Starting with polynomial:
P : -t+1
Extension levels are: 1 54
-------------------------------------------------
Trying to find an order 54 Kronrod extension for:
P1 : -t+1
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : -t^55 + 42037781409208859985752247845389994594072034075851643053607603993154582531/13957424787281114379685655426533268034678651725605490373355741377412135*t^54 - 61023646436189044802568955741203572232765591861986656127152943686031411849646/13957424787281114379685655426533268034678651725605490373355741377412135*t^53 + 1073359667206944434177763369520970738136943458731075228051246013250767481853994/263347637495870082635578404274212604427899089162367742893504554290795*t^52 - 722397201891861842612855893493738575975972347793994403084072721120659827550227592/263347637495870082635578404274212604427899089162367742893504554290795*t^51 + 374129540404701574664747058329314745331707151276103771433262732015033195598394155848/263347637495870082635578404274212604427899089162367742893504554290795*t^50 - 31039004698771384900190540071932223620059457269147637865182569541924929075429993194800/52669527499174016527115680854842520885579817832473548578700910858159*t^49 + 1514126837160397623670955772204656037994689277999044777435402326047257500698696530044400/7524218214167716646730811550691788697939973976067649796957272979737*t^48 - 434114623895327247522981623294774338158661963145238326249335318427575721289981137340556800/7524218214167716646730811550691788697939973976067649796957272979737*t^47 + 106071447509200899395340013009543165762339021336321625591486662244485854752736835769841446400/7524218214167716646730811550691788697939973976067649796957272979737*t^46 - 22343240185282820459987763341240232400709687948866296672083843060219910955965266771938304793600/7524218214167716646730811550691788697939973976067649796957272979737*t^45 + 4094506200652539043731018123414890011397235358228004379294858589886445042605374878848252095104000/7524218214167716646730811550691788697939973976067649796957272979737*t^44 - 657566433907652830448905276587036274709763543506907068558250899448161578355165871115135023650304000/7524218214167716646730811550691788697939973976067649796957272979737*t^43 + 93097510428418791542065828808272326210014063431324467986774302785925299962153295104408861036779008000/7524218214167716646730811550691788697939973976067649796957272979737*t^42 - 11676273983869111582369569020639380892290278462772368441106359298358099009253675469605073981275546624000/7524218214167716646730811550691788697939973976067649796957272979737*t^41 + 1302468122664418838571179740721644682309445164847039495506190799013615652355134407061855700286158212096000/7524218214167716646730811550691788697939973976067649796957272979737*t^40 - 129641514086990590581147644653030274595622645663272223437906226599123367573990691649663610973737016586240000/7524218214167716646730811550691788697939973976067649796957272979737*t^39 + 11544946140903957129480864498279761125918675207908199790095242399091902555109631804951085445210784729149440000/7524218214167716646730811550691788697939973976067649796957272979737*t^38 - 921816689373284827978575176185036233389369171221308085047320475806284368242107683820662451992767019103150080000/7524218214167716646730811550691788697939973976067649796957272979737*t^37 + 66106282367464779140589662958426771524108479564826121705319952416332393347986347925863287534628137218265456640000/7524218214167716646730811550691788697939973976067649796957272979737*t^36 - 4263402368805996164421842521012847152290195455704217699627894454559496396425385261668116227055135342168078581760000/7524218214167716646730811550691788697939973976067649796957272979737*t^35 + 247515195678349354031119368135312304739392750410449324910478266231538132727573218701516999608871431234565741772800000/7524218214167716646730811550691788697939973976067649796957272979737*t^34 - 12943622697205728719656139324024654041880629941786564802187184945826702539418066764822151462937551020035540724940800000/7524218214167716646730811550691788697939973976067649796957272979737*t^33 + 609908509017720452827928650621167643539933915183669863875491367900412308691971943184540875419962829718829861878169600000/7524218214167716646730811550691788697939973976067649796957272979737*t^32 - 25897157189673001283486019162362181289236320634143990110035030293173216713098081724470830981897826515937335275474124800000/7524218214167716646730811550691788697939973976067649796957272979737*t^31 + 990658433045370239188300520460956637562352449834151791451540566503238004001886059147397432506187732437878020646318899200000/7524218214167716646730811550691788697939973976067649796957272979737*t^30 - 34124889590297664543671485303409227835762102347793374721769273526277223146040525812520096533130796624723553306656584499200000/7524218214167716646730811550691788697939973976067649796957272979737*t^29 + 1057721230186405600829368563179194120715959673211154376613593753653639141586348599237127841770573366538718745554853245747200000/7524218214167716646730811550691788697939973976067649796957272979737*t^28 - 29470429628500587547393671540824481979481668141089889981167811204723197460577658526419039392405293751390833704214402066022400000/7524218214167716646730811550691788697939973976067649796957272979737*t^27 + 737161401647894673102444896376151183932072527590447464038137690927873784119368224961748480272619818335845120913066681381683200000/7524218214167716646730811550691788697939973976067649796957272979737*t^26 - 16528136359962127353212492628863985749646224913982301181296414428698465202746755094076811638843654546495870216077981894102220800000/7524218214167716646730811550691788697939973976067649796957272979737*t^25 + 331563893873488469203962908455350097204766442330507785744626200708780399260828216109184627463930292738387709158229729188249600000000/7524218214167716646730811550691788697939973976067649796957272979737*t^24 - 5938186177846425771225227863272608670870945785759541954884457344133586840134944979660835913314680420902004628700228434368921600000000/7524218214167716646730811550691788697939973976067649796957272979737*t^23 + 94710593293883674612004735303956859036293169014015159163861369301343270154580773172409344653799625389678579713944794007024435200000000/7524218214167716646730811550691788697939973976067649796957272979737*t^22 - 1341395504410635145315915172325073325668659104974126702646693993225955776842368489667560001532564810340309174035972203510077849600000000/7524218214167716646730811550691788697939973976067649796957272979737*t^21 + 16815429001047411507436071819719774008411084094904756240670448201431973849642527495074831231657938059504736758426472123382261350400000000/7524218214167716646730811550691788697939973976067649796957272979737*t^20 - 185880829405786890932129027423818045704411816301505733644361689869076721234124578003760071600061772319128643599996605361528242176000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^19 + 1804254181804779765340937620144401859710594133637004675474051293386084920742481277165860473856906404148879667067814708663996645376000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^18 - 15304006353010627128612219642235224104303258368557259935410194250624525204333985746583839051609930873640808127729674612675813834752000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^17 + 112816498630265220071103075048726889130266919372305727009892874232940367037347291544713177867405690721836851020170496040721717395456000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^16 - 718248870915383126215730605488363911551536909542859255046251987977659215566862253903573068757722888832177367082571934869822975770624000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^15 + 3920883753276597314504642546331635118307493790199180923818723309622256548080680839810265971022222081342310968734435521775147952373760000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^14 - 18200736629090055849364050698376998328696435821858967862993500791192877952528500035007562342655966256582229965829515318357133948354560000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^13 + 71152992105774320815016768554524245080485702447703343777676825207002474814767505182221542077632343718747856072290341769721967196241920000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^12 - 231620257733812679610488437623427917415210611496616473271109919719370385968999581038418361479134962892594239508888217594449064477327360000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^11 + 619455944393245276066479145717287888057969551397570275458857284224770075063332590203055840337961175719636776811643851489928324306698240000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^10 - 1339371198531436744594880297687011203766993992014045001231538903100748311760917092397410816011650980906444779346496246626338762601267200000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^9 + 2295745153501840834682038343225520627753046189717087936152027707532904168006179552220514844672219050132177892467980958737769210000179200000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^8 - 3044283045336926585756774472356057631309498680291308394284707896650563930211250877291861540489215922241211199004936571478492651611750400000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^7 + 3027572552671398725270831153744754425614935774293166207033378849923922303080929018289703288082139777639518541385898531306626356556595200000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^6 - 2167820683204227022645119241296084878342668465172417294243075858302042086684437154687032425686045815787234636312139553617027244281036800000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^5 + 1056759376708356354458451005831346357962050574928311235010842619930813781936571282453665923506348525330399962169819688575138976392806400000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^4 - 323342017159255943219511442307060069704750811543754531614051588388488407785335396338450157197565032814599880745207356827984883770982400000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^3 + 54598975985145227798057244252429009324060768075209515148472768309719871222136308526655099474603295742702428818962282596579767274700800000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^2 - 4021541998591321673820356268335338030758468360696600728457930321920210593261258052801382431208754791607349445287401458819834209894400000000000/7524218214167716646730811550691788697939973976067649796957272979737*t + 72703916467098259117969528609596117853761451398786134033523704218351265718407621412770674973781930815752196907471456958324251033600000000000/7524218214167716646730811550691788697939973976067649796957272979737
-------------------------------------------------
Computing nodes and weights
  current precision for roots: 53
  current precision for roots: 106
  current precision for roots: 212
 current precision for weights: 53
Linear system for weights solvable: 0
  current precision for roots: 106
  current precision for roots: 212
  current precision for roots: 424
 current precision for weights: 106
Linear system for weights solvable: 0
  current precision for roots: 212
  current precision for roots: 424
  current precision for roots: 848
 current precision for weights: 212
Linear system for weights solvable: 0
  current precision for roots: 424
  current precision for roots: 848
  current precision for roots: 1696
 current precision for weights: 424
Linear system for weights solvable: 1
  current precision for roots: 848
  current precision for roots: 1696
  current precision for roots: 3392
 current precision for weights: 848
Linear system for weights solvable: 1
Sufficient bits for target precision reached
Positive weights:   55 out of 55
Indefinite weights: 0 out of 55
Negative weights:   0 out of 55
Extension rule has valid weights: 1
-------------------------------------------------
The nodes are:
| (199.26419348982227455 - 3.042372262596729793e-2044j)  +/-  (1.33e-1002, 1.33e-1002j)
| (170.87970944245879326 - 1.0577859117326930282e-2040j)  +/-  (1.62e-999, 1.62e-999j)
| (150.46767983352203822 + 5.5012339506002878859e-2035j)  +/-  (1.59e-997, 1.59e-997j)
| (160.0835963707930566 + 1.9829329476113201021e-2038j)  +/-  (2.03e-998, 2.03e-998j)
| (12.648497564266363125 - 1.5539626894050249718e-2057j)  +/-  (1.33e-1002, 1.33e-1002j)
| (55.053904898080828017 + 1.0305222065275675382e-2047j)  +/-  (5.26e-994, 5.26e-994j)
| (183.43857226094748156 + 2.4832117619864297742e-2067j)  +/-  (7.98e-1001, 7.98e-1001j)
| (75.209447703860712848 + 2.4216739252478905416e-2075j)  +/-  (1.8e-993, 1.8e-993j)
| (106.43044777413090828 - 1.2799589409906166658e-2093j)  +/-  (2.76e-994, 2.76e-994j)
| (133.68116834483663939 - 2.0636916998986770436e-2111j)  +/-  (4.41e-996, 4.41e-996j)
| (25.972922811891276125 + 8.9100237030182636316e-2131j)  +/-  (7.44e-998, 7.44e-998j)
| (141.72822716091658187 + 4.3330302604085000313e-2140j)  +/-  (9.62e-997, 9.62e-997j)
| (126.20411259505363957 - 1.5745795708775364992e-2169j)  +/-  (1.53e-995, 1.53e-995j)
| (9.7644036363312378785 - 2.9421893887398235457e-2197j)  +/-  (3.19e-1004, 3.19e-1004j)
| (38.871294043877100586 + 2.18296750009143155e-2186j)  +/-  (1.8e-995, 1.8e-995j)
| (30.769699361598479331 + 1.9908248210950500851e-2210j)  +/-  (9.12e-997, 9.12e-997j)
| (36.045362713076969204 + 4.7171570551619646681e-2275j)  +/-  (7.1e-996, 7.1e-996j)
| (79.809524974729022634 + 7.8063394164265385273e-2349j)  +/-  (1.85e-993, 1.85e-993j)
| (17.725950477475853271 + 1.1397087055768037244e-2378j)  +/-  (2.38e-1000, 2.38e-1000j)
| (21.631598418703370996 + 1.2824266010265479047e-2402j)  +/-  (4.83e-999, 4.83e-999j)
| (6.1621981768038504586 + 2.9356113712315138754e-2425j)  +/-  (5.58e-1007, 5.58e-1007j)
| (2.6670092458107738317 - 3.8562678089181986255e-2426j)  +/-  (3.52e-1011, 3.52e-1011j)
| (94.980345789568321667 + 1.3142337218983319925e-2467j)  +/-  (8.5e-994, 8.5e-994j)
| (58.738446734611463116 + 1.1705736881877929897e-2545j)  +/-  (8.24e-994, 8.24e-994j)
| (119.21036261067316231 - 3.928569235057866308e-2604j)  +/-  (4.73e-995, 4.73e-995j)
| (15.931172461810188471 - 3.2339708525639260243e-2635j)  +/-  (4.2e-1001, 4.2e-1001j)
| (2.0214170812191008989 + 1.1551644616161705322e-2653j)  +/-  (2.22e-1012, 2.22e-1012j)
| (11.157356289894033388 - 1.6847622409997655209e-2642j)  +/-  (2.25e-1003, 2.25e-1003j)
| (89.677988555778856302 + 6.6425655260227511762e-2647j)  +/-  (1.12e-993, 1.12e-993j)
| (62.58762773841323729 - 4.927694198968634805e-2683j)  +/-  (1.21e-993, 1.21e-993j)
| (44.919282332541104238 - 5.4383537412288415093e-2716j)  +/-  (8.93e-995, 8.93e-995j)
| (4.2306671490205593339 + 1.9230034814264024511e-2769j)  +/-  (5.33e-1009, 5.33e-1009j)
| (33.346042187006193945 + 1.6364793368404783805e-2758j)  +/-  (2.63e-996, 2.63e-996j)
| (66.609563426820227838 + 1.7818149468110419595e-2823j)  +/-  (1.51e-993, 1.51e-993j)
| (70.813389175360717348 + 7.1108504981472719925e-2884j)  +/-  (1.78e-993, 1.78e-993j)
| (19.625425712313326298 - 8.2779827956967008547e-2912j)  +/-  (1.1e-999, 1.1e-999j)
| (7.2679618129885290611 - 5.9988322154428023394e-2919j)  +/-  (5.3e-1006, 5.3e-1006j)
| (28.313008990770255385 - 3.4263493857296509488e-2907j)  +/-  (2.8e-997, 2.8e-997j)
| (8.4683356940336825471 - 8.4595739195706124793e-2924j)  +/-  (4.51e-1005, 4.51e-1005j)
| (23.746642876702487669 + 1.9047558446071356951e-2913j)  +/-  (1.94e-998, 1.94e-998j)
| (112.63560927578009992 + 1.0266378811477995966e-2932j)  +/-  (1.18e-994, 1.18e-994j)
| (41.827813048693256316 + 1.2276200214816170052e-2972j)  +/-  (4.33e-995, 4.33e-995j)
| (84.627150925952074741 - 1.8067317874668911069e-2996j)  +/-  (1.56e-993, 1.56e-993j)
| (0.62332852838776967041 - 1.0761751372774180358e-3034j)  +/-  (4.85e-1016, 4.85e-1016j)
| (14.23925189540408009 - 8.4747719089247330785e-3021j)  +/-  (8.05e-1002, 8.05e-1002j)
| (100.55586181887635934 + 1.6250631219494247468e-3011j)  +/-  (4.97e-994, 4.97e-994j)
| (1.4659012292209814646 - 2.2451904539311993995e-3038j)  +/-  (1.32e-1013, 1.32e-1013j)
| (0.1365032952604870114 + 2.2017203989298372852e-3042j)  +/-  (6.9e-1019, 6.9e-1019j)
| (1 + 1.2861934312228633251e-3038j)  +/-  (8.09e-1015, 8.09e-1015j)
| (5.1500621255959500772 - 5.7671211461085640865e-3032j)  +/-  (5.94e-1008, 5.94e-1008j)
| (51.526755799383710095 + 1.2400449260238955392e-3016j)  +/-  (3.23e-994, 3.23e-994j)
| (48.150499564010541487 + 5.0398727986075413575e-3027j)  +/-  (1.86e-994, 1.86e-994j)
| (3.4032184821047071901 + 7.2983374470063893707e-3050j)  +/-  (4.6e-1010, 4.6e-1010j)
| (0.33557645304741157696 - 8.1961304411350069769e-3057j)  +/-  (1.88e-1017, 1.88e-1017j)
| (0.025902778757610585986 + 9.2689576072079303658e-3085j)  +/-  (1.42e-1020, 1.42e-1020j)
-------------------------------------------------
The weights are:
| (5.4013640101040295559e-86 - 6.1419588566805383882e-2104j)  +/-  (4.02e-176, 9.48e-928j)
| (7.0819702723877378323e-74 - 8.396182704230854591e-2098j)  +/-  (9.31e-173, 2.2e-924j)
| (4.108233354357018163e-65 - 2.3621842559157621213e-2093j)  +/-  (1.61e-170, 3.79e-922j)
| (3.0383336799029308109e-69 + 1.8811910446761655174e-2095j)  +/-  (1.15e-171, 2.71e-923j)
| (4.9493181802179055046e-06 + 4.1880631138904347795e-2063j)  +/-  (6.76e-120, 1.59e-871j)
| (4.4387681227119976825e-24 - 2.2261785853392753574e-2071j)  +/-  (1.5e-151, 3.54e-903j)
| (2.9723563101817768588e-79 + 1.5831400488713263339e-2100j)  +/-  (3.75e-175, 8.84e-927j)
| (9.7673159273843011225e-33 - 1.2940536244545542303e-2076j)  +/-  (1.36e-158, 3.21e-910j)
| (3.6178821383170231776e-46 - 1.149353228069015728e-2083j)  +/-  (1.31e-165, 3.08e-917j)
| (6.7926588980968721978e-58 - 1.1208998669653308003e-2089j)  +/-  (9.8e-170, 2.31e-921j)
| (1.1982810863731584447e-11 - 6.9833960117417460532e-2067j)  +/-  (1.19e-141, 2.82e-893j)
| (2.3489921613200291326e-61 + 1.9285927274634490557e-2091j)  +/-  (9.88e-171, 2.33e-922j)
| (1.1193764088459133947e-54 + 4.9275634005952609668e-2088j)  +/-  (4.07e-169, 9.59e-921j)
| (7.7245010216477135251e-05 + 1.1385191592225838242e-2062j)  +/-  (1.9e-126, 4.49e-878j)
| (3.7965509483247173751e-17 + 5.9542685478945813994e-2069j)  +/-  (1.41e-150, 3.33e-902j)
| (1.0904296480993778199e-13 - 1.4380984449073755108e-2067j)  +/-  (6.52e-147, 1.54e-898j)
| (6.1223824799612664125e-16 - 1.8387516792076692051e-2068j)  +/-  (2.04e-149, 4.82e-901j)
| (1.0276746289617148113e-34 + 1.1148631063005200659e-2077j)  +/-  (1.16e-163, 2.73e-915j)
| (3.6994660318307207856e-08 + 8.1513401342839303407e-2065j)  +/-  (5.48e-140, 1.29e-891j)
| (8.3067680120581053107e-10 + 1.1387015164028015952e-2066j)  +/-  (9.65e-143, 2.28e-894j)
| (0.0022315308941511319491 - 2.6133833766846638501e-2062j)  +/-  (1.62e-126, 3.83e-878j)
| (0.047982995821754901719 - 5.9611433621146216596e-2062j)  +/-  (1.01e-115, 2.38e-867j)
| (3.0602741720783759559e-41 - 4.0980987737355230785e-2081j)  +/-  (2.54e-167, 5.99e-919j)
| (1.164258053488498953e-25 - 2.104875223386254442e-2072j)  +/-  (1.15e-159, 2.71e-911j)
| (1.1442060340143530214e-51 - 1.7109832378564378166e-2086j)  +/-  (3.47e-171, 8.17e-923j)
| (2.1013137579084832911e-07 - 3.8206423811538848438e-2064j)  +/-  (1.12e-141, 2.64e-893j)
| (0.079542901342423230771 + 6.41931783083766133e-2062j)  +/-  (1.19e-119, 2.8e-871j)
| (2.057466315285910195e-05 - 1.108101519651458356e-2062j)  +/-  (1.52e-137, 3.58e-889j)
| (5.8494045640678211503e-39 + 6.3651379831076985546e-2080j)  +/-  (1.34e-166, 3.17e-918j)
| (2.5905199450667515926e-27 + 1.6012371684028370924e-2073j)  +/-  (2.12e-161, 5e-913j)
| (9.8075376623457149397e-20 + 5.6579085178016785964e-2070j)  +/-  (1.27e-157, 2.99e-909j)
| (0.012700080495204594705 - 4.3191749686315749762e-2062j)  +/-  (8.36e-134, 1.97e-885j)
| (8.6925994226459941073e-15 + 5.3491054179641124188e-2068j)  +/-  (3.83e-153, 9.04e-905j)
| (4.8507576832701092663e-29 - 1.4846493807551214187e-2074j)  +/-  (8.63e-163, 2.04e-914j)
| (7.5755304435493588512e-31 + 1.4098886378494935919e-2075j)  +/-  (8.92e-164, 2.1e-915j)
| (5.8529085701386946484e-09 - 1.5064713882570787326e-2065j)  +/-  (1.49e-149, 3.52e-901j)
| (0.00080418264657531780957 + 1.9492613026387786296e-2062j)  +/-  (2.89e-143, 6.82e-895j)
| (1.2124053496712631895e-12 + 3.4661088377718159702e-2067j)  +/-  (3.59e-153, 8.47e-905j)
| (0.0002621042782512327856 - 1.4526840647006125044e-2062j)  +/-  (8.9e-145, 2.1e-896j)
| (1.0555386081145646851e-10 + 8.9719399871070100813e-2067j)  +/-  (1.26e-151, 2.97e-903j)
| (7.7264723550287895515e-49 + 4.8474625580773018185e-2085j)  +/-  (4.44e-174, 1.05e-925j)
| (2.0648245751535285149e-18 - 1.8496533782198319271e-2069j)  +/-  (6.52e-159, 1.54e-910j)
| (8.7069762793124387436e-37 - 8.8449205556801251783e-2079j)  +/-  (1.17e-168, 2.76e-920j)
| (0.17809313751255617107 - 4.9357432769436750081e-2062j)  +/-  (5.56e-147, 1.31e-898j)
| (1.0742315336404966995e-06 + 2.0601926861394262313e-2063j)  +/-  (8.96e-152, 2.11e-903j)
| (1.2205744823639445569e-43 + 2.327987698874285431e-2082j)  +/-  (4.89e-172, 1.15e-923j)
| (0.11789092404176434905 - 6.4440844981297282794e-2062j)  +/-  (2.72e-148, 6.42e-900j)
| (0.13504754985935373956 - 1.9626569446703024268e-2062j)  +/-  (9.44e-149, 2.23e-900j)
| (0.15496130542230509114 + 5.948072932309956779e-2062j)  +/-  (3.99e-148, 9.42e-900j)
| (0.0055997054539336664366 + 3.4216870396511277835e-2062j)  +/-  (1.44e-150, 3.4e-902j)
| (1.4458342129720064786e-22 + 7.0367711176524878844e-2071j)  +/-  (1.13e-162, 2.67e-914j)
| (4.0493693999735601845e-21 - 1.7984875170027934792e-2070j)  +/-  (6.15e-162, 1.45e-913j)
| (0.026004665018324484633 + 5.2100982443658209488e-2062j)  +/-  (3.67e-152, 8.64e-904j)
| (0.17399713306113329377 + 3.5276591061426387934e-2062j)  +/-  (1.35e-152, 3.21e-904j)
| (0.064777687000696654509 + 5.8893437170104474551e-2063j)  +/-  (3e-153, 6.99e-905j)
Starting with polynomial:
P : -t+1
Extension levels are: 1 54
-------------------------------------------------
Trying to find an order 54 Kronrod extension for:
P1 : -t+1
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : -t^55 + 42037781409208859985752247845389994594072034075851643053607603993154582531/13957424787281114379685655426533268034678651725605490373355741377412135*t^54 - 61023646436189044802568955741203572232765591861986656127152943686031411849646/13957424787281114379685655426533268034678651725605490373355741377412135*t^53 + 1073359667206944434177763369520970738136943458731075228051246013250767481853994/263347637495870082635578404274212604427899089162367742893504554290795*t^52 - 722397201891861842612855893493738575975972347793994403084072721120659827550227592/263347637495870082635578404274212604427899089162367742893504554290795*t^51 + 374129540404701574664747058329314745331707151276103771433262732015033195598394155848/263347637495870082635578404274212604427899089162367742893504554290795*t^50 - 31039004698771384900190540071932223620059457269147637865182569541924929075429993194800/52669527499174016527115680854842520885579817832473548578700910858159*t^49 + 1514126837160397623670955772204656037994689277999044777435402326047257500698696530044400/7524218214167716646730811550691788697939973976067649796957272979737*t^48 - 434114623895327247522981623294774338158661963145238326249335318427575721289981137340556800/7524218214167716646730811550691788697939973976067649796957272979737*t^47 + 106071447509200899395340013009543165762339021336321625591486662244485854752736835769841446400/7524218214167716646730811550691788697939973976067649796957272979737*t^46 - 22343240185282820459987763341240232400709687948866296672083843060219910955965266771938304793600/7524218214167716646730811550691788697939973976067649796957272979737*t^45 + 4094506200652539043731018123414890011397235358228004379294858589886445042605374878848252095104000/7524218214167716646730811550691788697939973976067649796957272979737*t^44 - 657566433907652830448905276587036274709763543506907068558250899448161578355165871115135023650304000/7524218214167716646730811550691788697939973976067649796957272979737*t^43 + 93097510428418791542065828808272326210014063431324467986774302785925299962153295104408861036779008000/7524218214167716646730811550691788697939973976067649796957272979737*t^42 - 11676273983869111582369569020639380892290278462772368441106359298358099009253675469605073981275546624000/7524218214167716646730811550691788697939973976067649796957272979737*t^41 + 1302468122664418838571179740721644682309445164847039495506190799013615652355134407061855700286158212096000/7524218214167716646730811550691788697939973976067649796957272979737*t^40 - 129641514086990590581147644653030274595622645663272223437906226599123367573990691649663610973737016586240000/7524218214167716646730811550691788697939973976067649796957272979737*t^39 + 11544946140903957129480864498279761125918675207908199790095242399091902555109631804951085445210784729149440000/7524218214167716646730811550691788697939973976067649796957272979737*t^38 - 921816689373284827978575176185036233389369171221308085047320475806284368242107683820662451992767019103150080000/7524218214167716646730811550691788697939973976067649796957272979737*t^37 + 66106282367464779140589662958426771524108479564826121705319952416332393347986347925863287534628137218265456640000/7524218214167716646730811550691788697939973976067649796957272979737*t^36 - 4263402368805996164421842521012847152290195455704217699627894454559496396425385261668116227055135342168078581760000/7524218214167716646730811550691788697939973976067649796957272979737*t^35 + 247515195678349354031119368135312304739392750410449324910478266231538132727573218701516999608871431234565741772800000/7524218214167716646730811550691788697939973976067649796957272979737*t^34 - 12943622697205728719656139324024654041880629941786564802187184945826702539418066764822151462937551020035540724940800000/7524218214167716646730811550691788697939973976067649796957272979737*t^33 + 609908509017720452827928650621167643539933915183669863875491367900412308691971943184540875419962829718829861878169600000/7524218214167716646730811550691788697939973976067649796957272979737*t^32 - 25897157189673001283486019162362181289236320634143990110035030293173216713098081724470830981897826515937335275474124800000/7524218214167716646730811550691788697939973976067649796957272979737*t^31 + 990658433045370239188300520460956637562352449834151791451540566503238004001886059147397432506187732437878020646318899200000/7524218214167716646730811550691788697939973976067649796957272979737*t^30 - 34124889590297664543671485303409227835762102347793374721769273526277223146040525812520096533130796624723553306656584499200000/7524218214167716646730811550691788697939973976067649796957272979737*t^29 + 1057721230186405600829368563179194120715959673211154376613593753653639141586348599237127841770573366538718745554853245747200000/7524218214167716646730811550691788697939973976067649796957272979737*t^28 - 29470429628500587547393671540824481979481668141089889981167811204723197460577658526419039392405293751390833704214402066022400000/7524218214167716646730811550691788697939973976067649796957272979737*t^27 + 737161401647894673102444896376151183932072527590447464038137690927873784119368224961748480272619818335845120913066681381683200000/7524218214167716646730811550691788697939973976067649796957272979737*t^26 - 16528136359962127353212492628863985749646224913982301181296414428698465202746755094076811638843654546495870216077981894102220800000/7524218214167716646730811550691788697939973976067649796957272979737*t^25 + 331563893873488469203962908455350097204766442330507785744626200708780399260828216109184627463930292738387709158229729188249600000000/7524218214167716646730811550691788697939973976067649796957272979737*t^24 - 5938186177846425771225227863272608670870945785759541954884457344133586840134944979660835913314680420902004628700228434368921600000000/7524218214167716646730811550691788697939973976067649796957272979737*t^23 + 94710593293883674612004735303956859036293169014015159163861369301343270154580773172409344653799625389678579713944794007024435200000000/7524218214167716646730811550691788697939973976067649796957272979737*t^22 - 1341395504410635145315915172325073325668659104974126702646693993225955776842368489667560001532564810340309174035972203510077849600000000/7524218214167716646730811550691788697939973976067649796957272979737*t^21 + 16815429001047411507436071819719774008411084094904756240670448201431973849642527495074831231657938059504736758426472123382261350400000000/7524218214167716646730811550691788697939973976067649796957272979737*t^20 - 185880829405786890932129027423818045704411816301505733644361689869076721234124578003760071600061772319128643599996605361528242176000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^19 + 1804254181804779765340937620144401859710594133637004675474051293386084920742481277165860473856906404148879667067814708663996645376000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^18 - 15304006353010627128612219642235224104303258368557259935410194250624525204333985746583839051609930873640808127729674612675813834752000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^17 + 112816498630265220071103075048726889130266919372305727009892874232940367037347291544713177867405690721836851020170496040721717395456000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^16 - 718248870915383126215730605488363911551536909542859255046251987977659215566862253903573068757722888832177367082571934869822975770624000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^15 + 3920883753276597314504642546331635118307493790199180923818723309622256548080680839810265971022222081342310968734435521775147952373760000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^14 - 18200736629090055849364050698376998328696435821858967862993500791192877952528500035007562342655966256582229965829515318357133948354560000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^13 + 71152992105774320815016768554524245080485702447703343777676825207002474814767505182221542077632343718747856072290341769721967196241920000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^12 - 231620257733812679610488437623427917415210611496616473271109919719370385968999581038418361479134962892594239508888217594449064477327360000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^11 + 619455944393245276066479145717287888057969551397570275458857284224770075063332590203055840337961175719636776811643851489928324306698240000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^10 - 1339371198531436744594880297687011203766993992014045001231538903100748311760917092397410816011650980906444779346496246626338762601267200000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^9 + 2295745153501840834682038343225520627753046189717087936152027707532904168006179552220514844672219050132177892467980958737769210000179200000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^8 - 3044283045336926585756774472356057631309498680291308394284707896650563930211250877291861540489215922241211199004936571478492651611750400000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^7 + 3027572552671398725270831153744754425614935774293166207033378849923922303080929018289703288082139777639518541385898531306626356556595200000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^6 - 2167820683204227022645119241296084878342668465172417294243075858302042086684437154687032425686045815787234636312139553617027244281036800000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^5 + 1056759376708356354458451005831346357962050574928311235010842619930813781936571282453665923506348525330399962169819688575138976392806400000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^4 - 323342017159255943219511442307060069704750811543754531614051588388488407785335396338450157197565032814599880745207356827984883770982400000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^3 + 54598975985145227798057244252429009324060768075209515148472768309719871222136308526655099474603295742702428818962282596579767274700800000000000/7524218214167716646730811550691788697939973976067649796957272979737*t^2 - 4021541998591321673820356268335338030758468360696600728457930321920210593261258052801382431208754791607349445287401458819834209894400000000000/7524218214167716646730811550691788697939973976067649796957272979737*t + 72703916467098259117969528609596117853761451398786134033523704218351265718407621412770674973781930815752196907471456958324251033600000000000/7524218214167716646730811550691788697939973976067649796957272979737
-------------------------------------------------
Computing nodes and weights
  current precision for roots: 53
  current precision for roots: 106
  current precision for roots: 212
 current precision for weights: 53
Linear system for weights solvable: 0
  current precision for roots: 106
  current precision for roots: 212
  current precision for roots: 424
 current precision for weights: 106
Linear system for weights solvable: 0
  current precision for roots: 212
  current precision for roots: 424
  current precision for roots: 848
 current precision for weights: 212
Linear system for weights solvable: 0
  current precision for roots: 424
  current precision for roots: 848
  current precision for roots: 1696
 current precision for weights: 424
Linear system for weights solvable: 1
  current precision for roots: 848
  current precision for roots: 1696
  current precision for roots: 3392
 current precision for weights: 848
Linear system for weights solvable: 1
Sufficient bits for target precision reached
Positive weights:   55 out of 55
Indefinite weights: 0 out of 55
Negative weights:   0 out of 55
Extension rule has valid weights: 1
-------------------------------------------------
The nodes are:
| (199.26419348982227455 - 3.042372262596729793e-2044j)  +/-  (1.33e-1002, 1.33e-1002j)
| (170.87970944245879326 - 1.0577859117326930282e-2040j)  +/-  (1.62e-999, 1.62e-999j)
| (150.46767983352203822 + 5.5012339506002878859e-2035j)  +/-  (1.59e-997, 1.59e-997j)
| (160.0835963707930566 + 1.9829329476113201021e-2038j)  +/-  (2.03e-998, 2.03e-998j)
| (12.648497564266363125 - 1.5539626894050249718e-2057j)  +/-  (1.33e-1002, 1.33e-1002j)
| (55.053904898080828017 + 1.0305222065275675382e-2047j)  +/-  (5.26e-994, 5.26e-994j)
| (183.43857226094748156 + 2.4832117619864297742e-2067j)  +/-  (7.98e-1001, 7.98e-1001j)
| (75.209447703860712848 + 2.4216739252478905416e-2075j)  +/-  (1.8e-993, 1.8e-993j)
| (106.43044777413090828 - 1.2799589409906166658e-2093j)  +/-  (2.76e-994, 2.76e-994j)
| (133.68116834483663939 - 2.0636916998986770436e-2111j)  +/-  (4.41e-996, 4.41e-996j)
| (25.972922811891276125 + 8.9100237030182636316e-2131j)  +/-  (7.44e-998, 7.44e-998j)
| (141.72822716091658187 + 4.3330302604085000313e-2140j)  +/-  (9.62e-997, 9.62e-997j)
| (126.20411259505363957 - 1.5745795708775364992e-2169j)  +/-  (1.53e-995, 1.53e-995j)
| (9.7644036363312378785 - 2.9421893887398235457e-2197j)  +/-  (3.19e-1004, 3.19e-1004j)
| (38.871294043877100586 + 2.18296750009143155e-2186j)  +/-  (1.8e-995, 1.8e-995j)
| (30.769699361598479331 + 1.9908248210950500851e-2210j)  +/-  (9.12e-997, 9.12e-997j)
| (36.045362713076969204 + 4.7171570551619646681e-2275j)  +/-  (7.1e-996, 7.1e-996j)
| (79.809524974729022634 + 7.8063394164265385273e-2349j)  +/-  (1.85e-993, 1.85e-993j)
| (17.725950477475853271 + 1.1397087055768037244e-2378j)  +/-  (2.38e-1000, 2.38e-1000j)
| (21.631598418703370996 + 1.2824266010265479047e-2402j)  +/-  (4.83e-999, 4.83e-999j)
| (6.1621981768038504586 + 2.9356113712315138754e-2425j)  +/-  (5.58e-1007, 5.58e-1007j)
| (2.6670092458107738317 - 3.8562678089181986255e-2426j)  +/-  (3.52e-1011, 3.52e-1011j)
| (94.980345789568321667 + 1.3142337218983319925e-2467j)  +/-  (8.5e-994, 8.5e-994j)
| (58.738446734611463116 + 1.1705736881877929897e-2545j)  +/-  (8.24e-994, 8.24e-994j)
| (119.21036261067316231 - 3.928569235057866308e-2604j)  +/-  (4.73e-995, 4.73e-995j)
| (15.931172461810188471 - 3.2339708525639260243e-2635j)  +/-  (4.2e-1001, 4.2e-1001j)
| (2.0214170812191008989 + 1.1551644616161705322e-2653j)  +/-  (2.22e-1012, 2.22e-1012j)
| (11.157356289894033388 - 1.6847622409997655209e-2642j)  +/-  (2.25e-1003, 2.25e-1003j)
| (89.677988555778856302 + 6.6425655260227511762e-2647j)  +/-  (1.12e-993, 1.12e-993j)
| (62.58762773841323729 - 4.927694198968634805e-2683j)  +/-  (1.21e-993, 1.21e-993j)
| (44.919282332541104238 - 5.4383537412288415093e-2716j)  +/-  (8.93e-995, 8.93e-995j)
| (4.2306671490205593339 + 1.9230034814264024511e-2769j)  +/-  (5.33e-1009, 5.33e-1009j)
| (33.346042187006193945 + 1.6364793368404783805e-2758j)  +/-  (2.63e-996, 2.63e-996j)
| (66.609563426820227838 + 1.7818149468110419595e-2823j)  +/-  (1.51e-993, 1.51e-993j)
| (70.813389175360717348 + 7.1108504981472719925e-2884j)  +/-  (1.78e-993, 1.78e-993j)
| (19.625425712313326298 - 8.2779827956967008547e-2912j)  +/-  (1.1e-999, 1.1e-999j)
| (7.2679618129885290611 - 5.9988322154428023394e-2919j)  +/-  (5.3e-1006, 5.3e-1006j)
| (28.313008990770255385 - 3.4263493857296509488e-2907j)  +/-  (2.8e-997, 2.8e-997j)
| (8.4683356940336825471 - 8.4595739195706124793e-2924j)  +/-  (4.51e-1005, 4.51e-1005j)
| (23.746642876702487669 + 1.9047558446071356951e-2913j)  +/-  (1.94e-998, 1.94e-998j)
| (112.63560927578009992 + 1.0266378811477995966e-2932j)  +/-  (1.18e-994, 1.18e-994j)
| (41.827813048693256316 + 1.2276200214816170052e-2972j)  +/-  (4.33e-995, 4.33e-995j)
| (84.627150925952074741 - 1.8067317874668911069e-2996j)  +/-  (1.56e-993, 1.56e-993j)
| (0.62332852838776967041 - 1.0761751372774180358e-3034j)  +/-  (4.85e-1016, 4.85e-1016j)
| (14.23925189540408009 - 8.4747719089247330785e-3021j)  +/-  (8.05e-1002, 8.05e-1002j)
| (100.55586181887635934 + 1.6250631219494247468e-3011j)  +/-  (4.97e-994, 4.97e-994j)
| (1.4659012292209814646 - 2.2451904539311993995e-3038j)  +/-  (1.32e-1013, 1.32e-1013j)
| (0.1365032952604870114 + 2.2017203989298372852e-3042j)  +/-  (6.9e-1019, 6.9e-1019j)
| (1 + 1.2861934312228633251e-3038j)  +/-  (8.09e-1015, 8.09e-1015j)
| (5.1500621255959500772 - 5.7671211461085640865e-3032j)  +/-  (5.94e-1008, 5.94e-1008j)
| (51.526755799383710095 + 1.2400449260238955392e-3016j)  +/-  (3.23e-994, 3.23e-994j)
| (48.150499564010541487 + 5.0398727986075413575e-3027j)  +/-  (1.86e-994, 1.86e-994j)
| (3.4032184821047071901 + 7.2983374470063893707e-3050j)  +/-  (4.6e-1010, 4.6e-1010j)
| (0.33557645304741157696 - 8.1961304411350069769e-3057j)  +/-  (1.88e-1017, 1.88e-1017j)
| (0.025902778757610585986 + 9.2689576072079303658e-3085j)  +/-  (1.42e-1020, 1.42e-1020j)
-------------------------------------------------
The weights are:
| (5.4013640101040295559e-86 - 6.1419588566805383882e-2104j)  +/-  (4.02e-176, 9.48e-928j)
| (7.0819702723877378323e-74 - 8.396182704230854591e-2098j)  +/-  (9.31e-173, 2.2e-924j)
| (4.108233354357018163e-65 - 2.3621842559157621213e-2093j)  +/-  (1.61e-170, 3.79e-922j)
| (3.0383336799029308109e-69 + 1.8811910446761655174e-2095j)  +/-  (1.15e-171, 2.71e-923j)
| (4.9493181802179055046e-06 + 4.1880631138904347795e-2063j)  +/-  (6.76e-120, 1.59e-871j)
| (4.4387681227119976825e-24 - 2.2261785853392753574e-2071j)  +/-  (1.5e-151, 3.54e-903j)
| (2.9723563101817768588e-79 + 1.5831400488713263339e-2100j)  +/-  (3.75e-175, 8.84e-927j)
| (9.7673159273843011225e-33 - 1.2940536244545542303e-2076j)  +/-  (1.36e-158, 3.21e-910j)
| (3.6178821383170231776e-46 - 1.149353228069015728e-2083j)  +/-  (1.31e-165, 3.08e-917j)
| (6.7926588980968721978e-58 - 1.1208998669653308003e-2089j)  +/-  (9.8e-170, 2.31e-921j)
| (1.1982810863731584447e-11 - 6.9833960117417460532e-2067j)  +/-  (1.19e-141, 2.82e-893j)
| (2.3489921613200291326e-61 + 1.9285927274634490557e-2091j)  +/-  (9.88e-171, 2.33e-922j)
| (1.1193764088459133947e-54 + 4.9275634005952609668e-2088j)  +/-  (4.07e-169, 9.59e-921j)
| (7.7245010216477135251e-05 + 1.1385191592225838242e-2062j)  +/-  (1.9e-126, 4.49e-878j)
| (3.7965509483247173751e-17 + 5.9542685478945813994e-2069j)  +/-  (1.41e-150, 3.33e-902j)
| (1.0904296480993778199e-13 - 1.4380984449073755108e-2067j)  +/-  (6.52e-147, 1.54e-898j)
| (6.1223824799612664125e-16 - 1.8387516792076692051e-2068j)  +/-  (2.04e-149, 4.82e-901j)
| (1.0276746289617148113e-34 + 1.1148631063005200659e-2077j)  +/-  (1.16e-163, 2.73e-915j)
| (3.6994660318307207856e-08 + 8.1513401342839303407e-2065j)  +/-  (5.48e-140, 1.29e-891j)
| (8.3067680120581053107e-10 + 1.1387015164028015952e-2066j)  +/-  (9.65e-143, 2.28e-894j)
| (0.0022315308941511319491 - 2.6133833766846638501e-2062j)  +/-  (1.62e-126, 3.83e-878j)
| (0.047982995821754901719 - 5.9611433621146216596e-2062j)  +/-  (1.01e-115, 2.38e-867j)
| (3.0602741720783759559e-41 - 4.0980987737355230785e-2081j)  +/-  (2.54e-167, 5.99e-919j)
| (1.164258053488498953e-25 - 2.104875223386254442e-2072j)  +/-  (1.15e-159, 2.71e-911j)
| (1.1442060340143530214e-51 - 1.7109832378564378166e-2086j)  +/-  (3.47e-171, 8.17e-923j)
| (2.1013137579084832911e-07 - 3.8206423811538848438e-2064j)  +/-  (1.12e-141, 2.64e-893j)
| (0.079542901342423230771 + 6.41931783083766133e-2062j)  +/-  (1.19e-119, 2.8e-871j)
| (2.057466315285910195e-05 - 1.108101519651458356e-2062j)  +/-  (1.52e-137, 3.58e-889j)
| (5.8494045640678211503e-39 + 6.3651379831076985546e-2080j)  +/-  (1.34e-166, 3.17e-918j)
| (2.5905199450667515926e-27 + 1.6012371684028370924e-2073j)  +/-  (2.12e-161, 5e-913j)
| (9.8075376623457149397e-20 + 5.6579085178016785964e-2070j)  +/-  (1.27e-157, 2.99e-909j)
| (0.012700080495204594705 - 4.3191749686315749762e-2062j)  +/-  (8.36e-134, 1.97e-885j)
| (8.6925994226459941073e-15 + 5.3491054179641124188e-2068j)  +/-  (3.83e-153, 9.04e-905j)
| (4.8507576832701092663e-29 - 1.4846493807551214187e-2074j)  +/-  (8.63e-163, 2.04e-914j)
| (7.5755304435493588512e-31 + 1.4098886378494935919e-2075j)  +/-  (8.92e-164, 2.1e-915j)
| (5.8529085701386946484e-09 - 1.5064713882570787326e-2065j)  +/-  (1.49e-149, 3.52e-901j)
| (0.00080418264657531780957 + 1.9492613026387786296e-2062j)  +/-  (2.89e-143, 6.82e-895j)
| (1.2124053496712631895e-12 + 3.4661088377718159702e-2067j)  +/-  (3.59e-153, 8.47e-905j)
| (0.0002621042782512327856 - 1.4526840647006125044e-2062j)  +/-  (8.9e-145, 2.1e-896j)
| (1.0555386081145646851e-10 + 8.9719399871070100813e-2067j)  +/-  (1.26e-151, 2.97e-903j)
| (7.7264723550287895515e-49 + 4.8474625580773018185e-2085j)  +/-  (4.44e-174, 1.05e-925j)
| (2.0648245751535285149e-18 - 1.8496533782198319271e-2069j)  +/-  (6.52e-159, 1.54e-910j)
| (8.7069762793124387436e-37 - 8.8449205556801251783e-2079j)  +/-  (1.17e-168, 2.76e-920j)
| (0.17809313751255617107 - 4.9357432769436750081e-2062j)  +/-  (5.56e-147, 1.31e-898j)
| (1.0742315336404966995e-06 + 2.0601926861394262313e-2063j)  +/-  (8.96e-152, 2.11e-903j)
| (1.2205744823639445569e-43 + 2.327987698874285431e-2082j)  +/-  (4.89e-172, 1.15e-923j)
| (0.11789092404176434905 - 6.4440844981297282794e-2062j)  +/-  (2.72e-148, 6.42e-900j)
| (0.13504754985935373956 - 1.9626569446703024268e-2062j)  +/-  (9.44e-149, 2.23e-900j)
| (0.15496130542230509114 + 5.948072932309956779e-2062j)  +/-  (3.99e-148, 9.42e-900j)
| (0.0055997054539336664366 + 3.4216870396511277835e-2062j)  +/-  (1.44e-150, 3.4e-902j)
| (1.4458342129720064786e-22 + 7.0367711176524878844e-2071j)  +/-  (1.13e-162, 2.67e-914j)
| (4.0493693999735601845e-21 - 1.7984875170027934792e-2070j)  +/-  (6.15e-162, 1.45e-913j)
| (0.026004665018324484633 + 5.2100982443658209488e-2062j)  +/-  (3.67e-152, 8.64e-904j)
| (0.17399713306113329377 + 3.5276591061426387934e-2062j)  +/-  (1.35e-152, 3.21e-904j)
| (0.064777687000696654509 + 5.8893437170104474551e-2063j)  +/-  (3e-153, 6.99e-905j)
