Starting with polynomial:
P : t^4 - 6*t^2 + 3
Extension levels are: 4 20 31
-------------------------------------------------
Trying to find an order 20 Kronrod extension for:
P1 : t^4 - 6*t^2 + 3
Solvable: 1
-------------------------------------------------
Trying to find an order 31 Kronrod extension for:
P2 : t^24 - 84138653676/363937411*t^22 + 32020783562037/1455749644*t^20 - 818664521682555/727874822*t^18 + 2902354334703135/85632332*t^16 - 13308321713911110/21408083*t^14 + 296858052476011845/42816166*t^12 - 979371031782448305/21408083*t^10 + 7231298316318101025/42816166*t^8 - 6819868970176912650/21408083*t^6 + 23115246943434671025/85632332*t^4 - 3840059178024144075/42816166*t^2 + 36936160291505475/5037196
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : t^55 - 1977367853807770498083226836679728845192335418810488637921768049273081511352806020216754331602766028356787664140270839262794713280109925900679777203945112789225607033487045475782660809258669674218409499622059/1719460200670040528453042380806947767917721032235347319818644558313380360223108722112650537354716230561491620859112038009693973666242580169900665329938137666209749243024850497553043255238984826537898011489*t^53 + 4151099242696825704209823405444787903741101718927011335557643907159274695030301071712719894868513325742877467517245882740130974130152613973191585328673424932693861964260239153323727985858732604800050258993068843/6877840802680162113812169523227791071670884128941389279274578233253521440892434888450602149418864922245966483436448152038775894664970320679602661319752550664838996972099401990212173020955939306151592045956*t^51 - 77872661482577001518434375131870975320406834116103908919175206471284093796912640961614286553326634106331208686043968404652801882311617345098720209342305417818960258996782252585502743247455568424108614932440978975/404578870745891889047774677836928886568875536996552310545563425485501261228966758144153067612874407190939204908026361884633876156762960039976627136456032392049352763064670705306598412997408194479505414468*t^49 + 144022269257946230326176084705822602294633697577893784194797082169398195650126835547614318989096390048187872889633224535734578994719369335171018926067572424771356900927087674962263331480482251599442222284158362596825/3438920401340081056906084761613895535835442064470694639637289116626760720446217444225301074709432461122983241718224076019387947332485160339801330659876275332419498486049700995106086510477969653075796022978*t^47 - 22749382015832584991944972508553408450857232517011096759149997235984871946496288973224802765011293688287795141016212205949840903670187094083732982592699316821166180701718979411342616902593911627792802746017787846997185/3438920401340081056906084761613895535835442064470694639637289116626760720446217444225301074709432461122983241718224076019387947332485160339801330659876275332419498486049700995106086510477969653075796022978*t^45 + 1354725656881605293530293257580061052668391914112425863180516916147714259748395038058069935628205886688679404178134557325648734548325540707788435140015280420873881468636675792906994616241363867135188750720245020120036080/1719460200670040528453042380806947767917721032235347319818644558313380360223108722112650537354716230561491620859112038009693973666242580169900665329938137666209749243024850497553043255238984826537898011489*t^43 - 7335834237064726806840600558730805488264761627389765009415688654851383836564278957993889161164515039034313692355817840922767232495689078248642582343419678908038539169381584415830707259764168659044795452740465957073209320/101144717686472972261943669459232221642218884249138077636390856371375315307241689536038266903218601797734801227006590471158469039190740009994156784114008098012338190766167676326649603249352048619876353617*t^41 + 1388174252141796591336618236950551438664930762588536632990777773586310535156607676062758371884136203618410102973297131080827618032290768197395263731564289918422586807088996298922939041616338716103486206325835359648171331225/264532338564621619762006520124145810448880158805438049202868393586673901572785957248100082669956343163306403209094159693799072871729627718446256204605867333263038345080746230392775885421382281005830463306*t^39 - 79845786344080750294305211054564525431681560861188916471996444381919273908015449575713486879349242278565042716494654782183245452711321813685369298338409520313688586919391047159887279125952343336262471770007283211287060761325/264532338564621619762006520124145810448880158805438049202868393586673901572785957248100082669956343163306403209094159693799072871729627718446256204605867333263038345080746230392775885421382281005830463306*t^37 + 7356702871933627662676355131045769069987573947480922068244173228277389338946158701537011197615975245552875624398500263205434994624653116313136133082814537802366790888728165714909434065019316035626495527400087648938316494230775/529064677129243239524013040248291620897760317610876098405736787173347803145571914496200165339912686326612806418188319387598145743459255436892512409211734666526076690161492460785551770842764562011660926612*t^35 - 272651891422842471148071154471198496029771629137661006095565312118061798325676555304773976655893545017821148122219625991055405752444821794564815955920323272208255943708433318760270355399104214850508366883354518282575036015761275/529064677129243239524013040248291620897760317610876098405736787173347803145571914496200165339912686326612806418188319387598145743459255436892512409211734666526076690161492460785551770842764562011660926612*t^33 + 2036292462612853166053497530826164679315681251962516751423508736551536888435158720432365808321333646163763198872770096338468263724458874716858016941636256579605243773750152021269074626754249842675863247564810061415233213207611425/132266169282310809881003260062072905224440079402719024601434196793336950786392978624050041334978171581653201604547079846899536435864813859223128102302933666631519172540373115196387942710691140502915231653*t^31 - 49020360405759584260267897463134815088591228766956060281809654975784858060840921280175306690799327564845407067518070661746672212423783702622714959585105981052412497692054913098036463050790652520093507391866904193242792280576491625/132266169282310809881003260062072905224440079402719024601434196793336950786392978624050041334978171581653201604547079846899536435864813859223128102302933666631519172540373115196387942710691140502915231653*t^29 + 948692220108875034783590243480110680929288021764593888103289828111586072828615953925166996061539088156992193556263327367101463236913801342618917956706479918879300298798367886228771544580534629981582001982166849465134961584105200750/132266169282310809881003260062072905224440079402719024601434196793336950786392978624050041334978171581653201604547079846899536435864813859223128102302933666631519172540373115196387942710691140502915231653*t^27 - 14693952802586740153853140566913464891351552393034122417748462927500584377896588047215005609612218191965776569622186743693923474556948247572732676332102405607814842737891759365055230679981987708223743687237571998257318313497156633750/132266169282310809881003260062072905224440079402719024601434196793336950786392978624050041334978171581653201604547079846899536435864813859223128102302933666631519172540373115196387942710691140502915231653*t^25 + 180922172981077553108673111273392449012756133710313016427630955528366496225360898670701579333230002640127554592164913845984375450725995061753118726985349609657311922714509158124136685482589430288920008730673984799718151555221621333750/132266169282310809881003260062072905224440079402719024601434196793336950786392978624050041334978171581653201604547079846899536435864813859223128102302933666631519172540373115196387942710691140502915231653*t^23 - 1754532766824606656135091231150310080853641416359615693725284519222650549322359635892488725746481520203676288890598039292601570347803565999027295151070874459868184863228666597151007269689848350841682547532861368410875708028011305807500/132266169282310809881003260062072905224440079402719024601434196793336950786392978624050041334978171581653201604547079846899536435864813859223128102302933666631519172540373115196387942710691140502915231653*t^21 + 52952518395309943380254684760960571627018040435936258154858891467754903826304026268336473880367612401585945640219567756432901136375856582328867333884431227497709021229745477246963671876750497837301640953721324285484002965616682225603125/529064677129243239524013040248291620897760317610876098405736787173347803145571914496200165339912686326612806418188319387598145743459255436892512409211734666526076690161492460785551770842764562011660926612*t^19 - 17995936022186764095740279162683755147531581002061643948966732397944515226016629287156442224053860148401205005793503752257856798285410864390594676592481598178679411301054761339461526468961489231070929788732619919682129446119170537790625/31121451595837837619059590602840683582221195153580946965043340421961635479151289088011774431759569783918400377540489375741067396674073849228971318188925568619180981774205438869738339461339091883038878036*t^17 + 38991079605379504848446290758408404298804877441142068025419136530835937454803105123308669677561372168883840628467742536909238461384364394363980104470394754655978374444991227311557612149159138179370603257310829928042808682950817495490625/15560725797918918809529795301420341791110597576790473482521670210980817739575644544005887215879784891959200188770244687870533698337036924614485659094462784309590490887102719434869169730669545941519439018*t^15 - 123344383923636121435945942637792828723474747203989693525413087285317405576845675136561482105563106144675803713818416385257637069945056964452787412456600926397989849179971698838824104848834048787750767462806172625148764853735541315115625/15560725797918918809529795301420341791110597576790473482521670210980817739575644544005887215879784891959200188770244687870533698337036924614485659094462784309590490887102719434869169730669545941519439018*t^13 + 137400668844958601979070239292326980445473409108075031943085211529870788575527282315023996354464400594961122630756003627780540080166121745177134371140829561825496708399116063236666641239507781183688681235894253842451421790781857807931250/7780362898959459404764897650710170895555298788395236741260835105490408869787822272002943607939892445979600094385122343935266849168518462307242829547231392154795245443551359717434584865334772970759719509*t^11 - 205364703962023869789202091342058551739642132026466468416597269831452140553979032181738801656227940491444158468915425444664390907654189176377334025457963138021512672603687230312246214392165776518477323019814029393485620896606677393031250/7780362898959459404764897650710170895555298788395236741260835105490408869787822272002943607939892445979600094385122343935266849168518462307242829547231392154795245443551359717434584865334772970759719509*t^9 + 384825256454134440870207219792552889170819661960804367564711764372686166433842669097926276284477798735586604126500207663335437737889822921742933471587209383142338313307380264080607115419110918279196403476082259620223343869616971813140625/15560725797918918809529795301420341791110597576790473482521670210980817739575644544005887215879784891959200188770244687870533698337036924614485659094462784309590490887102719434869169730669545941519439018*t^7 - 204254956566915810238165510744204058953438499994142945464989024154546484798710544616541591425897371048394315494226156157063173733007994043567247228073161699597968048752468235843112039920473777307858617478109763685807109912933946530078125/15560725797918918809529795301420341791110597576790473482521670210980817739575644544005887215879784891959200188770244687870533698337036924614485659094462784309590490887102719434869169730669545941519439018*t^5 + 102445094077374225341127205130197473425360638410145095718729364318751374101839660743208540426588145304595404406624144015377030628520205516436416046906592306594037192371372068617368397665888958983071126583632907652847120127487714800078125/31121451595837837619059590602840683582221195153580946965043340421961635479151289088011774431759569783918400377540489375741067396674073849228971318188925568619180981774205438869738339461339091883038878036*t^3 - 443059625655431227918562571958913406736639740259677309898215667059540134470483150153683528562412639302349836579607989059360563696528423443501775803812670462183776643134076645761114364888250832065488588454117828868480475975691943515625/1830673623284578683474093564872981387189482067857702762649608260115390322303017005177163201868209987289317669267087610337709846863180814660527724599348562859951822457306202286455196438902299522531698708*t
-------------------------------------------------
Computing nodes and weights
  current precision for roots: 53
  current precision for roots: 106
 current precision for weights: 53
Linear system for weights solvable: 0
  current precision for roots: 106
  current precision for roots: 212
 current precision for weights: 106
Linear system for weights solvable: 0
  current precision for roots: 212
  current precision for roots: 424
 current precision for weights: 212
Linear system for weights solvable: 1
  current precision for roots: 424
  current precision for roots: 848
 current precision for weights: 424
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:
| (9.3100105492708492142 + 3.5858943146225446564e-740j)  +/-  (7.31e-244, 7.31e-244j)
| (10.778203279994065205 - 1.1503563487835406779e-741j)  +/-  (4.52e-245, 4.52e-245j)
| (-10.778203279994065205 - 2.8253703202577690102e-738j)  +/-  (4.61e-245, 4.61e-245j)
| (-6.9837383000327542002 - 7.5879490328824991487e-741j)  +/-  (7.11e-243, 7.11e-243j)
| (-10.003493158128668602 + 1.8061572029852211917e-752j)  +/-  (2.33e-244, 2.33e-244j)
| (8.6704873891320567664 - 1.5113805430827762927e-758j)  +/-  (1.86e-243, 1.86e-243j)
| (6.9837383000327542002 + 1.8889505898238011426e-758j)  +/-  (6.81e-243, 6.81e-243j)
| (-14.437375122391294101 + 1.0894612066362786653e-763j)  +/-  (2.14e-248, 2.14e-248j)
| (-11.707164095433231326 + 8.2258520634884829278e-761j)  +/-  (4.1e-246, 4.1e-246j)
| (8.0720954824796596598 + 1.0848611545831990637e-760j)  +/-  (3.17e-243, 3.17e-243j)
| (10.003493158128668602 + 1.3316166132342814541e-759j)  +/-  (2.27e-244, 2.27e-244j)
| (5.658718696001041521 - 3.2343173978900207193e-758j)  +/-  (5.33e-243, 5.33e-243j)
| (4.4728052752859291175 - 8.1020000704835643046e-759j)  +/-  (7.9e-244, 7.9e-244j)
| (-4.4728052752859291175 + 3.8884624164156245191e-757j)  +/-  (7.26e-244, 7.26e-244j)
| (-5.658718696001041521 + 2.1101538522099082241e-761j)  +/-  (5.42e-243, 5.42e-243j)
| (11.707164095433231326 + 9.0909743843832492211e-781j)  +/-  (3.99e-246, 3.99e-246j)
| (2.3344142183389772393 - 3.0422733157549434985e-782j)  +/-  (2.22e-247, 2.22e-247j)
| (6.5028789978119488797 + 7.2815522037303746814e-777j)  +/-  (7.89e-243, 7.89e-243j)
| (-1.2169314735644034995 - 2.1036435494386711218e-789j)  +/-  (1.49e-250, 1.49e-250j)
| (-9.3100105492708492142 - 2.2076256216502234285e-780j)  +/-  (7.63e-244, 7.63e-244j)
| (3.4045631176112763163 - 9.8463330455517327537e-802j)  +/-  (2.58e-245, 2.58e-245j)
| (3.0269747476859080056 + 1.8780884410319916185e-803j)  +/-  (4.46e-246, 4.46e-246j)
| (-8.0720954824796596598 - 6.6010049356692147367e-799j)  +/-  (3.4e-243, 3.4e-243j)
| (4.8473074271568575963 + 2.4767370113914367498e-814j)  +/-  (1.76e-243, 1.76e-243j)
| (-4.8473074271568575963 - 5.4731780797322488591e-814j)  +/-  (1.84e-243, 1.84e-243j)
| (14.437375122391294101 - 7.3385037986855175312e-834j)  +/-  (2.13e-248, 2.13e-248j)
| (2.073054476242395474 + 9.4462702229425673296e-833j)  +/-  (3.99e-248, 3.99e-248j)
| (0.95727802229468898435 + 1.0220923491044536832e-835j)  +/-  (3.88e-251, 3.88e-251j)
| (-7.5094830346155335948 - 2.5860801508363668545e-826j)  +/-  (5.33e-243, 5.33e-243j)
| (-0.74196378430272585765 + 1.3599417729657640243e-848j)  +/-  (5.91e-252, 5.91e-252j)
| (-2.6204676404395589732 + 1.4689133187167717634e-842j)  +/-  (8.39e-247, 8.39e-247j)
| (5.244713429373169514 - 5.5488697018954203122e-840j)  +/-  (3.14e-243, 3.14e-243j)
| (0.74196378430272585765 + 2.2447886074548934568e-848j)  +/-  (5.91e-252, 5.91e-252j)
| (4.0964823249700962101 + 4.9701008243649124789e-841j)  +/-  (2.88e-244, 2.88e-244j)
| (-2.3344142183389772393 + 4.2623323319780688315e-843j)  +/-  (2.24e-247, 2.24e-247j)
| (-3.4045631176112763163 - 3.9363730678411247267e-839j)  +/-  (2.56e-245, 2.56e-245j)
| (2.6204676404395589732 - 1.6059207498782386289e-844j)  +/-  (7.99e-247, 7.99e-247j)
| (-6.5028789978119488797 - 2.6724399959919521337e-839j)  +/-  (8.22e-243, 8.22e-243j)
| (-8.6704873891320567664 - 9.6580139370839017802e-851j)  +/-  (1.81e-243, 1.81e-243j)
| (-3.0269747476859080056 + 8.5892220891882421824e-857j)  +/-  (4.6e-246, 4.6e-246j)
| (-2.073054476242395474 + 4.9916866773782962262e-859j)  +/-  (4.31e-248, 4.31e-248j)
| (-3.7371891405471332409 - 6.4749935373107939113e-855j)  +/-  (9.89e-245, 9.89e-245j)
| (3.7371891405471332409 + 1.3161290689239986745e-857j)  +/-  (9.27e-245, 9.27e-245j)
| (1.6525104836673741412 + 1.4618066657177993328e-861j)  +/-  (1.92e-249, 1.92e-249j)
| (-6.0704863650986940061 - 7.920798053718949097e-854j)  +/-  (7.09e-243, 7.09e-243j)
| (-1.6525104836673741412 + 2.6307772044469262379e-866j)  +/-  (1.95e-249, 1.95e-249j)
| (-0.34413999107627035477 + 1.1442503449251847296e-867j)  +/-  (1.43e-253, 1.43e-253j)
| (1.2169314735644034995 - 3.2603865720263572213e-865j)  +/-  (1.5e-250, 1.5e-250j)
| (-3.3763566362503288917e-900 - 8.8022284341562397601e-901j)  +/-  (1.92e-898, 1.92e-898j)
| (-4.0964823249700962101 + 3.5616066619032545736e-857j)  +/-  (3.08e-244, 3.08e-244j)
| (-5.244713429373169514 + 1.9837631467186606663e-857j)  +/-  (3.26e-243, 3.26e-243j)
| (-0.95727802229468898435 + 3.6653374467521557023e-866j)  +/-  (3.67e-251, 3.67e-251j)
| (6.0704863650986940061 - 4.0534106575616938998e-858j)  +/-  (7.21e-243, 7.21e-243j)
| (0.34413999107627035477 - 7.6774038581327662991e-871j)  +/-  (1.43e-253, 1.43e-253j)
| (7.5094830346155335948 - 5.9675408177707394327e-868j)  +/-  (5.2e-243, 5.2e-243j)
-------------------------------------------------
The weights are:
| (3.9926995143588256917e-20 - 1.2211011423697918188e-758j)  +/-  (7.8e-76, 1.32e-198j)
| (1.9729412489802311623e-26 - 2.7884036737330173892e-763j)  +/-  (2.63e-79, 4.44e-202j)
| (1.9729412489802311623e-26 + 1.4741406191079807325e-762j)  +/-  (9.78e-81, 1.65e-203j)
| (5.1695889264249116936e-12 - 2.2624267757666927111e-751j)  +/-  (1.29e-71, 2.18e-194j)
| (5.4064412964551297161e-23 - 2.8108930953345875722e-760j)  +/-  (3.86e-79, 6.52e-202j)
| (1.1668636781897216091e-17 + 2.5813343290083571217e-757j)  +/-  (4.51e-76, 7.61e-199j)
| (5.1695889264249116936e-12 - 3.2408965658939849339e-753j)  +/-  (2.09e-72, 3.53e-195j)
| (8.4285350390351967208e-43 + 8.2149431969194580234e-772j)  +/-  (2.28e-89, 3.84e-212j)
| (7.3684580657409619056e-31 - 3.7704557825288413896e-765j)  +/-  (1.06e-83, 1.79e-206j)
| (1.6420771042654459348e-15 - 6.8952161255912803275e-756j)  +/-  (2.02e-75, 3.41e-198j)
| (5.4064412964551297161e-23 + 2.0904345295387758097e-761j)  +/-  (5.55e-80, 9.36e-203j)
| (1.8362359970007265466e-08 + 3.9437872894998946366e-750j)  +/-  (1.77e-70, 2.99e-193j)
| (6.7306715534019682781e-06 - 7.9730068076033600679e-748j)  +/-  (5.98e-67, 1.01e-189j)
| (6.7306715534019682781e-06 - 3.4443416455072241599e-747j)  +/-  (3.91e-69, 6.6e-192j)
| (1.8362359970007265466e-08 + 3.4626557950600062553e-749j)  +/-  (4.14e-73, 6.99e-196j)
| (7.3684580657409619056e-31 + 7.5015149554729950936e-766j)  +/-  (1.36e-85, 2.3e-208j)
| (0.0047858587634742626712 - 9.046039570740429678e-745j)  +/-  (8.19e-59, 1.38e-181j)
| (1.1927347588836059591e-10 + 4.9070943054835838253e-752j)  +/-  (4.28e-73, 7.22e-196j)
| (0.080047427807468692785 + 7.3144265186266526043e-744j)  +/-  (1.78e-50, 3.01e-173j)
| (3.9926995143588256917e-20 + 2.4621115178576534906e-758j)  +/-  (1.47e-82, 2.48e-205j)
| (0.0004204524166211021982 + 3.4872172884712559679e-746j)  +/-  (3.99e-65, 6.74e-188j)
| (0.0016488767121067278581 - 9.2607946034888169173e-746j)  +/-  (1.44e-63, 2.43e-186j)
| (1.6420771042654459348e-15 + 7.271166367861206767e-755j)  +/-  (6.71e-81, 1.13e-203j)
| (1.2067182274271780557e-06 + 1.6547969894870260084e-748j)  +/-  (2.67e-70, 4.51e-193j)
| (1.2067182274271780557e-06 + 8.6106154790278828396e-748j)  +/-  (1.27e-73, 2.14e-196j)
| (8.4285350390351967208e-43 - 2.5622032830879710191e-772j)  +/-  (4.96e-94, 8.36e-217j)
| (0.017654019756164751828 + 1.1835298699769176431e-744j)  +/-  (9.01e-62, 1.52e-184j)
| (0.019735595980675904581 - 1.1558269364868732092e-743j)  +/-  (9.77e-58, 1.65e-180j)
| (1.2354533996161045324e-13 - 3.7470319065528650495e-753j)  +/-  (8.22e-80, 1.39e-202j)
| (0.11959502744141812433 + 1.3905212180732643494e-743j)  +/-  (1.05e-58, 1.77e-181j)
| (0.0050095076735374765072 + 7.6548389051129049011e-745j)  +/-  (5.02e-68, 8.47e-191j)
| (1.7413290146170937469e-07 - 2.7406820553562477076e-749j)  +/-  (6.89e-72, 1.16e-194j)
| (0.11959502744141812433 + 1.1314674729151387066e-743j)  +/-  (2.87e-59, 4.84e-182j)
| (3.4040043385435197285e-05 + 3.4510922559254819593e-747j)  +/-  (3.05e-69, 5.14e-192j)
| (0.0047858587634742626712 - 1.7705516063047807339e-744j)  +/-  (3.32e-67, 5.6e-190j)
| (0.0004204524166211021982 + 9.7516827823138658368e-746j)  +/-  (1.5e-71, 2.53e-194j)
| (0.0050095076735374765072 + 3.5729836854614843701e-745j)  +/-  (3.5e-66, 5.91e-189j)
| (1.1927347588836059591e-10 + 1.2260067271713969589e-750j)  +/-  (7.85e-79, 1.33e-201j)
| (1.1668636781897216091e-17 - 1.4762780636908912287e-756j)  +/-  (2.67e-83, 4.51e-206j)
| (0.0016488767121067278581 - 2.2689691096035911887e-745j)  +/-  (2.93e-71, 4.95e-194j)
| (0.017654019756164751828 + 2.1379353922671740444e-744j)  +/-  (4.83e-69, 8.15e-192j)
| (0.00012477946803215186823 - 4.0747502772514424344e-746j)  +/-  (1.98e-73, 3.33e-196j)
| (0.00012477946803215186823 - 1.2869884429728999719e-746j)  +/-  (1.74e-72, 2.94e-195j)
| (0.044639509110836386864 - 1.6074983295120753159e-744j)  +/-  (5.86e-69, 9.88e-192j)
| (1.6477630595998865405e-09 - 6.5982334032779811965e-750j)  +/-  (1.11e-78, 1.87e-201j)
| (0.044639509110836386864 - 2.5620490107176313025e-744j)  +/-  (2.18e-70, 3.69e-193j)
| (0.14200670684062453956 - 9.224830279439762002e-744j)  +/-  (7.14e-69, 1.2e-191j)
| (0.080047427807468692785 + 5.2046794034412968214e-744j)  +/-  (8.28e-70, 1.4e-192j)
| (0.12858013265656171869 + 9.1488333404573684246e-744j)  +/-  (3.58e-69, 6.03e-192j)
| (3.4040043385435197285e-05 + 1.2624724602787818319e-746j)  +/-  (6.76e-75, 1.14e-197j)
| (1.7413290146170937469e-07 - 1.7940018365052941781e-748j)  +/-  (3.15e-77, 5.32e-200j)
| (0.019735595980675904581 - 1.5090310753098506203e-743j)  +/-  (5.05e-71, 8.54e-194j)
| (1.6477630595998865405e-09 - 5.0868678633198475089e-751j)  +/-  (2.4e-80, 4.05e-203j)
| (0.14200670684062453956 - 8.3859135634815656174e-744j)  +/-  (1.51e-72, 3.09e-195j)
| (1.2354533996161045324e-13 + 1.640384431403428632e-754j)  +/-  (6.25e-84, 1.05e-206j)
