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Galois conjugate representations are grouped into single lines.
Label Dimension Conductor Artin stem field $G$ Ind $\chi(c)$
$2$ $ 479 $ 25.1.145890213878661931676924574560641.1 $D_{25}$ $1$ $0$
$2$ $ 599 $ 25.1.2133643557240451317422184503752801.1 $D_{25}$ $1$ $0$
$2$ $ 1367 $ 25.1.42581619494519898305269398418425099361.1 $D_{25}$ $1$ $0$
$2$ $ 7 \cdot 257 $ 25.1.1149142693715820345877000392469173818401.1 $D_{25}$ $1$ $0$
$2$ $ 2887 $ 25.1.335244303153752999188341104839710238574881.1 $D_{25}$ $1$ $0$
$2$ $ 5 \cdot 643 $ 25.1.1219471702607488515548387495680371337890625.1 $D_{25}$ $1$ $0$
$2$ $ 3851 $ 25.1.10638544719000572788610677956885758729581201.1 $D_{25}$ $1$ $0$
$2$ $ 11^{2} \cdot 79 $ 25.1.39753813747116100568718553941184504222638641.1 $D_{25}$ $1$ $0$
$2$ $ 11^{2} \cdot 127 $ 25.1.11843998797823466973474682749162211402125799921.1 $D_{25}$ $1$ $0$
$2$ $ 11^{2} \cdot 131 $ 25.1.17183405982116876392097404040231169905747048161.1 $D_{25}$ $1$ $0$
$2$ $ 11^{2} \cdot 227 $ 25.1.12594008714591324159904490763426952893783035367521.1 $D_{25}$ $1$ $0$
$2$ $ 11^{2} \cdot 239 $ 25.1.23368375067493109808662942110693103411946589151921.1 $D_{25}$ $1$ $0$
$2$ $ 2^{3} \cdot 11^{2} \cdot 37 $ 25.1.304336636042044639557290623048761390690827308630016.1 $D_{25}$ $1$ $0$
$2$ $ 3 \cdot 11^{2} \cdot 101 $ 25.1.402870293734418524816649850331234613256054619217841.1 $D_{25}$ $1$ $0$
$2$ $ 2^{2} \cdot 101^{2}$ 25.1.21302612461104011938322907752452888203020497792182255616.1 $D_{25}$ $1$ $0$
$2$ $ 11^{2} \cdot 347 $ 25.1.2050252738518719593583539315906576529398910471106241.1 $D_{25}$ $1$ $0$
$2$ $ 5^{4} \cdot 79 $ 25.1.537434162030641831565308166318573057651519775390625.1 $D_{25}$ $1$ $0$
$2$ $ 2^{2} \cdot 5^{6}$ 25.1.5684341886080801486968994140625000000000000000000000000.1 $D_{25}$ $1$ $0$
$2$ $ 3 \cdot 151^{2}$ 25.1.10493051192734487579920795850254570247232550178731545829041.1 $D_{25}$ $1$ $0$
$2$ $ 5^{4} \cdot 7 \cdot 17 $ 25.1.73343851137781499579332021312438882887363433837890625.1 $D_{25}$ $1$ $0$
$2$ $ 31^{2} \cdot 79 $ 25.1.39697117444687013928858795564155606146076389050287041.1 $D_{25}$ $1$ $0$
$2$ $ 5^{4} \cdot 131 $ 25.1.232303482970894619238669847618439234793186187744140625.1 $D_{25}$ $1$ $0$
$2$ $ 3 \cdot 5^{4} \cdot 53 $ 25.1.2374464414398051343128533344497554935514926910400390625.1 $D_{25}$ $1$ $0$
$2$ $ 7 \cdot 17 \cdot 31^{2}$ 25.1.5417481206369891899624298610258216277470242459406526561.1 $D_{25}$ $1$ $0$
$2$ $ 7 \cdot 151^{2}$ 25.1.273289669358279935366769173240044512476032715690861652936920801.1 $D_{25}$ $1$ $0$
$2$ $ 5^{6} \cdot 11 $ 25.1.1063340895072207290851518113328211256884969770908355712890625.1 $D_{25}$ $1$ $0$
$2$ $ 47 \cdot 61^{2}$ 25.1.59124978448726451660949794029104480256746012020868751441.1 $D_{25}$ $1$ $0$
$2$ $ 19 \cdot 101^{2}$ 25.1.2810322640850914655738073712695605647813940296330665771746212561.1 $D_{25}$ $1$ $0$
$2$ $ 2^{2} \cdot 5 \cdot 101^{2}$ 25.1.5200833120386721664629616150501193408940551218794496000000000000.1 $D_{25}$ $1$ $0$
$2$ $ 23 \cdot 101^{2}$ 25.1.27825757950900228029764471409546430799443434015186601701670750721.1 $D_{25}$ $1$ $0$
$2$ $ 47 \cdot 71^{2}$ 25.1.1231235898798889654733878813862289001703540795947237556641.1 $D_{25}$ $1$ $0$
$2$ $ 2^{3} \cdot 3 \cdot 101^{2}$ 25.1.46371150515984700246074427059696907712517801439949332917545598976.1 $D_{25}$ $1$ $0$
$2$ $ 5^{6} \cdot 19 $ 25.1.749900263639409429675987406316295391661697067320346832275390625.1 $D_{25}$ $1$ $0$
$2$ $ 31 \cdot 101^{2}$ 25.1.1000122727935423568527927177134453812086627868013808972468512336161.1 $D_{25}$ $1$ $0$
$2$ $ 3 \cdot 5 \cdot 151^{2}$ 25.1.2561780076351193256816600549378557189265759320979381305918212890625.1 $D_{25}$ $1$ $0$
$2$ $ 2^{3} \cdot 3 \cdot 5^{6}$ 25.1.12373575009405612945556640625000000000000000000000000000000000000.1 $D_{25}$ $1$ $0$
$2$ $ 5^{6} \cdot 31 $ 25.1.266870531677976816761961066648556339941933401860296726226806640625.1 $D_{25}$ $1$ $0$
$2$ $ 2^{3} \cdot 251^{2}$ 25.1.268688549886992267720904704704675696195741689030461050731135275892736.1 $D_{25}$ $1$ $0$
$2$ $ 23 \cdot 151^{2}$ 25.1.432693894589877656600112492048947275524725694205923731225877562085921.1 $D_{25}$ $1$ $0$
$2$ $ 2^{3} \cdot 3 \cdot 151^{2}$ 25.1.721076987328774671473248071154174279782375000389295105588100832690176.1 $D_{25}$ $1$ $0$
$2$ $ 2^{2} \cdot 401^{2}$ 25.1.5014005878773511865106713792598879970299531436238323940466584312610816.1 $D_{25}$ $1$ $0$
$2$ $ 11 \cdot 251^{2}$ 25.1.12271044680751984862965729533808585211377680304234624022040704063452721.1 $D_{25}$ $1$ $0$
$2$ $ 3 \cdot 601^{2}$ 25.1.2620851322618322172067659263964227111346964467093610892638546707375041841.1 $D_{25}$ $1$ $0$
$2$ $ 7 \cdot 401^{2}$ 25.1.4136579954362307033319663770000281683197150504869381233624936307330576801.1 $D_{25}$ $1$ $0$
$2$ $ 2^{3} \cdot 401^{2}$ 25.1.20537368079456304599477099694485012358346880762832174860151129344453902336.1 $D_{25}$ $1$ $0$
$2$ $ 2^{2} \cdot 601^{2}$ 25.1.82738420150973065003205033269786965100780846432161617499872437459134447616.1 $D_{25}$ $1$ $0$
$2$ $ 3 \cdot 751^{2}$ 25.1.550571269382676689305139595328229570927324167506615636457858145394969219441.1 $D_{25}$ $1$ $0$
$2$ $ 2^{2} \cdot 701^{2}$ 25.1.3326230389837138108252044418685352218006698203826796008573429587492277846016.1 $D_{25}$ $1$ $0$
$2$ $ 3 \cdot 1051^{2}$ 25.1.1753558429225056739507544492279439434479165414902514479411739428159657040234641.1 $D_{25}$ $1$ $0$
$2$ $ 3 \cdot 1201^{2}$ 25.1.43100988867214257065104116719456670629605024080446872160299489929519785969072241.1 $D_{25}$ $1$ $0$
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