_UNITS = 'DEGREES' TKFRAME_399101902_AXES = ( 3, 2, 3 ) TKFRAME_399101902_ANGLES = ( -115.3486680556000, -119.0457680833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BANF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BANF_TOPO is centered at the site NDOSL_BANF, which has Cartesian coordinates X (km): 0.1344283512154E+04 Y (km): 0.6068683366448E+04 Z (km): 0.1428827804453E+04 and planetodetic coordinates Longitude (deg): 77.5100000000000 Latitude (deg): 13.0300000000000 Altitude (km): 0.8379999999977E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BANF_TOPO = 399104020 FRAME_399104020_NAME = 'NDOSL_BANF_TOPO' FRAME_399104020_CLASS = 4 FRAME_399104020_CLASS_ID = 399104020 FRAME_399104020_CENTER = 399104020 OBJECT_399104020_FRAME = 'NDOSL_BANF_TOPO' TKFRAME_399104020_RELATIVE = 'ITRF93' TKFRAME_399104020_SPEC = 'ANGLES' TKFRAME_399104020_UNITS = 'DEGREES' TKFRAME_399104020_AXES = ( 3, 2, 3 ) TKFRAME_399104020_ANGLES = ( -77.5100000000000, -76.9700000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BD1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BD1S_TOPO is centered at the site NDOSL_BD1S, which has Cartesian coordinates X (km): 0.2308379177903E+04 Y (km): -0.4874348097797E+04 Z (km): 0.3393373542848E+04 and planetodetic coordinates Longitude (deg): -64.6588410000000 Latitude (deg): 32.3510439167000 Altitude (km): -0.1241999999978E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BD1S_TOPO = 399104056 FRAME_399104056_NAME = 'NDOSL_BD1S_TOPO' FRAME_399104056_CLASS = 4 FRAME_399104056_CLASS_ID = 399104056 FRAME_399104056_CENTER = 399104056 OBJECT_399104056_FRAME = 'NDOSL_BD1S_TOPO' TKFRAME_399104056_RELATIVE = 'ITRF93' TKFRAME_399104056_SPEC = 'ANGLES' TKFRAME_399104056_UNITS = 'DEGREES' TKFRAME_399104056_AXES = ( 3, 2, 3 ) TKFRAME_399104056_ANGLES = ( -295.3411590000000, -57.6489560833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BDA3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BDA3_TOPO is centered at the site NDOSL_BDA3, which has Cartesian coordinates X (km): 0.2308454920839E+04 Y (km): -0.4874298517269E+04 Z (km): 0.3393395047354E+04 and planetodetic coordinates Longitude (deg): -64.6578883333000 Latitude (deg): 32.3512675278000 Altitude (km): -0.1138000000051E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BDA3_TOPO = 399101303 FRAME_399101303_NAME = 'NDOSL_BDA3_TOPO' FRAME_399101303_CLASS = 4 FRAME_399101303_CLASS_ID = 399101303 FRAME_399101303_CENTER = 399101303 OBJECT_399101303_FRAME = 'NDOSL_BDA3_TOPO' TKFRAME_399101303_RELATIVE = 'ITRF93' TKFRAME_399101303_SPEC = 'ANGLES' TKFRAME_399101303_UNITS = 'DEGREES' TKFRAME_399101303_AXES = ( 3, 2, 3 ) TKFRAME_399101303_ANGLES = ( -295.3421116667000, -57.6487324722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BDAA_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BDAA_TOPO is centered at the site NDOSL_BDAA, which has Cartesian coordinates X (km): 0.2308382632086E+04 Y (km): -0.4874344089711E+04 Z (km): 0.3393386452836E+04 and planetodetic coordinates Longitude (deg): -64.6587896111000 Latitude (deg): 32.3511526111000 Altitude (km): -0.7322999999579E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BDAA_TOPO = 399101360 FRAME_399101360_NAME = 'NDOSL_BDAA_TOPO' FRAME_399101360_CLASS = 4 FRAME_399101360_CLASS_ID = 399101360 FRAME_399101360_CENTER = 399101360 OBJECT_399101360_FRAME = 'NDOSL_BDAA_TOPO' TKFRAME_399101360_RELATIVE = 'ITRF93' TKFRAME_399101360_SPEC = 'ANGLES' TKFRAME_399101360_UNITS = 'DEGREES' TKFRAME_399101360_AXES = ( 3, 2, 3 ) TKFRAME_399101360_ANGLES = ( -295.3412103889000, -57.6488473889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BDAQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BDAQ_TOPO is centered at the site NDOSL_BDAQ, which has Cartesian coordinates X (km): 0.2308917525320E+04 Y (km): -0.4874299072465E+04 Z (km): 0.3393084419511E+04 and planetodetic coordinates Longitude (deg): -64.6534494722000 Latitude (deg): 32.3479431944000 Altitude (km): -0.9879999999074E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BDAQ_TOPO = 399104760 FRAME_399104760_NAME = 'NDOSL_BDAQ_TOPO' FRAME_399104760_CLASS = 4 FRAME_399104760_CLASS_ID = 399104760 FRAME_399104760_CENTER = 399104760 OBJECT_399104760_FRAME = 'NDOSL_BDAQ_TOPO' TKFRAME_399104760_RELATIVE = 'ITRF93' TKFRAME_399104760_SPEC = 'ANGLES' TKFRAME_399104760_UNITS = 'DEGREES' TKFRAME_399104760_AXES = ( 3, 2, 3 ) TKFRAME_399104760_ANGLES = ( -295.3465505278000, -57.6520568056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BDDQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BDDQ_TOPO is centered at the site NDOSL_BDDQ, which has Cartesian coordinates X (km): 0.2308917525320E+04 Y (km): -0.4874299072465E+04 Z (km): 0.3393084419511E+04 and planetodetic coordinates Longitude (deg): -64.6534494722000 Latitude (deg): 32.3479431944000 Altitude (km): -0.9879999999074E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BDDQ_TOPO = 399104760 FRAME_399104760_NAME = 'NDOSL_BDDQ_TOPO' FRAME_399104760_CLASS = 4 FRAME_399104760_CLASS_ID = 399104760 FRAME_399104760_CENTER = 399104760 OBJECT_399104760_FRAME = 'NDOSL_BDDQ_TOPO' TKFRAME_399104760_RELATIVE = 'ITRF93' TKFRAME_399104760_SPEC = 'ANGLES' TKFRAME_399104760_UNITS = 'DEGREES' TKFRAME_399104760_AXES = ( 3, 2, 3 ) TKFRAME_399104760_ANGLES = ( -295.3465505278000, -57.6520568056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BLKQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BLKQ_TOPO is centered at the site NDOSL_BLKQ, which has Cartesian coordinates X (km): -0.1277969620534E+04 Y (km): 0.3150719821469E+03 Z (km): -0.6220087376078E+04 and planetodetic coordinates Longitude (deg): 166.1504327778000 Latitude (deg): -78.1295788889000 Altitude (km): 0.1625120000009E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BLKQ_TOPO = 399104263 FRAME_399104263_NAME = 'NDOSL_BLKQ_TOPO' FRAME_399104263_CLASS = 4 FRAME_399104263_CLASS_ID = 399104263 FRAME_399104263_CENTER = 399104263 OBJECT_399104263_FRAME = 'NDOSL_BLKQ_TOPO' TKFRAME_399104263_RELATIVE = 'ITRF93' TKFRAME_399104263_SPEC = 'ANGLES' TKFRAME_399104263_UNITS = 'DEGREES' TKFRAME_399104263_AXES = ( 3, 2, 3 ) TKFRAME_399104263_ANGLES = ( -166.1504327778000, -168.1295788889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BLT3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BLT3_TOPO is centered at the site NDOSL_BLT3, which has Cartesian coordinates X (km): 0.1129800886094E+04 Y (km): -0.4833154905969E+04 Z (km): 0.3992194615946E+04 and planetodetic coordinates Longitude (deg): -76.8427667500000 Latitude (deg): 38.9984475000000 Altitude (km): 0.1833300000038E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BLT3_TOPO = 399101915 FRAME_399101915_NAME = 'NDOSL_BLT3_TOPO' FRAME_399101915_CLASS = 4 FRAME_399101915_CLASS_ID = 399101915 FRAME_399101915_CENTER = 399101915 OBJECT_399101915_FRAME = 'NDOSL_BLT3_TOPO' TKFRAME_399101915_RELATIVE = 'ITRF93' TKFRAME_399101915_SPEC = 'ANGLES' TKFRAME_399101915_UNITS = 'DEGREES' TKFRAME_399101915_AXES = ( 3, 2, 3 ) TKFRAME_399101915_ANGLES = ( -283.1572332500000, -51.0015525000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BLTA_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BLTA_TOPO is centered at the site NDOSL_BLTA, which has Cartesian coordinates X (km): 0.1129875045835E+04 Y (km): -0.4833157107448E+04 Z (km): 0.3992181451509E+04 and planetodetic coordinates Longitude (deg): -76.8419389444000 Latitude (deg): 38.9982475000000 Altitude (km): 0.2483400000092E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BLTA_TOPO = 399101316 FRAME_399101316_NAME = 'NDOSL_BLTA_TOPO' FRAME_399101316_CLASS = 4 FRAME_399101316_CLASS_ID = 399101316 FRAME_399101316_CENTER = 399101316 OBJECT_399101316_FRAME = 'NDOSL_BLTA_TOPO' TKFRAME_399101316_RELATIVE = 'ITRF93' TKFRAME_399101316_SPEC = 'ANGLES' TKFRAME_399101316_UNITS = 'DEGREES' TKFRAME_399101316_AXES = ( 3, 2, 3 ) TKFRAME_399101316_ANGLES = ( -283.1580610556000, -51.0017525000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BLTD_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BLTD_TOPO is centered at the site NDOSL_BLTD, which has Cartesian coordinates X (km): 0.1129800886094E+04 Y (km): -0.4833154905969E+04 Z (km): 0.3992194615946E+04 and planetodetic coordinates Longitude (deg): -76.8427667500000 Latitude (deg): 38.9984475000000 Altitude (km): 0.1833300000038E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BLTD_TOPO = 399101315 FRAME_399101315_NAME = 'NDOSL_BLTD_TOPO' FRAME_399101315_CLASS = 4 FRAME_399101315_CLASS_ID = 399101315 FRAME_399101315_CENTER = 399101315 OBJECT_399101315_FRAME = 'NDOSL_BLTD_TOPO' TKFRAME_399101315_RELATIVE = 'ITRF93' TKFRAME_399101315_SPEC = 'ANGLES' TKFRAME_399101315_UNITS = 'DEGREES' TKFRAME_399101315_AXES = ( 3, 2, 3 ) TKFRAME_399101315_ANGLES = ( -283.1572332500000, -51.0015525000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BLTJ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BLTJ_TOPO is centered at the site NDOSL_BLTJ, which has Cartesian coordinates X (km): 0.1130140531138E+04 Y (km): -0.4832766397701E+04 Z (km): 0.3992558862857E+04 and planetodetic coordinates Longitude (deg): -76.8379278333000 Latitude (deg): 39.0027035278000 Altitude (km): 0.1366000000030E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BLTJ_TOPO = 399100290 FRAME_399100290_NAME = 'NDOSL_BLTJ_TOPO' FRAME_399100290_CLASS = 4 FRAME_399100290_CLASS_ID = 399100290 FRAME_399100290_CENTER = 399100290 OBJECT_399100290_FRAME = 'NDOSL_BLTJ_TOPO' TKFRAME_399100290_RELATIVE = 'ITRF93' TKFRAME_399100290_SPEC = 'ANGLES' TKFRAME_399100290_UNITS = 'DEGREES' TKFRAME_399100290_AXES = ( 3, 2, 3 ) TKFRAME_399100290_ANGLES = ( -283.1620721667000, -50.9972964722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BP1K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BP1K_TOPO is centered at the site NDOSL_BP1K, which has Cartesian coordinates X (km): 0.1118275409157E+04 Y (km): -0.4876366416853E+04 Z (km): 0.3942862913335E+04 and planetodetic coordinates Longitude (deg): -77.0839425278000 Latitude (deg): 38.4291651944000 Altitude (km): -0.1573399999889E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BP1K_TOPO = 399104754 FRAME_399104754_NAME = 'NDOSL_BP1K_TOPO' FRAME_399104754_CLASS = 4 FRAME_399104754_CLASS_ID = 399104754 FRAME_399104754_CENTER = 399104754 OBJECT_399104754_FRAME = 'NDOSL_BP1K_TOPO' TKFRAME_399104754_RELATIVE = 'ITRF93' TKFRAME_399104754_SPEC = 'ANGLES' TKFRAME_399104754_UNITS = 'DEGREES' TKFRAME_399104754_AXES = ( 3, 2, 3 ) TKFRAME_399104754_ANGLES = ( -282.9160574722000, -51.5708348056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BP1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BP1S_TOPO is centered at the site NDOSL_BP1S, which has Cartesian coordinates X (km): 0.1118275409157E+04 Y (km): -0.4876366416853E+04 Z (km): 0.3942862913335E+04 and planetodetic coordinates Longitude (deg): -77.0839425278000 Latitude (deg): 38.4291651944000 Altitude (km): -0.1573399999889E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BP1S_TOPO = 399101322 FRAME_399101322_NAME = 'NDOSL_BP1S_TOPO' FRAME_399101322_CLASS = 4 FRAME_399101322_CLASS_ID = 399101322 FRAME_399101322_CENTER = 399101322 OBJECT_399101322_FRAME = 'NDOSL_BP1S_TOPO' TKFRAME_399101322_RELATIVE = 'ITRF93' TKFRAME_399101322_SPEC = 'ANGLES' TKFRAME_399101322_UNITS = 'DEGREES' TKFRAME_399101322_AXES = ( 3, 2, 3 ) TKFRAME_399101322_ANGLES = ( -282.9160574722000, -51.5708348056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BP2K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BP2K_TOPO is centered at the site NDOSL_BP2K, which has Cartesian coordinates X (km): 0.1118281368214E+04 Y (km): -0.4876392250071E+04 Z (km): 0.3942829484279E+04 and planetodetic coordinates Longitude (deg): -77.0839421389000 Latitude (deg): 38.4287808333000 Altitude (km): -0.1574299999933E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BP2K_TOPO = 399104755 FRAME_399104755_NAME = 'NDOSL_BP2K_TOPO' FRAME_399104755_CLASS = 4 FRAME_399104755_CLASS_ID = 399104755 FRAME_399104755_CENTER = 399104755 OBJECT_399104755_FRAME = 'NDOSL_BP2K_TOPO' TKFRAME_399104755_RELATIVE = 'ITRF93' TKFRAME_399104755_SPEC = 'ANGLES' TKFRAME_399104755_UNITS = 'DEGREES' TKFRAME_399104755_AXES = ( 3, 2, 3 ) TKFRAME_399104755_ANGLES = ( -282.9160578611000, -51.5712191667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BP2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BP2S_TOPO is centered at the site NDOSL_BP2S, which has Cartesian coordinates X (km): 0.1118281368214E+04 Y (km): -0.4876392250071E+04 Z (km): 0.3942829484279E+04 and planetodetic coordinates Longitude (deg): -77.0839421389000 Latitude (deg): 38.4287808333000 Altitude (km): -0.1574299999933E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BP2S_TOPO = 399101323 FRAME_399101323_NAME = 'NDOSL_BP2S_TOPO' FRAME_399101323_CLASS = 4 FRAME_399101323_CLASS_ID = 399101323 FRAME_399101323_CENTER = 399101323 OBJECT_399101323_FRAME = 'NDOSL_BP2S_TOPO' TKFRAME_399101323_RELATIVE = 'ITRF93' TKFRAME_399101323_SPEC = 'ANGLES' TKFRAME_399101323_UNITS = 'DEGREES' TKFRAME_399101323_AXES = ( 3, 2, 3 ) TKFRAME_399101323_ANGLES = ( -282.9160578611000, -51.5712191667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BREQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BREQ_TOPO is centered at the site NDOSL_BREQ, which has Cartesian coordinates X (km): 0.3885153651740E+04 Y (km): -0.5028532402836E+04 Z (km): 0.5465566315873E+03 and planetodetic coordinates Longitude (deg): -52.3095442778000 Latitude (deg): 4.9488789167000 Altitude (km): 0.5195999999795E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BREQ_TOPO = 399104283 FRAME_399104283_NAME = 'NDOSL_BREQ_TOPO' FRAME_399104283_CLASS = 4 FRAME_399104283_CLASS_ID = 399104283 FRAME_399104283_CENTER = 399104283 OBJECT_399104283_FRAME = 'NDOSL_BREQ_TOPO' TKFRAME_399104283_RELATIVE = 'ITRF93' TKFRAME_399104283_SPEC = 'ANGLES' TKFRAME_399104283_UNITS = 'DEGREES' TKFRAME_399104283_AXES = ( 3, 2, 3 ) TKFRAME_399104283_ANGLES = ( -307.6904557222000, -85.0511210833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_BRKS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_BRKS_TOPO is centered at the site NDOSL_BRKS, which has Cartesian coordinates X (km): -0.2689383333943E+04 Y (km): -0.4263604398398E+04 Z (km): 0.3895104129125E+04 and planetodetic coordinates Longitude (deg): -122.2427838056000 Latitude (deg): 37.8793765833000 Altitude (km): 0.3570339999984E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_BRKS_TOPO = 399101732 FRAME_399101732_NAME = 'NDOSL_BRKS_TOPO' FRAME_399101732_CLASS = 4 FRAME_399101732_CLASS_ID = 399101732 FRAME_399101732_CENTER = 399101732 OBJECT_399101732_FRAME = 'NDOSL_BRKS_TOPO' TKFRAME_399101732_RELATIVE = 'ITRF93' TKFRAME_399101732_SPEC = 'ANGLES' TKFRAME_399101732_UNITS = 'DEGREES' TKFRAME_399101732_AXES = ( 3, 2, 3 ) TKFRAME_399101732_ANGLES = ( -237.7572161943999, -52.1206234167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CA2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CA2F_TOPO is centered at the site NDOSL_CA2F, which has Cartesian coordinates X (km): -0.2673130818043E+04 Y (km): -0.4527026645420E+04 Z (km): 0.3600234982946E+04 and planetodetic coordinates Longitude (deg): -120.5611148889000 Latitude (deg): 34.5830283333000 Altitude (km): 0.6275500000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CA2F_TOPO = 399104241 FRAME_399104241_NAME = 'NDOSL_CA2F_TOPO' FRAME_399104241_CLASS = 4 FRAME_399104241_CLASS_ID = 399104241 FRAME_399104241_CENTER = 399104241 OBJECT_399104241_FRAME = 'NDOSL_CA2F_TOPO' TKFRAME_399104241_RELATIVE = 'ITRF93' TKFRAME_399104241_SPEC = 'ANGLES' TKFRAME_399104241_UNITS = 'DEGREES' TKFRAME_399104241_AXES = ( 3, 2, 3 ) TKFRAME_399104241_ANGLES = ( -239.4388851111000, -55.4169716667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CALF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CALF_TOPO is centered at the site NDOSL_CALF, which has Cartesian coordinates X (km): -0.2673176235469E+04 Y (km): -0.4527021008973E+04 Z (km): 0.3600208508747E+04 and planetodetic coordinates Longitude (deg): -120.5615723333000 Latitude (deg): 34.5827385556000 Altitude (km): 0.6275400000016E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CALF_TOPO = 399104018 FRAME_399104018_NAME = 'NDOSL_CALF_TOPO' FRAME_399104018_CLASS = 4 FRAME_399104018_CLASS_ID = 399104018 FRAME_399104018_CENTER = 399104018 OBJECT_399104018_FRAME = 'NDOSL_CALF_TOPO' TKFRAME_399104018_RELATIVE = 'ITRF93' TKFRAME_399104018_SPEC = 'ANGLES' TKFRAME_399104018_UNITS = 'DEGREES' TKFRAME_399104018_AXES = ( 3, 2, 3 ) TKFRAME_399104018_ANGLES = ( -239.4384276667000, -55.4172614444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CALT_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CALT_TOPO is centered at the site NDOSL_CALT, which has Cartesian coordinates X (km): -0.2671855503997E+04 Y (km): -0.4521201671439E+04 Z (km): 0.3607489148791E+04 and planetodetic coordinates Longitude (deg): -120.5814466944000 Latitude (deg): 34.6658445000000 Altitude (km): 0.8852000000087E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CALT_TOPO = 399104280 FRAME_399104280_NAME = 'NDOSL_CALT_TOPO' FRAME_399104280_CLASS = 4 FRAME_399104280_CLASS_ID = 399104280 FRAME_399104280_CENTER = 399104280 OBJECT_399104280_FRAME = 'NDOSL_CALT_TOPO' TKFRAME_399104280_RELATIVE = 'ITRF93' TKFRAME_399104280_SPEC = 'ANGLES' TKFRAME_399104280_UNITS = 'DEGREES' TKFRAME_399104280_AXES = ( 3, 2, 3 ) TKFRAME_399104280_ANGLES = ( -239.4185533056000, -55.3341555000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CALY_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CALY_TOPO is centered at the site NDOSL_CALY, which has Cartesian coordinates X (km): -0.2668935245759E+04 Y (km): -0.4530769741214E+04 Z (km): 0.3598643008078E+04 and planetodetic coordinates Longitude (deg): -120.5010130833000 Latitude (deg): 34.5656237500000 Altitude (km): 0.6239100000012E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CALY_TOPO = 399101835 FRAME_399101835_NAME = 'NDOSL_CALY_TOPO' FRAME_399101835_CLASS = 4 FRAME_399101835_CLASS_ID = 399101835 FRAME_399101835_CENTER = 399101835 OBJECT_399101835_FRAME = 'NDOSL_CALY_TOPO' TKFRAME_399101835_RELATIVE = 'ITRF93' TKFRAME_399101835_SPEC = 'ANGLES' TKFRAME_399101835_UNITS = 'DEGREES' TKFRAME_399101835_AXES = ( 3, 2, 3 ) TKFRAME_399101835_ANGLES = ( -239.4989869166999, -55.4343762500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CANS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CANS_TOPO is centered at the site NDOSL_CANS, which has Cartesian coordinates X (km): -0.4460849015404E+04 Y (km): 0.2682144084093E+04 Z (km): -0.3674945825989E+04 and planetodetic coordinates Longitude (deg): 148.9830580000000 Latitude (deg): -35.4046666667000 Altitude (km): 0.6800000000018E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CANS_TOPO = 399104723 FRAME_399104723_NAME = 'NDOSL_CANS_TOPO' FRAME_399104723_CLASS = 4 FRAME_399104723_CLASS_ID = 399104723 FRAME_399104723_CENTER = 399104723 OBJECT_399104723_FRAME = 'NDOSL_CANS_TOPO' TKFRAME_399104723_RELATIVE = 'ITRF93' TKFRAME_399104723_SPEC = 'ANGLES' TKFRAME_399104723_UNITS = 'DEGREES' TKFRAME_399104723_AXES = ( 3, 2, 3 ) TKFRAME_399104723_ANGLES = ( -148.9830580000000, -125.4046666667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CB1D_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CB1D_TOPO is centered at the site NDOSL_CB1D, which has Cartesian coordinates X (km): 0.4846733804678E+04 Y (km): -0.3701744846941E+03 Z (km): 0.4116878982704E+04 and planetodetic coordinates Longitude (deg): -4.3675472778000 Latitude (deg): 40.4526908333000 Altitude (km): 0.7940729999996E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CB1D_TOPO = 399101567 FRAME_399101567_NAME = 'NDOSL_CB1D_TOPO' FRAME_399101567_CLASS = 4 FRAME_399101567_CLASS_ID = 399101567 FRAME_399101567_CENTER = 399101567 OBJECT_399101567_FRAME = 'NDOSL_CB1D_TOPO' TKFRAME_399101567_RELATIVE = 'ITRF93' TKFRAME_399101567_SPEC = 'ANGLES' TKFRAME_399101567_UNITS = 'DEGREES' TKFRAME_399101567_AXES = ( 3, 2, 3 ) TKFRAME_399101567_ANGLES = ( -355.6324527222001, -49.5473091667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CHAS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CHAS_TOPO is centered at the site NDOSL_CHAS, which has Cartesian coordinates X (km): 0.1080837968491E+04 Y (km): -0.4852161998076E+04 Z (km): 0.3982933025361E+04 and planetodetic coordinates Longitude (deg): -77.4421666667000 Latitude (deg): 38.8903333333000 Altitude (km): 0.1350000000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CHAS_TOPO = 399101340 FRAME_399101340_NAME = 'NDOSL_CHAS_TOPO' FRAME_399101340_CLASS = 4 FRAME_399101340_CLASS_ID = 399101340 FRAME_399101340_CENTER = 399101340 OBJECT_399101340_FRAME = 'NDOSL_CHAS_TOPO' TKFRAME_399101340_RELATIVE = 'ITRF93' TKFRAME_399101340_SPEC = 'ANGLES' TKFRAME_399101340_UNITS = 'DEGREES' TKFRAME_399101340_AXES = ( 3, 2, 3 ) TKFRAME_399101340_ANGLES = ( -282.5578333333000, -51.1096666667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CN2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CN2F_TOPO is centered at the site NDOSL_CN2F, which has Cartesian coordinates X (km): 0.9168347200147E+03 Y (km): -0.5532493422240E+04 Z (km): 0.3028118731326E+04 and planetodetic coordinates Longitude (deg): -80.5905616389000 Latitude (deg): 28.5288721944000 Altitude (km): -0.2047099999971E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CN2F_TOPO = 399104088 FRAME_399104088_NAME = 'NDOSL_CN2F_TOPO' FRAME_399104088_CLASS = 4 FRAME_399104088_CLASS_ID = 399104088 FRAME_399104088_CENTER = 399104088 OBJECT_399104088_FRAME = 'NDOSL_CN2F_TOPO' TKFRAME_399104088_RELATIVE = 'ITRF93' TKFRAME_399104088_SPEC = 'ANGLES' TKFRAME_399104088_UNITS = 'DEGREES' TKFRAME_399104088_AXES = ( 3, 2, 3 ) TKFRAME_399104088_ANGLES = ( -279.4094383611000, -61.4711278056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CN4F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CN4F_TOPO is centered at the site NDOSL_CN4F, which has Cartesian coordinates X (km): 0.9181233435296E+03 Y (km): -0.5535806389700E+04 Z (km): 0.3021721802856E+04 and planetodetic coordinates Longitude (deg): -80.5831114722000 Latitude (deg): 28.4631679167000 Altitude (km): -0.1480999999887E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CN4F_TOPO = 399104223 FRAME_399104223_NAME = 'NDOSL_CN4F_TOPO' FRAME_399104223_CLASS = 4 FRAME_399104223_CLASS_ID = 399104223 FRAME_399104223_CENTER = 399104223 OBJECT_399104223_FRAME = 'NDOSL_CN4F_TOPO' TKFRAME_399104223_RELATIVE = 'ITRF93' TKFRAME_399104223_SPEC = 'ANGLES' TKFRAME_399104223_UNITS = 'DEGREES' TKFRAME_399104223_AXES = ( 3, 2, 3 ) TKFRAME_399104223_ANGLES = ( -279.4168885278000, -61.5368320833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CN5F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CN5F_TOPO is centered at the site NDOSL_CN5F, which has Cartesian coordinates X (km): 0.9195631525307E+03 Y (km): -0.5532706612436E+04 Z (km): 0.3026981348752E+04 and planetodetic coordinates Longitude (deg): -80.5634198889000 Latitude (deg): 28.5170243889000 Altitude (km): 0.1369000000218E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CN5F_TOPO = 399104344 FRAME_399104344_NAME = 'NDOSL_CN5F_TOPO' FRAME_399104344_CLASS = 4 FRAME_399104344_CLASS_ID = 399104344 FRAME_399104344_CENTER = 399104344 OBJECT_399104344_FRAME = 'NDOSL_CN5F_TOPO' TKFRAME_399104344_RELATIVE = 'ITRF93' TKFRAME_399104344_SPEC = 'ANGLES' TKFRAME_399104344_UNITS = 'DEGREES' TKFRAME_399104344_AXES = ( 3, 2, 3 ) TKFRAME_399104344_ANGLES = ( -279.4365801111000, -61.4829756111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CNVF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CNVF_TOPO is centered at the site NDOSL_CNVF, which has Cartesian coordinates X (km): 0.9186018227178E+03 Y (km): -0.5534740042383E+04 Z (km): 0.3023518348495E+04 and planetodetic coordinates Longitude (deg): -80.5765091667000 Latitude (deg): 28.4816058889000 Altitude (km): -0.1422000000049E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CNVF_TOPO = 399104041 FRAME_399104041_NAME = 'NDOSL_CNVF_TOPO' FRAME_399104041_CLASS = 4 FRAME_399104041_CLASS_ID = 399104041 FRAME_399104041_CENTER = 399104041 OBJECT_399104041_FRAME = 'NDOSL_CNVF_TOPO' TKFRAME_399104041_RELATIVE = 'ITRF93' TKFRAME_399104041_SPEC = 'ANGLES' TKFRAME_399104041_UNITS = 'DEGREES' TKFRAME_399104041_AXES = ( 3, 2, 3 ) TKFRAME_399104041_ANGLES = ( -279.4234908333000, -61.5183941111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_COCS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_COCS_TOPO is centered at the site NDOSL_COCS, which has Cartesian coordinates X (km): -0.7436541783481E+03 Y (km): 0.6190517723858E+04 Z (km): -0.1339035599467E+04 and planetodetic coordinates Longitude (deg): 96.8500000000000 Latitude (deg): -12.2000000000000 Altitude (km): -0.0000000000000E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_COCS_TOPO = 399104085 FRAME_399104085_NAME = 'NDOSL_COCS_TOPO' FRAME_399104085_CLASS = 4 FRAME_399104085_CLASS_ID = 399104085 FRAME_399104085_CENTER = 399104085 OBJECT_399104085_FRAME = 'NDOSL_COCS_TOPO' TKFRAME_399104085_RELATIVE = 'ITRF93' TKFRAME_399104085_SPEC = 'ANGLES' TKFRAME_399104085_UNITS = 'DEGREES' TKFRAME_399104085_AXES = ( 3, 2, 3 ) TKFRAME_399104085_ANGLES = ( -96.8500000000000, -102.2000000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CT2J_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CT2J_TOPO is centered at the site NDOSL_CT2J, which has Cartesian coordinates X (km): -0.1539392790070E+04 Y (km): -0.5160974944122E+04 Z (km): 0.3408148382413E+04 and planetodetic coordinates Longitude (deg): -106.6085571944000 Latitude (deg): 32.5004921111000 Altitude (km): 0.1450172000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CT2J_TOPO = 399100294 FRAME_399100294_NAME = 'NDOSL_CT2J_TOPO' FRAME_399100294_CLASS = 4 FRAME_399100294_CLASS_ID = 399100294 FRAME_399100294_CENTER = 399100294 OBJECT_399100294_FRAME = 'NDOSL_CT2J_TOPO' TKFRAME_399100294_RELATIVE = 'ITRF93' TKFRAME_399100294_SPEC = 'ANGLES' TKFRAME_399100294_UNITS = 'DEGREES' TKFRAME_399100294_AXES = ( 3, 2, 3 ) TKFRAME_399100294_ANGLES = ( -253.3914428056000, -57.4995078889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CTSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CTSS_TOPO is centered at the site NDOSL_CTSS, which has Cartesian coordinates X (km): -0.1248871410019E+04 Y (km): -0.4819147898525E+04 Z (km): 0.3976751405056E+04 and planetodetic coordinates Longitude (deg): -104.5284691389000 Latitude (deg): 38.8059884167000 Altitude (km): 0.1907519000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CTSS_TOPO = 399101756 FRAME_399101756_NAME = 'NDOSL_CTSS_TOPO' FRAME_399101756_CLASS = 4 FRAME_399101756_CLASS_ID = 399101756 FRAME_399101756_CENTER = 399101756 OBJECT_399101756_FRAME = 'NDOSL_CTSS_TOPO' TKFRAME_399101756_RELATIVE = 'ITRF93' TKFRAME_399101756_SPEC = 'ANGLES' TKFRAME_399101756_UNITS = 'DEGREES' TKFRAME_399101756_AXES = ( 3, 2, 3 ) TKFRAME_399101756_ANGLES = ( -255.4715308611000, -51.1940115833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_CTVJ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_CTVJ_TOPO is centered at the site NDOSL_CTVJ, which has Cartesian coordinates X (km): -0.1539392790070E+04 Y (km): -0.5160974944122E+04 Z (km): 0.3408148382413E+04 and planetodetic coordinates Longitude (deg): -106.6085571944000 Latitude (deg): 32.5004921111000 Altitude (km): 0.1450172000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_CTVJ_TOPO = 399100293 FRAME_399100293_NAME = 'NDOSL_CTVJ_TOPO' FRAME_399100293_CLASS = 4 FRAME_399100293_CLASS_ID = 399100293 FRAME_399100293_CENTER = 399100293 OBJECT_399100293_FRAME = 'NDOSL_CTVJ_TOPO' TKFRAME_399100293_RELATIVE = 'ITRF93' TKFRAME_399100293_SPEC = 'ANGLES' TKFRAME_399100293_UNITS = 'DEGREES' TKFRAME_399100293_AXES = ( 3, 2, 3 ) TKFRAME_399100293_ANGLES = ( -253.3914428056000, -57.4995078889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_D26D_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_D26D_TOPO is centered at the site NDOSL_D26D, which has Cartesian coordinates X (km): -0.2354890799712E+04 Y (km): -0.4647166317172E+04 Z (km): 0.3668871754592E+04 and planetodetic coordinates Longitude (deg): -116.8730165000000 Latitude (deg): 35.3356892222000 Altitude (km): 0.9686860000009E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_D26D_TOPO = 399101526 FRAME_399101526_NAME = 'NDOSL_D26D_TOPO' FRAME_399101526_CLASS = 4 FRAME_399101526_CLASS_ID = 399101526 FRAME_399101526_CENTER = 399101526 OBJECT_399101526_FRAME = 'NDOSL_D26D_TOPO' TKFRAME_399101526_RELATIVE = 'ITRF93' TKFRAME_399101526_SPEC = 'ANGLES' TKFRAME_399101526_UNITS = 'DEGREES' TKFRAME_399101526_AXES = ( 3, 2, 3 ) TKFRAME_399101526_ANGLES = ( -243.1269835000000, -54.6643107778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_D27D_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_D27D_TOPO is centered at the site NDOSL_D27D, which has Cartesian coordinates X (km): -0.2349915426958E+04 Y (km): -0.4656756405659E+04 Z (km): 0.3660096468533E+04 and planetodetic coordinates Longitude (deg): -116.7766504444000 Latitude (deg): 35.2382717778000 Altitude (km): 0.1052468000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_D27D_TOPO = 399101516 FRAME_399101516_NAME = 'NDOSL_D27D_TOPO' FRAME_399101516_CLASS = 4 FRAME_399101516_CLASS_ID = 399101516 FRAME_399101516_CENTER = 399101516 OBJECT_399101516_FRAME = 'NDOSL_D27D_TOPO' TKFRAME_399101516_RELATIVE = 'ITRF93' TKFRAME_399101516_SPEC = 'ANGLES' TKFRAME_399101516_UNITS = 'DEGREES' TKFRAME_399101516_AXES = ( 3, 2, 3 ) TKFRAME_399101516_ANGLES = ( -243.2233495556000, -54.7617282222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_D36D_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_D36D_TOPO is centered at the site NDOSL_D36D, which has Cartesian coordinates X (km): -0.4461168413700E+04 Y (km): 0.2682814660289E+04 Z (km): -0.3674083899828E+04 and planetodetic coordinates Longitude (deg): 148.9785441944000 Latitude (deg): -35.3951017500000 Altitude (km): 0.6855030000002E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_D36D_TOPO = 399101536 FRAME_399101536_NAME = 'NDOSL_D36D_TOPO' FRAME_399101536_CLASS = 4 FRAME_399101536_CLASS_ID = 399101536 FRAME_399101536_CENTER = 399101536 OBJECT_399101536_FRAME = 'NDOSL_D36D_TOPO' TKFRAME_399101536_RELATIVE = 'ITRF93' TKFRAME_399101536_SPEC = 'ANGLES' TKFRAME_399101536_UNITS = 'DEGREES' TKFRAME_399101536_AXES = ( 3, 2, 3 ) TKFRAME_399101536_ANGLES = ( -148.9785441944000, -125.3951017500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DAKS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DAKS_TOPO is centered at the site NDOSL_DAKS, which has Cartesian coordinates X (km): 0.5896416179581E+04 Y (km): -0.1817215614022E+04 Z (km): 0.1610687892399E+04 and planetodetic coordinates Longitude (deg): -17.1287668889000 Latitude (deg): 14.7247622222000 Altitude (km): 0.9127800000127E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DAKS_TOPO = 399104072 FRAME_399104072_NAME = 'NDOSL_DAKS_TOPO' FRAME_399104072_CLASS = 4 FRAME_399104072_CLASS_ID = 399104072 FRAME_399104072_CENTER = 399104072 OBJECT_399104072_FRAME = 'NDOSL_DAKS_TOPO' TKFRAME_399104072_RELATIVE = 'ITRF93' TKFRAME_399104072_SPEC = 'ANGLES' TKFRAME_399104072_UNITS = 'DEGREES' TKFRAME_399104072_AXES = ( 3, 2, 3 ) TKFRAME_399104072_ANGLES = ( -342.8712331111000, -75.2752377778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DFRS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DFRS_TOPO is centered at the site NDOSL_DFRS, which has Cartesian coordinates X (km): -0.2448209704450E+04 Y (km): -0.4626324557143E+04 Z (km): 0.3633692143422E+04 and planetodetic coordinates Longitude (deg): -117.8873940556000 Latitude (deg): 34.9497907500000 Altitude (km): 0.6799070000017E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DFRS_TOPO = 399104067 FRAME_399104067_NAME = 'NDOSL_DFRS_TOPO' FRAME_399104067_CLASS = 4 FRAME_399104067_CLASS_ID = 399104067 FRAME_399104067_CENTER = 399104067 OBJECT_399104067_FRAME = 'NDOSL_DFRS_TOPO' TKFRAME_399104067_RELATIVE = 'ITRF93' TKFRAME_399104067_SPEC = 'ANGLES' TKFRAME_399104067_UNITS = 'DEGREES' TKFRAME_399104067_AXES = ( 3, 2, 3 ) TKFRAME_399104067_ANGLES = ( -242.1126059444000, -55.0502092500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DGIS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DGIS_TOPO is centered at the site NDOSL_DGIS, which has Cartesian coordinates X (km): 0.1916292209217E+04 Y (km): 0.6029961560455E+04 Z (km): -0.8017573437647E+03 and planetodetic coordinates Longitude (deg): 72.3699986111000 Latitude (deg): -7.2700305556000 Altitude (km): -0.6837499999933E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DGIS_TOPO = 399104073 FRAME_399104073_NAME = 'NDOSL_DGIS_TOPO' FRAME_399104073_CLASS = 4 FRAME_399104073_CLASS_ID = 399104073 FRAME_399104073_CENTER = 399104073 OBJECT_399104073_FRAME = 'NDOSL_DGIS_TOPO' TKFRAME_399104073_RELATIVE = 'ITRF93' TKFRAME_399104073_SPEC = 'ANGLES' TKFRAME_399104073_UNITS = 'DEGREES' TKFRAME_399104073_AXES = ( 3, 2, 3 ) TKFRAME_399104073_ANGLES = ( -72.3699986111000, -97.2700305556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS12_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS12_TOPO is centered at the site NDOSL_DS12, which has Cartesian coordinates X (km): -0.2350442982059E+04 Y (km): -0.4651987982253E+04 Z (km): 0.3665635485603E+04 and planetodetic coordinates Longitude (deg): -116.8054433889000 Latitude (deg): 35.2999394167000 Altitude (km): 0.9696690000014E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS12_TOPO = 399101612 FRAME_399101612_NAME = 'NDOSL_DS12_TOPO' FRAME_399101612_CLASS = 4 FRAME_399101612_CLASS_ID = 399101612 FRAME_399101612_CENTER = 399101612 OBJECT_399101612_FRAME = 'NDOSL_DS12_TOPO' TKFRAME_399101612_RELATIVE = 'ITRF93' TKFRAME_399101612_SPEC = 'ANGLES' TKFRAME_399101612_UNITS = 'DEGREES' TKFRAME_399101612_AXES = ( 3, 2, 3 ) TKFRAME_399101612_ANGLES = ( -243.1945566111000, -54.7000605833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS14_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS14_TOPO is centered at the site NDOSL_DS14, which has Cartesian coordinates X (km): -0.2353621420784E+04 Y (km): -0.4641341471174E+04 Z (km): 0.3677052316842E+04 and planetodetic coordinates Longitude (deg): -116.8895382222000 Latitude (deg): 35.4259008611000 Altitude (km): 0.1001390000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS14_TOPO = 399101514 FRAME_399101514_NAME = 'NDOSL_DS14_TOPO' FRAME_399101514_CLASS = 4 FRAME_399101514_CLASS_ID = 399101514 FRAME_399101514_CENTER = 399101514 OBJECT_399101514_FRAME = 'NDOSL_DS14_TOPO' TKFRAME_399101514_RELATIVE = 'ITRF93' TKFRAME_399101514_SPEC = 'ANGLES' TKFRAME_399101514_UNITS = 'DEGREES' TKFRAME_399101514_AXES = ( 3, 2, 3 ) TKFRAME_399101514_ANGLES = ( -243.1104617778000, -54.5740991389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS15_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS15_TOPO is centered at the site NDOSL_DS15, which has Cartesian coordinates X (km): -0.2353538958093E+04 Y (km): -0.4641649428302E+04 Z (km): 0.3676669983657E+04 and planetodetic coordinates Longitude (deg): -116.8871951111000 Latitude (deg): 35.4218532778000 Altitude (km): 0.9732110000007E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS15_TOPO = 399101515 FRAME_399101515_NAME = 'NDOSL_DS15_TOPO' FRAME_399101515_CLASS = 4 FRAME_399101515_CLASS_ID = 399101515 FRAME_399101515_CENTER = 399101515 OBJECT_399101515_FRAME = 'NDOSL_DS15_TOPO' TKFRAME_399101515_RELATIVE = 'ITRF93' TKFRAME_399101515_SPEC = 'ANGLES' TKFRAME_399101515_UNITS = 'DEGREES' TKFRAME_399101515_AXES = ( 3, 2, 3 ) TKFRAME_399101515_ANGLES = ( -243.1128048889000, -54.5781467222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS16_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS16_TOPO is centered at the site NDOSL_DS16, which has Cartesian coordinates X (km): -0.2354763325899E+04 Y (km): -0.4646787383681E+04 Z (km): 0.3669387009467E+04 and planetodetic coordinates Longitude (deg): -116.8736497500000 Latitude (deg): 35.3415393889000 Altitude (km): 0.9439769999984E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS16_TOPO = 399101312 FRAME_399101312_NAME = 'NDOSL_DS16_TOPO' FRAME_399101312_CLASS = 4 FRAME_399101312_CLASS_ID = 399101312 FRAME_399101312_CENTER = 399101312 OBJECT_399101312_FRAME = 'NDOSL_DS16_TOPO' TKFRAME_399101312_RELATIVE = 'ITRF93' TKFRAME_399101312_SPEC = 'ANGLES' TKFRAME_399101312_UNITS = 'DEGREES' TKFRAME_399101312_AXES = ( 3, 2, 3 ) TKFRAME_399101312_ANGLES = ( -243.1263502500000, -54.6584606111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS17_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS17_TOPO is centered at the site NDOSL_DS17, which has Cartesian coordinates X (km): -0.2354727047597E+04 Y (km): -0.4646754909654E+04 Z (km): 0.3669448776599E+04 and planetodetic coordinates Longitude (deg): -116.8734552778000 Latitude (deg): 35.3422299444000 Altitude (km): 0.9427009999990E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS17_TOPO = 399101327 FRAME_399101327_NAME = 'NDOSL_DS17_TOPO' FRAME_399101327_CLASS = 4 FRAME_399101327_CLASS_ID = 399101327 FRAME_399101327_CENTER = 399101327 OBJECT_399101327_FRAME = 'NDOSL_DS17_TOPO' TKFRAME_399101327_RELATIVE = 'ITRF93' TKFRAME_399101327_SPEC = 'ANGLES' TKFRAME_399101327_UNITS = 'DEGREES' TKFRAME_399101327_AXES = ( 3, 2, 3 ) TKFRAME_399101327_ANGLES = ( -243.1265447222000, -54.6577700556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS24_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS24_TOPO is centered at the site NDOSL_DS24, which has Cartesian coordinates X (km): -0.2354906707569E+04 Y (km): -0.4646840082462E+04 Z (km): 0.3669242321198E+04 and planetodetic coordinates Longitude (deg): -116.8747944167000 Latitude (deg): 35.3398928333000 Altitude (km): 0.9514990000000E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS24_TOPO = 399104252 FRAME_399104252_NAME = 'NDOSL_DS24_TOPO' FRAME_399104252_CLASS = 4 FRAME_399104252_CLASS_ID = 399104252 FRAME_399104252_CENTER = 399104252 OBJECT_399104252_FRAME = 'NDOSL_DS24_TOPO' TKFRAME_399104252_RELATIVE = 'ITRF93' TKFRAME_399104252_SPEC = 'ANGLES' TKFRAME_399104252_UNITS = 'DEGREES' TKFRAME_399104252_AXES = ( 3, 2, 3 ) TKFRAME_399104252_ANGLES = ( -243.1252055832999, -54.6601071667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS25_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS25_TOPO is centered at the site NDOSL_DS25, which has Cartesian coordinates X (km): -0.2355022012905E+04 Y (km): -0.4646953203886E+04 Z (km): 0.3669040567418E+04 and planetodetic coordinates Longitude (deg): -116.8753631944000 Latitude (deg): 35.3376119722000 Altitude (km): 0.9596340000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS25_TOPO = 399101525 FRAME_399101525_NAME = 'NDOSL_DS25_TOPO' FRAME_399101525_CLASS = 4 FRAME_399101525_CLASS_ID = 399101525 FRAME_399101525_CENTER = 399101525 OBJECT_399101525_FRAME = 'NDOSL_DS25_TOPO' TKFRAME_399101525_RELATIVE = 'ITRF93' TKFRAME_399101525_SPEC = 'ANGLES' TKFRAME_399101525_UNITS = 'DEGREES' TKFRAME_399101525_AXES = ( 3, 2, 3 ) TKFRAME_399101525_ANGLES = ( -243.1246368055999, -54.6623880278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS34_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS34_TOPO is centered at the site NDOSL_DS34, which has Cartesian coordinates X (km): -0.4461147092512E+04 Y (km): 0.2682439239036E+04 Z (km): -0.3674393132170E+04 and planetodetic coordinates Longitude (deg): 148.9819644167000 Latitude (deg): -35.3984788333000 Altitude (km): 0.6920200000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS34_TOPO = 399101534 FRAME_399101534_NAME = 'NDOSL_DS34_TOPO' FRAME_399101534_CLASS = 4 FRAME_399101534_CLASS_ID = 399101534 FRAME_399101534_CENTER = 399101534 OBJECT_399101534_FRAME = 'NDOSL_DS34_TOPO' TKFRAME_399101534_RELATIVE = 'ITRF93' TKFRAME_399101534_SPEC = 'ANGLES' TKFRAME_399101534_UNITS = 'DEGREES' TKFRAME_399101534_AXES = ( 3, 2, 3 ) TKFRAME_399101534_ANGLES = ( -148.9819644167000, -125.3984788333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS35_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS35_TOPO is centered at the site NDOSL_DS35, which has Cartesian coordinates X (km): -0.4461273085420E+04 Y (km): 0.2682568918145E+04 Z (km): -0.3674152089657E+04 and planetodetic coordinates Longitude (deg): 148.9814558056000 Latitude (deg): -35.3957955278000 Altitude (km): 0.6948890000001E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS35_TOPO = 399101535 FRAME_399101535_NAME = 'NDOSL_DS35_TOPO' FRAME_399101535_CLASS = 4 FRAME_399101535_CLASS_ID = 399101535 FRAME_399101535_CENTER = 399101535 OBJECT_399101535_FRAME = 'NDOSL_DS35_TOPO' TKFRAME_399101535_RELATIVE = 'ITRF93' TKFRAME_399101535_SPEC = 'ANGLES' TKFRAME_399101535_UNITS = 'DEGREES' TKFRAME_399101535_AXES = ( 3, 2, 3 ) TKFRAME_399101535_ANGLES = ( -148.9814558056000, -125.3957955278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS42_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS42_TOPO is centered at the site NDOSL_DS42, which has Cartesian coordinates X (km): -0.4460986834771E+04 Y (km): 0.2682419228197E+04 Z (km): -0.3674588361860E+04 and planetodetic coordinates Longitude (deg): 148.9812441944000 Latitude (deg): -35.4006838611000 Altitude (km): 0.6847549999998E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS42_TOPO = 399101547 FRAME_399101547_NAME = 'NDOSL_DS42_TOPO' FRAME_399101547_CLASS = 4 FRAME_399101547_CLASS_ID = 399101547 FRAME_399101547_CENTER = 399101547 OBJECT_399101547_FRAME = 'NDOSL_DS42_TOPO' TKFRAME_399101547_RELATIVE = 'ITRF93' TKFRAME_399101547_SPEC = 'ANGLES' TKFRAME_399101547_UNITS = 'DEGREES' TKFRAME_399101547_AXES = ( 3, 2, 3 ) TKFRAME_399101547_ANGLES = ( -148.9812441944000, -125.4006838611000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS43_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS43_TOPO is centered at the site NDOSL_DS43, which has Cartesian coordinates X (km): -0.4460894917206E+04 Y (km): 0.2682361507618E+04 Z (km): -0.3674748150536E+04 and planetodetic coordinates Longitude (deg): 148.9812673056000 Latitude (deg): -35.4024242222000 Altitude (km): 0.6888670000012E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS43_TOPO = 399101548 FRAME_399101548_NAME = 'NDOSL_DS43_TOPO' FRAME_399101548_CLASS = 4 FRAME_399101548_CLASS_ID = 399101548 FRAME_399101548_CENTER = 399101548 OBJECT_399101548_FRAME = 'NDOSL_DS43_TOPO' TKFRAME_399101548_RELATIVE = 'ITRF93' TKFRAME_399101548_SPEC = 'ANGLES' TKFRAME_399101548_UNITS = 'DEGREES' TKFRAME_399101548_AXES = ( 3, 2, 3 ) TKFRAME_399101548_ANGLES = ( -148.9812673056000, -125.4024242222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS45_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS45_TOPO is centered at the site NDOSL_DS45, which has Cartesian coordinates X (km): -0.4460935577704E+04 Y (km): 0.2682765660262E+04 Z (km): -0.3674380982945E+04 and planetodetic coordinates Longitude (deg): 148.9776856389000 Latitude (deg): -35.3984576944000 Altitude (km): 0.6743469999997E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS45_TOPO = 399101549 FRAME_399101549_NAME = 'NDOSL_DS45_TOPO' FRAME_399101549_CLASS = 4 FRAME_399101549_CLASS_ID = 399101549 FRAME_399101549_CENTER = 399101549 OBJECT_399101549_FRAME = 'NDOSL_DS45_TOPO' TKFRAME_399101549_RELATIVE = 'ITRF93' TKFRAME_399101549_SPEC = 'ANGLES' TKFRAME_399101549_UNITS = 'DEGREES' TKFRAME_399101549_AXES = ( 3, 2, 3 ) TKFRAME_399101549_ANGLES = ( -148.9776856389000, -125.3984576944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS46_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS46_TOPO is centered at the site NDOSL_DS46, which has Cartesian coordinates X (km): -0.4460828947247E+04 Y (km): 0.2682129506185E+04 Z (km): -0.3674975088220E+04 and planetodetic coordinates Longitude (deg): 148.9830816944000 Latitude (deg): -35.4050106389000 Altitude (km): 0.6768120000012E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS46_TOPO = 399101546 FRAME_399101546_NAME = 'NDOSL_DS46_TOPO' FRAME_399101546_CLASS = 4 FRAME_399101546_CLASS_ID = 399101546 FRAME_399101546_CENTER = 399101546 OBJECT_399101546_FRAME = 'NDOSL_DS46_TOPO' TKFRAME_399101546_RELATIVE = 'ITRF93' TKFRAME_399101546_SPEC = 'ANGLES' TKFRAME_399101546_UNITS = 'DEGREES' TKFRAME_399101546_AXES = ( 3, 2, 3 ) TKFRAME_399101546_ANGLES = ( -148.9830816944000, -125.4050106389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS54_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS54_TOPO is centered at the site NDOSL_DS54, which has Cartesian coordinates X (km): 0.4849434488141E+04 Y (km): -0.3607239003797E+03 Z (km): 0.4114618833488E+04 and planetodetic coordinates Longitude (deg): -4.2540968333001 Latitude (deg): 40.4256216667000 Altitude (km): 0.8370510000006E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS54_TOPO = 399101554 FRAME_399101554_NAME = 'NDOSL_DS54_TOPO' FRAME_399101554_CLASS = 4 FRAME_399101554_CLASS_ID = 399101554 FRAME_399101554_CENTER = 399101554 OBJECT_399101554_FRAME = 'NDOSL_DS54_TOPO' TKFRAME_399101554_RELATIVE = 'ITRF93' TKFRAME_399101554_SPEC = 'ANGLES' TKFRAME_399101554_UNITS = 'DEGREES' TKFRAME_399101554_AXES = ( 3, 2, 3 ) TKFRAME_399101554_ANGLES = ( -355.7459031667000, -49.5743783333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS55_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS55_TOPO is centered at the site NDOSL_DS55, which has Cartesian coordinates X (km): 0.4849525254743E+04 Y (km): -0.3606060936121E+03 Z (km): 0.4114495084966E+04 and planetodetic coordinates Longitude (deg): -4.2526333056000 Latitude (deg): 40.4242959167000 Altitude (km): 0.8190610000010E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS55_TOPO = 399101555 FRAME_399101555_NAME = 'NDOSL_DS55_TOPO' FRAME_399101555_CLASS = 4 FRAME_399101555_CLASS_ID = 399101555 FRAME_399101555_CENTER = 399101555 OBJECT_399101555_FRAME = 'NDOSL_DS55_TOPO' TKFRAME_399101555_RELATIVE = 'ITRF93' TKFRAME_399101555_SPEC = 'ANGLES' TKFRAME_399101555_UNITS = 'DEGREES' TKFRAME_399101555_AXES = ( 3, 2, 3 ) TKFRAME_399101555_ANGLES = ( -355.7473666944000, -49.5757040833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS61_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS61_TOPO is centered at the site NDOSL_DS61, which has Cartesian coordinates X (km): 0.4849251541218E+04 Y (km): -0.3602704103948E+03 Z (km): 0.4114890361379E+04 and planetodetic coordinates Longitude (deg): -4.2489280278000 Latitude (deg): 40.4287444444000 Altitude (km): 0.8486580000007E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS61_TOPO = 399101662 FRAME_399101662_NAME = 'NDOSL_DS61_TOPO' FRAME_399101662_CLASS = 4 FRAME_399101662_CLASS_ID = 399101662 FRAME_399101662_CENTER = 399101662 OBJECT_399101662_FRAME = 'NDOSL_DS61_TOPO' TKFRAME_399101662_RELATIVE = 'ITRF93' TKFRAME_399101662_SPEC = 'ANGLES' TKFRAME_399101662_UNITS = 'DEGREES' TKFRAME_399101662_AXES = ( 3, 2, 3 ) TKFRAME_399101662_ANGLES = ( -355.7510719722000, -49.5712555556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS63_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS63_TOPO is centered at the site NDOSL_DS63, which has Cartesian coordinates X (km): 0.4849092516785E+04 Y (km): -0.3601803490515E+03 Z (km): 0.4115109250031E+04 and planetodetic coordinates Longitude (deg): -4.2480085556000 Latitude (deg): 40.4312097500000 Altitude (km): 0.8648160000008E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS63_TOPO = 399101564 FRAME_399101564_NAME = 'NDOSL_DS63_TOPO' FRAME_399101564_CLASS = 4 FRAME_399101564_CLASS_ID = 399101564 FRAME_399101564_CENTER = 399101564 OBJECT_399101564_FRAME = 'NDOSL_DS63_TOPO' TKFRAME_399101564_RELATIVE = 'ITRF93' TKFRAME_399101564_SPEC = 'ANGLES' TKFRAME_399101564_UNITS = 'DEGREES' TKFRAME_399101564_AXES = ( 3, 2, 3 ) TKFRAME_399101564_ANGLES = ( -355.7519914444000, -49.5687902500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS65_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS65_TOPO is centered at the site NDOSL_DS65, which has Cartesian coordinates X (km): 0.4849339633660E+04 Y (km): -0.3604276630326E+03 Z (km): 0.4114750732431E+04 and planetodetic coordinates Longitude (deg): -4.2506988889000 Latitude (deg): 40.4272063611000 Altitude (km): 0.8338540000017E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS65_TOPO = 399101565 FRAME_399101565_NAME = 'NDOSL_DS65_TOPO' FRAME_399101565_CLASS = 4 FRAME_399101565_CLASS_ID = 399101565 FRAME_399101565_CENTER = 399101565 OBJECT_399101565_FRAME = 'NDOSL_DS65_TOPO' TKFRAME_399101565_RELATIVE = 'ITRF93' TKFRAME_399101565_SPEC = 'ANGLES' TKFRAME_399101565_UNITS = 'DEGREES' TKFRAME_399101565_AXES = ( 3, 2, 3 ) TKFRAME_399101565_ANGLES = ( -355.7493011111000, -49.5727936389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS66_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS66_TOPO is centered at the site NDOSL_DS66, which has Cartesian coordinates X (km): 0.4849148431998E+04 Y (km): -0.3604746184515E+03 Z (km): 0.4114995166702E+04 and planetodetic coordinates Longitude (deg): -4.2514176389000 Latitude (deg): 40.4299748611000 Altitude (km): 0.8498740000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS66_TOPO = 399101566 FRAME_399101566_NAME = 'NDOSL_DS66_TOPO' FRAME_399101566_CLASS = 4 FRAME_399101566_CLASS_ID = 399101566 FRAME_399101566_CENTER = 399101566 OBJECT_399101566_FRAME = 'NDOSL_DS66_TOPO' TKFRAME_399101566_RELATIVE = 'ITRF93' TKFRAME_399101566_SPEC = 'ANGLES' TKFRAME_399101566_UNITS = 'DEGREES' TKFRAME_399101566_AXES = ( 3, 2, 3 ) TKFRAME_399101566_ANGLES = ( -355.7485823611000, -49.5700251389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DS87_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DS87_TOPO is centered at the site NDOSL_DS87, which has Cartesian coordinates X (km): 0.1263288999619E+04 Y (km): -0.4876455563343E+04 Z (km): 0.3899012030619E+04 and planetodetic coordinates Longitude (deg): -75.4763045278000 Latitude (deg): 37.9265898611000 Altitude (km): -0.1276199999924E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DS87_TOPO = 399101587 FRAME_399101587_NAME = 'NDOSL_DS87_TOPO' FRAME_399101587_CLASS = 4 FRAME_399101587_CLASS_ID = 399101587 FRAME_399101587_CENTER = 399101587 OBJECT_399101587_FRAME = 'NDOSL_DS87_TOPO' TKFRAME_399101587_RELATIVE = 'ITRF93' TKFRAME_399101587_SPEC = 'ANGLES' TKFRAME_399101587_UNITS = 'DEGREES' TKFRAME_399101587_AXES = ( 3, 2, 3 ) TKFRAME_399101587_ANGLES = ( -284.5236954722000, -52.0734101389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DX2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DX2S_TOPO is centered at the site NDOSL_DX2S, which has Cartesian coordinates X (km): -0.2268049131355E+04 Y (km): -0.1448740450091E+04 Z (km): 0.5763716708601E+04 and planetodetic coordinates Longitude (deg): -147.4311625000000 Latitude (deg): 65.1178338889000 Altitude (km): 0.5146499999996E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DX2S_TOPO = 399101715 FRAME_399101715_NAME = 'NDOSL_DX2S_TOPO' FRAME_399101715_CLASS = 4 FRAME_399101715_CLASS_ID = 399101715 FRAME_399101715_CENTER = 399101715 OBJECT_399101715_FRAME = 'NDOSL_DX2S_TOPO' TKFRAME_399101715_RELATIVE = 'ITRF93' TKFRAME_399101715_SPEC = 'ANGLES' TKFRAME_399101715_UNITS = 'DEGREES' TKFRAME_399101715_AXES = ( 3, 2, 3 ) TKFRAME_399101715_ANGLES = ( -212.5688375000000, -24.8821661111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_DXAS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_DXAS_TOPO is centered at the site NDOSL_DXAS, which has Cartesian coordinates X (km): -0.2268101669545E+04 Y (km): -0.1448643509745E+04 Z (km): 0.5763725060150E+04 and planetodetic coordinates Longitude (deg): -147.4335038889000 Latitude (deg): 65.1179297222000 Altitude (km): 0.5189000000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_DXAS_TOPO = 399101711 FRAME_399101711_NAME = 'NDOSL_DXAS_TOPO' FRAME_399101711_CLASS = 4 FRAME_399101711_CLASS_ID = 399101711 FRAME_399101711_CENTER = 399101711 OBJECT_399101711_FRAME = 'NDOSL_DXAS_TOPO' TKFRAME_399101711_RELATIVE = 'ITRF93' TKFRAME_399101711_SPEC = 'ANGLES' TKFRAME_399101711_UNITS = 'DEGREES' TKFRAME_399101711_AXES = ( 3, 2, 3 ) TKFRAME_399101711_ANGLES = ( -212.5664961111000, -24.8820702778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_EA2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_EA2F_TOPO is centered at the site NDOSL_EA2F, which has Cartesian coordinates X (km): -0.2451125221506E+04 Y (km): -0.4623404812775E+04 Z (km): 0.3635639729591E+04 and planetodetic coordinates Longitude (deg): -117.9305616667000 Latitude (deg): 34.9704538889000 Altitude (km): 0.7997260000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_EA2F_TOPO = 399104065 FRAME_399104065_NAME = 'NDOSL_EA2F_TOPO' FRAME_399104065_CLASS = 4 FRAME_399104065_CLASS_ID = 399104065 FRAME_399104065_CENTER = 399104065 OBJECT_399104065_FRAME = 'NDOSL_EA2F_TOPO' TKFRAME_399104065_RELATIVE = 'ITRF93' TKFRAME_399104065_SPEC = 'ANGLES' TKFRAME_399104065_UNITS = 'DEGREES' TKFRAME_399104065_AXES = ( 3, 2, 3 ) TKFRAME_399104065_ANGLES = ( -242.0694383333000, -55.0295461111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_EA3F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_EA3F_TOPO is centered at the site NDOSL_EA3F, which has Cartesian coordinates X (km): -0.2465034834099E+04 Y (km): -0.4618281881151E+04 Z (km): 0.3632666633668E+04 and planetodetic coordinates Longitude (deg): -118.0913296944000 Latitude (deg): 34.9381143333000 Altitude (km): 0.7435370000010E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_EA3F_TOPO = 399104221 FRAME_399104221_NAME = 'NDOSL_EA3F_TOPO' FRAME_399104221_CLASS = 4 FRAME_399104221_CLASS_ID = 399104221 FRAME_399104221_CENTER = 399104221 OBJECT_399104221_FRAME = 'NDOSL_EA3F_TOPO' TKFRAME_399104221_RELATIVE = 'ITRF93' TKFRAME_399104221_SPEC = 'ANGLES' TKFRAME_399104221_UNITS = 'DEGREES' TKFRAME_399104221_AXES = ( 3, 2, 3 ) TKFRAME_399104221_ANGLES = ( -241.9086703056000, -55.0618856667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_EAFF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_EAFF_TOPO is centered at the site NDOSL_EAFF, which has Cartesian coordinates X (km): -0.2449875212910E+04 Y (km): -0.4624754284223E+04 Z (km): 0.3634738213430E+04 and planetodetic coordinates Longitude (deg): -117.9115509444000 Latitude (deg): 34.9606598333000 Altitude (km): 0.7805670000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_EAFF_TOPO = 399104064 FRAME_399104064_NAME = 'NDOSL_EAFF_TOPO' FRAME_399104064_CLASS = 4 FRAME_399104064_CLASS_ID = 399104064 FRAME_399104064_CENTER = 399104064 OBJECT_399104064_FRAME = 'NDOSL_EAFF_TOPO' TKFRAME_399104064_RELATIVE = 'ITRF93' TKFRAME_399104064_SPEC = 'ANGLES' TKFRAME_399104064_UNITS = 'DEGREES' TKFRAME_399104064_AXES = ( 3, 2, 3 ) TKFRAME_399104064_ANGLES = ( -242.0884490556000, -55.0393401667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_EG2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_EG2F_TOPO is centered at the site NDOSL_EG2F, which has Cartesian coordinates X (km): 0.3628512274874E+03 Y (km): -0.5484290203703E+04 Z (km): 0.3225199121770E+04 and planetodetic coordinates Longitude (deg): -86.2147174167000 Latitude (deg): 30.5725279444000 Altitude (km): 0.3771100000039E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_EG2F_TOPO = 399104345 FRAME_399104345_NAME = 'NDOSL_EG2F_TOPO' FRAME_399104345_CLASS = 4 FRAME_399104345_CLASS_ID = 399104345 FRAME_399104345_CENTER = 399104345 OBJECT_399104345_FRAME = 'NDOSL_EG2F_TOPO' TKFRAME_399104345_RELATIVE = 'ITRF93' TKFRAME_399104345_SPEC = 'ANGLES' TKFRAME_399104345_UNITS = 'DEGREES' TKFRAME_399104345_AXES = ( 3, 2, 3 ) TKFRAME_399104345_ANGLES = ( -273.7852825833000, -59.4274720556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_EG3F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_EG3F_TOPO is centered at the site NDOSL_EG3F, which has Cartesian coordinates X (km): 0.3074733930037E+03 Y (km): -0.5496142944556E+04 Z (km): 0.3210769577408E+04 and planetodetic coordinates Longitude (deg): -86.7980120000000 Latitude (deg): 30.4216655833000 Altitude (km): 0.1142999998758E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_EG3F_TOPO = 399104346 FRAME_399104346_NAME = 'NDOSL_EG3F_TOPO' FRAME_399104346_CLASS = 4 FRAME_399104346_CLASS_ID = 399104346 FRAME_399104346_CENTER = 399104346 OBJECT_399104346_FRAME = 'NDOSL_EG3F_TOPO' TKFRAME_399104346_RELATIVE = 'ITRF93' TKFRAME_399104346_SPEC = 'ANGLES' TKFRAME_399104346_UNITS = 'DEGREES' TKFRAME_399104346_AXES = ( 3, 2, 3 ) TKFRAME_399104346_ANGLES = ( -273.2019880000000, -59.5783344167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ET1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ET1S_TOPO is centered at the site NDOSL_ET1S, which has Cartesian coordinates X (km): -0.1539571960297E+04 Y (km): -0.5160661415172E+04 Z (km): 0.3408526562730E+04 and planetodetic coordinates Longitude (deg): -106.6113373056000 Latitude (deg): 32.5045748889000 Altitude (km): 0.1443190000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ET1S_TOPO = 399101973 FRAME_399101973_NAME = 'NDOSL_ET1S_TOPO' FRAME_399101973_CLASS = 4 FRAME_399101973_CLASS_ID = 399101973 FRAME_399101973_CENTER = 399101973 OBJECT_399101973_FRAME = 'NDOSL_ET1S_TOPO' TKFRAME_399101973_RELATIVE = 'ITRF93' TKFRAME_399101973_SPEC = 'ANGLES' TKFRAME_399101973_UNITS = 'DEGREES' TKFRAME_399101973_AXES = ( 3, 2, 3 ) TKFRAME_399101973_ANGLES = ( -253.3886626944000, -57.4954251111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ET2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ET2S_TOPO is centered at the site NDOSL_ET2S, which has Cartesian coordinates X (km): -0.1539563976797E+04 Y (km): -0.5160693644766E+04 Z (km): 0.3408519746724E+04 and planetodetic coordinates Longitude (deg): -106.6111578889000 Latitude (deg): 32.5043845000000 Altitude (km): 0.1463649000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ET2S_TOPO = 399101974 FRAME_399101974_NAME = 'NDOSL_ET2S_TOPO' FRAME_399101974_CLASS = 4 FRAME_399101974_CLASS_ID = 399101974 FRAME_399101974_CENTER = 399101974 OBJECT_399101974_FRAME = 'NDOSL_ET2S_TOPO' TKFRAME_399101974_RELATIVE = 'ITRF93' TKFRAME_399101974_SPEC = 'ANGLES' TKFRAME_399101974_UNITS = 'DEGREES' TKFRAME_399101974_AXES = ( 3, 2, 3 ) TKFRAME_399101974_ANGLES = ( -253.3888421111000, -57.4956155000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_EULY_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_EULY_TOPO is centered at the site NDOSL_EULY, which has Cartesian coordinates X (km): 0.9113662059910E+03 Y (km): -0.5536905460582E+04 Z (km): 0.3021762450825E+04 and planetodetic coordinates Longitude (deg): -80.6530121944000 Latitude (deg): 28.4635640833000 Altitude (km): -0.1051000000051E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_EULY_TOPO = 399104205 FRAME_399104205_NAME = 'NDOSL_EULY_TOPO' FRAME_399104205_CLASS = 4 FRAME_399104205_CLASS_ID = 399104205 FRAME_399104205_CENTER = 399104205 OBJECT_399104205_FRAME = 'NDOSL_EULY_TOPO' TKFRAME_399104205_RELATIVE = 'ITRF93' TKFRAME_399104205_SPEC = 'ANGLES' TKFRAME_399104205_UNITS = 'DEGREES' TKFRAME_399104205_AXES = ( 3, 2, 3 ) TKFRAME_399104205_ANGLES = ( -279.3469878056000, -61.5364359167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_EVCS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_EVCS_TOPO is centered at the site NDOSL_EVCS, which has Cartesian coordinates X (km): 0.9186171843091E+03 Y (km): -0.5534528096932E+04 Z (km): 0.3023960320513E+04 and planetodetic coordinates Longitude (deg): -80.5760000000001 Latitude (deg): 28.4860000000000 Altitude (km): 0.1499599999996E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_EVCS_TOPO = 399101363 FRAME_399101363_NAME = 'NDOSL_EVCS_TOPO' FRAME_399101363_CLASS = 4 FRAME_399101363_CLASS_ID = 399101363 FRAME_399101363_CENTER = 399101363 OBJECT_399101363_FRAME = 'NDOSL_EVCS_TOPO' TKFRAME_399101363_RELATIVE = 'ITRF93' TKFRAME_399101363_SPEC = 'ANGLES' TKFRAME_399101363_UNITS = 'DEGREES' TKFRAME_399101363_AXES = ( 3, 2, 3 ) TKFRAME_399101363_ANGLES = ( -279.4240000000000, -61.5140000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_FR1X_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_FR1X_TOPO is centered at the site NDOSL_FR1X, which has Cartesian coordinates X (km): -0.2448847056658E+04 Y (km): -0.4625956629415E+04 Z (km): 0.3633795576176E+04 and planetodetic coordinates Longitude (deg): -117.8954444444000 Latitude (deg): 34.9506944444000 Altitude (km): 0.7170000000026E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_FR1X_TOPO = 399101844 FRAME_399101844_NAME = 'NDOSL_FR1X_TOPO' FRAME_399101844_CLASS = 4 FRAME_399101844_CLASS_ID = 399101844 FRAME_399101844_CENTER = 399101844 OBJECT_399101844_FRAME = 'NDOSL_FR1X_TOPO' TKFRAME_399101844_RELATIVE = 'ITRF93' TKFRAME_399101844_SPEC = 'ANGLES' TKFRAME_399101844_UNITS = 'DEGREES' TKFRAME_399101844_AXES = ( 3, 2, 3 ) TKFRAME_399101844_ANGLES = ( -242.1045555556000, -55.0493055556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_FR2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_FR2F_TOPO is centered at the site NDOSL_FR2F, which has Cartesian coordinates X (km): -0.2448840901059E+04 Y (km): -0.4625984204818E+04 Z (km): 0.3633776988580E+04 and planetodetic coordinates Longitude (deg): -117.8952436667000 Latitude (deg): 34.9504461667000 Altitude (km): 0.7239669999998E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_FR2F_TOPO = 399104249 FRAME_399104249_NAME = 'NDOSL_FR2F_TOPO' FRAME_399104249_CLASS = 4 FRAME_399104249_CLASS_ID = 399104249 FRAME_399104249_CENTER = 399104249 OBJECT_399104249_FRAME = 'NDOSL_FR2F_TOPO' TKFRAME_399104249_RELATIVE = 'ITRF93' TKFRAME_399104249_SPEC = 'ANGLES' TKFRAME_399104249_UNITS = 'DEGREES' TKFRAME_399104249_AXES = ( 3, 2, 3 ) TKFRAME_399104249_ANGLES = ( -242.1047563333000, -55.0495538333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_FR2X_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_FR2X_TOPO is centered at the site NDOSL_FR2X, which has Cartesian coordinates X (km): -0.2448832774245E+04 Y (km): -0.4625962192360E+04 Z (km): 0.3633798102329E+04 and planetodetic coordinates Longitude (deg): -117.8952777778000 Latitude (deg): 34.9507222222000 Altitude (km): 0.7170000000001E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_FR2X_TOPO = 399101845 FRAME_399101845_NAME = 'NDOSL_FR2X_TOPO' FRAME_399101845_CLASS = 4 FRAME_399101845_CLASS_ID = 399101845 FRAME_399101845_CENTER = 399101845 OBJECT_399101845_FRAME = 'NDOSL_FR2X_TOPO' TKFRAME_399101845_RELATIVE = 'ITRF93' TKFRAME_399101845_SPEC = 'ANGLES' TKFRAME_399101845_UNITS = 'DEGREES' TKFRAME_399101845_AXES = ( 3, 2, 3 ) TKFRAME_399101845_ANGLES = ( -242.1047222222000, -55.0492777778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_FRCF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_FRCF_TOPO is centered at the site NDOSL_FRCF, which has Cartesian coordinates X (km): -0.2449855453518E+04 Y (km): -0.4624727688519E+04 Z (km): 0.3634734925965E+04 and planetodetic coordinates Longitude (deg): -117.9114960833000 Latitude (deg): 34.9608046944000 Altitude (km): 0.7518419999996E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_FRCF_TOPO = 399104069 FRAME_399104069_NAME = 'NDOSL_FRCF_TOPO' FRAME_399104069_CLASS = 4 FRAME_399104069_CLASS_ID = 399104069 FRAME_399104069_CENTER = 399104069 OBJECT_399104069_FRAME = 'NDOSL_FRCF_TOPO' TKFRAME_399104069_RELATIVE = 'ITRF93' TKFRAME_399104069_SPEC = 'ANGLES' TKFRAME_399104069_UNITS = 'DEGREES' TKFRAME_399104069_AXES = ( 3, 2, 3 ) TKFRAME_399104069_ANGLES = ( -242.0885039166999, -55.0391953056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_FT2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_FT2F_TOPO is centered at the site NDOSL_FT2F, which has Cartesian coordinates X (km): -0.1900141996625E+04 Y (km): -0.5098927189914E+04 Z (km): 0.3319591480288E+04 and planetodetic coordinates Longitude (deg): -110.4381733333000 Latitude (deg): 31.5567668611000 Altitude (km): 0.1794960000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_FT2F_TOPO = 399104138 FRAME_399104138_NAME = 'NDOSL_FT2F_TOPO' FRAME_399104138_CLASS = 4 FRAME_399104138_CLASS_ID = 399104138 FRAME_399104138_CENTER = 399104138 OBJECT_399104138_FRAME = 'NDOSL_FT2F_TOPO' TKFRAME_399104138_RELATIVE = 'ITRF93' TKFRAME_399104138_SPEC = 'ANGLES' TKFRAME_399104138_UNITS = 'DEGREES' TKFRAME_399104138_AXES = ( 3, 2, 3 ) TKFRAME_399104138_ANGLES = ( -249.5618266667000, -58.4432331389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_FTHF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_FTHF_TOPO is centered at the site NDOSL_FTHF, which has Cartesian coordinates X (km): -0.1893765081420E+04 Y (km): -0.5100135605415E+04 Z (km): 0.3320777241219E+04 and planetodetic coordinates Longitude (deg): -110.3707979722000 Latitude (deg): 31.5710242500000 Altitude (km): 0.1486316000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_FTHF_TOPO = 399104115 FRAME_399104115_NAME = 'NDOSL_FTHF_TOPO' FRAME_399104115_CLASS = 4 FRAME_399104115_CLASS_ID = 399104115 FRAME_399104115_CENTER = 399104115 OBJECT_399104115_FRAME = 'NDOSL_FTHF_TOPO' TKFRAME_399104115_RELATIVE = 'ITRF93' TKFRAME_399104115_SPEC = 'ANGLES' TKFRAME_399104115_UNITS = 'DEGREES' TKFRAME_399104115_AXES = ( 3, 2, 3 ) TKFRAME_399104115_ANGLES = ( -249.6292020278000, -58.4289757500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GB2Y_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GB2Y_TOPO is centered at the site NDOSL_GB2Y, which has Cartesian coordinates X (km): 0.1157166015292E+04 Y (km): -0.5587019179146E+04 Z (km): 0.2841174347346E+04 and planetodetic coordinates Longitude (deg): -78.2985253333000 Latitude (deg): 26.6254712778000 Altitude (km): -0.1099699999995E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GB2Y_TOPO = 399101814 FRAME_399101814_NAME = 'NDOSL_GB2Y_TOPO' FRAME_399101814_CLASS = 4 FRAME_399101814_CLASS_ID = 399101814 FRAME_399101814_CENTER = 399101814 OBJECT_399101814_FRAME = 'NDOSL_GB2Y_TOPO' TKFRAME_399101814_RELATIVE = 'ITRF93' TKFRAME_399101814_SPEC = 'ANGLES' TKFRAME_399101814_UNITS = 'DEGREES' TKFRAME_399101814_AXES = ( 3, 2, 3 ) TKFRAME_399101814_ANGLES = ( -281.7014746667000, -63.3745287222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GBIQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GBIQ_TOPO is centered at the site NDOSL_GBIQ, which has Cartesian coordinates X (km): 0.1152454888953E+04 Y (km): -0.5588488663134E+04 Z (km): 0.2840199532481E+04 and planetodetic coordinates Longitude (deg): -78.3478400556000 Latitude (deg): 26.6156420000000 Altitude (km): -0.1368399999992E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GBIQ_TOPO = 399104013 FRAME_399104013_NAME = 'NDOSL_GBIQ_TOPO' FRAME_399104013_CLASS = 4 FRAME_399104013_CLASS_ID = 399104013 FRAME_399104013_CENTER = 399104013 OBJECT_399104013_FRAME = 'NDOSL_GBIQ_TOPO' TKFRAME_399104013_RELATIVE = 'ITRF93' TKFRAME_399104013_SPEC = 'ANGLES' TKFRAME_399104013_UNITS = 'DEGREES' TKFRAME_399104013_AXES = ( 3, 2, 3 ) TKFRAME_399104013_ANGLES = ( -281.6521599444000, -63.3843580000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GBIY_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GBIY_TOPO is centered at the site NDOSL_GBIY, which has Cartesian coordinates X (km): 0.1157113238909E+04 Y (km): -0.5587042204387E+04 Z (km): 0.2841177220517E+04 and planetodetic coordinates Longitude (deg): -78.2990911944000 Latitude (deg): 26.6254465556000 Altitude (km): 0.8780000018387E-03 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GBIY_TOPO = 399101813 FRAME_399101813_NAME = 'NDOSL_GBIY_TOPO' FRAME_399101813_CLASS = 4 FRAME_399101813_CLASS_ID = 399101813 FRAME_399101813_CENTER = 399101813 OBJECT_399101813_FRAME = 'NDOSL_GBIY_TOPO' TKFRAME_399101813_RELATIVE = 'ITRF93' TKFRAME_399101813_SPEC = 'ANGLES' TKFRAME_399101813_UNITS = 'DEGREES' TKFRAME_399101813_AXES = ( 3, 2, 3 ) TKFRAME_399101813_ANGLES = ( -281.7009088056000, -63.3745534444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GD28_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GD28_TOPO is centered at the site NDOSL_GD28, which has Cartesian coordinates X (km): -0.2354758455823E+04 Y (km): -0.4646786841381E+04 Z (km): 0.3669385547468E+04 and planetodetic coordinates Longitude (deg): -116.8736046667000 Latitude (deg): 35.3415426389000 Altitude (km): 0.9409410000001E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GD28_TOPO = 399101517 FRAME_399101517_NAME = 'NDOSL_GD28_TOPO' FRAME_399101517_CLASS = 4 FRAME_399101517_CLASS_ID = 399101517 FRAME_399101517_CENTER = 399101517 OBJECT_399101517_FRAME = 'NDOSL_GD28_TOPO' TKFRAME_399101517_RELATIVE = 'ITRF93' TKFRAME_399101517_SPEC = 'ANGLES' TKFRAME_399101517_UNITS = 'DEGREES' TKFRAME_399101517_AXES = ( 3, 2, 3 ) TKFRAME_399101517_ANGLES = ( -243.1263953333000, -54.6584573611000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GDSA_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GDSA_TOPO is centered at the site NDOSL_GDSA, which has Cartesian coordinates X (km): -0.2354707533241E+04 Y (km): -0.4646807707894E+04 Z (km): 0.3669382423842E+04 and planetodetic coordinates Longitude (deg): -116.8730013333000 Latitude (deg): 35.3415426389000 Altitude (km): 0.9355410000003E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GDSA_TOPO = 399101317 FRAME_399101317_NAME = 'NDOSL_GDSA_TOPO' FRAME_399101317_CLASS = 4 FRAME_399101317_CLASS_ID = 399101317 FRAME_399101317_CENTER = 399101317 OBJECT_399101317_FRAME = 'NDOSL_GDSA_TOPO' TKFRAME_399101317_RELATIVE = 'ITRF93' TKFRAME_399101317_SPEC = 'ANGLES' TKFRAME_399101317_UNITS = 'DEGREES' TKFRAME_399101317_AXES = ( 3, 2, 3 ) TKFRAME_399101317_ANGLES = ( -243.1269986667000, -54.6584573611000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GILD_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GILD_TOPO is centered at the site NDOSL_GILD, which has Cartesian coordinates X (km): -0.2281547133370E+04 Y (km): -0.1453617782912E+04 Z (km): 0.5756986903542E+04 and planetodetic coordinates Longitude (deg): -147.4980001944000 Latitude (deg): 64.9785092500000 Altitude (km): 0.3201309999988E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GILD_TOPO = 399107225 FRAME_399107225_NAME = 'NDOSL_GILD_TOPO' FRAME_399107225_CLASS = 4 FRAME_399107225_CLASS_ID = 399107225 FRAME_399107225_CENTER = 399107225 OBJECT_399107225_FRAME = 'NDOSL_GILD_TOPO' TKFRAME_399107225_RELATIVE = 'ITRF93' TKFRAME_399107225_SPEC = 'ANGLES' TKFRAME_399107225_UNITS = 'DEGREES' TKFRAME_399107225_AXES = ( 3, 2, 3 ) TKFRAME_399107225_ANGLES = ( -212.5019998056000, -25.0214907500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GILE_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GILE_TOPO is centered at the site NDOSL_GILE, which has Cartesian coordinates X (km): -0.2281548144178E+04 Y (km): -0.1453618411365E+04 Z (km): 0.5756988889535E+04 and planetodetic coordinates Longitude (deg): -147.4980004722000 Latitude (deg): 64.9785071111000 Altitude (km): 0.3224339999993E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GILE_TOPO = 399104047 FRAME_399104047_NAME = 'NDOSL_GILE_TOPO' FRAME_399104047_CLASS = 4 FRAME_399104047_CLASS_ID = 399104047 FRAME_399104047_CENTER = 399104047 OBJECT_399104047_FRAME = 'NDOSL_GILE_TOPO' TKFRAME_399104047_RELATIVE = 'ITRF93' TKFRAME_399104047_SPEC = 'ANGLES' TKFRAME_399104047_UNITS = 'DEGREES' TKFRAME_399104047_AXES = ( 3, 2, 3 ) TKFRAME_399104047_ANGLES = ( -212.5019995278000, -25.0214928889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GLAS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GLAS_TOPO is centered at the site NDOSL_GLAS, which has Cartesian coordinates X (km): -0.2282359787944E+04 Y (km): -0.1453304657699E+04 Z (km): 0.5756819789754E+04 and planetodetic coordinates Longitude (deg): -147.5128386667000 Latitude (deg): 64.9736719722000 Altitude (km): 0.3874819999988E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GLAS_TOPO = 399101712 FRAME_399101712_NAME = 'NDOSL_GLAS_TOPO' FRAME_399101712_CLASS = 4 FRAME_399101712_CLASS_ID = 399101712 FRAME_399101712_CENTER = 399101712 OBJECT_399101712_FRAME = 'NDOSL_GLAS_TOPO' TKFRAME_399101712_RELATIVE = 'ITRF93' TKFRAME_399101712_SPEC = 'ANGLES' TKFRAME_399101712_UNITS = 'DEGREES' TKFRAME_399101712_AXES = ( 3, 2, 3 ) TKFRAME_399101712_ANGLES = ( -212.4871613333000, -25.0263280278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GLBS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GLBS_TOPO is centered at the site NDOSL_GLBS, which has Cartesian coordinates X (km): -0.2282277375333E+04 Y (km): -0.1453483972980E+04 Z (km): 0.5756827136831E+04 and planetodetic coordinates Longitude (deg): -147.5086985278000 Latitude (deg): 64.9734820278000 Altitude (km): 0.4054780000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GLBS_TOPO = 399101713 FRAME_399101713_NAME = 'NDOSL_GLBS_TOPO' FRAME_399101713_CLASS = 4 FRAME_399101713_CLASS_ID = 399101713 FRAME_399101713_CENTER = 399101713 OBJECT_399101713_FRAME = 'NDOSL_GLBS_TOPO' TKFRAME_399101713_RELATIVE = 'ITRF93' TKFRAME_399101713_SPEC = 'ANGLES' TKFRAME_399101713_UNITS = 'DEGREES' TKFRAME_399101713_AXES = ( 3, 2, 3 ) TKFRAME_399101713_ANGLES = ( -212.4913014722000, -25.0265179722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GLCS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GLCS_TOPO is centered at the site NDOSL_GLCS, which has Cartesian coordinates X (km): -0.2282213666154E+04 Y (km): -0.1453662889359E+04 Z (km): 0.5756828315860E+04 and planetodetic coordinates Longitude (deg): -147.5047783611000 Latitude (deg): 64.9731421111000 Altitude (km): 0.4244740000007E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GLCS_TOPO = 399101714 FRAME_399101714_NAME = 'NDOSL_GLCS_TOPO' FRAME_399101714_CLASS = 4 FRAME_399101714_CLASS_ID = 399101714 FRAME_399101714_CENTER = 399101714 OBJECT_399101714_FRAME = 'NDOSL_GLCS_TOPO' TKFRAME_399101714_RELATIVE = 'ITRF93' TKFRAME_399101714_SPEC = 'ANGLES' TKFRAME_399101714_UNITS = 'DEGREES' TKFRAME_399101714_AXES = ( 3, 2, 3 ) TKFRAME_399101714_ANGLES = ( -212.4952216389000, -25.0268578889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GT2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GT2S_TOPO is centered at the site NDOSL_GT2S, which has Cartesian coordinates X (km): -0.5069948566377E+04 Y (km): 0.3569113666071E+04 Z (km): 0.1491761259246E+04 and planetodetic coordinates Longitude (deg): 144.8554377500000 Latitude (deg): 13.6158806389000 Altitude (km): 0.2091600000007E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GT2S_TOPO = 399101375 FRAME_399101375_NAME = 'NDOSL_GT2S_TOPO' FRAME_399101375_CLASS = 4 FRAME_399101375_CLASS_ID = 399101375 FRAME_399101375_CENTER = 399101375 OBJECT_399101375_FRAME = 'NDOSL_GT2S_TOPO' TKFRAME_399101375_RELATIVE = 'ITRF93' TKFRAME_399101375_SPEC = 'ANGLES' TKFRAME_399101375_UNITS = 'DEGREES' TKFRAME_399101375_AXES = ( 3, 2, 3 ) TKFRAME_399101375_ANGLES = ( -144.8554377500000, -76.3841193611000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GTKQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GTKQ_TOPO is centered at the site NDOSL_GTKQ, which has Cartesian coordinates X (km): 0.1920440193868E+04 Y (km): -0.5619414336531E+04 Z (km): 0.2319138760253E+04 and planetodetic coordinates Longitude (deg): -71.1320882222000 Latitude (deg): 21.4626316111000 Altitude (km): -0.5582000000339E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GTKQ_TOPO = 399104086 FRAME_399104086_NAME = 'NDOSL_GTKQ_TOPO' FRAME_399104086_CLASS = 4 FRAME_399104086_CLASS_ID = 399104086 FRAME_399104086_CENTER = 399104086 OBJECT_399104086_FRAME = 'NDOSL_GTKQ_TOPO' TKFRAME_399104086_RELATIVE = 'ITRF93' TKFRAME_399104086_SPEC = 'ANGLES' TKFRAME_399104086_UNITS = 'DEGREES' TKFRAME_399104086_AXES = ( 3, 2, 3 ) TKFRAME_399104086_ANGLES = ( -288.8679117778000, -68.5373683889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GTSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GTSS_TOPO is centered at the site NDOSL_GTSS, which has Cartesian coordinates X (km): -0.5070009440533E+04 Y (km): 0.3569075196734E+04 Z (km): 0.1491689229576E+04 and planetodetic coordinates Longitude (deg): 144.8560522500000 Latitude (deg): 13.6151891111000 Altitude (km): 0.2190600000008E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GTSS_TOPO = 399101368 FRAME_399101368_NAME = 'NDOSL_GTSS_TOPO' FRAME_399101368_CLASS = 4 FRAME_399101368_CLASS_ID = 399101368 FRAME_399101368_CENTER = 399101368 OBJECT_399101368_FRAME = 'NDOSL_GTSS_TOPO' TKFRAME_399101368_RELATIVE = 'ITRF93' TKFRAME_399101368_SPEC = 'ANGLES' TKFRAME_399101368_UNITS = 'DEGREES' TKFRAME_399101368_AXES = ( 3, 2, 3 ) TKFRAME_399101368_ANGLES = ( -144.8560522500000, -76.3848108889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GW1J_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GW1J_TOPO is centered at the site NDOSL_GW1J, which has Cartesian coordinates X (km): -0.5069619844928E+04 Y (km): 0.3570795280670E+04 Z (km): 0.1488827642651E+04 and planetodetic coordinates Longitude (deg): 144.8409839722000 Latitude (deg): 13.5886225000000 Altitude (km): 0.1990220000007E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GW1J_TOPO = 399101971 FRAME_399101971_NAME = 'NDOSL_GW1J_TOPO' FRAME_399101971_CLASS = 4 FRAME_399101971_CLASS_ID = 399101971 FRAME_399101971_CENTER = 399101971 OBJECT_399101971_FRAME = 'NDOSL_GW1J_TOPO' TKFRAME_399101971_RELATIVE = 'ITRF93' TKFRAME_399101971_SPEC = 'ANGLES' TKFRAME_399101971_UNITS = 'DEGREES' TKFRAME_399101971_AXES = ( 3, 2, 3 ) TKFRAME_399101971_ANGLES = ( -144.8409839722000, -76.4113775000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GW2J_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GW2J_TOPO is centered at the site NDOSL_GW2J, which has Cartesian coordinates X (km): -0.5069620152141E+04 Y (km): 0.3570794923408E+04 Z (km): 0.1488827650469E+04 and planetodetic coordinates Longitude (deg): 144.8409883056000 Latitude (deg): 13.5886224722000 Altitude (km): 0.1990680000003E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GW2J_TOPO = 399100210 FRAME_399100210_NAME = 'NDOSL_GW2J_TOPO' FRAME_399100210_CLASS = 4 FRAME_399100210_CLASS_ID = 399100210 FRAME_399100210_CENTER = 399100210 OBJECT_399100210_FRAME = 'NDOSL_GW2J_TOPO' TKFRAME_399100210_RELATIVE = 'ITRF93' TKFRAME_399100210_SPEC = 'ANGLES' TKFRAME_399100210_UNITS = 'DEGREES' TKFRAME_399100210_AXES = ( 3, 2, 3 ) TKFRAME_399100210_ANGLES = ( -144.8409883056000, -76.4113775278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GW2K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GW2K_TOPO is centered at the site NDOSL_GW2K, which has Cartesian coordinates X (km): -0.5069633920739E+04 Y (km): 0.3570819690470E+04 Z (km): 0.1488716101261E+04 and planetodetic coordinates Longitude (deg): 144.8408744722000 Latitude (deg): 13.5875882778000 Altitude (km): 0.1976650000002E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GW2K_TOPO = 399101968 FRAME_399101968_NAME = 'NDOSL_GW2K_TOPO' FRAME_399101968_CLASS = 4 FRAME_399101968_CLASS_ID = 399101968 FRAME_399101968_CENTER = 399101968 OBJECT_399101968_FRAME = 'NDOSL_GW2K_TOPO' TKFRAME_399101968_RELATIVE = 'ITRF93' TKFRAME_399101968_SPEC = 'ANGLES' TKFRAME_399101968_UNITS = 'DEGREES' TKFRAME_399101968_AXES = ( 3, 2, 3 ) TKFRAME_399101968_ANGLES = ( -144.8408744722000, -76.4124117222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GW2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GW2S_TOPO is centered at the site NDOSL_GW2S, which has Cartesian coordinates X (km): -0.5069633920739E+04 Y (km): 0.3570819690470E+04 Z (km): 0.1488716101261E+04 and planetodetic coordinates Longitude (deg): 144.8408744722000 Latitude (deg): 13.5875882778000 Altitude (km): 0.1976650000002E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GW2S_TOPO = 399101969 FRAME_399101969_NAME = 'NDOSL_GW2S_TOPO' FRAME_399101969_CLASS = 4 FRAME_399101969_CLASS_ID = 399101969 FRAME_399101969_CENTER = 399101969 OBJECT_399101969_FRAME = 'NDOSL_GW2S_TOPO' TKFRAME_399101969_RELATIVE = 'ITRF93' TKFRAME_399101969_SPEC = 'ANGLES' TKFRAME_399101969_UNITS = 'DEGREES' TKFRAME_399101969_AXES = ( 3, 2, 3 ) TKFRAME_399101969_ANGLES = ( -144.8408744722000, -76.4124117222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GW3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GW3S_TOPO is centered at the site NDOSL_GW3S, which has Cartesian coordinates X (km): -0.5069639929900E+04 Y (km): 0.3570823860540E+04 Z (km): 0.1488686149890E+04 and planetodetic coordinates Longitude (deg): 144.8408749444000 Latitude (deg): 13.5873096111000 Altitude (km): 0.1977380000012E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GW3S_TOPO = 399101970 FRAME_399101970_NAME = 'NDOSL_GW3S_TOPO' FRAME_399101970_CLASS = 4 FRAME_399101970_CLASS_ID = 399101970 FRAME_399101970_CENTER = 399101970 OBJECT_399101970_FRAME = 'NDOSL_GW3S_TOPO' TKFRAME_399101970_RELATIVE = 'ITRF93' TKFRAME_399101970_SPEC = 'ANGLES' TKFRAME_399101970_UNITS = 'DEGREES' TKFRAME_399101970_AXES = ( 3, 2, 3 ) TKFRAME_399101970_ANGLES = ( -144.8408749444000, -76.4126903889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GWE2_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GWE2_TOPO is centered at the site NDOSL_GWE2, which has Cartesian coordinates X (km): -0.5069642039367E+04 Y (km): 0.3570834712189E+04 Z (km): 0.1488625106770E+04 and planetodetic coordinates Longitude (deg): 144.8408041944000 Latitude (deg): 13.5867563889000 Altitude (km): 0.1911479999999E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GWE2_TOPO = 399101936 FRAME_399101936_NAME = 'NDOSL_GWE2_TOPO' FRAME_399101936_CLASS = 4 FRAME_399101936_CLASS_ID = 399101936 FRAME_399101936_CENTER = 399101936 OBJECT_399101936_FRAME = 'NDOSL_GWE2_TOPO' TKFRAME_399101936_RELATIVE = 'ITRF93' TKFRAME_399101936_SPEC = 'ANGLES' TKFRAME_399101936_UNITS = 'DEGREES' TKFRAME_399101936_AXES = ( 3, 2, 3 ) TKFRAME_399101936_ANGLES = ( -144.8408041944000, -76.4132436111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GWM3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GWM3_TOPO is centered at the site NDOSL_GWM3, which has Cartesian coordinates X (km): -0.5068919211154E+04 Y (km): 0.3584107243103E+04 Z (km): 0.1458909484517E+04 and planetodetic coordinates Longitude (deg): 144.7368153056000 Latitude (deg): 13.3106894444000 Altitude (km): 0.1486400000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GWM3_TOPO = 399101309 FRAME_399101309_NAME = 'NDOSL_GWM3_TOPO' FRAME_399101309_CLASS = 4 FRAME_399101309_CLASS_ID = 399101309 FRAME_399101309_CENTER = 399101309 OBJECT_399101309_FRAME = 'NDOSL_GWM3_TOPO' TKFRAME_399101309_RELATIVE = 'ITRF93' TKFRAME_399101309_SPEC = 'ANGLES' TKFRAME_399101309_UNITS = 'DEGREES' TKFRAME_399101309_AXES = ( 3, 2, 3 ) TKFRAME_399101309_ANGLES = ( -144.7368153056000, -76.6893105556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GWMK_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GWMK_TOPO is centered at the site NDOSL_GWMK, which has Cartesian coordinates X (km): -0.5069624204170E+04 Y (km): 0.3570805562056E+04 Z (km): 0.1488761112050E+04 and planetodetic coordinates Longitude (deg): 144.8409295000000 Latitude (deg): 13.5880178611000 Altitude (km): 0.1926100000024E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GWMK_TOPO = 399101965 FRAME_399101965_NAME = 'NDOSL_GWMK_TOPO' FRAME_399101965_CLASS = 4 FRAME_399101965_CLASS_ID = 399101965 FRAME_399101965_CENTER = 399101965 OBJECT_399101965_FRAME = 'NDOSL_GWMK_TOPO' TKFRAME_399101965_RELATIVE = 'ITRF93' TKFRAME_399101965_SPEC = 'ANGLES' TKFRAME_399101965_UNITS = 'DEGREES' TKFRAME_399101965_AXES = ( 3, 2, 3 ) TKFRAME_399101965_ANGLES = ( -144.8409295000000, -76.4119821389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_GWMS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_GWMS_TOPO is centered at the site NDOSL_GWMS, which has Cartesian coordinates X (km): -0.5069624204170E+04 Y (km): 0.3570805562056E+04 Z (km): 0.1488761112050E+04 and planetodetic coordinates Longitude (deg): 144.8409295000000 Latitude (deg): 13.5880178611000 Altitude (km): 0.1926100000024E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_GWMS_TOPO = 399101966 FRAME_399101966_NAME = 'NDOSL_GWMS_TOPO' FRAME_399101966_CLASS = 4 FRAME_399101966_CLASS_ID = 399101966 FRAME_399101966_CENTER = 399101966 OBJECT_399101966_FRAME = 'NDOSL_GWMS_TOPO' TKFRAME_399101966_RELATIVE = 'ITRF93' TKFRAME_399101966_SPEC = 'ANGLES' TKFRAME_399101966_UNITS = 'DEGREES' TKFRAME_399101966_AXES = ( 3, 2, 3 ) TKFRAME_399101966_ANGLES = ( -144.8409295000000, -76.4119821389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HAW3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HAW3_TOPO is centered at the site NDOSL_HAW3, which has Cartesian coordinates X (km): -0.5543837128716E+04 Y (km): -0.2054561366118E+04 Z (km): 0.2387807136257E+04 and planetodetic coordinates Longitude (deg): -159.6651550278000 Latitude (deg): 22.1262725556000 Altitude (km): 0.1157200000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HAW3_TOPO = 399101311 FRAME_399101311_NAME = 'NDOSL_HAW3_TOPO' FRAME_399101311_CLASS = 4 FRAME_399101311_CLASS_ID = 399101311 FRAME_399101311_CENTER = 399101311 OBJECT_399101311_FRAME = 'NDOSL_HAW3_TOPO' TKFRAME_399101311_RELATIVE = 'ITRF93' TKFRAME_399101311_SPEC = 'ANGLES' TKFRAME_399101311_UNITS = 'DEGREES' TKFRAME_399101311_AXES = ( 3, 2, 3 ) TKFRAME_399101311_ANGLES = ( -200.3348449722000, -67.8737274444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HAWQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HAWQ_TOPO is centered at the site NDOSL_HAWQ, which has Cartesian coordinates X (km): -0.5507156219479E+04 Y (km): -0.2237747135442E+04 Z (km): 0.2304033987381E+04 and planetodetic coordinates Longitude (deg): -157.8864000000000 Latitude (deg): 21.3161000000000 Altitude (km): 0.0000000000000E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HAWQ_TOPO = 399104285 FRAME_399104285_NAME = 'NDOSL_HAWQ_TOPO' FRAME_399104285_CLASS = 4 FRAME_399104285_CLASS_ID = 399104285 FRAME_399104285_CENTER = 399104285 OBJECT_399104285_FRAME = 'NDOSL_HAWQ_TOPO' TKFRAME_399104285_RELATIVE = 'ITRF93' TKFRAME_399104285_SPEC = 'ANGLES' TKFRAME_399104285_UNITS = 'DEGREES' TKFRAME_399104285_AXES = ( 3, 2, 3 ) TKFRAME_399104285_ANGLES = ( -202.1136000000000, -68.6839000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HAWS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HAWS_TOPO is centered at the site NDOSL_HAWS, which has Cartesian coordinates X (km): -0.5496488297871E+04 Y (km): -0.2486033976255E+04 Z (km): 0.2064860466929E+04 and planetodetic coordinates Longitude (deg): -155.6630000000000 Latitude (deg): 19.0135837222000 Altitude (km): 0.2743140000013E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HAWS_TOPO = 399101706 FRAME_399101706_NAME = 'NDOSL_HAWS_TOPO' FRAME_399101706_CLASS = 4 FRAME_399101706_CLASS_ID = 399101706 FRAME_399101706_CENTER = 399101706 OBJECT_399101706_FRAME = 'NDOSL_HAWS_TOPO' TKFRAME_399101706_RELATIVE = 'ITRF93' TKFRAME_399101706_SPEC = 'ANGLES' TKFRAME_399101706_UNITS = 'DEGREES' TKFRAME_399101706_AXES = ( 3, 2, 3 ) TKFRAME_399101706_ANGLES = ( -204.3370000000000, -70.9864162778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HB33_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HB33_TOPO is centered at the site NDOSL_HB33, which has Cartesian coordinates X (km): 0.5084675594254E+04 Y (km): 0.2670357492416E+04 Z (km): -0.2768430257473E+04 and planetodetic coordinates Longitude (deg): 27.7074472222000 Latitude (deg): -25.8864277778000 Altitude (km): 0.1563720000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HB33_TOPO = 399101325 FRAME_399101325_NAME = 'NDOSL_HB33_TOPO' FRAME_399101325_CLASS = 4 FRAME_399101325_CLASS_ID = 399101325 FRAME_399101325_CENTER = 399101325 OBJECT_399101325_FRAME = 'NDOSL_HB33_TOPO' TKFRAME_399101325_RELATIVE = 'ITRF93' TKFRAME_399101325_SPEC = 'ANGLES' TKFRAME_399101325_UNITS = 'DEGREES' TKFRAME_399101325_AXES = ( 3, 2, 3 ) TKFRAME_399101325_ANGLES = ( -27.7074472222000, -115.8864277778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HB4S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HB4S_TOPO is centered at the site NDOSL_HB4S, which has Cartesian coordinates X (km): 0.5084411606567E+04 Y (km): 0.2670802626386E+04 Z (km): -0.2768453952312E+04 and planetodetic coordinates Longitude (deg): 27.7126033056000 Latitude (deg): -25.8867254444000 Altitude (km): 0.1550021000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HB4S_TOPO = 399101378 FRAME_399101378_NAME = 'NDOSL_HB4S_TOPO' FRAME_399101378_CLASS = 4 FRAME_399101378_CLASS_ID = 399101378 FRAME_399101378_CENTER = 399101378 OBJECT_399101378_FRAME = 'NDOSL_HB4S_TOPO' TKFRAME_399101378_RELATIVE = 'ITRF93' TKFRAME_399101378_SPEC = 'ANGLES' TKFRAME_399101378_UNITS = 'DEGREES' TKFRAME_399101378_AXES = ( 3, 2, 3 ) TKFRAME_399101378_ANGLES = ( -27.7126033056000, -115.8867254444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HB5S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HB5S_TOPO is centered at the site NDOSL_HB5S, which has Cartesian coordinates X (km): 0.5084693655400E+04 Y (km): 0.2670279187703E+04 Z (km): -0.2768482640287E+04 and planetodetic coordinates Longitude (deg): 27.7066718333000 Latitude (deg): -25.8869335000000 Altitude (km): 0.1568220999999E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HB5S_TOPO = 399101403 FRAME_399101403_NAME = 'NDOSL_HB5S_TOPO' FRAME_399101403_CLASS = 4 FRAME_399101403_CLASS_ID = 399101403 FRAME_399101403_CENTER = 399101403 OBJECT_399101403_FRAME = 'NDOSL_HB5S_TOPO' TKFRAME_399101403_RELATIVE = 'ITRF93' TKFRAME_399101403_SPEC = 'ANGLES' TKFRAME_399101403_UNITS = 'DEGREES' TKFRAME_399101403_AXES = ( 3, 2, 3 ) TKFRAME_399101403_ANGLES = ( -27.7066718333000, -115.8869335000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HBK3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HBK3_TOPO is centered at the site NDOSL_HBK3, which has Cartesian coordinates X (km): 0.5084410879386E+04 Y (km): 0.2670801870124E+04 Z (km): -0.2768453756640E+04 and planetodetic coordinates Longitude (deg): 27.7126000000000 Latitude (deg): -25.8867277778000 Altitude (km): 0.1549040000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HBK3_TOPO = 399101324 FRAME_399101324_NAME = 'NDOSL_HBK3_TOPO' FRAME_399101324_CLASS = 4 FRAME_399101324_CLASS_ID = 399101324 FRAME_399101324_CENTER = 399101324 OBJECT_399101324_FRAME = 'NDOSL_HBK3_TOPO' TKFRAME_399101324_RELATIVE = 'ITRF93' TKFRAME_399101324_SPEC = 'ANGLES' TKFRAME_399101324_UNITS = 'DEGREES' TKFRAME_399101324_AXES = ( 3, 2, 3 ) TKFRAME_399101324_ANGLES = ( -27.7126000000000, -115.8867277778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HBKS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HBKS_TOPO is centered at the site NDOSL_HBKS, which has Cartesian coordinates X (km): 0.5084423834979E+04 Y (km): 0.2670740740296E+04 Z (km): -0.2768479057500E+04 and planetodetic coordinates Longitude (deg): 27.7120000000000 Latitude (deg): -25.8870000000000 Altitude (km): 0.1544829999999E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HBKS_TOPO = 399101402 FRAME_399101402_NAME = 'NDOSL_HBKS_TOPO' FRAME_399101402_CLASS = 4 FRAME_399101402_CLASS_ID = 399101402 FRAME_399101402_CENTER = 399101402 OBJECT_399101402_FRAME = 'NDOSL_HBKS_TOPO' TKFRAME_399101402_RELATIVE = 'ITRF93' TKFRAME_399101402_SPEC = 'ANGLES' TKFRAME_399101402_UNITS = 'DEGREES' TKFRAME_399101402_AXES = ( 3, 2, 3 ) TKFRAME_399101402_ANGLES = ( -27.7120000000000, -115.8870000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HOLF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HOLF_TOPO is centered at the site NDOSL_HOLF, which has Cartesian coordinates X (km): -0.1486737063477E+04 Y (km): -0.5151201605285E+04 Z (km): 0.3445462904605E+04 and planetodetic coordinates Longitude (deg): -106.0991695556000 Latitude (deg): 32.9014638611000 Altitude (km): 0.1241500000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HOLF_TOPO = 399104144 FRAME_399104144_NAME = 'NDOSL_HOLF_TOPO' FRAME_399104144_CLASS = 4 FRAME_399104144_CLASS_ID = 399104144 FRAME_399104144_CENTER = 399104144 OBJECT_399104144_FRAME = 'NDOSL_HOLF_TOPO' TKFRAME_399104144_RELATIVE = 'ITRF93' TKFRAME_399104144_SPEC = 'ANGLES' TKFRAME_399104144_UNITS = 'DEGREES' TKFRAME_399104144_AXES = ( 3, 2, 3 ) TKFRAME_399104144_ANGLES = ( -253.9008304444000, -57.0985361389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HR1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HR1S_TOPO is centered at the site NDOSL_HR1S, which has Cartesian coordinates X (km): 0.1264254932266E+04 Y (km): -0.4874867542793E+04 Z (km): 0.3900663845303E+04 and planetodetic coordinates Longitude (deg): -75.4611355556000 Latitude (deg): 37.9454991667000 Altitude (km): -0.1851000000157E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HR1S_TOPO = 399101718 FRAME_399101718_NAME = 'NDOSL_HR1S_TOPO' FRAME_399101718_CLASS = 4 FRAME_399101718_CLASS_ID = 399101718 FRAME_399101718_CENTER = 399101718 OBJECT_399101718_FRAME = 'NDOSL_HR1S_TOPO' TKFRAME_399101718_RELATIVE = 'ITRF93' TKFRAME_399101718_SPEC = 'ANGLES' TKFRAME_399101718_UNITS = 'DEGREES' TKFRAME_399101718_AXES = ( 3, 2, 3 ) TKFRAME_399101718_ANGLES = ( -284.5388644444000, -52.0545008333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HR2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HR2S_TOPO is centered at the site NDOSL_HR2S, which has Cartesian coordinates X (km): 0.1264175195774E+04 Y (km): -0.4874894271644E+04 Z (km): 0.3900658090507E+04 and planetodetic coordinates Longitude (deg): -75.4620900000000 Latitude (deg): 37.9454258333000 Altitude (km): -0.1742999999952E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HR2S_TOPO = 399101719 FRAME_399101719_NAME = 'NDOSL_HR2S_TOPO' FRAME_399101719_CLASS = 4 FRAME_399101719_CLASS_ID = 399101719 FRAME_399101719_CENTER = 399101719 OBJECT_399101719_FRAME = 'NDOSL_HR2S_TOPO' TKFRAME_399101719_RELATIVE = 'ITRF93' TKFRAME_399101719_SPEC = 'ANGLES' TKFRAME_399101719_UNITS = 'DEGREES' TKFRAME_399101719_AXES = ( 3, 2, 3 ) TKFRAME_399101719_ANGLES = ( -284.5379100000000, -52.0545741667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HR3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HR3S_TOPO is centered at the site NDOSL_HR3S, which has Cartesian coordinates X (km): 0.1129870040526E+04 Y (km): -0.4832945194558E+04 Z (km): 0.3992349883153E+04 and planetodetic coordinates Longitude (deg): -76.8414383333000 Latitude (deg): 39.0006027778000 Altitude (km): -0.3041999999834E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HR3S_TOPO = 399101749 FRAME_399101749_NAME = 'NDOSL_HR3S_TOPO' FRAME_399101749_CLASS = 4 FRAME_399101749_CLASS_ID = 399101749 FRAME_399101749_CENTER = 399101749 OBJECT_399101749_FRAME = 'NDOSL_HR3S_TOPO' TKFRAME_399101749_RELATIVE = 'ITRF93' TKFRAME_399101749_SPEC = 'ANGLES' TKFRAME_399101749_UNITS = 'DEGREES' TKFRAME_399101749_AXES = ( 3, 2, 3 ) TKFRAME_399101749_ANGLES = ( -283.1585616667000, -50.9993972222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HT2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HT2S_TOPO is centered at the site NDOSL_HT2S, which has Cartesian coordinates X (km): -0.5512486525629E+04 Y (km): -0.2197889843733E+04 Z (km): 0.2330212222995E+04 and planetodetic coordinates Longitude (deg): -158.2622788333000 Latitude (deg): 21.5689718056000 Altitude (km): 0.3196579999999E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HT2S_TOPO = 399101373 FRAME_399101373_NAME = 'NDOSL_HT2S_TOPO' FRAME_399101373_CLASS = 4 FRAME_399101373_CLASS_ID = 399101373 FRAME_399101373_CENTER = 399101373 OBJECT_399101373_FRAME = 'NDOSL_HT2S_TOPO' TKFRAME_399101373_RELATIVE = 'ITRF93' TKFRAME_399101373_SPEC = 'ANGLES' TKFRAME_399101373_UNITS = 'DEGREES' TKFRAME_399101373_AXES = ( 3, 2, 3 ) TKFRAME_399101373_ANGLES = ( -201.7377211667000, -68.4310281944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HTSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HTSS_TOPO is centered at the site NDOSL_HTSS, which has Cartesian coordinates X (km): -0.5512060641593E+04 Y (km): -0.2199971402340E+04 Z (km): 0.2329563013744E+04 and planetodetic coordinates Longitude (deg): -158.2420895556000 Latitude (deg): 21.5622721944000 Altitude (km): 0.4304229999991E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HTSS_TOPO = 399101367 FRAME_399101367_NAME = 'NDOSL_HTSS_TOPO' FRAME_399101367_CLASS = 4 FRAME_399101367_CLASS_ID = 399101367 FRAME_399101367_CENTER = 399101367 OBJECT_399101367_FRAME = 'NDOSL_HTSS_TOPO' TKFRAME_399101367_RELATIVE = 'ITRF93' TKFRAME_399101367_SPEC = 'ANGLES' TKFRAME_399101367_UNITS = 'DEGREES' TKFRAME_399101367_AXES = ( 3, 2, 3 ) TKFRAME_399101367_ANGLES = ( -201.7579104444000, -68.4377278056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_HWIS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_HWIS_TOPO is centered at the site NDOSL_HWIS, which has Cartesian coordinates X (km): -0.5496570842713E+04 Y (km): -0.2486036498987E+04 Z (km): 0.2064924300749E+04 and planetodetic coordinates Longitude (deg): -155.6633012500000 Latitude (deg): 19.0139045000000 Altitude (km): 0.3671999999993E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_HWIS_TOPO = 399101903 FRAME_399101903_NAME = 'NDOSL_HWIS_TOPO' FRAME_399101903_CLASS = 4 FRAME_399101903_CLASS_ID = 399101903 FRAME_399101903_CENTER = 399101903 OBJECT_399101903_FRAME = 'NDOSL_HWIS_TOPO' TKFRAME_399101903_RELATIVE = 'ITRF93' TKFRAME_399101903_SPEC = 'ANGLES' TKFRAME_399101903_UNITS = 'DEGREES' TKFRAME_399101903_AXES = ( 3, 2, 3 ) TKFRAME_399101903_ANGLES = ( -204.3366987500000, -70.9860955000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_JD2Y_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_JD2Y_TOPO is centered at the site NDOSL_JD2Y, which has Cartesian coordinates X (km): 0.9771551901217E+03 Y (km): -0.5603212335465E+04 Z (km): 0.2876460164466E+04 and planetodetic coordinates Longitude (deg): -80.1075608056000 Latitude (deg): 26.9822298611000 Altitude (km): -0.1960000000799E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_JD2Y_TOPO = 399101818 FRAME_399101818_NAME = 'NDOSL_JD2Y_TOPO' FRAME_399101818_CLASS = 4 FRAME_399101818_CLASS_ID = 399101818 FRAME_399101818_CENTER = 399101818 OBJECT_399101818_FRAME = 'NDOSL_JD2Y_TOPO' TKFRAME_399101818_RELATIVE = 'ITRF93' TKFRAME_399101818_SPEC = 'ANGLES' TKFRAME_399101818_UNITS = 'DEGREES' TKFRAME_399101818_AXES = ( 3, 2, 3 ) TKFRAME_399101818_ANGLES = ( -279.8924391944000, -63.0177701389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_JDIQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_JDIQ_TOPO is centered at the site NDOSL_JDIQ, which has Cartesian coordinates X (km): 0.9770849549811E+03 Y (km): -0.5603181278011E+04 Z (km): 0.2876534163167E+04 and planetodetic coordinates Longitude (deg): -80.1082040556001 Latitude (deg): 26.9829996944000 Altitude (km): -0.6402999999721E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_JDIQ_TOPO = 399104248 FRAME_399104248_NAME = 'NDOSL_JDIQ_TOPO' FRAME_399104248_CLASS = 4 FRAME_399104248_CLASS_ID = 399104248 FRAME_399104248_CENTER = 399104248 OBJECT_399104248_FRAME = 'NDOSL_JDIQ_TOPO' TKFRAME_399104248_RELATIVE = 'ITRF93' TKFRAME_399104248_SPEC = 'ANGLES' TKFRAME_399104248_UNITS = 'DEGREES' TKFRAME_399104248_AXES = ( 3, 2, 3 ) TKFRAME_399104248_ANGLES = ( -279.8917959444000, -63.0170003056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_JDIY_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_JDIY_TOPO is centered at the site NDOSL_JDIY, which has Cartesian coordinates X (km): 0.9770242564123E+03 Y (km): -0.5603147085373E+04 Z (km): 0.2876611702953E+04 and planetodetic coordinates Longitude (deg): -80.1087472500000 Latitude (deg): 26.9838039444000 Altitude (km): -0.1053000000023E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_JDIY_TOPO = 399101817 FRAME_399101817_NAME = 'NDOSL_JDIY_TOPO' FRAME_399101817_CLASS = 4 FRAME_399101817_CLASS_ID = 399101817 FRAME_399101817_CENTER = 399101817 OBJECT_399101817_FRAME = 'NDOSL_JDIY_TOPO' TKFRAME_399101817_RELATIVE = 'ITRF93' TKFRAME_399101817_SPEC = 'ANGLES' TKFRAME_399101817_UNITS = 'DEGREES' TKFRAME_399101817_AXES = ( 3, 2, 3 ) TKFRAME_399101817_ANGLES = ( -279.8912527500000, -63.0161960556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_JSCJ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_JSCJ_TOPO is centered at the site NDOSL_JSCJ, which has Cartesian coordinates X (km): -0.4926142522400E+03 Y (km): -0.5530535974711E+04 Z (km): 0.3128228811784E+04 and planetodetic coordinates Longitude (deg): -95.0900000000000 Latitude (deg): 29.5616896111000 Altitude (km): 0.4953100000028E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_JSCJ_TOPO = 399100291 FRAME_399100291_NAME = 'NDOSL_JSCJ_TOPO' FRAME_399100291_CLASS = 4 FRAME_399100291_CLASS_ID = 399100291 FRAME_399100291_CENTER = 399100291 OBJECT_399100291_FRAME = 'NDOSL_JSCJ_TOPO' TKFRAME_399100291_RELATIVE = 'ITRF93' TKFRAME_399100291_SPEC = 'ANGLES' TKFRAME_399100291_UNITS = 'DEGREES' TKFRAME_399100291_AXES = ( 3, 2, 3 ) TKFRAME_399100291_ANGLES = ( -264.9100000000000, -60.4383103889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KA2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KA2S_TOPO is centered at the site NDOSL_KA2S, which has Cartesian coordinates X (km): -0.3941769780886E+04 Y (km): 0.3367567844493E+04 Z (km): 0.3701626094660E+04 and planetodetic coordinates Longitude (deg): 139.4917777778000 Latitude (deg): 35.7087618611000 Altitude (km): -0.6412449999991E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KA2S_TOPO = 399101735 FRAME_399101735_NAME = 'NDOSL_KA2S_TOPO' FRAME_399101735_CLASS = 4 FRAME_399101735_CLASS_ID = 399101735 FRAME_399101735_CENTER = 399101735 OBJECT_399101735_FRAME = 'NDOSL_KA2S_TOPO' TKFRAME_399101735_RELATIVE = 'ITRF93' TKFRAME_399101735_SPEC = 'ANGLES' TKFRAME_399101735_UNITS = 'DEGREES' TKFRAME_399101735_AXES = ( 3, 2, 3 ) TKFRAME_399101735_ANGLES = ( -139.4917777778000, -54.2912381389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KENS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KENS_TOPO is centered at the site NDOSL_KENS, which has Cartesian coordinates X (km): 0.4865387245068E+04 Y (km): 0.4110771216192E+04 Z (km): -0.3310843913736E+03 and planetodetic coordinates Longitude (deg): 40.1945050000000 Latitude (deg): -2.9955575000000 Altitude (km): 0.1231400000236E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KENS_TOPO = 399104722 FRAME_399104722_NAME = 'NDOSL_KENS_TOPO' FRAME_399104722_CLASS = 4 FRAME_399104722_CLASS_ID = 399104722 FRAME_399104722_CENTER = 399104722 OBJECT_399104722_FRAME = 'NDOSL_KENS_TOPO' TKFRAME_399104722_RELATIVE = 'ITRF93' TKFRAME_399104722_SPEC = 'ANGLES' TKFRAME_399104722_UNITS = 'DEGREES' TKFRAME_399104722_AXES = ( 3, 2, 3 ) TKFRAME_399104722_ANGLES = ( -40.1945050000000, -92.9955575000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KERS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KERS_TOPO is centered at the site NDOSL_KERS, which has Cartesian coordinates X (km): 0.1406177992599E+04 Y (km): 0.3918095786361E+04 Z (km): -0.4816278802090E+04 and planetodetic coordinates Longitude (deg): 70.2572820000000 Latitude (deg): -49.3529060000000 Altitude (km): 0.8247100000013E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KERS_TOPO = 399104253 FRAME_399104253_NAME = 'NDOSL_KERS_TOPO' FRAME_399104253_CLASS = 4 FRAME_399104253_CLASS_ID = 399104253 FRAME_399104253_CENTER = 399104253 OBJECT_399104253_FRAME = 'NDOSL_KERS_TOPO' TKFRAME_399104253_RELATIVE = 'ITRF93' TKFRAME_399104253_SPEC = 'ANGLES' TKFRAME_399104253_UNITS = 'DEGREES' TKFRAME_399104253_AXES = ( 3, 2, 3 ) TKFRAME_399104253_ANGLES = ( -70.2572820000000, -139.3529060000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KGLQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KGLQ_TOPO is centered at the site NDOSL_KGLQ, which has Cartesian coordinates X (km): 0.1406278193146E+04 Y (km): 0.3918095775825E+04 Z (km): -0.4816149093819E+04 and planetodetic coordinates Longitude (deg): 70.2559838889000 Latitude (deg): -49.3519154444000 Altitude (km): 0.6099999999669E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KGLQ_TOPO = 399104261 FRAME_399104261_NAME = 'NDOSL_KGLQ_TOPO' FRAME_399104261_CLASS = 4 FRAME_399104261_CLASS_ID = 399104261 FRAME_399104261_CENTER = 399104261 OBJECT_399104261_FRAME = 'NDOSL_KGLQ_TOPO' TKFRAME_399104261_RELATIVE = 'ITRF93' TKFRAME_399104261_SPEC = 'ANGLES' TKFRAME_399104261_UNITS = 'DEGREES' TKFRAME_399104261_AXES = ( 3, 2, 3 ) TKFRAME_399104261_ANGLES = ( -70.2559838889000, -139.3519154444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KI2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KI2S_TOPO is centered at the site NDOSL_KI2S, which has Cartesian coordinates X (km): 0.2251508434011E+04 Y (km): 0.8626657844757E+03 Z (km): 0.5885477652789E+04 and planetodetic coordinates Longitude (deg): 20.9643416944000 Latitude (deg): 67.8571251667000 Altitude (km): 0.4022750000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KI2S_TOPO = 399101727 FRAME_399101727_NAME = 'NDOSL_KI2S_TOPO' FRAME_399101727_CLASS = 4 FRAME_399101727_CLASS_ID = 399101727 FRAME_399101727_CENTER = 399101727 OBJECT_399101727_FRAME = 'NDOSL_KI2S_TOPO' TKFRAME_399101727_RELATIVE = 'ITRF93' TKFRAME_399101727_SPEC = 'ANGLES' TKFRAME_399101727_UNITS = 'DEGREES' TKFRAME_399101727_AXES = ( 3, 2, 3 ) TKFRAME_399101727_ANGLES = ( -20.9643416944000, -22.1428748333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KICS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KICS_TOPO is centered at the site NDOSL_KICS, which has Cartesian coordinates X (km): 0.2247453164507E+04 Y (km): 0.8654524878691E+03 Z (km): 0.5886652117660E+04 and planetodetic coordinates Longitude (deg): 21.0607690000000 Latitude (deg): 67.8842320000000 Altitude (km): 0.4406040000008E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KICS_TOPO = 399104255 FRAME_399104255_NAME = 'NDOSL_KICS_TOPO' FRAME_399104255_CLASS = 4 FRAME_399104255_CLASS_ID = 399104255 FRAME_399104255_CENTER = 399104255 OBJECT_399104255_FRAME = 'NDOSL_KICS_TOPO' TKFRAME_399104255_RELATIVE = 'ITRF93' TKFRAME_399104255_SPEC = 'ANGLES' TKFRAME_399104255_UNITS = 'DEGREES' TKFRAME_399104255_AXES = ( 3, 2, 3 ) TKFRAME_399104255_ANGLES = ( -21.0607690000000, -22.1157680000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KILS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KILS_TOPO is centered at the site NDOSL_KILS, which has Cartesian coordinates X (km): 0.2248198087503E+04 Y (km): 0.8658099940681E+03 Z (km): 0.5886397535377E+04 and planetodetic coordinates Longitude (deg): 21.0623370000000 Latitude (deg): 67.8765320000000 Altitude (km): 0.5148920000008E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KILS_TOPO = 399104256 FRAME_399104256_NAME = 'NDOSL_KILS_TOPO' FRAME_399104256_CLASS = 4 FRAME_399104256_CLASS_ID = 399104256 FRAME_399104256_CENTER = 399104256 OBJECT_399104256_FRAME = 'NDOSL_KILS_TOPO' TKFRAME_399104256_RELATIVE = 'ITRF93' TKFRAME_399104256_SPEC = 'ANGLES' TKFRAME_399104256_UNITS = 'DEGREES' TKFRAME_399104256_AXES = ( 3, 2, 3 ) TKFRAME_399104256_ANGLES = ( -21.0623370000000, -22.1234680000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KIXS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KIXS_TOPO is centered at the site NDOSL_KIXS, which has Cartesian coordinates X (km): 0.2248023139701E+04 Y (km): 0.8657904225677E+03 Z (km): 0.5886459941386E+04 and planetodetic coordinates Longitude (deg): 21.0633980000000 Latitude (deg): 67.8781570000000 Altitude (km): 0.5085730000001E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KIXS_TOPO = 399104257 FRAME_399104257_NAME = 'NDOSL_KIXS_TOPO' FRAME_399104257_CLASS = 4 FRAME_399104257_CLASS_ID = 399104257 FRAME_399104257_CENTER = 399104257 OBJECT_399104257_FRAME = 'NDOSL_KIXS_TOPO' TKFRAME_399104257_RELATIVE = 'ITRF93' TKFRAME_399104257_SPEC = 'ANGLES' TKFRAME_399104257_UNITS = 'DEGREES' TKFRAME_399104257_AXES = ( 3, 2, 3 ) TKFRAME_399104257_ANGLES = ( -21.0633980000000, -22.1218430000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KLMS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KLMS_TOPO is centered at the site NDOSL_KLMS, which has Cartesian coordinates X (km): 0.1258450688282E+04 Y (km): 0.3465910745496E+03 Z (km): 0.6222718040792E+04 and planetodetic coordinates Longitude (deg): 15.3981381389000 Latitude (deg): 78.2302216667000 Altitude (km): 0.4985200000013E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KLMS_TOPO = 399101710 FRAME_399101710_NAME = 'NDOSL_KLMS_TOPO' FRAME_399101710_CLASS = 4 FRAME_399101710_CLASS_ID = 399101710 FRAME_399101710_CENTER = 399101710 OBJECT_399101710_FRAME = 'NDOSL_KLMS_TOPO' TKFRAME_399101710_RELATIVE = 'ITRF93' TKFRAME_399101710_SPEC = 'ANGLES' TKFRAME_399101710_UNITS = 'DEGREES' TKFRAME_399101710_AXES = ( 3, 2, 3 ) TKFRAME_399101710_ANGLES = ( -15.3981381389000, -11.7697783333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KM2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KM2F_TOPO is centered at the site NDOSL_KM2F, which has Cartesian coordinates X (km): -0.6143532173108E+04 Y (km): 0.1364318434358E+04 Z (km): 0.1034345581830E+04 and planetodetic coordinates Longitude (deg): 167.4792883333000 Latitude (deg): 9.3954288056000 Altitude (km): 0.6286000000147E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KM2F_TOPO = 399104971 FRAME_399104971_NAME = 'NDOSL_KM2F_TOPO' FRAME_399104971_CLASS = 4 FRAME_399104971_CLASS_ID = 399104971 FRAME_399104971_CENTER = 399104971 OBJECT_399104971_FRAME = 'NDOSL_KM2F_TOPO' TKFRAME_399104971_RELATIVE = 'ITRF93' TKFRAME_399104971_SPEC = 'ANGLES' TKFRAME_399104971_UNITS = 'DEGREES' TKFRAME_399104971_AXES = ( 3, 2, 3 ) TKFRAME_399104971_ANGLES = ( -167.4792883333000, -80.6045711944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KMPF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KMPF_TOPO is centered at the site NDOSL_KMPF, which has Cartesian coordinates X (km): -0.6160802828876E+04 Y (km): 0.1340288762209E+04 Z (km): 0.9607529086714E+03 and planetodetic coordinates Longitude (deg): 167.7264900556000 Latitude (deg): 8.7216769167000 Altitude (km): 0.3926299999973E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KMPF_TOPO = 399104110 FRAME_399104110_NAME = 'NDOSL_KMPF_TOPO' FRAME_399104110_CLASS = 4 FRAME_399104110_CLASS_ID = 399104110 FRAME_399104110_CENTER = 399104110 OBJECT_399104110_FRAME = 'NDOSL_KMPF_TOPO' TKFRAME_399104110_RELATIVE = 'ITRF93' TKFRAME_399104110_SPEC = 'ANGLES' TKFRAME_399104110_UNITS = 'DEGREES' TKFRAME_399104110_AXES = ( 3, 2, 3 ) TKFRAME_399104110_ANGLES = ( -167.7264900556000, -81.2783230833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KMQF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KMQF_TOPO is centered at the site NDOSL_KMQF, which has Cartesian coordinates X (km): -0.6160806596867E+04 Y (km): 0.1340274722973E+04 Z (km): 0.9607483689382E+03 and planetodetic coordinates Longitude (deg): 167.7266220000000 Latitude (deg): 8.7216353889000 Altitude (km): 0.3926400000046E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KMQF_TOPO = 399104111 FRAME_399104111_NAME = 'NDOSL_KMQF_TOPO' FRAME_399104111_CLASS = 4 FRAME_399104111_CLASS_ID = 399104111 FRAME_399104111_CENTER = 399104111 OBJECT_399104111_FRAME = 'NDOSL_KMQF_TOPO' TKFRAME_399104111_RELATIVE = 'ITRF93' TKFRAME_399104111_SPEC = 'ANGLES' TKFRAME_399104111_UNITS = 'DEGREES' TKFRAME_399104111_AXES = ( 3, 2, 3 ) TKFRAME_399104111_ANGLES = ( -167.7266220000000, -81.2783646111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KMRF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KMRF_TOPO is centered at the site NDOSL_KMRF, which has Cartesian coordinates X (km): -0.6143536475336E+04 Y (km): 0.1363997621973E+04 Z (km): 0.1034706781148E+04 and planetodetic coordinates Longitude (deg): 167.4821481944000 Latitude (deg): 9.3987471111000 Altitude (km): 0.5737000000050E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KMRF_TOPO = 399104968 FRAME_399104968_NAME = 'NDOSL_KMRF_TOPO' FRAME_399104968_CLASS = 4 FRAME_399104968_CLASS_ID = 399104968 FRAME_399104968_CENTER = 399104968 OBJECT_399104968_FRAME = 'NDOSL_KMRF_TOPO' TKFRAME_399104968_RELATIVE = 'ITRF93' TKFRAME_399104968_SPEC = 'ANGLES' TKFRAME_399104968_UNITS = 'DEGREES' TKFRAME_399104968_AXES = ( 3, 2, 3 ) TKFRAME_399104968_ANGLES = ( -167.4821481944000, -80.6012528889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KMRQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KMRQ_TOPO is centered at the site NDOSL_KMRQ, which has Cartesian coordinates X (km): -0.6143541427402E+04 Y (km): 0.1363919833016E+04 Z (km): 0.1034688251331E+04 and planetodetic coordinates Longitude (deg): 167.4828493611000 Latitude (deg): 9.3985995833000 Altitude (km): 0.4248000000020E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KMRQ_TOPO = 399104969 FRAME_399104969_NAME = 'NDOSL_KMRQ_TOPO' FRAME_399104969_CLASS = 4 FRAME_399104969_CLASS_ID = 399104969 FRAME_399104969_CENTER = 399104969 OBJECT_399104969_FRAME = 'NDOSL_KMRQ_TOPO' TKFRAME_399104969_RELATIVE = 'ITRF93' TKFRAME_399104969_SPEC = 'ANGLES' TKFRAME_399104969_UNITS = 'DEGREES' TKFRAME_399104969_AXES = ( 3, 2, 3 ) TKFRAME_399104969_ANGLES = ( -167.4828493611000, -80.6014004167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KMRT_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KMRT_TOPO is centered at the site NDOSL_KMRT, which has Cartesian coordinates X (km): -0.6160670456112E+04 Y (km): 0.1341157041062E+04 Z (km): 0.9605228872319E+03 and planetodetic coordinates Longitude (deg): 167.7185242778000 Latitude (deg): 8.7195454167000 Altitude (km): 0.5904000000029E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KMRT_TOPO = 399104970 FRAME_399104970_NAME = 'NDOSL_KMRT_TOPO' FRAME_399104970_CLASS = 4 FRAME_399104970_CLASS_ID = 399104970 FRAME_399104970_CENTER = 399104970 OBJECT_399104970_FRAME = 'NDOSL_KMRT_TOPO' TKFRAME_399104970_RELATIVE = 'ITRF93' TKFRAME_399104970_SPEC = 'ANGLES' TKFRAME_399104970_UNITS = 'DEGREES' TKFRAME_399104970_AXES = ( 3, 2, 3 ) TKFRAME_399104970_ANGLES = ( -167.7185242778000, -81.2804545833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KPTQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KPTQ_TOPO is centered at the site NDOSL_KPTQ, which has Cartesian coordinates X (km): -0.5512516826978E+04 Y (km): -0.2197421737393E+04 Z (km): 0.2330529637925E+04 and planetodetic coordinates Longitude (deg): -158.2665853333000 Latitude (deg): 21.5721197222000 Altitude (km): 0.3013199999984E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KPTQ_TOPO = 399104282 FRAME_399104282_NAME = 'NDOSL_KPTQ_TOPO' FRAME_399104282_CLASS = 4 FRAME_399104282_CLASS_ID = 399104282 FRAME_399104282_CENTER = 399104282 OBJECT_399104282_FRAME = 'NDOSL_KPTQ_TOPO' TKFRAME_399104282_RELATIVE = 'ITRF93' TKFRAME_399104282_SPEC = 'ANGLES' TKFRAME_399104282_UNITS = 'DEGREES' TKFRAME_399104282_AXES = ( 3, 2, 3 ) TKFRAME_399104282_ANGLES = ( -201.7334146667000, -68.4278802778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KRCS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KRCS_TOPO is centered at the site NDOSL_KRCS, which has Cartesian coordinates X (km): -0.4899360701387E+04 Y (km): 0.3837356742737E+04 Z (km): -0.1392404749849E+04 and planetodetic coordinates Longitude (deg): 141.9306666667000 Latitude (deg): -12.6940000000000 Altitude (km): 0.2100000000122E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KRCS_TOPO = 399101797 FRAME_399101797_NAME = 'NDOSL_KRCS_TOPO' FRAME_399101797_CLASS = 4 FRAME_399101797_CLASS_ID = 399101797 FRAME_399101797_CENTER = 399101797 OBJECT_399101797_FRAME = 'NDOSL_KRCS_TOPO' TKFRAME_399101797_RELATIVE = 'ITRF93' TKFRAME_399101797_SPEC = 'ANGLES' TKFRAME_399101797_UNITS = 'DEGREES' TKFRAME_399101797_AXES = ( 3, 2, 3 ) TKFRAME_399101797_ANGLES = ( -141.9306666667000, -102.6940000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KRUF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KRUF_TOPO is centered at the site NDOSL_KRUF, which has Cartesian coordinates X (km): 0.3854733377165E+04 Y (km): -0.5049995272582E+04 Z (km): 0.5647552382418E+03 and planetodetic coordinates Longitude (deg): -52.6449899167000 Latitude (deg): 5.1140064167000 Altitude (km): 0.1480080000019E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KRUF_TOPO = 399108501 FRAME_399108501_NAME = 'NDOSL_KRUF_TOPO' FRAME_399108501_CLASS = 4 FRAME_399108501_CLASS_ID = 399108501 FRAME_399108501_CENTER = 399108501 OBJECT_399108501_FRAME = 'NDOSL_KRUF_TOPO' TKFRAME_399108501_RELATIVE = 'ITRF93' TKFRAME_399108501_SPEC = 'ANGLES' TKFRAME_399108501_UNITS = 'DEGREES' TKFRAME_399108501_AXES = ( 3, 2, 3 ) TKFRAME_399108501_ANGLES = ( -307.3550100833000, -84.8859935833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KRUS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KRUS_TOPO is centered at the site NDOSL_KRUS, which has Cartesian coordinates X (km): 0.3855252039438E+04 Y (km): -0.5049739461148E+04 Z (km): 0.5630822134294E+03 and planetodetic coordinates Longitude (deg): -52.6398720000001 Latitude (deg): 5.0988480000000 Altitude (km): 0.1100390000000E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KRUS_TOPO = 399104258 FRAME_399104258_NAME = 'NDOSL_KRUS_TOPO' FRAME_399104258_CLASS = 4 FRAME_399104258_CLASS_ID = 399104258 FRAME_399104258_CENTER = 399104258 OBJECT_399104258_FRAME = 'NDOSL_KRUS_TOPO' TKFRAME_399104258_RELATIVE = 'ITRF93' TKFRAME_399104258_SPEC = 'ANGLES' TKFRAME_399104258_UNITS = 'DEGREES' TKFRAME_399104258_AXES = ( 3, 2, 3 ) TKFRAME_399104258_ANGLES = ( -307.3601280000000, -84.9011520000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KSWC_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KSWC_TOPO is centered at the site NDOSL_KSWC, which has Cartesian coordinates X (km): -0.3154238852424E+04 Y (km): 0.4294660958523E+04 Z (km): 0.3493723761039E+04 and planetodetic coordinates Longitude (deg): 126.2956388889000 Latitude (deg): 33.4280555556000 Altitude (km): 0.8400000000089E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KSWC_TOPO = 399101855 FRAME_399101855_NAME = 'NDOSL_KSWC_TOPO' FRAME_399101855_CLASS = 4 FRAME_399101855_CLASS_ID = 399101855 FRAME_399101855_CENTER = 399101855 OBJECT_399101855_FRAME = 'NDOSL_KSWC_TOPO' TKFRAME_399101855_RELATIVE = 'ITRF93' TKFRAME_399101855_SPEC = 'ANGLES' TKFRAME_399101855_UNITS = 'DEGREES' TKFRAME_399101855_AXES = ( 3, 2, 3 ) TKFRAME_399101855_ANGLES = ( -126.2956388889000, -56.5719444444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KU1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KU1S_TOPO is centered at the site NDOSL_KU1S, which has Cartesian coordinates X (km): 0.2246851612603E+04 Y (km): 0.8654408529628E+03 Z (km): 0.5886838514416E+04 and planetodetic coordinates Longitude (deg): 21.0656547222000 Latitude (deg): 67.8895583333000 Altitude (km): 0.4004000000010E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KU1S_TOPO = 399101905 FRAME_399101905_NAME = 'NDOSL_KU1S_TOPO' FRAME_399101905_CLASS = 4 FRAME_399101905_CLASS_ID = 399101905 FRAME_399101905_CENTER = 399101905 OBJECT_399101905_FRAME = 'NDOSL_KU1S_TOPO' TKFRAME_399101905_RELATIVE = 'ITRF93' TKFRAME_399101905_SPEC = 'ANGLES' TKFRAME_399101905_UNITS = 'DEGREES' TKFRAME_399101905_AXES = ( 3, 2, 3 ) TKFRAME_399101905_ANGLES = ( -21.0656547222000, -22.1104416667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KU2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KU2S_TOPO is centered at the site NDOSL_KU2S, which has Cartesian coordinates X (km): 0.2247554855599E+04 Y (km): 0.8654772030930E+03 Z (km): 0.5886596553537E+04 and planetodetic coordinates Longitude (deg): 21.0604483333000 Latitude (deg): 67.8831825000000 Altitude (km): 0.4281999999995E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KU2S_TOPO = 399101906 FRAME_399101906_NAME = 'NDOSL_KU2S_TOPO' FRAME_399101906_CLASS = 4 FRAME_399101906_CLASS_ID = 399101906 FRAME_399101906_CENTER = 399101906 OBJECT_399101906_FRAME = 'NDOSL_KU2S_TOPO' TKFRAME_399101906_RELATIVE = 'ITRF93' TKFRAME_399101906_SPEC = 'ANGLES' TKFRAME_399101906_UNITS = 'DEGREES' TKFRAME_399101906_AXES = ( 3, 2, 3 ) TKFRAME_399101906_ANGLES = ( -21.0604483333000, -22.1168175000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KU3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KU3S_TOPO is centered at the site NDOSL_KU3S, which has Cartesian coordinates X (km): 0.2248325047771E+04 Y (km): 0.8647624291695E+03 Z (km): 0.5886515396401E+04 and planetodetic coordinates Longitude (deg): 21.0380000000000 Latitude (deg): 67.8790708333000 Altitude (km): 0.5270000000003E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KU3S_TOPO = 399101909 FRAME_399101909_NAME = 'NDOSL_KU3S_TOPO' FRAME_399101909_CLASS = 4 FRAME_399101909_CLASS_ID = 399101909 FRAME_399101909_CENTER = 399101909 OBJECT_399101909_FRAME = 'NDOSL_KU3S_TOPO' TKFRAME_399101909_RELATIVE = 'ITRF93' TKFRAME_399101909_SPEC = 'ANGLES' TKFRAME_399101909_UNITS = 'DEGREES' TKFRAME_399101909_AXES = ( 3, 2, 3 ) TKFRAME_399101909_ANGLES = ( -21.0380000000000, -22.1209291667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_KUSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_KUSS_TOPO is centered at the site NDOSL_KUSS, which has Cartesian coordinates X (km): 0.9116662454056E+03 Y (km): -0.5532666553253E+04 Z (km): 0.3029417713343E+04 and planetodetic coordinates Longitude (deg): -80.6429523611000 Latitude (deg): 28.5420649167000 Altitude (km): 0.9830000000130E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_KUSS_TOPO = 399104055 FRAME_399104055_NAME = 'NDOSL_KUSS_TOPO' FRAME_399104055_CLASS = 4 FRAME_399104055_CLASS_ID = 399104055 FRAME_399104055_CENTER = 399104055 OBJECT_399104055_FRAME = 'NDOSL_KUSS_TOPO' TKFRAME_399104055_RELATIVE = 'ITRF93' TKFRAME_399104055_SPEC = 'ANGLES' TKFRAME_399104055_UNITS = 'DEGREES' TKFRAME_399104055_AXES = ( 3, 2, 3 ) TKFRAME_399104055_ANGLES = ( -279.3570476389000, -61.4579350833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_LANS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_LANS_TOPO is centered at the site NDOSL_LANS, which has Cartesian coordinates X (km): 0.4205607409484E+04 Y (km): -0.2550157506001E+03 Z (km): 0.4772460377408E+04 and planetodetic coordinates Longitude (deg): -3.4700000000001 Latitude (deg): 48.7514153611000 Altitude (km): 0.1106760000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_LANS_TOPO = 399101728 FRAME_399101728_NAME = 'NDOSL_LANS_TOPO' FRAME_399101728_CLASS = 4 FRAME_399101728_CLASS_ID = 399101728 FRAME_399101728_CENTER = 399101728 OBJECT_399101728_FRAME = 'NDOSL_LANS_TOPO' TKFRAME_399101728_RELATIVE = 'ITRF93' TKFRAME_399101728_SPEC = 'ANGLES' TKFRAME_399101728_UNITS = 'DEGREES' TKFRAME_399101728_AXES = ( 3, 2, 3 ) TKFRAME_399101728_ANGLES = ( -356.5300000000000, -41.2485846389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_LBVS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_LBVS_TOPO is centered at the site NDOSL_LBVS, which has Cartesian coordinates X (km): 0.6287404512087E+04 Y (km): 0.1071936299694E+04 Z (km): 0.3921337421342E+02 and planetodetic coordinates Longitude (deg): 9.6753002778000 Latitude (deg): 0.3546297778000 Altitude (km): 0.1112690000002E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_LBVS_TOPO = 399104250 FRAME_399104250_NAME = 'NDOSL_LBVS_TOPO' FRAME_399104250_CLASS = 4 FRAME_399104250_CLASS_ID = 399104250 FRAME_399104250_CENTER = 399104250 OBJECT_399104250_FRAME = 'NDOSL_LBVS_TOPO' TKFRAME_399104250_RELATIVE = 'ITRF93' TKFRAME_399104250_SPEC = 'ANGLES' TKFRAME_399104250_UNITS = 'DEGREES' TKFRAME_399104250_AXES = ( 3, 2, 3 ) TKFRAME_399104250_ANGLES = ( -9.6753002778000, -89.6453702222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_LE1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_LE1S_TOPO is centered at the site NDOSL_LE1S, which has Cartesian coordinates X (km): -0.2268883036752E+04 Y (km): -0.1447540102439E+04 Z (km): 0.5763579319939E+04 and planetodetic coordinates Longitude (deg): -147.4622550000000 Latitude (deg): 65.1168516667000 Altitude (km): 0.4140000000016E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_LE1S_TOPO = 399101721 FRAME_399101721_NAME = 'NDOSL_LE1S_TOPO' FRAME_399101721_CLASS = 4 FRAME_399101721_CLASS_ID = 399101721 FRAME_399101721_CENTER = 399101721 OBJECT_399101721_FRAME = 'NDOSL_LE1S_TOPO' TKFRAME_399101721_RELATIVE = 'ITRF93' TKFRAME_399101721_SPEC = 'ANGLES' TKFRAME_399101721_UNITS = 'DEGREES' TKFRAME_399101721_AXES = ( 3, 2, 3 ) TKFRAME_399101721_ANGLES = ( -212.5377450000000, -24.8831483333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_LE2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_LE2S_TOPO is centered at the site NDOSL_LE2S, which has Cartesian coordinates X (km): 0.1263351330344E+04 Y (km): -0.4876638192547E+04 Z (km): 0.3898731331201E+04 and planetodetic coordinates Longitude (deg): -75.4761391667000 Latitude (deg): 37.9235294444000 Altitude (km): -0.3350100000030E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_LE2S_TOPO = 399101722 FRAME_399101722_NAME = 'NDOSL_LE2S_TOPO' FRAME_399101722_CLASS = 4 FRAME_399101722_CLASS_ID = 399101722 FRAME_399101722_CENTER = 399101722 OBJECT_399101722_FRAME = 'NDOSL_LE2S_TOPO' TKFRAME_399101722_RELATIVE = 'ITRF93' TKFRAME_399101722_SPEC = 'ANGLES' TKFRAME_399101722_UNITS = 'DEGREES' TKFRAME_399101722_AXES = ( 3, 2, 3 ) TKFRAME_399101722_ANGLES = ( -284.5238608333000, -52.0764705556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MAD8_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MAD8_TOPO is centered at the site NDOSL_MAD8, which has Cartesian coordinates X (km): 0.4847826260438E+04 Y (km): -0.3533128260770E+03 Z (km): 0.4117140526581E+04 and planetodetic coordinates Longitude (deg): -4.1683849722000 Latitude (deg): 40.4554493889000 Altitude (km): 0.8378859999990E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MAD8_TOPO = 399101307 FRAME_399101307_NAME = 'NDOSL_MAD8_TOPO' FRAME_399101307_CLASS = 4 FRAME_399101307_CLASS_ID = 399101307 FRAME_399101307_CENTER = 399101307 OBJECT_399101307_FRAME = 'NDOSL_MAD8_TOPO' TKFRAME_399101307_RELATIVE = 'ITRF93' TKFRAME_399101307_SPEC = 'ANGLES' TKFRAME_399101307_UNITS = 'DEGREES' TKFRAME_399101307_AXES = ( 3, 2, 3 ) TKFRAME_399101307_ANGLES = ( -355.8316150278000, -49.5445506111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MC1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MC1S_TOPO is centered at the site NDOSL_MC1S, which has Cartesian coordinates X (km): -0.1311619413132E+04 Y (km): 0.3108494614539E+03 Z (km): -0.6213327250170E+04 and planetodetic coordinates Longitude (deg): 166.6670823333000 Latitude (deg): -77.8391295000000 Altitude (km): 0.1530000000019E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MC1S_TOPO = 399104848 FRAME_399104848_NAME = 'NDOSL_MC1S_TOPO' FRAME_399104848_CLASS = 4 FRAME_399104848_CLASS_ID = 399104848 FRAME_399104848_CENTER = 399104848 OBJECT_399104848_FRAME = 'NDOSL_MC1S_TOPO' TKFRAME_399104848_RELATIVE = 'ITRF93' TKFRAME_399104848_SPEC = 'ANGLES' TKFRAME_399104848_UNITS = 'DEGREES' TKFRAME_399104848_AXES = ( 3, 2, 3 ) TKFRAME_399104848_ANGLES = ( -166.6670823333000, -167.8391295000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MCMS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MCMS_TOPO is centered at the site NDOSL_MCMS, which has Cartesian coordinates X (km): -0.1314279420643E+04 Y (km): 0.3179576546727E+03 Z (km): -0.6212275504149E+04 and planetodetic coordinates Longitude (deg): 166.4000000000000 Latitude (deg): -77.8000000000000 Altitude (km): 0.2000000000151E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MCMS_TOPO = 399104847 FRAME_399104847_NAME = 'NDOSL_MCMS_TOPO' FRAME_399104847_CLASS = 4 FRAME_399104847_CLASS_ID = 399104847 FRAME_399104847_CENTER = 399104847 OBJECT_399104847_FRAME = 'NDOSL_MCMS_TOPO' TKFRAME_399104847_RELATIVE = 'ITRF93' TKFRAME_399104847_SPEC = 'ANGLES' TKFRAME_399104847_UNITS = 'DEGREES' TKFRAME_399104847_AXES = ( 3, 2, 3 ) TKFRAME_399104847_ANGLES = ( -166.4000000000000, -167.8000000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MDLS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MDLS_TOPO is centered at the site NDOSL_MDLS, which has Cartesian coordinates X (km): 0.1122418286641E+04 Y (km): -0.4822839186441E+04 Z (km): 0.4006831715932E+04 and planetodetic coordinates Longitude (deg): -76.8987777778000 Latitude (deg): 39.1673611111000 Altitude (km): 0.1464000000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MDLS_TOPO = 399101904 FRAME_399101904_NAME = 'NDOSL_MDLS_TOPO' FRAME_399101904_CLASS = 4 FRAME_399101904_CLASS_ID = 399101904 FRAME_399101904_CENTER = 399101904 OBJECT_399101904_FRAME = 'NDOSL_MDLS_TOPO' TKFRAME_399101904_RELATIVE = 'ITRF93' TKFRAME_399101904_SPEC = 'ANGLES' TKFRAME_399101904_UNITS = 'DEGREES' TKFRAME_399101904_AXES = ( 3, 2, 3 ) TKFRAME_399101904_ANGLES = ( -283.1012222222000, -50.8326388889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MG1D_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MG1D_TOPO is centered at the site NDOSL_MG1D, which has Cartesian coordinates X (km): 0.1823343033713E+04 Y (km): -0.4850458098898E+04 Z (km): -0.3708971779738E+04 and planetodetic coordinates Longitude (deg): -69.3981815556000 Latitude (deg): -35.7759702222000 Altitude (km): 0.1571768000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MG1D_TOPO = 399101574 FRAME_399101574_NAME = 'NDOSL_MG1D_TOPO' FRAME_399101574_CLASS = 4 FRAME_399101574_CLASS_ID = 399101574 FRAME_399101574_CENTER = 399101574 OBJECT_399101574_FRAME = 'NDOSL_MG1D_TOPO' TKFRAME_399101574_RELATIVE = 'ITRF93' TKFRAME_399101574_SPEC = 'ANGLES' TKFRAME_399101574_UNITS = 'DEGREES' TKFRAME_399101574_AXES = ( 3, 2, 3 ) TKFRAME_399101574_ANGLES = ( -290.6018184444000, -125.7759702222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MIL3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MIL3_TOPO is centered at the site NDOSL_MIL3, which has Cartesian coordinates X (km): 0.9070799248088E+03 Y (km): -0.5535208774503E+04 Z (km): 0.3026095645686E+04 and planetodetic coordinates Longitude (deg): -80.6933999444000 Latitude (deg): 28.5081238889000 Altitude (km): -0.2594999999980E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MIL3_TOPO = 399101301 FRAME_399101301_NAME = 'NDOSL_MIL3_TOPO' FRAME_399101301_CLASS = 4 FRAME_399101301_CLASS_ID = 399101301 FRAME_399101301_CENTER = 399101301 OBJECT_399101301_FRAME = 'NDOSL_MIL3_TOPO' TKFRAME_399101301_RELATIVE = 'ITRF93' TKFRAME_399101301_SPEC = 'ANGLES' TKFRAME_399101301_UNITS = 'DEGREES' TKFRAME_399101301_AXES = ( 3, 2, 3 ) TKFRAME_399101301_ANGLES = ( -279.3066000556000, -61.4918761111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MILA_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MILA_TOPO is centered at the site NDOSL_MILA, which has Cartesian coordinates X (km): 0.9071419427386E+03 Y (km): -0.5535195424213E+04 Z (km): 0.3026098523446E+04 and planetodetic coordinates Longitude (deg): -80.6927527222000 Latitude (deg): 28.5081602500000 Altitude (km): -0.2734000000017E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MILA_TOPO = 399101901 FRAME_399101901_NAME = 'NDOSL_MILA_TOPO' FRAME_399101901_CLASS = 4 FRAME_399101901_CLASS_ID = 399101901 FRAME_399101901_CENTER = 399101901 OBJECT_399101901_FRAME = 'NDOSL_MILA_TOPO' TKFRAME_399101901_RELATIVE = 'ITRF93' TKFRAME_399101901_SPEC = 'ANGLES' TKFRAME_399101901_UNITS = 'DEGREES' TKFRAME_399101901_AXES = ( 3, 2, 3 ) TKFRAME_399101901_ANGLES = ( -279.3072472778000, -61.4918397500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MILJ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MILJ_TOPO is centered at the site NDOSL_MILJ, which has Cartesian coordinates X (km): 0.9071362350941E+03 Y (km): -0.5535318082519E+04 Z (km): 0.3025889988548E+04 and planetodetic coordinates Longitude (deg): -80.6930128889000 Latitude (deg): 28.5059894722000 Altitude (km): -0.2131000000032E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MILJ_TOPO = 399100292 FRAME_399100292_NAME = 'NDOSL_MILJ_TOPO' FRAME_399100292_CLASS = 4 FRAME_399100292_CLASS_ID = 399100292 FRAME_399100292_CENTER = 399100292 OBJECT_399100292_FRAME = 'NDOSL_MILJ_TOPO' TKFRAME_399100292_RELATIVE = 'ITRF93' TKFRAME_399100292_SPEC = 'ANGLES' TKFRAME_399100292_UNITS = 'DEGREES' TKFRAME_399100292_AXES = ( 3, 2, 3 ) TKFRAME_399100292_ANGLES = ( -279.3069871111000, -61.4940105278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MIMF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MIMF_TOPO is centered at the site NDOSL_MIMF, which has Cartesian coordinates X (km): 0.9070947483476E+03 Y (km): -0.5528885909783E+04 Z (km): 0.3037567429397E+04 and planetodetic coordinates Longitude (deg): -80.6827938056000 Latitude (deg): 28.6259431944000 Altitude (km): -0.1811999999910E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MIMF_TOPO = 399104220 FRAME_399104220_NAME = 'NDOSL_MIMF_TOPO' FRAME_399104220_CLASS = 4 FRAME_399104220_CLASS_ID = 399104220 FRAME_399104220_CENTER = 399104220 OBJECT_399104220_FRAME = 'NDOSL_MIMF_TOPO' TKFRAME_399104220_RELATIVE = 'ITRF93' TKFRAME_399104220_SPEC = 'ANGLES' TKFRAME_399104220_UNITS = 'DEGREES' TKFRAME_399104220_AXES = ( 3, 2, 3 ) TKFRAME_399104220_ANGLES = ( -279.3172061944000, -61.3740568056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MLAQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MLAQ_TOPO is centered at the site NDOSL_MLAQ, which has Cartesian coordinates X (km): 0.9105986126995E+03 Y (km): -0.5539104114582E+04 Z (km): 0.3017973070061E+04 and planetodetic coordinates Longitude (deg): -80.6643876667000 Latitude (deg): 28.4247111944000 Altitude (km): -0.1734999999853E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MLAQ_TOPO = 399104084 FRAME_399104084_NAME = 'NDOSL_MLAQ_TOPO' FRAME_399104084_CLASS = 4 FRAME_399104084_CLASS_ID = 399104084 FRAME_399104084_CENTER = 399104084 OBJECT_399104084_FRAME = 'NDOSL_MLAQ_TOPO' TKFRAME_399104084_RELATIVE = 'ITRF93' TKFRAME_399104084_SPEC = 'ANGLES' TKFRAME_399104084_UNITS = 'DEGREES' TKFRAME_399104084_AXES = ( 3, 2, 3 ) TKFRAME_399104084_ANGLES = ( -279.3356123333000, -61.5752888056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MMTF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MMTF_TOPO is centered at the site NDOSL_MMTF, which has Cartesian coordinates X (km): 0.9091329473837E+03 Y (km): -0.5536467210569E+04 Z (km): 0.3023224186744E+04 and planetodetic coordinates Longitude (deg): -80.6747886389000 Latitude (deg): 28.4785768056000 Altitude (km): -0.1229800000000E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MMTF_TOPO = 399104347 FRAME_399104347_NAME = 'NDOSL_MMTF_TOPO' FRAME_399104347_CLASS = 4 FRAME_399104347_CLASS_ID = 399104347 FRAME_399104347_CENTER = 399104347 OBJECT_399104347_FRAME = 'NDOSL_MMTF_TOPO' TKFRAME_399104347_RELATIVE = 'ITRF93' TKFRAME_399104347_SPEC = 'ANGLES' TKFRAME_399104347_UNITS = 'DEGREES' TKFRAME_399104347_AXES = ( 3, 2, 3 ) TKFRAME_399104347_ANGLES = ( -279.3252113611000, -61.5214231944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MPLS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MPLS_TOPO is centered at the site NDOSL_MPLS, which has Cartesian coordinates X (km): 0.5439227114530E+04 Y (km): -0.1522118920651E+04 Z (km): 0.2953375175511E+04 and planetodetic coordinates Longitude (deg): -15.6338000000000 Latitude (deg): 27.7628920000000 Altitude (km): 0.2049000000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MPLS_TOPO = 399101967 FRAME_399101967_NAME = 'NDOSL_MPLS_TOPO' FRAME_399101967_CLASS = 4 FRAME_399101967_CLASS_ID = 399101967 FRAME_399101967_CENTER = 399101967 OBJECT_399101967_FRAME = 'NDOSL_MPLS_TOPO' TKFRAME_399101967_RELATIVE = 'ITRF93' TKFRAME_399101967_SPEC = 'ANGLES' TKFRAME_399101967_UNITS = 'DEGREES' TKFRAME_399101967_AXES = ( 3, 2, 3 ) TKFRAME_399101967_ANGLES = ( -344.3662000000000, -62.2371080000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MTLF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MTLF_TOPO is centered at the site NDOSL_MTLF, which has Cartesian coordinates X (km): -0.1913142953249E+04 Y (km): -0.5039350768498E+04 Z (km): 0.3403352733457E+04 and planetodetic coordinates Longitude (deg): -110.7888030556000 Latitude (deg): 32.4416632222000 Altitude (km): 0.2772820000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MTLF_TOPO = 399104155 FRAME_399104155_NAME = 'NDOSL_MTLF_TOPO' FRAME_399104155_CLASS = 4 FRAME_399104155_CLASS_ID = 399104155 FRAME_399104155_CENTER = 399104155 OBJECT_399104155_FRAME = 'NDOSL_MTLF_TOPO' TKFRAME_399104155_RELATIVE = 'ITRF93' TKFRAME_399104155_SPEC = 'ANGLES' TKFRAME_399104155_UNITS = 'DEGREES' TKFRAME_399104155_AXES = ( 3, 2, 3 ) TKFRAME_399104155_ANGLES = ( -249.2111969444000, -57.5583367778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_MTLS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_MTLS_TOPO is centered at the site NDOSL_MTLS, which has Cartesian coordinates X (km): -0.1913188824836E+04 Y (km): -0.5039299946354E+04 Z (km): 0.3403395104839E+04 and planetodetic coordinates Longitude (deg): -110.7894506389000 Latitude (deg): 32.4421365556000 Altitude (km): 0.2769192000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_MTLS_TOPO = 399104156 FRAME_399104156_NAME = 'NDOSL_MTLS_TOPO' FRAME_399104156_CLASS = 4 FRAME_399104156_CLASS_ID = 399104156 FRAME_399104156_CENTER = 399104156 OBJECT_399104156_FRAME = 'NDOSL_MTLS_TOPO' TKFRAME_399104156_RELATIVE = 'ITRF93' TKFRAME_399104156_SPEC = 'ANGLES' TKFRAME_399104156_UNITS = 'DEGREES' TKFRAME_399104156_AXES = ( 3, 2, 3 ) TKFRAME_399104156_ANGLES = ( -249.2105493611000, -57.5578634444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_NH2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_NH2S_TOPO is centered at the site NDOSL_NH2S, which has Cartesian coordinates X (km): 0.1473714600191E+04 Y (km): -0.4437989728974E+04 Z (km): 0.4323141795021E+04 and planetodetic coordinates Longitude (deg): -71.6303217222000 Latitude (deg): 42.9447416667000 Altitude (km): 0.1932590000007E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_NH2S_TOPO = 399101374 FRAME_399101374_NAME = 'NDOSL_NH2S_TOPO' FRAME_399101374_CLASS = 4 FRAME_399101374_CLASS_ID = 399101374 FRAME_399101374_CENTER = 399101374 OBJECT_399101374_FRAME = 'NDOSL_NH2S_TOPO' TKFRAME_399101374_RELATIVE = 'ITRF93' TKFRAME_399101374_SPEC = 'ANGLES' TKFRAME_399101374_UNITS = 'DEGREES' TKFRAME_399101374_AXES = ( 3, 2, 3 ) TKFRAME_399101374_ANGLES = ( -288.3696782778000, -47.0552583333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_NHSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_NHSS_TOPO is centered at the site NDOSL_NHSS, which has Cartesian coordinates X (km): 0.1473934611380E+04 Y (km): -0.4437678771385E+04 Z (km): 0.4323399063558E+04 and planetodetic coordinates Longitude (deg): -71.6265625278000 Latitude (deg): 42.9478213333000 Altitude (km): 0.2032800000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_NHSS_TOPO = 399101366 FRAME_399101366_NAME = 'NDOSL_NHSS_TOPO' FRAME_399101366_CLASS = 4 FRAME_399101366_CLASS_ID = 399101366 FRAME_399101366_CENTER = 399101366 OBJECT_399101366_FRAME = 'NDOSL_NHSS_TOPO' TKFRAME_399101366_RELATIVE = 'ITRF93' TKFRAME_399101366_SPEC = 'ANGLES' TKFRAME_399101366_UNITS = 'DEGREES' TKFRAME_399101366_AXES = ( 3, 2, 3 ) TKFRAME_399101366_ANGLES = ( -288.3734374722000, -47.0521786667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_NN1D_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_NN1D_TOPO is centered at the site NDOSL_NN1D, which has Cartesian coordinates X (km): -0.2414067498394E+04 Y (km): 0.4907869508220E+04 Z (km): -0.3270604830984E+04 and planetodetic coordinates Longitude (deg): 116.1915059167000 Latitude (deg): -31.0482181944000 Altitude (km): 0.2522570000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_NN1D_TOPO = 399101573 FRAME_399101573_NAME = 'NDOSL_NN1D_TOPO' FRAME_399101573_CLASS = 4 FRAME_399101573_CLASS_ID = 399101573 FRAME_399101573_CENTER = 399101573 OBJECT_399101573_FRAME = 'NDOSL_NN1D_TOPO' TKFRAME_399101573_RELATIVE = 'ITRF93' TKFRAME_399101573_SPEC = 'ANGLES' TKFRAME_399101573_UNITS = 'DEGREES' TKFRAME_399101573_AXES = ( 3, 2, 3 ) TKFRAME_399101573_ANGLES = ( -116.1915059167000, -121.0482181944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_NSGS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_NSGS_TOPO is centered at the site NDOSL_NSGS, which has Cartesian coordinates X (km): 0.3718488342007E+04 Y (km): 0.8632671621735E+03 Z (km): 0.5092634646377E+04 and planetodetic coordinates Longitude (deg): 13.0700000000000 Latitude (deg): 53.3297222222000 Altitude (km): 0.1149999999990E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_NSGS_TOPO = 399101724 FRAME_399101724_NAME = 'NDOSL_NSGS_TOPO' FRAME_399101724_CLASS = 4 FRAME_399101724_CLASS_ID = 399101724 FRAME_399101724_CENTER = 399101724 OBJECT_399101724_FRAME = 'NDOSL_NSGS_TOPO' TKFRAME_399101724_RELATIVE = 'ITRF93' TKFRAME_399101724_SPEC = 'ANGLES' TKFRAME_399101724_UNITS = 'DEGREES' TKFRAME_399101724_AXES = ( 3, 2, 3 ) TKFRAME_399101724_ANGLES = ( -13.0700000000000, -36.6702777778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ORR3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ORR3_TOPO is centered at the site NDOSL_ORR3, which has Cartesian coordinates X (km): -0.4447490565934E+04 Y (km): 0.2676864392610E+04 Z (km): -0.3695265485422E+04 and planetodetic coordinates Longitude (deg): 148.9570232222000 Latitude (deg): -35.6278928889000 Altitude (km): 0.9519820000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ORR3_TOPO = 399101320 FRAME_399101320_NAME = 'NDOSL_ORR3_TOPO' FRAME_399101320_CLASS = 4 FRAME_399101320_CLASS_ID = 399101320 FRAME_399101320_CENTER = 399101320 OBJECT_399101320_FRAME = 'NDOSL_ORR3_TOPO' TKFRAME_399101320_RELATIVE = 'ITRF93' TKFRAME_399101320_SPEC = 'ANGLES' TKFRAME_399101320_UNITS = 'DEGREES' TKFRAME_399101320_AXES = ( 3, 2, 3 ) TKFRAME_399101320_ANGLES = ( -148.9570232222000, -125.6278928889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_OTSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_OTSS_TOPO is centered at the site NDOSL_OTSS, which has Cartesian coordinates X (km): 0.4011655263861E+04 Y (km): -0.6266273835693E+02 Z (km): 0.4941509640432E+04 and planetodetic coordinates Longitude (deg): -0.8948970556000 Latitude (deg): 51.1141173333000 Altitude (km): -0.1885200000220E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_OTSS_TOPO = 399101364 FRAME_399101364_NAME = 'NDOSL_OTSS_TOPO' FRAME_399101364_CLASS = 4 FRAME_399101364_CLASS_ID = 399101364 FRAME_399101364_CENTER = 399101364 OBJECT_399101364_FRAME = 'NDOSL_OTSS_TOPO' TKFRAME_399101364_RELATIVE = 'ITRF93' TKFRAME_399101364_SPEC = 'ANGLES' TKFRAME_399101364_UNITS = 'DEGREES' TKFRAME_399101364_AXES = ( 3, 2, 3 ) TKFRAME_399101364_ANGLES = ( -359.1051029444000, -38.8858826667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PA2Q_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PA2Q_TOPO is centered at the site NDOSL_PA2Q, which has Cartesian coordinates X (km): 0.9179278657020E+03 Y (km): -0.5548417600942E+04 Z (km): 0.2998718876487E+04 and planetodetic coordinates Longitude (deg): -80.6060981944000 Latitude (deg): 28.2273281667000 Altitude (km): -0.1437999999971E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PA2Q_TOPO = 399104089 FRAME_399104089_NAME = 'NDOSL_PA2Q_TOPO' FRAME_399104089_CLASS = 4 FRAME_399104089_CLASS_ID = 399104089 FRAME_399104089_CENTER = 399104089 OBJECT_399104089_FRAME = 'NDOSL_PA2Q_TOPO' TKFRAME_399104089_RELATIVE = 'ITRF93' TKFRAME_399104089_SPEC = 'ANGLES' TKFRAME_399104089_UNITS = 'DEGREES' TKFRAME_399104089_AXES = ( 3, 2, 3 ) TKFRAME_399104089_ANGLES = ( -279.3939018056000, -61.7726718333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PATQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PATQ_TOPO is centered at the site NDOSL_PATQ, which has Cartesian coordinates X (km): 0.9185964879089E+03 Y (km): -0.5548356680617E+04 Z (km): 0.2998628775778E+04 and planetodetic coordinates Longitude (deg): -80.5992763611000 Latitude (deg): 28.2264024167000 Altitude (km): -0.1376000000023E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PATQ_TOPO = 399104060 FRAME_399104060_NAME = 'NDOSL_PATQ_TOPO' FRAME_399104060_CLASS = 4 FRAME_399104060_CLASS_ID = 399104060 FRAME_399104060_CENTER = 399104060 OBJECT_399104060_FRAME = 'NDOSL_PATQ_TOPO' TKFRAME_399104060_RELATIVE = 'ITRF93' TKFRAME_399104060_SPEC = 'ANGLES' TKFRAME_399104060_UNITS = 'DEGREES' TKFRAME_399104060_AXES = ( 3, 2, 3 ) TKFRAME_399104060_ANGLES = ( -279.4007236389000, -61.7735975833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PDLS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PDLS_TOPO is centered at the site NDOSL_PDLS, which has Cartesian coordinates X (km): 0.8811530402321E+03 Y (km): -0.5509240541736E+04 Z (km): 0.3080364677471E+04 and planetodetic coordinates Longitude (deg): -80.9130232500000 Latitude (deg): 29.0666474444000 Altitude (km): 0.9845000002729E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PDLS_TOPO = 399104054 FRAME_399104054_NAME = 'NDOSL_PDLS_TOPO' FRAME_399104054_CLASS = 4 FRAME_399104054_CLASS_ID = 399104054 FRAME_399104054_CENTER = 399104054 OBJECT_399104054_FRAME = 'NDOSL_PDLS_TOPO' TKFRAME_399104054_RELATIVE = 'ITRF93' TKFRAME_399104054_SPEC = 'ANGLES' TKFRAME_399104054_UNITS = 'DEGREES' TKFRAME_399104054_AXES = ( 3, 2, 3 ) TKFRAME_399104054_ANGLES = ( -279.0869767500000, -60.9333525556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PFTQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PFTQ_TOPO is centered at the site NDOSL_PFTQ, which has Cartesian coordinates X (km): -0.2268913947725E+04 Y (km): -0.1447502108811E+04 Z (km): 0.5763575921881E+04 and planetodetic coordinates Longitude (deg): -147.4632908333000 Latitude (deg): 65.1167930833000 Altitude (km): 0.4132840000008E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PFTQ_TOPO = 399104864 FRAME_399104864_NAME = 'NDOSL_PFTQ_TOPO' FRAME_399104864_CLASS = 4 FRAME_399104864_CLASS_ID = 399104864 FRAME_399104864_CENTER = 399104864 OBJECT_399104864_FRAME = 'NDOSL_PFTQ_TOPO' TKFRAME_399104864_RELATIVE = 'ITRF93' TKFRAME_399104864_SPEC = 'ANGLES' TKFRAME_399104864_UNITS = 'DEGREES' TKFRAME_399104864_AXES = ( 3, 2, 3 ) TKFRAME_399104864_ANGLES = ( -212.5367091667000, -24.8832069167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PFTS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PFTS_TOPO is centered at the site NDOSL_PFTS, which has Cartesian coordinates X (km): -0.2268913947725E+04 Y (km): -0.1447502108811E+04 Z (km): 0.5763575921881E+04 and planetodetic coordinates Longitude (deg): -147.4632908333000 Latitude (deg): 65.1167930833000 Altitude (km): 0.4132840000008E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PFTS_TOPO = 399104864 FRAME_399104864_NAME = 'NDOSL_PFTS_TOPO' FRAME_399104864_CLASS = 4 FRAME_399104864_CLASS_ID = 399104864 FRAME_399104864_CENTER = 399104864 OBJECT_399104864_FRAME = 'NDOSL_PFTS_TOPO' TKFRAME_399104864_RELATIVE = 'ITRF93' TKFRAME_399104864_SPEC = 'ANGLES' TKFRAME_399104864_UNITS = 'DEGREES' TKFRAME_399104864_AXES = ( 3, 2, 3 ) TKFRAME_399104864_ANGLES = ( -212.5367091667000, -24.8832069167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PIOD_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PIOD_TOPO is centered at the site NDOSL_PIOD, which has Cartesian coordinates X (km): -0.2351425016560E+04 Y (km): -0.4645079101733E+04 Z (km): 0.3673763422053E+04 and planetodetic coordinates Longitude (deg): -116.8493770556000 Latitude (deg): 35.3895182778000 Altitude (km): 0.1004213000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PIOD_TOPO = 399101511 FRAME_399101511_NAME = 'NDOSL_PIOD_TOPO' FRAME_399101511_CLASS = 4 FRAME_399101511_CLASS_ID = 399101511 FRAME_399101511_CENTER = 399101511 OBJECT_399101511_FRAME = 'NDOSL_PIOD_TOPO' TKFRAME_399101511_RELATIVE = 'ITRF93' TKFRAME_399101511_SPEC = 'ANGLES' TKFRAME_399101511_UNITS = 'DEGREES' TKFRAME_399101511_AXES = ( 3, 2, 3 ) TKFRAME_399101511_ANGLES = ( -243.1506229444000, -54.6104817222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PM2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PM2F_TOPO is centered at the site NDOSL_PM2F, which has Cartesian coordinates X (km): -0.2574923964547E+04 Y (km): -0.4616020390486E+04 Z (km): 0.3557691315382E+04 and planetodetic coordinates Longitude (deg): -119.1537985556000 Latitude (deg): 34.1225029167000 Altitude (km): -0.2220000000015E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PM2F_TOPO = 399104445 FRAME_399104445_NAME = 'NDOSL_PM2F_TOPO' FRAME_399104445_CLASS = 4 FRAME_399104445_CLASS_ID = 399104445 FRAME_399104445_CENTER = 399104445 OBJECT_399104445_FRAME = 'NDOSL_PM2F_TOPO' TKFRAME_399104445_RELATIVE = 'ITRF93' TKFRAME_399104445_SPEC = 'ANGLES' TKFRAME_399104445_UNITS = 'DEGREES' TKFRAME_399104445_AXES = ( 3, 2, 3 ) TKFRAME_399104445_ANGLES = ( -240.8462014444000, -55.8774970833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PM3F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PM3F_TOPO is centered at the site NDOSL_PM3F, which has Cartesian coordinates X (km): -0.2574990568955E+04 Y (km): -0.4615956320644E+04 Z (km): 0.3557726948347E+04 and planetodetic coordinates Longitude (deg): -119.1547674167000 Latitude (deg): 34.1228877222000 Altitude (km): -0.2166999999955E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PM3F_TOPO = 399104446 FRAME_399104446_NAME = 'NDOSL_PM3F_TOPO' FRAME_399104446_CLASS = 4 FRAME_399104446_CLASS_ID = 399104446 FRAME_399104446_CENTER = 399104446 OBJECT_399104446_FRAME = 'NDOSL_PM3F_TOPO' TKFRAME_399104446_RELATIVE = 'ITRF93' TKFRAME_399104446_SPEC = 'ANGLES' TKFRAME_399104446_UNITS = 'DEGREES' TKFRAME_399104446_AXES = ( 3, 2, 3 ) TKFRAME_399104446_ANGLES = ( -240.8452325833000, -55.8771122778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PM4F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PM4F_TOPO is centered at the site NDOSL_PM4F, which has Cartesian coordinates X (km): -0.2574857607956E+04 Y (km): -0.4616084822076E+04 Z (km): 0.3557655997927E+04 and planetodetic coordinates Longitude (deg): -119.1528301389000 Latitude (deg): 34.1221182500000 Altitude (km): -0.2219000000005E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PM4F_TOPO = 399104441 FRAME_399104441_NAME = 'NDOSL_PM4F_TOPO' FRAME_399104441_CLASS = 4 FRAME_399104441_CLASS_ID = 399104441 FRAME_399104441_CENTER = 399104441 OBJECT_399104441_FRAME = 'NDOSL_PM4F_TOPO' TKFRAME_399104441_RELATIVE = 'ITRF93' TKFRAME_399104441_SPEC = 'ANGLES' TKFRAME_399104441_UNITS = 'DEGREES' TKFRAME_399104441_AXES = ( 3, 2, 3 ) TKFRAME_399104441_ANGLES = ( -240.8471698611000, -55.8778817500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PMKS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PMKS_TOPO is centered at the site NDOSL_PMKS, which has Cartesian coordinates X (km): 0.1118526162622E+04 Y (km): -0.4867242564998E+04 Z (km): 0.3954067105452E+04 and planetodetic coordinates Longitude (deg): -77.0577412222000 Latitude (deg): 38.5577105278000 Altitude (km): 0.4194000000032E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PMKS_TOPO = 399101729 FRAME_399101729_NAME = 'NDOSL_PMKS_TOPO' FRAME_399101729_CLASS = 4 FRAME_399101729_CLASS_ID = 399101729 FRAME_399101729_CENTER = 399101729 OBJECT_399101729_FRAME = 'NDOSL_PMKS_TOPO' TKFRAME_399101729_RELATIVE = 'ITRF93' TKFRAME_399101729_SPEC = 'ANGLES' TKFRAME_399101729_UNITS = 'DEGREES' TKFRAME_399101729_AXES = ( 3, 2, 3 ) TKFRAME_399101729_ANGLES = ( -282.9422587778000, -51.4422894722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PP2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PP2F_TOPO is centered at the site NDOSL_PP2F, which has Cartesian coordinates X (km): -0.2722045768512E+04 Y (km): -0.4273301751343E+04 Z (km): 0.3861289414407E+04 and planetodetic coordinates Longitude (deg): -122.4966838889000 Latitude (deg): 37.4968543611000 Altitude (km): 0.3780000000954E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PP2F_TOPO = 399107399 FRAME_399107399_NAME = 'NDOSL_PP2F_TOPO' FRAME_399107399_CLASS = 4 FRAME_399107399_CLASS_ID = 399107399 FRAME_399107399_CENTER = 399107399 OBJECT_399107399_FRAME = 'NDOSL_PP2F_TOPO' TKFRAME_399107399_RELATIVE = 'ITRF93' TKFRAME_399107399_SPEC = 'ANGLES' TKFRAME_399107399_UNITS = 'DEGREES' TKFRAME_399107399_AXES = ( 3, 2, 3 ) TKFRAME_399107399_ANGLES = ( -237.5033161110999, -52.5031456389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PPTF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PPTF_TOPO is centered at the site NDOSL_PPTF, which has Cartesian coordinates X (km): -0.2722170286981E+04 Y (km): -0.4273165560117E+04 Z (km): 0.3861370443535E+04 and planetodetic coordinates Longitude (deg): -122.4986989722000 Latitude (deg): 37.4976966667000 Altitude (km): 0.1504900000054E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PPTF_TOPO = 399104240 FRAME_399104240_NAME = 'NDOSL_PPTF_TOPO' FRAME_399104240_CLASS = 4 FRAME_399104240_CLASS_ID = 399104240 FRAME_399104240_CENTER = 399104240 OBJECT_399104240_FRAME = 'NDOSL_PPTF_TOPO' TKFRAME_399104240_RELATIVE = 'ITRF93' TKFRAME_399104240_SPEC = 'ANGLES' TKFRAME_399104240_UNITS = 'DEGREES' TKFRAME_399104240_AXES = ( 3, 2, 3 ) TKFRAME_399104240_ANGLES = ( -237.5013010278000, -52.5023033333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PPTQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PPTQ_TOPO is centered at the site NDOSL_PPTQ, which has Cartesian coordinates X (km): -0.2722243851331E+04 Y (km): -0.4273113861600E+04 Z (km): 0.3861384137257E+04 and planetodetic coordinates Longitude (deg): -122.4997147222000 Latitude (deg): 37.4978169167000 Altitude (km): 0.2015000000041E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PPTQ_TOPO = 399104260 FRAME_399104260_NAME = 'NDOSL_PPTQ_TOPO' FRAME_399104260_CLASS = 4 FRAME_399104260_CLASS_ID = 399104260 FRAME_399104260_CENTER = 399104260 OBJECT_399104260_FRAME = 'NDOSL_PPTQ_TOPO' TKFRAME_399104260_RELATIVE = 'ITRF93' TKFRAME_399104260_SPEC = 'ANGLES' TKFRAME_399104260_UNITS = 'DEGREES' TKFRAME_399104260_AXES = ( 3, 2, 3 ) TKFRAME_399104260_ANGLES = ( -237.5002852778000, -52.5021830833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PPTY_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PPTY_TOPO is centered at the site NDOSL_PPTY, which has Cartesian coordinates X (km): -0.2722208793470E+04 Y (km): -0.4273146717269E+04 Z (km): 0.3861384957848E+04 and planetodetic coordinates Longitude (deg): -122.4991807222000 Latitude (deg): 37.4977741111000 Altitude (km): 0.2768999999947E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PPTY_TOPO = 399104216 FRAME_399104216_NAME = 'NDOSL_PPTY_TOPO' FRAME_399104216_CLASS = 4 FRAME_399104216_CLASS_ID = 399104216 FRAME_399104216_CENTER = 399104216 OBJECT_399104216_FRAME = 'NDOSL_PPTY_TOPO' TKFRAME_399104216_RELATIVE = 'ITRF93' TKFRAME_399104216_SPEC = 'ANGLES' TKFRAME_399104216_UNITS = 'DEGREES' TKFRAME_399104216_AXES = ( 3, 2, 3 ) TKFRAME_399104216_ANGLES = ( -237.5008192778000, -52.5022258889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_PRTS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_PRTS_TOPO is centered at the site NDOSL_PRTS, which has Cartesian coordinates X (km): -0.2368668601486E+04 Y (km): 0.4881332362950E+04 Z (km): -0.3341803942066E+04 and planetodetic coordinates Longitude (deg): 115.8850000000000 Latitude (deg): -31.8020000000000 Altitude (km): 0.2215999999960E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_PRTS_TOPO = 399101342 FRAME_399101342_NAME = 'NDOSL_PRTS_TOPO' FRAME_399101342_CLASS = 4 FRAME_399101342_CLASS_ID = 399101342 FRAME_399101342_CENTER = 399101342 OBJECT_399101342_FRAME = 'NDOSL_PRTS_TOPO' TKFRAME_399101342_RELATIVE = 'ITRF93' TKFRAME_399101342_SPEC = 'ANGLES' TKFRAME_399101342_UNITS = 'DEGREES' TKFRAME_399101342_AXES = ( 3, 2, 3 ) TKFRAME_399101342_ANGLES = ( -115.8850000000000, -121.8020000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_RALS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_RALS_TOPO is centered at the site NDOSL_RALS, which has Cartesian coordinates X (km): 0.3971434755473E+04 Y (km): -0.9091949010472E+02 Z (km): 0.4973474825581E+04 and planetodetic coordinates Longitude (deg): -1.3114638889000 Latitude (deg): 51.5720260000000 Altitude (km): 0.1631200000030E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_RALS_TOPO = 399101700 FRAME_399101700_NAME = 'NDOSL_RALS_TOPO' FRAME_399101700_CLASS = 4 FRAME_399101700_CLASS_ID = 399101700 FRAME_399101700_CENTER = 399101700 OBJECT_399101700_FRAME = 'NDOSL_RALS_TOPO' TKFRAME_399101700_RELATIVE = 'ITRF93' TKFRAME_399101700_SPEC = 'ANGLES' TKFRAME_399101700_UNITS = 'DEGREES' TKFRAME_399101700_AXES = ( 3, 2, 3 ) TKFRAME_399101700_ANGLES = ( -358.6885361111000, -38.4279740000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_RGTS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_RGTS_TOPO is centered at the site NDOSL_RGTS, which has Cartesian coordinates X (km): -0.4460814553015E+04 Y (km): 0.2682191172573E+04 Z (km): -0.3674924337321E+04 and planetodetic coordinates Longitude (deg): 148.9824183056000 Latitude (deg): -35.4045363333000 Altitude (km): 0.6632550000002E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_RGTS_TOPO = 399101963 FRAME_399101963_NAME = 'NDOSL_RGTS_TOPO' FRAME_399101963_CLASS = 4 FRAME_399101963_CLASS_ID = 399101963 FRAME_399101963_CENTER = 399101963 OBJECT_399101963_FRAME = 'NDOSL_RGTS_TOPO' TKFRAME_399101963_RELATIVE = 'ITRF93' TKFRAME_399101963_SPEC = 'ANGLES' TKFRAME_399101963_UNITS = 'DEGREES' TKFRAME_399101963_AXES = ( 3, 2, 3 ) TKFRAME_399101963_ANGLES = ( -148.9824183056000, -125.4045363333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_RTKS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_RTKS_TOPO is centered at the site NDOSL_RTKS, which has Cartesian coordinates X (km): -0.4460810518563E+04 Y (km): 0.2682168971249E+04 Z (km): -0.3674942147013E+04 and planetodetic coordinates Longitude (deg): 148.9826048611000 Latitude (deg): -35.4047449444000 Altitude (km): 0.6614300000003E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_RTKS_TOPO = 399101964 FRAME_399101964_NAME = 'NDOSL_RTKS_TOPO' FRAME_399101964_CLASS = 4 FRAME_399101964_CLASS_ID = 399101964 FRAME_399101964_CENTER = 399101964 OBJECT_399101964_FRAME = 'NDOSL_RTKS_TOPO' TKFRAME_399101964_RELATIVE = 'ITRF93' TKFRAME_399101964_SPEC = 'ANGLES' TKFRAME_399101964_UNITS = 'DEGREES' TKFRAME_399101964_AXES = ( 3, 2, 3 ) TKFRAME_399101964_ANGLES = ( -148.9826048611000, -125.4047449444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_S22S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_S22S_TOPO is centered at the site NDOSL_S22S, which has Cartesian coordinates X (km): 0.1258263127106E+04 Y (km): 0.3461527961335E+03 Z (km): 0.6222762156666E+04 and planetodetic coordinates Longitude (deg): 15.3817730000000 Latitude (deg): 78.2329076111000 Altitude (km): 0.4811029999985E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_S22S_TOPO = 399101734 FRAME_399101734_NAME = 'NDOSL_S22S_TOPO' FRAME_399101734_CLASS = 4 FRAME_399101734_CLASS_ID = 399101734 FRAME_399101734_CENTER = 399101734 OBJECT_399101734_FRAME = 'NDOSL_S22S_TOPO' TKFRAME_399101734_RELATIVE = 'ITRF93' TKFRAME_399101734_SPEC = 'ANGLES' TKFRAME_399101734_UNITS = 'DEGREES' TKFRAME_399101734_AXES = ( 3, 2, 3 ) TKFRAME_399101734_ANGLES = ( -15.3817730000000, -11.7670923889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SARS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SARS_TOPO is centered at the site NDOSL_SARS, which has Cartesian coordinates X (km): 0.3583314338507E+04 Y (km): 0.4910889142398E+04 Z (km): 0.1923308743190E+04 and planetodetic coordinates Longitude (deg): 53.8830000000000 Latitude (deg): 17.6670000000000 Altitude (km): 0.3048000000000E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SARS_TOPO = 399101739 FRAME_399101739_NAME = 'NDOSL_SARS_TOPO' FRAME_399101739_CLASS = 4 FRAME_399101739_CLASS_ID = 399101739 FRAME_399101739_CENTER = 399101739 OBJECT_399101739_FRAME = 'NDOSL_SARS_TOPO' TKFRAME_399101739_RELATIVE = 'ITRF93' TKFRAME_399101739_SPEC = 'ANGLES' TKFRAME_399101739_UNITS = 'DEGREES' TKFRAME_399101739_AXES = ( 3, 2, 3 ) TKFRAME_399101739_ANGLES = ( -53.8830000000000, -72.3330000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SEYS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SEYS_TOPO is centered at the site NDOSL_SEYS, which has Cartesian coordinates X (km): 0.3603038598067E+04 Y (km): 0.5238108619481E+04 Z (km): -0.5160600678198E+03 and planetodetic coordinates Longitude (deg): 55.4778205278000 Latitude (deg): -4.6717481111000 Altitude (km): 0.5604950000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SEYS_TOPO = 399104071 FRAME_399104071_NAME = 'NDOSL_SEYS_TOPO' FRAME_399104071_CLASS = 4 FRAME_399104071_CLASS_ID = 399104071 FRAME_399104071_CENTER = 399104071 OBJECT_399104071_FRAME = 'NDOSL_SEYS_TOPO' TKFRAME_399104071_RELATIVE = 'ITRF93' TKFRAME_399104071_SPEC = 'ANGLES' TKFRAME_399104071_UNITS = 'DEGREES' TKFRAME_399104071_AXES = ( 3, 2, 3 ) TKFRAME_399104071_ANGLES = ( -55.4778205278000, -94.6717481111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SF1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SF1S_TOPO is centered at the site NDOSL_SF1S, which has Cartesian coordinates X (km): -0.5323675192562E+03 Y (km): -0.4585336096400E+04 Z (km): 0.4387274281341E+04 and planetodetic coordinates Longitude (deg): -96.6225146111000 Latitude (deg): 43.7360726389000 Altitude (km): 0.4687519999989E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SF1S_TOPO = 399101703 FRAME_399101703_NAME = 'NDOSL_SF1S_TOPO' FRAME_399101703_CLASS = 4 FRAME_399101703_CLASS_ID = 399101703 FRAME_399101703_CENTER = 399101703 OBJECT_399101703_FRAME = 'NDOSL_SF1S_TOPO' TKFRAME_399101703_RELATIVE = 'ITRF93' TKFRAME_399101703_SPEC = 'ANGLES' TKFRAME_399101703_UNITS = 'DEGREES' TKFRAME_399101703_AXES = ( 3, 2, 3 ) TKFRAME_399101703_ANGLES = ( -263.3774853889000, -46.2639273611000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SF2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SF2S_TOPO is centered at the site NDOSL_SF2S, which has Cartesian coordinates X (km): -0.5321363124541E+03 Y (km): -0.4585494198432E+04 Z (km): 0.4387124384200E+04 and planetodetic coordinates Longitude (deg): -96.6194377778000 Latitude (deg): 43.7342866667000 Altitude (km): 0.4593359999996E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SF2S_TOPO = 399101716 FRAME_399101716_NAME = 'NDOSL_SF2S_TOPO' FRAME_399101716_CLASS = 4 FRAME_399101716_CLASS_ID = 399101716 FRAME_399101716_CENTER = 399101716 OBJECT_399101716_FRAME = 'NDOSL_SF2S_TOPO' TKFRAME_399101716_RELATIVE = 'ITRF93' TKFRAME_399101716_SPEC = 'ANGLES' TKFRAME_399101716_UNITS = 'DEGREES' TKFRAME_399101716_AXES = ( 3, 2, 3 ) TKFRAME_399101716_ANGLES = ( -263.3805622222000, -46.2657133333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SG1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SG1S_TOPO is centered at the site NDOSL_SG1S, which has Cartesian coordinates X (km): 0.1258445629954E+04 Y (km): 0.3463863666728E+03 Z (km): 0.6222732176787E+04 and planetodetic coordinates Longitude (deg): 15.3895336944000 Latitude (deg): 78.2307666944000 Altitude (km): 0.5002800000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SG1S_TOPO = 399101702 FRAME_399101702_NAME = 'NDOSL_SG1S_TOPO' FRAME_399101702_CLASS = 4 FRAME_399101702_CLASS_ID = 399101702 FRAME_399101702_CENTER = 399101702 OBJECT_399101702_FRAME = 'NDOSL_SG1S_TOPO' TKFRAME_399101702_RELATIVE = 'ITRF93' TKFRAME_399101702_SPEC = 'ANGLES' TKFRAME_399101702_UNITS = 'DEGREES' TKFRAME_399101702_AXES = ( 3, 2, 3 ) TKFRAME_399101702_ANGLES = ( -15.3895336944000, -11.7692333056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SG3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SG3S_TOPO is centered at the site NDOSL_SG3S, which has Cartesian coordinates X (km): 0.1258442280278E+04 Y (km): 0.3468240700157E+03 Z (km): 0.6222709754395E+04 and planetodetic coordinates Longitude (deg): 15.4080958333000 Latitude (deg): 78.2297350000000 Altitude (km): 0.5013780000008E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SG3S_TOPO = 399101733 FRAME_399101733_NAME = 'NDOSL_SG3S_TOPO' FRAME_399101733_CLASS = 4 FRAME_399101733_CLASS_ID = 399101733 FRAME_399101733_CENTER = 399101733 OBJECT_399101733_FRAME = 'NDOSL_SG3S_TOPO' TKFRAME_399101733_RELATIVE = 'ITRF93' TKFRAME_399101733_SPEC = 'ANGLES' TKFRAME_399101733_UNITS = 'DEGREES' TKFRAME_399101733_AXES = ( 3, 2, 3 ) TKFRAME_399101733_ANGLES = ( -15.4080958333000, -11.7702650000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SG4S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SG4S_TOPO is centered at the site NDOSL_SG4S, which has Cartesian coordinates X (km): 0.1258614593864E+04 Y (km): 0.3469087000493E+03 Z (km): 0.6222677819632E+04 and planetodetic coordinates Longitude (deg): 15.4096672222000 Latitude (deg): 78.2280230000000 Altitude (km): 0.5085909999993E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SG4S_TOPO = 399101723 FRAME_399101723_NAME = 'NDOSL_SG4S_TOPO' FRAME_399101723_CLASS = 4 FRAME_399101723_CLASS_ID = 399101723 FRAME_399101723_CENTER = 399101723 OBJECT_399101723_FRAME = 'NDOSL_SG4S_TOPO' TKFRAME_399101723_RELATIVE = 'ITRF93' TKFRAME_399101723_SPEC = 'ANGLES' TKFRAME_399101723_UNITS = 'DEGREES' TKFRAME_399101723_AXES = ( 3, 2, 3 ) TKFRAME_399101723_ANGLES = ( -15.4096672222000, -11.7719770000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SG6S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SG6S_TOPO is centered at the site NDOSL_SG6S, which has Cartesian coordinates X (km): 0.1258263334146E+04 Y (km): 0.3469919628255E+03 Z (km): 0.6222680022103E+04 and planetodetic coordinates Longitude (deg): 15.4172880000000 Latitude (deg): 78.2308020000000 Altitude (km): 0.4461839999994E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SG6S_TOPO = 399101750 FRAME_399101750_NAME = 'NDOSL_SG6S_TOPO' FRAME_399101750_CLASS = 4 FRAME_399101750_CLASS_ID = 399101750 FRAME_399101750_CENTER = 399101750 OBJECT_399101750_FRAME = 'NDOSL_SG6S_TOPO' TKFRAME_399101750_RELATIVE = 'ITRF93' TKFRAME_399101750_SPEC = 'ANGLES' TKFRAME_399101750_UNITS = 'DEGREES' TKFRAME_399101750_AXES = ( 3, 2, 3 ) TKFRAME_399101750_ANGLES = ( -15.4172880000000, -11.7691980000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SI1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SI1S_TOPO is centered at the site NDOSL_SI1S, which has Cartesian coordinates X (km): -0.1524742645174E+04 Y (km): 0.6191310885578E+04 Z (km): 0.1538962189383E+03 and planetodetic coordinates Longitude (deg): 103.8350000000000 Latitude (deg): 1.3919180000000 Altitude (km): 0.3000000000007E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SI1S_TOPO = 399101742 FRAME_399101742_NAME = 'NDOSL_SI1S_TOPO' FRAME_399101742_CLASS = 4 FRAME_399101742_CLASS_ID = 399101742 FRAME_399101742_CENTER = 399101742 OBJECT_399101742_FRAME = 'NDOSL_SI1S_TOPO' TKFRAME_399101742_RELATIVE = 'ITRF93' TKFRAME_399101742_SPEC = 'ANGLES' TKFRAME_399101742_UNITS = 'DEGREES' TKFRAME_399101742_AXES = ( 3, 2, 3 ) TKFRAME_399101742_ANGLES = ( -103.8350000000000, -88.6080820000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SIPQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SIPQ_TOPO is centered at the site NDOSL_SIPQ, which has Cartesian coordinates X (km): -0.5090727090889E+04 Y (km): 0.3460145981598E+04 Z (km): 0.1666804734079E+04 and planetodetic coordinates Longitude (deg): 145.7962166667000 Latitude (deg): 15.2491458333000 Altitude (km): 0.3482000000003E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SIPQ_TOPO = 399104003 FRAME_399104003_NAME = 'NDOSL_SIPQ_TOPO' FRAME_399104003_CLASS = 4 FRAME_399104003_CLASS_ID = 399104003 FRAME_399104003_CENTER = 399104003 OBJECT_399104003_FRAME = 'NDOSL_SIPQ_TOPO' TKFRAME_399104003_RELATIVE = 'ITRF93' TKFRAME_399104003_SPEC = 'ANGLES' TKFRAME_399104003_UNITS = 'DEGREES' TKFRAME_399104003_AXES = ( 3, 2, 3 ) TKFRAME_399104003_ANGLES = ( -145.7962166667000, -74.7508541667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SN2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SN2F_TOPO is centered at the site NDOSL_SN2F, which has Cartesian coordinates X (km): -0.2631061715855E+04 Y (km): -0.4646460108826E+04 Z (km): 0.3477099686709E+04 and planetodetic coordinates Longitude (deg): -119.5207428056000 Latitude (deg): 33.2476850000000 Altitude (km): 0.2466800000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SN2F_TOPO = 399104443 FRAME_399104443_NAME = 'NDOSL_SN2F_TOPO' FRAME_399104443_CLASS = 4 FRAME_399104443_CLASS_ID = 399104443 FRAME_399104443_CENTER = 399104443 OBJECT_399104443_FRAME = 'NDOSL_SN2F_TOPO' TKFRAME_399104443_RELATIVE = 'ITRF93' TKFRAME_399104443_SPEC = 'ANGLES' TKFRAME_399104443_UNITS = 'DEGREES' TKFRAME_399104443_AXES = ( 3, 2, 3 ) TKFRAME_399104443_ANGLES = ( -240.4792571944000, -56.7523150000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SN3F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SN3F_TOPO is centered at the site NDOSL_SN3F, which has Cartesian coordinates X (km): -0.2631092857461E+04 Y (km): -0.4646392477257E+04 Z (km): 0.3477165028616E+04 and planetodetic coordinates Longitude (deg): -119.5213911667000 Latitude (deg): 33.2483927500000 Altitude (km): 0.2461200000013E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SN3F_TOPO = 399104444 FRAME_399104444_NAME = 'NDOSL_SN3F_TOPO' FRAME_399104444_CLASS = 4 FRAME_399104444_CLASS_ID = 399104444 FRAME_399104444_CENTER = 399104444 OBJECT_399104444_FRAME = 'NDOSL_SN3F_TOPO' TKFRAME_399104444_RELATIVE = 'ITRF93' TKFRAME_399104444_SPEC = 'ANGLES' TKFRAME_399104444_UNITS = 'DEGREES' TKFRAME_399104444_AXES = ( 3, 2, 3 ) TKFRAME_399104444_ANGLES = ( -240.4786088333000, -56.7516072500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SNIF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SNIF_TOPO is centered at the site NDOSL_SNIF, which has Cartesian coordinates X (km): -0.2631030108609E+04 Y (km): -0.4646526941084E+04 Z (km): 0.3477033783074E+04 and planetodetic coordinates Longitude (deg): -119.5200943333000 Latitude (deg): 33.2469775833000 Altitude (km): 0.2461599999997E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SNIF_TOPO = 399104442 FRAME_399104442_NAME = 'NDOSL_SNIF_TOPO' FRAME_399104442_CLASS = 4 FRAME_399104442_CLASS_ID = 399104442 FRAME_399104442_CENTER = 399104442 OBJECT_399104442_FRAME = 'NDOSL_SNIF_TOPO' TKFRAME_399104442_RELATIVE = 'ITRF93' TKFRAME_399104442_SPEC = 'ANGLES' TKFRAME_399104442_UNITS = 'DEGREES' TKFRAME_399104442_AXES = ( 3, 2, 3 ) TKFRAME_399104442_ANGLES = ( -240.4799056666999, -56.7530224167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SOCA_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SOCA_TOPO is centered at the site NDOSL_SOCA, which has Cartesian coordinates X (km): 0.1124611886617E+04 Y (km): -0.4845073220487E+04 Z (km): 0.3979438833810E+04 and planetodetic coordinates Longitude (deg): -76.9322222222000 Latitude (deg): 38.8500261111000 Altitude (km): 0.1185660000009E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SOCA_TOPO = 399104139 FRAME_399104139_NAME = 'NDOSL_SOCA_TOPO' FRAME_399104139_CLASS = 4 FRAME_399104139_CLASS_ID = 399104139 FRAME_399104139_CENTER = 399104139 OBJECT_399104139_FRAME = 'NDOSL_SOCA_TOPO' TKFRAME_399104139_RELATIVE = 'ITRF93' TKFRAME_399104139_SPEC = 'ANGLES' TKFRAME_399104139_UNITS = 'DEGREES' TKFRAME_399104139_AXES = ( 3, 2, 3 ) TKFRAME_399104139_ANGLES = ( -283.0677777778000, -51.1499738889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ST1F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ST1F_TOPO is centered at the site NDOSL_ST1F, which has Cartesian coordinates X (km): 0.2561813074640E+04 Y (km): -0.5487127623867E+04 Z (km): 0.1995993583980E+04 and planetodetic coordinates Longitude (deg): -64.9732164722001 Latitude (deg): 18.3572533333000 Altitude (km): 0.1304539999998E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ST1F_TOPO = 399104224 FRAME_399104224_NAME = 'NDOSL_ST1F_TOPO' FRAME_399104224_CLASS = 4 FRAME_399104224_CLASS_ID = 399104224 FRAME_399104224_CENTER = 399104224 OBJECT_399104224_FRAME = 'NDOSL_ST1F_TOPO' TKFRAME_399104224_RELATIVE = 'ITRF93' TKFRAME_399104224_SPEC = 'ANGLES' TKFRAME_399104224_UNITS = 'DEGREES' TKFRAME_399104224_AXES = ( 3, 2, 3 ) TKFRAME_399104224_ANGLES = ( -295.0267835278000, -71.6427466667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ST2K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ST2K_TOPO is centered at the site NDOSL_ST2K, which has Cartesian coordinates X (km): -0.1538987112617E+04 Y (km): -0.5158453974536E+04 Z (km): 0.3412123069641E+04 and planetodetic coordinates Longitude (deg): -106.6120889444000 Latitude (deg): 32.5429773611000 Altitude (km): 0.1452310000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ST2K_TOPO = 399104751 FRAME_399104751_NAME = 'NDOSL_ST2K_TOPO' FRAME_399104751_CLASS = 4 FRAME_399104751_CLASS_ID = 399104751 FRAME_399104751_CENTER = 399104751 OBJECT_399104751_FRAME = 'NDOSL_ST2K_TOPO' TKFRAME_399104751_RELATIVE = 'ITRF93' TKFRAME_399104751_SPEC = 'ANGLES' TKFRAME_399104751_UNITS = 'DEGREES' TKFRAME_399104751_AXES = ( 3, 2, 3 ) TKFRAME_399104751_ANGLES = ( -253.3879110556000, -57.4570226389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ST3K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ST3K_TOPO is centered at the site NDOSL_ST3K, which has Cartesian coordinates X (km): -0.1538992263050E+04 Y (km): -0.5158471256256E+04 Z (km): 0.3412094791733E+04 and planetodetic coordinates Longitude (deg): -106.6120888889000 Latitude (deg): 32.5426750000000 Altitude (km): 0.1452300000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ST3K_TOPO = 399104752 FRAME_399104752_NAME = 'NDOSL_ST3K_TOPO' FRAME_399104752_CLASS = 4 FRAME_399104752_CLASS_ID = 399104752 FRAME_399104752_CENTER = 399104752 OBJECT_399104752_FRAME = 'NDOSL_ST3K_TOPO' TKFRAME_399104752_RELATIVE = 'ITRF93' TKFRAME_399104752_SPEC = 'ANGLES' TKFRAME_399104752_UNITS = 'DEGREES' TKFRAME_399104752_AXES = ( 3, 2, 3 ) TKFRAME_399104752_ANGLES = ( -253.3879111111000, -57.4573250000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_STE1_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_STE1_TOPO is centered at the site NDOSL_STE1, which has Cartesian coordinates X (km): -0.1538969395244E+04 Y (km): -0.5158418131345E+04 Z (km): 0.3412176466428E+04 and planetodetic coordinates Longitude (deg): -106.6120173056000 Latitude (deg): 32.5435743056000 Altitude (km): 0.1447810000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_STE1_TOPO = 399101934 FRAME_399101934_NAME = 'NDOSL_STE1_TOPO' FRAME_399101934_CLASS = 4 FRAME_399101934_CLASS_ID = 399101934 FRAME_399101934_CENTER = 399101934 OBJECT_399101934_FRAME = 'NDOSL_STE1_TOPO' TKFRAME_399101934_RELATIVE = 'ITRF93' TKFRAME_399101934_SPEC = 'ANGLES' TKFRAME_399101934_UNITS = 'DEGREES' TKFRAME_399101934_AXES = ( 3, 2, 3 ) TKFRAME_399101934_ANGLES = ( -253.3879826944000, -57.4564256944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_STE2_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_STE2_TOPO is centered at the site NDOSL_STE2, which has Cartesian coordinates X (km): -0.1538993084415E+04 Y (km): -0.5158490632863E+04 Z (km): 0.3412054208845E+04 and planetodetic coordinates Longitude (deg): -106.6120383056000 Latitude (deg): 32.5422753889000 Altitude (km): 0.1446320000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_STE2_TOPO = 399101935 FRAME_399101935_NAME = 'NDOSL_STE2_TOPO' FRAME_399101935_CLASS = 4 FRAME_399101935_CLASS_ID = 399101935 FRAME_399101935_CENTER = 399101935 OBJECT_399101935_FRAME = 'NDOSL_STE2_TOPO' TKFRAME_399101935_RELATIVE = 'ITRF93' TKFRAME_399101935_SPEC = 'ANGLES' TKFRAME_399101935_UNITS = 'DEGREES' TKFRAME_399101935_AXES = ( 3, 2, 3 ) TKFRAME_399101935_ANGLES = ( -253.3879616944000, -57.4577246111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_STGK_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_STGK_TOPO is centered at the site NDOSL_STGK, which has Cartesian coordinates X (km): -0.1538981949873E+04 Y (km): -0.5158436669793E+04 Z (km): 0.3412151312949E+04 and planetodetic coordinates Longitude (deg): -106.6120889444000 Latitude (deg): 32.5432795833000 Altitude (km): 0.1452280000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_STGK_TOPO = 399104750 FRAME_399104750_NAME = 'NDOSL_STGK_TOPO' FRAME_399104750_CLASS = 4 FRAME_399104750_CLASS_ID = 399104750 FRAME_399104750_CENTER = 399104750 OBJECT_399104750_FRAME = 'NDOSL_STGK_TOPO' TKFRAME_399104750_RELATIVE = 'ITRF93' TKFRAME_399104750_SPEC = 'ANGLES' TKFRAME_399104750_UNITS = 'DEGREES' TKFRAME_399104750_AXES = ( 3, 2, 3 ) TKFRAME_399104750_ANGLES = ( -253.3879110556000, -57.4567204167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_STGS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_STGS_TOPO is centered at the site NDOSL_STGS, which has Cartesian coordinates X (km): -0.1538995393310E+04 Y (km): -0.5158481730178E+04 Z (km): 0.3412072380999E+04 and planetodetic coordinates Longitude (deg): -106.6120889444000 Latitude (deg): 32.5424516667000 Altitude (km): 0.1449460000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_STGS_TOPO = 399104753 FRAME_399104753_NAME = 'NDOSL_STGS_TOPO' FRAME_399104753_CLASS = 4 FRAME_399104753_CLASS_ID = 399104753 FRAME_399104753_CENTER = 399104753 OBJECT_399104753_FRAME = 'NDOSL_STGS_TOPO' TKFRAME_399104753_RELATIVE = 'ITRF93' TKFRAME_399104753_SPEC = 'ANGLES' TKFRAME_399104753_UNITS = 'DEGREES' TKFRAME_399104753_AXES = ( 3, 2, 3 ) TKFRAME_399104753_ANGLES = ( -253.3879110556000, -57.4575483333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_STSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_STSS_TOPO is centered at the site NDOSL_STSS, which has Cartesian coordinates X (km): -0.1539010437871E+04 Y (km): -0.5158528834355E+04 Z (km): 0.3412007227834E+04 and planetodetic coordinates Longitude (deg): -106.6120990556000 Latitude (deg): 32.5417167500000 Altitude (km): 0.1456090000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_STSS_TOPO = 399101741 FRAME_399101741_NAME = 'NDOSL_STSS_TOPO' FRAME_399101741_CLASS = 4 FRAME_399101741_CLASS_ID = 399101741 FRAME_399101741_CENTER = 399101741 OBJECT_399101741_FRAME = 'NDOSL_STSS_TOPO' TKFRAME_399101741_RELATIVE = 'ITRF93' TKFRAME_399101741_SPEC = 'ANGLES' TKFRAME_399101741_UNITS = 'DEGREES' TKFRAME_399101741_AXES = ( 3, 2, 3 ) TKFRAME_399101741_ANGLES = ( -253.3879009444000, -57.4582832500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_STWS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_STWS_TOPO is centered at the site NDOSL_STWS, which has Cartesian coordinates X (km): -0.1539412634711E+04 Y (km): -0.5161039292076E+04 Z (km): 0.3408061691026E+04 and planetodetic coordinates Longitude (deg): -106.6085638333000 Latitude (deg): 32.4995067778000 Altitude (km): 0.1460383000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_STWS_TOPO = 399101740 FRAME_399101740_NAME = 'NDOSL_STWS_TOPO' FRAME_399101740_CLASS = 4 FRAME_399101740_CLASS_ID = 399101740 FRAME_399101740_CENTER = 399101740 OBJECT_399101740_FRAME = 'NDOSL_STWS_TOPO' TKFRAME_399101740_RELATIVE = 'ITRF93' TKFRAME_399101740_SPEC = 'ANGLES' TKFRAME_399101740_UNITS = 'DEGREES' TKFRAME_399101740_AXES = ( 3, 2, 3 ) TKFRAME_399101740_ANGLES = ( -253.3914361667000, -57.5004932222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SWNS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SWNS_TOPO is centered at the site NDOSL_SWNS, which has Cartesian coordinates X (km): -0.2866523935590E+04 Y (km): 0.5249943685832E+04 Z (km): -0.2207264551990E+04 and planetodetic coordinates Longitude (deg): 118.6350000000000 Latitude (deg): -20.3800000000000 Altitude (km): 0.2420000000021E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SWNS_TOPO = 399101796 FRAME_399101796_NAME = 'NDOSL_SWNS_TOPO' FRAME_399101796_CLASS = 4 FRAME_399101796_CLASS_ID = 399101796 FRAME_399101796_CENTER = 399101796 OBJECT_399101796_FRAME = 'NDOSL_SWNS_TOPO' TKFRAME_399101796_RELATIVE = 'ITRF93' TKFRAME_399101796_SPEC = 'ANGLES' TKFRAME_399101796_UNITS = 'DEGREES' TKFRAME_399101796_AXES = ( 3, 2, 3 ) TKFRAME_399101796_ANGLES = ( -118.6350000000000, -110.3800000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_SYOQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_SYOQ_TOPO is centered at the site NDOSL_SYOQ, which has Cartesian coordinates X (km): 0.1766101245268E+04 Y (km): 0.1460534878805E+04 Z (km): -0.5932221610914E+04 and planetodetic coordinates Longitude (deg): 39.5901538889000 Latitude (deg): -69.0060964444000 Altitude (km): 0.5371999999764E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_SYOQ_TOPO = 399104262 FRAME_399104262_NAME = 'NDOSL_SYOQ_TOPO' FRAME_399104262_CLASS = 4 FRAME_399104262_CLASS_ID = 399104262 FRAME_399104262_CENTER = 399104262 OBJECT_399104262_FRAME = 'NDOSL_SYOQ_TOPO' TKFRAME_399104262_RELATIVE = 'ITRF93' TKFRAME_399104262_SPEC = 'ANGLES' TKFRAME_399104262_UNITS = 'DEGREES' TKFRAME_399104262_AXES = ( 3, 2, 3 ) TKFRAME_399104262_ANGLES = ( -39.5901538889000, -159.0060964444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_TH2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_TH2S_TOPO is centered at the site NDOSL_TH2S, which has Cartesian coordinates X (km): 0.5444423328074E+03 Y (km): -0.1389168497770E+04 Z (km): 0.6180523420885E+04 and planetodetic coordinates Longitude (deg): -68.5988147222000 Latitude (deg): 76.5153638889000 Altitude (km): 0.1473700000012E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_TH2S_TOPO = 399101731 FRAME_399101731_NAME = 'NDOSL_TH2S_TOPO' FRAME_399101731_CLASS = 4 FRAME_399101731_CLASS_ID = 399101731 FRAME_399101731_CENTER = 399101731 OBJECT_399101731_FRAME = 'NDOSL_TH2S_TOPO' TKFRAME_399101731_RELATIVE = 'ITRF93' TKFRAME_399101731_SPEC = 'ANGLES' TKFRAME_399101731_UNITS = 'DEGREES' TKFRAME_399101731_AXES = ( 3, 2, 3 ) TKFRAME_399101731_ANGLES = ( -291.4011852778000, -13.4846361111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_THUS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_THUS_TOPO is centered at the site NDOSL_THUS, which has Cartesian coordinates X (km): 0.5444000751098E+03 Y (km): -0.1389075165659E+04 Z (km): 0.6180541568941E+04 and planetodetic coordinates Longitude (deg): -68.5990177778000 Latitude (deg): 76.5162930556000 Altitude (km): 0.1411600000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_THUS_TOPO = 399101730 FRAME_399101730_NAME = 'NDOSL_THUS_TOPO' FRAME_399101730_CLASS = 4 FRAME_399101730_CLASS_ID = 399101730 FRAME_399101730_CENTER = 399101730 OBJECT_399101730_FRAME = 'NDOSL_THUS_TOPO' TKFRAME_399101730_RELATIVE = 'ITRF93' TKFRAME_399101730_SPEC = 'ANGLES' TKFRAME_399101730_UNITS = 'DEGREES' TKFRAME_399101730_AXES = ( 3, 2, 3 ) TKFRAME_399101730_ANGLES = ( -291.4009822222000, -13.4837069444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_TR2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_TR2S_TOPO is centered at the site NDOSL_TR2S, which has Cartesian coordinates X (km): 0.1975230727855E+04 Y (km): 0.8707368662564E+02 Z (km): -0.6045110155219E+04 and planetodetic coordinates Longitude (deg): 2.5241237778000 Latitude (deg): -72.0022220556000 Altitude (km): 0.1416582000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_TR2S_TOPO = 399101738 FRAME_399101738_NAME = 'NDOSL_TR2S_TOPO' FRAME_399101738_CLASS = 4 FRAME_399101738_CLASS_ID = 399101738 FRAME_399101738_CENTER = 399101738 OBJECT_399101738_FRAME = 'NDOSL_TR2S_TOPO' TKFRAME_399101738_RELATIVE = 'ITRF93' TKFRAME_399101738_SPEC = 'ANGLES' TKFRAME_399101738_UNITS = 'DEGREES' TKFRAME_399101738_AXES = ( 3, 2, 3 ) TKFRAME_399101738_ANGLES = ( -2.5241237778000, -162.0022220556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_TR3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_TR3S_TOPO is centered at the site NDOSL_TR3S, which has Cartesian coordinates X (km): 0.1975235095704E+04 Y (km): 0.8710455095185E+02 Z (km): -0.6045100689724E+04 and planetodetic coordinates Longitude (deg): 2.5250117500000 Latitude (deg): -72.0021470833000 Altitude (km): 0.1409348000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_TR3S_TOPO = 399101748 FRAME_399101748_NAME = 'NDOSL_TR3S_TOPO' FRAME_399101748_CLASS = 4 FRAME_399101748_CLASS_ID = 399101748 FRAME_399101748_CENTER = 399101748 OBJECT_399101748_FRAME = 'NDOSL_TR3S_TOPO' TKFRAME_399101748_RELATIVE = 'ITRF93' TKFRAME_399101748_SPEC = 'ANGLES' TKFRAME_399101748_UNITS = 'DEGREES' TKFRAME_399101748_AXES = ( 3, 2, 3 ) TKFRAME_399101748_ANGLES = ( -2.5250117500000, -162.0021470833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_TSMF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_TSMF_TOPO is centered at the site NDOSL_TSMF, which has Cartesian coordinates X (km): -0.3950066291161E+04 Y (km): 0.2522386032931E+04 Z (km): -0.4311662762445E+04 and planetodetic coordinates Longitude (deg): 147.4390000000000 Latitude (deg): -42.8050000000000 Altitude (km): 0.4300000000014E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_TSMF_TOPO = 399104080 FRAME_399104080_NAME = 'NDOSL_TSMF_TOPO' FRAME_399104080_CLASS = 4 FRAME_399104080_CLASS_ID = 399104080 FRAME_399104080_CENTER = 399104080 OBJECT_399104080_FRAME = 'NDOSL_TSMF_TOPO' TKFRAME_399104080_RELATIVE = 'ITRF93' TKFRAME_399104080_SPEC = 'ANGLES' TKFRAME_399104080_UNITS = 'DEGREES' TKFRAME_399104080_AXES = ( 3, 2, 3 ) TKFRAME_399104080_ANGLES = ( -147.4390000000000, -132.8050000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_TT2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_TT2S_TOPO is centered at the site NDOSL_TT2S, which has Cartesian coordinates X (km): 0.5444412224370E+03 Y (km): -0.1389168774981E+04 Z (km): 0.6180523060238E+04 and planetodetic coordinates Longitude (deg): -68.5988583056000 Latitude (deg): 76.5153644167000 Altitude (km): 0.1469850000001E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_TT2S_TOPO = 399101376 FRAME_399101376_NAME = 'NDOSL_TT2S_TOPO' FRAME_399101376_CLASS = 4 FRAME_399101376_CLASS_ID = 399101376 FRAME_399101376_CENTER = 399101376 OBJECT_399101376_FRAME = 'NDOSL_TT2S_TOPO' TKFRAME_399101376_RELATIVE = 'ITRF93' TKFRAME_399101376_SPEC = 'ANGLES' TKFRAME_399101376_UNITS = 'DEGREES' TKFRAME_399101376_AXES = ( 3, 2, 3 ) TKFRAME_399101376_ANGLES = ( -291.4011416944000, -13.4846355833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_TTSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_TTSS_TOPO is centered at the site NDOSL_TTSS, which has Cartesian coordinates X (km): 0.5443906874840E+03 Y (km): -0.1389119328918E+04 Z (km): 0.6180527127955E+04 and planetodetic coordinates Longitude (deg): -68.5999722778000 Latitude (deg): 76.5159345556000 Altitude (km): 0.1359060000012E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_TTSS_TOPO = 399101369 FRAME_399101369_NAME = 'NDOSL_TTSS_TOPO' FRAME_399101369_CLASS = 4 FRAME_399101369_CLASS_ID = 399101369 FRAME_399101369_CENTER = 399101369 OBJECT_399101369_FRAME = 'NDOSL_TTSS_TOPO' TKFRAME_399101369_RELATIVE = 'ITRF93' TKFRAME_399101369_SPEC = 'ANGLES' TKFRAME_399101369_UNITS = 'DEGREES' TKFRAME_399101369_AXES = ( 3, 2, 3 ) TKFRAME_399101369_ANGLES = ( -291.4000277222000, -13.4840654444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_TULF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_TULF_TOPO is centered at the site NDOSL_TULF, which has Cartesian coordinates X (km): -0.1488855631507E+04 Y (km): -0.5138344556624E+04 Z (km): 0.3463575818542E+04 and planetodetic coordinates Longitude (deg): -106.1591541667000 Latitude (deg): 33.0961615278000 Altitude (km): 0.1241254000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_TULF_TOPO = 399104151 FRAME_399104151_NAME = 'NDOSL_TULF_TOPO' FRAME_399104151_CLASS = 4 FRAME_399104151_CLASS_ID = 399104151 FRAME_399104151_CENTER = 399104151 OBJECT_399104151_FRAME = 'NDOSL_TULF_TOPO' TKFRAME_399104151_RELATIVE = 'ITRF93' TKFRAME_399104151_SPEC = 'ANGLES' TKFRAME_399104151_UNITS = 'DEGREES' TKFRAME_399104151_AXES = ( 3, 2, 3 ) TKFRAME_399104151_ANGLES = ( -253.8408458333000, -56.9038384722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_TULS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_TULS_TOPO is centered at the site NDOSL_TULS, which has Cartesian coordinates X (km): -0.1488240940670E+04 Y (km): -0.5142959546712E+04 Z (km): 0.3457188619338E+04 and planetodetic coordinates Longitude (deg): -106.1390910000000 Latitude (deg): 33.0269448889000 Altitude (km): 0.1328633000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_TULS_TOPO = 399104078 FRAME_399104078_NAME = 'NDOSL_TULS_TOPO' FRAME_399104078_CLASS = 4 FRAME_399104078_CLASS_ID = 399104078 FRAME_399104078_CENTER = 399104078 OBJECT_399104078_FRAME = 'NDOSL_TULS_TOPO' TKFRAME_399104078_RELATIVE = 'ITRF93' TKFRAME_399104078_SPEC = 'ANGLES' TKFRAME_399104078_UNITS = 'DEGREES' TKFRAME_399104078_AXES = ( 3, 2, 3 ) TKFRAME_399104078_ANGLES = ( -253.8609090000000, -56.9730551111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_U2HS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_U2HS_TOPO is centered at the site NDOSL_U2HS, which has Cartesian coordinates X (km): -0.5496572002167E+04 Y (km): -0.2486078296935E+04 Z (km): 0.2064917597307E+04 and planetodetic coordinates Longitude (deg): -155.6629440833000 Latitude (deg): 19.0137934444000 Altitude (km): 0.3823000000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_U2HS_TOPO = 399101779 FRAME_399101779_NAME = 'NDOSL_U2HS_TOPO' FRAME_399101779_CLASS = 4 FRAME_399101779_CLASS_ID = 399101779 FRAME_399101779_CENTER = 399101779 OBJECT_399101779_FRAME = 'NDOSL_U2HS_TOPO' TKFRAME_399101779_RELATIVE = 'ITRF93' TKFRAME_399101779_SPEC = 'ANGLES' TKFRAME_399101779_UNITS = 'DEGREES' TKFRAME_399101779_AXES = ( 3, 2, 3 ) TKFRAME_399101779_ANGLES = ( -204.3370559167000, -70.9862065556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_U2PS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_U2PS_TOPO is centered at the site NDOSL_U2PS, which has Cartesian coordinates X (km): -0.2389229410932E+04 Y (km): 0.5043279895873E+04 Z (km): -0.3078451047511E+04 and planetodetic coordinates Longitude (deg): 115.3490277778000 Latitude (deg): -29.0456944444000 Altitude (km): 0.2496999999985E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_U2PS_TOPO = 399101771 FRAME_399101771_NAME = 'NDOSL_U2PS_TOPO' FRAME_399101771_CLASS = 4 FRAME_399101771_CLASS_ID = 399101771 FRAME_399101771_CENTER = 399101771 OBJECT_399101771_FRAME = 'NDOSL_U2PS_TOPO' TKFRAME_399101771_RELATIVE = 'ITRF93' TKFRAME_399101771_SPEC = 'ANGLES' TKFRAME_399101771_UNITS = 'DEGREES' TKFRAME_399101771_AXES = ( 3, 2, 3 ) TKFRAME_399101771_ANGLES = ( -115.3490277778000, -119.0456944444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_U3AS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_U3AS_TOPO is centered at the site NDOSL_U3AS, which has Cartesian coordinates X (km): -0.2296411462862E+04 Y (km): -0.1462869413507E+04 Z (km): 0.5748603522197E+04 and planetodetic coordinates Longitude (deg): -147.5018818889000 Latitude (deg): 64.8044176944000 Altitude (km): 0.1579000000001E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_U3AS_TOPO = 399101745 FRAME_399101745_NAME = 'NDOSL_U3AS_TOPO' FRAME_399101745_CLASS = 4 FRAME_399101745_CLASS_ID = 399101745 FRAME_399101745_CENTER = 399101745 OBJECT_399101745_FRAME = 'NDOSL_U3AS_TOPO' TKFRAME_399101745_RELATIVE = 'ITRF93' TKFRAME_399101745_SPEC = 'ANGLES' TKFRAME_399101745_UNITS = 'DEGREES' TKFRAME_399101745_AXES = ( 3, 2, 3 ) TKFRAME_399101745_ANGLES = ( -212.4981181111000, -25.1955823056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_U4AS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_U4AS_TOPO is centered at the site NDOSL_U4AS, which has Cartesian coordinates X (km): -0.2296444983651E+04 Y (km): -0.1462759453298E+04 Z (km): 0.5748617241114E+04 and planetodetic coordinates Longitude (deg): -147.5042124722000 Latitude (deg): 64.8047200833000 Altitude (km): 0.1572000000006E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_U4AS_TOPO = 399101746 FRAME_399101746_NAME = 'NDOSL_U4AS_TOPO' FRAME_399101746_CLASS = 4 FRAME_399101746_CLASS_ID = 399101746 FRAME_399101746_CENTER = 399101746 OBJECT_399101746_FRAME = 'NDOSL_U4AS_TOPO' TKFRAME_399101746_RELATIVE = 'ITRF93' TKFRAME_399101746_SPEC = 'ANGLES' TKFRAME_399101746_UNITS = 'DEGREES' TKFRAME_399101746_AXES = ( 3, 2, 3 ) TKFRAME_399101746_ANGLES = ( -212.4957875278000, -25.1952799167000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_U5AS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_U5AS_TOPO is centered at the site NDOSL_U5AS, which has Cartesian coordinates X (km): -0.2296464843536E+04 Y (km): -0.1462975972208E+04 Z (km): 0.5748558056867E+04 and planetodetic coordinates Longitude (deg): -147.5005942500000 Latitude (deg): 64.8034140556000 Altitude (km): 0.1603000000007E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_U5AS_TOPO = 399101747 FRAME_399101747_NAME = 'NDOSL_U5AS_TOPO' FRAME_399101747_CLASS = 4 FRAME_399101747_CLASS_ID = 399101747 FRAME_399101747_CENTER = 399101747 OBJECT_399101747_FRAME = 'NDOSL_U5AS_TOPO' TKFRAME_399101747_RELATIVE = 'ITRF93' TKFRAME_399101747_SPEC = 'ANGLES' TKFRAME_399101747_UNITS = 'DEGREES' TKFRAME_399101747_AXES = ( 3, 2, 3 ) TKFRAME_399101747_ANGLES = ( -212.4994057500000, -25.1965859444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_UL1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_UL1S_TOPO is centered at the site NDOSL_UL1S, which has Cartesian coordinates X (km): -0.2282161892911E+04 Y (km): -0.1453835876280E+04 Z (km): 0.5756830502974E+04 and planetodetic coordinates Longitude (deg): -147.5011000000000 Latitude (deg): 64.9727500000000 Altitude (km): 0.4473000000009E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_UL1S_TOPO = 399101854 FRAME_399101854_NAME = 'NDOSL_UL1S_TOPO' FRAME_399101854_CLASS = 4 FRAME_399101854_CLASS_ID = 399101854 FRAME_399101854_CENTER = 399101854 OBJECT_399101854_FRAME = 'NDOSL_UL1S_TOPO' TKFRAME_399101854_RELATIVE = 'ITRF93' TKFRAME_399101854_SPEC = 'ANGLES' TKFRAME_399101854_UNITS = 'DEGREES' TKFRAME_399101854_AXES = ( 3, 2, 3 ) TKFRAME_399101854_ANGLES = ( -212.4989000000000, -25.0272500000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_UL23_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_UL23_TOPO is centered at the site NDOSL_UL23, which has Cartesian coordinates X (km): -0.2282580040660E+04 Y (km): -0.1453152254927E+04 Z (km): 0.5756709046749E+04 and planetodetic coordinates Longitude (deg): -147.5180656667000 Latitude (deg): 64.9724071111000 Altitude (km): 0.3311080000001E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_UL23_TOPO = 399101371 FRAME_399101371_NAME = 'NDOSL_UL23_TOPO' FRAME_399101371_CLASS = 4 FRAME_399101371_CLASS_ID = 399101371 FRAME_399101371_CENTER = 399101371 OBJECT_399101371_FRAME = 'NDOSL_UL23_TOPO' TKFRAME_399101371_RELATIVE = 'ITRF93' TKFRAME_399101371_SPEC = 'ANGLES' TKFRAME_399101371_UNITS = 'DEGREES' TKFRAME_399101371_AXES = ( 3, 2, 3 ) TKFRAME_399101371_ANGLES = ( -212.4819343333000, -25.0275928889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_UL33_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_UL33_TOPO is centered at the site NDOSL_UL33, which has Cartesian coordinates X (km): -0.2282196258346E+04 Y (km): -0.1452907900728E+04 Z (km): 0.5756896007988E+04 and planetodetic coordinates Longitude (deg): -147.5180661667000 Latitude (deg): 64.9768138889000 Altitude (km): 0.3080559999993E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_UL33_TOPO = 399101332 FRAME_399101332_NAME = 'NDOSL_UL33_TOPO' FRAME_399101332_CLASS = 4 FRAME_399101332_CLASS_ID = 399101332 FRAME_399101332_CENTER = 399101332 OBJECT_399101332_FRAME = 'NDOSL_UL33_TOPO' TKFRAME_399101332_RELATIVE = 'ITRF93' TKFRAME_399101332_SPEC = 'ANGLES' TKFRAME_399101332_UNITS = 'DEGREES' TKFRAME_399101332_AXES = ( 3, 2, 3 ) TKFRAME_399101332_ANGLES = ( -212.4819338333000, -25.0231861111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ULA3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ULA3_TOPO is centered at the site NDOSL_ULA3, which has Cartesian coordinates X (km): -0.2282488779461E+04 Y (km): -0.1453355990572E+04 Z (km): 0.5756708189317E+04 and planetodetic coordinates Longitude (deg): -147.5133888333000 Latitude (deg): 64.9721402500000 Altitude (km): 0.3440539999993E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ULA3_TOPO = 399101328 FRAME_399101328_NAME = 'NDOSL_ULA3_TOPO' FRAME_399101328_CLASS = 4 FRAME_399101328_CLASS_ID = 399101328 FRAME_399101328_CENTER = 399101328 OBJECT_399101328_FRAME = 'NDOSL_ULA3_TOPO' TKFRAME_399101328_RELATIVE = 'ITRF93' TKFRAME_399101328_SPEC = 'ANGLES' TKFRAME_399101328_UNITS = 'DEGREES' TKFRAME_399101328_AXES = ( 3, 2, 3 ) TKFRAME_399101328_ANGLES = ( -212.4866111667000, -25.0278597500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ULA4_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ULA4_TOPO is centered at the site NDOSL_ULA4, which has Cartesian coordinates X (km): -0.2282293241678E+04 Y (km): -0.1452789584269E+04 Z (km): 0.5756877658233E+04 and planetodetic coordinates Longitude (deg): -147.5212828889000 Latitude (deg): 64.9765957500000 Altitude (km): 0.2991590000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ULA4_TOPO = 399101401 FRAME_399101401_NAME = 'NDOSL_ULA4_TOPO' FRAME_399101401_CLASS = 4 FRAME_399101401_CLASS_ID = 399101401 FRAME_399101401_CENTER = 399101401 OBJECT_399101401_FRAME = 'NDOSL_ULA4_TOPO' TKFRAME_399101401_RELATIVE = 'ITRF93' TKFRAME_399101401_SPEC = 'ANGLES' TKFRAME_399101401_UNITS = 'DEGREES' TKFRAME_399101401_AXES = ( 3, 2, 3 ) TKFRAME_399101401_ANGLES = ( -212.4787171111000, -25.0234042500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_ULAE_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_ULAE_TOPO is centered at the site NDOSL_ULAE, which has Cartesian coordinates X (km): -0.2282191649625E+04 Y (km): -0.1452933595129E+04 Z (km): 0.5756891319658E+04 and planetodetic coordinates Longitude (deg): -147.5175547222000 Latitude (deg): 64.9767155556000 Altitude (km): 0.3080000000004E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_ULAE_TOPO = 399101853 FRAME_399101853_NAME = 'NDOSL_ULAE_TOPO' FRAME_399101853_CLASS = 4 FRAME_399101853_CLASS_ID = 399101853 FRAME_399101853_CENTER = 399101853 OBJECT_399101853_FRAME = 'NDOSL_ULAE_TOPO' TKFRAME_399101853_RELATIVE = 'ITRF93' TKFRAME_399101853_SPEC = 'ANGLES' TKFRAME_399101853_UNITS = 'DEGREES' TKFRAME_399101853_AXES = ( 3, 2, 3 ) TKFRAME_399101853_ANGLES = ( -212.4824452778000, -25.0232844444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_USAS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_USAS_TOPO is centered at the site NDOSL_USAS, which has Cartesian coordinates X (km): -0.2296384868741E+04 Y (km): -0.1462946439820E+04 Z (km): 0.5748597565950E+04 and planetodetic coordinates Longitude (deg): -147.5002141667000 Latitude (deg): 64.8042411111000 Altitude (km): 0.1605799999987E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_USAS_TOPO = 399101709 FRAME_399101709_NAME = 'NDOSL_USAS_TOPO' FRAME_399101709_CLASS = 4 FRAME_399101709_CLASS_ID = 399101709 FRAME_399101709_CENTER = 399101709 OBJECT_399101709_FRAME = 'NDOSL_USAS_TOPO' TKFRAME_399101709_RELATIVE = 'ITRF93' TKFRAME_399101709_SPEC = 'ANGLES' TKFRAME_399101709_UNITS = 'DEGREES' TKFRAME_399101709_AXES = ( 3, 2, 3 ) TKFRAME_399101709_ANGLES = ( -212.4997858333000, -25.1957588889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_USDS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_USDS_TOPO is centered at the site NDOSL_USDS, which has Cartesian coordinates X (km): -0.2389197636945E+04 Y (km): 0.5043292400467E+04 Z (km): -0.3078459601690E+04 and planetodetic coordinates Longitude (deg): 115.3486780000000 Latitude (deg): -29.0457720000000 Altitude (km): 0.2518399999993E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_USDS_TOPO = 399101717 FRAME_399101717_NAME = 'NDOSL_USDS_TOPO' FRAME_399101717_CLASS = 4 FRAME_399101717_CLASS_ID = 399101717 FRAME_399101717_CENTER = 399101717 OBJECT_399101717_FRAME = 'NDOSL_USDS_TOPO' TKFRAME_399101717_RELATIVE = 'ITRF93' TKFRAME_399101717_SPEC = 'ANGLES' TKFRAME_399101717_UNITS = 'DEGREES' TKFRAME_399101717_AXES = ( 3, 2, 3 ) TKFRAME_399101717_ANGLES = ( -115.3486780000000, -119.0457720000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_USHS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_USHS_TOPO is centered at the site NDOSL_USHS, which has Cartesian coordinates X (km): -0.5496586092919E+04 Y (km): -0.2486039862333E+04 Z (km): 0.2064935186791E+04 and planetodetic coordinates Longitude (deg): -155.6633318333000 Latitude (deg): 19.0139525000000 Altitude (km): 0.3851940000015E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_USHS_TOPO = 399101778 FRAME_399101778_NAME = 'NDOSL_USHS_TOPO' FRAME_399101778_CLASS = 4 FRAME_399101778_CLASS_ID = 399101778 FRAME_399101778_CENTER = 399101778 OBJECT_399101778_FRAME = 'NDOSL_USHS_TOPO' TKFRAME_399101778_RELATIVE = 'ITRF93' TKFRAME_399101778_SPEC = 'ANGLES' TKFRAME_399101778_UNITS = 'DEGREES' TKFRAME_399101778_AXES = ( 3, 2, 3 ) TKFRAME_399101778_ANGLES = ( -204.3366681667000, -70.9860475000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_USPS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_USPS_TOPO is centered at the site NDOSL_USPS, which has Cartesian coordinates X (km): -0.2389197088554E+04 Y (km): 0.5043291325034E+04 Z (km): -0.3078458952697E+04 and planetodetic coordinates Longitude (deg): 115.3486776389000 Latitude (deg): -29.0457721667000 Altitude (km): 0.2504699999990E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_USPS_TOPO = 399101770 FRAME_399101770_NAME = 'NDOSL_USPS_TOPO' FRAME_399101770_CLASS = 4 FRAME_399101770_CLASS_ID = 399101770 FRAME_399101770_CENTER = 399101770 OBJECT_399101770_FRAME = 'NDOSL_USPS_TOPO' TKFRAME_399101770_RELATIVE = 'ITRF93' TKFRAME_399101770_SPEC = 'ANGLES' TKFRAME_399101770_UNITS = 'DEGREES' TKFRAME_399101770_AXES = ( 3, 2, 3 ) TKFRAME_399101770_ANGLES = ( -115.3486776389000, -119.0457721667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_VD2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_VD2F_TOPO is centered at the site NDOSL_VD2F, which has Cartesian coordinates X (km): -0.2672459337057E+04 Y (km): -0.4514003897452E+04 Z (km): 0.3615878587123E+04 and planetodetic coordinates Longitude (deg): -120.6271213889001 Latitude (deg): 34.7582318333000 Altitude (km): 0.2603999999960E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_VD2F_TOPO = 399104247 FRAME_399104247_NAME = 'NDOSL_VD2F_TOPO' FRAME_399104247_CLASS = 4 FRAME_399104247_CLASS_ID = 399104247 FRAME_399104247_CENTER = 399104247 OBJECT_399104247_FRAME = 'NDOSL_VD2F_TOPO' TKFRAME_399104247_RELATIVE = 'ITRF93' TKFRAME_399104247_SPEC = 'ANGLES' TKFRAME_399104247_UNITS = 'DEGREES' TKFRAME_399104247_AXES = ( 3, 2, 3 ) TKFRAME_399104247_ANGLES = ( -239.3728786110999, -55.2417681667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_VD3F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_VD3F_TOPO is centered at the site NDOSL_VD3F, which has Cartesian coordinates X (km): -0.2673130229856E+04 Y (km): -0.4527025639293E+04 Z (km): 0.3600236148388E+04 and planetodetic coordinates Longitude (deg): -120.5611149444000 Latitude (deg): 34.5830429444000 Altitude (km): 0.6272520000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_VD3F_TOPO = 399104251 FRAME_399104251_NAME = 'NDOSL_VD3F_TOPO' FRAME_399104251_CLASS = 4 FRAME_399104251_CLASS_ID = 399104251 FRAME_399104251_CENTER = 399104251 OBJECT_399104251_FRAME = 'NDOSL_VD3F_TOPO' TKFRAME_399104251_RELATIVE = 'ITRF93' TKFRAME_399104251_SPEC = 'ANGLES' TKFRAME_399104251_UNITS = 'DEGREES' TKFRAME_399104251_AXES = ( 3, 2, 3 ) TKFRAME_399104251_ANGLES = ( -239.4388850556000, -55.4169570556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_VD4F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_VD4F_TOPO is centered at the site NDOSL_VD4F, which has Cartesian coordinates X (km): -0.2673130228181E+04 Y (km): -0.4527025636457E+04 Z (km): 0.3600236146117E+04 and planetodetic coordinates Longitude (deg): -120.5611149444000 Latitude (deg): 34.5830429444000 Altitude (km): 0.6272480000011E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_VD4F_TOPO = 399104254 FRAME_399104254_NAME = 'NDOSL_VD4F_TOPO' FRAME_399104254_CLASS = 4 FRAME_399104254_CLASS_ID = 399104254 FRAME_399104254_CENTER = 399104254 OBJECT_399104254_FRAME = 'NDOSL_VD4F_TOPO' TKFRAME_399104254_RELATIVE = 'ITRF93' TKFRAME_399104254_SPEC = 'ANGLES' TKFRAME_399104254_UNITS = 'DEGREES' TKFRAME_399104254_AXES = ( 3, 2, 3 ) TKFRAME_399104254_ANGLES = ( -239.4388850556000, -55.4169570556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_VDB3_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_VDB3_TOPO is centered at the site NDOSL_VDB3, which has Cartesian coordinates X (km): -0.2668976908415E+04 Y (km): -0.4530731210996E+04 Z (km): 0.3598634996475E+04 and planetodetic coordinates Longitude (deg): -120.5016173056000 Latitude (deg): 34.5656259167000 Altitude (km): 0.6094400000005E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_VDB3_TOPO = 399101333 FRAME_399101333_NAME = 'NDOSL_VDB3_TOPO' FRAME_399101333_CLASS = 4 FRAME_399101333_CLASS_ID = 399101333 FRAME_399101333_CENTER = 399101333 OBJECT_399101333_FRAME = 'NDOSL_VDB3_TOPO' TKFRAME_399101333_RELATIVE = 'ITRF93' TKFRAME_399101333_SPEC = 'ANGLES' TKFRAME_399101333_UNITS = 'DEGREES' TKFRAME_399101333_AXES = ( 3, 2, 3 ) TKFRAME_399101333_ANGLES = ( -239.4983826944000, -55.4343740833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_VDBF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_VDBF_TOPO is centered at the site NDOSL_VDBF, which has Cartesian coordinates X (km): -0.2664790967724E+04 Y (km): -0.4517404624367E+04 Z (km): 0.3617450644637E+04 and planetodetic coordinates Longitude (deg): -120.5361097222000 Latitude (deg): 34.7748776944000 Altitude (km): 0.1226070000012E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_VDBF_TOPO = 399104246 FRAME_399104246_NAME = 'NDOSL_VDBF_TOPO' FRAME_399104246_CLASS = 4 FRAME_399104246_CLASS_ID = 399104246 FRAME_399104246_CENTER = 399104246 OBJECT_399104246_FRAME = 'NDOSL_VDBF_TOPO' TKFRAME_399104246_RELATIVE = 'ITRF93' TKFRAME_399104246_SPEC = 'ANGLES' TKFRAME_399104246_UNITS = 'DEGREES' TKFRAME_399104246_AXES = ( 3, 2, 3 ) TKFRAME_399104246_ANGLES = ( -239.4638902777999, -55.2251223056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_VEND_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_VEND_TOPO is centered at the site NDOSL_VEND, which has Cartesian coordinates X (km): -0.2351112658988E+04 Y (km): -0.4655530635550E+04 Z (km): 0.3660912726933E+04 and planetodetic coordinates Longitude (deg): -116.7944590000000 Latitude (deg): 35.2471642500000 Altitude (km): 0.1070444000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_VEND_TOPO = 399101513 FRAME_399101513_NAME = 'NDOSL_VEND_TOPO' FRAME_399101513_CLASS = 4 FRAME_399101513_CLASS_ID = 399101513 FRAME_399101513_CENTER = 399101513 OBJECT_399101513_FRAME = 'NDOSL_VEND_TOPO' TKFRAME_399101513_RELATIVE = 'ITRF93' TKFRAME_399101513_SPEC = 'ANGLES' TKFRAME_399101513_UNITS = 'DEGREES' TKFRAME_399101513_AXES = ( 3, 2, 3 ) TKFRAME_399101513_ANGLES = ( -243.2055410000000, -54.7528357500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_VT2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_VT2S_TOPO is centered at the site NDOSL_VT2S, which has Cartesian coordinates X (km): -0.2660798458364E+04 Y (km): -0.4516166465901E+04 Z (km): 0.3622158400627E+04 and planetodetic coordinates Longitude (deg): -120.5053976667000 Latitude (deg): 34.8256407778000 Altitude (km): 0.2686099999999E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_VT2S_TOPO = 399101372 FRAME_399101372_NAME = 'NDOSL_VT2S_TOPO' FRAME_399101372_CLASS = 4 FRAME_399101372_CLASS_ID = 399101372 FRAME_399101372_CENTER = 399101372 OBJECT_399101372_FRAME = 'NDOSL_VT2S_TOPO' TKFRAME_399101372_RELATIVE = 'ITRF93' TKFRAME_399101372_SPEC = 'ANGLES' TKFRAME_399101372_UNITS = 'DEGREES' TKFRAME_399101372_AXES = ( 3, 2, 3 ) TKFRAME_399101372_ANGLES = ( -239.4946023333000, -55.1743592222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_VTSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_VTSS_TOPO is centered at the site NDOSL_VTSS, which has Cartesian coordinates X (km): -0.2660617570264E+04 Y (km): -0.4516499123908E+04 Z (km): 0.3621885201775E+04 and planetodetic coordinates Longitude (deg): -120.5018484444000 Latitude (deg): 34.8226165556000 Altitude (km): 0.2725099999992E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_VTSS_TOPO = 399101365 FRAME_399101365_NAME = 'NDOSL_VTSS_TOPO' FRAME_399101365_CLASS = 4 FRAME_399101365_CLASS_ID = 399101365 FRAME_399101365_CENTER = 399101365 OBJECT_399101365_FRAME = 'NDOSL_VTSS_TOPO' TKFRAME_399101365_RELATIVE = 'ITRF93' TKFRAME_399101365_SPEC = 'ANGLES' TKFRAME_399101365_UNITS = 'DEGREES' TKFRAME_399101365_AXES = ( 3, 2, 3 ) TKFRAME_399101365_ANGLES = ( -239.4981515555999, -55.1773834444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WAPS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WAPS_TOPO is centered at the site NDOSL_WAPS, which has Cartesian coordinates X (km): 0.1263297470063E+04 Y (km): -0.4876564679687E+04 Z (km): 0.3898861804523E+04 and planetodetic coordinates Longitude (deg): -75.4765225000000 Latitude (deg): 37.9249255556000 Altitude (km): -0.2009999999930E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WAPS_TOPO = 399101341 FRAME_399101341_NAME = 'NDOSL_WAPS_TOPO' FRAME_399101341_CLASS = 4 FRAME_399101341_CLASS_ID = 399101341 FRAME_399101341_CENTER = 399101341 OBJECT_399101341_FRAME = 'NDOSL_WAPS_TOPO' TKFRAME_399101341_RELATIVE = 'ITRF93' TKFRAME_399101341_SPEC = 'ANGLES' TKFRAME_399101341_UNITS = 'DEGREES' TKFRAME_399101341_AXES = ( 3, 2, 3 ) TKFRAME_399101341_ANGLES = ( -284.5234775000000, -52.0750744444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WD3F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WD3F_TOPO is centered at the site NDOSL_WD3F, which has Cartesian coordinates X (km): 0.1261495390902E+04 Y (km): -0.4881860033344E+04 Z (km): 0.3892857491748E+04 and planetodetic coordinates Longitude (deg): -75.5114353611000 Latitude (deg): 37.8563652500000 Altitude (km): -0.1812600000050E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WD3F_TOPO = 399104846 FRAME_399104846_NAME = 'NDOSL_WD3F_TOPO' FRAME_399104846_CLASS = 4 FRAME_399104846_CLASS_ID = 399104846 FRAME_399104846_CENTER = 399104846 OBJECT_399104846_FRAME = 'NDOSL_WD3F_TOPO' TKFRAME_399104846_RELATIVE = 'ITRF93' TKFRAME_399104846_SPEC = 'ANGLES' TKFRAME_399104846_UNITS = 'DEGREES' TKFRAME_399104846_AXES = ( 3, 2, 3 ) TKFRAME_399104846_ANGLES = ( -284.4885646389000, -52.1436347500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WD4F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WD4F_TOPO is centered at the site NDOSL_WD4F, which has Cartesian coordinates X (km): 0.1261502327978E+04 Y (km): -0.4881888159118E+04 Z (km): 0.3892880166539E+04 and planetodetic coordinates Longitude (deg): -75.5114390000000 Latitude (deg): 37.8563663889000 Altitude (km): 0.1865999999967E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WD4F_TOPO = 399104843 FRAME_399104843_NAME = 'NDOSL_WD4F_TOPO' FRAME_399104843_CLASS = 4 FRAME_399104843_CLASS_ID = 399104843 FRAME_399104843_CENTER = 399104843 OBJECT_399104843_FRAME = 'NDOSL_WD4F_TOPO' TKFRAME_399104843_RELATIVE = 'ITRF93' TKFRAME_399104843_SPEC = 'ANGLES' TKFRAME_399104843_UNITS = 'DEGREES' TKFRAME_399104843_AXES = ( 3, 2, 3 ) TKFRAME_399104843_ANGLES = ( -284.4885610000000, -52.1436336111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH2J_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH2J_TOPO is centered at the site NDOSL_WH2J, which has Cartesian coordinates X (km): -0.1539599343069E+04 Y (km): -0.5160546581474E+04 Z (km): 0.3408685891799E+04 and planetodetic coordinates Longitude (deg): -106.6119657500000 Latitude (deg): 32.5062814722000 Altitude (km): 0.1442610000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH2J_TOPO = 399100202 FRAME_399100202_NAME = 'NDOSL_WH2J_TOPO' FRAME_399100202_CLASS = 4 FRAME_399100202_CLASS_ID = 399100202 FRAME_399100202_CENTER = 399100202 OBJECT_399100202_FRAME = 'NDOSL_WH2J_TOPO' TKFRAME_399100202_RELATIVE = 'ITRF93' TKFRAME_399100202_SPEC = 'ANGLES' TKFRAME_399100202_UNITS = 'DEGREES' TKFRAME_399100202_AXES = ( 3, 2, 3 ) TKFRAME_399100202_ANGLES = ( -253.3880342500000, -57.4937185278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH2K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH2K_TOPO is centered at the site NDOSL_WH2K, which has Cartesian coordinates X (km): -0.1539390428631E+04 Y (km): -0.5160968826717E+04 Z (km): 0.3408176450725E+04 and planetodetic coordinates Longitude (deg): -106.6085517222000 Latitude (deg): 32.5007371944000 Altitude (km): 0.1459740000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH2K_TOPO = 399101921 FRAME_399101921_NAME = 'NDOSL_WH2K_TOPO' FRAME_399101921_CLASS = 4 FRAME_399101921_CLASS_ID = 399101921 FRAME_399101921_CENTER = 399101921 OBJECT_399101921_FRAME = 'NDOSL_WH2K_TOPO' TKFRAME_399101921_RELATIVE = 'ITRF93' TKFRAME_399101921_SPEC = 'ANGLES' TKFRAME_399101921_UNITS = 'DEGREES' TKFRAME_399101921_AXES = ( 3, 2, 3 ) TKFRAME_399101921_ANGLES = ( -253.3914482778000, -57.4992628056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH2S_TOPO is centered at the site NDOSL_WH2S, which has Cartesian coordinates X (km): -0.1539380594639E+04 Y (km): -0.5160935144693E+04 Z (km): 0.3408227663381E+04 and planetodetic coordinates Longitude (deg): -106.6085538889000 Latitude (deg): 32.5012965556000 Altitude (km): 0.1457665000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH2S_TOPO = 399101962 FRAME_399101962_NAME = 'NDOSL_WH2S_TOPO' FRAME_399101962_CLASS = 4 FRAME_399101962_CLASS_ID = 399101962 FRAME_399101962_CENTER = 399101962 OBJECT_399101962_FRAME = 'NDOSL_WH2S_TOPO' TKFRAME_399101962_RELATIVE = 'ITRF93' TKFRAME_399101962_SPEC = 'ANGLES' TKFRAME_399101962_UNITS = 'DEGREES' TKFRAME_399101962_AXES = ( 3, 2, 3 ) TKFRAME_399101962_ANGLES = ( -253.3914461111000, -57.4987034444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH3K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH3K_TOPO is centered at the site NDOSL_WH3K, which has Cartesian coordinates X (km): -0.1539395099384E+04 Y (km): -0.5160984531587E+04 Z (km): 0.3408150732478E+04 and planetodetic coordinates Longitude (deg): -106.6085515833000 Latitude (deg): 32.5004622778000 Altitude (km): 0.1459740000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH3K_TOPO = 399101922 FRAME_399101922_NAME = 'NDOSL_WH3K_TOPO' FRAME_399101922_CLASS = 4 FRAME_399101922_CLASS_ID = 399101922 FRAME_399101922_CENTER = 399101922 OBJECT_399101922_FRAME = 'NDOSL_WH3K_TOPO' TKFRAME_399101922_RELATIVE = 'ITRF93' TKFRAME_399101922_SPEC = 'ANGLES' TKFRAME_399101922_UNITS = 'DEGREES' TKFRAME_399101922_AXES = ( 3, 2, 3 ) TKFRAME_399101922_ANGLES = ( -253.3914484167000, -57.4995377222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH4K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH4K_TOPO is centered at the site NDOSL_WH4K, which has Cartesian coordinates X (km): -0.1539379252861E+04 Y (km): -0.5160930646241E+04 Z (km): 0.3408236911275E+04 and planetodetic coordinates Longitude (deg): -106.6085538889000 Latitude (deg): 32.5013896111000 Altitude (km): 0.1458675000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH4K_TOPO = 399101925 FRAME_399101925_NAME = 'NDOSL_WH4K_TOPO' FRAME_399101925_CLASS = 4 FRAME_399101925_CLASS_ID = 399101925 FRAME_399101925_CENTER = 399101925 OBJECT_399101925_FRAME = 'NDOSL_WH4K_TOPO' TKFRAME_399101925_RELATIVE = 'ITRF93' TKFRAME_399101925_SPEC = 'ANGLES' TKFRAME_399101925_UNITS = 'DEGREES' TKFRAME_399101925_AXES = ( 3, 2, 3 ) TKFRAME_399101925_ANGLES = ( -253.3914461111000, -57.4986103889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH5K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH5K_TOPO is centered at the site NDOSL_WH5K, which has Cartesian coordinates X (km): -0.1539381253543E+04 Y (km): -0.5160937445094E+04 Z (km): 0.3408221990752E+04 and planetodetic coordinates Longitude (deg): -106.6085536111000 Latitude (deg): 32.5012418333000 Altitude (km): 0.1456635000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH5K_TOPO = 399101940 FRAME_399101940_NAME = 'NDOSL_WH5K_TOPO' FRAME_399101940_CLASS = 4 FRAME_399101940_CLASS_ID = 399101940 FRAME_399101940_CENTER = 399101940 OBJECT_399101940_FRAME = 'NDOSL_WH5K_TOPO' TKFRAME_399101940_RELATIVE = 'ITRF93' TKFRAME_399101940_SPEC = 'ANGLES' TKFRAME_399101940_UNITS = 'DEGREES' TKFRAME_399101940_AXES = ( 3, 2, 3 ) TKFRAME_399101940_ANGLES = ( -253.3914463889000, -57.4987581667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH6F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH6F_TOPO is centered at the site NDOSL_WH6F, which has Cartesian coordinates X (km): -0.1521107331897E+04 Y (km): -0.5083323896027E+04 Z (km): 0.3530150983366E+04 and planetodetic coordinates Longitude (deg): -106.6590122778000 Latitude (deg): 33.8138639444000 Altitude (km): 0.1508970000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH6F_TOPO = 399104145 FRAME_399104145_NAME = 'NDOSL_WH6F_TOPO' FRAME_399104145_CLASS = 4 FRAME_399104145_CLASS_ID = 399104145 FRAME_399104145_CENTER = 399104145 OBJECT_399104145_FRAME = 'NDOSL_WH6F_TOPO' TKFRAME_399104145_RELATIVE = 'ITRF93' TKFRAME_399104145_SPEC = 'ANGLES' TKFRAME_399104145_UNITS = 'DEGREES' TKFRAME_399104145_AXES = ( 3, 2, 3 ) TKFRAME_399104145_ANGLES = ( -253.3409877222000, -56.1861360556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH6K_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH6K_TOPO is centered at the site NDOSL_WH6K, which has Cartesian coordinates X (km): -0.1539436786340E+04 Y (km): -0.5160899629986E+04 Z (km): 0.3408237969354E+04 and planetodetic coordinates Longitude (deg): -106.6092347500000 Latitude (deg): 32.5014619722000 Altitude (km): 0.1448046000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH6K_TOPO = 399101941 FRAME_399101941_NAME = 'NDOSL_WH6K_TOPO' FRAME_399101941_CLASS = 4 FRAME_399101941_CLASS_ID = 399101941 FRAME_399101941_CENTER = 399101941 OBJECT_399101941_FRAME = 'NDOSL_WH6K_TOPO' TKFRAME_399101941_RELATIVE = 'ITRF93' TKFRAME_399101941_SPEC = 'ANGLES' TKFRAME_399101941_UNITS = 'DEGREES' TKFRAME_399101941_AXES = ( 3, 2, 3 ) TKFRAME_399101941_ANGLES = ( -253.3907652500000, -57.4985380278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH7F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH7F_TOPO is centered at the site NDOSL_WH7F, which has Cartesian coordinates X (km): -0.1521118689427E+04 Y (km): -0.5083361142387E+04 Z (km): 0.3530072152640E+04 and planetodetic coordinates Longitude (deg): -106.6590144722000 Latitude (deg): 33.8130782778000 Altitude (km): 0.1497454000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH7F_TOPO = 399104147 FRAME_399104147_NAME = 'NDOSL_WH7F_TOPO' FRAME_399104147_CLASS = 4 FRAME_399104147_CLASS_ID = 399104147 FRAME_399104147_CENTER = 399104147 OBJECT_399104147_FRAME = 'NDOSL_WH7F_TOPO' TKFRAME_399104147_RELATIVE = 'ITRF93' TKFRAME_399104147_SPEC = 'ANGLES' TKFRAME_399104147_UNITS = 'DEGREES' TKFRAME_399104147_AXES = ( 3, 2, 3 ) TKFRAME_399104147_ANGLES = ( -253.3409855278000, -56.1869217222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WH9F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WH9F_TOPO is centered at the site NDOSL_WH9F, which has Cartesian coordinates X (km): -0.1480609184208E+04 Y (km): -0.5118922520328E+04 Z (km): 0.3496143725714E+04 and planetodetic coordinates Longitude (deg): -106.1321083889000 Latitude (deg): 33.4452186667000 Altitude (km): 0.1592508000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WH9F_TOPO = 399104146 FRAME_399104146_NAME = 'NDOSL_WH9F_TOPO' FRAME_399104146_CLASS = 4 FRAME_399104146_CLASS_ID = 399104146 FRAME_399104146_CENTER = 399104146 OBJECT_399104146_FRAME = 'NDOSL_WH9F_TOPO' TKFRAME_399104146_RELATIVE = 'ITRF93' TKFRAME_399104146_SPEC = 'ANGLES' TKFRAME_399104146_UNITS = 'DEGREES' TKFRAME_399104146_AXES = ( 3, 2, 3 ) TKFRAME_399104146_ANGLES = ( -253.8678916111000, -56.5547813333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WHSF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WHSF_TOPO is centered at the site NDOSL_WHSF, which has Cartesian coordinates X (km): -0.1520204686263E+04 Y (km): -0.5175279621174E+04 Z (km): 0.3394683287258E+04 and planetodetic coordinates Longitude (deg): -106.3698074167000 Latitude (deg): 32.3580421111000 Altitude (km): 0.1209860000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WHSF_TOPO = 399104143 FRAME_399104143_NAME = 'NDOSL_WHSF_TOPO' FRAME_399104143_CLASS = 4 FRAME_399104143_CLASS_ID = 399104143 FRAME_399104143_CENTER = 399104143 OBJECT_399104143_FRAME = 'NDOSL_WHSF_TOPO' TKFRAME_399104143_RELATIVE = 'ITRF93' TKFRAME_399104143_SPEC = 'ANGLES' TKFRAME_399104143_UNITS = 'DEGREES' TKFRAME_399104143_AXES = ( 3, 2, 3 ) TKFRAME_399104143_ANGLES = ( -253.6301925833000, -57.6419578889000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WHSJ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WHSJ_TOPO is centered at the site NDOSL_WHSJ, which has Cartesian coordinates X (km): -0.1539599343069E+04 Y (km): -0.5160546581474E+04 Z (km): 0.3408685891799E+04 and planetodetic coordinates Longitude (deg): -106.6119657500000 Latitude (deg): 32.5062814722000 Altitude (km): 0.1442610000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WHSJ_TOPO = 399100201 FRAME_399100201_NAME = 'NDOSL_WHSJ_TOPO' FRAME_399100201_CLASS = 4 FRAME_399100201_CLASS_ID = 399100201 FRAME_399100201_CENTER = 399100201 OBJECT_399100201_FRAME = 'NDOSL_WHSJ_TOPO' TKFRAME_399100201_RELATIVE = 'ITRF93' TKFRAME_399100201_SPEC = 'ANGLES' TKFRAME_399100201_UNITS = 'DEGREES' TKFRAME_399100201_AXES = ( 3, 2, 3 ) TKFRAME_399100201_ANGLES = ( -253.3880342500000, -57.4937185278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WHSK_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WHSK_TOPO is centered at the site NDOSL_WHSK, which has Cartesian coordinates X (km): -0.1539385743864E+04 Y (km): -0.5160953120543E+04 Z (km): 0.3408202158339E+04 and planetodetic coordinates Longitude (deg): -106.6085517222000 Latitude (deg): 32.5010120556000 Altitude (km): 0.1459730000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WHSK_TOPO = 399101920 FRAME_399101920_NAME = 'NDOSL_WHSK_TOPO' FRAME_399101920_CLASS = 4 FRAME_399101920_CLASS_ID = 399101920 FRAME_399101920_CENTER = 399101920 OBJECT_399101920_FRAME = 'NDOSL_WHSK_TOPO' TKFRAME_399101920_RELATIVE = 'ITRF93' TKFRAME_399101920_SPEC = 'ANGLES' TKFRAME_399101920_UNITS = 'DEGREES' TKFRAME_399101920_AXES = ( 3, 2, 3 ) TKFRAME_399101920_ANGLES = ( -253.3914482778000, -57.4989879444000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WHSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WHSS_TOPO is centered at the site NDOSL_WHSS, which has Cartesian coordinates X (km): -0.1539396602988E+04 Y (km): -0.5160989472080E+04 Z (km): 0.3408128705166E+04 and planetodetic coordinates Longitude (deg): -106.6085518889000 Latitude (deg): 32.5002697778000 Altitude (km): 0.1452260000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WHSS_TOPO = 399101961 FRAME_399101961_NAME = 'NDOSL_WHSS_TOPO' FRAME_399101961_CLASS = 4 FRAME_399101961_CLASS_ID = 399101961 FRAME_399101961_CENTER = 399101961 OBJECT_399101961_FRAME = 'NDOSL_WHSS_TOPO' TKFRAME_399101961_RELATIVE = 'ITRF93' TKFRAME_399101961_SPEC = 'ANGLES' TKFRAME_399101961_UNITS = 'DEGREES' TKFRAME_399101961_AXES = ( 3, 2, 3 ) TKFRAME_399101961_ANGLES = ( -253.3914481111000, -57.4997302222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WL2F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WL2F_TOPO is centered at the site NDOSL_WL2F, which has Cartesian coordinates X (km): 0.1264017079431E+04 Y (km): -0.4875031576565E+04 Z (km): 0.3900544047848E+04 and planetodetic coordinates Longitude (deg): -75.4642233611000 Latitude (deg): 37.9440991389000 Altitude (km): -0.1404000000019E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WL2F_TOPO = 399104841 FRAME_399104841_NAME = 'NDOSL_WL2F_TOPO' FRAME_399104841_CLASS = 4 FRAME_399104841_CLASS_ID = 399104841 FRAME_399104841_CENTER = 399104841 OBJECT_399104841_FRAME = 'NDOSL_WL2F_TOPO' TKFRAME_399104841_RELATIVE = 'ITRF93' TKFRAME_399104841_SPEC = 'ANGLES' TKFRAME_399104841_UNITS = 'DEGREES' TKFRAME_399104841_AXES = ( 3, 2, 3 ) TKFRAME_399104841_ANGLES = ( -284.5357766389000, -52.0559008611000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WL2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WL2S_TOPO is centered at the site NDOSL_WL2S, which has Cartesian coordinates X (km): 0.1264162842343E+04 Y (km): -0.4874835380907E+04 Z (km): 0.3900752516461E+04 and planetodetic coordinates Longitude (deg): -75.4620578611000 Latitude (deg): 37.9464296944000 Altitude (km): -0.6764999999788E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WL2S_TOPO = 399104206 FRAME_399104206_NAME = 'NDOSL_WL2S_TOPO' FRAME_399104206_CLASS = 4 FRAME_399104206_CLASS_ID = 399104206 FRAME_399104206_CENTER = 399104206 OBJECT_399104206_FRAME = 'NDOSL_WL2S_TOPO' TKFRAME_399104206_RELATIVE = 'ITRF93' TKFRAME_399104206_SPEC = 'ANGLES' TKFRAME_399104206_UNITS = 'DEGREES' TKFRAME_399104206_AXES = ( 3, 2, 3 ) TKFRAME_399104206_ANGLES = ( -284.5379421389000, -52.0535703056000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WL3F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WL3F_TOPO is centered at the site NDOSL_WL3F, which has Cartesian coordinates X (km): 0.1261495390902E+04 Y (km): -0.4881860033344E+04 Z (km): 0.3892857491748E+04 and planetodetic coordinates Longitude (deg): -75.5114353611000 Latitude (deg): 37.8563652500000 Altitude (km): -0.1812600000050E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WL3F_TOPO = 399104845 FRAME_399104845_NAME = 'NDOSL_WL3F_TOPO' FRAME_399104845_CLASS = 4 FRAME_399104845_CLASS_ID = 399104845 FRAME_399104845_CENTER = 399104845 OBJECT_399104845_FRAME = 'NDOSL_WL3F_TOPO' TKFRAME_399104845_RELATIVE = 'ITRF93' TKFRAME_399104845_SPEC = 'ANGLES' TKFRAME_399104845_UNITS = 'DEGREES' TKFRAME_399104845_AXES = ( 3, 2, 3 ) TKFRAME_399104845_ANGLES = ( -284.4885646389000, -52.1436347500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WL3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WL3S_TOPO is centered at the site NDOSL_WL3S, which has Cartesian coordinates X (km): 0.1264311862732E+04 Y (km): -0.4874842365660E+04 Z (km): 0.3900697621033E+04 and planetodetic coordinates Longitude (deg): -75.4604366944000 Latitude (deg): 37.9457949722000 Altitude (km): -0.5689000000515E-02 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WL3S_TOPO = 399104207 FRAME_399104207_NAME = 'NDOSL_WL3S_TOPO' FRAME_399104207_CLASS = 4 FRAME_399104207_CLASS_ID = 399104207 FRAME_399104207_CENTER = 399104207 OBJECT_399104207_FRAME = 'NDOSL_WL3S_TOPO' TKFRAME_399104207_RELATIVE = 'ITRF93' TKFRAME_399104207_SPEC = 'ANGLES' TKFRAME_399104207_UNITS = 'DEGREES' TKFRAME_399104207_AXES = ( 3, 2, 3 ) TKFRAME_399104207_ANGLES = ( -284.5395633056000, -52.0542050278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WL4F_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WL4F_TOPO is centered at the site NDOSL_WL4F, which has Cartesian coordinates X (km): 0.1261502327978E+04 Y (km): -0.4881888159118E+04 Z (km): 0.3892880166539E+04 and planetodetic coordinates Longitude (deg): -75.5114390000000 Latitude (deg): 37.8563663889000 Altitude (km): 0.1865999999967E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WL4F_TOPO = 399104842 FRAME_399104842_NAME = 'NDOSL_WL4F_TOPO' FRAME_399104842_CLASS = 4 FRAME_399104842_CLASS_ID = 399104842 FRAME_399104842_CENTER = 399104842 OBJECT_399104842_FRAME = 'NDOSL_WL4F_TOPO' TKFRAME_399104842_RELATIVE = 'ITRF93' TKFRAME_399104842_SPEC = 'ANGLES' TKFRAME_399104842_UNITS = 'DEGREES' TKFRAME_399104842_AXES = ( 3, 2, 3 ) TKFRAME_399104842_ANGLES = ( -284.4885610000000, -52.1436336111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WL4S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WL4S_TOPO is centered at the site NDOSL_WL4S, which has Cartesian coordinates X (km): 0.1264284557855E+04 Y (km): -0.4874794076581E+04 Z (km): 0.3900728783494E+04 and planetodetic coordinates Longitude (deg): -75.4605994722000 Latitude (deg): 37.9463133056000 Altitude (km): -0.2879299999898E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WL4S_TOPO = 399104208 FRAME_399104208_NAME = 'NDOSL_WL4S_TOPO' FRAME_399104208_CLASS = 4 FRAME_399104208_CLASS_ID = 399104208 FRAME_399104208_CENTER = 399104208 OBJECT_399104208_FRAME = 'NDOSL_WL4S_TOPO' TKFRAME_399104208_RELATIVE = 'ITRF93' TKFRAME_399104208_SPEC = 'ANGLES' TKFRAME_399104208_UNITS = 'DEGREES' TKFRAME_399104208_AXES = ( 3, 2, 3 ) TKFRAME_399104208_ANGLES = ( -284.5394005278000, -52.0536866944000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WL53_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WL53_TOPO is centered at the site NDOSL_WL53, which has Cartesian coordinates X (km): 0.1264319305169E+04 Y (km): -0.4874753180329E+04 Z (km): 0.3900773220127E+04 and planetodetic coordinates Longitude (deg): -75.4601000000000 Latitude (deg): 37.9468000000000 Altitude (km): -0.2580599999887E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WL53_TOPO = 399104209 FRAME_399104209_NAME = 'NDOSL_WL53_TOPO' FRAME_399104209_CLASS = 4 FRAME_399104209_CLASS_ID = 399104209 FRAME_399104209_CENTER = 399104209 OBJECT_399104209_FRAME = 'NDOSL_WL53_TOPO' TKFRAME_399104209_RELATIVE = 'ITRF93' TKFRAME_399104209_SPEC = 'ANGLES' TKFRAME_399104209_UNITS = 'DEGREES' TKFRAME_399104209_AXES = ( 3, 2, 3 ) TKFRAME_399104209_ANGLES = ( -284.5399000000000, -52.0532000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WL6S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WL6S_TOPO is centered at the site NDOSL_WL6S, which has Cartesian coordinates X (km): 0.1264262510453E+04 Y (km): -0.4874884314316E+04 Z (km): 0.3900692179997E+04 and planetodetic coordinates Longitude (deg): -75.4611000000000 Latitude (deg): 37.9456000000000 Altitude (km): 0.1321599999986E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WL6S_TOPO = 399104210 FRAME_399104210_NAME = 'NDOSL_WL6S_TOPO' FRAME_399104210_CLASS = 4 FRAME_399104210_CLASS_ID = 399104210 FRAME_399104210_CENTER = 399104210 OBJECT_399104210_FRAME = 'NDOSL_WL6S_TOPO' TKFRAME_399104210_RELATIVE = 'ITRF93' TKFRAME_399104210_SPEC = 'ANGLES' TKFRAME_399104210_UNITS = 'DEGREES' TKFRAME_399104210_AXES = ( 3, 2, 3 ) TKFRAME_399104210_ANGLES = ( -284.5389000000000, -52.0544000000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WLPF_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WLPF_TOPO is centered at the site NDOSL_WLPF, which has Cartesian coordinates X (km): 0.1263995385870E+04 Y (km): -0.4882265581624E+04 Z (km): 0.3891536992657E+04 and planetodetic coordinates Longitude (deg): -75.4850890833000 Latitude (deg): 37.8413397222000 Altitude (km): -0.2400000000109E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WLPF_TOPO = 399104840 FRAME_399104840_NAME = 'NDOSL_WLPF_TOPO' FRAME_399104840_CLASS = 4 FRAME_399104840_CLASS_ID = 399104840 FRAME_399104840_CENTER = 399104840 OBJECT_399104840_FRAME = 'NDOSL_WLPF_TOPO' TKFRAME_399104840_RELATIVE = 'ITRF93' TKFRAME_399104840_SPEC = 'ANGLES' TKFRAME_399104840_UNITS = 'DEGREES' TKFRAME_399104840_AXES = ( 3, 2, 3 ) TKFRAME_399104840_ANGLES = ( -284.5149109167000, -52.1586602778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WLPQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WLPQ_TOPO is centered at the site NDOSL_WLPQ, which has Cartesian coordinates X (km): 0.1261610595294E+04 Y (km): -0.4881553225765E+04 Z (km): 0.3893196735005E+04 and planetodetic coordinates Longitude (deg): -75.5092955556000 Latitude (deg): 37.8602614722000 Altitude (km): -0.2170000000112E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WLPQ_TOPO = 399104860 FRAME_399104860_NAME = 'NDOSL_WLPQ_TOPO' FRAME_399104860_CLASS = 4 FRAME_399104860_CLASS_ID = 399104860 FRAME_399104860_CENTER = 399104860 OBJECT_399104860_FRAME = 'NDOSL_WLPQ_TOPO' TKFRAME_399104860_RELATIVE = 'ITRF93' TKFRAME_399104860_SPEC = 'ANGLES' TKFRAME_399104860_UNITS = 'DEGREES' TKFRAME_399104860_AXES = ( 3, 2, 3 ) TKFRAME_399104860_ANGLES = ( -284.4907044444000, -52.1397385278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WP2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WP2S_TOPO is centered at the site NDOSL_WP2S, which has Cartesian coordinates X (km): 0.1263422813016E+04 Y (km): -0.4876310112744E+04 Z (km): 0.3899136314605E+04 and planetodetic coordinates Longitude (deg): -75.4744162500000 Latitude (deg): 37.9280669722000 Altitude (km): -0.2096100000001E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WP2S_TOPO = 399101337 FRAME_399101337_NAME = 'NDOSL_WP2S_TOPO' FRAME_399101337_CLASS = 4 FRAME_399101337_CLASS_ID = 399101337 FRAME_399101337_CENTER = 399101337 OBJECT_399101337_FRAME = 'NDOSL_WP2S_TOPO' TKFRAME_399101337_RELATIVE = 'ITRF93' TKFRAME_399101337_SPEC = 'ANGLES' TKFRAME_399101337_UNITS = 'DEGREES' TKFRAME_399101337_AXES = ( 3, 2, 3 ) TKFRAME_399101337_ANGLES = ( -284.5255837500000, -52.0719330278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WP2Y_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WP2Y_TOPO is centered at the site NDOSL_WP2Y, which has Cartesian coordinates X (km): 0.1263258642591E+04 Y (km): -0.4876532218335E+04 Z (km): 0.3898922547004E+04 and planetodetic coordinates Longitude (deg): -75.4768574167000 Latitude (deg): 37.9255851667000 Altitude (km): -0.1523399999910E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WP2Y_TOPO = 399101838 FRAME_399101838_NAME = 'NDOSL_WP2Y_TOPO' FRAME_399101838_CLASS = 4 FRAME_399101838_CLASS_ID = 399101838 FRAME_399101838_CENTER = 399101838 OBJECT_399101838_FRAME = 'NDOSL_WP2Y_TOPO' TKFRAME_399101838_RELATIVE = 'ITRF93' TKFRAME_399101838_SPEC = 'ANGLES' TKFRAME_399101838_UNITS = 'DEGREES' TKFRAME_399101838_AXES = ( 3, 2, 3 ) TKFRAME_399101838_ANGLES = ( -284.5231425833000, -52.0744148333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WP2Z_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WP2Z_TOPO is centered at the site NDOSL_WP2Z, which has Cartesian coordinates X (km): 0.1263465568872E+04 Y (km): -0.4876241992748E+04 Z (km): 0.3899212240947E+04 and planetodetic coordinates Longitude (deg): -75.4737511389000 Latitude (deg): 37.9289123333000 Altitude (km): -0.1784600000062E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WP2Z_TOPO = 399101840 FRAME_399101840_NAME = 'NDOSL_WP2Z_TOPO' FRAME_399101840_CLASS = 4 FRAME_399101840_CLASS_ID = 399101840 FRAME_399101840_CENTER = 399101840 OBJECT_399101840_FRAME = 'NDOSL_WP2Z_TOPO' TKFRAME_399101840_RELATIVE = 'ITRF93' TKFRAME_399101840_SPEC = 'ANGLES' TKFRAME_399101840_UNITS = 'DEGREES' TKFRAME_399101840_AXES = ( 3, 2, 3 ) TKFRAME_399101840_ANGLES = ( -284.5262488611000, -52.0710876667000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WP3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WP3S_TOPO is centered at the site NDOSL_WP3S, which has Cartesian coordinates X (km): 0.1263437470046E+04 Y (km): -0.4876286664530E+04 Z (km): 0.3899162889031E+04 and planetodetic coordinates Longitude (deg): -75.4741879722000 Latitude (deg): 37.9283611667000 Altitude (km): -0.1963099999963E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WP3S_TOPO = 399101338 FRAME_399101338_NAME = 'NDOSL_WP3S_TOPO' FRAME_399101338_CLASS = 4 FRAME_399101338_CLASS_ID = 399101338 FRAME_399101338_CENTER = 399101338 OBJECT_399101338_FRAME = 'NDOSL_WP3S_TOPO' TKFRAME_399101338_RELATIVE = 'ITRF93' TKFRAME_399101338_SPEC = 'ANGLES' TKFRAME_399101338_UNITS = 'DEGREES' TKFRAME_399101338_AXES = ( 3, 2, 3 ) TKFRAME_399101338_ANGLES = ( -284.5258120278000, -52.0716388333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WP3Z_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WP3Z_TOPO is centered at the site NDOSL_WP3Z, which has Cartesian coordinates X (km): 0.1263233936625E+04 Y (km): -0.4876672116358E+04 Z (km): 0.3898748301835E+04 and planetodetic coordinates Longitude (deg): -75.4775284444000 Latitude (deg): 37.9236312222000 Altitude (km): -0.2038800000056E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WP3Z_TOPO = 399101841 FRAME_399101841_NAME = 'NDOSL_WP3Z_TOPO' FRAME_399101841_CLASS = 4 FRAME_399101841_CLASS_ID = 399101841 FRAME_399101841_CENTER = 399101841 OBJECT_399101841_FRAME = 'NDOSL_WP3Z_TOPO' TKFRAME_399101841_RELATIVE = 'ITRF93' TKFRAME_399101841_SPEC = 'ANGLES' TKFRAME_399101841_UNITS = 'DEGREES' TKFRAME_399101841_AXES = ( 3, 2, 3 ) TKFRAME_399101841_ANGLES = ( -284.5224715556000, -52.0763687778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WPDA_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WPDA_TOPO is centered at the site NDOSL_WPDA, which has Cartesian coordinates X (km): 0.1263391089724E+04 Y (km): -0.4876375736292E+04 Z (km): 0.3899081960703E+04 and planetodetic coordinates Longitude (deg): -75.4749527500000 Latitude (deg): 37.9273729722000 Altitude (km): -0.1053799999972E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WPDA_TOPO = 399101339 FRAME_399101339_NAME = 'NDOSL_WPDA_TOPO' FRAME_399101339_CLASS = 4 FRAME_399101339_CLASS_ID = 399101339 FRAME_399101339_CENTER = 399101339 OBJECT_399101339_FRAME = 'NDOSL_WPDA_TOPO' TKFRAME_399101339_RELATIVE = 'ITRF93' TKFRAME_399101339_SPEC = 'ANGLES' TKFRAME_399101339_UNITS = 'DEGREES' TKFRAME_399101339_AXES = ( 3, 2, 3 ) TKFRAME_399101339_ANGLES = ( -284.5250472500000, -52.0726270278000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WPS8_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WPS8_TOPO is centered at the site NDOSL_WPS8, which has Cartesian coordinates X (km): 0.1263314394828E+04 Y (km): -0.4876388351699E+04 Z (km): 0.3899074526229E+04 and planetodetic coordinates Longitude (deg): -75.4758331944000 Latitude (deg): 37.9273590278000 Altitude (km): -0.2064699999980E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WPS8_TOPO = 399101336 FRAME_399101336_NAME = 'NDOSL_WPS8_TOPO' FRAME_399101336_CLASS = 4 FRAME_399101336_CLASS_ID = 399101336 FRAME_399101336_CENTER = 399101336 OBJECT_399101336_FRAME = 'NDOSL_WPS8_TOPO' TKFRAME_399101336_RELATIVE = 'ITRF93' TKFRAME_399101336_SPEC = 'ANGLES' TKFRAME_399101336_UNITS = 'DEGREES' TKFRAME_399101336_AXES = ( 3, 2, 3 ) TKFRAME_399101336_ANGLES = ( -284.5241668056000, -52.0726409722000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WPSA_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WPSA_TOPO is centered at the site NDOSL_WPSA, which has Cartesian coordinates X (km): 0.1263388087508E+04 Y (km): -0.4876375736097E+04 Z (km): 0.3899067962885E+04 and planetodetic coordinates Longitude (deg): -75.4749858056000 Latitude (deg): 37.9272776667000 Altitude (km): -0.1973600000087E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WPSA_TOPO = 399101334 FRAME_399101334_NAME = 'NDOSL_WPSA_TOPO' FRAME_399101334_CLASS = 4 FRAME_399101334_CLASS_ID = 399101334 FRAME_399101334_CENTER = 399101334 OBJECT_399101334_FRAME = 'NDOSL_WPSA_TOPO' TKFRAME_399101334_RELATIVE = 'ITRF93' TKFRAME_399101334_SPEC = 'ANGLES' TKFRAME_399101334_UNITS = 'DEGREES' TKFRAME_399101334_AXES = ( 3, 2, 3 ) TKFRAME_399101334_ANGLES = ( -284.5250141944000, -52.0727223333000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WPSS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WPSS_TOPO is centered at the site NDOSL_WPSS, which has Cartesian coordinates X (km): 0.1263288999619E+04 Y (km): -0.4876455563343E+04 Z (km): 0.3899012030619E+04 and planetodetic coordinates Longitude (deg): -75.4763045278000 Latitude (deg): 37.9265898611000 Altitude (km): -0.1276199999924E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WPSS_TOPO = 399101335 FRAME_399101335_NAME = 'NDOSL_WPSS_TOPO' FRAME_399101335_CLASS = 4 FRAME_399101335_CLASS_ID = 399101335 FRAME_399101335_CENTER = 399101335 OBJECT_399101335_FRAME = 'NDOSL_WPSS_TOPO' TKFRAME_399101335_RELATIVE = 'ITRF93' TKFRAME_399101335_SPEC = 'ANGLES' TKFRAME_399101335_UNITS = 'DEGREES' TKFRAME_399101335_AXES = ( 3, 2, 3 ) TKFRAME_399101335_ANGLES = ( -284.5236954722000, -52.0734101389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WS1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WS1S_TOPO is centered at the site NDOSL_WS1S, which has Cartesian coordinates X (km): -0.1539026996350E+04 Y (km): -0.5158584180672E+04 Z (km): 0.3411917536514E+04 and planetodetic coordinates Longitude (deg): -106.6120995278000 Latitude (deg): 32.5407549444000 Altitude (km): 0.1456545000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WS1S_TOPO = 399101931 FRAME_399101931_NAME = 'NDOSL_WS1S_TOPO' FRAME_399101931_CLASS = 4 FRAME_399101931_CLASS_ID = 399101931 FRAME_399101931_CENTER = 399101931 OBJECT_399101931_FRAME = 'NDOSL_WS1S_TOPO' TKFRAME_399101931_RELATIVE = 'ITRF93' TKFRAME_399101931_SPEC = 'ANGLES' TKFRAME_399101931_UNITS = 'DEGREES' TKFRAME_399101931_AXES = ( 3, 2, 3 ) TKFRAME_399101931_ANGLES = ( -253.3879004722000, -57.4592450556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WSCZ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WSCZ_TOPO is centered at the site NDOSL_WSCZ, which has Cartesian coordinates X (km): -0.1539530679387E+04 Y (km): -0.5160688741604E+04 Z (km): 0.3408555106535E+04 and planetodetic coordinates Longitude (deg): -106.6108333333000 Latitude (deg): 32.5047222222000 Altitude (km): 0.1470660000002E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WSCZ_TOPO = 399101871 FRAME_399101871_NAME = 'NDOSL_WSCZ_TOPO' FRAME_399101871_CLASS = 4 FRAME_399101871_CLASS_ID = 399101871 FRAME_399101871_CENTER = 399101871 OBJECT_399101871_FRAME = 'NDOSL_WSCZ_TOPO' TKFRAME_399101871_RELATIVE = 'ITRF93' TKFRAME_399101871_SPEC = 'ANGLES' TKFRAME_399101871_UNITS = 'DEGREES' TKFRAME_399101871_AXES = ( 3, 2, 3 ) TKFRAME_399101871_ANGLES = ( -253.3891666667000, -57.4952777778000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WSE1_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WSE1_TOPO is centered at the site NDOSL_WSE1, which has Cartesian coordinates X (km): -0.1539368494511E+04 Y (km): -0.5160926896742E+04 Z (km): 0.3408230544049E+04 and planetodetic coordinates Longitude (deg): -106.6084556111000 Latitude (deg): 32.5013735000000 Altitude (km): 0.1449630000001E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WSE1_TOPO = 399101932 FRAME_399101932_NAME = 'NDOSL_WSE1_TOPO' FRAME_399101932_CLASS = 4 FRAME_399101932_CLASS_ID = 399101932 FRAME_399101932_CENTER = 399101932 OBJECT_399101932_FRAME = 'NDOSL_WSE1_TOPO' TKFRAME_399101932_RELATIVE = 'ITRF93' TKFRAME_399101932_SPEC = 'ANGLES' TKFRAME_399101932_UNITS = 'DEGREES' TKFRAME_399101932_AXES = ( 3, 2, 3 ) TKFRAME_399101932_ANGLES = ( -253.3915443889000, -57.4986265000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WSE2_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WSE2_TOPO is centered at the site NDOSL_WSE2, which has Cartesian coordinates X (km): -0.1539378322508E+04 Y (km): -0.5160931208492E+04 Z (km): 0.3408234966191E+04 and planetodetic coordinates Longitude (deg): -106.6085426944000 Latitude (deg): 32.5013735000000 Altitude (km): 0.1457860000003E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WSE2_TOPO = 399101933 FRAME_399101933_NAME = 'NDOSL_WSE2_TOPO' FRAME_399101933_CLASS = 4 FRAME_399101933_CLASS_ID = 399101933 FRAME_399101933_CENTER = 399101933 OBJECT_399101933_FRAME = 'NDOSL_WSE2_TOPO' TKFRAME_399101933_RELATIVE = 'ITRF93' TKFRAME_399101933_SPEC = 'ANGLES' TKFRAME_399101933_UNITS = 'DEGREES' TKFRAME_399101933_AXES = ( 3, 2, 3 ) TKFRAME_399101933_ANGLES = ( -253.3914573056000, -57.4986265000000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WSSH_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WSSH_TOPO is centered at the site NDOSL_WSSH, which has Cartesian coordinates X (km): -0.1519923208299E+04 Y (km): -0.5142800491049E+04 Z (km): 0.3443466195215E+04 and planetodetic coordinates Longitude (deg): -106.4647222222000 Latitude (deg): 32.8802777778000 Altitude (km): 0.1198474000000E+01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WSSH_TOPO = 399101870 FRAME_399101870_NAME = 'NDOSL_WSSH_TOPO' FRAME_399101870_CLASS = 4 FRAME_399101870_CLASS_ID = 399101870 FRAME_399101870_CENTER = 399101870 OBJECT_399101870_FRAME = 'NDOSL_WSSH_TOPO' TKFRAME_399101870_RELATIVE = 'ITRF93' TKFRAME_399101870_SPEC = 'ANGLES' TKFRAME_399101870_UNITS = 'DEGREES' TKFRAME_399101870_AXES = ( 3, 2, 3 ) TKFRAME_399101870_ANGLES = ( -253.5352777778000, -57.1197222222000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WT1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WT1S_TOPO is centered at the site NDOSL_WT1S, which has Cartesian coordinates X (km): -0.2268775657564E+04 Y (km): -0.1447649596454E+04 Z (km): 0.5763613219042E+04 and planetodetic coordinates Longitude (deg): -147.4590602778000 Latitude (deg): 65.1172369167000 Altitude (km): 0.4314440000008E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WT1S_TOPO = 399104865 FRAME_399104865_NAME = 'NDOSL_WT1S_TOPO' FRAME_399104865_CLASS = 4 FRAME_399104865_CLASS_ID = 399104865 FRAME_399104865_CENTER = 399104865 OBJECT_399104865_FRAME = 'NDOSL_WT1S_TOPO' TKFRAME_399104865_RELATIVE = 'ITRF93' TKFRAME_399104865_SPEC = 'ANGLES' TKFRAME_399104865_UNITS = 'DEGREES' TKFRAME_399104865_AXES = ( 3, 2, 3 ) TKFRAME_399104865_ANGLES = ( -212.5409397222000, -24.8827630833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WT2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WT2S_TOPO is centered at the site NDOSL_WT2S, which has Cartesian coordinates X (km): -0.2268881086868E+04 Y (km): -0.1447578212664E+04 Z (km): 0.5763588589162E+04 and planetodetic coordinates Longitude (deg): -147.4615486944000 Latitude (deg): 65.1167332500000 Altitude (km): 0.4303419999992E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WT2S_TOPO = 399104866 FRAME_399104866_NAME = 'NDOSL_WT2S_TOPO' FRAME_399104866_CLASS = 4 FRAME_399104866_CLASS_ID = 399104866 FRAME_399104866_CENTER = 399104866 OBJECT_399104866_FRAME = 'NDOSL_WT2S_TOPO' TKFRAME_399104866_RELATIVE = 'ITRF93' TKFRAME_399104866_SPEC = 'ANGLES' TKFRAME_399104866_UNITS = 'DEGREES' TKFRAME_399104866_AXES = ( 3, 2, 3 ) TKFRAME_399104866_ANGLES = ( -212.5384513056000, -24.8832667500000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WT3S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WT3S_TOPO is centered at the site NDOSL_WT3S, which has Cartesian coordinates X (km): 0.1263250603432E+04 Y (km): -0.4876715576030E+04 Z (km): 0.3898704794447E+04 and planetodetic coordinates Longitude (deg): -75.4774688889000 Latitude (deg): 37.9230659167000 Altitude (km): -0.1064400000058E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WT3S_TOPO = 399104867 FRAME_399104867_NAME = 'NDOSL_WT3S_TOPO' FRAME_399104867_CLASS = 4 FRAME_399104867_CLASS_ID = 399104867 FRAME_399104867_CENTER = 399104867 OBJECT_399104867_FRAME = 'NDOSL_WT3S_TOPO' TKFRAME_399104867_RELATIVE = 'ITRF93' TKFRAME_399104867_SPEC = 'ANGLES' TKFRAME_399104867_UNITS = 'DEGREES' TKFRAME_399104867_AXES = ( 3, 2, 3 ) TKFRAME_399104867_ANGLES = ( -284.5225311111001, -52.0769340833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WTDQ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WTDQ_TOPO is centered at the site NDOSL_WTDQ, which has Cartesian coordinates X (km): 0.1263250603432E+04 Y (km): -0.4876715576030E+04 Z (km): 0.3898704794447E+04 and planetodetic coordinates Longitude (deg): -75.4774688889000 Latitude (deg): 37.9230659167000 Altitude (km): -0.1064400000058E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WTDQ_TOPO = 399104861 FRAME_399104861_NAME = 'NDOSL_WTDQ_TOPO' FRAME_399104861_CLASS = 4 FRAME_399104861_CLASS_ID = 399104861 FRAME_399104861_CENTER = 399104861 OBJECT_399104861_FRAME = 'NDOSL_WTDQ_TOPO' TKFRAME_399104861_RELATIVE = 'ITRF93' TKFRAME_399104861_SPEC = 'ANGLES' TKFRAME_399104861_UNITS = 'DEGREES' TKFRAME_399104861_AXES = ( 3, 2, 3 ) TKFRAME_399104861_ANGLES = ( -284.5225311111001, -52.0769340833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WTDS_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WTDS_TOPO is centered at the site NDOSL_WTDS, which has Cartesian coordinates X (km): 0.1263250603432E+04 Y (km): -0.4876715576030E+04 Z (km): 0.3898704794447E+04 and planetodetic coordinates Longitude (deg): -75.4774688889000 Latitude (deg): 37.9230659167000 Altitude (km): -0.1064400000058E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WTDS_TOPO = 399104861 FRAME_399104861_NAME = 'NDOSL_WTDS_TOPO' FRAME_399104861_CLASS = 4 FRAME_399104861_CLASS_ID = 399104861 FRAME_399104861_CENTER = 399104861 OBJECT_399104861_FRAME = 'NDOSL_WTDS_TOPO' TKFRAME_399104861_RELATIVE = 'ITRF93' TKFRAME_399104861_SPEC = 'ANGLES' TKFRAME_399104861_UNITS = 'DEGREES' TKFRAME_399104861_AXES = ( 3, 2, 3 ) TKFRAME_399104861_ANGLES = ( -284.5225311111001, -52.0769340833000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WU1S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WU1S_TOPO is centered at the site NDOSL_WU1S, which has Cartesian coordinates X (km): 0.4206093911517E+04 Y (km): 0.8240823976267E+03 Z (km): 0.4708435189820E+04 and planetodetic coordinates Longitude (deg): 11.0853025000000 Latitude (deg): 47.8800694444000 Altitude (km): 0.6633920000006E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WU1S_TOPO = 399101907 FRAME_399101907_NAME = 'NDOSL_WU1S_TOPO' FRAME_399101907_CLASS = 4 FRAME_399101907_CLASS_ID = 399101907 FRAME_399101907_CENTER = 399101907 OBJECT_399101907_FRAME = 'NDOSL_WU1S_TOPO' TKFRAME_399101907_RELATIVE = 'ITRF93' TKFRAME_399101907_SPEC = 'ANGLES' TKFRAME_399101907_UNITS = 'DEGREES' TKFRAME_399101907_AXES = ( 3, 2, 3 ) TKFRAME_399101907_ANGLES = ( -11.0853025000000, -42.1199305556000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WU2S_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WU2S_TOPO is centered at the site NDOSL_WU2S, which has Cartesian coordinates X (km): 0.4206026691719E+04 Y (km): 0.8239408917145E+03 Z (km): 0.4708519409355E+04 and planetodetic coordinates Longitude (deg): 11.0836188889000 Latitude (deg): 47.8811988889000 Altitude (km): 0.6633740000015E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WU2S_TOPO = 399101908 FRAME_399101908_NAME = 'NDOSL_WU2S_TOPO' FRAME_399101908_CLASS = 4 FRAME_399101908_CLASS_ID = 399101908 FRAME_399101908_CENTER = 399101908 OBJECT_399101908_FRAME = 'NDOSL_WU2S_TOPO' TKFRAME_399101908_RELATIVE = 'ITRF93' TKFRAME_399101908_SPEC = 'ANGLES' TKFRAME_399101908_UNITS = 'DEGREES' TKFRAME_399101908_AXES = ( 3, 2, 3 ) TKFRAME_399101908_ANGLES = ( -11.0836188889000, -42.1188011111000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_WULY_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_WULY_TOPO is centered at the site NDOSL_WULY, which has Cartesian coordinates X (km): -0.2670175051733E+04 Y (km): -0.4522945890508E+04 Z (km): 0.3606529763922E+04 and planetodetic coordinates Longitude (deg): -120.5559847222000 Latitude (deg): 34.6554133611000 Altitude (km): 0.7523000000118E-01 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_WULY_TOPO = 399104215 FRAME_399104215_NAME = 'NDOSL_WULY_TOPO' FRAME_399104215_CLASS = 4 FRAME_399104215_CLASS_ID = 399104215 FRAME_399104215_CENTER = 399104215 OBJECT_399104215_FRAME = 'NDOSL_WULY_TOPO' TKFRAME_399104215_RELATIVE = 'ITRF93' TKFRAME_399104215_SPEC = 'ANGLES' TKFRAME_399104215_UNITS = 'DEGREES' TKFRAME_399104215_AXES = ( 3, 2, 3 ) TKFRAME_399104215_ANGLES = ( -239.4440152778000, -55.3445866389000, 180.0000000000000 ) \begintext Topocentric frame NDOSL_YARZ_TOPO The Z axis of this frame points toward the zenith. The X axis of this frame points North. Topocentric frame NDOSL_YARZ_TOPO is centered at the site NDOSL_YARZ, which has Cartesian coordinates X (km): -0.2388978205420E+04 Y (km): 0.5043286784130E+04 Z (km): -0.3078515363109E+04 and planetodetic coordinates Longitude (deg): 115.3466666667000 Latitude (deg): -29.0466455278000 Altitude (km): 0.1923500000000E+00 These planetodetic coordinates are expressed relative to a reference spheroid having the dimensions Equatorial radius (km): 6.3781370000000E+03 Polar radius (km): 6.3567523142452E+03 All of the above coordinates are relative to the frame ITRF93. \begindata FRAME_NDOSL_YARZ_TOPO = 399108566 FRAME_399108566_NAME = 'NDOSL_YARZ_TOPO' FRAME_399108566_CLASS = 4 FRAME_399108566_CLASS_ID = 399108566 FRAME_399108566_CENTER = 399108566 OBJECT_399108566_FRAME = 'NDOSL_YARZ_TOPO' TKFRAME_399108566_RELATIVE = 'ITRF93' TKFRAME_399108566_SPEC = 'ANGLES' TKFRAME_399108566_UNITS = 'DEGREES' TKFRAME_399108566_AXES = ( 3, 2, 3 ) TKFRAME_399108566_ANGLES = ( -115.3466666667000, -119.0466455278000, 180.0000000000000 ) \begintext Definitions file ndosl_190716_v02.input -------------------------------------------------------------------------------- NDOSL Station Locations SPK File ========================================================================= Wed Nov 27 08:40:51 PST 2019 -- BVS/NAIF Abstract ======================================================= This pair of SPK and FK files contains locations and topocentric frame definitions for a subset of stations from ``WGS84 NASA DIRECTORY OF STATION LOCATIONS'' (NDOSL) [1]. This subset does not includes locations of launch pads, lasers, aircraft, runways, cameras, and command centers. The WGS-84 reference parameters, station coordinates, and location and equipment descriptions are summarized in Tables 1, 2, and 3 below. These SPK and FK were made using PINPOINT. The keywords defining PINPOINT inputs are provided in the section "PINPOINT Inputs" below. Since both the station locations and frame orientations are defined relative to ITRF93, a high precision Earth orientation PCK file providing the orientation of ITRF93 must be loaded together with these SPK and FK. Station and Frame Names and IDs ======================================================= NAIF object and frame names and IDs for stations, for which data is provided in these files were based on the from alpha-numeric station codes (STDN_CODE) and four-digit station NASA numbers (NASA_NMBR) as follows: = 'NDOSL_' = 399100000 + = 'NDOSL__TOPO' = 399100000 + References ======================================================= [1] NASA DIRECTORY OF STATION LOCATIONS (NDOSL), July 16, 2019 Table 1: WGS-84 Ellipsoid ======================================================= From "SECT. D1: SPHEROID CONSTANTS" in [1]: -- -------- ------------ ------------- NO SPHEROID R (M) 1/F -- -------- ------------ ------------- 25 WGS84 6378137.0000 298.257223563 -- -------- ------------ ------------- Spheroid RADII corresponding to the values above are: BODY399_RADII = ( 6378.137 6378.137 6356.75231424518 ) Table 2: GEODETIC POSITIONS ON WORLD GEODETIC SYSTEM 1984 ======================================================= ---- ---- -------------- -------------- -------- ------------------------ STDN NASA LATITUDE E. LONGITUDE HEIGHT NOTE CODE NMBR DEG AMIN ASEC DEG AMIN ASEC METERS ---- ---- -------------- -------------- -------- ------------------------ AC2J 0208 -7 55 04.4961 345 36 33.2355 71.470 ACN3 1306 -7 57 17.5769 345 40 22.4282 561.403 (deactivated) ACNJ 0207 -7 55 04.4961 345 36 33.2355 71.470 ADRQ 4284 5 12 32.8581 307 15 05.7560 -13.808 AG1S 1701 65 07 00.1210 212 32 19.6650 436.700 AG23 1377 -33 09 06.4589 289 19 57.6779 730.000 AG33 1404 -33 09 05.3227 289 19 54.0928 730.853 AGO3 1319 -33 09 03.9869 289 20 00.9492 733.301 AGOS 1318 -33 08 53.9622 289 19 56.5260 730.240 AGU3 1319 -33 09 03.9869 289 20 00.9492 733.301 AGUS 1321 -33 08 53.9622 289 19 56.5260 730.240 AL2J 0209 -23 45 31.7176 133 52 57.3546 576.542 ALAY 1707 32 52 21.1192 254 11 15.4339 2796.240 ALSJ 0204 -23 45 31.7176 133 52 57.3546 576.542 AMSJ 0205 -14 19 53.2000 189 16 50.1000 55.400 (deactivated) AN3S 1704 17 08 13.0230 298 13 32.3400 -16.590 AN8S 1705 17 08 11.8496 298 13 32.5566 -4.560 ANRQ 4082 17 08 14.2438 298 13 29.1959 -17.318 ANTQ 4087 17 08 37.1440 298 12 26.9550 3.630 APLS 1725 39 10 02.6400 283 54 00.0000 146.510 AS2Q 4765 -7 58 22.1025 345 35 56.5769 143.500 AS2S 1743 64 51 34.0589 212 09 00.9156 237.770 AS3S 1744 64 51 31.9514 212 08 45.1856 220.217 ASCQ 4045 -7 54 23.8867 345 35 51.0000 56.000 ASFS 1720 64 51 31.3637 212 08 32.6574 217.497 ASNS 1726 -7 55 00.0018 345 40 00.0000 23.004 ATDQ 4862 33 55 51.1830 275 53 28.9322 282.637 ATDS 4862 33 55 51.1830 275 53 28.9322 282.637 ATFS 1972 -29 02 41.7841 115 21 04.5572 247.360 ATLS 1736 33 55 51.1200 275 53 29.8800 260.000 ATMY 1708 33 44 22.6673 253 38 07.5954 2395.244 AUSS 4259 43 25 43.3056 1 29 57.8832 260.479 AUWS 1902 -29 02 44.7651 115 20 55.2050 250.600 BANF 4020 13 01 48.0000 77 30 36.0000 838.000 BD1S 4056 32 21 03.7581 295 20 28.1724 -12.420 BDA3 1303 32 21 04.5631 295 20 31.6020 -11.380 (deactivated) BDAA 1360 32 21 04.1494 295 20 28.3574 -7.323 (deactivated) BDAQ 4760 32 20 52.5955 295 20 47.5819 -9.880 (deactivated) BDDQ 4760 32 20 52.5955 295 20 47.5819 -9.880 (deactivated) BLKQ 4263 -78 07 46.4840 166 09 01.5580 162.512 BLT3 1915 38 59 54.4110 283 09 26.0397 18.333 (deactivated) BLTA 1316 38 59 53.6910 283 09 29.0198 24.834 BLTD 1315 38 59 54.4110 283 09 26.0397 18.333 (deactivated) BLTJ 0290 39 00 09.7327 283 09 43.4598 13.660 BP1K 4754 38 25 44.9947 282 54 57.8069 -15.734 BP1S 1322 38 25 44.9947 282 54 57.8069 -15.734 BP2K 4755 38 25 43.6110 282 54 57.8083 -15.743 BP2S 1323 38 25 43.6110 282 54 57.8083 -15.743 BREQ 4283 4 56 55.9641 307 41 25.6406 51.960 BRKS 1732 37 52 45.7557 237 45 25.9783 357.034 CA2F 4241 34 34 58.9020 239 26 19.9864 627.550 CALF 4018 34 34 57.8588 239 26 18.3396 627.540 CALT 4280 34 39 57.0402 239 25 06.7919 88.520 CALY 1835 34 33 56.2455 239 29 56.3529 623.910 CANS 4723 -35 24 16.8000 148 58 59.0088 680.000 CB1D 1567 40 27 09.6870 355 37 56.8298 794.073 CHAS 1340 38 53 25.2000 282 33 28.2000 135.000 (deactivated) CN2F 4088 28 31 43.9399 279 24 33.9781 -20.471 (deactivated) CN4F 4223 28 27 47.4045 279 25 00.7987 -14.810 CN5F 4344 28 31 01.2878 279 26 11.6884 13.690 CNVF 4041 28 28 53.7812 279 25 24.5670 -14.220 COCS 4085 -12 12 00.0000 96 51 00.0000 0.000 CT2J 0294 32 30 01.7716 253 23 29.1941 1450.172 CTSS 1756 38 48 21.5583 255 28 17.5111 1907.519 CTVJ 0293 32 30 01.7716 253 23 29.1941 1450.172 D26D 1526 35 20 08.4812 243 07 37.1406 968.686 D27D 1516 35 14 17.7784 243 13 24.0584 1052.468 D36D 1536 -35 23 42.3663 148 58 42.7591 685.503 DAKS 4072 14 43 29.1440 342 52 16.4392 91.278 DFRS 4067 34 56 59.2467 242 06 45.3814 679.907 DGIS 4073 -7 16 12.1100 72 22 11.9950 -68.375 DS12 1612 35 17 59.7819 243 11 40.4038 969.669 DS14 1514 35 25 33.2431 243 06 37.6624 1001.390 DS15 1515 35 25 18.6718 243 06 46.0976 973.211 DS16 1312 35 20 29.5418 243 07 34.8609 943.977 DS17 1327 35 20 32.0278 243 07 35.5610 942.701 DS24 4252 35 20 23.6142 243 07 30.7401 951.499 DS25 1525 35 20 15.4031 243 07 28.6925 959.634 DS34 1534 -35 23 54.5238 148 58 55.0719 692.020 DS35 1535 -35 23 44.8639 148 58 53.2409 694.889 DS42 1547 -35 24 02.4619 148 58 52.4791 684.755 DS43 1548 -35 24 08.7272 148 58 52.5623 688.867 DS45 1549 -35 23 54.4477 148 58 39.6683 674.347 DS46 1546 -35 24 18.0383 148 58 59.0941 676.812 DS54 1554 40 25 32.2380 355 44 45.2514 837.051 DS55 1555 40 25 27.4653 355 44 50.5201 819.061 DS61 1662 40 25 43.4800 355 45 03.8591 848.658 DS63 1564 40 25 52.3551 355 45 07.1692 864.816 DS65 1565 40 25 37.9429 355 44 57.4840 833.854 DS66 1566 40 25 47.9095 355 44 54.8965 849.874 DS87 1587 37 55 35.7235 284 31 25.3037 -12.762 DX2S 1715 65 07 04.2020 212 34 07.8150 514.650 (deactivated) DXAS 1711 65 07 04.5470 212 33 59.3860 518.900 EA2F 4065 34 58 13.6340 242 04 09.9780 799.726 EA3F 4221 34 56 17.2116 241 54 31.2131 743.537 EAFF 4064 34 57 38.3754 242 05 18.4166 780.567 EG2F 4345 30 34 21.1006 273 47 07.0173 37.711 EG3F 4346 30 25 17.9961 273 12 07.1568 1.143 (deactivated) ET1S 1973 32 30 16.4696 253 23 19.1857 1443.190 ET2S 1974 32 30 15.7842 253 23 19.8316 1463.649 EULY 4205 28 27 48.8307 279 20 49.1561 -10.510 EVCS 1363 28 29 09.6000 279 25 26.4000 14.996 FR1X 1844 34 57 02.5000 242 06 16.4000 717.000 FR2F 4249 34 57 01.6062 242 06 17.1228 723.967 FR2X 1845 34 57 02.6000 242 06 17.0000 717.000 FRCF 4069 34 57 38.8969 242 05 18.6141 751.842 FT2F 4138 31 33 24.3607 249 33 42.5760 1794.960 FTHF 4115 31 34 15.6873 249 37 45.1273 1486.316 GB2Y 1814 26 37 31.6966 281 42 05.3088 -10.997 GBIQ 4013 26 36 56.3112 281 39 07.7758 -13.684 (deactivated) GBIY 1813 26 37 31.6076 281 42 03.2717 0.878 GD28 1517 35 20 29.5535 243 07 35.0232 940.941 GDSA 1317 35 20 29.5535 243 07 37.1952 935.541 (deactivated) GILD 7225 64 58 42.6333 212 30 07.1993 320.131 (proposed) GILE 4047 64 58 42.6256 212 30 07.1983 322.434 GLAS 1712 64 58 25.2191 212 29 13.7808 387.482 GLBS 1713 64 58 24.5353 212 29 28.6853 405.478 GLCS 1714 64 58 23.3116 212 29 42.7979 424.474 GT2S 1375 13 36 57.1703 144 51 19.5759 209.160 GTKQ 4086 21 27 45.4738 288 52 04.4824 -5.582 GTSS 1368 13 36 54.6808 144 51 21.7881 219.060 GW1J 1971 13 35 19.0410 144 50 27.5423 199.022 GW2J 0210 13 35 19.0409 144 50 27.5579 199.068 GW2K 1968 13 35 15.3178 144 50 27.1481 197.665 GW2S 1969 13 35 15.3178 144 50 27.1481 197.665 GW3S 1970 13 35 14.3146 144 50 27.1498 197.738 GWE2 1936 13 35 12.3230 144 50 26.8951 191.148 GWM3 1309 13 18 38.4820 144 44 12.5351 148.640 GWMK 1965 13 35 16.8643 144 50 27.3462 192.610 GWMS 1966 13 35 16.8643 144 50 27.3462 192.610 HAW3 1311 22 07 34.5812 200 20 05.4419 1157.200 HAWQ 4285 21 18 57.9600 202 06 48.9600 0.000 HAWS 1706 19 00 48.9014 204 20 13.2000 274.314 HB33 1325 -25 53 11.1400 27 42 26.8100 1563.720 HB4S 1378 -25 53 12.2116 27 42 45.3719 1550.021 HB5S 1403 -25 53 12.9606 27 42 24.0186 1568.221 HBK3 1324 -25 53 12.2200 27 42 45.3600 1549.040 HBKS 1402 -25 53 13.2000 27 42 43.2000 1544.830 HOLF 4144 32 54 05.2699 253 54 02.9896 1241.500 HR1S 1718 37 56 43.7970 284 32 19.9120 -18.510 HR2S 1719 37 56 43.5330 284 32 16.4760 -17.430 HR3S 1749 39 00 02.1700 283 09 30.8220 -30.420 HT2S 1373 21 34 08.2985 201 44 15.7962 319.658 HTSS 1367 21 33 44.1799 201 45 28.4776 430.423 HWIS 1903 19 00 50.0562 204 20 12.1155 367.200 JD2Y 1818 26 58 56.0275 279 53 32.7811 -1.960 JDIQ 4248 26 58 58.7989 279 53 30.4654 -6.403 JDIY 1817 26 59 01.6942 279 53 28.5099 -10.530 JSCJ 0291 29 33 42.0826 264 54 36.0000 49.531 KA2S 1735 35 42 31.5427 139 29 30.4000 -641.245 KENS 4722 -2 59 44.0070 40 11 40.2180 12.314 KERS 4253 -49 21 10.4616 70 15 26.2152 82.471 KGLQ 4261 -49 21 06.8956 70 15 21.5420 6.100 KI2S 1727 67 51 25.6506 20 57 51.6301 402.275 KICS 4255 67 53 03.2352 21 03 38.7684 440.604 KILS 4256 67 52 35.5152 21 03 44.4132 514.892 KIXS 4257 67 52 41.3652 21 03 48.2328 508.573 KLMS 1710 78 13 48.7980 15 23 53.2973 498.520 KM2F 4971 9 23 43.5437 167 28 45.4380 62.860 KMPF 4110 8 43 18.0369 167 43 35.3642 39.263 KMQF 4111 8 43 17.8874 167 43 35.8392 39.264 KMRF 4968 9 23 55.4896 167 28 55.7335 57.370 KMRQ 4969 9 23 54.9585 167 28 58.2577 42.480 KMRT 4970 8 43 10.3635 167 43 06.6874 59.040 (deactivated) KPTQ 4282 21 34 19.6310 201 44 00.2928 301.320 KRCS 1797 -12 41 38.4000 141 55 50.4000 21.000 KRUF 8501 5 06 50.4231 307 21 18.0363 148.008 KRUS 4258 5 05 55.8528 307 21 36.4608 110.039 KSWC 1855 33 25 41.0000 126 17 44.3000 84.000 KU1S 1905 67 53 22.4100 21 03 56.3570 400.400 KU2S 1906 67 52 59.4570 21 03 37.6140 428.200 KU3S 1909 67 52 44.6550 21 02 16.8000 527.000 KUSS 4055 28 32 31.4337 279 21 25.3715 9.830 LANS 1728 48 45 05.0953 356 31 48.0000 110.676 LBVS 4250 0 21 16.6672 9 40 31.0810 111.269 LE1S 1721 65 07 00.6660 212 32 15.8820 414.000 LE2S 1722 37 55 24.7060 284 31 25.8990 -33.501 MAD8 1307 40 27 19.6178 355 49 53.8141 837.886 (deactivated) MC1S 4848 -77 50 20.8662 166 40 01.4964 153.000 MCMS 4847 -77 48 00.0000 166 24 00.0000 20.000 MDLS 1904 39 10 02.5000 283 06 04.4000 146.400 MG1D 1574 -35 46 33.4928 290 36 06.5464 1571.768 MIL3 1301 28 30 29.2460 279 18 23.7602 -25.950 MILA 1901 28 30 29.3769 279 18 26.0902 -27.340 (deactivated) MILJ 0292 28 30 21.5621 279 18 25.1536 -21.310 MIMF 4220 28 37 33.3955 279 19 01.9423 -18.120 MLAQ 4084 28 25 28.9603 279 20 08.2044 -17.350 MMTF 4347 28 28 42.8765 279 19 30.7609 -12.298 MPLS 1967 27 45 46.4112 344 21 58.3200 204.900 MTLF 4155 32 26 29.9876 249 12 40.3090 2772.820 MTLS 4156 32 26 31.6916 249 12 37.9777 2769.192 NH2S 1374 42 56 41.0700 288 22 10.8418 193.259 NHSS 1366 42 56 52.1568 288 22 24.3749 203.280 NN1D 1573 -31 02 53.5855 116 11 29.4213 252.257 NSGS 1724 53 19 47.0000 13 04 12.0000 115.000 ORR3 1320 -35 37 40.4144 148 57 25.2836 951.982 (deactivated) OTSS 1364 51 06 50.8224 359 06 18.3706 -18.852 PA2Q 4089 28 13 38.3814 279 23 38.0465 -14.380 PATQ 4060 28 13 35.0487 279 24 02.6051 -13.760 PDLS 4054 29 03 59.9308 279 05 13.1163 9.845 PFTQ 4864 65 07 00.4551 212 32 12.1530 413.284 PFTS 4864 65 07 00.4551 212 32 12.1530 413.284 PIOD 1511 35 23 22.2658 243 09 02.2426 1004.213 (deactivated) PM2F 4445 34 07 21.0105 240 50 46.3252 -22.200 PM3F 4446 34 07 22.3958 240 50 42.8373 -21.670 PM4F 4441 34 07 19.6257 240 50 49.8115 -22.190 PMKS 1729 38 33 27.7579 282 56 32.1316 41.940 (deactivated) PP2F 7399 37 29 48.6757 237 30 11.9380 3.780 PPTF 4240 37 29 51.7080 237 30 04.6837 15.049 PPTQ 4260 37 29 52.1409 237 30 01.0270 20.150 PPTY 4216 37 29 51.9868 237 30 02.9494 27.690 PRTS 1342 -31 48 07.2000 115 53 06.0000 22.160 RALS 1700 51 34 19.2936 358 41 18.7300 163.120 RGTS 1963 -35 24 16.3308 148 58 56.7059 663.255 RTKS 1964 -35 24 17.0818 148 58 57.3775 661.430 S22S 1734 78 13 58.4674 15 22 54.3828 481.103 SARS 1739 17 40 01.2000 53 52 58.8000 30.480 SEYS 4071 -4 40 18.2932 55 28 40.1539 560.495 SF1S 1703 43 44 09.8615 263 22 38.9474 468.752 SF2S 1716 43 44 03.4320 263 22 50.0240 459.336 SG1S 1702 78 13 50.7601 15 23 22.3213 500.280 SG3S 1733 78 13 47.0460 15 24 29.1450 501.378 SG4S 1723 78 13 40.8828 15 24 34.8020 508.591 SG6S 1750 78 13 50.8872 15 25 02.2368 446.184 SI1S 1742 1 23 30.9048 103 50 06.0000 30.000 SIPQ 4003 15 14 56.9250 145 47 46.3800 348.200 SN2F 4443 33 14 51.6660 240 28 45.3259 246.680 SN3F 4444 33 14 54.2139 240 28 42.9918 246.120 SNIF 4442 33 14 49.1193 240 28 47.6604 246.160 SOCA 4139 38 51 00.0940 283 04 04.0000 118.566 ST1F 4224 18 21 26.1120 295 01 36.4207 130.454 ST2K 4751 32 32 34.7185 253 23 16.4798 1452.310 ST3K 4752 32 32 33.6300 253 23 16.4800 1452.300 STE1 1934 32 32 36.8675 253 23 16.7377 1447.810 STE2 1935 32 32 32.1914 253 23 16.6621 1446.320 STGK 4750 32 32 35.8065 253 23 16.4798 1452.280 STGS 4753 32 32 32.8260 253 23 16.4798 1449.460 STSS 1741 32 32 30.1803 253 23 16.4434 1456.090 STWS 1740 32 29 58.2244 253 23 29.1702 1460.383 SWNS 1796 -20 22 48.0000 118 38 06.0000 242.000 SYOQ 4262 -69 00 21.9472 39 35 24.5540 5.372 TH2S 1731 76 30 55.3100 291 24 04.2670 147.370 THUS 1730 76 30 58.6550 291 24 03.5360 141.160 TR2S 1738 -72 00 07.9994 2 31 26.8456 1416.582 TR3S 1748 -72 00 07.7295 2 31 30.0423 1409.348 TSMF 4080 -42 48 18.0000 147 26 20.4000 43.000 TT2S 1376 76 30 55.3119 291 24 04.1101 146.985 TTSS 1369 76 30 57.3644 291 24 00.0998 135.906 TULF 4151 33 05 46.1815 253 50 27.0450 1241.254 TULS 4078 33 01 37.0016 253 51 39.2724 1328.633 (deactivated) U2HS 1779 19 00 49.6564 204 20 13.4013 382.300 U2PS 1771 -29 02 44.5000 115 20 56.5000 249.700 U3AS 1745 64 48 15.9037 212 29 53.2252 157.900 U4AS 1746 64 48 16.9923 212 29 44.8351 157.200 U5AS 1747 64 48 12.2906 212 29 57.8607 160.300 UL1S 1854 64 58 21.9000 212 29 56.0400 447.300 UL23 1371 64 58 20.6656 212 28 54.9636 331.108 UL33 1332 64 58 36.5300 212 28 54.9618 308.056 ULA3 1328 64 58 19.7049 212 29 11.8002 344.054 (deactivated) ULA4 1401 64 58 35.7447 212 28 43.3816 299.159 ULAE 1853 64 58 36.1760 212 28 56.8030 308.000 USAS 1709 64 48 15.2680 212 29 59.2290 160.580 USDS 1717 -29 02 44.7792 115 20 55.2408 251.840 USHS 1778 19 00 50.2290 204 20 12.0054 385.194 USPS 1770 -29 02 44.7798 115 20 55.2395 250.470 VD2F 4247 34 45 29.6346 239 22 22.3630 26.040 VD3F 4251 34 34 58.9546 239 26 19.9862 627.252 VD4F 4254 34 34 58.9546 239 26 19.9862 627.248 VDB3 1333 34 33 56.2533 239 29 54.1777 609.440 VDBF 4246 34 46 29.5597 239 27 50.0050 122.607 VEND 1513 35 14 49.7913 243 12 19.9476 1070.444 VT2S 1372 34 49 32.3068 239 29 40.5684 268.610 VTSS 1365 34 49 21.4196 239 29 53.3456 272.510 WAPS 1341 37 55 29.7320 284 31 24.5190 -20.100 WD3F 4846 37 51 22.9149 284 29 18.8327 -18.126 WD4F 4843 37 51 22.9190 284 29 18.8196 18.660 WH2J 0202 32 30 22.6133 253 23 16.9233 1442.610 WH2K 1921 32 30 02.6539 253 23 29.2138 1459.740 WH2S 1962 32 30 04.6676 253 23 29.2060 1457.665 WH3K 1922 32 30 01.6642 253 23 29.2143 1459.740 WH4K 1925 32 30 05.0026 253 23 29.2060 1458.675 WH5K 1940 32 30 04.4706 253 23 29.2070 1456.635 WH6F 4145 33 48 49.9102 253 20 27.5558 1508.970 WH6K 1941 32 30 05.2631 253 23 26.7549 1448.046 (proposed) WH7F 4147 33 48 47.0818 253 20 27.5479 1497.454 WH9F 4146 33 26 42.7872 253 52 04.4098 1592.508 WHSF 4143 32 21 28.9516 253 37 48.6933 1209.860 WHSJ 0201 32 30 22.6133 253 23 16.9233 1442.610 WHSK 1920 32 30 03.6434 253 23 29.2138 1459.730 WHSS 1961 32 30 00.9712 253 23 29.2132 1452.260 WL2F 4841 37 56 38.7569 284 32 08.7959 -14.040 WL2S 4206 37 56 47.1469 284 32 16.5917 -6.765 WL3F 4845 37 51 22.9149 284 29 18.8327 -18.126 WL3S 4207 37 56 44.8619 284 32 22.4279 -5.689 WL4F 4842 37 51 22.9190 284 29 18.8196 18.660 WL4S 4208 37 56 46.7279 284 32 21.8419 -28.793 WL53 4209 37 56 48.4800 284 32 23.6400 -25.806 WL6S 4210 37 56 44.1600 284 32 20.0400 13.216 WLPF 4840 37 50 28.8230 284 30 53.6793 -24.000 WLPQ 4860 37 51 36.9413 284 29 26.5360 -21.700 WP2S 1337 37 55 41.0411 284 31 32.1015 -20.961 WP2Y 1838 37 55 32.1066 284 31 23.3133 -15.234 WP2Z 1840 37 55 44.0844 284 31 34.4959 -17.846 WP3S 1338 37 55 42.1002 284 31 32.9233 -19.631 WP3Z 1841 37 55 25.0724 284 31 20.8976 -20.388 WPDA 1339 37 55 38.5427 284 31 30.1701 -10.538 WPS8 1336 37 55 38.4925 284 31 27.0005 -20.647 WPSA 1334 37 55 38.1996 284 31 30.0511 -19.736 WPSS 1335 37 55 35.7235 284 31 25.3037 -12.762 WS1S 1931 32 32 26.7178 253 23 16.4417 1456.545 WSCZ 1871 32 30 17.0000 253 23 21.0000 1470.660 WSE1 1932 32 30 04.9446 253 23 29.5598 1449.630 WSE2 1933 32 30 04.9446 253 23 29.2463 1457.860 WSSH 1870 32 52 49.0000 253 32 07.0000 1198.474 WT1S 4865 65 07 02.0529 212 32 27.3830 431.444 WT2S 4866 65 07 00.2397 212 32 18.4247 430.342 WT3S 4867 37 55 23.0373 284 31 21.1120 -10.644 WTDQ 4861 37 55 23.0373 284 31 21.1120 -10.644 WTDS 4861 37 55 23.0373 284 31 21.1120 -10.644 WU1S 1907 47 52 48.2500 11 05 07.0890 663.392 WU2S 1908 47 52 52.3160 11 05 01.0280 663.374 WULY 4215 34 39 19.4881 239 26 38.4550 75.230 YARZ 8566 -29 02 47.9239 115 20 48.0000 192.350 (no datum shifts) ---- ---- -------------- -------------- -------- ------------------------ Table 3: STATION LOCATION AND EQUIPMENT ======================================================= ---- ---- ---------------------------------------------------------------- STDN NASA LOCATION; CODE NMBR EQUIPMENT ---- ---- ---------------------------------------------------------------- AC2J 0208 Ascension Island; BRT 2-ft manual az-el ACN3 1306 (deactivated) Ascension Island; USB 9m X-Y n-s ACNJ 0207 Ascension Island; BRT 2-ft manual az-el ADRQ 4284 Kourou, Fr.Guiana; C-bd AG1S 1701 Poker Flat, AK; S-bd X-bd, 11 meter, az-el AG23 1377 Santiago, Chile; S-bd 7-meter X-Y N-S AG33 1404 Santiago, Chile; USB S-bd 12-meter X-Y N-S AGO3 1319 Santiago, Chile; USB S-band 9-meter X/Y N-S AGOS 1318 Santiago, Chile; Az-El, 13m, S-band AGU3 1319 Santiago, Chile; USB S band, 9m AGUS 1321 Santiago, Chile; Az-El, 13m, S-band AL2J 0209 Alice Springs, N.T., Australia; BRT 2-ft manual az-el ALAY 1707 Alamo Peak, NM; Tlm S-bd 7.3m TAS az-el ALSJ 0204 Alice Springs, N.T., Aust; BRT 2-ft manual az-el AMSJ 0205 (deactivated) Am Samoa, Tutuila; BRT 2-ft manual az-el AN3S 1704 Antigua; S-bd 10m az-el AN8S 1705 Antigua; S-bd 24m az-el ANRQ 4082 Antigua Island; C-band Az-El ANTQ 4087 Antigua; C-bd FPQ-14 8.8m az-el on-axis APLS 1725 APL, Clarksville, MD; S/X-band, X-Y, 18m AS2Q 4765 Ascension Island; C-bd TPQ-11 8.8m, az-el AS2S 1743 Alaska Satellite Facility Univ. of Alas Fairbank; USB S-bnd, X-bnd az-el 9.1m AS3S 1744 Alaska Satellite Facility Univ. of Alas Fairbank; S-band az-el 11 meter ASCQ 4045 Ascension Island; C-bd FPQ-15 8.5m az-el on-axis ASFS 1720 Alaska Satellite Facility Univ. of Alas Fairbank; S-band az-el 11 meter ASNS 1726 AscensioN Island; S-bd 4m az-el ATDQ 4862 Atlanta, Ga.; S-bd ATDS 4862 Atlanta, Ga.; S-bd ATFS 1972 Yatharagga, Western Australia.; 11-m az-el, S-Band TT&C w/ TDRS ATLS 1736 Atlanta, Georgia; S-bd 11m az-el ATMY 1708 Atom Peak, NM; Tlm S-bd 7.3m TAS az-el AUSS 4259 Aussaguel, France; S-bd az-el 11m AUWS 1902 Dongara,WA Australia; S-band, 13m az-el BANF 4020 Bangalore; C-bd az-el BD1S 4056 NEN Bermuda; USB, S-band, Az-El, 7m BDA3 1303 (deactivated) Bermuda; USB 9m X-Y n-s BDAA 1360 (deactivated) Bermuda; USB 9m X-Y e-w BDAQ 4760 (deactivated) Bermuda; C-bd FPQ-6 8.8m az-el BDDQ 4760 (deactivated) Bermuda; C-bd FPQ-6 8.8m az-el BLKQ 4263 Black Is. Antarctica; K-band az-el BLT3 1915 (deactivated) Greenbelt, MD; USB 9m X-Y n-s BLTA 1316 Greenbelt, MD; USB 9m X-Y e-w BLTD 1315 (deactivated) Greenbelt, MD; USB 9m X-Y n-s K-bd rcvr BLTJ 0290 Greenbelt, MD; BRT 3-ft manual az-el BP1K 4754 Blossom Point Ground Terminal North Antenna; TDRSS K-bd AZ-EL 20m BP1S 1322 Blossom Point Ground Terminal North Antenna; TT&C S-bd AZ-EL 20m BP2K 4755 Blossom Point Ground Terminal South Antenna; TDRSS K-bd AZ-EL 20m BP2S 1323 Blossom Point Ground Terminal South Antenna; TT&C S-bd AZ-EL 20m BREQ 4283 Kourou, Fr Guiana; C-bd BRKS 1732 Berkeley, CA; S-bd 11m az-el CA2F 4241 Tranquillon Peak, CA; C-bd FPS-16 3.7m az-el SN 18 CALF 4018 Vandenberg AFB, CA; C-bd FPS-16 3.7m az-el SN 21 CALT 4280 Vandenberg AFB, CA; C-bd TPQ-18 8.8m az-el CALY 1835 S.Vandenberg AFB, CA; Tlm S-bd VTRS 10m az-el CANS 4723 Canberra, Australia; S-bd 9m az-el YAGI VHF array CB1D 1567 Cebreros, Spain; Az-El, S-bd CHAS 1340 (deactivated) Chantilly, VA; S-bd az-el 4m (12ft) CN2F 4088 (deactivated) Cape Canaveral, FL; C-bd MPS-36 mod 4.3m az-el TPQ-1 CN4F 4223 Cape Canaveral, FL; C-bd MCB-17 4.2m az-el CN5F 4344 Cape Canaveral, Fl.; C-bd MPS-39 az-el CNVF 4041 Cape Canaveral, FL; C-bd FPS-16 3.7m az-el COCS 4085 Cocos Island, Australia; C-bd az-el CT2J 0294 White Sands, NM; BRT CTV2 CTSS 1756 Colorado Spgs. CO.; S-bd 10m az-el CTVJ 0293 White Sands, NM; BRT CTV D26D 1526 Goldstone, CA; DSN, 34m BWG D27D 1516 Goldstone, CA; DSN, 34m HSB D36D 1536 DSN DSS Canberra, Australia; DSN USB 34m BWG, S-bd, AZ-EL DAKS 4072 Dakar, Senegal; Tlm S-bd 4.3m az-el DFRS 4067 Dryden FRC, CA; S-bd and L-bd 4.3m az-el DGIS 4073 Diego Garcia Island; S-bd 10m az-el DS12 1612 Goldstone, CA; USB-DSN 34m HA-DEC DS14 1514 Goldstone, CA; DSN az-el, 70m DS15 1515 Goldstone, CA; DSN 34m HEF DS16 1312 Goldstone, CA; DSN 26m X-Y DS17 1327 Goldstone, CA; USB-DSN 9m x-y n-s DS24 4252 Goldstone, CA; DSN 34m BWG DS25 1525 Goldstone, CA; DSN 34m BWG DS34 1534 Canberra, Australia; DSN 34m BWG DS35 1535 DSN Canberra, Australia; DSN 34m BWG, S-bd, AZ-EL DS42 1547 Canberra, Aust; USB-DSN 34m HA-DEC DS43 1548 Canberra, Australia; DSN 70m DS45 1549 Canberra, Australia; DSN 34m HEF DS46 1546 Canberra, Australia; DSN 26m X-Y DS54 1554 Madrid Spain; DSN 34m BWG DS55 1555 Madrid Spain; X/Ka band 34m BWG DS61 1662 Madrid, SPAIN; USB-DSN 34m HA-DEC DS63 1564 Madrid Spain; 70m DS65 1565 Madrid Spain; USB-DSN 34m HEF DS66 1566 Madrid Spain; USB-DSN 26m X-Y DS87 1587 Wallops Island, VA; S-bd 18m az-el ADAS receive only DX2S 1715 (deactivated) Poker Flat, Alaska; S-bd, 7.3 meter, az-el DXAS 1711 Poker Flat, Alaska; S-bd, 11 meter, az-el EA2F 4065 Edwards AFB, CA; C-bd FPS-16 3.7m az-el R-41 EA3F 4221 Edwards AFB, CA; TACAN C-bd mobile EAFF 4064 Edward AFB, CA; C-bd FPS-16, 3.7 meter, az-el EG2F 4345 Eglin AFB, FL; C-bd FPS-85 az-el EG3F 4346 (deactivated) Eglin AFB, FL; C-bd TPQ-13 ET1S 1973 White Sands, NM; Az-El, S-bd 6.1m ET2S 1974 White Sands, NM; Az-El, S-bd, 9m EULY 4205 Merritt Island, FL; Tlm S-bd 10.1m az-el EVCS 1363 Cape Canaveral,Fl.; Tlm S-bd 9m, az-el FR1X 1844 Armstrong Flight Research Center; VHF, Az-El FR2F 4249 Armstrong Flight Research Center; C-bd FPS-16 3.7m az-el FR2X 1845 Armstrong Flight Research Center; VHF, Az-El FRCF 4069 Edwards AFB, CA; C-bd FPS-16V 4.9m az-el R-34 FT2F 4138 Fort.Huachuca, AZ; C-bd FPS-16 3.7m az-el FTHF 4115 Fort.Huachuca, AZ; C-bd FPS-16 3.7m az-el GB2Y 1814 Grand.Bahama Island; Tlm S-bd 10.1m az-el GBIQ 4013 (deactivated) Grand.Bahama Island; C-bd FPQ-13 6.1m az-el on-axis GBIY 1813 Grand.Bahama Island; Tlm S-bd 26m az-el GD28 1517 Goldstone, CA; USB-DSN 26m X-Y e-w GDSA 1317 (deactivated) Goldstone, CA; USB 9m X-Y n-s GILD 7225 (proposed) Gilmore Creek, AK; Tlm 26m X-Y GILE 4047 Gilmore Creek, AK; Tlm 26m X-Y n-s GLAS 1712 Gilmore Creek, AK; s/x/l band, 13 meter GLBS 1713 Gilmore Creek, AK; s/x/l band, 13 meter GLCS 1714 Gilmore Creek, AK; s/x/l band, 13 meter GT2S 1375 Guam; Tlm-SGLS S-bd 46-ft az-el GTKQ 4086 Grand.Turk Island; C-bd FPQ-14 8.8m az-el on-axis GTSS 1368 Guam; Tlm-SGLS S-bd 60-ft az-el GW1J 1971 Guam; TDRS grnd xpnder GW2J 0210 Guam; BRT 2-ft manual az-el GW2K 1968 Guam; S-bd, 16 meters az-el GW2S 1969 Guam; S-bd, 16 meters az-el GW3S 1970 Guam; Ku-bd, S-bd, 16 meters az-el GWE2 1936 GRGT, Guam; 5m Ku/S-bd,az-el,G-EET-2 GWM3 1309 Guam; USB 9m X-Y n-s GWMK 1965 Guam; S-bd 11-meter K-bd az-el GWMS 1966 Guam; S-bd 11-meter az-el TT&C HAW3 1311 Kauai, HI; USB 9m X-Y n-s HAWQ 4285 Hawaii, Univ.; C-bd az-el TLM HAWS 1706 South Point, Hawaii; S-bd telemetry, command HB33 1325 Hartebeesthoek, S. Africa; S-bd 12m x-y (n/s) HB4S 1378 Hartebeesthoek, S. Africa; S-band 6 m HB5S 1403 Hartebeesthoek, S. Africa; S-band 10 m HBK3 1324 Hartebeesthoek, S. Africa; S-bd 9m x-y (n/s) HBKS 1402 Hartebeesthoek, S. Africa; S-bd x-y 12m HOLF 4144 Holloman AFB, NM; C-bd FPS-16 3.7m az-el HR1S 1718 Wallops, VA; S-bd, 16.4 meter, az-el HR2S 1719 Wallops, VA; S-bd, 16.4 meter, az-el HR3S 1749 Greenbelt, MD; USB S-bd, 16.4m, az-el HT2S 1373 Kaena Point, HI; Tlm-SGLS S-bd 46-ft az-el HTSS 1367 Kaena Point, HI; Tlm-SGLS S-bd 60-ft az-el HWIS 1903 South Point, HI; S-band az-el, 13m JD2Y 1818 Jonathan Dickenson, FL; Tlm S-Bd 24.4m az-el JDIQ 4248 Jonathan Dickinson, Fla.; C-bd FPQ-14 JDIY 1817 Jonathan Dickinson, FL; Tlm S-Bd 15m az-el JSCJ 0291 JSC, TX; BRT STS gnd xpnder KA2S 1735 Tokyo, Japan; S-bd 11-meter Az-El KENS 4722 Malindi, Kenya; S-bd 10m az-el KERS 4253 Kergueles Is.; S-bd az-el 10m KGLQ 4261 S.Pac.Fr.Kerguelen; C-bd az-el 9m KI2S 1727 Kiruna, Sweden; S-bd 15m az-el KICS 4255 Kiruna, Sweden; S-bd az-el 6m KILS 4256 Kiruna, Sweden; S-bd az-el 9m KIXS 4257 Kiruna, Sweden; S-bd az-el 9m KLMS 1710 Svalbard, Norway; S-bd X-bd, 13 meter, az-el KM2F 4971 Kwajalein Atoll; C-bd ALTAIR 46m az-el KMPF 4110 Kwajalein Atoll; C-bd Radar KMQF 4111 Kwajalein Atoll; C-bd Radar KMRF 4968 Kwajalein Atoll; C-bd TRADEX 26m KMRQ 4969 Kwajalein Atoll; C-bd ALCOR 12.2m az-el KMRT 4970 (deactivated) Kwajalein Atoll; C-bd FPQ-19 az-el KPTQ 4282 Oahu, HI; C-bd FPQ-14 8.8m az-el on-axis KRCS 1797 Weipa, Australia; Tlm S-bd, az-el KRUF 8501 Kourou, Fr Guiana; C-bd Bretagne KRUS 4258 Kourou, Fr. Guiana; S-bd az-el 11m KSWC 1855 Jeju, South Korea; az-el KU1S 1905 Kiruna, Sweden; S & X band KU2S 1906 Kiruna, Sweden; S & X band KU3S 1909 Kiruna, Sweden; az-el, 13 meter, S-bd KUSS 4055 NEN Kennedy Uplink Station 6.1m; USB 6.1m, S-bd, Az-El LANS 1728 Lannion, France; S-bd az-el LBVS 4250 Liberville, Africa; S-bd 10m az-el LE1S 1721 Poker Flat, AK; S-bd, 5 meter, az-el LE2S 1722 Wallops Island. VA; S-bd, 5 meter, az-el MAD8 1307 (deactivated) Madrid, Spain; USB 26m X-Y e-w MC1S 4848 McMurdo,Antarctica; S-bd 10m az-el MCMS 4847 McMurdo,Antarctica; S-bd 6m az-el MDLS 1904 Laurel, Maryland; S-band 18m az-el MG1D 1574 Malargue, Argentina; X-bd, Ka-band,az-el,35m MIL3 1301 Merritt Island, FL; USB 9m X-Y n-s MILA 1901 (deactivated) Merritt Island, FL; USB 9m&K-bd(rx+1.3m tx) X-Y e-w MILJ 0292 Merritt Island, FL; BRT MIMF 4220 Merritt Island, FL; C-bd MCB-17 4.2m az-el MLAQ 4084 Merritt Island, FL; C-bd FPQ-14 8.8m az-el on-axis MMTF 4347 Merritt Island, FL; C-bd, MPS-39, az-el MPLS 1967 Maspalomas, Spain; S-bd, 11 meter, az-el MTLF 4155 Mt.Lemmon, AZ; C-bd Capri 4.9m az-el MTLS 4156 Mt.Lemmon, AZ; Tlm S-bd 4.3m az-el NH2S 1374 New.Boston, NH; Tlm-SGLS S-bd 46-ft az-el NHSS 1366 New.Boston, NH; Tlm-SGLS S-bd 60-ft az-el NN1D 1573 New Norcia, Australia; Az-El, S-bd NSGS 1724 Neustrelitz, Germany; az-el, S-Band ORR3 1320 (deactivated) Orroral, Aust; USB 9m X-Y n-s OTSS 1364 Oakhanger, UK; Tlm-SGLS S-bd 60-ft az-el PA2Q 4089 Patrick AFB, FL; C-bd FPQ-13 6.1m az-el on-axis PATQ 4060 Patrick AFB, FL; C-bd FPQ-14 8.8m az-el on-axis PDLS 4054 NEN Ponce De Leon 6.1m; USB 6.1m, S-bd, Az-El PFTQ 4864 Poker Flat, Ak.; S-bd PFTS 4864 Poker Flat, Ak.; S-bd PIOD 1511 (deactivated) Goldstone, CA; DSS 11 26m HA-Dec Pioneer PM2F 4445 Point.Mugu, CA; C-bd FPS-16 3.7m az-el SN 10 PM3F 4446 Point.Mugu, CA; C-bd FPS-16V 4.9m az-el SN 24 PM4F 4441 Point.Mugu, CA; C-bd FPS-16 3.7m az-el SN 3 PMKS 1729 (deactivated) Pomonkey, Md.; S-bd 30m az-el PP2F 7399 Pt. Pillar, Ca.; C-bd MPS-36 4.3m az-el PPTF 4240 Pillar Point, CA; C-bd FPS-16V 4.9m az-el PPTQ 4260 Pillar Point, CA; C-bd FPQ-6 8.8m az-el PPTY 4216 Pillar Point, CA; Tlm 12m S-bd az-el PRTS 1342 Perth, Australia; S-bd az-el 15m RALS 1700 Rutherford Appelton Laboratory, UK; S-bd 12-meter az-el RGTS 1963 Tidbinbilla, Aust; S-bd 9m az-el RTKS 1964 Tidbinbilla, Aust; S-bd 4.5m az-el S22S 1734 Svalbard, Norway; S-band AzEl 7.3m SARS 1739 Saudi Arabia; S-bd, az-el SEYS 4071 Seychelles, Mahe; Tlm S-bd 18m az-el SF1S 1703 Sioux Falls, S. Dakota; S-bd az-el SF2S 1716 Sioux Falls, S. Dakota; S-bd, 5m, x-y SG1S 1702 Svalbard, Norway; S-band, Az-El, 11m SG3S 1733 Svalbard, Norway; S-band az-el 13.6 meters SG4S 1723 Svalbard, Norway; S-band SG6S 1750 KSat Svalbard, Norway; USB S-band, Az-El, 11m SI1S 1742 Kongsberg Satellite Services, Singapore; S-bd, Az-El,9m SIPQ 4003 Saipan; C-bd az-el SN2F 4443 San.Nicolas Island, CA; C-bd FPS-16V 4.9m az-el SN 13 SN3F 4444 San.Nicolas Island, CA; C-bd FPS-16 3.7m az-el SN 15 SNIF 4442 San.Nicolas Island, CA; C-bd FPS-16 3.7m az-el SN 7 SOCA 4139 Suitland, Md.; S-bd 30ft x-y ST1F 4224 St. Thomas, Virgin Island; Capri ST2K 4751 White Sands, NM; TDRSS-STGT 18m K-bd az-el ST3K 4752 White Sands, NM; TDRSS-STGT 18m K-bd az-el STE1 1934 STGT White Sands, NM; 1.8m Ka-bd,az-el,S-EET-1 STE2 1935 STGT White Sands, NM; 4.5m Ku/S-bd,az-el,S-EET-2 STGK 4750 White Sands, NM; TDRSS-STGT 18m K-bd az-el STGS 4753 White Sands, NM; TDRSS-STGT TT&C S1 STSS 1741 White Sands, NM; S-bd, az-el, Ka-bd STWS 1740 White Sands, NM; S-bd, az-el, Ka-bd SWNS 1796 Port Hedland, Australia; Tlm S-bd,az-el SYOQ 4262 Syowa, Antarctica; C-bd az-el 9m TH2S 1731 Thule, Greenland; S-bd az-el THUS 1730 Thule, Greenland; S-bd az-el TR2S 1738 Antarctica; 7.3m S-band AzEl TR3S 1748 Antarctica; 7.3m USB S-band AzEl TSMF 4080 University of Tasmania, Australia; C-bd az-el TT2S 1376 Thule, Greenland; Tlm-SGLS S-bd 46-ft az-el TTSS 1369 Thule, Greenland; Tlm-SGLS S-bd 14-ft az-el TULF 4151 Tularosa, NM; C-bd FPS-16 3.7m az-el TULS 4078 (deactivated) Tula Peak, NM; Tlm S-bd 4.3m az-el c&v U2HS 1779 USN, Hawaii; S-bd X-bd, 13.4 meter, az-el U2PS 1771 Dongara, Australia; USB S-bd X-bd, 7.3m, az-el U3AS 1745 North Pole, Alaska; USB S-bd cmd,S/X-bd rcv,X-Y 5.4m U4AS 1746 North Pole, Alaska; USB S-bd cmd,S/X-bd rcv,AzEl 7.3 U5AS 1747 North Pole, Alaska; USB S-band Az-El 11m UL1S 1854 Fairbanks, AK; Az-El 21m S-band UL23 1371 Fairbanks, AK; USB 6m X-Y n-s UL33 1332 Fairbanks, AK; USB 26m X-Y n-s ULA3 1328 (deactivated) Fairbanks, AK; USB 9m X-Y n-s ULA4 1401 Gilmore Creek, AK; X-Y tracker 12m n-s ULAE 1853 Fairbanks, AK; X-Y tracker 26m n-s USAS 1709 Bradway Rd, AK; S-bd X-bd, 13 meter, az-el USDS 1717 Dongara, Australia; S-bd, az-el USHS 1778 USN, Hawaii; S-bd X-bd, 13.4 meter, az-el USPS 1770 Perth, Australia; S-bd X-bd, 13.4 meter, az-el VD2F 4247 Vandenberg AFB, CA; C-bd FPQ-14 8.8m az-el HAIR VD3F 4251 Vandenberg AFB, Ca.; C-bd TLM 9m az-el VD4F 4254 Vandenberg AFB, CA.; C-bd MPS-39 MOTR 9m az-el VDB3 1333 Vandenberg AFB, CA; USB 9m X-Y n-s VDBF 4246 Vandenberg AFB, CA; C-bd MPS-36 #2 4.3m az-el VEND 1513 Goldstone, CA; JPL DSS13 34m R & D VT2S 1372 Vandenberg AFB, CA; Tlm-SGLS S-bd 46-ft az-el VTSS 1365 Vandenberg AFB, CA; Tlm-SGLS S-bd 60-ft az-el WAPS 1341 Wallops Island, VA; S-bd az-el 11m WD3F 4846 Wallops Island, VA; C-bd FPS-16V 4.9m az-el WD4F 4843 Wallops Island, VA; C-band RIR-778C 12-ft WH2J 0202 White Sands, NM; BRT 2-ft manual az-el WH2K 1921 White Sands, NM; TDRSS 18m K-bd az-el WH2S 1962 White Sands, NM; TDRSS S-bd 3m az-el sim WH3K 1922 White Sands, NM; TDRSS 18m K-bd az-el WH4K 1925 White Sands, NM; TDRSS 4.5m K-bd az-el sim WH5K 1940 White Sands, NM; TDRSS K/S-bd 2m az-el axial rati WH6F 4145 White Sands, NM; C-bd FPS-16V 4.9m az-el SN 12 WH6K 1941 (proposed) White Sands, NM; TDRSS K-bd 4.6m TT&C WH7F 4147 White Sands, NM; C-bd FPS-16V 4.9m az-el SN 22 WH9F 4146 Phillips Hill, NM; C-bd FPS-16 3.7m az-el WHSF 4143 White Sands, NM; C-bd FPS-16 3.7m az-el SN 6 WHSJ 0201 White Sands, NM; BRT 2-ft manual az-el WHSK 1920 White Sands, NM; TDRSS 18m K-bd az-el WHSS 1961 White Sands, NM; TDRSS S-bd 10m az-el TT&C WL2F 4841 Wallops Island, VA; C-bd FPS-16V 4.9m az-el WL2S 4206 Wallops Island, VA; Tlm S-bd 18m az-el WL3F 4845 Wallops Island, VA; C-bd FPS-16V 4.9m az-el WL3S 4207 Wallops Island, VA; S-bd 18m az-el WL4F 4842 Wallops Island, VA; C-band RIR-778C 12-ft WL4S 4208 Wallops Island, VA; S-bd 13m az-el WL53 4209 Wallops; S-bd 14.2 meter X-Y N-S CDA WL6S 4210 Wallops; S-bd 7-meter Az-El CDA WLPF 4840 Wallops Island, VA; C-bd FPS-16 3.7m az-el WLPQ 4860 Wallops Island, VA; C-bd FPQ-6 8.8m az-el WP2S 1337 Wallops Island, VA; S-bd 7.3m az-el receive only WP2Y 1838 Wallops Island, VA; Tlm Satan RCVR (SRE-VHF) WP2Z 1840 Wallops Island, Va.; UHF & VHF 24-ft X-Y WP3S 1338 Wallops Island, VA; S-bd North 7.3m az-el recr WP3Z 1841 Wallops, Va; VHF2 Quad Yagi WPDA 1339 Wallops Island, VA; USB 9m X-Y e-w WPS8 1336 Wallops Island, VA; S-bd 6m X-Y e-w xmit WPSA 1334 Wallops Island, VA; USB 9m X-Y e-w WPSS 1335 Wallops Island, VA; S-bd 18m az-el receive only WS1S 1931 White Sands, NM; S/ka-bd uplk,S-bd downlk,18.3m WSCZ 1871 White Sands, NM; az-el, VHF-1 WSE1 1932 WSGT White Sands, NM; 1.8m Ka-bd,az-el, W-EET-1 WSE2 1933 WSGT White Sands, NM; 4.5m Ku/S-bd,az-el,W-EET-2 WSSH 1870 White Sands Space Harbor; UHF WT1S 4865 Poker Flat, AK; S-bd TOTS WT2S 4866 Poker Flat, Ak.; S-bd TOTS WT3S 4867 Wallops Island, Va.; S-bd 26ft az-el TOTS WTDQ 4861 Wallops Island, Va.; S-bd WTDS 4861 Wallops Island, Va.; S-bd WU1S 1907 Weilheim, Germany; S band WU2S 1908 Weilheim, Germany; S band WULY 4215 Vandenberg AFB, CA; Tlm S-bd 8.5m az-el YARZ 8566 (no datum shifts) Yarragedee, Aust Irwin; UHF A-G ---- ---- ---------------------------------------------------------------- PINPOINT Inputs ======================================================= begindata SITES += 'NDOSL_AC2J' NDOSL_AC2J_CENTER = 399 NDOSL_AC2J_FRAME = 'ITRF93' NDOSL_AC2J_IDCODE = 399100208 NDOSL_AC2J_LATLON = ( -7.9179155833, 345.6092320833, 0.071470 ) NDOSL_AC2J_TOPO_FRAME = 'NDOSL_AC2J_TOPO' NDOSL_AC2J_TOPO_ID = 399100208 NDOSL_AC2J_UP = 'Z' NDOSL_AC2J_NORTH = 'X' SITES += 'NDOSL_ACN3' NDOSL_ACN3_CENTER = 399 NDOSL_ACN3_FRAME = 'ITRF93' NDOSL_ACN3_IDCODE = 399101306 NDOSL_ACN3_LATLON = ( -7.9548824722, 345.6728967222, 0.561403 ) NDOSL_ACN3_TOPO_FRAME = 'NDOSL_ACN3_TOPO' NDOSL_ACN3_TOPO_ID = 399101306 NDOSL_ACN3_UP = 'Z' NDOSL_ACN3_NORTH = 'X' SITES += 'NDOSL_ACNJ' NDOSL_ACNJ_CENTER = 399 NDOSL_ACNJ_FRAME = 'ITRF93' NDOSL_ACNJ_IDCODE = 399100207 NDOSL_ACNJ_LATLON = ( -7.9179155833, 345.6092320833, 0.071470 ) NDOSL_ACNJ_TOPO_FRAME = 'NDOSL_ACNJ_TOPO' NDOSL_ACNJ_TOPO_ID = 399100207 NDOSL_ACNJ_UP = 'Z' NDOSL_ACNJ_NORTH = 'X' SITES += 'NDOSL_ADRQ' NDOSL_ADRQ_CENTER = 399 NDOSL_ADRQ_FRAME = 'ITRF93' NDOSL_ADRQ_IDCODE = 399104284 NDOSL_ADRQ_LATLON = ( 5.2091272500, 307.2515988889, -0.013808 ) NDOSL_ADRQ_TOPO_FRAME = 'NDOSL_ADRQ_TOPO' NDOSL_ADRQ_TOPO_ID = 399104284 NDOSL_ADRQ_UP = 'Z' NDOSL_ADRQ_NORTH = 'X' SITES += 'NDOSL_AG1S' NDOSL_AG1S_CENTER = 399 NDOSL_AG1S_FRAME = 'ITRF93' NDOSL_AG1S_IDCODE = 399101701 NDOSL_AG1S_LATLON = ( 65.1167002778, 212.5387958333, 0.436700 ) NDOSL_AG1S_TOPO_FRAME = 'NDOSL_AG1S_TOPO' NDOSL_AG1S_TOPO_ID = 399101701 NDOSL_AG1S_UP = 'Z' NDOSL_AG1S_NORTH = 'X' SITES += 'NDOSL_AG23' NDOSL_AG23_CENTER = 399 NDOSL_AG23_FRAME = 'ITRF93' NDOSL_AG23_IDCODE = 399101377 NDOSL_AG23_LATLON = ( -33.1517941389, 289.3326883056, 0.730000 ) NDOSL_AG23_TOPO_FRAME = 'NDOSL_AG23_TOPO' NDOSL_AG23_TOPO_ID = 399101377 NDOSL_AG23_UP = 'Z' NDOSL_AG23_NORTH = 'X' SITES += 'NDOSL_AG33' NDOSL_AG33_CENTER = 399 NDOSL_AG33_FRAME = 'ITRF93' NDOSL_AG33_IDCODE = 399101404 NDOSL_AG33_LATLON = ( -33.1514785278, 289.3316924444, 0.730853 ) NDOSL_AG33_TOPO_FRAME = 'NDOSL_AG33_TOPO' NDOSL_AG33_TOPO_ID = 399101404 NDOSL_AG33_UP = 'Z' NDOSL_AG33_NORTH = 'X' SITES += 'NDOSL_AGO3' NDOSL_AGO3_CENTER = 399 NDOSL_AGO3_FRAME = 'ITRF93' NDOSL_AGO3_IDCODE = 399101319 NDOSL_AGO3_LATLON = ( -33.1511074722, 289.3335970000, 0.733301 ) NDOSL_AGO3_TOPO_FRAME = 'NDOSL_AGO3_TOPO' NDOSL_AGO3_TOPO_ID = 399101319 NDOSL_AGO3_UP = 'Z' NDOSL_AGO3_NORTH = 'X' SITES += 'NDOSL_AGOS' NDOSL_AGOS_CENTER = 399 NDOSL_AGOS_FRAME = 'ITRF93' NDOSL_AGOS_IDCODE = 399101318 NDOSL_AGOS_LATLON = ( -33.1483228333, 289.3323683333, 0.730240 ) NDOSL_AGOS_TOPO_FRAME = 'NDOSL_AGOS_TOPO' NDOSL_AGOS_TOPO_ID = 399101318 NDOSL_AGOS_UP = 'Z' NDOSL_AGOS_NORTH = 'X' SITES += 'NDOSL_AGU3' NDOSL_AGU3_CENTER = 399 NDOSL_AGU3_FRAME = 'ITRF93' NDOSL_AGU3_IDCODE = 399101319 NDOSL_AGU3_LATLON = ( -33.1511074722, 289.3335970000, 0.733301 ) NDOSL_AGU3_TOPO_FRAME = 'NDOSL_AGU3_TOPO' NDOSL_AGU3_TOPO_ID = 399101319 NDOSL_AGU3_UP = 'Z' NDOSL_AGU3_NORTH = 'X' SITES += 'NDOSL_AGUS' NDOSL_AGUS_CENTER = 399 NDOSL_AGUS_FRAME = 'ITRF93' NDOSL_AGUS_IDCODE = 399101321 NDOSL_AGUS_LATLON = ( -33.1483228333, 289.3323683333, 0.730240 ) NDOSL_AGUS_TOPO_FRAME = 'NDOSL_AGUS_TOPO' NDOSL_AGUS_TOPO_ID = 399101321 NDOSL_AGUS_UP = 'Z' NDOSL_AGUS_NORTH = 'X' SITES += 'NDOSL_AL2J' NDOSL_AL2J_CENTER = 399 NDOSL_AL2J_FRAME = 'ITRF93' NDOSL_AL2J_IDCODE = 399100209 NDOSL_AL2J_LATLON = ( -23.7588104444, 133.8825985000, 0.576542 ) NDOSL_AL2J_TOPO_FRAME = 'NDOSL_AL2J_TOPO' NDOSL_AL2J_TOPO_ID = 399100209 NDOSL_AL2J_UP = 'Z' NDOSL_AL2J_NORTH = 'X' SITES += 'NDOSL_ALAY' NDOSL_ALAY_CENTER = 399 NDOSL_ALAY_FRAME = 'ITRF93' NDOSL_ALAY_IDCODE = 399101707 NDOSL_ALAY_LATLON = ( 32.8725331111, 254.1876205278, 2.796240 ) NDOSL_ALAY_TOPO_FRAME = 'NDOSL_ALAY_TOPO' NDOSL_ALAY_TOPO_ID = 399101707 NDOSL_ALAY_UP = 'Z' NDOSL_ALAY_NORTH = 'X' SITES += 'NDOSL_ALSJ' NDOSL_ALSJ_CENTER = 399 NDOSL_ALSJ_FRAME = 'ITRF93' NDOSL_ALSJ_IDCODE = 399100204 NDOSL_ALSJ_LATLON = ( -23.7588104444, 133.8825985000, 0.576542 ) NDOSL_ALSJ_TOPO_FRAME = 'NDOSL_ALSJ_TOPO' NDOSL_ALSJ_TOPO_ID = 399100204 NDOSL_ALSJ_UP = 'Z' NDOSL_ALSJ_NORTH = 'X' SITES += 'NDOSL_AMSJ' NDOSL_AMSJ_CENTER = 399 NDOSL_AMSJ_FRAME = 'ITRF93' NDOSL_AMSJ_IDCODE = 399100205 NDOSL_AMSJ_LATLON = ( -14.3314444444, 189.2805833333, 0.055400 ) NDOSL_AMSJ_TOPO_FRAME = 'NDOSL_AMSJ_TOPO' NDOSL_AMSJ_TOPO_ID = 399100205 NDOSL_AMSJ_UP = 'Z' NDOSL_AMSJ_NORTH = 'X' SITES += 'NDOSL_AN3S' NDOSL_AN3S_CENTER = 399 NDOSL_AN3S_FRAME = 'ITRF93' NDOSL_AN3S_IDCODE = 399101704 NDOSL_AN3S_LATLON = ( 17.1369508333, 298.2256500000, -0.016590 ) NDOSL_AN3S_TOPO_FRAME = 'NDOSL_AN3S_TOPO' NDOSL_AN3S_TOPO_ID = 399101704 NDOSL_AN3S_UP = 'Z' NDOSL_AN3S_NORTH = 'X' SITES += 'NDOSL_AN8S' NDOSL_AN8S_CENTER = 399 NDOSL_AN8S_FRAME = 'ITRF93' NDOSL_AN8S_IDCODE = 399101705 NDOSL_AN8S_LATLON = ( 17.1366248889, 298.2257101667, -0.004560 ) NDOSL_AN8S_TOPO_FRAME = 'NDOSL_AN8S_TOPO' NDOSL_AN8S_TOPO_ID = 399101705 NDOSL_AN8S_UP = 'Z' NDOSL_AN8S_NORTH = 'X' SITES += 'NDOSL_ANRQ' NDOSL_ANRQ_CENTER = 399 NDOSL_ANRQ_FRAME = 'ITRF93' NDOSL_ANRQ_IDCODE = 399104082 NDOSL_ANRQ_LATLON = ( 17.1372899444, 298.2247766389, -0.017318 ) NDOSL_ANRQ_TOPO_FRAME = 'NDOSL_ANRQ_TOPO' NDOSL_ANRQ_TOPO_ID = 399104082 NDOSL_ANRQ_UP = 'Z' NDOSL_ANRQ_NORTH = 'X' SITES += 'NDOSL_ANTQ' NDOSL_ANTQ_CENTER = 399 NDOSL_ANTQ_FRAME = 'ITRF93' NDOSL_ANTQ_IDCODE = 399104087 NDOSL_ANTQ_LATLON = ( 17.1436511111, 298.2074875000, 0.003630 ) NDOSL_ANTQ_TOPO_FRAME = 'NDOSL_ANTQ_TOPO' NDOSL_ANTQ_TOPO_ID = 399104087 NDOSL_ANTQ_UP = 'Z' NDOSL_ANTQ_NORTH = 'X' SITES += 'NDOSL_APLS' NDOSL_APLS_CENTER = 399 NDOSL_APLS_FRAME = 'ITRF93' NDOSL_APLS_IDCODE = 399101725 NDOSL_APLS_LATLON = ( 39.1674000000, 283.9000000000, 0.146510 ) NDOSL_APLS_TOPO_FRAME = 'NDOSL_APLS_TOPO' NDOSL_APLS_TOPO_ID = 399101725 NDOSL_APLS_UP = 'Z' NDOSL_APLS_NORTH = 'X' SITES += 'NDOSL_AS2Q' NDOSL_AS2Q_CENTER = 399 NDOSL_AS2Q_FRAME = 'ITRF93' NDOSL_AS2Q_IDCODE = 399104765 NDOSL_AS2Q_LATLON = ( -7.9728062500, 345.5990491389, 0.143500 ) NDOSL_AS2Q_TOPO_FRAME = 'NDOSL_AS2Q_TOPO' NDOSL_AS2Q_TOPO_ID = 399104765 NDOSL_AS2Q_UP = 'Z' NDOSL_AS2Q_NORTH = 'X' SITES += 'NDOSL_AS2S' NDOSL_AS2S_CENTER = 399 NDOSL_AS2S_FRAME = 'ITRF93' NDOSL_AS2S_IDCODE = 399101743 NDOSL_AS2S_LATLON = ( 64.8594608056, 212.1502543333, 0.237770 ) NDOSL_AS2S_TOPO_FRAME = 'NDOSL_AS2S_TOPO' NDOSL_AS2S_TOPO_ID = 399101743 NDOSL_AS2S_UP = 'Z' NDOSL_AS2S_NORTH = 'X' SITES += 'NDOSL_AS3S' NDOSL_AS3S_CENTER = 399 NDOSL_AS3S_FRAME = 'ITRF93' NDOSL_AS3S_IDCODE = 399101744 NDOSL_AS3S_LATLON = ( 64.8588753889, 212.1458848889, 0.220217 ) NDOSL_AS3S_TOPO_FRAME = 'NDOSL_AS3S_TOPO' NDOSL_AS3S_TOPO_ID = 399101744 NDOSL_AS3S_UP = 'Z' NDOSL_AS3S_NORTH = 'X' SITES += 'NDOSL_ASCQ' NDOSL_ASCQ_CENTER = 399 NDOSL_ASCQ_FRAME = 'ITRF93' NDOSL_ASCQ_IDCODE = 399104045 NDOSL_ASCQ_LATLON = ( -7.9066351944, 345.5975000000, 0.056000 ) NDOSL_ASCQ_TOPO_FRAME = 'NDOSL_ASCQ_TOPO' NDOSL_ASCQ_TOPO_ID = 399104045 NDOSL_ASCQ_UP = 'Z' NDOSL_ASCQ_NORTH = 'X' SITES += 'NDOSL_ASFS' NDOSL_ASFS_CENTER = 399 NDOSL_ASFS_FRAME = 'ITRF93' NDOSL_ASFS_IDCODE = 399101720 NDOSL_ASFS_LATLON = ( 64.8587121389, 212.1424048333, 0.217497 ) NDOSL_ASFS_TOPO_FRAME = 'NDOSL_ASFS_TOPO' NDOSL_ASFS_TOPO_ID = 399101720 NDOSL_ASFS_UP = 'Z' NDOSL_ASFS_NORTH = 'X' SITES += 'NDOSL_ASNS' NDOSL_ASNS_CENTER = 399 NDOSL_ASNS_FRAME = 'ITRF93' NDOSL_ASNS_IDCODE = 399101726 NDOSL_ASNS_LATLON = ( -7.9166671667, 345.6666666667, 0.023004 ) NDOSL_ASNS_TOPO_FRAME = 'NDOSL_ASNS_TOPO' NDOSL_ASNS_TOPO_ID = 399101726 NDOSL_ASNS_UP = 'Z' NDOSL_ASNS_NORTH = 'X' SITES += 'NDOSL_ATDQ' NDOSL_ATDQ_CENTER = 399 NDOSL_ATDQ_FRAME = 'ITRF93' NDOSL_ATDQ_IDCODE = 399104862 NDOSL_ATDQ_LATLON = ( 33.9308841667, 275.8913700556, 0.282637 ) NDOSL_ATDQ_TOPO_FRAME = 'NDOSL_ATDQ_TOPO' NDOSL_ATDQ_TOPO_ID = 399104862 NDOSL_ATDQ_UP = 'Z' NDOSL_ATDQ_NORTH = 'X' SITES += 'NDOSL_ATDS' NDOSL_ATDS_CENTER = 399 NDOSL_ATDS_FRAME = 'ITRF93' NDOSL_ATDS_IDCODE = 399104862 NDOSL_ATDS_LATLON = ( 33.9308841667, 275.8913700556, 0.282637 ) NDOSL_ATDS_TOPO_FRAME = 'NDOSL_ATDS_TOPO' NDOSL_ATDS_TOPO_ID = 399104862 NDOSL_ATDS_UP = 'Z' NDOSL_ATDS_NORTH = 'X' SITES += 'NDOSL_ATFS' NDOSL_ATFS_CENTER = 399 NDOSL_ATFS_FRAME = 'ITRF93' NDOSL_ATFS_IDCODE = 399101972 NDOSL_ATFS_LATLON = ( -29.0449400278, 115.3512658889, 0.247360 ) NDOSL_ATFS_TOPO_FRAME = 'NDOSL_ATFS_TOPO' NDOSL_ATFS_TOPO_ID = 399101972 NDOSL_ATFS_UP = 'Z' NDOSL_ATFS_NORTH = 'X' SITES += 'NDOSL_ATLS' NDOSL_ATLS_CENTER = 399 NDOSL_ATLS_FRAME = 'ITRF93' NDOSL_ATLS_IDCODE = 399101736 NDOSL_ATLS_LATLON = ( 33.9308666667, 275.8916333333, 0.260000 ) NDOSL_ATLS_TOPO_FRAME = 'NDOSL_ATLS_TOPO' NDOSL_ATLS_TOPO_ID = 399101736 NDOSL_ATLS_UP = 'Z' NDOSL_ATLS_NORTH = 'X' SITES += 'NDOSL_ATMY' NDOSL_ATMY_CENTER = 399 NDOSL_ATMY_FRAME = 'ITRF93' NDOSL_ATMY_IDCODE = 399101708 NDOSL_ATMY_LATLON = ( 33.7396298056, 253.6354431667, 2.395244 ) NDOSL_ATMY_TOPO_FRAME = 'NDOSL_ATMY_TOPO' NDOSL_ATMY_TOPO_ID = 399101708 NDOSL_ATMY_UP = 'Z' NDOSL_ATMY_NORTH = 'X' SITES += 'NDOSL_AUSS' NDOSL_AUSS_CENTER = 399 NDOSL_AUSS_FRAME = 'ITRF93' NDOSL_AUSS_IDCODE = 399104259 NDOSL_AUSS_LATLON = ( 43.4286960000, 1.4994120000, 0.260479 ) NDOSL_AUSS_TOPO_FRAME = 'NDOSL_AUSS_TOPO' NDOSL_AUSS_TOPO_ID = 399104259 NDOSL_AUSS_UP = 'Z' NDOSL_AUSS_NORTH = 'X' SITES += 'NDOSL_AUWS' NDOSL_AUWS_CENTER = 399 NDOSL_AUWS_FRAME = 'ITRF93' NDOSL_AUWS_IDCODE = 399101902 NDOSL_AUWS_LATLON = ( -29.0457680833, 115.3486680556, 0.250600 ) NDOSL_AUWS_TOPO_FRAME = 'NDOSL_AUWS_TOPO' NDOSL_AUWS_TOPO_ID = 399101902 NDOSL_AUWS_UP = 'Z' NDOSL_AUWS_NORTH = 'X' SITES += 'NDOSL_BANF' NDOSL_BANF_CENTER = 399 NDOSL_BANF_FRAME = 'ITRF93' NDOSL_BANF_IDCODE = 399104020 NDOSL_BANF_LATLON = ( 13.0300000000, 77.5100000000, 0.838000 ) NDOSL_BANF_TOPO_FRAME = 'NDOSL_BANF_TOPO' NDOSL_BANF_TOPO_ID = 399104020 NDOSL_BANF_UP = 'Z' NDOSL_BANF_NORTH = 'X' SITES += 'NDOSL_BD1S' NDOSL_BD1S_CENTER = 399 NDOSL_BD1S_FRAME = 'ITRF93' NDOSL_BD1S_IDCODE = 399104056 NDOSL_BD1S_LATLON = ( 32.3510439167, 295.3411590000, -0.012420 ) NDOSL_BD1S_TOPO_FRAME = 'NDOSL_BD1S_TOPO' NDOSL_BD1S_TOPO_ID = 399104056 NDOSL_BD1S_UP = 'Z' NDOSL_BD1S_NORTH = 'X' SITES += 'NDOSL_BDA3' NDOSL_BDA3_CENTER = 399 NDOSL_BDA3_FRAME = 'ITRF93' NDOSL_BDA3_IDCODE = 399101303 NDOSL_BDA3_LATLON = ( 32.3512675278, 295.3421116667, -0.011380 ) NDOSL_BDA3_TOPO_FRAME = 'NDOSL_BDA3_TOPO' NDOSL_BDA3_TOPO_ID = 399101303 NDOSL_BDA3_UP = 'Z' NDOSL_BDA3_NORTH = 'X' SITES += 'NDOSL_BDAA' NDOSL_BDAA_CENTER = 399 NDOSL_BDAA_FRAME = 'ITRF93' NDOSL_BDAA_IDCODE = 399101360 NDOSL_BDAA_LATLON = ( 32.3511526111, 295.3412103889, -0.007323 ) NDOSL_BDAA_TOPO_FRAME = 'NDOSL_BDAA_TOPO' NDOSL_BDAA_TOPO_ID = 399101360 NDOSL_BDAA_UP = 'Z' NDOSL_BDAA_NORTH = 'X' SITES += 'NDOSL_BDAQ' NDOSL_BDAQ_CENTER = 399 NDOSL_BDAQ_FRAME = 'ITRF93' NDOSL_BDAQ_IDCODE = 399104760 NDOSL_BDAQ_LATLON = ( 32.3479431944, 295.3465505278, -0.009880 ) NDOSL_BDAQ_TOPO_FRAME = 'NDOSL_BDAQ_TOPO' NDOSL_BDAQ_TOPO_ID = 399104760 NDOSL_BDAQ_UP = 'Z' NDOSL_BDAQ_NORTH = 'X' SITES += 'NDOSL_BDDQ' NDOSL_BDDQ_CENTER = 399 NDOSL_BDDQ_FRAME = 'ITRF93' NDOSL_BDDQ_IDCODE = 399104760 NDOSL_BDDQ_LATLON = ( 32.3479431944, 295.3465505278, -0.009880 ) NDOSL_BDDQ_TOPO_FRAME = 'NDOSL_BDDQ_TOPO' NDOSL_BDDQ_TOPO_ID = 399104760 NDOSL_BDDQ_UP = 'Z' NDOSL_BDDQ_NORTH = 'X' SITES += 'NDOSL_BLKQ' NDOSL_BLKQ_CENTER = 399 NDOSL_BLKQ_FRAME = 'ITRF93' NDOSL_BLKQ_IDCODE = 399104263 NDOSL_BLKQ_LATLON = ( -78.1295788889, 166.1504327778, 0.162512 ) NDOSL_BLKQ_TOPO_FRAME = 'NDOSL_BLKQ_TOPO' NDOSL_BLKQ_TOPO_ID = 399104263 NDOSL_BLKQ_UP = 'Z' NDOSL_BLKQ_NORTH = 'X' SITES += 'NDOSL_BLT3' NDOSL_BLT3_CENTER = 399 NDOSL_BLT3_FRAME = 'ITRF93' NDOSL_BLT3_IDCODE = 399101915 NDOSL_BLT3_LATLON = ( 38.9984475000, 283.1572332500, 0.018333 ) NDOSL_BLT3_TOPO_FRAME = 'NDOSL_BLT3_TOPO' NDOSL_BLT3_TOPO_ID = 399101915 NDOSL_BLT3_UP = 'Z' NDOSL_BLT3_NORTH = 'X' SITES += 'NDOSL_BLTA' NDOSL_BLTA_CENTER = 399 NDOSL_BLTA_FRAME = 'ITRF93' NDOSL_BLTA_IDCODE = 399101316 NDOSL_BLTA_LATLON = ( 38.9982475000, 283.1580610556, 0.024834 ) NDOSL_BLTA_TOPO_FRAME = 'NDOSL_BLTA_TOPO' NDOSL_BLTA_TOPO_ID = 399101316 NDOSL_BLTA_UP = 'Z' NDOSL_BLTA_NORTH = 'X' SITES += 'NDOSL_BLTD' NDOSL_BLTD_CENTER = 399 NDOSL_BLTD_FRAME = 'ITRF93' NDOSL_BLTD_IDCODE = 399101315 NDOSL_BLTD_LATLON = ( 38.9984475000, 283.1572332500, 0.018333 ) NDOSL_BLTD_TOPO_FRAME = 'NDOSL_BLTD_TOPO' NDOSL_BLTD_TOPO_ID = 399101315 NDOSL_BLTD_UP = 'Z' NDOSL_BLTD_NORTH = 'X' SITES += 'NDOSL_BLTJ' NDOSL_BLTJ_CENTER = 399 NDOSL_BLTJ_FRAME = 'ITRF93' NDOSL_BLTJ_IDCODE = 399100290 NDOSL_BLTJ_LATLON = ( 39.0027035278, 283.1620721667, 0.013660 ) NDOSL_BLTJ_TOPO_FRAME = 'NDOSL_BLTJ_TOPO' NDOSL_BLTJ_TOPO_ID = 399100290 NDOSL_BLTJ_UP = 'Z' NDOSL_BLTJ_NORTH = 'X' SITES += 'NDOSL_BP1K' NDOSL_BP1K_CENTER = 399 NDOSL_BP1K_FRAME = 'ITRF93' NDOSL_BP1K_IDCODE = 399104754 NDOSL_BP1K_LATLON = ( 38.4291651944, 282.9160574722, -0.015734 ) NDOSL_BP1K_TOPO_FRAME = 'NDOSL_BP1K_TOPO' NDOSL_BP1K_TOPO_ID = 399104754 NDOSL_BP1K_UP = 'Z' NDOSL_BP1K_NORTH = 'X' SITES += 'NDOSL_BP1S' NDOSL_BP1S_CENTER = 399 NDOSL_BP1S_FRAME = 'ITRF93' NDOSL_BP1S_IDCODE = 399101322 NDOSL_BP1S_LATLON = ( 38.4291651944, 282.9160574722, -0.015734 ) NDOSL_BP1S_TOPO_FRAME = 'NDOSL_BP1S_TOPO' NDOSL_BP1S_TOPO_ID = 399101322 NDOSL_BP1S_UP = 'Z' NDOSL_BP1S_NORTH = 'X' SITES += 'NDOSL_BP2K' NDOSL_BP2K_CENTER = 399 NDOSL_BP2K_FRAME = 'ITRF93' NDOSL_BP2K_IDCODE = 399104755 NDOSL_BP2K_LATLON = ( 38.4287808333, 282.9160578611, -0.015743 ) NDOSL_BP2K_TOPO_FRAME = 'NDOSL_BP2K_TOPO' NDOSL_BP2K_TOPO_ID = 399104755 NDOSL_BP2K_UP = 'Z' NDOSL_BP2K_NORTH = 'X' SITES += 'NDOSL_BP2S' NDOSL_BP2S_CENTER = 399 NDOSL_BP2S_FRAME = 'ITRF93' NDOSL_BP2S_IDCODE = 399101323 NDOSL_BP2S_LATLON = ( 38.4287808333, 282.9160578611, -0.015743 ) NDOSL_BP2S_TOPO_FRAME = 'NDOSL_BP2S_TOPO' NDOSL_BP2S_TOPO_ID = 399101323 NDOSL_BP2S_UP = 'Z' NDOSL_BP2S_NORTH = 'X' SITES += 'NDOSL_BREQ' NDOSL_BREQ_CENTER = 399 NDOSL_BREQ_FRAME = 'ITRF93' NDOSL_BREQ_IDCODE = 399104283 NDOSL_BREQ_LATLON = ( 4.9488789167, 307.6904557222, 0.051960 ) NDOSL_BREQ_TOPO_FRAME = 'NDOSL_BREQ_TOPO' NDOSL_BREQ_TOPO_ID = 399104283 NDOSL_BREQ_UP = 'Z' NDOSL_BREQ_NORTH = 'X' SITES += 'NDOSL_BRKS' NDOSL_BRKS_CENTER = 399 NDOSL_BRKS_FRAME = 'ITRF93' NDOSL_BRKS_IDCODE = 399101732 NDOSL_BRKS_LATLON = ( 37.8793765833, 237.7572161944, 0.357034 ) NDOSL_BRKS_TOPO_FRAME = 'NDOSL_BRKS_TOPO' NDOSL_BRKS_TOPO_ID = 399101732 NDOSL_BRKS_UP = 'Z' NDOSL_BRKS_NORTH = 'X' SITES += 'NDOSL_CA2F' NDOSL_CA2F_CENTER = 399 NDOSL_CA2F_FRAME = 'ITRF93' NDOSL_CA2F_IDCODE = 399104241 NDOSL_CA2F_LATLON = ( 34.5830283333, 239.4388851111, 0.627550 ) NDOSL_CA2F_TOPO_FRAME = 'NDOSL_CA2F_TOPO' NDOSL_CA2F_TOPO_ID = 399104241 NDOSL_CA2F_UP = 'Z' NDOSL_CA2F_NORTH = 'X' SITES += 'NDOSL_CALF' NDOSL_CALF_CENTER = 399 NDOSL_CALF_FRAME = 'ITRF93' NDOSL_CALF_IDCODE = 399104018 NDOSL_CALF_LATLON = ( 34.5827385556, 239.4384276667, 0.627540 ) NDOSL_CALF_TOPO_FRAME = 'NDOSL_CALF_TOPO' NDOSL_CALF_TOPO_ID = 399104018 NDOSL_CALF_UP = 'Z' NDOSL_CALF_NORTH = 'X' SITES += 'NDOSL_CALT' NDOSL_CALT_CENTER = 399 NDOSL_CALT_FRAME = 'ITRF93' NDOSL_CALT_IDCODE = 399104280 NDOSL_CALT_LATLON = ( 34.6658445000, 239.4185533056, 0.088520 ) NDOSL_CALT_TOPO_FRAME = 'NDOSL_CALT_TOPO' NDOSL_CALT_TOPO_ID = 399104280 NDOSL_CALT_UP = 'Z' NDOSL_CALT_NORTH = 'X' SITES += 'NDOSL_CALY' NDOSL_CALY_CENTER = 399 NDOSL_CALY_FRAME = 'ITRF93' NDOSL_CALY_IDCODE = 399101835 NDOSL_CALY_LATLON = ( 34.5656237500, 239.4989869167, 0.623910 ) NDOSL_CALY_TOPO_FRAME = 'NDOSL_CALY_TOPO' NDOSL_CALY_TOPO_ID = 399101835 NDOSL_CALY_UP = 'Z' NDOSL_CALY_NORTH = 'X' SITES += 'NDOSL_CANS' NDOSL_CANS_CENTER = 399 NDOSL_CANS_FRAME = 'ITRF93' NDOSL_CANS_IDCODE = 399104723 NDOSL_CANS_LATLON = ( -35.4046666667, 148.9830580000, 0.680000 ) NDOSL_CANS_TOPO_FRAME = 'NDOSL_CANS_TOPO' NDOSL_CANS_TOPO_ID = 399104723 NDOSL_CANS_UP = 'Z' NDOSL_CANS_NORTH = 'X' SITES += 'NDOSL_CB1D' NDOSL_CB1D_CENTER = 399 NDOSL_CB1D_FRAME = 'ITRF93' NDOSL_CB1D_IDCODE = 399101567 NDOSL_CB1D_LATLON = ( 40.4526908333, 355.6324527222, 0.794073 ) NDOSL_CB1D_TOPO_FRAME = 'NDOSL_CB1D_TOPO' NDOSL_CB1D_TOPO_ID = 399101567 NDOSL_CB1D_UP = 'Z' NDOSL_CB1D_NORTH = 'X' SITES += 'NDOSL_CHAS' NDOSL_CHAS_CENTER = 399 NDOSL_CHAS_FRAME = 'ITRF93' NDOSL_CHAS_IDCODE = 399101340 NDOSL_CHAS_LATLON = ( 38.8903333333, 282.5578333333, 0.135000 ) NDOSL_CHAS_TOPO_FRAME = 'NDOSL_CHAS_TOPO' NDOSL_CHAS_TOPO_ID = 399101340 NDOSL_CHAS_UP = 'Z' NDOSL_CHAS_NORTH = 'X' SITES += 'NDOSL_CN2F' NDOSL_CN2F_CENTER = 399 NDOSL_CN2F_FRAME = 'ITRF93' NDOSL_CN2F_IDCODE = 399104088 NDOSL_CN2F_LATLON = ( 28.5288721944, 279.4094383611, -0.020471 ) NDOSL_CN2F_TOPO_FRAME = 'NDOSL_CN2F_TOPO' NDOSL_CN2F_TOPO_ID = 399104088 NDOSL_CN2F_UP = 'Z' NDOSL_CN2F_NORTH = 'X' SITES += 'NDOSL_CN4F' NDOSL_CN4F_CENTER = 399 NDOSL_CN4F_FRAME = 'ITRF93' NDOSL_CN4F_IDCODE = 399104223 NDOSL_CN4F_LATLON = ( 28.4631679167, 279.4168885278, -0.014810 ) NDOSL_CN4F_TOPO_FRAME = 'NDOSL_CN4F_TOPO' NDOSL_CN4F_TOPO_ID = 399104223 NDOSL_CN4F_UP = 'Z' NDOSL_CN4F_NORTH = 'X' SITES += 'NDOSL_CN5F' NDOSL_CN5F_CENTER = 399 NDOSL_CN5F_FRAME = 'ITRF93' NDOSL_CN5F_IDCODE = 399104344 NDOSL_CN5F_LATLON = ( 28.5170243889, 279.4365801111, 0.013690 ) NDOSL_CN5F_TOPO_FRAME = 'NDOSL_CN5F_TOPO' NDOSL_CN5F_TOPO_ID = 399104344 NDOSL_CN5F_UP = 'Z' NDOSL_CN5F_NORTH = 'X' SITES += 'NDOSL_CNVF' NDOSL_CNVF_CENTER = 399 NDOSL_CNVF_FRAME = 'ITRF93' NDOSL_CNVF_IDCODE = 399104041 NDOSL_CNVF_LATLON = ( 28.4816058889, 279.4234908333, -0.014220 ) NDOSL_CNVF_TOPO_FRAME = 'NDOSL_CNVF_TOPO' NDOSL_CNVF_TOPO_ID = 399104041 NDOSL_CNVF_UP = 'Z' NDOSL_CNVF_NORTH = 'X' SITES += 'NDOSL_COCS' NDOSL_COCS_CENTER = 399 NDOSL_COCS_FRAME = 'ITRF93' NDOSL_COCS_IDCODE = 399104085 NDOSL_COCS_LATLON = ( -12.2000000000, 96.8500000000, 0.000000 ) NDOSL_COCS_TOPO_FRAME = 'NDOSL_COCS_TOPO' NDOSL_COCS_TOPO_ID = 399104085 NDOSL_COCS_UP = 'Z' NDOSL_COCS_NORTH = 'X' SITES += 'NDOSL_CT2J' NDOSL_CT2J_CENTER = 399 NDOSL_CT2J_FRAME = 'ITRF93' NDOSL_CT2J_IDCODE = 399100294 NDOSL_CT2J_LATLON = ( 32.5004921111, 253.3914428056, 1.450172 ) NDOSL_CT2J_TOPO_FRAME = 'NDOSL_CT2J_TOPO' NDOSL_CT2J_TOPO_ID = 399100294 NDOSL_CT2J_UP = 'Z' NDOSL_CT2J_NORTH = 'X' SITES += 'NDOSL_CTSS' NDOSL_CTSS_CENTER = 399 NDOSL_CTSS_FRAME = 'ITRF93' NDOSL_CTSS_IDCODE = 399101756 NDOSL_CTSS_LATLON = ( 38.8059884167, 255.4715308611, 1.907519 ) NDOSL_CTSS_TOPO_FRAME = 'NDOSL_CTSS_TOPO' NDOSL_CTSS_TOPO_ID = 399101756 NDOSL_CTSS_UP = 'Z' NDOSL_CTSS_NORTH = 'X' SITES += 'NDOSL_CTVJ' NDOSL_CTVJ_CENTER = 399 NDOSL_CTVJ_FRAME = 'ITRF93' NDOSL_CTVJ_IDCODE = 399100293 NDOSL_CTVJ_LATLON = ( 32.5004921111, 253.3914428056, 1.450172 ) NDOSL_CTVJ_TOPO_FRAME = 'NDOSL_CTVJ_TOPO' NDOSL_CTVJ_TOPO_ID = 399100293 NDOSL_CTVJ_UP = 'Z' NDOSL_CTVJ_NORTH = 'X' SITES += 'NDOSL_D26D' NDOSL_D26D_CENTER = 399 NDOSL_D26D_FRAME = 'ITRF93' NDOSL_D26D_IDCODE = 399101526 NDOSL_D26D_LATLON = ( 35.3356892222, 243.1269835000, 0.968686 ) NDOSL_D26D_TOPO_FRAME = 'NDOSL_D26D_TOPO' NDOSL_D26D_TOPO_ID = 399101526 NDOSL_D26D_UP = 'Z' NDOSL_D26D_NORTH = 'X' SITES += 'NDOSL_D27D' NDOSL_D27D_CENTER = 399 NDOSL_D27D_FRAME = 'ITRF93' NDOSL_D27D_IDCODE = 399101516 NDOSL_D27D_LATLON = ( 35.2382717778, 243.2233495556, 1.052468 ) NDOSL_D27D_TOPO_FRAME = 'NDOSL_D27D_TOPO' NDOSL_D27D_TOPO_ID = 399101516 NDOSL_D27D_UP = 'Z' NDOSL_D27D_NORTH = 'X' SITES += 'NDOSL_D36D' NDOSL_D36D_CENTER = 399 NDOSL_D36D_FRAME = 'ITRF93' NDOSL_D36D_IDCODE = 399101536 NDOSL_D36D_LATLON = ( -35.3951017500, 148.9785441944, 0.685503 ) NDOSL_D36D_TOPO_FRAME = 'NDOSL_D36D_TOPO' NDOSL_D36D_TOPO_ID = 399101536 NDOSL_D36D_UP = 'Z' NDOSL_D36D_NORTH = 'X' SITES += 'NDOSL_DAKS' NDOSL_DAKS_CENTER = 399 NDOSL_DAKS_FRAME = 'ITRF93' NDOSL_DAKS_IDCODE = 399104072 NDOSL_DAKS_LATLON = ( 14.7247622222, 342.8712331111, 0.091278 ) NDOSL_DAKS_TOPO_FRAME = 'NDOSL_DAKS_TOPO' NDOSL_DAKS_TOPO_ID = 399104072 NDOSL_DAKS_UP = 'Z' NDOSL_DAKS_NORTH = 'X' SITES += 'NDOSL_DFRS' NDOSL_DFRS_CENTER = 399 NDOSL_DFRS_FRAME = 'ITRF93' NDOSL_DFRS_IDCODE = 399104067 NDOSL_DFRS_LATLON = ( 34.9497907500, 242.1126059444, 0.679907 ) NDOSL_DFRS_TOPO_FRAME = 'NDOSL_DFRS_TOPO' NDOSL_DFRS_TOPO_ID = 399104067 NDOSL_DFRS_UP = 'Z' NDOSL_DFRS_NORTH = 'X' SITES += 'NDOSL_DGIS' NDOSL_DGIS_CENTER = 399 NDOSL_DGIS_FRAME = 'ITRF93' NDOSL_DGIS_IDCODE = 399104073 NDOSL_DGIS_LATLON = ( -7.2700305556, 72.3699986111, -0.068375 ) NDOSL_DGIS_TOPO_FRAME = 'NDOSL_DGIS_TOPO' NDOSL_DGIS_TOPO_ID = 399104073 NDOSL_DGIS_UP = 'Z' NDOSL_DGIS_NORTH = 'X' SITES += 'NDOSL_DS12' NDOSL_DS12_CENTER = 399 NDOSL_DS12_FRAME = 'ITRF93' NDOSL_DS12_IDCODE = 399101612 NDOSL_DS12_LATLON = ( 35.2999394167, 243.1945566111, 0.969669 ) NDOSL_DS12_TOPO_FRAME = 'NDOSL_DS12_TOPO' NDOSL_DS12_TOPO_ID = 399101612 NDOSL_DS12_UP = 'Z' NDOSL_DS12_NORTH = 'X' SITES += 'NDOSL_DS14' NDOSL_DS14_CENTER = 399 NDOSL_DS14_FRAME = 'ITRF93' NDOSL_DS14_IDCODE = 399101514 NDOSL_DS14_LATLON = ( 35.4259008611, 243.1104617778, 1.001390 ) NDOSL_DS14_TOPO_FRAME = 'NDOSL_DS14_TOPO' NDOSL_DS14_TOPO_ID = 399101514 NDOSL_DS14_UP = 'Z' NDOSL_DS14_NORTH = 'X' SITES += 'NDOSL_DS15' NDOSL_DS15_CENTER = 399 NDOSL_DS15_FRAME = 'ITRF93' NDOSL_DS15_IDCODE = 399101515 NDOSL_DS15_LATLON = ( 35.4218532778, 243.1128048889, 0.973211 ) NDOSL_DS15_TOPO_FRAME = 'NDOSL_DS15_TOPO' NDOSL_DS15_TOPO_ID = 399101515 NDOSL_DS15_UP = 'Z' NDOSL_DS15_NORTH = 'X' SITES += 'NDOSL_DS16' NDOSL_DS16_CENTER = 399 NDOSL_DS16_FRAME = 'ITRF93' NDOSL_DS16_IDCODE = 399101312 NDOSL_DS16_LATLON = ( 35.3415393889, 243.1263502500, 0.943977 ) NDOSL_DS16_TOPO_FRAME = 'NDOSL_DS16_TOPO' NDOSL_DS16_TOPO_ID = 399101312 NDOSL_DS16_UP = 'Z' NDOSL_DS16_NORTH = 'X' SITES += 'NDOSL_DS17' NDOSL_DS17_CENTER = 399 NDOSL_DS17_FRAME = 'ITRF93' NDOSL_DS17_IDCODE = 399101327 NDOSL_DS17_LATLON = ( 35.3422299444, 243.1265447222, 0.942701 ) NDOSL_DS17_TOPO_FRAME = 'NDOSL_DS17_TOPO' NDOSL_DS17_TOPO_ID = 399101327 NDOSL_DS17_UP = 'Z' NDOSL_DS17_NORTH = 'X' SITES += 'NDOSL_DS24' NDOSL_DS24_CENTER = 399 NDOSL_DS24_FRAME = 'ITRF93' NDOSL_DS24_IDCODE = 399104252 NDOSL_DS24_LATLON = ( 35.3398928333, 243.1252055833, 0.951499 ) NDOSL_DS24_TOPO_FRAME = 'NDOSL_DS24_TOPO' NDOSL_DS24_TOPO_ID = 399104252 NDOSL_DS24_UP = 'Z' NDOSL_DS24_NORTH = 'X' SITES += 'NDOSL_DS25' NDOSL_DS25_CENTER = 399 NDOSL_DS25_FRAME = 'ITRF93' NDOSL_DS25_IDCODE = 399101525 NDOSL_DS25_LATLON = ( 35.3376119722, 243.1246368056, 0.959634 ) NDOSL_DS25_TOPO_FRAME = 'NDOSL_DS25_TOPO' NDOSL_DS25_TOPO_ID = 399101525 NDOSL_DS25_UP = 'Z' NDOSL_DS25_NORTH = 'X' SITES += 'NDOSL_DS34' NDOSL_DS34_CENTER = 399 NDOSL_DS34_FRAME = 'ITRF93' NDOSL_DS34_IDCODE = 399101534 NDOSL_DS34_LATLON = ( -35.3984788333, 148.9819644167, 0.692020 ) NDOSL_DS34_TOPO_FRAME = 'NDOSL_DS34_TOPO' NDOSL_DS34_TOPO_ID = 399101534 NDOSL_DS34_UP = 'Z' NDOSL_DS34_NORTH = 'X' SITES += 'NDOSL_DS35' NDOSL_DS35_CENTER = 399 NDOSL_DS35_FRAME = 'ITRF93' NDOSL_DS35_IDCODE = 399101535 NDOSL_DS35_LATLON = ( -35.3957955278, 148.9814558056, 0.694889 ) NDOSL_DS35_TOPO_FRAME = 'NDOSL_DS35_TOPO' NDOSL_DS35_TOPO_ID = 399101535 NDOSL_DS35_UP = 'Z' NDOSL_DS35_NORTH = 'X' SITES += 'NDOSL_DS42' NDOSL_DS42_CENTER = 399 NDOSL_DS42_FRAME = 'ITRF93' NDOSL_DS42_IDCODE = 399101547 NDOSL_DS42_LATLON = ( -35.4006838611, 148.9812441944, 0.684755 ) NDOSL_DS42_TOPO_FRAME = 'NDOSL_DS42_TOPO' NDOSL_DS42_TOPO_ID = 399101547 NDOSL_DS42_UP = 'Z' NDOSL_DS42_NORTH = 'X' SITES += 'NDOSL_DS43' NDOSL_DS43_CENTER = 399 NDOSL_DS43_FRAME = 'ITRF93' NDOSL_DS43_IDCODE = 399101548 NDOSL_DS43_LATLON = ( -35.4024242222, 148.9812673056, 0.688867 ) NDOSL_DS43_TOPO_FRAME = 'NDOSL_DS43_TOPO' NDOSL_DS43_TOPO_ID = 399101548 NDOSL_DS43_UP = 'Z' NDOSL_DS43_NORTH = 'X' SITES += 'NDOSL_DS45' NDOSL_DS45_CENTER = 399 NDOSL_DS45_FRAME = 'ITRF93' NDOSL_DS45_IDCODE = 399101549 NDOSL_DS45_LATLON = ( -35.3984576944, 148.9776856389, 0.674347 ) NDOSL_DS45_TOPO_FRAME = 'NDOSL_DS45_TOPO' NDOSL_DS45_TOPO_ID = 399101549 NDOSL_DS45_UP = 'Z' NDOSL_DS45_NORTH = 'X' SITES += 'NDOSL_DS46' NDOSL_DS46_CENTER = 399 NDOSL_DS46_FRAME = 'ITRF93' NDOSL_DS46_IDCODE = 399101546 NDOSL_DS46_LATLON = ( -35.4050106389, 148.9830816944, 0.676812 ) NDOSL_DS46_TOPO_FRAME = 'NDOSL_DS46_TOPO' NDOSL_DS46_TOPO_ID = 399101546 NDOSL_DS46_UP = 'Z' NDOSL_DS46_NORTH = 'X' SITES += 'NDOSL_DS54' NDOSL_DS54_CENTER = 399 NDOSL_DS54_FRAME = 'ITRF93' NDOSL_DS54_IDCODE = 399101554 NDOSL_DS54_LATLON = ( 40.4256216667, 355.7459031667, 0.837051 ) NDOSL_DS54_TOPO_FRAME = 'NDOSL_DS54_TOPO' NDOSL_DS54_TOPO_ID = 399101554 NDOSL_DS54_UP = 'Z' NDOSL_DS54_NORTH = 'X' SITES += 'NDOSL_DS55' NDOSL_DS55_CENTER = 399 NDOSL_DS55_FRAME = 'ITRF93' NDOSL_DS55_IDCODE = 399101555 NDOSL_DS55_LATLON = ( 40.4242959167, 355.7473666944, 0.819061 ) NDOSL_DS55_TOPO_FRAME = 'NDOSL_DS55_TOPO' NDOSL_DS55_TOPO_ID = 399101555 NDOSL_DS55_UP = 'Z' NDOSL_DS55_NORTH = 'X' SITES += 'NDOSL_DS61' NDOSL_DS61_CENTER = 399 NDOSL_DS61_FRAME = 'ITRF93' NDOSL_DS61_IDCODE = 399101662 NDOSL_DS61_LATLON = ( 40.4287444444, 355.7510719722, 0.848658 ) NDOSL_DS61_TOPO_FRAME = 'NDOSL_DS61_TOPO' NDOSL_DS61_TOPO_ID = 399101662 NDOSL_DS61_UP = 'Z' NDOSL_DS61_NORTH = 'X' SITES += 'NDOSL_DS63' NDOSL_DS63_CENTER = 399 NDOSL_DS63_FRAME = 'ITRF93' NDOSL_DS63_IDCODE = 399101564 NDOSL_DS63_LATLON = ( 40.4312097500, 355.7519914444, 0.864816 ) NDOSL_DS63_TOPO_FRAME = 'NDOSL_DS63_TOPO' NDOSL_DS63_TOPO_ID = 399101564 NDOSL_DS63_UP = 'Z' NDOSL_DS63_NORTH = 'X' SITES += 'NDOSL_DS65' NDOSL_DS65_CENTER = 399 NDOSL_DS65_FRAME = 'ITRF93' NDOSL_DS65_IDCODE = 399101565 NDOSL_DS65_LATLON = ( 40.4272063611, 355.7493011111, 0.833854 ) NDOSL_DS65_TOPO_FRAME = 'NDOSL_DS65_TOPO' NDOSL_DS65_TOPO_ID = 399101565 NDOSL_DS65_UP = 'Z' NDOSL_DS65_NORTH = 'X' SITES += 'NDOSL_DS66' NDOSL_DS66_CENTER = 399 NDOSL_DS66_FRAME = 'ITRF93' NDOSL_DS66_IDCODE = 399101566 NDOSL_DS66_LATLON = ( 40.4299748611, 355.7485823611, 0.849874 ) NDOSL_DS66_TOPO_FRAME = 'NDOSL_DS66_TOPO' NDOSL_DS66_TOPO_ID = 399101566 NDOSL_DS66_UP = 'Z' NDOSL_DS66_NORTH = 'X' SITES += 'NDOSL_DS87' NDOSL_DS87_CENTER = 399 NDOSL_DS87_FRAME = 'ITRF93' NDOSL_DS87_IDCODE = 399101587 NDOSL_DS87_LATLON = ( 37.9265898611, 284.5236954722, -0.012762 ) NDOSL_DS87_TOPO_FRAME = 'NDOSL_DS87_TOPO' NDOSL_DS87_TOPO_ID = 399101587 NDOSL_DS87_UP = 'Z' NDOSL_DS87_NORTH = 'X' SITES += 'NDOSL_DX2S' NDOSL_DX2S_CENTER = 399 NDOSL_DX2S_FRAME = 'ITRF93' NDOSL_DX2S_IDCODE = 399101715 NDOSL_DX2S_LATLON = ( 65.1178338889, 212.5688375000, 0.514650 ) NDOSL_DX2S_TOPO_FRAME = 'NDOSL_DX2S_TOPO' NDOSL_DX2S_TOPO_ID = 399101715 NDOSL_DX2S_UP = 'Z' NDOSL_DX2S_NORTH = 'X' SITES += 'NDOSL_DXAS' NDOSL_DXAS_CENTER = 399 NDOSL_DXAS_FRAME = 'ITRF93' NDOSL_DXAS_IDCODE = 399101711 NDOSL_DXAS_LATLON = ( 65.1179297222, 212.5664961111, 0.518900 ) NDOSL_DXAS_TOPO_FRAME = 'NDOSL_DXAS_TOPO' NDOSL_DXAS_TOPO_ID = 399101711 NDOSL_DXAS_UP = 'Z' NDOSL_DXAS_NORTH = 'X' SITES += 'NDOSL_EA2F' NDOSL_EA2F_CENTER = 399 NDOSL_EA2F_FRAME = 'ITRF93' NDOSL_EA2F_IDCODE = 399104065 NDOSL_EA2F_LATLON = ( 34.9704538889, 242.0694383333, 0.799726 ) NDOSL_EA2F_TOPO_FRAME = 'NDOSL_EA2F_TOPO' NDOSL_EA2F_TOPO_ID = 399104065 NDOSL_EA2F_UP = 'Z' NDOSL_EA2F_NORTH = 'X' SITES += 'NDOSL_EA3F' NDOSL_EA3F_CENTER = 399 NDOSL_EA3F_FRAME = 'ITRF93' NDOSL_EA3F_IDCODE = 399104221 NDOSL_EA3F_LATLON = ( 34.9381143333, 241.9086703056, 0.743537 ) NDOSL_EA3F_TOPO_FRAME = 'NDOSL_EA3F_TOPO' NDOSL_EA3F_TOPO_ID = 399104221 NDOSL_EA3F_UP = 'Z' NDOSL_EA3F_NORTH = 'X' SITES += 'NDOSL_EAFF' NDOSL_EAFF_CENTER = 399 NDOSL_EAFF_FRAME = 'ITRF93' NDOSL_EAFF_IDCODE = 399104064 NDOSL_EAFF_LATLON = ( 34.9606598333, 242.0884490556, 0.780567 ) NDOSL_EAFF_TOPO_FRAME = 'NDOSL_EAFF_TOPO' NDOSL_EAFF_TOPO_ID = 399104064 NDOSL_EAFF_UP = 'Z' NDOSL_EAFF_NORTH = 'X' SITES += 'NDOSL_EG2F' NDOSL_EG2F_CENTER = 399 NDOSL_EG2F_FRAME = 'ITRF93' NDOSL_EG2F_IDCODE = 399104345 NDOSL_EG2F_LATLON = ( 30.5725279444, 273.7852825833, 0.037711 ) NDOSL_EG2F_TOPO_FRAME = 'NDOSL_EG2F_TOPO' NDOSL_EG2F_TOPO_ID = 399104345 NDOSL_EG2F_UP = 'Z' NDOSL_EG2F_NORTH = 'X' SITES += 'NDOSL_EG3F' NDOSL_EG3F_CENTER = 399 NDOSL_EG3F_FRAME = 'ITRF93' NDOSL_EG3F_IDCODE = 399104346 NDOSL_EG3F_LATLON = ( 30.4216655833, 273.2019880000, 0.001143 ) NDOSL_EG3F_TOPO_FRAME = 'NDOSL_EG3F_TOPO' NDOSL_EG3F_TOPO_ID = 399104346 NDOSL_EG3F_UP = 'Z' NDOSL_EG3F_NORTH = 'X' SITES += 'NDOSL_ET1S' NDOSL_ET1S_CENTER = 399 NDOSL_ET1S_FRAME = 'ITRF93' NDOSL_ET1S_IDCODE = 399101973 NDOSL_ET1S_LATLON = ( 32.5045748889, 253.3886626944, 1.443190 ) NDOSL_ET1S_TOPO_FRAME = 'NDOSL_ET1S_TOPO' NDOSL_ET1S_TOPO_ID = 399101973 NDOSL_ET1S_UP = 'Z' NDOSL_ET1S_NORTH = 'X' SITES += 'NDOSL_ET2S' NDOSL_ET2S_CENTER = 399 NDOSL_ET2S_FRAME = 'ITRF93' NDOSL_ET2S_IDCODE = 399101974 NDOSL_ET2S_LATLON = ( 32.5043845000, 253.3888421111, 1.463649 ) NDOSL_ET2S_TOPO_FRAME = 'NDOSL_ET2S_TOPO' NDOSL_ET2S_TOPO_ID = 399101974 NDOSL_ET2S_UP = 'Z' NDOSL_ET2S_NORTH = 'X' SITES += 'NDOSL_EULY' NDOSL_EULY_CENTER = 399 NDOSL_EULY_FRAME = 'ITRF93' NDOSL_EULY_IDCODE = 399104205 NDOSL_EULY_LATLON = ( 28.4635640833, 279.3469878056, -0.010510 ) NDOSL_EULY_TOPO_FRAME = 'NDOSL_EULY_TOPO' NDOSL_EULY_TOPO_ID = 399104205 NDOSL_EULY_UP = 'Z' NDOSL_EULY_NORTH = 'X' SITES += 'NDOSL_EVCS' NDOSL_EVCS_CENTER = 399 NDOSL_EVCS_FRAME = 'ITRF93' NDOSL_EVCS_IDCODE = 399101363 NDOSL_EVCS_LATLON = ( 28.4860000000, 279.4240000000, 0.014996 ) NDOSL_EVCS_TOPO_FRAME = 'NDOSL_EVCS_TOPO' NDOSL_EVCS_TOPO_ID = 399101363 NDOSL_EVCS_UP = 'Z' NDOSL_EVCS_NORTH = 'X' SITES += 'NDOSL_FR1X' NDOSL_FR1X_CENTER = 399 NDOSL_FR1X_FRAME = 'ITRF93' NDOSL_FR1X_IDCODE = 399101844 NDOSL_FR1X_LATLON = ( 34.9506944444, 242.1045555556, 0.717000 ) NDOSL_FR1X_TOPO_FRAME = 'NDOSL_FR1X_TOPO' NDOSL_FR1X_TOPO_ID = 399101844 NDOSL_FR1X_UP = 'Z' NDOSL_FR1X_NORTH = 'X' SITES += 'NDOSL_FR2F' NDOSL_FR2F_CENTER = 399 NDOSL_FR2F_FRAME = 'ITRF93' NDOSL_FR2F_IDCODE = 399104249 NDOSL_FR2F_LATLON = ( 34.9504461667, 242.1047563333, 0.723967 ) NDOSL_FR2F_TOPO_FRAME = 'NDOSL_FR2F_TOPO' NDOSL_FR2F_TOPO_ID = 399104249 NDOSL_FR2F_UP = 'Z' NDOSL_FR2F_NORTH = 'X' SITES += 'NDOSL_FR2X' NDOSL_FR2X_CENTER = 399 NDOSL_FR2X_FRAME = 'ITRF93' NDOSL_FR2X_IDCODE = 399101845 NDOSL_FR2X_LATLON = ( 34.9507222222, 242.1047222222, 0.717000 ) NDOSL_FR2X_TOPO_FRAME = 'NDOSL_FR2X_TOPO' NDOSL_FR2X_TOPO_ID = 399101845 NDOSL_FR2X_UP = 'Z' NDOSL_FR2X_NORTH = 'X' SITES += 'NDOSL_FRCF' NDOSL_FRCF_CENTER = 399 NDOSL_FRCF_FRAME = 'ITRF93' NDOSL_FRCF_IDCODE = 399104069 NDOSL_FRCF_LATLON = ( 34.9608046944, 242.0885039167, 0.751842 ) NDOSL_FRCF_TOPO_FRAME = 'NDOSL_FRCF_TOPO' NDOSL_FRCF_TOPO_ID = 399104069 NDOSL_FRCF_UP = 'Z' NDOSL_FRCF_NORTH = 'X' SITES += 'NDOSL_FT2F' NDOSL_FT2F_CENTER = 399 NDOSL_FT2F_FRAME = 'ITRF93' NDOSL_FT2F_IDCODE = 399104138 NDOSL_FT2F_LATLON = ( 31.5567668611, 249.5618266667, 1.794960 ) NDOSL_FT2F_TOPO_FRAME = 'NDOSL_FT2F_TOPO' NDOSL_FT2F_TOPO_ID = 399104138 NDOSL_FT2F_UP = 'Z' NDOSL_FT2F_NORTH = 'X' SITES += 'NDOSL_FTHF' NDOSL_FTHF_CENTER = 399 NDOSL_FTHF_FRAME = 'ITRF93' NDOSL_FTHF_IDCODE = 399104115 NDOSL_FTHF_LATLON = ( 31.5710242500, 249.6292020278, 1.486316 ) NDOSL_FTHF_TOPO_FRAME = 'NDOSL_FTHF_TOPO' NDOSL_FTHF_TOPO_ID = 399104115 NDOSL_FTHF_UP = 'Z' NDOSL_FTHF_NORTH = 'X' SITES += 'NDOSL_GB2Y' NDOSL_GB2Y_CENTER = 399 NDOSL_GB2Y_FRAME = 'ITRF93' NDOSL_GB2Y_IDCODE = 399101814 NDOSL_GB2Y_LATLON = ( 26.6254712778, 281.7014746667, -0.010997 ) NDOSL_GB2Y_TOPO_FRAME = 'NDOSL_GB2Y_TOPO' NDOSL_GB2Y_TOPO_ID = 399101814 NDOSL_GB2Y_UP = 'Z' NDOSL_GB2Y_NORTH = 'X' SITES += 'NDOSL_GBIQ' NDOSL_GBIQ_CENTER = 399 NDOSL_GBIQ_FRAME = 'ITRF93' NDOSL_GBIQ_IDCODE = 399104013 NDOSL_GBIQ_LATLON = ( 26.6156420000, 281.6521599444, -0.013684 ) NDOSL_GBIQ_TOPO_FRAME = 'NDOSL_GBIQ_TOPO' NDOSL_GBIQ_TOPO_ID = 399104013 NDOSL_GBIQ_UP = 'Z' NDOSL_GBIQ_NORTH = 'X' SITES += 'NDOSL_GBIY' NDOSL_GBIY_CENTER = 399 NDOSL_GBIY_FRAME = 'ITRF93' NDOSL_GBIY_IDCODE = 399101813 NDOSL_GBIY_LATLON = ( 26.6254465556, 281.7009088056, 0.000878 ) NDOSL_GBIY_TOPO_FRAME = 'NDOSL_GBIY_TOPO' NDOSL_GBIY_TOPO_ID = 399101813 NDOSL_GBIY_UP = 'Z' NDOSL_GBIY_NORTH = 'X' SITES += 'NDOSL_GD28' NDOSL_GD28_CENTER = 399 NDOSL_GD28_FRAME = 'ITRF93' NDOSL_GD28_IDCODE = 399101517 NDOSL_GD28_LATLON = ( 35.3415426389, 243.1263953333, 0.940941 ) NDOSL_GD28_TOPO_FRAME = 'NDOSL_GD28_TOPO' NDOSL_GD28_TOPO_ID = 399101517 NDOSL_GD28_UP = 'Z' NDOSL_GD28_NORTH = 'X' SITES += 'NDOSL_GDSA' NDOSL_GDSA_CENTER = 399 NDOSL_GDSA_FRAME = 'ITRF93' NDOSL_GDSA_IDCODE = 399101317 NDOSL_GDSA_LATLON = ( 35.3415426389, 243.1269986667, 0.935541 ) NDOSL_GDSA_TOPO_FRAME = 'NDOSL_GDSA_TOPO' NDOSL_GDSA_TOPO_ID = 399101317 NDOSL_GDSA_UP = 'Z' NDOSL_GDSA_NORTH = 'X' SITES += 'NDOSL_GILD' NDOSL_GILD_CENTER = 399 NDOSL_GILD_FRAME = 'ITRF93' NDOSL_GILD_IDCODE = 399107225 NDOSL_GILD_LATLON = ( 64.9785092500, 212.5019998056, 0.320131 ) NDOSL_GILD_TOPO_FRAME = 'NDOSL_GILD_TOPO' NDOSL_GILD_TOPO_ID = 399107225 NDOSL_GILD_UP = 'Z' NDOSL_GILD_NORTH = 'X' SITES += 'NDOSL_GILE' NDOSL_GILE_CENTER = 399 NDOSL_GILE_FRAME = 'ITRF93' NDOSL_GILE_IDCODE = 399104047 NDOSL_GILE_LATLON = ( 64.9785071111, 212.5019995278, 0.322434 ) NDOSL_GILE_TOPO_FRAME = 'NDOSL_GILE_TOPO' NDOSL_GILE_TOPO_ID = 399104047 NDOSL_GILE_UP = 'Z' NDOSL_GILE_NORTH = 'X' SITES += 'NDOSL_GLAS' NDOSL_GLAS_CENTER = 399 NDOSL_GLAS_FRAME = 'ITRF93' NDOSL_GLAS_IDCODE = 399101712 NDOSL_GLAS_LATLON = ( 64.9736719722, 212.4871613333, 0.387482 ) NDOSL_GLAS_TOPO_FRAME = 'NDOSL_GLAS_TOPO' NDOSL_GLAS_TOPO_ID = 399101712 NDOSL_GLAS_UP = 'Z' NDOSL_GLAS_NORTH = 'X' SITES += 'NDOSL_GLBS' NDOSL_GLBS_CENTER = 399 NDOSL_GLBS_FRAME = 'ITRF93' NDOSL_GLBS_IDCODE = 399101713 NDOSL_GLBS_LATLON = ( 64.9734820278, 212.4913014722, 0.405478 ) NDOSL_GLBS_TOPO_FRAME = 'NDOSL_GLBS_TOPO' NDOSL_GLBS_TOPO_ID = 399101713 NDOSL_GLBS_UP = 'Z' NDOSL_GLBS_NORTH = 'X' SITES += 'NDOSL_GLCS' NDOSL_GLCS_CENTER = 399 NDOSL_GLCS_FRAME = 'ITRF93' NDOSL_GLCS_IDCODE = 399101714 NDOSL_GLCS_LATLON = ( 64.9731421111, 212.4952216389, 0.424474 ) NDOSL_GLCS_TOPO_FRAME = 'NDOSL_GLCS_TOPO' NDOSL_GLCS_TOPO_ID = 399101714 NDOSL_GLCS_UP = 'Z' NDOSL_GLCS_NORTH = 'X' SITES += 'NDOSL_GT2S' NDOSL_GT2S_CENTER = 399 NDOSL_GT2S_FRAME = 'ITRF93' NDOSL_GT2S_IDCODE = 399101375 NDOSL_GT2S_LATLON = ( 13.6158806389, 144.8554377500, 0.209160 ) NDOSL_GT2S_TOPO_FRAME = 'NDOSL_GT2S_TOPO' NDOSL_GT2S_TOPO_ID = 399101375 NDOSL_GT2S_UP = 'Z' NDOSL_GT2S_NORTH = 'X' SITES += 'NDOSL_GTKQ' NDOSL_GTKQ_CENTER = 399 NDOSL_GTKQ_FRAME = 'ITRF93' NDOSL_GTKQ_IDCODE = 399104086 NDOSL_GTKQ_LATLON = ( 21.4626316111, 288.8679117778, -0.005582 ) NDOSL_GTKQ_TOPO_FRAME = 'NDOSL_GTKQ_TOPO' NDOSL_GTKQ_TOPO_ID = 399104086 NDOSL_GTKQ_UP = 'Z' NDOSL_GTKQ_NORTH = 'X' SITES += 'NDOSL_GTSS' NDOSL_GTSS_CENTER = 399 NDOSL_GTSS_FRAME = 'ITRF93' NDOSL_GTSS_IDCODE = 399101368 NDOSL_GTSS_LATLON = ( 13.6151891111, 144.8560522500, 0.219060 ) NDOSL_GTSS_TOPO_FRAME = 'NDOSL_GTSS_TOPO' NDOSL_GTSS_TOPO_ID = 399101368 NDOSL_GTSS_UP = 'Z' NDOSL_GTSS_NORTH = 'X' SITES += 'NDOSL_GW1J' NDOSL_GW1J_CENTER = 399 NDOSL_GW1J_FRAME = 'ITRF93' NDOSL_GW1J_IDCODE = 399101971 NDOSL_GW1J_LATLON = ( 13.5886225000, 144.8409839722, 0.199022 ) NDOSL_GW1J_TOPO_FRAME = 'NDOSL_GW1J_TOPO' NDOSL_GW1J_TOPO_ID = 399101971 NDOSL_GW1J_UP = 'Z' NDOSL_GW1J_NORTH = 'X' SITES += 'NDOSL_GW2J' NDOSL_GW2J_CENTER = 399 NDOSL_GW2J_FRAME = 'ITRF93' NDOSL_GW2J_IDCODE = 399100210 NDOSL_GW2J_LATLON = ( 13.5886224722, 144.8409883056, 0.199068 ) NDOSL_GW2J_TOPO_FRAME = 'NDOSL_GW2J_TOPO' NDOSL_GW2J_TOPO_ID = 399100210 NDOSL_GW2J_UP = 'Z' NDOSL_GW2J_NORTH = 'X' SITES += 'NDOSL_GW2K' NDOSL_GW2K_CENTER = 399 NDOSL_GW2K_FRAME = 'ITRF93' NDOSL_GW2K_IDCODE = 399101968 NDOSL_GW2K_LATLON = ( 13.5875882778, 144.8408744722, 0.197665 ) NDOSL_GW2K_TOPO_FRAME = 'NDOSL_GW2K_TOPO' NDOSL_GW2K_TOPO_ID = 399101968 NDOSL_GW2K_UP = 'Z' NDOSL_GW2K_NORTH = 'X' SITES += 'NDOSL_GW2S' NDOSL_GW2S_CENTER = 399 NDOSL_GW2S_FRAME = 'ITRF93' NDOSL_GW2S_IDCODE = 399101969 NDOSL_GW2S_LATLON = ( 13.5875882778, 144.8408744722, 0.197665 ) NDOSL_GW2S_TOPO_FRAME = 'NDOSL_GW2S_TOPO' NDOSL_GW2S_TOPO_ID = 399101969 NDOSL_GW2S_UP = 'Z' NDOSL_GW2S_NORTH = 'X' SITES += 'NDOSL_GW3S' NDOSL_GW3S_CENTER = 399 NDOSL_GW3S_FRAME = 'ITRF93' NDOSL_GW3S_IDCODE = 399101970 NDOSL_GW3S_LATLON = ( 13.5873096111, 144.8408749444, 0.197738 ) NDOSL_GW3S_TOPO_FRAME = 'NDOSL_GW3S_TOPO' NDOSL_GW3S_TOPO_ID = 399101970 NDOSL_GW3S_UP = 'Z' NDOSL_GW3S_NORTH = 'X' SITES += 'NDOSL_GWE2' NDOSL_GWE2_CENTER = 399 NDOSL_GWE2_FRAME = 'ITRF93' NDOSL_GWE2_IDCODE = 399101936 NDOSL_GWE2_LATLON = ( 13.5867563889, 144.8408041944, 0.191148 ) NDOSL_GWE2_TOPO_FRAME = 'NDOSL_GWE2_TOPO' NDOSL_GWE2_TOPO_ID = 399101936 NDOSL_GWE2_UP = 'Z' NDOSL_GWE2_NORTH = 'X' SITES += 'NDOSL_GWM3' NDOSL_GWM3_CENTER = 399 NDOSL_GWM3_FRAME = 'ITRF93' NDOSL_GWM3_IDCODE = 399101309 NDOSL_GWM3_LATLON = ( 13.3106894444, 144.7368153056, 0.148640 ) NDOSL_GWM3_TOPO_FRAME = 'NDOSL_GWM3_TOPO' NDOSL_GWM3_TOPO_ID = 399101309 NDOSL_GWM3_UP = 'Z' NDOSL_GWM3_NORTH = 'X' SITES += 'NDOSL_GWMK' NDOSL_GWMK_CENTER = 399 NDOSL_GWMK_FRAME = 'ITRF93' NDOSL_GWMK_IDCODE = 399101965 NDOSL_GWMK_LATLON = ( 13.5880178611, 144.8409295000, 0.192610 ) NDOSL_GWMK_TOPO_FRAME = 'NDOSL_GWMK_TOPO' NDOSL_GWMK_TOPO_ID = 399101965 NDOSL_GWMK_UP = 'Z' NDOSL_GWMK_NORTH = 'X' SITES += 'NDOSL_GWMS' NDOSL_GWMS_CENTER = 399 NDOSL_GWMS_FRAME = 'ITRF93' NDOSL_GWMS_IDCODE = 399101966 NDOSL_GWMS_LATLON = ( 13.5880178611, 144.8409295000, 0.192610 ) NDOSL_GWMS_TOPO_FRAME = 'NDOSL_GWMS_TOPO' NDOSL_GWMS_TOPO_ID = 399101966 NDOSL_GWMS_UP = 'Z' NDOSL_GWMS_NORTH = 'X' SITES += 'NDOSL_HAW3' NDOSL_HAW3_CENTER = 399 NDOSL_HAW3_FRAME = 'ITRF93' NDOSL_HAW3_IDCODE = 399101311 NDOSL_HAW3_LATLON = ( 22.1262725556, 200.3348449722, 1.157200 ) NDOSL_HAW3_TOPO_FRAME = 'NDOSL_HAW3_TOPO' NDOSL_HAW3_TOPO_ID = 399101311 NDOSL_HAW3_UP = 'Z' NDOSL_HAW3_NORTH = 'X' SITES += 'NDOSL_HAWQ' NDOSL_HAWQ_CENTER = 399 NDOSL_HAWQ_FRAME = 'ITRF93' NDOSL_HAWQ_IDCODE = 399104285 NDOSL_HAWQ_LATLON = ( 21.3161000000, 202.1136000000, 0.000000 ) NDOSL_HAWQ_TOPO_FRAME = 'NDOSL_HAWQ_TOPO' NDOSL_HAWQ_TOPO_ID = 399104285 NDOSL_HAWQ_UP = 'Z' NDOSL_HAWQ_NORTH = 'X' SITES += 'NDOSL_HAWS' NDOSL_HAWS_CENTER = 399 NDOSL_HAWS_FRAME = 'ITRF93' NDOSL_HAWS_IDCODE = 399101706 NDOSL_HAWS_LATLON = ( 19.0135837222, 204.3370000000, 0.274314 ) NDOSL_HAWS_TOPO_FRAME = 'NDOSL_HAWS_TOPO' NDOSL_HAWS_TOPO_ID = 399101706 NDOSL_HAWS_UP = 'Z' NDOSL_HAWS_NORTH = 'X' SITES += 'NDOSL_HB33' NDOSL_HB33_CENTER = 399 NDOSL_HB33_FRAME = 'ITRF93' NDOSL_HB33_IDCODE = 399101325 NDOSL_HB33_LATLON = ( -25.8864277778, 27.7074472222, 1.563720 ) NDOSL_HB33_TOPO_FRAME = 'NDOSL_HB33_TOPO' NDOSL_HB33_TOPO_ID = 399101325 NDOSL_HB33_UP = 'Z' NDOSL_HB33_NORTH = 'X' SITES += 'NDOSL_HB4S' NDOSL_HB4S_CENTER = 399 NDOSL_HB4S_FRAME = 'ITRF93' NDOSL_HB4S_IDCODE = 399101378 NDOSL_HB4S_LATLON = ( -25.8867254444, 27.7126033056, 1.550021 ) NDOSL_HB4S_TOPO_FRAME = 'NDOSL_HB4S_TOPO' NDOSL_HB4S_TOPO_ID = 399101378 NDOSL_HB4S_UP = 'Z' NDOSL_HB4S_NORTH = 'X' SITES += 'NDOSL_HB5S' NDOSL_HB5S_CENTER = 399 NDOSL_HB5S_FRAME = 'ITRF93' NDOSL_HB5S_IDCODE = 399101403 NDOSL_HB5S_LATLON = ( -25.8869335000, 27.7066718333, 1.568221 ) NDOSL_HB5S_TOPO_FRAME = 'NDOSL_HB5S_TOPO' NDOSL_HB5S_TOPO_ID = 399101403 NDOSL_HB5S_UP = 'Z' NDOSL_HB5S_NORTH = 'X' SITES += 'NDOSL_HBK3' NDOSL_HBK3_CENTER = 399 NDOSL_HBK3_FRAME = 'ITRF93' NDOSL_HBK3_IDCODE = 399101324 NDOSL_HBK3_LATLON = ( -25.8867277778, 27.7126000000, 1.549040 ) NDOSL_HBK3_TOPO_FRAME = 'NDOSL_HBK3_TOPO' NDOSL_HBK3_TOPO_ID = 399101324 NDOSL_HBK3_UP = 'Z' NDOSL_HBK3_NORTH = 'X' SITES += 'NDOSL_HBKS' NDOSL_HBKS_CENTER = 399 NDOSL_HBKS_FRAME = 'ITRF93' NDOSL_HBKS_IDCODE = 399101402 NDOSL_HBKS_LATLON = ( -25.8870000000, 27.7120000000, 1.544830 ) NDOSL_HBKS_TOPO_FRAME = 'NDOSL_HBKS_TOPO' NDOSL_HBKS_TOPO_ID = 399101402 NDOSL_HBKS_UP = 'Z' NDOSL_HBKS_NORTH = 'X' SITES += 'NDOSL_HOLF' NDOSL_HOLF_CENTER = 399 NDOSL_HOLF_FRAME = 'ITRF93' NDOSL_HOLF_IDCODE = 399104144 NDOSL_HOLF_LATLON = ( 32.9014638611, 253.9008304444, 1.241500 ) NDOSL_HOLF_TOPO_FRAME = 'NDOSL_HOLF_TOPO' NDOSL_HOLF_TOPO_ID = 399104144 NDOSL_HOLF_UP = 'Z' NDOSL_HOLF_NORTH = 'X' SITES += 'NDOSL_HR1S' NDOSL_HR1S_CENTER = 399 NDOSL_HR1S_FRAME = 'ITRF93' NDOSL_HR1S_IDCODE = 399101718 NDOSL_HR1S_LATLON = ( 37.9454991667, 284.5388644444, -0.018510 ) NDOSL_HR1S_TOPO_FRAME = 'NDOSL_HR1S_TOPO' NDOSL_HR1S_TOPO_ID = 399101718 NDOSL_HR1S_UP = 'Z' NDOSL_HR1S_NORTH = 'X' SITES += 'NDOSL_HR2S' NDOSL_HR2S_CENTER = 399 NDOSL_HR2S_FRAME = 'ITRF93' NDOSL_HR2S_IDCODE = 399101719 NDOSL_HR2S_LATLON = ( 37.9454258333, 284.5379100000, -0.017430 ) NDOSL_HR2S_TOPO_FRAME = 'NDOSL_HR2S_TOPO' NDOSL_HR2S_TOPO_ID = 399101719 NDOSL_HR2S_UP = 'Z' NDOSL_HR2S_NORTH = 'X' SITES += 'NDOSL_HR3S' NDOSL_HR3S_CENTER = 399 NDOSL_HR3S_FRAME = 'ITRF93' NDOSL_HR3S_IDCODE = 399101749 NDOSL_HR3S_LATLON = ( 39.0006027778, 283.1585616667, -0.030420 ) NDOSL_HR3S_TOPO_FRAME = 'NDOSL_HR3S_TOPO' NDOSL_HR3S_TOPO_ID = 399101749 NDOSL_HR3S_UP = 'Z' NDOSL_HR3S_NORTH = 'X' SITES += 'NDOSL_HT2S' NDOSL_HT2S_CENTER = 399 NDOSL_HT2S_FRAME = 'ITRF93' NDOSL_HT2S_IDCODE = 399101373 NDOSL_HT2S_LATLON = ( 21.5689718056, 201.7377211667, 0.319658 ) NDOSL_HT2S_TOPO_FRAME = 'NDOSL_HT2S_TOPO' NDOSL_HT2S_TOPO_ID = 399101373 NDOSL_HT2S_UP = 'Z' NDOSL_HT2S_NORTH = 'X' SITES += 'NDOSL_HTSS' NDOSL_HTSS_CENTER = 399 NDOSL_HTSS_FRAME = 'ITRF93' NDOSL_HTSS_IDCODE = 399101367 NDOSL_HTSS_LATLON = ( 21.5622721944, 201.7579104444, 0.430423 ) NDOSL_HTSS_TOPO_FRAME = 'NDOSL_HTSS_TOPO' NDOSL_HTSS_TOPO_ID = 399101367 NDOSL_HTSS_UP = 'Z' NDOSL_HTSS_NORTH = 'X' SITES += 'NDOSL_HWIS' NDOSL_HWIS_CENTER = 399 NDOSL_HWIS_FRAME = 'ITRF93' NDOSL_HWIS_IDCODE = 399101903 NDOSL_HWIS_LATLON = ( 19.0139045000, 204.3366987500, 0.367200 ) NDOSL_HWIS_TOPO_FRAME = 'NDOSL_HWIS_TOPO' NDOSL_HWIS_TOPO_ID = 399101903 NDOSL_HWIS_UP = 'Z' NDOSL_HWIS_NORTH = 'X' SITES += 'NDOSL_JD2Y' NDOSL_JD2Y_CENTER = 399 NDOSL_JD2Y_FRAME = 'ITRF93' NDOSL_JD2Y_IDCODE = 399101818 NDOSL_JD2Y_LATLON = ( 26.9822298611, 279.8924391944, -0.001960 ) NDOSL_JD2Y_TOPO_FRAME = 'NDOSL_JD2Y_TOPO' NDOSL_JD2Y_TOPO_ID = 399101818 NDOSL_JD2Y_UP = 'Z' NDOSL_JD2Y_NORTH = 'X' SITES += 'NDOSL_JDIQ' NDOSL_JDIQ_CENTER = 399 NDOSL_JDIQ_FRAME = 'ITRF93' NDOSL_JDIQ_IDCODE = 399104248 NDOSL_JDIQ_LATLON = ( 26.9829996944, 279.8917959444, -0.006403 ) NDOSL_JDIQ_TOPO_FRAME = 'NDOSL_JDIQ_TOPO' NDOSL_JDIQ_TOPO_ID = 399104248 NDOSL_JDIQ_UP = 'Z' NDOSL_JDIQ_NORTH = 'X' SITES += 'NDOSL_JDIY' NDOSL_JDIY_CENTER = 399 NDOSL_JDIY_FRAME = 'ITRF93' NDOSL_JDIY_IDCODE = 399101817 NDOSL_JDIY_LATLON = ( 26.9838039444, 279.8912527500, -0.010530 ) NDOSL_JDIY_TOPO_FRAME = 'NDOSL_JDIY_TOPO' NDOSL_JDIY_TOPO_ID = 399101817 NDOSL_JDIY_UP = 'Z' NDOSL_JDIY_NORTH = 'X' SITES += 'NDOSL_JSCJ' NDOSL_JSCJ_CENTER = 399 NDOSL_JSCJ_FRAME = 'ITRF93' NDOSL_JSCJ_IDCODE = 399100291 NDOSL_JSCJ_LATLON = ( 29.5616896111, 264.9100000000, 0.049531 ) NDOSL_JSCJ_TOPO_FRAME = 'NDOSL_JSCJ_TOPO' NDOSL_JSCJ_TOPO_ID = 399100291 NDOSL_JSCJ_UP = 'Z' NDOSL_JSCJ_NORTH = 'X' SITES += 'NDOSL_KA2S' NDOSL_KA2S_CENTER = 399 NDOSL_KA2S_FRAME = 'ITRF93' NDOSL_KA2S_IDCODE = 399101735 NDOSL_KA2S_LATLON = ( 35.7087618611, 139.4917777778, -0.641245 ) NDOSL_KA2S_TOPO_FRAME = 'NDOSL_KA2S_TOPO' NDOSL_KA2S_TOPO_ID = 399101735 NDOSL_KA2S_UP = 'Z' NDOSL_KA2S_NORTH = 'X' SITES += 'NDOSL_KENS' NDOSL_KENS_CENTER = 399 NDOSL_KENS_FRAME = 'ITRF93' NDOSL_KENS_IDCODE = 399104722 NDOSL_KENS_LATLON = ( -2.9955575000, 40.1945050000, 0.012314 ) NDOSL_KENS_TOPO_FRAME = 'NDOSL_KENS_TOPO' NDOSL_KENS_TOPO_ID = 399104722 NDOSL_KENS_UP = 'Z' NDOSL_KENS_NORTH = 'X' SITES += 'NDOSL_KERS' NDOSL_KERS_CENTER = 399 NDOSL_KERS_FRAME = 'ITRF93' NDOSL_KERS_IDCODE = 399104253 NDOSL_KERS_LATLON = ( -49.3529060000, 70.2572820000, 0.082471 ) NDOSL_KERS_TOPO_FRAME = 'NDOSL_KERS_TOPO' NDOSL_KERS_TOPO_ID = 399104253 NDOSL_KERS_UP = 'Z' NDOSL_KERS_NORTH = 'X' SITES += 'NDOSL_KGLQ' NDOSL_KGLQ_CENTER = 399 NDOSL_KGLQ_FRAME = 'ITRF93' NDOSL_KGLQ_IDCODE = 399104261 NDOSL_KGLQ_LATLON = ( -49.3519154444, 70.2559838889, 0.006100 ) NDOSL_KGLQ_TOPO_FRAME = 'NDOSL_KGLQ_TOPO' NDOSL_KGLQ_TOPO_ID = 399104261 NDOSL_KGLQ_UP = 'Z' NDOSL_KGLQ_NORTH = 'X' SITES += 'NDOSL_KI2S' NDOSL_KI2S_CENTER = 399 NDOSL_KI2S_FRAME = 'ITRF93' NDOSL_KI2S_IDCODE = 399101727 NDOSL_KI2S_LATLON = ( 67.8571251667, 20.9643416944, 0.402275 ) NDOSL_KI2S_TOPO_FRAME = 'NDOSL_KI2S_TOPO' NDOSL_KI2S_TOPO_ID = 399101727 NDOSL_KI2S_UP = 'Z' NDOSL_KI2S_NORTH = 'X' SITES += 'NDOSL_KICS' NDOSL_KICS_CENTER = 399 NDOSL_KICS_FRAME = 'ITRF93' NDOSL_KICS_IDCODE = 399104255 NDOSL_KICS_LATLON = ( 67.8842320000, 21.0607690000, 0.440604 ) NDOSL_KICS_TOPO_FRAME = 'NDOSL_KICS_TOPO' NDOSL_KICS_TOPO_ID = 399104255 NDOSL_KICS_UP = 'Z' NDOSL_KICS_NORTH = 'X' SITES += 'NDOSL_KILS' NDOSL_KILS_CENTER = 399 NDOSL_KILS_FRAME = 'ITRF93' NDOSL_KILS_IDCODE = 399104256 NDOSL_KILS_LATLON = ( 67.8765320000, 21.0623370000, 0.514892 ) NDOSL_KILS_TOPO_FRAME = 'NDOSL_KILS_TOPO' NDOSL_KILS_TOPO_ID = 399104256 NDOSL_KILS_UP = 'Z' NDOSL_KILS_NORTH = 'X' SITES += 'NDOSL_KIXS' NDOSL_KIXS_CENTER = 399 NDOSL_KIXS_FRAME = 'ITRF93' NDOSL_KIXS_IDCODE = 399104257 NDOSL_KIXS_LATLON = ( 67.8781570000, 21.0633980000, 0.508573 ) NDOSL_KIXS_TOPO_FRAME = 'NDOSL_KIXS_TOPO' NDOSL_KIXS_TOPO_ID = 399104257 NDOSL_KIXS_UP = 'Z' NDOSL_KIXS_NORTH = 'X' SITES += 'NDOSL_KLMS' NDOSL_KLMS_CENTER = 399 NDOSL_KLMS_FRAME = 'ITRF93' NDOSL_KLMS_IDCODE = 399101710 NDOSL_KLMS_LATLON = ( 78.2302216667, 15.3981381389, 0.498520 ) NDOSL_KLMS_TOPO_FRAME = 'NDOSL_KLMS_TOPO' NDOSL_KLMS_TOPO_ID = 399101710 NDOSL_KLMS_UP = 'Z' NDOSL_KLMS_NORTH = 'X' SITES += 'NDOSL_KM2F' NDOSL_KM2F_CENTER = 399 NDOSL_KM2F_FRAME = 'ITRF93' NDOSL_KM2F_IDCODE = 399104971 NDOSL_KM2F_LATLON = ( 9.3954288056, 167.4792883333, 0.062860 ) NDOSL_KM2F_TOPO_FRAME = 'NDOSL_KM2F_TOPO' NDOSL_KM2F_TOPO_ID = 399104971 NDOSL_KM2F_UP = 'Z' NDOSL_KM2F_NORTH = 'X' SITES += 'NDOSL_KMPF' NDOSL_KMPF_CENTER = 399 NDOSL_KMPF_FRAME = 'ITRF93' NDOSL_KMPF_IDCODE = 399104110 NDOSL_KMPF_LATLON = ( 8.7216769167, 167.7264900556, 0.039263 ) NDOSL_KMPF_TOPO_FRAME = 'NDOSL_KMPF_TOPO' NDOSL_KMPF_TOPO_ID = 399104110 NDOSL_KMPF_UP = 'Z' NDOSL_KMPF_NORTH = 'X' SITES += 'NDOSL_KMQF' NDOSL_KMQF_CENTER = 399 NDOSL_KMQF_FRAME = 'ITRF93' NDOSL_KMQF_IDCODE = 399104111 NDOSL_KMQF_LATLON = ( 8.7216353889, 167.7266220000, 0.039264 ) NDOSL_KMQF_TOPO_FRAME = 'NDOSL_KMQF_TOPO' NDOSL_KMQF_TOPO_ID = 399104111 NDOSL_KMQF_UP = 'Z' NDOSL_KMQF_NORTH = 'X' SITES += 'NDOSL_KMRF' NDOSL_KMRF_CENTER = 399 NDOSL_KMRF_FRAME = 'ITRF93' NDOSL_KMRF_IDCODE = 399104968 NDOSL_KMRF_LATLON = ( 9.3987471111, 167.4821481944, 0.057370 ) NDOSL_KMRF_TOPO_FRAME = 'NDOSL_KMRF_TOPO' NDOSL_KMRF_TOPO_ID = 399104968 NDOSL_KMRF_UP = 'Z' NDOSL_KMRF_NORTH = 'X' SITES += 'NDOSL_KMRQ' NDOSL_KMRQ_CENTER = 399 NDOSL_KMRQ_FRAME = 'ITRF93' NDOSL_KMRQ_IDCODE = 399104969 NDOSL_KMRQ_LATLON = ( 9.3985995833, 167.4828493611, 0.042480 ) NDOSL_KMRQ_TOPO_FRAME = 'NDOSL_KMRQ_TOPO' NDOSL_KMRQ_TOPO_ID = 399104969 NDOSL_KMRQ_UP = 'Z' NDOSL_KMRQ_NORTH = 'X' SITES += 'NDOSL_KMRT' NDOSL_KMRT_CENTER = 399 NDOSL_KMRT_FRAME = 'ITRF93' NDOSL_KMRT_IDCODE = 399104970 NDOSL_KMRT_LATLON = ( 8.7195454167, 167.7185242778, 0.059040 ) NDOSL_KMRT_TOPO_FRAME = 'NDOSL_KMRT_TOPO' NDOSL_KMRT_TOPO_ID = 399104970 NDOSL_KMRT_UP = 'Z' NDOSL_KMRT_NORTH = 'X' SITES += 'NDOSL_KPTQ' NDOSL_KPTQ_CENTER = 399 NDOSL_KPTQ_FRAME = 'ITRF93' NDOSL_KPTQ_IDCODE = 399104282 NDOSL_KPTQ_LATLON = ( 21.5721197222, 201.7334146667, 0.301320 ) NDOSL_KPTQ_TOPO_FRAME = 'NDOSL_KPTQ_TOPO' NDOSL_KPTQ_TOPO_ID = 399104282 NDOSL_KPTQ_UP = 'Z' NDOSL_KPTQ_NORTH = 'X' SITES += 'NDOSL_KRCS' NDOSL_KRCS_CENTER = 399 NDOSL_KRCS_FRAME = 'ITRF93' NDOSL_KRCS_IDCODE = 399101797 NDOSL_KRCS_LATLON = ( -12.6940000000, 141.9306666667, 0.021000 ) NDOSL_KRCS_TOPO_FRAME = 'NDOSL_KRCS_TOPO' NDOSL_KRCS_TOPO_ID = 399101797 NDOSL_KRCS_UP = 'Z' NDOSL_KRCS_NORTH = 'X' SITES += 'NDOSL_KRUF' NDOSL_KRUF_CENTER = 399 NDOSL_KRUF_FRAME = 'ITRF93' NDOSL_KRUF_IDCODE = 399108501 NDOSL_KRUF_LATLON = ( 5.1140064167, 307.3550100833, 0.148008 ) NDOSL_KRUF_TOPO_FRAME = 'NDOSL_KRUF_TOPO' NDOSL_KRUF_TOPO_ID = 399108501 NDOSL_KRUF_UP = 'Z' NDOSL_KRUF_NORTH = 'X' SITES += 'NDOSL_KRUS' NDOSL_KRUS_CENTER = 399 NDOSL_KRUS_FRAME = 'ITRF93' NDOSL_KRUS_IDCODE = 399104258 NDOSL_KRUS_LATLON = ( 5.0988480000, 307.3601280000, 0.110039 ) NDOSL_KRUS_TOPO_FRAME = 'NDOSL_KRUS_TOPO' NDOSL_KRUS_TOPO_ID = 399104258 NDOSL_KRUS_UP = 'Z' NDOSL_KRUS_NORTH = 'X' SITES += 'NDOSL_KSWC' NDOSL_KSWC_CENTER = 399 NDOSL_KSWC_FRAME = 'ITRF93' NDOSL_KSWC_IDCODE = 399101855 NDOSL_KSWC_LATLON = ( 33.4280555556, 126.2956388889, 0.084000 ) NDOSL_KSWC_TOPO_FRAME = 'NDOSL_KSWC_TOPO' NDOSL_KSWC_TOPO_ID = 399101855 NDOSL_KSWC_UP = 'Z' NDOSL_KSWC_NORTH = 'X' SITES += 'NDOSL_KU1S' NDOSL_KU1S_CENTER = 399 NDOSL_KU1S_FRAME = 'ITRF93' NDOSL_KU1S_IDCODE = 399101905 NDOSL_KU1S_LATLON = ( 67.8895583333, 21.0656547222, 0.400400 ) NDOSL_KU1S_TOPO_FRAME = 'NDOSL_KU1S_TOPO' NDOSL_KU1S_TOPO_ID = 399101905 NDOSL_KU1S_UP = 'Z' NDOSL_KU1S_NORTH = 'X' SITES += 'NDOSL_KU2S' NDOSL_KU2S_CENTER = 399 NDOSL_KU2S_FRAME = 'ITRF93' NDOSL_KU2S_IDCODE = 399101906 NDOSL_KU2S_LATLON = ( 67.8831825000, 21.0604483333, 0.428200 ) NDOSL_KU2S_TOPO_FRAME = 'NDOSL_KU2S_TOPO' NDOSL_KU2S_TOPO_ID = 399101906 NDOSL_KU2S_UP = 'Z' NDOSL_KU2S_NORTH = 'X' SITES += 'NDOSL_KU3S' NDOSL_KU3S_CENTER = 399 NDOSL_KU3S_FRAME = 'ITRF93' NDOSL_KU3S_IDCODE = 399101909 NDOSL_KU3S_LATLON = ( 67.8790708333, 21.0380000000, 0.527000 ) NDOSL_KU3S_TOPO_FRAME = 'NDOSL_KU3S_TOPO' NDOSL_KU3S_TOPO_ID = 399101909 NDOSL_KU3S_UP = 'Z' NDOSL_KU3S_NORTH = 'X' SITES += 'NDOSL_KUSS' NDOSL_KUSS_CENTER = 399 NDOSL_KUSS_FRAME = 'ITRF93' NDOSL_KUSS_IDCODE = 399104055 NDOSL_KUSS_LATLON = ( 28.5420649167, 279.3570476389, 0.009830 ) NDOSL_KUSS_TOPO_FRAME = 'NDOSL_KUSS_TOPO' NDOSL_KUSS_TOPO_ID = 399104055 NDOSL_KUSS_UP = 'Z' NDOSL_KUSS_NORTH = 'X' SITES += 'NDOSL_LANS' NDOSL_LANS_CENTER = 399 NDOSL_LANS_FRAME = 'ITRF93' NDOSL_LANS_IDCODE = 399101728 NDOSL_LANS_LATLON = ( 48.7514153611, 356.5300000000, 0.110676 ) NDOSL_LANS_TOPO_FRAME = 'NDOSL_LANS_TOPO' NDOSL_LANS_TOPO_ID = 399101728 NDOSL_LANS_UP = 'Z' NDOSL_LANS_NORTH = 'X' SITES += 'NDOSL_LBVS' NDOSL_LBVS_CENTER = 399 NDOSL_LBVS_FRAME = 'ITRF93' NDOSL_LBVS_IDCODE = 399104250 NDOSL_LBVS_LATLON = ( 0.3546297778, 9.6753002778, 0.111269 ) NDOSL_LBVS_TOPO_FRAME = 'NDOSL_LBVS_TOPO' NDOSL_LBVS_TOPO_ID = 399104250 NDOSL_LBVS_UP = 'Z' NDOSL_LBVS_NORTH = 'X' SITES += 'NDOSL_LE1S' NDOSL_LE1S_CENTER = 399 NDOSL_LE1S_FRAME = 'ITRF93' NDOSL_LE1S_IDCODE = 399101721 NDOSL_LE1S_LATLON = ( 65.1168516667, 212.5377450000, 0.414000 ) NDOSL_LE1S_TOPO_FRAME = 'NDOSL_LE1S_TOPO' NDOSL_LE1S_TOPO_ID = 399101721 NDOSL_LE1S_UP = 'Z' NDOSL_LE1S_NORTH = 'X' SITES += 'NDOSL_LE2S' NDOSL_LE2S_CENTER = 399 NDOSL_LE2S_FRAME = 'ITRF93' NDOSL_LE2S_IDCODE = 399101722 NDOSL_LE2S_LATLON = ( 37.9235294444, 284.5238608333, -0.033501 ) NDOSL_LE2S_TOPO_FRAME = 'NDOSL_LE2S_TOPO' NDOSL_LE2S_TOPO_ID = 399101722 NDOSL_LE2S_UP = 'Z' NDOSL_LE2S_NORTH = 'X' SITES += 'NDOSL_MAD8' NDOSL_MAD8_CENTER = 399 NDOSL_MAD8_FRAME = 'ITRF93' NDOSL_MAD8_IDCODE = 399101307 NDOSL_MAD8_LATLON = ( 40.4554493889, 355.8316150278, 0.837886 ) NDOSL_MAD8_TOPO_FRAME = 'NDOSL_MAD8_TOPO' NDOSL_MAD8_TOPO_ID = 399101307 NDOSL_MAD8_UP = 'Z' NDOSL_MAD8_NORTH = 'X' SITES += 'NDOSL_MC1S' NDOSL_MC1S_CENTER = 399 NDOSL_MC1S_FRAME = 'ITRF93' NDOSL_MC1S_IDCODE = 399104848 NDOSL_MC1S_LATLON = ( -77.8391295000, 166.6670823333, 0.153000 ) NDOSL_MC1S_TOPO_FRAME = 'NDOSL_MC1S_TOPO' NDOSL_MC1S_TOPO_ID = 399104848 NDOSL_MC1S_UP = 'Z' NDOSL_MC1S_NORTH = 'X' SITES += 'NDOSL_MCMS' NDOSL_MCMS_CENTER = 399 NDOSL_MCMS_FRAME = 'ITRF93' NDOSL_MCMS_IDCODE = 399104847 NDOSL_MCMS_LATLON = ( -77.8000000000, 166.4000000000, 0.020000 ) NDOSL_MCMS_TOPO_FRAME = 'NDOSL_MCMS_TOPO' NDOSL_MCMS_TOPO_ID = 399104847 NDOSL_MCMS_UP = 'Z' NDOSL_MCMS_NORTH = 'X' SITES += 'NDOSL_MDLS' NDOSL_MDLS_CENTER = 399 NDOSL_MDLS_FRAME = 'ITRF93' NDOSL_MDLS_IDCODE = 399101904 NDOSL_MDLS_LATLON = ( 39.1673611111, 283.1012222222, 0.146400 ) NDOSL_MDLS_TOPO_FRAME = 'NDOSL_MDLS_TOPO' NDOSL_MDLS_TOPO_ID = 399101904 NDOSL_MDLS_UP = 'Z' NDOSL_MDLS_NORTH = 'X' SITES += 'NDOSL_MG1D' NDOSL_MG1D_CENTER = 399 NDOSL_MG1D_FRAME = 'ITRF93' NDOSL_MG1D_IDCODE = 399101574 NDOSL_MG1D_LATLON = ( -35.7759702222, 290.6018184444, 1.571768 ) NDOSL_MG1D_TOPO_FRAME = 'NDOSL_MG1D_TOPO' NDOSL_MG1D_TOPO_ID = 399101574 NDOSL_MG1D_UP = 'Z' NDOSL_MG1D_NORTH = 'X' SITES += 'NDOSL_MIL3' NDOSL_MIL3_CENTER = 399 NDOSL_MIL3_FRAME = 'ITRF93' NDOSL_MIL3_IDCODE = 399101301 NDOSL_MIL3_LATLON = ( 28.5081238889, 279.3066000556, -0.025950 ) NDOSL_MIL3_TOPO_FRAME = 'NDOSL_MIL3_TOPO' NDOSL_MIL3_TOPO_ID = 399101301 NDOSL_MIL3_UP = 'Z' NDOSL_MIL3_NORTH = 'X' SITES += 'NDOSL_MILA' NDOSL_MILA_CENTER = 399 NDOSL_MILA_FRAME = 'ITRF93' NDOSL_MILA_IDCODE = 399101901 NDOSL_MILA_LATLON = ( 28.5081602500, 279.3072472778, -0.027340 ) NDOSL_MILA_TOPO_FRAME = 'NDOSL_MILA_TOPO' NDOSL_MILA_TOPO_ID = 399101901 NDOSL_MILA_UP = 'Z' NDOSL_MILA_NORTH = 'X' SITES += 'NDOSL_MILJ' NDOSL_MILJ_CENTER = 399 NDOSL_MILJ_FRAME = 'ITRF93' NDOSL_MILJ_IDCODE = 399100292 NDOSL_MILJ_LATLON = ( 28.5059894722, 279.3069871111, -0.021310 ) NDOSL_MILJ_TOPO_FRAME = 'NDOSL_MILJ_TOPO' NDOSL_MILJ_TOPO_ID = 399100292 NDOSL_MILJ_UP = 'Z' NDOSL_MILJ_NORTH = 'X' SITES += 'NDOSL_MIMF' NDOSL_MIMF_CENTER = 399 NDOSL_MIMF_FRAME = 'ITRF93' NDOSL_MIMF_IDCODE = 399104220 NDOSL_MIMF_LATLON = ( 28.6259431944, 279.3172061944, -0.018120 ) NDOSL_MIMF_TOPO_FRAME = 'NDOSL_MIMF_TOPO' NDOSL_MIMF_TOPO_ID = 399104220 NDOSL_MIMF_UP = 'Z' NDOSL_MIMF_NORTH = 'X' SITES += 'NDOSL_MLAQ' NDOSL_MLAQ_CENTER = 399 NDOSL_MLAQ_FRAME = 'ITRF93' NDOSL_MLAQ_IDCODE = 399104084 NDOSL_MLAQ_LATLON = ( 28.4247111944, 279.3356123333, -0.017350 ) NDOSL_MLAQ_TOPO_FRAME = 'NDOSL_MLAQ_TOPO' NDOSL_MLAQ_TOPO_ID = 399104084 NDOSL_MLAQ_UP = 'Z' NDOSL_MLAQ_NORTH = 'X' SITES += 'NDOSL_MMTF' NDOSL_MMTF_CENTER = 399 NDOSL_MMTF_FRAME = 'ITRF93' NDOSL_MMTF_IDCODE = 399104347 NDOSL_MMTF_LATLON = ( 28.4785768056, 279.3252113611, -0.012298 ) NDOSL_MMTF_TOPO_FRAME = 'NDOSL_MMTF_TOPO' NDOSL_MMTF_TOPO_ID = 399104347 NDOSL_MMTF_UP = 'Z' NDOSL_MMTF_NORTH = 'X' SITES += 'NDOSL_MPLS' NDOSL_MPLS_CENTER = 399 NDOSL_MPLS_FRAME = 'ITRF93' NDOSL_MPLS_IDCODE = 399101967 NDOSL_MPLS_LATLON = ( 27.7628920000, 344.3662000000, 0.204900 ) NDOSL_MPLS_TOPO_FRAME = 'NDOSL_MPLS_TOPO' NDOSL_MPLS_TOPO_ID = 399101967 NDOSL_MPLS_UP = 'Z' NDOSL_MPLS_NORTH = 'X' SITES += 'NDOSL_MTLF' NDOSL_MTLF_CENTER = 399 NDOSL_MTLF_FRAME = 'ITRF93' NDOSL_MTLF_IDCODE = 399104155 NDOSL_MTLF_LATLON = ( 32.4416632222, 249.2111969444, 2.772820 ) NDOSL_MTLF_TOPO_FRAME = 'NDOSL_MTLF_TOPO' NDOSL_MTLF_TOPO_ID = 399104155 NDOSL_MTLF_UP = 'Z' NDOSL_MTLF_NORTH = 'X' SITES += 'NDOSL_MTLS' NDOSL_MTLS_CENTER = 399 NDOSL_MTLS_FRAME = 'ITRF93' NDOSL_MTLS_IDCODE = 399104156 NDOSL_MTLS_LATLON = ( 32.4421365556, 249.2105493611, 2.769192 ) NDOSL_MTLS_TOPO_FRAME = 'NDOSL_MTLS_TOPO' NDOSL_MTLS_TOPO_ID = 399104156 NDOSL_MTLS_UP = 'Z' NDOSL_MTLS_NORTH = 'X' SITES += 'NDOSL_NH2S' NDOSL_NH2S_CENTER = 399 NDOSL_NH2S_FRAME = 'ITRF93' NDOSL_NH2S_IDCODE = 399101374 NDOSL_NH2S_LATLON = ( 42.9447416667, 288.3696782778, 0.193259 ) NDOSL_NH2S_TOPO_FRAME = 'NDOSL_NH2S_TOPO' NDOSL_NH2S_TOPO_ID = 399101374 NDOSL_NH2S_UP = 'Z' NDOSL_NH2S_NORTH = 'X' SITES += 'NDOSL_NHSS' NDOSL_NHSS_CENTER = 399 NDOSL_NHSS_FRAME = 'ITRF93' NDOSL_NHSS_IDCODE = 399101366 NDOSL_NHSS_LATLON = ( 42.9478213333, 288.3734374722, 0.203280 ) NDOSL_NHSS_TOPO_FRAME = 'NDOSL_NHSS_TOPO' NDOSL_NHSS_TOPO_ID = 399101366 NDOSL_NHSS_UP = 'Z' NDOSL_NHSS_NORTH = 'X' SITES += 'NDOSL_NN1D' NDOSL_NN1D_CENTER = 399 NDOSL_NN1D_FRAME = 'ITRF93' NDOSL_NN1D_IDCODE = 399101573 NDOSL_NN1D_LATLON = ( -31.0482181944, 116.1915059167, 0.252257 ) NDOSL_NN1D_TOPO_FRAME = 'NDOSL_NN1D_TOPO' NDOSL_NN1D_TOPO_ID = 399101573 NDOSL_NN1D_UP = 'Z' NDOSL_NN1D_NORTH = 'X' SITES += 'NDOSL_NSGS' NDOSL_NSGS_CENTER = 399 NDOSL_NSGS_FRAME = 'ITRF93' NDOSL_NSGS_IDCODE = 399101724 NDOSL_NSGS_LATLON = ( 53.3297222222, 13.0700000000, 0.115000 ) NDOSL_NSGS_TOPO_FRAME = 'NDOSL_NSGS_TOPO' NDOSL_NSGS_TOPO_ID = 399101724 NDOSL_NSGS_UP = 'Z' NDOSL_NSGS_NORTH = 'X' SITES += 'NDOSL_ORR3' NDOSL_ORR3_CENTER = 399 NDOSL_ORR3_FRAME = 'ITRF93' NDOSL_ORR3_IDCODE = 399101320 NDOSL_ORR3_LATLON = ( -35.6278928889, 148.9570232222, 0.951982 ) NDOSL_ORR3_TOPO_FRAME = 'NDOSL_ORR3_TOPO' NDOSL_ORR3_TOPO_ID = 399101320 NDOSL_ORR3_UP = 'Z' NDOSL_ORR3_NORTH = 'X' SITES += 'NDOSL_OTSS' NDOSL_OTSS_CENTER = 399 NDOSL_OTSS_FRAME = 'ITRF93' NDOSL_OTSS_IDCODE = 399101364 NDOSL_OTSS_LATLON = ( 51.1141173333, 359.1051029444, -0.018852 ) NDOSL_OTSS_TOPO_FRAME = 'NDOSL_OTSS_TOPO' NDOSL_OTSS_TOPO_ID = 399101364 NDOSL_OTSS_UP = 'Z' NDOSL_OTSS_NORTH = 'X' SITES += 'NDOSL_PA2Q' NDOSL_PA2Q_CENTER = 399 NDOSL_PA2Q_FRAME = 'ITRF93' NDOSL_PA2Q_IDCODE = 399104089 NDOSL_PA2Q_LATLON = ( 28.2273281667, 279.3939018056, -0.014380 ) NDOSL_PA2Q_TOPO_FRAME = 'NDOSL_PA2Q_TOPO' NDOSL_PA2Q_TOPO_ID = 399104089 NDOSL_PA2Q_UP = 'Z' NDOSL_PA2Q_NORTH = 'X' SITES += 'NDOSL_PATQ' NDOSL_PATQ_CENTER = 399 NDOSL_PATQ_FRAME = 'ITRF93' NDOSL_PATQ_IDCODE = 399104060 NDOSL_PATQ_LATLON = ( 28.2264024167, 279.4007236389, -0.013760 ) NDOSL_PATQ_TOPO_FRAME = 'NDOSL_PATQ_TOPO' NDOSL_PATQ_TOPO_ID = 399104060 NDOSL_PATQ_UP = 'Z' NDOSL_PATQ_NORTH = 'X' SITES += 'NDOSL_PDLS' NDOSL_PDLS_CENTER = 399 NDOSL_PDLS_FRAME = 'ITRF93' NDOSL_PDLS_IDCODE = 399104054 NDOSL_PDLS_LATLON = ( 29.0666474444, 279.0869767500, 0.009845 ) NDOSL_PDLS_TOPO_FRAME = 'NDOSL_PDLS_TOPO' NDOSL_PDLS_TOPO_ID = 399104054 NDOSL_PDLS_UP = 'Z' NDOSL_PDLS_NORTH = 'X' SITES += 'NDOSL_PFTQ' NDOSL_PFTQ_CENTER = 399 NDOSL_PFTQ_FRAME = 'ITRF93' NDOSL_PFTQ_IDCODE = 399104864 NDOSL_PFTQ_LATLON = ( 65.1167930833, 212.5367091667, 0.413284 ) NDOSL_PFTQ_TOPO_FRAME = 'NDOSL_PFTQ_TOPO' NDOSL_PFTQ_TOPO_ID = 399104864 NDOSL_PFTQ_UP = 'Z' NDOSL_PFTQ_NORTH = 'X' SITES += 'NDOSL_PFTS' NDOSL_PFTS_CENTER = 399 NDOSL_PFTS_FRAME = 'ITRF93' NDOSL_PFTS_IDCODE = 399104864 NDOSL_PFTS_LATLON = ( 65.1167930833, 212.5367091667, 0.413284 ) NDOSL_PFTS_TOPO_FRAME = 'NDOSL_PFTS_TOPO' NDOSL_PFTS_TOPO_ID = 399104864 NDOSL_PFTS_UP = 'Z' NDOSL_PFTS_NORTH = 'X' SITES += 'NDOSL_PIOD' NDOSL_PIOD_CENTER = 399 NDOSL_PIOD_FRAME = 'ITRF93' NDOSL_PIOD_IDCODE = 399101511 NDOSL_PIOD_LATLON = ( 35.3895182778, 243.1506229444, 1.004213 ) NDOSL_PIOD_TOPO_FRAME = 'NDOSL_PIOD_TOPO' NDOSL_PIOD_TOPO_ID = 399101511 NDOSL_PIOD_UP = 'Z' NDOSL_PIOD_NORTH = 'X' SITES += 'NDOSL_PM2F' NDOSL_PM2F_CENTER = 399 NDOSL_PM2F_FRAME = 'ITRF93' NDOSL_PM2F_IDCODE = 399104445 NDOSL_PM2F_LATLON = ( 34.1225029167, 240.8462014444, -0.022200 ) NDOSL_PM2F_TOPO_FRAME = 'NDOSL_PM2F_TOPO' NDOSL_PM2F_TOPO_ID = 399104445 NDOSL_PM2F_UP = 'Z' NDOSL_PM2F_NORTH = 'X' SITES += 'NDOSL_PM3F' NDOSL_PM3F_CENTER = 399 NDOSL_PM3F_FRAME = 'ITRF93' NDOSL_PM3F_IDCODE = 399104446 NDOSL_PM3F_LATLON = ( 34.1228877222, 240.8452325833, -0.021670 ) NDOSL_PM3F_TOPO_FRAME = 'NDOSL_PM3F_TOPO' NDOSL_PM3F_TOPO_ID = 399104446 NDOSL_PM3F_UP = 'Z' NDOSL_PM3F_NORTH = 'X' SITES += 'NDOSL_PM4F' NDOSL_PM4F_CENTER = 399 NDOSL_PM4F_FRAME = 'ITRF93' NDOSL_PM4F_IDCODE = 399104441 NDOSL_PM4F_LATLON = ( 34.1221182500, 240.8471698611, -0.022190 ) NDOSL_PM4F_TOPO_FRAME = 'NDOSL_PM4F_TOPO' NDOSL_PM4F_TOPO_ID = 399104441 NDOSL_PM4F_UP = 'Z' NDOSL_PM4F_NORTH = 'X' SITES += 'NDOSL_PMKS' NDOSL_PMKS_CENTER = 399 NDOSL_PMKS_FRAME = 'ITRF93' NDOSL_PMKS_IDCODE = 399101729 NDOSL_PMKS_LATLON = ( 38.5577105278, 282.9422587778, 0.041940 ) NDOSL_PMKS_TOPO_FRAME = 'NDOSL_PMKS_TOPO' NDOSL_PMKS_TOPO_ID = 399101729 NDOSL_PMKS_UP = 'Z' NDOSL_PMKS_NORTH = 'X' SITES += 'NDOSL_PP2F' NDOSL_PP2F_CENTER = 399 NDOSL_PP2F_FRAME = 'ITRF93' NDOSL_PP2F_IDCODE = 399107399 NDOSL_PP2F_LATLON = ( 37.4968543611, 237.5033161111, 0.003780 ) NDOSL_PP2F_TOPO_FRAME = 'NDOSL_PP2F_TOPO' NDOSL_PP2F_TOPO_ID = 399107399 NDOSL_PP2F_UP = 'Z' NDOSL_PP2F_NORTH = 'X' SITES += 'NDOSL_PPTF' NDOSL_PPTF_CENTER = 399 NDOSL_PPTF_FRAME = 'ITRF93' NDOSL_PPTF_IDCODE = 399104240 NDOSL_PPTF_LATLON = ( 37.4976966667, 237.5013010278, 0.015049 ) NDOSL_PPTF_TOPO_FRAME = 'NDOSL_PPTF_TOPO' NDOSL_PPTF_TOPO_ID = 399104240 NDOSL_PPTF_UP = 'Z' NDOSL_PPTF_NORTH = 'X' SITES += 'NDOSL_PPTQ' NDOSL_PPTQ_CENTER = 399 NDOSL_PPTQ_FRAME = 'ITRF93' NDOSL_PPTQ_IDCODE = 399104260 NDOSL_PPTQ_LATLON = ( 37.4978169167, 237.5002852778, 0.020150 ) NDOSL_PPTQ_TOPO_FRAME = 'NDOSL_PPTQ_TOPO' NDOSL_PPTQ_TOPO_ID = 399104260 NDOSL_PPTQ_UP = 'Z' NDOSL_PPTQ_NORTH = 'X' SITES += 'NDOSL_PPTY' NDOSL_PPTY_CENTER = 399 NDOSL_PPTY_FRAME = 'ITRF93' NDOSL_PPTY_IDCODE = 399104216 NDOSL_PPTY_LATLON = ( 37.4977741111, 237.5008192778, 0.027690 ) NDOSL_PPTY_TOPO_FRAME = 'NDOSL_PPTY_TOPO' NDOSL_PPTY_TOPO_ID = 399104216 NDOSL_PPTY_UP = 'Z' NDOSL_PPTY_NORTH = 'X' SITES += 'NDOSL_PRTS' NDOSL_PRTS_CENTER = 399 NDOSL_PRTS_FRAME = 'ITRF93' NDOSL_PRTS_IDCODE = 399101342 NDOSL_PRTS_LATLON = ( -31.8020000000, 115.8850000000, 0.022160 ) NDOSL_PRTS_TOPO_FRAME = 'NDOSL_PRTS_TOPO' NDOSL_PRTS_TOPO_ID = 399101342 NDOSL_PRTS_UP = 'Z' NDOSL_PRTS_NORTH = 'X' SITES += 'NDOSL_RALS' NDOSL_RALS_CENTER = 399 NDOSL_RALS_FRAME = 'ITRF93' NDOSL_RALS_IDCODE = 399101700 NDOSL_RALS_LATLON = ( 51.5720260000, 358.6885361111, 0.163120 ) NDOSL_RALS_TOPO_FRAME = 'NDOSL_RALS_TOPO' NDOSL_RALS_TOPO_ID = 399101700 NDOSL_RALS_UP = 'Z' NDOSL_RALS_NORTH = 'X' SITES += 'NDOSL_RGTS' NDOSL_RGTS_CENTER = 399 NDOSL_RGTS_FRAME = 'ITRF93' NDOSL_RGTS_IDCODE = 399101963 NDOSL_RGTS_LATLON = ( -35.4045363333, 148.9824183056, 0.663255 ) NDOSL_RGTS_TOPO_FRAME = 'NDOSL_RGTS_TOPO' NDOSL_RGTS_TOPO_ID = 399101963 NDOSL_RGTS_UP = 'Z' NDOSL_RGTS_NORTH = 'X' SITES += 'NDOSL_RTKS' NDOSL_RTKS_CENTER = 399 NDOSL_RTKS_FRAME = 'ITRF93' NDOSL_RTKS_IDCODE = 399101964 NDOSL_RTKS_LATLON = ( -35.4047449444, 148.9826048611, 0.661430 ) NDOSL_RTKS_TOPO_FRAME = 'NDOSL_RTKS_TOPO' NDOSL_RTKS_TOPO_ID = 399101964 NDOSL_RTKS_UP = 'Z' NDOSL_RTKS_NORTH = 'X' SITES += 'NDOSL_S22S' NDOSL_S22S_CENTER = 399 NDOSL_S22S_FRAME = 'ITRF93' NDOSL_S22S_IDCODE = 399101734 NDOSL_S22S_LATLON = ( 78.2329076111, 15.3817730000, 0.481103 ) NDOSL_S22S_TOPO_FRAME = 'NDOSL_S22S_TOPO' NDOSL_S22S_TOPO_ID = 399101734 NDOSL_S22S_UP = 'Z' NDOSL_S22S_NORTH = 'X' SITES += 'NDOSL_SARS' NDOSL_SARS_CENTER = 399 NDOSL_SARS_FRAME = 'ITRF93' NDOSL_SARS_IDCODE = 399101739 NDOSL_SARS_LATLON = ( 17.6670000000, 53.8830000000, 0.030480 ) NDOSL_SARS_TOPO_FRAME = 'NDOSL_SARS_TOPO' NDOSL_SARS_TOPO_ID = 399101739 NDOSL_SARS_UP = 'Z' NDOSL_SARS_NORTH = 'X' SITES += 'NDOSL_SEYS' NDOSL_SEYS_CENTER = 399 NDOSL_SEYS_FRAME = 'ITRF93' NDOSL_SEYS_IDCODE = 399104071 NDOSL_SEYS_LATLON = ( -4.6717481111, 55.4778205278, 0.560495 ) NDOSL_SEYS_TOPO_FRAME = 'NDOSL_SEYS_TOPO' NDOSL_SEYS_TOPO_ID = 399104071 NDOSL_SEYS_UP = 'Z' NDOSL_SEYS_NORTH = 'X' SITES += 'NDOSL_SF1S' NDOSL_SF1S_CENTER = 399 NDOSL_SF1S_FRAME = 'ITRF93' NDOSL_SF1S_IDCODE = 399101703 NDOSL_SF1S_LATLON = ( 43.7360726389, 263.3774853889, 0.468752 ) NDOSL_SF1S_TOPO_FRAME = 'NDOSL_SF1S_TOPO' NDOSL_SF1S_TOPO_ID = 399101703 NDOSL_SF1S_UP = 'Z' NDOSL_SF1S_NORTH = 'X' SITES += 'NDOSL_SF2S' NDOSL_SF2S_CENTER = 399 NDOSL_SF2S_FRAME = 'ITRF93' NDOSL_SF2S_IDCODE = 399101716 NDOSL_SF2S_LATLON = ( 43.7342866667, 263.3805622222, 0.459336 ) NDOSL_SF2S_TOPO_FRAME = 'NDOSL_SF2S_TOPO' NDOSL_SF2S_TOPO_ID = 399101716 NDOSL_SF2S_UP = 'Z' NDOSL_SF2S_NORTH = 'X' SITES += 'NDOSL_SG1S' NDOSL_SG1S_CENTER = 399 NDOSL_SG1S_FRAME = 'ITRF93' NDOSL_SG1S_IDCODE = 399101702 NDOSL_SG1S_LATLON = ( 78.2307666944, 15.3895336944, 0.500280 ) NDOSL_SG1S_TOPO_FRAME = 'NDOSL_SG1S_TOPO' NDOSL_SG1S_TOPO_ID = 399101702 NDOSL_SG1S_UP = 'Z' NDOSL_SG1S_NORTH = 'X' SITES += 'NDOSL_SG3S' NDOSL_SG3S_CENTER = 399 NDOSL_SG3S_FRAME = 'ITRF93' NDOSL_SG3S_IDCODE = 399101733 NDOSL_SG3S_LATLON = ( 78.2297350000, 15.4080958333, 0.501378 ) NDOSL_SG3S_TOPO_FRAME = 'NDOSL_SG3S_TOPO' NDOSL_SG3S_TOPO_ID = 399101733 NDOSL_SG3S_UP = 'Z' NDOSL_SG3S_NORTH = 'X' SITES += 'NDOSL_SG4S' NDOSL_SG4S_CENTER = 399 NDOSL_SG4S_FRAME = 'ITRF93' NDOSL_SG4S_IDCODE = 399101723 NDOSL_SG4S_LATLON = ( 78.2280230000, 15.4096672222, 0.508591 ) NDOSL_SG4S_TOPO_FRAME = 'NDOSL_SG4S_TOPO' NDOSL_SG4S_TOPO_ID = 399101723 NDOSL_SG4S_UP = 'Z' NDOSL_SG4S_NORTH = 'X' SITES += 'NDOSL_SG6S' NDOSL_SG6S_CENTER = 399 NDOSL_SG6S_FRAME = 'ITRF93' NDOSL_SG6S_IDCODE = 399101750 NDOSL_SG6S_LATLON = ( 78.2308020000, 15.4172880000, 0.446184 ) NDOSL_SG6S_TOPO_FRAME = 'NDOSL_SG6S_TOPO' NDOSL_SG6S_TOPO_ID = 399101750 NDOSL_SG6S_UP = 'Z' NDOSL_SG6S_NORTH = 'X' SITES += 'NDOSL_SI1S' NDOSL_SI1S_CENTER = 399 NDOSL_SI1S_FRAME = 'ITRF93' NDOSL_SI1S_IDCODE = 399101742 NDOSL_SI1S_LATLON = ( 1.3919180000, 103.8350000000, 0.030000 ) NDOSL_SI1S_TOPO_FRAME = 'NDOSL_SI1S_TOPO' NDOSL_SI1S_TOPO_ID = 399101742 NDOSL_SI1S_UP = 'Z' NDOSL_SI1S_NORTH = 'X' SITES += 'NDOSL_SIPQ' NDOSL_SIPQ_CENTER = 399 NDOSL_SIPQ_FRAME = 'ITRF93' NDOSL_SIPQ_IDCODE = 399104003 NDOSL_SIPQ_LATLON = ( 15.2491458333, 145.7962166667, 0.348200 ) NDOSL_SIPQ_TOPO_FRAME = 'NDOSL_SIPQ_TOPO' NDOSL_SIPQ_TOPO_ID = 399104003 NDOSL_SIPQ_UP = 'Z' NDOSL_SIPQ_NORTH = 'X' SITES += 'NDOSL_SN2F' NDOSL_SN2F_CENTER = 399 NDOSL_SN2F_FRAME = 'ITRF93' NDOSL_SN2F_IDCODE = 399104443 NDOSL_SN2F_LATLON = ( 33.2476850000, 240.4792571944, 0.246680 ) NDOSL_SN2F_TOPO_FRAME = 'NDOSL_SN2F_TOPO' NDOSL_SN2F_TOPO_ID = 399104443 NDOSL_SN2F_UP = 'Z' NDOSL_SN2F_NORTH = 'X' SITES += 'NDOSL_SN3F' NDOSL_SN3F_CENTER = 399 NDOSL_SN3F_FRAME = 'ITRF93' NDOSL_SN3F_IDCODE = 399104444 NDOSL_SN3F_LATLON = ( 33.2483927500, 240.4786088333, 0.246120 ) NDOSL_SN3F_TOPO_FRAME = 'NDOSL_SN3F_TOPO' NDOSL_SN3F_TOPO_ID = 399104444 NDOSL_SN3F_UP = 'Z' NDOSL_SN3F_NORTH = 'X' SITES += 'NDOSL_SNIF' NDOSL_SNIF_CENTER = 399 NDOSL_SNIF_FRAME = 'ITRF93' NDOSL_SNIF_IDCODE = 399104442 NDOSL_SNIF_LATLON = ( 33.2469775833, 240.4799056667, 0.246160 ) NDOSL_SNIF_TOPO_FRAME = 'NDOSL_SNIF_TOPO' NDOSL_SNIF_TOPO_ID = 399104442 NDOSL_SNIF_UP = 'Z' NDOSL_SNIF_NORTH = 'X' SITES += 'NDOSL_SOCA' NDOSL_SOCA_CENTER = 399 NDOSL_SOCA_FRAME = 'ITRF93' NDOSL_SOCA_IDCODE = 399104139 NDOSL_SOCA_LATLON = ( 38.8500261111, 283.0677777778, 0.118566 ) NDOSL_SOCA_TOPO_FRAME = 'NDOSL_SOCA_TOPO' NDOSL_SOCA_TOPO_ID = 399104139 NDOSL_SOCA_UP = 'Z' NDOSL_SOCA_NORTH = 'X' SITES += 'NDOSL_ST1F' NDOSL_ST1F_CENTER = 399 NDOSL_ST1F_FRAME = 'ITRF93' NDOSL_ST1F_IDCODE = 399104224 NDOSL_ST1F_LATLON = ( 18.3572533333, 295.0267835278, 0.130454 ) NDOSL_ST1F_TOPO_FRAME = 'NDOSL_ST1F_TOPO' NDOSL_ST1F_TOPO_ID = 399104224 NDOSL_ST1F_UP = 'Z' NDOSL_ST1F_NORTH = 'X' SITES += 'NDOSL_ST2K' NDOSL_ST2K_CENTER = 399 NDOSL_ST2K_FRAME = 'ITRF93' NDOSL_ST2K_IDCODE = 399104751 NDOSL_ST2K_LATLON = ( 32.5429773611, 253.3879110556, 1.452310 ) NDOSL_ST2K_TOPO_FRAME = 'NDOSL_ST2K_TOPO' NDOSL_ST2K_TOPO_ID = 399104751 NDOSL_ST2K_UP = 'Z' NDOSL_ST2K_NORTH = 'X' SITES += 'NDOSL_ST3K' NDOSL_ST3K_CENTER = 399 NDOSL_ST3K_FRAME = 'ITRF93' NDOSL_ST3K_IDCODE = 399104752 NDOSL_ST3K_LATLON = ( 32.5426750000, 253.3879111111, 1.452300 ) NDOSL_ST3K_TOPO_FRAME = 'NDOSL_ST3K_TOPO' NDOSL_ST3K_TOPO_ID = 399104752 NDOSL_ST3K_UP = 'Z' NDOSL_ST3K_NORTH = 'X' SITES += 'NDOSL_STE1' NDOSL_STE1_CENTER = 399 NDOSL_STE1_FRAME = 'ITRF93' NDOSL_STE1_IDCODE = 399101934 NDOSL_STE1_LATLON = ( 32.5435743056, 253.3879826944, 1.447810 ) NDOSL_STE1_TOPO_FRAME = 'NDOSL_STE1_TOPO' NDOSL_STE1_TOPO_ID = 399101934 NDOSL_STE1_UP = 'Z' NDOSL_STE1_NORTH = 'X' SITES += 'NDOSL_STE2' NDOSL_STE2_CENTER = 399 NDOSL_STE2_FRAME = 'ITRF93' NDOSL_STE2_IDCODE = 399101935 NDOSL_STE2_LATLON = ( 32.5422753889, 253.3879616944, 1.446320 ) NDOSL_STE2_TOPO_FRAME = 'NDOSL_STE2_TOPO' NDOSL_STE2_TOPO_ID = 399101935 NDOSL_STE2_UP = 'Z' NDOSL_STE2_NORTH = 'X' SITES += 'NDOSL_STGK' NDOSL_STGK_CENTER = 399 NDOSL_STGK_FRAME = 'ITRF93' NDOSL_STGK_IDCODE = 399104750 NDOSL_STGK_LATLON = ( 32.5432795833, 253.3879110556, 1.452280 ) NDOSL_STGK_TOPO_FRAME = 'NDOSL_STGK_TOPO' NDOSL_STGK_TOPO_ID = 399104750 NDOSL_STGK_UP = 'Z' NDOSL_STGK_NORTH = 'X' SITES += 'NDOSL_STGS' NDOSL_STGS_CENTER = 399 NDOSL_STGS_FRAME = 'ITRF93' NDOSL_STGS_IDCODE = 399104753 NDOSL_STGS_LATLON = ( 32.5424516667, 253.3879110556, 1.449460 ) NDOSL_STGS_TOPO_FRAME = 'NDOSL_STGS_TOPO' NDOSL_STGS_TOPO_ID = 399104753 NDOSL_STGS_UP = 'Z' NDOSL_STGS_NORTH = 'X' SITES += 'NDOSL_STSS' NDOSL_STSS_CENTER = 399 NDOSL_STSS_FRAME = 'ITRF93' NDOSL_STSS_IDCODE = 399101741 NDOSL_STSS_LATLON = ( 32.5417167500, 253.3879009444, 1.456090 ) NDOSL_STSS_TOPO_FRAME = 'NDOSL_STSS_TOPO' NDOSL_STSS_TOPO_ID = 399101741 NDOSL_STSS_UP = 'Z' NDOSL_STSS_NORTH = 'X' SITES += 'NDOSL_STWS' NDOSL_STWS_CENTER = 399 NDOSL_STWS_FRAME = 'ITRF93' NDOSL_STWS_IDCODE = 399101740 NDOSL_STWS_LATLON = ( 32.4995067778, 253.3914361667, 1.460383 ) NDOSL_STWS_TOPO_FRAME = 'NDOSL_STWS_TOPO' NDOSL_STWS_TOPO_ID = 399101740 NDOSL_STWS_UP = 'Z' NDOSL_STWS_NORTH = 'X' SITES += 'NDOSL_SWNS' NDOSL_SWNS_CENTER = 399 NDOSL_SWNS_FRAME = 'ITRF93' NDOSL_SWNS_IDCODE = 399101796 NDOSL_SWNS_LATLON = ( -20.3800000000, 118.6350000000, 0.242000 ) NDOSL_SWNS_TOPO_FRAME = 'NDOSL_SWNS_TOPO' NDOSL_SWNS_TOPO_ID = 399101796 NDOSL_SWNS_UP = 'Z' NDOSL_SWNS_NORTH = 'X' SITES += 'NDOSL_SYOQ' NDOSL_SYOQ_CENTER = 399 NDOSL_SYOQ_FRAME = 'ITRF93' NDOSL_SYOQ_IDCODE = 399104262 NDOSL_SYOQ_LATLON = ( -69.0060964444, 39.5901538889, 0.005372 ) NDOSL_SYOQ_TOPO_FRAME = 'NDOSL_SYOQ_TOPO' NDOSL_SYOQ_TOPO_ID = 399104262 NDOSL_SYOQ_UP = 'Z' NDOSL_SYOQ_NORTH = 'X' SITES += 'NDOSL_TH2S' NDOSL_TH2S_CENTER = 399 NDOSL_TH2S_FRAME = 'ITRF93' NDOSL_TH2S_IDCODE = 399101731 NDOSL_TH2S_LATLON = ( 76.5153638889, 291.4011852778, 0.147370 ) NDOSL_TH2S_TOPO_FRAME = 'NDOSL_TH2S_TOPO' NDOSL_TH2S_TOPO_ID = 399101731 NDOSL_TH2S_UP = 'Z' NDOSL_TH2S_NORTH = 'X' SITES += 'NDOSL_THUS' NDOSL_THUS_CENTER = 399 NDOSL_THUS_FRAME = 'ITRF93' NDOSL_THUS_IDCODE = 399101730 NDOSL_THUS_LATLON = ( 76.5162930556, 291.4009822222, 0.141160 ) NDOSL_THUS_TOPO_FRAME = 'NDOSL_THUS_TOPO' NDOSL_THUS_TOPO_ID = 399101730 NDOSL_THUS_UP = 'Z' NDOSL_THUS_NORTH = 'X' SITES += 'NDOSL_TR2S' NDOSL_TR2S_CENTER = 399 NDOSL_TR2S_FRAME = 'ITRF93' NDOSL_TR2S_IDCODE = 399101738 NDOSL_TR2S_LATLON = ( -72.0022220556, 2.5241237778, 1.416582 ) NDOSL_TR2S_TOPO_FRAME = 'NDOSL_TR2S_TOPO' NDOSL_TR2S_TOPO_ID = 399101738 NDOSL_TR2S_UP = 'Z' NDOSL_TR2S_NORTH = 'X' SITES += 'NDOSL_TR3S' NDOSL_TR3S_CENTER = 399 NDOSL_TR3S_FRAME = 'ITRF93' NDOSL_TR3S_IDCODE = 399101748 NDOSL_TR3S_LATLON = ( -72.0021470833, 2.5250117500, 1.409348 ) NDOSL_TR3S_TOPO_FRAME = 'NDOSL_TR3S_TOPO' NDOSL_TR3S_TOPO_ID = 399101748 NDOSL_TR3S_UP = 'Z' NDOSL_TR3S_NORTH = 'X' SITES += 'NDOSL_TSMF' NDOSL_TSMF_CENTER = 399 NDOSL_TSMF_FRAME = 'ITRF93' NDOSL_TSMF_IDCODE = 399104080 NDOSL_TSMF_LATLON = ( -42.8050000000, 147.4390000000, 0.043000 ) NDOSL_TSMF_TOPO_FRAME = 'NDOSL_TSMF_TOPO' NDOSL_TSMF_TOPO_ID = 399104080 NDOSL_TSMF_UP = 'Z' NDOSL_TSMF_NORTH = 'X' SITES += 'NDOSL_TT2S' NDOSL_TT2S_CENTER = 399 NDOSL_TT2S_FRAME = 'ITRF93' NDOSL_TT2S_IDCODE = 399101376 NDOSL_TT2S_LATLON = ( 76.5153644167, 291.4011416944, 0.146985 ) NDOSL_TT2S_TOPO_FRAME = 'NDOSL_TT2S_TOPO' NDOSL_TT2S_TOPO_ID = 399101376 NDOSL_TT2S_UP = 'Z' NDOSL_TT2S_NORTH = 'X' SITES += 'NDOSL_TTSS' NDOSL_TTSS_CENTER = 399 NDOSL_TTSS_FRAME = 'ITRF93' NDOSL_TTSS_IDCODE = 399101369 NDOSL_TTSS_LATLON = ( 76.5159345556, 291.4000277222, 0.135906 ) NDOSL_TTSS_TOPO_FRAME = 'NDOSL_TTSS_TOPO' NDOSL_TTSS_TOPO_ID = 399101369 NDOSL_TTSS_UP = 'Z' NDOSL_TTSS_NORTH = 'X' SITES += 'NDOSL_TULF' NDOSL_TULF_CENTER = 399 NDOSL_TULF_FRAME = 'ITRF93' NDOSL_TULF_IDCODE = 399104151 NDOSL_TULF_LATLON = ( 33.0961615278, 253.8408458333, 1.241254 ) NDOSL_TULF_TOPO_FRAME = 'NDOSL_TULF_TOPO' NDOSL_TULF_TOPO_ID = 399104151 NDOSL_TULF_UP = 'Z' NDOSL_TULF_NORTH = 'X' SITES += 'NDOSL_TULS' NDOSL_TULS_CENTER = 399 NDOSL_TULS_FRAME = 'ITRF93' NDOSL_TULS_IDCODE = 399104078 NDOSL_TULS_LATLON = ( 33.0269448889, 253.8609090000, 1.328633 ) NDOSL_TULS_TOPO_FRAME = 'NDOSL_TULS_TOPO' NDOSL_TULS_TOPO_ID = 399104078 NDOSL_TULS_UP = 'Z' NDOSL_TULS_NORTH = 'X' SITES += 'NDOSL_U2HS' NDOSL_U2HS_CENTER = 399 NDOSL_U2HS_FRAME = 'ITRF93' NDOSL_U2HS_IDCODE = 399101779 NDOSL_U2HS_LATLON = ( 19.0137934444, 204.3370559167, 0.382300 ) NDOSL_U2HS_TOPO_FRAME = 'NDOSL_U2HS_TOPO' NDOSL_U2HS_TOPO_ID = 399101779 NDOSL_U2HS_UP = 'Z' NDOSL_U2HS_NORTH = 'X' SITES += 'NDOSL_U2PS' NDOSL_U2PS_CENTER = 399 NDOSL_U2PS_FRAME = 'ITRF93' NDOSL_U2PS_IDCODE = 399101771 NDOSL_U2PS_LATLON = ( -29.0456944444, 115.3490277778, 0.249700 ) NDOSL_U2PS_TOPO_FRAME = 'NDOSL_U2PS_TOPO' NDOSL_U2PS_TOPO_ID = 399101771 NDOSL_U2PS_UP = 'Z' NDOSL_U2PS_NORTH = 'X' SITES += 'NDOSL_U3AS' NDOSL_U3AS_CENTER = 399 NDOSL_U3AS_FRAME = 'ITRF93' NDOSL_U3AS_IDCODE = 399101745 NDOSL_U3AS_LATLON = ( 64.8044176944, 212.4981181111, 0.157900 ) NDOSL_U3AS_TOPO_FRAME = 'NDOSL_U3AS_TOPO' NDOSL_U3AS_TOPO_ID = 399101745 NDOSL_U3AS_UP = 'Z' NDOSL_U3AS_NORTH = 'X' SITES += 'NDOSL_U4AS' NDOSL_U4AS_CENTER = 399 NDOSL_U4AS_FRAME = 'ITRF93' NDOSL_U4AS_IDCODE = 399101746 NDOSL_U4AS_LATLON = ( 64.8047200833, 212.4957875278, 0.157200 ) NDOSL_U4AS_TOPO_FRAME = 'NDOSL_U4AS_TOPO' NDOSL_U4AS_TOPO_ID = 399101746 NDOSL_U4AS_UP = 'Z' NDOSL_U4AS_NORTH = 'X' SITES += 'NDOSL_U5AS' NDOSL_U5AS_CENTER = 399 NDOSL_U5AS_FRAME = 'ITRF93' NDOSL_U5AS_IDCODE = 399101747 NDOSL_U5AS_LATLON = ( 64.8034140556, 212.4994057500, 0.160300 ) NDOSL_U5AS_TOPO_FRAME = 'NDOSL_U5AS_TOPO' NDOSL_U5AS_TOPO_ID = 399101747 NDOSL_U5AS_UP = 'Z' NDOSL_U5AS_NORTH = 'X' SITES += 'NDOSL_UL1S' NDOSL_UL1S_CENTER = 399 NDOSL_UL1S_FRAME = 'ITRF93' NDOSL_UL1S_IDCODE = 399101854 NDOSL_UL1S_LATLON = ( 64.9727500000, 212.4989000000, 0.447300 ) NDOSL_UL1S_TOPO_FRAME = 'NDOSL_UL1S_TOPO' NDOSL_UL1S_TOPO_ID = 399101854 NDOSL_UL1S_UP = 'Z' NDOSL_UL1S_NORTH = 'X' SITES += 'NDOSL_UL23' NDOSL_UL23_CENTER = 399 NDOSL_UL23_FRAME = 'ITRF93' NDOSL_UL23_IDCODE = 399101371 NDOSL_UL23_LATLON = ( 64.9724071111, 212.4819343333, 0.331108 ) NDOSL_UL23_TOPO_FRAME = 'NDOSL_UL23_TOPO' NDOSL_UL23_TOPO_ID = 399101371 NDOSL_UL23_UP = 'Z' NDOSL_UL23_NORTH = 'X' SITES += 'NDOSL_UL33' NDOSL_UL33_CENTER = 399 NDOSL_UL33_FRAME = 'ITRF93' NDOSL_UL33_IDCODE = 399101332 NDOSL_UL33_LATLON = ( 64.9768138889, 212.4819338333, 0.308056 ) NDOSL_UL33_TOPO_FRAME = 'NDOSL_UL33_TOPO' NDOSL_UL33_TOPO_ID = 399101332 NDOSL_UL33_UP = 'Z' NDOSL_UL33_NORTH = 'X' SITES += 'NDOSL_ULA3' NDOSL_ULA3_CENTER = 399 NDOSL_ULA3_FRAME = 'ITRF93' NDOSL_ULA3_IDCODE = 399101328 NDOSL_ULA3_LATLON = ( 64.9721402500, 212.4866111667, 0.344054 ) NDOSL_ULA3_TOPO_FRAME = 'NDOSL_ULA3_TOPO' NDOSL_ULA3_TOPO_ID = 399101328 NDOSL_ULA3_UP = 'Z' NDOSL_ULA3_NORTH = 'X' SITES += 'NDOSL_ULA4' NDOSL_ULA4_CENTER = 399 NDOSL_ULA4_FRAME = 'ITRF93' NDOSL_ULA4_IDCODE = 399101401 NDOSL_ULA4_LATLON = ( 64.9765957500, 212.4787171111, 0.299159 ) NDOSL_ULA4_TOPO_FRAME = 'NDOSL_ULA4_TOPO' NDOSL_ULA4_TOPO_ID = 399101401 NDOSL_ULA4_UP = 'Z' NDOSL_ULA4_NORTH = 'X' SITES += 'NDOSL_ULAE' NDOSL_ULAE_CENTER = 399 NDOSL_ULAE_FRAME = 'ITRF93' NDOSL_ULAE_IDCODE = 399101853 NDOSL_ULAE_LATLON = ( 64.9767155556, 212.4824452778, 0.308000 ) NDOSL_ULAE_TOPO_FRAME = 'NDOSL_ULAE_TOPO' NDOSL_ULAE_TOPO_ID = 399101853 NDOSL_ULAE_UP = 'Z' NDOSL_ULAE_NORTH = 'X' SITES += 'NDOSL_USAS' NDOSL_USAS_CENTER = 399 NDOSL_USAS_FRAME = 'ITRF93' NDOSL_USAS_IDCODE = 399101709 NDOSL_USAS_LATLON = ( 64.8042411111, 212.4997858333, 0.160580 ) NDOSL_USAS_TOPO_FRAME = 'NDOSL_USAS_TOPO' NDOSL_USAS_TOPO_ID = 399101709 NDOSL_USAS_UP = 'Z' NDOSL_USAS_NORTH = 'X' SITES += 'NDOSL_USDS' NDOSL_USDS_CENTER = 399 NDOSL_USDS_FRAME = 'ITRF93' NDOSL_USDS_IDCODE = 399101717 NDOSL_USDS_LATLON = ( -29.0457720000, 115.3486780000, 0.251840 ) NDOSL_USDS_TOPO_FRAME = 'NDOSL_USDS_TOPO' NDOSL_USDS_TOPO_ID = 399101717 NDOSL_USDS_UP = 'Z' NDOSL_USDS_NORTH = 'X' SITES += 'NDOSL_USHS' NDOSL_USHS_CENTER = 399 NDOSL_USHS_FRAME = 'ITRF93' NDOSL_USHS_IDCODE = 399101778 NDOSL_USHS_LATLON = ( 19.0139525000, 204.3366681667, 0.385194 ) NDOSL_USHS_TOPO_FRAME = 'NDOSL_USHS_TOPO' NDOSL_USHS_TOPO_ID = 399101778 NDOSL_USHS_UP = 'Z' NDOSL_USHS_NORTH = 'X' SITES += 'NDOSL_USPS' NDOSL_USPS_CENTER = 399 NDOSL_USPS_FRAME = 'ITRF93' NDOSL_USPS_IDCODE = 399101770 NDOSL_USPS_LATLON = ( -29.0457721667, 115.3486776389, 0.250470 ) NDOSL_USPS_TOPO_FRAME = 'NDOSL_USPS_TOPO' NDOSL_USPS_TOPO_ID = 399101770 NDOSL_USPS_UP = 'Z' NDOSL_USPS_NORTH = 'X' SITES += 'NDOSL_VD2F' NDOSL_VD2F_CENTER = 399 NDOSL_VD2F_FRAME = 'ITRF93' NDOSL_VD2F_IDCODE = 399104247 NDOSL_VD2F_LATLON = ( 34.7582318333, 239.3728786111, 0.026040 ) NDOSL_VD2F_TOPO_FRAME = 'NDOSL_VD2F_TOPO' NDOSL_VD2F_TOPO_ID = 399104247 NDOSL_VD2F_UP = 'Z' NDOSL_VD2F_NORTH = 'X' SITES += 'NDOSL_VD3F' NDOSL_VD3F_CENTER = 399 NDOSL_VD3F_FRAME = 'ITRF93' NDOSL_VD3F_IDCODE = 399104251 NDOSL_VD3F_LATLON = ( 34.5830429444, 239.4388850556, 0.627252 ) NDOSL_VD3F_TOPO_FRAME = 'NDOSL_VD3F_TOPO' NDOSL_VD3F_TOPO_ID = 399104251 NDOSL_VD3F_UP = 'Z' NDOSL_VD3F_NORTH = 'X' SITES += 'NDOSL_VD4F' NDOSL_VD4F_CENTER = 399 NDOSL_VD4F_FRAME = 'ITRF93' NDOSL_VD4F_IDCODE = 399104254 NDOSL_VD4F_LATLON = ( 34.5830429444, 239.4388850556, 0.627248 ) NDOSL_VD4F_TOPO_FRAME = 'NDOSL_VD4F_TOPO' NDOSL_VD4F_TOPO_ID = 399104254 NDOSL_VD4F_UP = 'Z' NDOSL_VD4F_NORTH = 'X' SITES += 'NDOSL_VDB3' NDOSL_VDB3_CENTER = 399 NDOSL_VDB3_FRAME = 'ITRF93' NDOSL_VDB3_IDCODE = 399101333 NDOSL_VDB3_LATLON = ( 34.5656259167, 239.4983826944, 0.609440 ) NDOSL_VDB3_TOPO_FRAME = 'NDOSL_VDB3_TOPO' NDOSL_VDB3_TOPO_ID = 399101333 NDOSL_VDB3_UP = 'Z' NDOSL_VDB3_NORTH = 'X' SITES += 'NDOSL_VDBF' NDOSL_VDBF_CENTER = 399 NDOSL_VDBF_FRAME = 'ITRF93' NDOSL_VDBF_IDCODE = 399104246 NDOSL_VDBF_LATLON = ( 34.7748776944, 239.4638902778, 0.122607 ) NDOSL_VDBF_TOPO_FRAME = 'NDOSL_VDBF_TOPO' NDOSL_VDBF_TOPO_ID = 399104246 NDOSL_VDBF_UP = 'Z' NDOSL_VDBF_NORTH = 'X' SITES += 'NDOSL_VEND' NDOSL_VEND_CENTER = 399 NDOSL_VEND_FRAME = 'ITRF93' NDOSL_VEND_IDCODE = 399101513 NDOSL_VEND_LATLON = ( 35.2471642500, 243.2055410000, 1.070444 ) NDOSL_VEND_TOPO_FRAME = 'NDOSL_VEND_TOPO' NDOSL_VEND_TOPO_ID = 399101513 NDOSL_VEND_UP = 'Z' NDOSL_VEND_NORTH = 'X' SITES += 'NDOSL_VT2S' NDOSL_VT2S_CENTER = 399 NDOSL_VT2S_FRAME = 'ITRF93' NDOSL_VT2S_IDCODE = 399101372 NDOSL_VT2S_LATLON = ( 34.8256407778, 239.4946023333, 0.268610 ) NDOSL_VT2S_TOPO_FRAME = 'NDOSL_VT2S_TOPO' NDOSL_VT2S_TOPO_ID = 399101372 NDOSL_VT2S_UP = 'Z' NDOSL_VT2S_NORTH = 'X' SITES += 'NDOSL_VTSS' NDOSL_VTSS_CENTER = 399 NDOSL_VTSS_FRAME = 'ITRF93' NDOSL_VTSS_IDCODE = 399101365 NDOSL_VTSS_LATLON = ( 34.8226165556, 239.4981515556, 0.272510 ) NDOSL_VTSS_TOPO_FRAME = 'NDOSL_VTSS_TOPO' NDOSL_VTSS_TOPO_ID = 399101365 NDOSL_VTSS_UP = 'Z' NDOSL_VTSS_NORTH = 'X' SITES += 'NDOSL_WAPS' NDOSL_WAPS_CENTER = 399 NDOSL_WAPS_FRAME = 'ITRF93' NDOSL_WAPS_IDCODE = 399101341 NDOSL_WAPS_LATLON = ( 37.9249255556, 284.5234775000, -0.020100 ) NDOSL_WAPS_TOPO_FRAME = 'NDOSL_WAPS_TOPO' NDOSL_WAPS_TOPO_ID = 399101341 NDOSL_WAPS_UP = 'Z' NDOSL_WAPS_NORTH = 'X' SITES += 'NDOSL_WD3F' NDOSL_WD3F_CENTER = 399 NDOSL_WD3F_FRAME = 'ITRF93' NDOSL_WD3F_IDCODE = 399104846 NDOSL_WD3F_LATLON = ( 37.8563652500, 284.4885646389, -0.018126 ) NDOSL_WD3F_TOPO_FRAME = 'NDOSL_WD3F_TOPO' NDOSL_WD3F_TOPO_ID = 399104846 NDOSL_WD3F_UP = 'Z' NDOSL_WD3F_NORTH = 'X' SITES += 'NDOSL_WD4F' NDOSL_WD4F_CENTER = 399 NDOSL_WD4F_FRAME = 'ITRF93' NDOSL_WD4F_IDCODE = 399104843 NDOSL_WD4F_LATLON = ( 37.8563663889, 284.4885610000, 0.018660 ) NDOSL_WD4F_TOPO_FRAME = 'NDOSL_WD4F_TOPO' NDOSL_WD4F_TOPO_ID = 399104843 NDOSL_WD4F_UP = 'Z' NDOSL_WD4F_NORTH = 'X' SITES += 'NDOSL_WH2J' NDOSL_WH2J_CENTER = 399 NDOSL_WH2J_FRAME = 'ITRF93' NDOSL_WH2J_IDCODE = 399100202 NDOSL_WH2J_LATLON = ( 32.5062814722, 253.3880342500, 1.442610 ) NDOSL_WH2J_TOPO_FRAME = 'NDOSL_WH2J_TOPO' NDOSL_WH2J_TOPO_ID = 399100202 NDOSL_WH2J_UP = 'Z' NDOSL_WH2J_NORTH = 'X' SITES += 'NDOSL_WH2K' NDOSL_WH2K_CENTER = 399 NDOSL_WH2K_FRAME = 'ITRF93' NDOSL_WH2K_IDCODE = 399101921 NDOSL_WH2K_LATLON = ( 32.5007371944, 253.3914482778, 1.459740 ) NDOSL_WH2K_TOPO_FRAME = 'NDOSL_WH2K_TOPO' NDOSL_WH2K_TOPO_ID = 399101921 NDOSL_WH2K_UP = 'Z' NDOSL_WH2K_NORTH = 'X' SITES += 'NDOSL_WH2S' NDOSL_WH2S_CENTER = 399 NDOSL_WH2S_FRAME = 'ITRF93' NDOSL_WH2S_IDCODE = 399101962 NDOSL_WH2S_LATLON = ( 32.5012965556, 253.3914461111, 1.457665 ) NDOSL_WH2S_TOPO_FRAME = 'NDOSL_WH2S_TOPO' NDOSL_WH2S_TOPO_ID = 399101962 NDOSL_WH2S_UP = 'Z' NDOSL_WH2S_NORTH = 'X' SITES += 'NDOSL_WH3K' NDOSL_WH3K_CENTER = 399 NDOSL_WH3K_FRAME = 'ITRF93' NDOSL_WH3K_IDCODE = 399101922 NDOSL_WH3K_LATLON = ( 32.5004622778, 253.3914484167, 1.459740 ) NDOSL_WH3K_TOPO_FRAME = 'NDOSL_WH3K_TOPO' NDOSL_WH3K_TOPO_ID = 399101922 NDOSL_WH3K_UP = 'Z' NDOSL_WH3K_NORTH = 'X' SITES += 'NDOSL_WH4K' NDOSL_WH4K_CENTER = 399 NDOSL_WH4K_FRAME = 'ITRF93' NDOSL_WH4K_IDCODE = 399101925 NDOSL_WH4K_LATLON = ( 32.5013896111, 253.3914461111, 1.458675 ) NDOSL_WH4K_TOPO_FRAME = 'NDOSL_WH4K_TOPO' NDOSL_WH4K_TOPO_ID = 399101925 NDOSL_WH4K_UP = 'Z' NDOSL_WH4K_NORTH = 'X' SITES += 'NDOSL_WH5K' NDOSL_WH5K_CENTER = 399 NDOSL_WH5K_FRAME = 'ITRF93' NDOSL_WH5K_IDCODE = 399101940 NDOSL_WH5K_LATLON = ( 32.5012418333, 253.3914463889, 1.456635 ) NDOSL_WH5K_TOPO_FRAME = 'NDOSL_WH5K_TOPO' NDOSL_WH5K_TOPO_ID = 399101940 NDOSL_WH5K_UP = 'Z' NDOSL_WH5K_NORTH = 'X' SITES += 'NDOSL_WH6F' NDOSL_WH6F_CENTER = 399 NDOSL_WH6F_FRAME = 'ITRF93' NDOSL_WH6F_IDCODE = 399104145 NDOSL_WH6F_LATLON = ( 33.8138639444, 253.3409877222, 1.508970 ) NDOSL_WH6F_TOPO_FRAME = 'NDOSL_WH6F_TOPO' NDOSL_WH6F_TOPO_ID = 399104145 NDOSL_WH6F_UP = 'Z' NDOSL_WH6F_NORTH = 'X' SITES += 'NDOSL_WH6K' NDOSL_WH6K_CENTER = 399 NDOSL_WH6K_FRAME = 'ITRF93' NDOSL_WH6K_IDCODE = 399101941 NDOSL_WH6K_LATLON = ( 32.5014619722, 253.3907652500, 1.448046 ) NDOSL_WH6K_TOPO_FRAME = 'NDOSL_WH6K_TOPO' NDOSL_WH6K_TOPO_ID = 399101941 NDOSL_WH6K_UP = 'Z' NDOSL_WH6K_NORTH = 'X' SITES += 'NDOSL_WH7F' NDOSL_WH7F_CENTER = 399 NDOSL_WH7F_FRAME = 'ITRF93' NDOSL_WH7F_IDCODE = 399104147 NDOSL_WH7F_LATLON = ( 33.8130782778, 253.3409855278, 1.497454 ) NDOSL_WH7F_TOPO_FRAME = 'NDOSL_WH7F_TOPO' NDOSL_WH7F_TOPO_ID = 399104147 NDOSL_WH7F_UP = 'Z' NDOSL_WH7F_NORTH = 'X' SITES += 'NDOSL_WH9F' NDOSL_WH9F_CENTER = 399 NDOSL_WH9F_FRAME = 'ITRF93' NDOSL_WH9F_IDCODE = 399104146 NDOSL_WH9F_LATLON = ( 33.4452186667, 253.8678916111, 1.592508 ) NDOSL_WH9F_TOPO_FRAME = 'NDOSL_WH9F_TOPO' NDOSL_WH9F_TOPO_ID = 399104146 NDOSL_WH9F_UP = 'Z' NDOSL_WH9F_NORTH = 'X' SITES += 'NDOSL_WHSF' NDOSL_WHSF_CENTER = 399 NDOSL_WHSF_FRAME = 'ITRF93' NDOSL_WHSF_IDCODE = 399104143 NDOSL_WHSF_LATLON = ( 32.3580421111, 253.6301925833, 1.209860 ) NDOSL_WHSF_TOPO_FRAME = 'NDOSL_WHSF_TOPO' NDOSL_WHSF_TOPO_ID = 399104143 NDOSL_WHSF_UP = 'Z' NDOSL_WHSF_NORTH = 'X' SITES += 'NDOSL_WHSJ' NDOSL_WHSJ_CENTER = 399 NDOSL_WHSJ_FRAME = 'ITRF93' NDOSL_WHSJ_IDCODE = 399100201 NDOSL_WHSJ_LATLON = ( 32.5062814722, 253.3880342500, 1.442610 ) NDOSL_WHSJ_TOPO_FRAME = 'NDOSL_WHSJ_TOPO' NDOSL_WHSJ_TOPO_ID = 399100201 NDOSL_WHSJ_UP = 'Z' NDOSL_WHSJ_NORTH = 'X' SITES += 'NDOSL_WHSK' NDOSL_WHSK_CENTER = 399 NDOSL_WHSK_FRAME = 'ITRF93' NDOSL_WHSK_IDCODE = 399101920 NDOSL_WHSK_LATLON = ( 32.5010120556, 253.3914482778, 1.459730 ) NDOSL_WHSK_TOPO_FRAME = 'NDOSL_WHSK_TOPO' NDOSL_WHSK_TOPO_ID = 399101920 NDOSL_WHSK_UP = 'Z' NDOSL_WHSK_NORTH = 'X' SITES += 'NDOSL_WHSS' NDOSL_WHSS_CENTER = 399 NDOSL_WHSS_FRAME = 'ITRF93' NDOSL_WHSS_IDCODE = 399101961 NDOSL_WHSS_LATLON = ( 32.5002697778, 253.3914481111, 1.452260 ) NDOSL_WHSS_TOPO_FRAME = 'NDOSL_WHSS_TOPO' NDOSL_WHSS_TOPO_ID = 399101961 NDOSL_WHSS_UP = 'Z' NDOSL_WHSS_NORTH = 'X' SITES += 'NDOSL_WL2F' NDOSL_WL2F_CENTER = 399 NDOSL_WL2F_FRAME = 'ITRF93' NDOSL_WL2F_IDCODE = 399104841 NDOSL_WL2F_LATLON = ( 37.9440991389, 284.5357766389, -0.014040 ) NDOSL_WL2F_TOPO_FRAME = 'NDOSL_WL2F_TOPO' NDOSL_WL2F_TOPO_ID = 399104841 NDOSL_WL2F_UP = 'Z' NDOSL_WL2F_NORTH = 'X' SITES += 'NDOSL_WL2S' NDOSL_WL2S_CENTER = 399 NDOSL_WL2S_FRAME = 'ITRF93' NDOSL_WL2S_IDCODE = 399104206 NDOSL_WL2S_LATLON = ( 37.9464296944, 284.5379421389, -0.006765 ) NDOSL_WL2S_TOPO_FRAME = 'NDOSL_WL2S_TOPO' NDOSL_WL2S_TOPO_ID = 399104206 NDOSL_WL2S_UP = 'Z' NDOSL_WL2S_NORTH = 'X' SITES += 'NDOSL_WL3F' NDOSL_WL3F_CENTER = 399 NDOSL_WL3F_FRAME = 'ITRF93' NDOSL_WL3F_IDCODE = 399104845 NDOSL_WL3F_LATLON = ( 37.8563652500, 284.4885646389, -0.018126 ) NDOSL_WL3F_TOPO_FRAME = 'NDOSL_WL3F_TOPO' NDOSL_WL3F_TOPO_ID = 399104845 NDOSL_WL3F_UP = 'Z' NDOSL_WL3F_NORTH = 'X' SITES += 'NDOSL_WL3S' NDOSL_WL3S_CENTER = 399 NDOSL_WL3S_FRAME = 'ITRF93' NDOSL_WL3S_IDCODE = 399104207 NDOSL_WL3S_LATLON = ( 37.9457949722, 284.5395633056, -0.005689 ) NDOSL_WL3S_TOPO_FRAME = 'NDOSL_WL3S_TOPO' NDOSL_WL3S_TOPO_ID = 399104207 NDOSL_WL3S_UP = 'Z' NDOSL_WL3S_NORTH = 'X' SITES += 'NDOSL_WL4F' NDOSL_WL4F_CENTER = 399 NDOSL_WL4F_FRAME = 'ITRF93' NDOSL_WL4F_IDCODE = 399104842 NDOSL_WL4F_LATLON = ( 37.8563663889, 284.4885610000, 0.018660 ) NDOSL_WL4F_TOPO_FRAME = 'NDOSL_WL4F_TOPO' NDOSL_WL4F_TOPO_ID = 399104842 NDOSL_WL4F_UP = 'Z' NDOSL_WL4F_NORTH = 'X' SITES += 'NDOSL_WL4S' NDOSL_WL4S_CENTER = 399 NDOSL_WL4S_FRAME = 'ITRF93' NDOSL_WL4S_IDCODE = 399104208 NDOSL_WL4S_LATLON = ( 37.9463133056, 284.5394005278, -0.028793 ) NDOSL_WL4S_TOPO_FRAME = 'NDOSL_WL4S_TOPO' NDOSL_WL4S_TOPO_ID = 399104208 NDOSL_WL4S_UP = 'Z' NDOSL_WL4S_NORTH = 'X' SITES += 'NDOSL_WL53' NDOSL_WL53_CENTER = 399 NDOSL_WL53_FRAME = 'ITRF93' NDOSL_WL53_IDCODE = 399104209 NDOSL_WL53_LATLON = ( 37.9468000000, 284.5399000000, -0.025806 ) NDOSL_WL53_TOPO_FRAME = 'NDOSL_WL53_TOPO' NDOSL_WL53_TOPO_ID = 399104209 NDOSL_WL53_UP = 'Z' NDOSL_WL53_NORTH = 'X' SITES += 'NDOSL_WL6S' NDOSL_WL6S_CENTER = 399 NDOSL_WL6S_FRAME = 'ITRF93' NDOSL_WL6S_IDCODE = 399104210 NDOSL_WL6S_LATLON = ( 37.9456000000, 284.5389000000, 0.013216 ) NDOSL_WL6S_TOPO_FRAME = 'NDOSL_WL6S_TOPO' NDOSL_WL6S_TOPO_ID = 399104210 NDOSL_WL6S_UP = 'Z' NDOSL_WL6S_NORTH = 'X' SITES += 'NDOSL_WLPF' NDOSL_WLPF_CENTER = 399 NDOSL_WLPF_FRAME = 'ITRF93' NDOSL_WLPF_IDCODE = 399104840 NDOSL_WLPF_LATLON = ( 37.8413397222, 284.5149109167, -0.024000 ) NDOSL_WLPF_TOPO_FRAME = 'NDOSL_WLPF_TOPO' NDOSL_WLPF_TOPO_ID = 399104840 NDOSL_WLPF_UP = 'Z' NDOSL_WLPF_NORTH = 'X' SITES += 'NDOSL_WLPQ' NDOSL_WLPQ_CENTER = 399 NDOSL_WLPQ_FRAME = 'ITRF93' NDOSL_WLPQ_IDCODE = 399104860 NDOSL_WLPQ_LATLON = ( 37.8602614722, 284.4907044444, -0.021700 ) NDOSL_WLPQ_TOPO_FRAME = 'NDOSL_WLPQ_TOPO' NDOSL_WLPQ_TOPO_ID = 399104860 NDOSL_WLPQ_UP = 'Z' NDOSL_WLPQ_NORTH = 'X' SITES += 'NDOSL_WP2S' NDOSL_WP2S_CENTER = 399 NDOSL_WP2S_FRAME = 'ITRF93' NDOSL_WP2S_IDCODE = 399101337 NDOSL_WP2S_LATLON = ( 37.9280669722, 284.5255837500, -0.020961 ) NDOSL_WP2S_TOPO_FRAME = 'NDOSL_WP2S_TOPO' NDOSL_WP2S_TOPO_ID = 399101337 NDOSL_WP2S_UP = 'Z' NDOSL_WP2S_NORTH = 'X' SITES += 'NDOSL_WP2Y' NDOSL_WP2Y_CENTER = 399 NDOSL_WP2Y_FRAME = 'ITRF93' NDOSL_WP2Y_IDCODE = 399101838 NDOSL_WP2Y_LATLON = ( 37.9255851667, 284.5231425833, -0.015234 ) NDOSL_WP2Y_TOPO_FRAME = 'NDOSL_WP2Y_TOPO' NDOSL_WP2Y_TOPO_ID = 399101838 NDOSL_WP2Y_UP = 'Z' NDOSL_WP2Y_NORTH = 'X' SITES += 'NDOSL_WP2Z' NDOSL_WP2Z_CENTER = 399 NDOSL_WP2Z_FRAME = 'ITRF93' NDOSL_WP2Z_IDCODE = 399101840 NDOSL_WP2Z_LATLON = ( 37.9289123333, 284.5262488611, -0.017846 ) NDOSL_WP2Z_TOPO_FRAME = 'NDOSL_WP2Z_TOPO' NDOSL_WP2Z_TOPO_ID = 399101840 NDOSL_WP2Z_UP = 'Z' NDOSL_WP2Z_NORTH = 'X' SITES += 'NDOSL_WP3S' NDOSL_WP3S_CENTER = 399 NDOSL_WP3S_FRAME = 'ITRF93' NDOSL_WP3S_IDCODE = 399101338 NDOSL_WP3S_LATLON = ( 37.9283611667, 284.5258120278, -0.019631 ) NDOSL_WP3S_TOPO_FRAME = 'NDOSL_WP3S_TOPO' NDOSL_WP3S_TOPO_ID = 399101338 NDOSL_WP3S_UP = 'Z' NDOSL_WP3S_NORTH = 'X' SITES += 'NDOSL_WP3Z' NDOSL_WP3Z_CENTER = 399 NDOSL_WP3Z_FRAME = 'ITRF93' NDOSL_WP3Z_IDCODE = 399101841 NDOSL_WP3Z_LATLON = ( 37.9236312222, 284.5224715556, -0.020388 ) NDOSL_WP3Z_TOPO_FRAME = 'NDOSL_WP3Z_TOPO' NDOSL_WP3Z_TOPO_ID = 399101841 NDOSL_WP3Z_UP = 'Z' NDOSL_WP3Z_NORTH = 'X' SITES += 'NDOSL_WPDA' NDOSL_WPDA_CENTER = 399 NDOSL_WPDA_FRAME = 'ITRF93' NDOSL_WPDA_IDCODE = 399101339 NDOSL_WPDA_LATLON = ( 37.9273729722, 284.5250472500, -0.010538 ) NDOSL_WPDA_TOPO_FRAME = 'NDOSL_WPDA_TOPO' NDOSL_WPDA_TOPO_ID = 399101339 NDOSL_WPDA_UP = 'Z' NDOSL_WPDA_NORTH = 'X' SITES += 'NDOSL_WPS8' NDOSL_WPS8_CENTER = 399 NDOSL_WPS8_FRAME = 'ITRF93' NDOSL_WPS8_IDCODE = 399101336 NDOSL_WPS8_LATLON = ( 37.9273590278, 284.5241668056, -0.020647 ) NDOSL_WPS8_TOPO_FRAME = 'NDOSL_WPS8_TOPO' NDOSL_WPS8_TOPO_ID = 399101336 NDOSL_WPS8_UP = 'Z' NDOSL_WPS8_NORTH = 'X' SITES += 'NDOSL_WPSA' NDOSL_WPSA_CENTER = 399 NDOSL_WPSA_FRAME = 'ITRF93' NDOSL_WPSA_IDCODE = 399101334 NDOSL_WPSA_LATLON = ( 37.9272776667, 284.5250141944, -0.019736 ) NDOSL_WPSA_TOPO_FRAME = 'NDOSL_WPSA_TOPO' NDOSL_WPSA_TOPO_ID = 399101334 NDOSL_WPSA_UP = 'Z' NDOSL_WPSA_NORTH = 'X' SITES += 'NDOSL_WPSS' NDOSL_WPSS_CENTER = 399 NDOSL_WPSS_FRAME = 'ITRF93' NDOSL_WPSS_IDCODE = 399101335 NDOSL_WPSS_LATLON = ( 37.9265898611, 284.5236954722, -0.012762 ) NDOSL_WPSS_TOPO_FRAME = 'NDOSL_WPSS_TOPO' NDOSL_WPSS_TOPO_ID = 399101335 NDOSL_WPSS_UP = 'Z' NDOSL_WPSS_NORTH = 'X' SITES += 'NDOSL_WS1S' NDOSL_WS1S_CENTER = 399 NDOSL_WS1S_FRAME = 'ITRF93' NDOSL_WS1S_IDCODE = 399101931 NDOSL_WS1S_LATLON = ( 32.5407549444, 253.3879004722, 1.456545 ) NDOSL_WS1S_TOPO_FRAME = 'NDOSL_WS1S_TOPO' NDOSL_WS1S_TOPO_ID = 399101931 NDOSL_WS1S_UP = 'Z' NDOSL_WS1S_NORTH = 'X' SITES += 'NDOSL_WSCZ' NDOSL_WSCZ_CENTER = 399 NDOSL_WSCZ_FRAME = 'ITRF93' NDOSL_WSCZ_IDCODE = 399101871 NDOSL_WSCZ_LATLON = ( 32.5047222222, 253.3891666667, 1.470660 ) NDOSL_WSCZ_TOPO_FRAME = 'NDOSL_WSCZ_TOPO' NDOSL_WSCZ_TOPO_ID = 399101871 NDOSL_WSCZ_UP = 'Z' NDOSL_WSCZ_NORTH = 'X' SITES += 'NDOSL_WSE1' NDOSL_WSE1_CENTER = 399 NDOSL_WSE1_FRAME = 'ITRF93' NDOSL_WSE1_IDCODE = 399101932 NDOSL_WSE1_LATLON = ( 32.5013735000, 253.3915443889, 1.449630 ) NDOSL_WSE1_TOPO_FRAME = 'NDOSL_WSE1_TOPO' NDOSL_WSE1_TOPO_ID = 399101932 NDOSL_WSE1_UP = 'Z' NDOSL_WSE1_NORTH = 'X' SITES += 'NDOSL_WSE2' NDOSL_WSE2_CENTER = 399 NDOSL_WSE2_FRAME = 'ITRF93' NDOSL_WSE2_IDCODE = 399101933 NDOSL_WSE2_LATLON = ( 32.5013735000, 253.3914573056, 1.457860 ) NDOSL_WSE2_TOPO_FRAME = 'NDOSL_WSE2_TOPO' NDOSL_WSE2_TOPO_ID = 399101933 NDOSL_WSE2_UP = 'Z' NDOSL_WSE2_NORTH = 'X' SITES += 'NDOSL_WSSH' NDOSL_WSSH_CENTER = 399 NDOSL_WSSH_FRAME = 'ITRF93' NDOSL_WSSH_IDCODE = 399101870 NDOSL_WSSH_LATLON = ( 32.8802777778, 253.5352777778, 1.198474 ) NDOSL_WSSH_TOPO_FRAME = 'NDOSL_WSSH_TOPO' NDOSL_WSSH_TOPO_ID = 399101870 NDOSL_WSSH_UP = 'Z' NDOSL_WSSH_NORTH = 'X' SITES += 'NDOSL_WT1S' NDOSL_WT1S_CENTER = 399 NDOSL_WT1S_FRAME = 'ITRF93' NDOSL_WT1S_IDCODE = 399104865 NDOSL_WT1S_LATLON = ( 65.1172369167, 212.5409397222, 0.431444 ) NDOSL_WT1S_TOPO_FRAME = 'NDOSL_WT1S_TOPO' NDOSL_WT1S_TOPO_ID = 399104865 NDOSL_WT1S_UP = 'Z' NDOSL_WT1S_NORTH = 'X' SITES += 'NDOSL_WT2S' NDOSL_WT2S_CENTER = 399 NDOSL_WT2S_FRAME = 'ITRF93' NDOSL_WT2S_IDCODE = 399104866 NDOSL_WT2S_LATLON = ( 65.1167332500, 212.5384513056, 0.430342 ) NDOSL_WT2S_TOPO_FRAME = 'NDOSL_WT2S_TOPO' NDOSL_WT2S_TOPO_ID = 399104866 NDOSL_WT2S_UP = 'Z' NDOSL_WT2S_NORTH = 'X' SITES += 'NDOSL_WT3S' NDOSL_WT3S_CENTER = 399 NDOSL_WT3S_FRAME = 'ITRF93' NDOSL_WT3S_IDCODE = 399104867 NDOSL_WT3S_LATLON = ( 37.9230659167, 284.5225311111, -0.010644 ) NDOSL_WT3S_TOPO_FRAME = 'NDOSL_WT3S_TOPO' NDOSL_WT3S_TOPO_ID = 399104867 NDOSL_WT3S_UP = 'Z' NDOSL_WT3S_NORTH = 'X' SITES += 'NDOSL_WTDQ' NDOSL_WTDQ_CENTER = 399 NDOSL_WTDQ_FRAME = 'ITRF93' NDOSL_WTDQ_IDCODE = 399104861 NDOSL_WTDQ_LATLON = ( 37.9230659167, 284.5225311111, -0.010644 ) NDOSL_WTDQ_TOPO_FRAME = 'NDOSL_WTDQ_TOPO' NDOSL_WTDQ_TOPO_ID = 399104861 NDOSL_WTDQ_UP = 'Z' NDOSL_WTDQ_NORTH = 'X' SITES += 'NDOSL_WTDS' NDOSL_WTDS_CENTER = 399 NDOSL_WTDS_FRAME = 'ITRF93' NDOSL_WTDS_IDCODE = 399104861 NDOSL_WTDS_LATLON = ( 37.9230659167, 284.5225311111, -0.010644 ) NDOSL_WTDS_TOPO_FRAME = 'NDOSL_WTDS_TOPO' NDOSL_WTDS_TOPO_ID = 399104861 NDOSL_WTDS_UP = 'Z' NDOSL_WTDS_NORTH = 'X' SITES += 'NDOSL_WU1S' NDOSL_WU1S_CENTER = 399 NDOSL_WU1S_FRAME = 'ITRF93' NDOSL_WU1S_IDCODE = 399101907 NDOSL_WU1S_LATLON = ( 47.8800694444, 11.0853025000, 0.663392 ) NDOSL_WU1S_TOPO_FRAME = 'NDOSL_WU1S_TOPO' NDOSL_WU1S_TOPO_ID = 399101907 NDOSL_WU1S_UP = 'Z' NDOSL_WU1S_NORTH = 'X' SITES += 'NDOSL_WU2S' NDOSL_WU2S_CENTER = 399 NDOSL_WU2S_FRAME = 'ITRF93' NDOSL_WU2S_IDCODE = 399101908 NDOSL_WU2S_LATLON = ( 47.8811988889, 11.0836188889, 0.663374 ) NDOSL_WU2S_TOPO_FRAME = 'NDOSL_WU2S_TOPO' NDOSL_WU2S_TOPO_ID = 399101908 NDOSL_WU2S_UP = 'Z' NDOSL_WU2S_NORTH = 'X' SITES += 'NDOSL_WULY' NDOSL_WULY_CENTER = 399 NDOSL_WULY_FRAME = 'ITRF93' NDOSL_WULY_IDCODE = 399104215 NDOSL_WULY_LATLON = ( 34.6554133611, 239.4440152778, 0.075230 ) NDOSL_WULY_TOPO_FRAME = 'NDOSL_WULY_TOPO' NDOSL_WULY_TOPO_ID = 399104215 NDOSL_WULY_UP = 'Z' NDOSL_WULY_NORTH = 'X' SITES += 'NDOSL_YARZ' NDOSL_YARZ_CENTER = 399 NDOSL_YARZ_FRAME = 'ITRF93' NDOSL_YARZ_IDCODE = 399108566 NDOSL_YARZ_LATLON = ( -29.0466455278, 115.3466666667, 0.192350 ) NDOSL_YARZ_TOPO_FRAME = 'NDOSL_YARZ_TOPO' NDOSL_YARZ_TOPO_ID = 399108566 NDOSL_YARZ_UP = 'Z' NDOSL_YARZ_NORTH = 'X' begintext End of PINPOINT inputs. begintext [End of definitions file]