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## (from tabmap V6.0 (2016-08-18)) 2024-04-18T01:56:18
#---------------------------------------------------------------------------
#-- J/A+A/506/471 Frequency analysis of CoRoT B stars (Degroote+, 2009)
#--------------------------------------------------------------------------
#---Table: J/A+A/506/471/./data/102918586.dat Frequency analysis for each star (352 records)
#-------------------------------------------------------------------------------
# Label Format Unit Explanations
#-------------------------------------------------------------------------------
# nr I3 --- Frequency number
# A F14.10 mmag Amplitude value
# e_A F13.10 mmag Mean error on the Amplitude value
# f F14.10 1/d Frequency value
# e_f F13.10 1/d Mean error on the frequency value
# p F9.5 --- ]-0.5,0.5] Phase value (in rad/2pi unit)
# e_p F9.5 --- Mean error on the phase value (in rad/2pi unit)
# S/N F8.3 --- Signal-to-noise ratio, calculated over 6/d
# interval in the relevant periodogram (not the
# residual periodogram)
# Note A75 --- Notes about the frequency (TeX format)
#-------------------------------------------------------------------------------
----------------------------------------------------------------------------------------------------------------------------------------------------------------------
nr| A| e_A| f| e_f| p| e_p| S/N|Note
---|--------------|-------------|--------------|-------------|---------|---------|--------|---------------------------------------------------------------------------
001| 0.4144694952| 0.0023853876| 1.2247985878| 0.0000549517| -0.26290| 0.00576| 18.435|
002| 0.3433986821| 0.0019995880| 1.1282441491| 0.0000555977| 0.19096| 0.00582| 17.101|
003| 0.2588709998| 0.0017662944| 1.1719571437| 0.0000651470| -0.35522| 0.00682| 13.339|
004| 0.1950320156| 0.0017666403| 0.0017318250| 0.0000864882| 0.15466| 0.00906| 3.422| $f_{004}\approx4f_{004}$ (harmonic)
005| 0.1434976804| 0.0016789202| 0.9485118880| 0.0001117120| -0.20935| 0.01170| 8.717|
006| 0.1347726560| 0.0016066109| 0.4560380110| 0.0001138213| -0.22324| 0.01192| 7.861|
007| 0.1131930818| 0.0025650635| 0.6828585936| 0.0001266744| -0.20053| 0.01327| 6.891|
008| 0.0935497576| 0.0032132217| 0.9096168305| 0.0002276427| -0.14454| 0.02384| 5.966| $f_{008}\approx2f_{006}$ (harmonic)
009| 0.0740157467| 0.0035325887| 2.3509229831| 0.0001302940| -0.16806| 0.01365| 6.386| $f_{009}\approx2f_{003}$ (harmonic)
010| 0.0671490170| 0.0064264434| 1.8232428359| 0.0004552853| -0.19837| 0.04768| 5.108| $f_{010}\approx4f_{006}$ (harmonic)
011| 0.0671652362| 0.0025650635| 1.5957555006| 0.0001266744| -0.22022| 0.01327| 5.154|
012| 0.0666073675| 0.0043718652| 3.4156160823| 0.0001288741| -0.03060| 0.01350| 5.617|
013| 0.0657278086| 0.0037012053| 2.7334138504| 0.0001631494| -0.11763| 0.01709| 5.546| $f_{013}\approx4f_{007}$ (harmonic)
014| 0.0629749827| 0.0069583436| 2.9595919259| 0.0004667505| -0.05015| 0.04888| 5.639|
015| 0.0623208725| 0.0048198326| 1.3679720233| 0.0003414640| -0.24649| 0.03576| 5.594| $f_{015}\approx3f_{006}$ (harmonic)
016| 0.0640677996| 0.0074160701| 3.6408087494| 0.0004836346| 0.06833| 0.05065| 5.887| $f_{016}\approx4f_{008}$ (harmonic)
017| 0.0583352122| 0.0036275476| 3.1871745115| 0.0001791446| -0.02133| 0.01876| 5.790| $f_{017}\approx2f_{011}$ (harmonic)
018| 0.0573334705| 0.0045627066| 3.8713319739| 0.0001928446| -0.02367| 0.02020| 6.559|
019| 0.0575262462| 0.0074523765| 4.0994877935| 0.0004779408| -0.02685| 0.05006| 6.091| $f_{019}\approx3f_{015}$ (harmonic)
020| 0.0577370226| 0.0045031624| 4.3265127315| 0.0002065529| 0.02036| 0.02163| 6.445|
021| 0.0658822592| 0.0055090976| 2.5076185082| 0.0003566076| -0.22363| 0.03735| 5.691|
022| 0.0552022123| 0.0051217746| 2.2777204726| 0.0001648631| -0.15155| 0.01727| 6.313|
023| 0.0568055801| 0.0051217746| 4.5545334688| 0.0001648631| 0.01814| 0.01727| 6.341| $f_{023}\approx2f_{022}$ (harmonic)
024| 0.0541336012| 0.0078814635| 4.7816207525| 0.0004944429| 0.05403| 0.05178| 6.754| $f_{024}\approx3f_{011}$ (harmonic)
025| 0.0531717024| 0.0079156355| 5.2384484757| 0.0004888749| 0.02906| 0.05120| 6.981|
026| 0.0530614470| 0.0052856089| 5.0095375803| 0.0002185414| 0.06659| 0.02289| 7.090| $f_{026}\approx2f_{021}$ (harmonic)
027| 0.0510065706| 0.0052342948| 5.4651755397| 0.0002307280| 0.08460| 0.02416| 7.242| $f_{027}\approx4f_{015}$ (harmonic)
028| 0.0773292899| 0.0037845933| 2.0528100929| 0.0002343337| -0.27325| 0.02454| 5.804| $f_{028}\approx3f_{007}$ (harmonic)
029| 0.0478974821| 0.0057751143| 5.6931373950| 0.0001942966| 0.09162| 0.02035| 7.115|
030| 0.0478157732| 0.0083208675| 5.9200255188| 0.0005050199| 0.13990| 0.05289| 7.369| $f_{030}\approx2f_{014}$ (harmonic)
031| 0.0477763970| 0.0029681425| 2.3974155568| 0.0000852281| 0.21821| 0.00893| 7.707|
032| 0.0467796135| 0.0059208979| 6.1478851964| 0.0002415195| 0.14291| 0.02530| 7.766| $f_{032}\approx3f_{028}$ (harmonic)
033| 0.0458539782| 0.0083532422| 6.3755959370| 0.0004995698| 0.15923| 0.05232| 7.993| $f_{033}\approx4f_{011}$ (harmonic)
034| 0.0456827223| 0.0058751351| 6.6043405772| 0.0002526000| 0.13883| 0.02646| 8.273|
035| 0.0443236381| 0.0010526243| 0.0513174381| 0.0002267529| -0.13624| 0.02375| 8.656|
036| 0.0432173674| 0.0063617070| 6.8316356799| 0.0002198238| 0.16144| 0.02302| 8.165| $f_{036}\approx3f_{022}$ (harmonic)
037| 0.0418625049| 0.0064943361| 7.2878815099| 0.0002624938| 0.15972| 0.02749| 8.757| $f_{037}\approx4f_{010}$ (harmonic)
038| 0.0404951613| 0.0087382038| 7.0604703750| 0.0005153798| 0.12645| 0.05398| 8.379| $f_{038}\approx3f_{009}$ (harmonic)
039| 0.0375710443| 0.0047707752| 2.4494724841| 0.0001099034| 0.25891| 0.01151| 8.064| $f_{039}\approx2f_{001}$ (harmonic)
040| 0.0378738900| 0.0087690379| 7.5151835398| 0.0005100405| 0.18929| 0.05342| 8.791| $f_{040}\approx3f_{021}$ (harmonic)
041| 0.0372159506| 0.0064526415| 7.7426154567| 0.0002727234| 0.21563| 0.02856| 9.049| $f_{041}\approx2f_{018}$ (harmonic)
042| 0.0361975632| 0.0026679858| 2.3041013626| 0.0000856460| 0.45583| 0.00897| 9.654|
043| 0.0354429287| 0.0068986003| 7.9707227852| 0.0002426804| 0.21384| 0.02542| 8.914|
044| 0.0352712398| 0.0091364970| 8.1981269929| 0.0005255356| 0.24124| 0.05504| 9.548| $f_{044}\approx4f_{028}$ (harmonic)
045| 0.0478929310| 0.0037304477| 1.1475782433| 0.0002485393| -0.48638| 0.02603| 5.917|
046| 0.0337574674| 0.0070210948| 8.4260871163| 0.0002819118| 0.24594| 0.02953| 9.946|
047| 0.0330551279| 0.0040592531| 1.2096087508| 0.0001416603| 0.18088| 0.01484| 4.031|
048| 0.0318541463| 0.0091659913| 8.6529457991| 0.0005203005| 0.30308| 0.05449| 9.927| $f_{048}\approx2f_{020}$ (harmonic)
049| 0.0337568187| 0.0008033054| 0.2301855186| 0.0000569107| -0.16999| 0.00596| 7.551| $f_{049}\approx1/2f_{006}$ (harmonic)
050| 0.0298882531| 0.0069825463| 8.8812176510| 0.0002914607| 0.28589| 0.03053| 9.788| $f_{050}\approx3f_{014}$ (harmonic)
051| 0.0294215274| 0.0073966246| 9.1091933609| 0.0002635624| 0.28773| 0.02760| 10.076| $f_{051}\approx4f_{022}$ (harmonic)
052| 0.0283102525| 0.0009027881| 0.0958461223| 0.0003044786| 0.19702| 0.03189| 7.037| $f_{052}\approx2f_{035}$ (harmonic)
053| 0.0280221391| 0.0094858145| 9.3371032614| 0.0006098480| 0.29234| 0.06387| 10.019|
054| 0.0256138511| 0.0029169928| 2.1720739527| 0.0001244960| 0.28289| 0.01304| 8.817|
055| 0.0265814720| 0.0074699981| 9.5650252847| 0.0004185704| 0.30203| 0.04384| 10.386| $f_{055}\approx3f_{017}$ (harmonic)
056| 0.0264068079| 0.0095142260| 9.7922303325| 0.0006053425| 0.33357| 0.06340| 10.991| $f_{056}\approx4f_{039}$ (harmonic)
057| 0.0020032307| 0.0039530994| 2.0407202227| 0.0001511109| -0.03864| 0.01583| 3.983| $f_{057}\approx3f_{007}$ (harmonic)
058| 0.0229843482| 0.0074337778| 10.0197193995| 0.0004250603| 0.35504| 0.04452| 10.355| $f_{058}\approx4f_{021}$ (harmonic)
059| 0.0221776109| 0.0024369179| 2.1185207285| 0.0001293202| 0.21365| 0.01354| 7.788|
060| 0.0224452128| 0.0078240115| 10.2475444406| 0.0004064382| 0.35260| 0.04257| 10.626| $f_{060}\approx3f_{012}$ (harmonic)
061| 0.0122677240| 0.0026109625| 2.0751211943| 0.0001247825| -0.25968| 0.01307| 5.877|
062| 0.0212776705| 0.0078934132| 10.7036863611| 0.0005205076| 0.37585| 0.05451| 10.676|
063| 0.0210589591| 0.0098227174| 10.4759184702| 0.0006838432| 0.35124| 0.07162| 10.666| $f_{063}\approx2f_{025}$ (harmonic)
064| 0.0035466722| 0.0035788577| 1.1931858544| 0.0001017591| 0.13052| 0.01066| 8.736|
065| 0.0188589817| 0.0098501572| 10.9313693926| 0.0006798283| 0.37162| 0.07120| 10.296| $f_{065}\approx4f_{013}$ (harmonic)
066| 0.0161252983| 0.0050872480| 1.2775638316| 0.0001277611| 0.24369| 0.01338| 6.292|
067| 0.0167582775| 0.0078591445| 11.1575942274| 0.0005257406| 0.46304| 0.05506| 9.775|
068| 0.0164884150| 0.0082292318| 11.3853032362| 0.0005108023| 0.47147| 0.05350| 10.009| $f_{068}\approx2f_{029}$ (harmonic)
069| 0.0151739476| 0.0046565527| 1.0144528563| 0.0001240326| 0.02523| 0.01299| 6.372| Possible window frequency
070| 0.0150745558| 0.0029169928| 0.2774539498| 0.0001244960| 0.40837| 0.01304| 5.528| $f_{070}\approx3f_{052}$ (harmonic)
071| 0.0154410458| 0.0101484421| 11.6130416861| 0.0007505788| 0.47727| 0.07861| 9.868| $f_{071}\approx3f_{018}$ (harmonic)
072| 0.0126453516| 0.0008394601| 0.4775490092| 0.0000558560| 0.10004| 0.00585| 5.194| $f_{072}\approx2f_{049}$ (harmonic)
073| 0.0144248662| 0.0051728762| 3.5719531197| 0.0001231660| -0.42111| 0.01290| 6.627| $f_{073}\approx3f_{064}$ (harmonic)
074| 0.0138205744| 0.0106150508| 13.9690240115| 0.0007546385| -0.26051| 0.07904| 8.811| Instrumental
075| 0.0155913013| 0.0039991761| 2.2455223823| 0.0001111954| -0.45588| 0.01165| 6.413| $f_{075}\approx2f_{002}$ (harmonic)
076| 0.0126333252| 0.0043718652| 1.0712896206| 0.0001288741| -0.16294| 0.01350| 6.663|
077| 0.0143997141| 0.0082952440| 11.8419976089| 0.0006055205| 0.45022| 0.06342| 9.722| Instrumental
078| 0.0144044871| 0.0008376067| 83.8302829463| 0.0005552098| -0.43802| 0.05815| 14.145| Instrumental
079| 0.0140289829| 0.0052988831| 3.5238118486| 0.0001954410| 0.24768| 0.02047| 7.512| $f_{079}\approx3f_{003}$ (harmonic)
080| 0.0134097149| 0.0101750035| 12.0678933969| 0.0007469226| -0.46180| 0.07823| 9.210| Instrumental
081| 0.0059935906| 0.0043009646| 2.4938331813| 0.0001156487| 0.32298| 0.01211| 4.245|
082| 0.0137691439| 0.0004188034| 41.9133360456| 0.0002776049| -0.23377| 0.02907| 13.766| Instrumental
083| 0.0128779667| 0.0086784891| 12.9766449966| 0.0006799868| -0.31357| 0.07122| 9.029| Instrumental
084| 0.0118894971| 0.0109977532| 12.2976580820| 0.0007651498| 0.45768| 0.08014| 9.137| $f_{084}\approx3f_{019}$ (harmonic)
085| 0.0123649374| 0.0008290392| 55.8884301037| 0.0006401738| 0.46970| 0.06705| 10.908| Instrumental
086| 0.0119628139| 0.0046565527| 3.4785679207| 0.0001240326| -0.17065| 0.01299| 5.969|
087| 0.0105790997| 0.0046475677| 0.9804398135| 0.0003189663| -0.02739| 0.03341| 5.089|
088| 0.0074069778| 0.0048584634| 1.2448392666| 0.0002605428| -0.49895| 0.02729| 3.592|
089| 0.0106949403| 0.0110222682| 12.7505794896| 0.0007615636| -0.38396| 0.07976| 8.692| $f_{089}\approx4f_{017}$ (harmonic)
090| 0.0107554603| 0.0086154139| 12.5229657312| 0.0005971984| -0.42822| 0.06255| 8.653|
091| 0.0043841151| 0.0039530994| 2.0234954913| 0.0001511109| 0.16719| 0.01583| 3.693| $f_{091}\approx2f_{069}$ (harmonic)
092| 0.0086379641| 0.0055935956| 0.8868138909| 0.0003284057| -0.04605| 0.03440| 4.357|
093| 0.0099696169| 0.0039112602| 3.2941874413| 0.0001716278| -0.47738| 0.01798| 5.765|
094| 0.0077606806| 0.0060371413| 3.6563709288| 0.0001458789| -0.41689| 0.01528| 4.072| $f_{094}\approx2f_{010}$ (harmonic)
095| 0.0085919636| 0.0028759820| 1.6749068300| 0.0001263922| 0.43209| 0.01324| 4.833|
096| 0.0076045553| 0.0023876755| 1.6209171859| 0.0001311466| 0.32970| 0.01374| 4.122|
097| 0.0092963162| 0.0008210254| 0.1927555851| 0.0008432580| 0.26603| 0.08832| 4.425| $f_{097}\approx4f_{035}$ (harmonic)
098| 0.0073237977| 0.0009997940| 0.5706034296| 0.0000277988| -0.47012| 0.00291| 3.966| $f_{098}\approx3f_{097}$ (harmonic)
099| 0.0077262721| 0.0089850129| 13.6626728299| 0.0006725867| -0.37824| 0.07044| 6.781| $f_{099}\approx4f_{012}$ (harmonic)
100| 0.0070556351| 0.0051728762| 1.3319067679| 0.0001231660| 0.41389| 0.01290| 4.073|
101| 0.0073959555| 0.0113135094| 13.8904978710| 0.0008220134| -0.31588| 0.08609| 6.513| Instrumental
102| 0.0071382308| 0.0109977532| 13.2096568535| 0.0007651498| 0.44394| 0.08014| 6.504| $f_{102}\approx2f_{034}$ (harmonic)
103| 0.0071253327| 0.0047753510| 3.2452131624| 0.0002622932| 0.22156| 0.02747| 4.377| $f_{103}\approx2f_{096}$ (harmonic)
104| 0.0068116970| 0.0033578404| 1.8957283708| 0.0002234240| 0.47592| 0.02340| 4.170| $f_{104}\approx4f_{072}$ (harmonic)
105| 0.0066262489| 0.0008177975| 0.1393183932| 0.0011784001| 0.06339| 0.12342| 3.789| $f_{105}\approx3f_{035}$ (harmonic)
106| 0.0065244017| 0.0112896269| 13.4358193426| 0.0008253370| -0.45255| 0.08644| 6.342|
107| 0.0065160852| 0.0011926938| 0.6056330536| 0.0000274759| -0.19207| 0.00288| 3.825| $f_{107}\approx1/2f_{088}$ (harmonic)
108| 0.0065995923| 0.0113084948| 69.8579199761| 0.0009440640| -0.20464| 0.09888| 5.996| Instrumental
109| 0.0052413749| 0.0036254057| 1.8516794022| 0.0002535759| 0.16097| 0.02656| 3.706|
110| 0.0067455196| 0.0059934132| 2.2101602479| 0.0001824572| -0.47517| 0.01911| 4.132|
111| 0.0057506342| 0.0043009646| 4.7539288709| 0.0001156487| -0.35064| 0.01211| 4.207|
112| 0.0055617157| 0.0113084948| 97.8002473388| 0.0009440640| 0.43347| 0.09888| 5.490| Instrumental
113| 0.0051935061| 0.0090455112| 14.1174864406| 0.0007470669| -0.40627| 0.07824| 5.014| Instrumental
114| 0.0054745574| 0.0112896269| 14.3449287484| 0.0008253370| -0.33061| 0.08644| 5.051| $f_{114}\approx3f_{024}$ (harmonic)
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