Starting with polynomial:
P : t
Extension levels are: 1 40 42
-------------------------------------------------
Trying to find an order 40 Kronrod extension for:
P1 : t
Solvable: 1
-------------------------------------------------
Trying to find an order 42 Kronrod extension for:
P2 : t^41 - 820/81*t^39 + 101270/2133*t^37 - 7493980/54747*t^35 + 6369883/23463*t^33 - 101918128/259515*t^31 + 1579730984/3685113*t^29 - 91624397072/254272797*t^27 + 148889645242/630973237*t^25 - 229060992680/1892919711*t^23 + 251967091948/5184953991*t^21 - 229060992680/15061056831*t^19 + 1088039715230/296200784343*t^17 - 599082596240/888602353029*t^15 + 299541298120/3258208627773*t^13 - 1557614750224/172685057271969*t^11 + 28632624085/47095924710537*t^9 - 6737088020/256411145646257*t^7 + 3368544010/5164853076588891*t^5 - 354583580/46483677689300019*t^3 + 17729179/666266046879966939*t
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : t^83 - 142843/6885*t^81 + 3433640944/16552475*t^79 - 162485581723624/122049360125*t^77 + 939073975204924366/152379418644375*t^75 - 214184157383681178088058/9770314357779584375*t^73 + 2469299030197849106678880872872/39609973977391898429171875*t^71 - 46203703474880258442056118419211728/317384679515607577124620078125*t^69 + 2810259828215882194667910900258575161799/9875792285365249307249509812109375*t^67 - 53189197373373344201377066028345075338009499/112623093022650734506620846486408203125*t^65 + 37568793701314877771155155824836350350961712852292992/55844941716431478787951750145855890760419921875*t^63 - 3811706678772011327951561213303343782898395036344626272/4596127346026939960563965468353377676075830078125*t^61 + 22953438733680080070724088814222351076407080728624384740862490696/25775190936681602515304422687782880583887667690232177734375*t^59 - 10164312201057217914528255291852603881724921341716219337587492013464/12142736137035002405303159806897036708968774973728870849609375*t^57 + 1904436463258181423122636680256371358475376499872921837061823207471332768/2754497184351100186011293460211289502692954379063008758624267578125*t^55 - 25308594070461949553029404098149637785424579318441630733036459442951788464863405952/50293356920943766238352693190600676072720441842007544429882954538665771484375*t^53 + 29500886994181595045263843963257482445019976961146253647182040560397705942420674691962/91225506935753376741962946412799924419829805216630099693713166690087432861328125*t^51 - 23267681770953328708882002851667563957439582707257829881947002884903994849945553029216938/126651412129137604710091890603103895069530379575754788408105113088071385955810546875*t^49 + 4721339413620424749316241565453145891427570221037988490535079483707198209202467311214462061358688/51143885521739129011165618063563836280661836553036930347822258453055310471978008270263671875*t^47 - 34152923478812327506877111013035582702174367534060299731118209543513499627122944880742668918111408/832448349449583695607270166353751803291623509852622376937958036523134308746025028228759765625*t^45 + 268886191435403810707619969244970372698541363356245114069880404298384635161964387943367006112851169694777748/16685003183657521078325480605814374519085476957268671987871626630154249857351351516102354335784912109375*t^43 - 1590978996735546250444309856360559144368905004626062719284817469584986500977667937930532007931778832013617391364/284733459562414122206526262696502723115756242293686926699072999519542774804039732541243909845829010009765625*t^41 + 6017962545425290920045163644083842864209894393413229692042784926740695017582787888043196168770798225963871056/3525780174694058548898824266035493381921184238533459129857189112249497774308934774431913330173492431640625*t^39 - 28341362101405678779645453340515820559157137590433063950115388180863821542764004918305873474753574102619296/61855792538492255243839022211149006700371653307604546137845423021921013584367276744419532108306884765625*t^37 + 10303513218272929536785330999266985984042507923406205034945770460263715006827859741887793131724287318951758/95637241212822601537305627072037467023221409913621567607349074364740877480396376625342035198211669921875*t^35 - 81331720875857108048010629061837184056445887196118617718550585997207304099649579496023330751213716987382/3679982302306752027308973708654250168518470881240635286085523869850710455902027760462077426910400390625*t^33 + 7190090034128922217106041853802472600298032105085879344131632763600121831394928019225764437728856545024/1826532490695618822332040242017522288449606759236469969582679036759757018342176788108136653900146484375*t^31 - 44538124971213142580803439432701424820474628497540479227913878958189174215226489613336249840363057056/73589671382674375237928046290819196586693643720689065098611314507953289710350904185458660125732421875*t^29 + 10314677988189983132135342450369326789869141808832798566209792022863628823887705007967360197225341048/129308870161068031363129254094886762415384321712695479122367001354872683671557387840250492095947265625*t^27 - 4185363567019684019164764724223498010543135482472157412073328348707186004129474637875243393484723544792/468256154157707578906193946689606052653310047659828706675229215684072848171080758566844865322113037109375*t^25 + 72467993825208224218284366720459836074969400104416132573374002995158123700841914513254430205776709664/85953869393332624073191765556722206925402118337557598211617417673514741993047700887612619113922119140625*t^23 - 1894929368981851731970229025380722139986281609538796976110523013262496212800730399312105307315478087424/28645061256517154935696299260533726786226401611190390882262935063803934668552635969719596761226654052734375*t^21 + 1160940200874593405493668249530517907256196702394765846963328906912112861755193804207496535465778483/272810107204925285101869516766987874154537158201813246497742238702894615890977485425900921535491943359375*t^19 - 524680436821475340941760874146969450844745263756843720875482179530589523058540430833947015013258980023/2379722565148563261943607794758435226250027630994416949199805548205349734416996605370133738554096221923828125*t^17 + 3778662459161996359294380056790268929383693738161188962647713405102118196681702401041594114352249072/419951040908569987401813140251488569338240170175485343976436273212708776661822930359435365627193450927734375*t^15 - 9400672035932902278171928934162031784659993842499668940707671292125982705256725793889604225135048/33437397319305842451696322908013259906823441350004905930647422563495030800334079475312667438602447509765625*t^13 + 20581817618351096993081972840661450790626702624630078704665340976901481311168350531311010317559886/3176552745334055032911150676261259691148226928250466063411505143532027926031737550154703406667232513427734375*t^11 - 931433844972698138117804294905627201365848281500867956799552061417473066915512030464081319849346106/8898448327752058054102798106222700761361790382954137397379527435802237719847924292543369246702312374114990234375*t^9 + 2124906552613413948436847865559432503615398847917185652297715078710622616657509656284258566355672/1928807561024580889687127458361569017490078425449075319286272795738554259857746795651477122691393756866455078125*t^7 - 113286961205220367622185403323193356828141427675888372492456322125009878256799586007898499322416/16808180174642776324416396422865101438127826278913370639494662934293115693046079219248586354882145595550537109375*t^5 + 786905788946882667733246520777629528919767636490141844908635706604637600346653407399286421941/40168701773298838334622235519050496657220737378420089155402499554836090046093172371424587729464110660552978515625*t^3 - 5183987145734956708204592624767221502103757011466747142460052023394483489073555963413134867/303840180080080956633681012259484525996926090426510930790865060735298629835832970501801368722869554996490478515625*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 - 8.2205840295722867373e-1802j)  +/-  (1.74e-480, 1.74e-480j)
| (-0.93597698749785382568 + 8.2435179631067405358e-1821j)  +/-  (1.87e-481, 1.87e-481j)
| (-0.94861687957148818295 - 1.1431562727416401248e-1820j)  +/-  (3.49e-481, 3.49e-481j)
| (-0.99832158857477144152 - 8.1792070630578443512e-1820j)  +/-  (1.31e-480, 1.31e-480j)
| (0.92199520749512781224 - 1.5715157060117633397e-1818j)  +/-  (8.96e-482, 8.96e-482j)
| (0.93597698749785382568 - 2.3888904674296990633e-1826j)  +/-  (1.84e-481, 1.84e-481j)
| (-0.99547665184213754355 - 9.0914518393520116922e-1833j)  +/-  (1.82e-480, 1.82e-480j)
| (-0.8900785772486397336 + 2.0647227509918601073e-1837j)  +/-  (1.42e-482, 1.42e-482j)
| (0.33407901957428460384 + 1.7942807506366490568e-1855j)  +/-  (2.83e-499, 2.83e-499j)
| (-0.99972142932491887483 - 7.0979646038592636964e-1833j)  +/-  (4.7e-481, 4.7e-481j)
| (0.87220151169244140883 - 3.7405236814299964462e-1834j)  +/-  (5.15e-483, 5.15e-483j)
| (0.99972142932491887483 + 1.4102120628047273969e-1833j)  +/-  (4.92e-481, 4.92e-481j)
| (-0.92199520749512781224 + 8.0493537954319298983e-1850j)  +/-  (9.32e-482, 9.32e-482j)
| (-0.85307455237018720165 - 3.3892391922398163658e-1852j)  +/-  (1.68e-483, 1.68e-483j)
| (-0.99116710969901630825 - 2.0166780208449867844e-1847j)  +/-  (1.86e-480, 1.86e-480j)
| (0.85307455237018720165 + 1.8536030316086448985e-1850j)  +/-  (1.61e-483, 1.61e-483j)
| (0.97833867356108338447 - 2.2199073977487597945e-1846j)  +/-  (1.35e-480, 1.35e-480j)
| (-0.47240428669876136538 + 5.3150301468257750627e-1874j)  +/-  (9.96e-495, 9.96e-495j)
| (-0.78847114504740937274 + 4.2338529371724598224e-1864j)  +/-  (3.01e-485, 3.01e-485j)
| (-0.97833867356108338447 + 3.1348597713878125435e-1858j)  +/-  (1.38e-480, 1.38e-480j)
| (0.8900785772486397336 - 6.0507475277953895524e-1860j)  +/-  (1.42e-482, 1.42e-482j)
| (0.78847114504740937274 + 9.3359888413669823145e-1863j)  +/-  (3.25e-485, 3.25e-485j)
| (-0.90668594475810117296 + 1.9657249332989265671e-1860j)  +/-  (3.77e-482, 3.77e-482j)
| (-0.83272120040136133124 - 3.5821311369987019236e-1863j)  +/-  (5.08e-484, 5.08e-484j)
| (-0.76463724502755630752 + 4.6743028070109036294e-1865j)  +/-  (6.98e-486, 6.98e-486j)
| (0.99832158857477144152 + 9.8726680837846472225e-1856j)  +/-  (1.29e-480, 1.29e-480j)
| (0.76463724502755630752 + 6.1288831930467470172e-1874j)  +/-  (6.57e-486, 6.57e-486j)
| (0.83272120040136133124 + 4.8695154390299844198e-1872j)  +/-  (4.95e-484, 4.95e-484j)
| (-0.96982383606779870644 - 1.4517011507602502025e-1868j)  +/-  (9.8e-481, 9.8e-481j)
| (-0.658706241077727978 - 5.3128457203861851975e-1878j)  +/-  (6.27e-489, 6.27e-489j)
| (-0.98544823879880055313 + 1.6139707924352870573e-1869j)  +/-  (1.68e-480, 1.68e-480j)
| (0.8111753221394452275 + 2.8425998546883280612e-1873j)  +/-  (1.32e-484, 1.32e-484j)
| (0.68670150203495128958 + 1.4611280494799493197e-1876j)  +/-  (4.57e-488, 4.57e-488j)
| (0.9599068917303462261 - 4.8520384940718658276e-1867j)  +/-  (6.11e-481, 6.11e-481j)
| (-0.73970480306992618106 + 8.3633481196139999641e-1885j)  +/-  (1.41e-486, 1.41e-486j)
| (-0.8111753221394452275 - 2.8941769717164294648e-1882j)  +/-  (1.26e-484, 1.26e-484j)
| (0.94861687957148818295 - 5.8773635367400169617e-1876j)  +/-  (3.56e-481, 3.56e-481j)
| (0.59992141644896949833 - 1.7419243891891134568e-1895j)  +/-  (1.04e-490, 1.04e-490j)
| (0.90668594475810117296 - 3.8840921988985220683e-1884j)  +/-  (3.78e-482, 3.78e-482j)
| (-0.87220151169244140883 - 3.5655009413687706815e-1888j)  +/-  (5.09e-483, 5.09e-483j)
| (-0.56922094161021586965 - 1.8677172327023645077e-1897j)  +/-  (1.15e-491, 1.15e-491j)
| (-0.9599068917303462261 + 6.3594369026745899691e-1888j)  +/-  (6.32e-481, 6.32e-481j)
| (0.71371292761293476049 + 3.7614955415637746584e-1904j)  +/-  (2.67e-487, 2.67e-487j)
| (0.62976483907219632049 - 1.813573155112454487e-1907j)  +/-  (9.15e-490, 9.15e-490j)
| (0.98544823879880055313 - 9.7639462403972914509e-1896j)  +/-  (1.75e-480, 1.75e-480j)
| (-0.59992141644896949833 + 1.1360996274519237534e-1950j)  +/-  (1.02e-490, 1.02e-490j)
| (-0.62976483907219632049 - 4.6207749042360932697e-1950j)  +/-  (8.56e-490, 8.56e-490j)
| (0.96982383606779870644 - 2.1403409342017731912e-1944j)  +/-  (1.05e-480, 1.05e-480j)
| (0.50541659919940603271 - 2.6749403511103272449e-1989j)  +/-  (1.15e-493, 1.15e-493j)
| (0.73970480306992618106 - 3.3684657833958935337e-1984j)  +/-  (1.36e-486, 1.36e-486j)
| (-0.68670150203495128958 + 2.1416028094643502275e-1990j)  +/-  (4.27e-488, 4.27e-488j)
| (-0.50541659919940603271 - 4.4617173334766715875e-1997j)  +/-  (1.09e-493, 1.09e-493j)
| (-0.71371292761293476049 - 5.9111947429905648255e-1992j)  +/-  (2.67e-487, 2.67e-487j)
| (0.43871727705140708852 + 2.6420386324425565193e-1999j)  +/-  (7.95e-496, 7.95e-496j)
| (0.56922094161021586965 - 1.4755773040193724628e-1994j)  +/-  (1.17e-491, 1.17e-491j)
| (-1.051411778889321238e-2017 - 9.3428930408405967624e-2018j)  +/-  (1.17e-2015, 1.17e-2015j)
| (-0.53770497625396686414 + 3.1413869810845773098e-1998j)  +/-  (1.13e-492, 1.13e-492j)
| (-0.43871727705140708852 - 2.2253401036549030675e-2000j)  +/-  (8.27e-496, 8.27e-496j)
| (0.658706241077727978 - 2.6032390697463146096e-1996j)  +/-  (6.32e-489, 6.32e-489j)
| (0.4044017552833835256 - 2.2197963029546610706e-2016j)  +/-  (6.34e-497, 6.34e-497j)
| (0.99116710969901630825 + 4.8477682057028548045e-2029j)  +/-  (1.87e-480, 1.87e-480j)
| (-0.4044017552833835256 + 1.4915218918867530556e-2075j)  +/-  (6.25e-497, 6.25e-497j)
| (-0.36950502264048144143 - 1.8262464386933389004e-2076j)  +/-  (4.47e-498, 4.47e-498j)
| (-0.037837893914389980285 - 6.6896773849536048944e-2088j)  +/-  (1.2e-509, 1.2e-509j)
| (0.53770497625396686414 + 2.3435025472431336782e-2073j)  +/-  (1.22e-492, 1.22e-492j)
| (0.47240428669876136538 - 2.2762215237326968901e-2076j)  +/-  (1.06e-494, 1.06e-494j)
| (-0.15081335486399216357 + 4.2321097764957050401e-2088j)  +/-  (1.08e-505, 1.08e-505j)
| (-0.33407901957428460384 + 2.6555346922817774289e-2081j)  +/-  (2.76e-499, 2.76e-499j)
| (-0.18811035474529788259 + 2.1259887737067636881e-2086j)  +/-  (2.5e-504, 2.5e-504j)
| (0.11330030168320732271 + 8.5270957285469221894e-2089j)  +/-  (4.72e-507, 4.72e-507j)
| (0.36950502264048144143 + 9.8814496582580169812e-2080j)  +/-  (4.48e-498, 4.48e-498j)
| (0.15081335486399216357 + 9.6876012268116363915e-2089j)  +/-  (9.99e-506, 9.99e-506j)
| (-0.22513960563342277561 - 2.1191390652665212325e-2085j)  +/-  (4.83e-503, 4.83e-503j)
| (-0.26184636893702329754 + 6.7730062502314067862e-2084j)  +/-  (9.85e-502, 9.85e-502j)
| (0.037837893914389980285 - 3.6388623620627868673e-2092j)  +/-  (1.2e-509, 1.2e-509j)
| (0.26184636893702329754 - 1.4831725620056160629e-2083j)  +/-  (1.02e-501, 1.02e-501j)
| (0.22513960563342277561 + 1.5369960855603618721e-2085j)  +/-  (5.15e-503, 5.15e-503j)
| (-0.075623258989162996924 + 3.1248295906409685335e-2090j)  +/-  (2.39e-508, 2.39e-508j)
| (-0.29817627734182486592 - 5.7681324189723150564e-2083j)  +/-  (1.73e-500, 1.73e-500j)
| (-0.11330030168320732271 - 7.6492453267554688802e-2089j)  +/-  (5.08e-507, 5.08e-507j)
| (0.18811035474529788259 - 3.477373509195410505e-2086j)  +/-  (2.29e-504, 2.29e-504j)
| (0.29817627734182486592 + 2.7786311824990416594e-2082j)  +/-  (1.69e-500, 1.69e-500j)
| (0.075623258989162996924 + 2.5273326126368072539e-2092j)  +/-  (2.5e-508, 2.5e-508j)
-------------------------------------------------
The weights are:
| (0.0035862148458593671149 + 1.4531622462274203666e-1802j)  +/-  (1.2e-136, 4.99e-369j)
| (0.013311875597941461438 - 5.6709233636385513614e-1804j)  +/-  (6.01e-137, 2.5e-369j)
| (0.011967094038288286259 + 5.0602761925764472157e-1804j)  +/-  (5.27e-137, 2.19e-369j)
| (0.0021022835892975876667 - 9.0866715550049834907e-1805j)  +/-  (3.22e-138, 1.34e-370j)
| (0.014649456749078522859 + 1.6388775596826648393e-1802j)  +/-  (1.51e-139, 6.29e-372j)
| (0.013311875597941461438 - 1.8408718250475573294e-1802j)  +/-  (1.37e-139, 5.72e-372j)
| (0.0035862148458593671149 + 1.4807369130120808221e-1804j)  +/-  (1.59e-138, 6.63e-371j)
| (0.017246049104432620877 + 7.5188779227369326106e-1804j)  +/-  (7.07e-140, 2.94e-372j)
| (0.035672871722636424777 + 4.4338205228609684975e-1803j)  +/-  (2.53e-142, 1.05e-374j)
| (0.00075042932082087746159 + 3.091907188711030074e-1805j)  +/-  (1.41e-138, 5.87e-371j)
| (0.018505079710733793382 - 1.2345123909270510413e-1802j)  +/-  (9.13e-142, 3.8e-374j)
| (0.00075042932082087746159 - 1.4533075797463836339e-1802j)  +/-  (9.16e-143, 3.81e-375j)
| (0.014649456749078522859 + 6.2805140845721720454e-1804j)  +/-  (1.88e-139, 7.8e-372j)
| (0.019745068463300370663 + 8.7807140046943928889e-1804j)  +/-  (3.73e-141, 1.55e-373j)
| (0.0050219266892251295888 - 2.0598643518553770817e-1804j)  +/-  (2.36e-139, 9.83e-372j)
| (0.019745068463300370663 + 1.1398427064917722307e-1802j)  +/-  (7.99e-143, 3.33e-375j)
| (0.0078098231044062456483 - 3.7582743236576857348e-1802j)  +/-  (1.41e-143, 5.85e-376j)
| (0.033357595173959394405 + 1.8681277680774771567e-1803j)  +/-  (1.16e-144, 4.84e-377j)
| (0.023273623490814191773 - 1.0727173769961868563e-1803j)  +/-  (5.36e-143, 2.23e-375j)
| (0.0078098231044062456483 - 3.2631838908197298306e-1804j)  +/-  (1.96e-140, 8.14e-373j)
| (0.017246049104432620877 + 1.3451156141885010086e-1802j)  +/-  (3.21e-143, 1.33e-375j)
| (0.023273623490814191773 - 9.2445453795348827414e-1803j)  +/-  (3.77e-145, 1.57e-377j)
| (0.015963788631977430989 - 6.8950296872111342667e-1804j)  +/-  (9.42e-141, 3.92e-373j)
| (0.020955748685847044857 - 9.4200244901098486286e-1804j)  +/-  (9.9e-143, 4.12e-375j)
| (0.024389100608209404126 + 1.1390890743607429666e-1803j)  +/-  (2.11e-144, 8.79e-377j)
| (0.0021022835892975876667 + 6.3681520751578352904e-1802j)  +/-  (5.17e-145, 2.15e-377j)
| (0.024389100608209404126 + 8.6853736856342341771e-1803j)  +/-  (1.04e-146, 4.34e-379j)
| (0.020955748685847044857 - 1.0581315948834218993e-1802j)  +/-  (1.66e-145, 6.89e-378j)
| (0.0092194189324685560958 + 3.8563572595856690598e-1804j)  +/-  (2.39e-141, 9.94e-374j)
| (0.028475192977159344552 + 1.4150957407970537285e-1803j)  +/-  (4.9e-148, 2.04e-380j)
| (0.0064128962262416065572 + 2.6612696195507471019e-1804j)  +/-  (9.18e-141, 3.82e-373j)
| (0.022130168976343322791 + 9.8709495993401090771e-1803j)  +/-  (2.03e-146, 8.46e-379j)
| (0.027509149512256019133 - 7.324940752066462619e-1803j)  +/-  (7.63e-150, 3.18e-382j)
| (0.010608892058338019201 - 2.4479736168995021665e-1802j)  +/-  (1.07e-147, 4.47e-380j)
| (0.025469091986318038555 - 1.2063979217980843387e-1803j)  +/-  (1.12e-147, 4.67e-380j)
| (0.022130168976343322791 + 1.0069615857321646458e-1803j)  +/-  (9.76e-146, 4.06e-378j)
| (0.011967094038288286259 + 2.0993807132340797287e-1802j)  +/-  (1.51e-147, 6.3e-380j)
| (0.0302791292235332478 + 6.29272738298920517e-1803j)  +/-  (2.8e-153, 1.17e-385j)
| (0.015963788631977430989 - 1.4771216497969849246e-1802j)  +/-  (2.44e-147, 1.02e-379j)
| (0.018505079710733793382 - 8.148335777512080332e-1804j)  +/-  (8.77e-146, 3.65e-378j)
| (0.031115013207795999159 - 1.6349004859426836064e-1803j)  +/-  (2.13e-153, 8.87e-386j)
| (0.010608892058338019201 - 4.4530309462472837634e-1804j)  +/-  (9.39e-145, 3.91e-377j)
| (0.026507898812979768306 + 7.7337993113066192027e-1803j)  +/-  (1.17e-151, 4.86e-384j)
| (0.029400122872936927253 - 6.6077914374566997939e-1803j)  +/-  (2.28e-153, 9.47e-386j)
| (0.0064128962262416065572 + 5.2568389507821982992e-1802j)  +/-  (6.76e-150, 2.81e-382j)
| (0.0302791292235332478 + 1.5601882130329542307e-1803j)  +/-  (2.37e-153, 9.84e-386j)
| (0.029400122872936927253 - 1.486885117385525247e-1803j)  +/-  (7.23e-153, 3.01e-385j)
| (0.0092194189324685560958 + 2.954412829565519316e-1802j)  +/-  (8.58e-150, 3.57e-382j)
| (0.03265873444030897887 - 5.4778382375082879573e-1803j)  +/-  (5.43e-158, 2.26e-390j)
| (0.025469091986318038555 - 8.1843225171069773972e-1803j)  +/-  (1.57e-152, 6.55e-385j)
| (0.027509149512256019133 - 1.3445422964477190554e-1803j)  +/-  (1.13e-152, 4.71e-385j)
| (0.03265873444030897887 - 1.7885813619181735701e-1803j)  +/-  (4.6e-157, 1.91e-389j)
| (0.026507898812979768306 + 1.2749341106384135346e-1803j)  +/-  (2.79e-152, 1.16e-384j)
| (0.034008827820188553876 - 5.0218778185491894074e-1803j)  +/-  (1.87e-160, 7.78e-393j)
| (0.031115013207795999159 - 6.0013855403761014996e-1803j)  +/-  (6.32e-158, 2.63e-390j)
| (0.037846453818886092061 - 3.1255535429871779626e-1803j)  +/-  (2.71e-164, 1.13e-396j)
| (0.031909828708235448135 + 1.7109351133502152999e-1803j)  +/-  (8.21e-157, 3.42e-389j)
| (0.034008827820188553876 - 1.9495114978543602369e-1803j)  +/-  (7.58e-160, 3.16e-392j)
| (0.028475192977159344552 + 6.9508100814349597754e-1803j)  +/-  (3.86e-157, 1.61e-389j)
| (0.034614415570214013792 + 4.814122769993070101e-1803j)  +/-  (6.14e-162, 2.56e-394j)
| (0.0050219266892251295888 - 9.4957109788713219114e-1802j)  +/-  (7.5e-155, 3.12e-387j)
| (0.034614415570214013792 + 2.0326816270690943655e-1803j)  +/-  (1.76e-161, 7.32e-394j)
| (0.035170295896364568312 - 2.1179498759612304952e-1803j)  +/-  (1.09e-162, 4.55e-395j)
| (0.037820657804812969932 + 3.0088407911700970019e-1803j)  +/-  (8.66e-167, 3.6e-399j)
| (0.031909828708235448135 + 5.7303114686654102074e-1803j)  +/-  (4.11e-161, 1.71e-393j)
| (0.033357595173959394405 + 5.2424660988699663854e-1803j)  +/-  (2.94e-162, 1.23e-394j)
| (0.037413474878669065975 - 2.6832877312331148383e-1803j)  +/-  (1.75e-167, 7.28e-400j)
| (0.035672871722636424777 + 2.2056379125491931462e-1803j)  +/-  (2.41e-165, 1e-397j)
| (0.037171991337993379042 + 2.5817745264165664127e-1803j)  +/-  (1.94e-167, 8.07e-400j)
| (0.037604031740520607043 + 3.5041418047305583126e-1803j)  +/-  (1.58e-169, 6.59e-402j)
| (0.035170295896364568312 - 4.618360694472456618e-1803j)  +/-  (6.77e-167, 2.82e-399j)
| (0.037413474878669065975 - 3.6414816678239849855e-1803j)  +/-  (1.11e-169, 4.62e-402j)
| (0.036877306805112365452 - 2.4834221428041065929e-1803j)  +/-  (1.58e-168, 6.57e-401j)
| (0.036527070577104942497 + 2.3881997551204422778e-1803j)  +/-  (1.58e-168, 6.59e-401j)
| (0.037820657804812969932 + 3.2466093604120971803e-1803j)  +/-  (4.92e-170, 2.05e-402j)
| (0.036527070577104942497 + 4.0929860725507329535e-1803j)  +/-  (1.39e-170, 5.8e-403j)
| (0.036877306805112365452 - 3.9350378598567160006e-1803j)  +/-  (8.12e-171, 3.38e-403j)
| (0.037740693082691163052 - 2.8963576690168030988e-1803j)  +/-  (8.15e-171, 3.39e-403j)
| (0.036124440115141894705 - 2.2957250985763877423e-1803j)  +/-  (4.3e-170, 1.79e-402j)
| (0.037604031740520607043 + 2.788000794846850313e-1803j)  +/-  (7.95e-171, 3.31e-403j)
| (0.037171991337993379042 + 3.7848431305506361051e-1803j)  +/-  (5.08e-172, 2.13e-404j)
| (0.036124440115141894705 - 4.2590992447160275105e-1803j)  +/-  (4.96e-172, 2.15e-404j)
| (0.037740693082691163052 - 3.3725900943818205507e-1803j)  +/-  (5.02e-172, 2.02e-404j)
