Starting with polynomial:
P : 414847067813984717066925/549755813888*t^43 - 4407140026306214111899215/549755813888*t^41 + 10885104884250287866739025/274877906944*t^39 - 33192850696417544482525175/274877906944*t^37 + 139914168125405598894694725/549755813888*t^35 - 216230987102899561928164575/549755813888*t^33 + 31713878108425269082797471/68719476736*t^31 - 28859008454829256601762865/68719476736*t^29 + 82512376286342804086730445/274877906944*t^27 - 46637430074889411005543295/274877906944*t^25 + 10441215688408077090793275/137438953472*t^23 - 3694584012821319585973005/137438953472*t^21 + 2052546673789621992207225/274877906944*t^19 - 442604642141267794032075/274877906944*t^17 + 18218593017921434621175/68719476736*t^15 - 2237371072376316532425/68719476736*t^13 + 1586499487685024450265/549755813888*t^11 - 96845140757687397075/549755813888*t^9 + 1898924328582105825/274877906944*t^7 - 42832879592077575/274877906944*t^5 + 911337863661225/549755813888*t^3 - 2893136075115/549755813888*t
Extension levels are: 43 44
-------------------------------------------------
Trying to find an order 44 Kronrod extension for:
P1 : 414847067813984717066925/549755813888*t^43 - 4407140026306214111899215/549755813888*t^41 + 10885104884250287866739025/274877906944*t^39 - 33192850696417544482525175/274877906944*t^37 + 139914168125405598894694725/549755813888*t^35 - 216230987102899561928164575/549755813888*t^33 + 31713878108425269082797471/68719476736*t^31 - 28859008454829256601762865/68719476736*t^29 + 82512376286342804086730445/274877906944*t^27 - 46637430074889411005543295/274877906944*t^25 + 10441215688408077090793275/137438953472*t^23 - 3694584012821319585973005/137438953472*t^21 + 2052546673789621992207225/274877906944*t^19 - 442604642141267794032075/274877906944*t^17 + 18218593017921434621175/68719476736*t^15 - 2237371072376316532425/68719476736*t^13 + 1586499487685024450265/549755813888*t^11 - 96845140757687397075/549755813888*t^9 + 1898924328582105825/274877906944*t^7 - 42832879592077575/274877906944*t^5 + 911337863661225/549755813888*t^3 - 2893136075115/549755813888*t
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : 414847067813984717066925/549755813888*t^87 - 802934059477097925855285885/48928267436032*t^85 + 9753155060830453013057473907475/56610005423489024*t^83 - 181664820832091832633278385468448925/156187004963406217216*t^81 + 2199802399038161196445350778533748130025/387648588883450195345408*t^79 - 2211706781540872209061133059833842883357015975/103743678302755591628924125184*t^77 + 1671364983422784240309059865321783788456639745677181/26046821567794543634682351185821696*t^75 - 1200628235319644379012042308355185339909723748562871775/7552738034609843636521279187398426624*t^73 + 2452693938307105427604288287571810354046732208583188306276956425/7421955321283249868360956727393861836874973184*t^71 - 11975590849887219502062951341858087529600957093531234712799705029575/20477174731420486386807879610879664807938051014656*t^69 + 49462044300099109331685081878385508263634031253529473292055528957277941475/55525854817951926943938421906974548786962244063404752896*t^67 - 19667327070408145759476905082141651807518887367579105667962997496288881563463945/16698345845257500941777545558506363031251942619431774743166976*t^65 + 501345606098968004575229870257890070907277776386217753743222871087271366608052651177975/368410400761892214909707006229691218013131996125904465731688652079104*t^63 - 23582276052013202951616145236854984188121350855715636294783138574503159891408336684734575/17074209218720506937082596136645182394276813295107010192919782368477184*t^61 + 3747235946105799841900318107755668919705875090713881631982737212559868068828603442700928569757975/3030770876474801842023777962907978094073920462692779913083207025506137063555072*t^59 - 794279493218892718528070387104376326840328338375488417797255010331226973814575555590522677866712544025/811103994274815893367929529767321821470344815987229838679067113787028919359799033856*t^57 + 1140935389334810311717010322694208753797485351166663860432328474157474024220764103720913452846809273421786705/1658811594261845584799624192119083957238302897390952803225119126874343884570392157195599872*t^55 - 1963834426040116258002193156613227306507606438300027475704042254884088209677593663461988991365376619481455066175/4576661188568431968462163146056552638020477693901638784098103671046314777529711961702660046848*t^53 + 111019864497485705940514007707534815465114445366819397437749630803138918090015399950914591761904160402315417053276525/466449184812477163182999013817902744408729662171661509537364340732901142574890072802195360073121792*t^51 - 15882200656101317544979191649592996916351070649400741264776410871069184842059728841500911706712191718881768262296576975/135255216847721200640386391458358960306131320427776300297786066414453173245344737561901099732170702848*t^49 + 21907951073039680910021814957724012613004293959454007006608323070660573081215805557321765024195938173802252525230104748677614237525/425235933145410925980954985861946009505712901837026404178430899543569643307350060603900860724384498425551925542912*t^47 - 102357197502604716685553061582428344300745443447906064332467566323243497017319947807361934464807328913455975853743943487788517197130333645/5095320255457783718585858222428072561702655415059169452764167169544197649078463003126363627789639177710932582854079545344*t^45 + 1362466836945610893148840140222116470920427666213130660109800687681506085717598255384164812318221550545407034373373048096261193051514790469225/195959918568770880418872901879165473638564816369647623248800225763136356526245072072521870039090681766647873971830389559263232*t^43 - 4174317188609248551003953601095700861823042751275363467934386354978130107975659319124789298147416564372386372666317821604844342244225375741275/1957646096798319061194520983224752754920811969513390043551967703886216026825312065521838083745998937117309491804963393371111424*t^41 + 55208542338890724604338128262241460841838092783977321629635540476725215827493989271358177732678777634037795386685452440788225538516117584075/95494931551137515180220535767061109996137169244555611880583790433473952528064003196187223597365801810600463014876263091273728*t^39 - 53420564470041419134450953825827655633997489109827267691643895060172231237438818637146832505598977076088000161547440946927621782689532965/386619156077479818543402978814012591077478417994152274820177289204347985943578960308450297965043732026722522327434263527424*t^37 + 303103137095447475704123697927519235600031954198615061801383515421885577411013679446927444716951191811026873436082129806339687105435531/10449166380472427528200080508486826785877795080923034454599386194712107728204836765093251296352533298019527630471196311552*t^35 - 612206174064706886771737858610590934940672543304322972027954178468075390119692488325761304098283702102530947035766603637664286645627505/114940830185196702810200885593355094644655745890153379000593248141833185010253204416025764259877866278214803935183159427072*t^33 + 2223215422891647995194310090173292964740304826313286271962097284369442847615678627199280799043864133585279468729447490539899751371915/2612291595118106882050020127121706696469448770230758613649846548678026932051209191273312824088133324504881907617799077888*t^31 - 69383706043703070877281229735966269547552902093610393728491519577758656637617502491913018583199455668816920220338859438357706617115/589872295671830586269359383543611189525359399729526138566094381959554468527692398029457734471513976501102366236277211136*t^29 + 1176527320836102663037561907477508011008956232909507690256139411114711382392658224031442379379757086147006090859345227972263640275/84267470810261512324194197649087312789337057104218019795156340279936352646813199718493962067359139500157480890896744448*t^27 - 481476505482262602515296502874748246286414363664908064663356533349102881433835421360544359840447220514070125052854872179516605/341163849434257134915765982384968877689623712972542590263790851335774707072118217483781222944773844130192230327517184*t^25 + 6236485488243481074528186850665204878359285766504591743584335266154736282227002831233435937193189281995342599710254449075722875/51856905114007084507196429322515269408822804371826473720096209403037755474961969057534745887605624307789219009782611968*t^23 - 5754515073484849753115403300698939664466077893603733742905273786015386214734712583149849312834122581793422615459929159814674375/674139766482092098593553581192698502314696456833744158361250722239490821174505597747951696538873116001259847127173955584*t^21 + 25789476736231502834825203382820090741330359818166568667173798329669917384226158617656957027099956522444642801322331629178825/51856905114007084507196429322515269408822804371826473720096209403037755474961969057534745887605624307789219009782611968*t^19 - 273328415081138592679911143364287851641557155621308068750002934260677470290717872647959024680387582975346014944237547799725/11700690205964215329394120901875941962738389771480205685842802922714793958970057103769522102810881853159383194463633408*t^17 + 26534659603701352213493070547127712875995247553254373485997255502281437216141597221413633476731723885209983805729896035198905/30673359374935190486006687944267781855318688785935359205436907861896832363440004697531802192518726778057323044286414979072*t^15 - 107558737868769700863720196934260840695705001348578105515662916610598786101716442967377496005219345412924521308850864347175/4381908482133598640858098277752540265045526969419337029348129694556690337634286385361686027502675254008189006326630711296*t^13 + 1905998740983983054121659196200288746022565629346520933263404697860104279114303726705739920205875545005351061668676151575/3707768715651506542264544696559841762730830512585592870986878972317199516459780787613734330963802138006929159199456755712*t^11 - 48356298727251703618727766384685383455670165220620162169837142082164637165586873200867834209389170905066475392387233575/6404327781579874936638759021330635771989616339920569504431881861275162801157803178605541117119294602011968547708152578048*t^9 + 925849713417209677393309758733726367550676924570298111609069308037286697772172777377140907835636704784181159189989525/12808655563159749873277518042661271543979232679841139008863763722550325602315606357211082234238589204023937095416305156096*t^7 - 5153845206032084364671404318104102149274905747018169323025245876096193421306293615163815733573655661107861135185965/12808655563159749873277518042661271543979232679841139008863763722550325602315606357211082234238589204023937095416305156096*t^5 + 95429525578001600121536513693125546560860717512377310515339250804266439812434190746651405557907156290355285604825/89660588942118249112942626298628900807854628758887973062046346057852279216209244500477575639670124428167559667914136092672*t^3 - 529545937970037794463599155049044886102028010552428104889019428446225135282134454125002757595143330349008853175/627624122594827743790598384090402305654982401312215811434324422404965954513464711503343029477690870997172917675398952648704*t
-------------------------------------------------
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 weights: 212
Linear system for weights solvable: 0
  current precision for roots: 424
  current precision for roots: 848
 current precision for weights: 424
Linear system for weights solvable: 1
  current precision for roots: 848
  current precision for roots: 1696
 current precision for weights: 848
Linear system for weights solvable: 1
Sufficient bits for target precision reached
-------------------------------------------------
The nodes are:
| (-0.99847233224250771352 + 2.1418123342023716907e-1832j)  +/-  (4.72e-479, 4.72e-479j)
| (-0.97252224494906464342 - 4.0763730004272028028e-1835j)  +/-  (4.17e-479, 4.17e-479j)
| (-0.94167195684763786182 - 9.3753433559491847169e-1836j)  +/-  (8.23e-480, 8.23e-480j)
| (0.99195955759324414642 + 4.7620252382546850807e-1832j)  +/-  (7.18e-479, 7.18e-479j)
| (0.94167195684763786182 - 1.5867279383171235372e-1848j)  +/-  (8.39e-480, 8.39e-480j)
| (0.92891855126924795568 + 4.2108318021228848036e-1853j)  +/-  (3.92e-480, 3.92e-480j)
| (-0.99974645753096443628 - 4.0106528085750482187e-1856j)  +/-  (1.83e-479, 1.83e-479j)
| (-0.88345376521861686334 - 1.8345281296384473406e-1866j)  +/-  (2.66e-481, 2.66e-481j)
| (-0.96348661301407999341 + 5.5603141866744994132e-1863j)  +/-  (2.62e-479, 2.62e-479j)
| (0.99847233224250771352 - 2.8144383045071226151e-1861j)  +/-  (4.64e-479, 4.64e-479j)
| (0.8659702462278088072 + 4.2849177747705149769e-1887j)  +/-  (9.23e-482, 9.23e-482j)
| (0.97252224494906464342 + 2.5771676403231991706e-1895j)  +/-  (4.02e-479, 4.02e-479j)
| (-0.847353716209315049 + 3.5010225239554748397e-1929j)  +/-  (2.61e-482, 2.61e-482j)
| (-0.89978499680439096937 + 5.8163023873347229609e-1926j)  +/-  (7.66e-481, 7.66e-481j)
| (0.99588272428558822581 - 1.1675517689454286177e-1929j)  +/-  (6.55e-479, 6.55e-479j)
| (0.88345376521861686334 + 3.5438155013749791641e-1951j)  +/-  (2.8e-481, 2.8e-481j)
| (0.89978499680439096937 + 8.6422774946654824507e-1950j)  +/-  (7.18e-481, 7.18e-481j)
| (-0.99195955759324414642 + 3.9801023728616272641e-1951j)  +/-  (7.46e-479, 7.46e-479j)
| (-0.78498703488173806644 + 2.0033633001800485355e-1962j)  +/-  (4.91e-484, 4.91e-484j)
| (-0.8659702462278088072 - 7.8268545868073404302e-1959j)  +/-  (9.21e-482, 9.21e-482j)
| (0.91494790720613872946 + 2.2047207989962747738e-1954j)  +/-  (1.89e-480, 1.89e-480j)
| (0.78498703488173806644 + 4.9352987700557617764e-1966j)  +/-  (4.73e-484, 4.73e-484j)
| (-0.99588272428558822581 + 2.816873916512183756e-1958j)  +/-  (6.67e-479, 6.67e-479j)
| (-0.91494790720613872946 + 1.1592287686972281333e-1970j)  +/-  (1.83e-480, 1.83e-480j)
| (-0.82763270828206522096 - 2.4775443241151436448e-1974j)  +/-  (7.47e-483, 7.47e-483j)
| (0.99974645753096443628 + 5.0596993916034761085e-1968j)  +/-  (1.78e-479, 1.78e-479j)
| (0.73824298242363719833 + 9.7020774518309168053e-2002j)  +/-  (1.94e-485, 1.94e-485j)
| (0.82763270828206522096 + 1.0446364996717156106e-1995j)  +/-  (7.44e-483, 7.44e-483j)
| (0.98027822098025533151 + 1.0815707748920129686e-1994j)  +/-  (5.49e-479, 5.49e-479j)
| (-0.66099731375149813317 - 6.0551359244865204591e-2028j)  +/-  (9.06e-488, 9.06e-488j)
| (0.98675263071497550436 - 5.7392012879416297413e-2017j)  +/-  (6.98e-479, 6.98e-479j)
| (0.847353716209315049 - 1.3300864323293114147e-2038j)  +/-  (2.75e-482, 2.75e-482j)
| (0.71341423526895705485 + 8.2891492927009775391e-2044j)  +/-  (3.59e-486, 3.59e-486j)
| (-0.98675263071497550436 - 6.9855350403134256324e-2034j)  +/-  (7.13e-479, 7.13e-479j)
| (-0.73824298242363719833 - 3.170690294843663307e-2044j)  +/-  (1.96e-485, 1.96e-485j)
| (-0.76211174719495512146 - 3.9813682272732906309e-2043j)  +/-  (1.03e-484, 1.03e-484j)
| (-0.98027822098025533151 - 9.421653922721107223e-2036j)  +/-  (5.77e-479, 5.77e-479j)
| (0.66099731375149813317 + 2.1229129427472804912e-2044j)  +/-  (9.28e-488, 9.28e-488j)
| (0.76211174719495512146 + 6.7906398872489337154e-2042j)  +/-  (1.11e-484, 1.11e-484j)
| (-0.9531965903906276732 + 9.9682746464336733795e-2037j)  +/-  (1.53e-479, 1.53e-479j)
| (-0.57600174332569372964 + 7.3714656818887340629e-2048j)  +/-  (1.98e-490, 1.98e-490j)
| (-0.6334777151957809195 + 1.3715005169576341881e-2046j)  +/-  (1.23e-488, 1.23e-488j)
| (0.6876552011136726234 - 3.1378559783373900998e-2043j)  +/-  (5.57e-487, 5.57e-487j)
| (0.6334777151957809195 + 4.2015479442052991148e-2045j)  +/-  (1.23e-488, 1.23e-488j)
| (-0.54611631666008471914 + 5.5353157133178687829e-2049j)  +/-  (1.96e-491, 1.96e-491j)
| (-0.60513425963960093573 - 2.7616021738387404595e-2047j)  +/-  (1.53e-489, 1.53e-489j)
| (-0.71341423526895705485 - 1.8146445664109128464e-2043j)  +/-  (3.69e-486, 3.69e-486j)
| (0.96348661301407999341 - 2.6454057222170395467e-2035j)  +/-  (2.71e-479, 2.71e-479j)
| (0.48425117678573472407 + 6.6567035215019753545e-2070j)  +/-  (1.74e-493, 1.74e-493j)
| (0.9531965903906276732 - 5.9959119824904618399e-2059j)  +/-  (1.51e-479, 1.51e-479j)
| (-0.80683596413693863528 + 6.3834741757641260245e-2068j)  +/-  (1.89e-483, 1.89e-483j)
| (-0.51551892343685000972 - 3.3881509457256672088e-2078j)  +/-  (1.89e-492, 1.89e-492j)
| (0.072152990874586235422 + 1.8508971347759385997e-2094j)  +/-  (2.24e-508, 2.24e-508j)
| (0.54611631666008471914 - 1.9724794476418651139e-2079j)  +/-  (1.85e-491, 1.85e-491j)
| (0.51551892343685000972 + 5.765200628160133447e-2079j)  +/-  (1.92e-492, 1.92e-492j)
| (-0.17956081029216143174 + 3.6281978544372475796e-2091j)  +/-  (2.39e-504, 2.39e-504j)
| (-0.48425117678573472407 + 1.6735816685787472255e-2079j)  +/-  (1.73e-493, 1.73e-493j)
| (-0.92891855126924795568 - 5.6165311923002851816e-2074j)  +/-  (4.14e-480, 4.14e-480j)
| (0.80683596413693863528 - 7.9937855458226650816e-2086j)  +/-  (2.18e-483, 2.18e-483j)
| (0.38682336629679036251 - 9.5136338107292788216e-2099j)  +/-  (7.63e-497, 7.63e-497j)
| (0.57600174332569372964 - 3.029033030694077199e-2092j)  +/-  (1.85e-490, 1.85e-490j)
| (-0.6876552011136726234 + 2.1556474307023575899e-2095j)  +/-  (5.7e-487, 5.7e-487j)
| (-0.45235200755605576768 - 2.1587415201291921152e-2102j)  +/-  (1.3e-494, 1.3e-494j)
| (-0.072152990874586235422 - 6.2790140689390197882e-2116j)  +/-  (2.49e-508, 2.49e-508j)
| (0.60513425963960093573 + 2.8619647105850457401e-2103j)  +/-  (1.63e-489, 1.63e-489j)
| (0.45235200755605576768 - 1.3708140972907479187e-2107j)  +/-  (1.4e-494, 1.4e-494j)
| (-0.036100739437432691954 - 1.219840155894642518e-2122j)  +/-  (1.21e-509, 1.21e-509j)
| (-0.35328261286430380665 + 6.3869308007280712849e-2111j)  +/-  (4.75e-498, 4.75e-498j)
| (-0.38682336629679036251 - 8.4395274156175256407e-2110j)  +/-  (7.19e-497, 7.19e-497j)
| (0.41986137602926925249 - 7.3433622630758045194e-2109j)  +/-  (1.09e-495, 1.09e-495j)
| (0.31928121450938304345 - 3.4204895196898252616e-2112j)  +/-  (3.25e-499, 3.25e-499j)
| (0.1081111630357004507 + 9.0947313713466594148e-2120j)  +/-  (4.93e-507, 4.93e-507j)
| (-0.41986137602926925249 + 2.4171304883885773046e-2109j)  +/-  (1.09e-495, 1.09e-495j)
| (-0.28486199803291362711 - 1.4470082434826428736e-2113j)  +/-  (1.82e-500, 1.82e-500j)
| (1.8497024618157681313e-2171 + 4.7659700745143094054e-2171j)  +/-  (4.45e-2169, 4.45e-2169j)
| (0.35328261286430380665 + 3.3589063096197986586e-2112j)  +/-  (4.75e-498, 4.75e-498j)
| (0.17956081029216143174 + 1.2053657156868334951e-2118j)  +/-  (2.47e-504, 2.47e-504j)
| (-0.1081111630357004507 + 4.9943313699536440932e-2120j)  +/-  (5.4e-507, 5.4e-507j)
| (-0.31928121450938304345 - 2.3194750735085253893e-2113j)  +/-  (3.08e-499, 3.08e-499j)
| (-0.14392980951071331077 + 1.4816573414087117645e-2118j)  +/-  (1.23e-505, 1.23e-505j)
| (0.21495624486051820901 + 4.3492979284052554726e-2116j)  +/-  (5.87e-503, 5.87e-503j)
| (0.28486199803291362711 - 7.1425165788270258198e-2114j)  +/-  (1.76e-500, 1.76e-500j)
| (0.036100739437432691954 + 1.2120412745881057501e-2122j)  +/-  (1.21e-509, 1.21e-509j)
| (-0.25007140010310039601 + 8.8072372576921360028e-2116j)  +/-  (9.74e-502, 9.74e-502j)
| (-0.21495624486051820901 - 1.1415666594095407185e-2115j)  +/-  (5.48e-503, 5.48e-503j)
| (0.14392980951071331077 + 4.3207950670218561548e-2119j)  +/-  (1.1e-505, 1.1e-505j)
| (0.25007140010310039601 - 7.3690083668377760274e-2115j)  +/-  (9.96e-502, 9.96e-502j)
-------------------------------------------------
The weights are:
| (0.0019135297050669577387 + 6.2920961276223309492e-1833j)  +/-  (2.49e-128, 4.07e-359j)
| (0.0083988373676052624523 - 6.4127688798274893599e-1833j)  +/-  (1.22e-128, 1.99e-359j)
| (0.012139717150867609374 + 4.0843512855214470336e-1833j)  +/-  (9.04e-129, 1.48e-359j)
| (0.0045719721596546306825 - 6.8754155964482345643e-1833j)  +/-  (7.93e-130, 1.29e-360j)
| (0.012139717150867609374 - 1.1479508686492493817e-1832j)  +/-  (3.78e-130, 6.17e-361j)
| (0.013365328218697149353 + 1.0043066234578078642e-1832j)  +/-  (3.08e-130, 5.03e-361j)
| (0.00068301440944502810674 + 1.0969854200254693126e-1832j)  +/-  (1.4e-129, 2.29e-360j)
| (0.016909827930997705579 + 2.5766644791705143262e-1833j)  +/-  (6.71e-131, 1.1e-361j)
| (0.0096675448394373273858 + 5.4474124245919952533e-1833j)  +/-  (6.54e-130, 1.07e-360j)
| (0.0019135297050669577387 + 1.4817067557743786815e-1832j)  +/-  (2.71e-131, 4.43e-362j)
| (0.018054129160764676518 + 6.6859290831670433724e-1833j)  +/-  (4.46e-132, 7.28e-363j)
| (0.0083988373676052624523 + 2.0670825534181195423e-1832j)  +/-  (1.08e-131, 1.76e-362j)
| (0.019173956028989743167 + 2.0952406787977846562e-1833j)  +/-  (2.38e-132, 3.89e-363j)
| (0.015750233570842891071 - 2.8661019512328408585e-1833j)  +/-  (1.03e-131, 1.68e-362j)
| (0.003264487313851492062 - 4.0007829872276863379e-1832j)  +/-  (4.39e-131, 7.16e-362j)
| (0.016909827930997705579 - 7.305765720072352151e-1833j)  +/-  (2.34e-132, 3.83e-363j)
| (0.015750233570842891071 + 8.0390013775741933335e-1833j)  +/-  (3.05e-132, 4.98e-363j)
| (0.0045719721596546306825 + 1.4099006208364750019e-1832j)  +/-  (1.31e-132, 2.15e-363j)
| (0.022367066710784048926 - 1.5394267882215864211e-1833j)  +/-  (1.66e-135, 2.71e-366j)
| (0.018054129160764676518 - 2.3217165426769409635e-1833j)  +/-  (2e-133, 3.26e-364j)
| (0.014571449631947042799 - 8.9286600690095339725e-1833j)  +/-  (4.72e-133, 7.71e-364j)
| (0.022367066710784048926 + 4.9349443681254688424e-1833j)  +/-  (6.16e-137, 1.01e-367j)
| (0.003264487313851492062 - 2.5671784288488668159e-1832j)  +/-  (1.53e-132, 2.5e-363j)
| (0.014571449631947042799 + 3.2006273655081832923e-1833j)  +/-  (1.03e-133, 1.68e-364j)
| (0.020263149060302827904 - 1.8923886591682211346e-1833j)  +/-  (2.65e-135, 4.32e-366j)
| (0.00068301440944502810674 - 4.2207398846677522739e-1833j)  +/-  (1.32e-133, 2.16e-364j)
| (0.02435397409443636296 + 4.3243552067813104551e-1833j)  +/-  (1.91e-138, 3.11e-369j)
| (0.020263149060302827904 + 5.6967502219836603103e-1833j)  +/-  (1.93e-136, 3.16e-367j)
| (0.0071128814437608210322 - 2.9272800598892698798e-1832j)  +/-  (1.64e-134, 2.67e-365j)
| (0.027095248212499974818 + 8.5544706398871847042e-1834j)  +/-  (1.37e-142, 2.24e-373j)
| (0.0058393397574918438967 + 5.3814563162019435263e-1832j)  +/-  (3.09e-134, 5.05e-365j)
| (0.019173956028989743167 - 6.1554553398690551021e-1833j)  +/-  (1.29e-136, 2.11e-367j)
| (0.025298705754533874464 - 4.0614039689377221694e-1833j)  +/-  (1.24e-140, 2.03e-371j)
| (0.0058393397574918438967 - 1.0022567446867211765e-1832j)  +/-  (4.32e-137, 7.06e-368j)
| (0.02435397409443636296 - 1.2390026220579118403e-1833j)  +/-  (3.88e-142, 6.34e-373j)
| (0.023377872306641955319 + 1.3835953923239976165e-1833j)  +/-  (2.16e-141, 3.53e-372j)
| (0.0071128814437608210322 + 7.8036958616290012527e-1833j)  +/-  (1.37e-137, 2.24e-368j)
| (0.027095248212499974818 - 3.5983780848085372901e-1833j)  +/-  (4.94e-145, 8.07e-376j)
| (0.023377872306641955319 - 4.613604316523788073e-1833j)  +/-  (8.31e-142, 1.36e-372j)
| (0.010909047005266894848 - 4.6852908072426725483e-1833j)  +/-  (1.43e-138, 2.34e-369j)
| (0.029515421774263661211 - 5.2537307940077688842e-1834j)  +/-  (1.68e-147, 2.74e-378j)
| (0.027937552713517144676 - 7.4066574359454089831e-1834j)  +/-  (2.03e-146, 3.32e-377j)
| (0.026214215358831799607 + 3.8202558879564467475e-1833j)  +/-  (2.23e-145, 3.64e-376j)
| (0.027937552713517144676 + 3.3935923404492871752e-1833j)  +/-  (2.3e-147, 3.76e-378j)
| (0.030248508180580466581 + 4.2356913697345567649e-1834j)  +/-  (8.25e-149, 1.35e-379j)
| (0.028743666294472921343 + 6.3089532999235197722e-1834j)  +/-  (3.16e-147, 5.16e-378j)
| (0.025298705754533874464 + 1.1037040530569951975e-1833j)  +/-  (8.62e-146, 1.41e-376j)
| (0.0096675448394373273858 - 1.6184936430059687856e-1832j)  +/-  (1.57e-143, 2.56e-374j)
| (0.031589830330109258175 - 2.5533200012478625005e-1833j)  +/-  (1.22e-153, 2e-384j)
| (0.010909047005266894848 + 1.3405500238320724653e-1832j)  +/-  (1.26e-143, 2.05e-374j)
| (0.021326595741033022633 + 1.708315314340359087e-1833j)  +/-  (4.01e-145, 6.54e-376j)
| (0.030939264605946042922 - 3.2499124207416265078e-1834j)  +/-  (3.08e-151, 5.03e-382j)
| (0.036012632068660601133 - 1.1926378688338731305e-1833j)  +/-  (1.47e-157, 2.39e-388j)
| (0.030248508180580466581 - 2.8582923061013908262e-1833j)  +/-  (3.89e-153, 6.35e-384j)
| (0.030939264605946042922 + 2.701465987303165006e-1833j)  +/-  (1.2e-153, 1.97e-384j)
| (0.035520943939550362739 + 5.6898131797968698959e-1834j)  +/-  (1.12e-158, 1.83e-389j)
| (0.031589830330109258175 + 2.2912753888587154512e-1834j)  +/-  (6.05e-154, 9.88e-385j)
| (0.013365328218697149353 - 3.5944453080355948695e-1833j)  +/-  (1.12e-146, 1.83e-377j)
| (0.021326595741033022633 - 5.2937748394441817693e-1833j)  +/-  (7.51e-149, 1.23e-379j)
| (0.033296599299341738427 + 2.1514771750623744072e-1833j)  +/-  (7.61e-158, 1.24e-388j)
| (0.029515421774263661211 + 3.0252067899862682432e-1833j)  +/-  (1.79e-153, 2.93e-384j)
| (0.026214215358831799607 - 9.7617300708542215036e-1834j)  +/-  (7.1e-151, 1.16e-381j)
| (0.032201921181157988909 - 1.355464870106580841e-1834j)  +/-  (4.56e-156, 7.45e-387j)
| (0.036012632068660601133 - 8.3031411562331254014e-1834j)  +/-  (5.14e-161, 8.4e-392j)
| (0.028743666294472921343 - 3.2032514978378534047e-1833j)  +/-  (7.58e-154, 1.24e-384j)
| (0.032201921181157988909 + 2.4126739380250260337e-1833j)  +/-  (2.84e-157, 4.63e-388j)
| (0.036084338374051967019 + 9.1890646632432294832e-1834j)  +/-  (1.48e-161, 2.41e-392j)
| (0.033777970191320987412 - 1.3492391375616645602e-1834j)  +/-  (2.45e-160, 4.01e-391j)
| (0.033296599299341738427 + 4.6152652206180509623e-1835j)  +/-  (1.18e-159, 1.93e-390j)
| (0.032771908692238865037 - 2.278914592829679264e-1833j)  +/-  (1.98e-159, 3.24e-390j)
| (0.034217757273384041007 + 1.9123380848749028748e-1833j)  +/-  (2.9e-162, 4.74e-393j)
| (0.035896205804811299978 + 1.2872769196600647548e-1833j)  +/-  (7.97e-164, 1.3e-394j)
| (0.032771908692238865037 + 4.3898798527999687949e-1835j)  +/-  (4.13e-160, 6.75e-391j)
| (0.0346128591168386829 - 3.097253311232683039e-1834j)  +/-  (4.51e-163, 7.36e-394j)
| (0.036108990351782922846 - 1.0086406150336170088e-1833j)  +/-  (3.58e-164, 5.84e-395j)
| (0.033777970191320987412 - 2.0295250089139374912e-1833j)  +/-  (9.56e-163, 1.56e-393j)
| (0.035520943939550362739 + 1.4834611258228125897e-1833j)  +/-  (3.29e-165, 5.37e-396j)
| (0.035896205804811299978 + 7.4258086069858568008e-1834j)  +/-  (9.54e-165, 1.56e-395j)
| (0.034217757273384041007 + 2.2268963784156053427e-1834j)  +/-  (5.31e-164, 8.67e-395j)
| (0.035732999148780894624 - 6.5553200020531437196e-1834j)  +/-  (5.41e-165, 8.84e-396j)
| (0.035262539324628352439 - 1.5856295576542356613e-1833j)  +/-  (2.1e-166, 3.43e-397j)
| (0.0346128591168386829 - 1.7995552223527417429e-1833j)  +/-  (4.54e-166, 7.41e-397j)
| (0.036084338374051967019 + 1.0998211604785407711e-1833j)  +/-  (4.6e-166, 7.52e-397j)
| (0.034960463576702319346 + 3.9630756130095978124e-1834j)  +/-  (2.16e-166, 3.54e-397j)
| (0.035262539324628352439 - 4.8265933919123060221e-1834j)  +/-  (1.75e-166, 2.85e-397j)
| (0.035732999148780894624 - 1.3840886436067805886e-1833j)  +/-  (2.34e-167, 3.86e-398j)
| (0.034960463576702319346 + 1.6908341248033323777e-1833j)  +/-  (2.14e-167, 3.46e-398j)
