Starting with polynomial:
P : 53098072606098965203605/274877906944*t^41 - 134384010916670220577025/68719476736*t^39 + 1260488001129780170222475/137438953472*t^37 - 1817067118511761024606425/68719476736*t^35 + 14415399140193304128544305/274877906944*t^33 - 1303310059250353523950581/17179869184*t^31 + 2845254354701476002990705/34359738368*t^29 - 1195831540381779769372905/17179869184*t^27 + 6264729413044846254475965/137438953472*t^25 - 803170437569852083907175/34359738368*t^23 + 645086097476738340407985/68719476736*t^21 - 100944918383096163551175/34359738368*t^19 + 97523056742991208854525/137438953472*t^17 - 2237371072376316532425/17179869184*t^15 + 610192110648086327025/34359738368*t^13 - 29933952597830650005/17179869184*t^11 + 32281713585895799025/274877906944*t^9 - 348782019535488825/68719476736*t^7 + 17315419409563275/137438953472*t^5 - 101259762629025/68719476736*t^3 + 1412926920405/274877906944*t
Extension levels are: 41 42
-------------------------------------------------
Trying to find an order 42 Kronrod extension for:
P1 : 53098072606098965203605/274877906944*t^41 - 134384010916670220577025/68719476736*t^39 + 1260488001129780170222475/137438953472*t^37 - 1817067118511761024606425/68719476736*t^35 + 14415399140193304128544305/274877906944*t^33 - 1303310059250353523950581/17179869184*t^31 + 2845254354701476002990705/34359738368*t^29 - 1195831540381779769372905/17179869184*t^27 + 6264729413044846254475965/137438953472*t^25 - 803170437569852083907175/34359738368*t^23 + 645086097476738340407985/68719476736*t^21 - 100944918383096163551175/34359738368*t^19 + 97523056742991208854525/137438953472*t^17 - 2237371072376316532425/17179869184*t^15 + 610192110648086327025/34359738368*t^13 - 29933952597830650005/17179869184*t^11 + 32281713585895799025/274877906944*t^9 - 348782019535488825/68719476736*t^7 + 17315419409563275/137438953472*t^5 - 101259762629025/68719476736*t^3 + 1412926920405/274877906944*t
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : 53098072606098965203605/274877906944*t^83 - 18727624654995048115008763/4672924418048*t^81 + 28848056352497815037836934241/719922418155520*t^79 - 2801191953183511102637110167531969/10892426186693017600*t^77 + 1662100603930968445392094328582660517981/1396191188610310995968000*t^75 - 15579131424431275304684604544428820444642533/3678963781988169474375680000*t^73 + 46167260278737729962236836371428751604003280845459/3833769979229504160645565644800000*t^71 - 444443406119539677325006664951005685232774718732812297/15804716739373630902261344370688000000*t^69 + 445430986270477964629557301927040752725121159152921295083837/8103394366611648036207436485739151360000000*t^67 - 564848772798301240259478192274178378356208213700341913652791808779/6191520016725128856784834958476284683878400000000*t^65 + 49474963682439753494014305181380020029654490131087913738119143681656613/380717775109681440030429342384784572611035136000000000*t^63 - 20737118645757028969239107068389394873972322439835945205982650834626650831/129444043537291689610345976410826754687751946240000000000*t^61 + 516433625610419144452930010739789303022187730565686178444308055095616434462303838203/3002131582947880395067222642120349582548363858095269478400000000000*t^59 - 4497544893689947833437230124937161861953924346357425593451895260293598216198314801344481/27814749116012111860297817779245038882310591145252671717376000000000000*t^57 + 632011909998657759192658135728956084252315049553303497221003414670498143422192925078661426429/4732190129484823312215208839306466265621737195078243896661114880000000000000*t^55 - 39617852756830022036916394711391043959439875044068727836952593586787486953818704532410750243825278563/407562873927374968771308977673871317599667953702061136437008028021555200000000000000*t^53 + 52214674652045833151673890706389959821573662223086737746040551504720355428168325581922384702347449666230767/835862546880174775953702156131789207838807012888483143495931024508847128576000000000000000*t^51 - 2521365420509561633643835852357490527288594137814572779776996685861675751298332849231401931281022870985478901/71048316484814855956064683271202082666298596095521067197154137083252005928960000000000000000*t^49 + 33336971141283780183525319167947992654945498817030781950220672021445645653399697845237356134757810980136148744794637/1869458006010531541672179986575604476882900980685880726162778764908358380904441446400000000000000000*t^47 - 2518686681372943082824720071923593914042627077287352049255912982285332444311006835783159110050817918130529511895546147/317807861021790362084270597717852761070093166716599723447672390034420924753755045888000000000000000000*t^45 + 16601556413505229391353794313670925975868978828884226499681775522133109314830459294412395063359990419877364323201252759925631839/5332952037764832349457755806173395795807840101211574747777484280769130461226918693436995665920000000000000000000*t^43 - 4223895914172126167375311823880525790455289251218277871075437807869216591865242061835706069020196795975193569720502305592645361433361/3913346870072022802193848499349068701942772105469559607792856852649791778100619071837534604630425600000000000000000000*t^41 + 121038716734006151253721938617399264451191012343861877619372160131020250241348271131314136019688104859349612747469992133496593317/367105710138088442982537382678149033953355732220408968836102894244820992317131245012901932892160000000000000000000*t^39 - 855040740122829701802918409130468819182585162225742813451758097147345801722086855533695677977227356715327857995950312382069183/9660676582581274815329931123109185104035677163694972864107970901179499797819243289813208760320000000000000000000*t^37 + 2997954369892906064727068017496239427798746333941686721760578705672072780171905723250517136927758442816870736887418095816991/144054823225815840675935599226232023918518951182776855382784281844242308261983124545210941440000000000000000000*t^35 - 55217460941634517912421423646746225786984505404744893901636438178389053390172874492377326126350531254759866320931045989591/12933714778788419131895146679754577998876314502478417356349053168678101980178051429755781120000000000000000000*t^33 + 1258504491945431495822089120980068679980510743997593525220918207107958049354642514223497522919852939415494015836979618307/1655041627134832728354039513169026010093278391346241445114709120453151519554034059572736000000000000000000000*t^31 - 2562953651661375963740779751421303118373020983121437630754510355910291508793330298608190746435675776669398394555951179/21922332714546456921389504256649388201064264161708707694354125946053734087155917888716800000000000000000000*t^29 + 3715554453319630422996926679822828738140660795459462783456016077089627098735582542146373080311209633591486271390327/241133389798140766759984813082654551064197001949050589585770445760014791020233978675200000000000000000000*t^27 - 589950833517827944236963527028867473576857679007065052749576312209143412485617710581810074619219147289099147226956989/341686013343965466498898480138121498857967151761804685443036721641940958875671547782758400000000000000000000*t^25 + 2782383148008367482701786539328848670258913160162412842679406760938185054465879891289923988127056885030287621283093/17084300667198273324944924006906074942898357588090234272151836082097047943783577389137920000000000000000000*t^23 - 136445562687625492139604470150420829643244394491085519949066092717933608021514797017951728307152413846795791778841/10677687916998920828090577504316296839311473492556396420094897551310654964864735868211200000000000000000000*t^21 + 449402516506322246649152484929492069246320132954589469438781303420514880742382990407611487949548248220158190350897/546697621350344746398237568220994398172747442818887496708858754627105534201074476452413440000000000000000000*t^19 - 302689949652780134282362950158570030923263793842171448023995158160958715629643724377840377400591035640107061572867/7107069077554481703177088386872927176245716756645537457215163810152371944613968193881374720000000000000000000*t^17 + 45415070347690080647643679684611887604997172865436407059871591649189749892566616734902249140458413557978575081/26128930432185594496974589657621055795021017487667417122114572831442543914021941889269760000000000000000000*t^15 - 11490000104396303544087584892079017162875493852533916126456437540440649602735467117465052578786415452294711/211570286900288214550401535689239318178307833908238195320765771914514525619610865500160000000000000000000*t^13 + 100624757753311630167003084210833068015326082032302365955835268875544045470347022324565444672196816806787433/80396709022109521529152583561910940907756976885130514221890993327515519735452128890060800000000000000000000*t^11 - 105014058503182807282542065270758351947240704110171252119708384581091305581161550224606119023096379562127749/5193627402828275090783256898099446782641100706779431218734158168957502574910207526297927680000000000000000000*t^9 + 4697313838330805739283811447114957699262212576415392517734450261842490574665344963865200190178200723687529/22072916462020169135828841816922648826224678003812582679620172218069385943368381986766192640000000000000000000*t^7 - 14369044125191431076454991467409794283050876214054972422713123927271552692010073682093266673079040723347/11036458231010084567914420908461324413112339001906291339810086109034692971684190993383096320000000000000000000*t^5 + 668226312720787979079968523531380638722987599826038190627815112195417147015244669507441804483203721923/176583331696161353086630734535381190609797424030500661436961377744555087546947055894129541120000000000000000000*t^3 - 223838090152890407699345762001260290201184100162626819644244113765196577348318293628780860551611117/67916666036985135802550282513608150234537470780961792860369760670982725979595021497742131200000000000000000000*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 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:
| (0.99547665184213754355 - 7.1715841087037436982e-1801j)  +/-  (2.16e-480, 2.16e-480j)
| (-0.93597698749785382568 + 1.1593535037089488961e-1817j)  +/-  (2.13e-481, 2.13e-481j)
| (-0.94861687957148818295 - 5.5998032062557508435e-1817j)  +/-  (3.95e-481, 3.95e-481j)
| (-0.99832158857477144152 - 1.0273406917378419339e-1815j)  +/-  (1.39e-480, 1.39e-480j)
| (0.92199520749512781224 - 2.3152886570982569165e-1818j)  +/-  (1e-481, 1e-481j)
| (0.93597698749785382568 + 5.2636792745496774529e-1825j)  +/-  (2.14e-481, 2.14e-481j)
| (-0.99547665184213754355 + 7.987660482841438516e-1830j)  +/-  (2e-480, 2e-480j)
| (-0.8900785772486397336 - 1.4474159500834465444e-1834j)  +/-  (1.61e-482, 1.61e-482j)
| (0.33407901957428460384 - 8.6059466749392277682e-1854j)  +/-  (2.63e-499, 2.63e-499j)
| (-0.99972142932491887483 - 3.1584825523600410459e-1831j)  +/-  (5.6e-481, 5.6e-481j)
| (0.87220151169244140883 - 8.0722082025614441416e-1834j)  +/-  (5.44e-483, 5.44e-483j)
| (0.99972142932491887483 + 9.5480797117943974369e-1831j)  +/-  (5.42e-481, 5.42e-481j)
| (-0.92199520749512781224 + 6.635224324820319966e-1849j)  +/-  (1.07e-481, 1.07e-481j)
| (-0.85307455237018720165 - 7.3313255499951533258e-1852j)  +/-  (1.87e-483, 1.87e-483j)
| (-0.99116710969901630825 - 1.8748499189806048418e-1847j)  +/-  (2.11e-480, 2.11e-480j)
| (0.85307455237018720165 - 4.7972001680009819973e-1850j)  +/-  (1.8e-483, 1.8e-483j)
| (0.97833867356108338447 + 1.007288004822258997e-1845j)  +/-  (1.62e-480, 1.62e-480j)
| (-0.47240428669876136538 + 4.2142518849981918085e-1873j)  +/-  (1.12e-494, 1.12e-494j)
| (-0.78847114504740937274 + 1.7741338973689217692e-1863j)  +/-  (3.13e-485, 3.13e-485j)
| (-0.97833867356108338447 - 2.4699579624102563447e-1859j)  +/-  (1.54e-480, 1.54e-480j)
| (0.8900785772486397336 - 3.0113432752316734278e-1860j)  +/-  (1.51e-482, 1.51e-482j)
| (0.78847114504740937274 + 2.439972663365420386e-1863j)  +/-  (3.22e-485, 3.22e-485j)
| (-0.90668594475810117296 - 1.1003202836536852348e-1860j)  +/-  (4.48e-482, 4.48e-482j)
| (-0.83272120040136133124 - 1.4245163072462270006e-1862j)  +/-  (5.1e-484, 5.1e-484j)
| (-0.76463724502755630752 - 7.5778209970943496577e-1865j)  +/-  (7.06e-486, 7.06e-486j)
| (0.99832158857477144152 + 1.3335733729955055768e-1856j)  +/-  (1.45e-480, 1.45e-480j)
| (0.76463724502755630752 + 7.7706259351424204688e-1872j)  +/-  (7.3e-486, 7.3e-486j)
| (0.83272120040136133124 - 2.3233651443047544133e-1869j)  +/-  (5.04e-484, 5.04e-484j)
| (-0.96982383606779870644 + 4.0049425928880038268e-1867j)  +/-  (1.23e-480, 1.23e-480j)
| (-0.658706241077727978 + 1.5234476636015815085e-1875j)  +/-  (6.2e-489, 6.2e-489j)
| (-0.98544823879880055313 + 2.5598129927115792938e-1867j)  +/-  (2e-480, 2e-480j)
| (0.8111753221394452275 + 2.6447247533276753057e-1871j)  +/-  (1.28e-484, 1.28e-484j)
| (0.68670150203495128958 + 9.9828475742018837147e-1874j)  +/-  (4.15e-488, 4.15e-488j)
| (0.9599068917303462261 + 4.3640701479851396016e-1865j)  +/-  (7.4e-481, 7.4e-481j)
| (-0.73970480306992618106 + 7.5783758659600189192e-1882j)  +/-  (1.39e-486, 1.39e-486j)
| (-0.8111753221394452275 + 4.3696634092429096406e-1880j)  +/-  (1.27e-484, 1.27e-484j)
| (0.94861687957148818295 + 5.9831607338281244579e-1875j)  +/-  (4.28e-481, 4.28e-481j)
| (0.59992141644896949833 + 2.8136654154606567651e-1893j)  +/-  (1.13e-490, 1.13e-490j)
| (0.90668594475810117296 + 8.5721393114111777813e-1883j)  +/-  (4.06e-482, 4.06e-482j)
| (-0.87220151169244140883 - 3.0436584424248840366e-1886j)  +/-  (5.6e-483, 5.6e-483j)
| (-0.56922094161021586965 + 8.4004915086498175602e-1896j)  +/-  (1.21e-491, 1.21e-491j)
| (-0.9599068917303462261 + 3.7329910905426592136e-1884j)  +/-  (6.65e-481, 6.65e-481j)
| (0.71371292761293476049 + 2.435618581725386762e-1902j)  +/-  (2.49e-487, 2.49e-487j)
| (0.62976483907219632049 + 7.7431575563800189942e-1905j)  +/-  (9.37e-490, 9.37e-490j)
| (0.98544823879880055313 + 9.366767559701663894e-1894j)  +/-  (1.97e-480, 1.97e-480j)
| (-0.59992141644896949833 + 5.1622546762640389341e-1950j)  +/-  (1.14e-490, 1.14e-490j)
| (-0.62976483907219632049 - 2.391200607181173073e-1949j)  +/-  (8.22e-490, 8.22e-490j)
| (0.96982383606779870644 + 3.648741922895059268e-1944j)  +/-  (1.14e-480, 1.14e-480j)
| (0.50541659919940603271 + 2.2815554644889575696e-1988j)  +/-  (1.34e-493, 1.34e-493j)
| (0.73970480306992618106 - 3.593228276145852885e-1982j)  +/-  (1.3e-486, 1.3e-486j)
| (-0.68670150203495128958 + 1.7060639314086016657e-1988j)  +/-  (4.31e-488, 4.31e-488j)
| (-0.50541659919940603271 + 3.5589708496570546546e-1995j)  +/-  (1.3e-493, 1.3e-493j)
| (-0.71371292761293476049 - 1.8739667991198357688e-1990j)  +/-  (2.7e-487, 2.7e-487j)
| (0.43871727705140708852 - 3.40286573809902127e-1999j)  +/-  (8.97e-496, 8.97e-496j)
| (0.56922094161021586965 - 1.6385153075902072517e-1994j)  +/-  (1.17e-491, 1.17e-491j)
| (2.8475003962109351778e-2017 + 2.5303018445973197543e-2017j)  +/-  (3.16e-2015, 3.16e-2015j)
| (-0.53770497625396686414 - 4.4957864421027945778e-1996j)  +/-  (1.36e-492, 1.36e-492j)
| (-0.43871727705140708852 + 1.6591709579290785393e-1999j)  +/-  (8.59e-496, 8.59e-496j)
| (0.658706241077727978 - 1.4230697250186705295e-1996j)  +/-  (6.43e-489, 6.43e-489j)
| (0.4044017552833835256 - 7.34856018166748082e-2017j)  +/-  (6.07e-497, 6.07e-497j)
| (0.99116710969901630825 + 1.0166017134305207525e-2029j)  +/-  (2.18e-480, 2.18e-480j)
| (-0.4044017552833835256 + 1.9647718040087421782e-2075j)  +/-  (6.32e-497, 6.32e-497j)
| (-0.36950502264048144143 - 4.0517948303687863228e-2076j)  +/-  (4.43e-498, 4.43e-498j)
| (-0.037837893914389980285 - 5.5700289200151114241e-2088j)  +/-  (1.41e-509, 1.41e-509j)
| (0.53770497625396686414 + 5.050424134459832408e-2073j)  +/-  (1.33e-492, 1.33e-492j)
| (0.47240428669876136538 - 2.7056649711884024146e-2076j)  +/-  (1.13e-494, 1.13e-494j)
| (-0.15081335486399216357 + 5.4733812095608268531e-2088j)  +/-  (1.26e-505, 1.26e-505j)
| (-0.33407901957428460384 + 6.4603518197467662562e-2081j)  +/-  (2.57e-499, 2.57e-499j)
| (-0.18811035474529788259 + 6.6448137916187799435e-2088j)  +/-  (2.26e-504, 2.26e-504j)
| (0.11330030168320732271 - 1.0344880608041978716e-2088j)  +/-  (5.59e-507, 5.59e-507j)
| (0.36950502264048144143 - 4.7332750391454007736e-2080j)  +/-  (4.19e-498, 4.19e-498j)
| (0.15081335486399216357 + 8.8949867920064096854e-2088j)  +/-  (1.1e-505, 1.1e-505j)
| (-0.22513960563342277561 + 8.2476245317045310107e-2085j)  +/-  (4.86e-503, 4.86e-503j)
| (-0.26184636893702329754 + 1.0534614814240656553e-2083j)  +/-  (8.9e-502, 8.9e-502j)
| (0.037837893914389980285 + 8.4326185834958353186e-2092j)  +/-  (1.07e-509, 1.07e-509j)
| (0.26184636893702329754 + 5.4133594816172971786e-2084j)  +/-  (9.17e-502, 9.17e-502j)
| (0.22513960563342277561 - 1.2316976280798247737e-2084j)  +/-  (4.91e-503, 4.91e-503j)
| (-0.075623258989162996924 - 2.5309589048739913589e-2090j)  +/-  (2.28e-508, 2.28e-508j)
| (-0.29817627734182486592 - 1.8942666699863113361e-2082j)  +/-  (1.61e-500, 1.61e-500j)
| (-0.11330030168320732271 + 4.9924756341556602861e-2089j)  +/-  (6.04e-507, 6.04e-507j)
| (0.18811035474529788259 + 5.5897520366262368535e-2086j)  +/-  (2.21e-504, 2.21e-504j)
| (0.29817627734182486592 + 8.4686416635235498503e-2083j)  +/-  (1.59e-500, 1.59e-500j)
| (0.075623258989162996924 - 2.7406075561178412751e-2090j)  +/-  (2.28e-508, 2.28e-508j)
-------------------------------------------------
The weights are:
| (0.0035862148458593671149 + 1.2677293042590587624e-1801j)  +/-  (1.2e-136, 6.15e-369j)
| (0.013311875597941461438 - 4.9472767056508347797e-1803j)  +/-  (6.01e-137, 3.08e-369j)
| (0.011967094038288286259 + 4.4145520802155582261e-1803j)  +/-  (5.27e-137, 2.71e-369j)
| (0.0021022835892975876667 - 7.9271532400234891763e-1804j)  +/-  (3.22e-138, 1.65e-370j)
| (0.014649456749078522859 + 1.4297461373608624683e-1801j)  +/-  (1.51e-139, 7.76e-372j)
| (0.013311875597941461438 - 1.6059646223649652554e-1801j)  +/-  (1.37e-139, 7.05e-372j)
| (0.0035862148458593671149 + 1.2917852644456429267e-1803j)  +/-  (1.59e-138, 8.17e-371j)
| (0.017246049104432620877 + 6.559420259194195307e-1803j)  +/-  (7.07e-140, 3.63e-372j)
| (0.035672871722636424777 + 3.8680362232424835949e-1802j)  +/-  (2.53e-142, 1.3e-374j)
| (0.00075042932082087746159 + 2.6973597472316705881e-1804j)  +/-  (1.41e-138, 7.24e-371j)
| (0.018505079710733793382 - 1.0769805907854629916e-1801j)  +/-  (9.13e-142, 4.68e-374j)
| (0.00075042932082087746159 - 1.2678560922769549767e-1801j)  +/-  (9.16e-143, 4.7e-375j)
| (0.014649456749078522859 + 5.4790796908565262452e-1803j)  +/-  (1.88e-139, 9.62e-372j)
| (0.019745068463300370663 + 7.6602378605472485835e-1803j)  +/-  (3.73e-141, 1.91e-373j)
| (0.0050219266892251295888 - 1.7970122802364479507e-1803j)  +/-  (2.36e-139, 1.21e-371j)
| (0.019745068463300370663 + 9.9439137303284450365e-1802j)  +/-  (7.99e-143, 4.1e-375j)
| (0.0078098231044062456483 - 3.2786941072233174046e-1801j)  +/-  (1.41e-143, 7.21e-376j)
| (0.033357595173959394405 + 1.629742530017023312e-1802j)  +/-  (1.16e-144, 5.96e-377j)
| (0.023273623490814191773 - 9.3583167160892887948e-1803j)  +/-  (5.36e-143, 2.75e-375j)
| (0.0078098231044062456483 - 2.8467804295897121524e-1803j)  +/-  (1.96e-140, 1e-372j)
| (0.017246049104432620877 + 1.1734701243100654369e-1801j)  +/-  (3.21e-143, 1.65e-375j)
| (0.023273623490814191773 - 8.0648813390345514023e-1802j)  +/-  (3.77e-145, 1.93e-377j)
| (0.015963788631977430989 - 6.0151791108712578139e-1803j)  +/-  (9.42e-141, 4.83e-373j)
| (0.020955748685847044857 - 8.2179681752353215115e-1803j)  +/-  (9.9e-143, 5.08e-375j)
| (0.024389100608209404126 + 9.9373390925713472647e-1803j)  +/-  (2.11e-144, 1.08e-376j)
| (0.0021022835892975876667 + 5.5555345045705804593e-1801j)  +/-  (5.17e-145, 2.65e-377j)
| (0.024389100608209404126 + 7.5770635855040287456e-1802j)  +/-  (1.04e-146, 5.36e-379j)
| (0.020955748685847044857 - 9.2310713003904685421e-1802j)  +/-  (1.66e-145, 8.5e-378j)
| (0.0092194189324685560958 + 3.3642610234069550179e-1803j)  +/-  (2.39e-141, 1.23e-373j)
| (0.028475192977159344552 + 1.2345203321913595289e-1802j)  +/-  (4.9e-148, 2.51e-380j)
| (0.0064128962262416065572 + 2.3216743292073992687e-1803j)  +/-  (9.18e-141, 4.71e-373j)
| (0.022130168976343322791 + 8.6113523114398854933e-1802j)  +/-  (2.03e-146, 1.04e-378j)
| (0.027509149512256019133 - 6.3902307312646605139e-1802j)  +/-  (7.63e-150, 3.92e-382j)
| (0.010608892058338019201 - 2.1355962820072188347e-1801j)  +/-  (1.07e-147, 5.51e-380j)
| (0.025469091986318038555 - 1.0524537105413645494e-1802j)  +/-  (1.12e-147, 5.76e-380j)
| (0.022130168976343322791 + 8.7846674644206906403e-1803j)  +/-  (9.76e-146, 5.01e-378j)
| (0.011967094038288286259 + 1.8314860972149212601e-1801j)  +/-  (1.51e-147, 7.77e-380j)
| (0.0302791292235332478 + 5.4897344930611123637e-1802j)  +/-  (2.8e-153, 1.44e-385j)
| (0.015963788631977430989 - 1.2886313322993278771e-1801j)  +/-  (2.44e-147, 1.25e-379j)
| (0.018505079710733793382 - 7.1085552029116919472e-1803j)  +/-  (8.77e-146, 4.5e-378j)
| (0.031115013207795999159 - 1.4262765640641069005e-1802j)  +/-  (2.13e-153, 1.09e-385j)
| (0.010608892058338019201 - 3.8847952718193047483e-1803j)  +/-  (9.39e-145, 4.81e-377j)
| (0.026507898812979768306 + 6.7469162825109231907e-1802j)  +/-  (1.17e-151, 5.99e-384j)
| (0.029400122872936927253 - 5.7645943276074925994e-1802j)  +/-  (2.28e-153, 1.17e-385j)
| (0.0064128962262416065572 + 4.5860321536553871694e-1801j)  +/-  (6.76e-150, 3.47e-382j)
| (0.0302791292235332478 + 1.3610980624884192703e-1802j)  +/-  (2.37e-153, 1.21e-385j)
| (0.029400122872936927253 - 1.2971489180027273666e-1802j)  +/-  (7.23e-153, 3.71e-385j)
| (0.0092194189324685560958 + 2.5774105614446147196e-1801j)  +/-  (8.58e-150, 4.4e-382j)
| (0.03265873444030897887 - 4.7788304958435107995e-1802j)  +/-  (5.43e-158, 2.79e-390j)
| (0.025469091986318038555 - 7.1399498007740069908e-1802j)  +/-  (1.57e-152, 8.07e-385j)
| (0.027509149512256019133 - 1.1729699656371324577e-1802j)  +/-  (1.13e-152, 5.81e-385j)
| (0.03265873444030897887 - 1.5603467619956319401e-1802j)  +/-  (4.6e-157, 2.36e-389j)
| (0.026507898812979768306 + 1.1122442364930825008e-1802j)  +/-  (2.79e-152, 1.43e-384j)
| (0.034008827820188553876 - 4.3810535881394111845e-1802j)  +/-  (1.87e-160, 9.59e-393j)
| (0.031115013207795999159 - 5.2355697620434172187e-1802j)  +/-  (6.32e-158, 3.24e-390j)
| (0.037846453818886092061 - 2.7267126081497895716e-1802j)  +/-  (2.71e-164, 1.39e-396j)
| (0.031909828708235448135 + 1.4926086791140193788e-1802j)  +/-  (8.21e-157, 4.21e-389j)
| (0.034008827820188553876 - 1.7007411672276327235e-1802j)  +/-  (7.58e-160, 3.89e-392j)
| (0.028475192977159344552 + 6.0638415644575960197e-1802j)  +/-  (3.86e-157, 1.98e-389j)
| (0.034614415570214013792 + 4.1998094332997750992e-1802j)  +/-  (6.14e-162, 3.15e-394j)
| (0.0050219266892251295888 - 8.2839965763917163214e-1801j)  +/-  (7.5e-155, 3.85e-387j)
| (0.034614415570214013792 + 1.7732982477038548039e-1802j)  +/-  (1.76e-161, 9.03e-394j)
| (0.035170295896364568312 - 1.8476857141578232608e-1802j)  +/-  (1.09e-162, 5.61e-395j)
| (0.037820657804812969932 + 2.6248931615991032905e-1802j)  +/-  (8.66e-167, 4.44e-399j)
| (0.031909828708235448135 + 4.9990865027070171255e-1802j)  +/-  (4.11e-161, 2.11e-393j)
| (0.033357595173959394405 + 4.573493371009324772e-1802j)  +/-  (2.94e-162, 1.51e-394j)
| (0.037413474878669065975 - 2.3408827868148910184e-1802j)  +/-  (1.75e-167, 8.98e-400j)
| (0.035672871722636424777 + 1.9241841876793430156e-1802j)  +/-  (2.41e-165, 1.24e-397j)
| (0.037171991337993379042 + 2.2523233263353143889e-1802j)  +/-  (1.94e-167, 9.95e-400j)
| (0.037604031740520607043 + 3.0569905484875469562e-1802j)  +/-  (1.58e-169, 8.12e-402j)
| (0.035170295896364568312 - 4.0290278702331983628e-1802j)  +/-  (6.77e-167, 3.48e-399j)
| (0.037413474878669065975 - 3.1768049529275696631e-1802j)  +/-  (1.11e-169, 5.7e-402j)
| (0.036877306805112365452 - 2.1665213457423432305e-1802j)  +/-  (1.58e-168, 8.1e-401j)
| (0.036527070577104942497 + 2.0834499532660445116e-1802j)  +/-  (1.58e-168, 8.13e-401j)
| (0.037820657804812969932 + 2.8323209169253719584e-1802j)  +/-  (4.92e-170, 2.52e-402j)
| (0.036527070577104942497 + 3.5706944627604322595e-1802j)  +/-  (1.39e-170, 7.15e-403j)
| (0.036877306805112365452 - 3.4329014679951313915e-1802j)  +/-  (8.12e-171, 4.17e-403j)
| (0.037740693082691163052 - 2.5267636164925721253e-1802j)  +/-  (8.15e-171, 4.18e-403j)
| (0.036124440115141894705 - 2.0027756635874215029e-1802j)  +/-  (4.3e-170, 2.2e-402j)
| (0.037604031740520607043 + 2.4322337833237145318e-1802j)  +/-  (7.95e-171, 4.08e-403j)
| (0.037171991337993379042 + 3.3018725617729313937e-1802j)  +/-  (5.08e-172, 2.63e-404j)
| (0.036124440115141894705 - 3.7156105151311027106e-1802j)  +/-  (4.96e-172, 2.65e-404j)
| (0.037740693082691163052 - 2.9422256909037128529e-1802j)  +/-  (5.02e-172, 2.49e-404j)
