Starting with polynomial:
P : t^2 - 1
Extension levels are: 2 5 62
-------------------------------------------------
Trying to find an order 5 Kronrod extension for:
P1 : t^2 - 1
Solvable: 1
-------------------------------------------------
Trying to find an order 62 Kronrod extension for:
P2 : t^7 - 53/3*t^5 + 215/3*t^3 - 55*t
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : t^69 - 63432883216167262555595076078227828300308352831488051478797492361174137925198129766443278630615773570291421/29328563698231742054652698133305394988895831425753799178540634774569906243072369247654145918602086155547*t^67 + 5613617444337343916956403856221914350756701779234450671184905520277069060729707624626268471361261295081622982723/2551585041746161558754784737597569364033937334040580528533035225387581843147296124545910694918381495532589*t^65 - 3574023012136164217803725528548282184625388277257234217910151771966156015112776717031069852146941841701931314892505/2551585041746161558754784737597569364033937334040580528533035225387581843147296124545910694918381495532589*t^63 + 177671606594393085859007750671966156761890165380949984698005518869451086715052224867811232127613980430974617698366505/283509449082906839861642748621952151559326370448953392059226136154175760349699569393990077213153499503621*t^61 - 91615595110402864014648431951660886930237902590814493116160966971620762557973515488516827016926201976319813524631715/436840445428207765580343218215642760492028305776507537841642736755278521340060969790431551946307395229*t^59 + 9040590036679315776025300540105631736283209965952805551956707784554181753896201233042135765881526310373583862754515705/165698099990009842116681910357657598807321081501433893664071382907174611542781747161887830048599356811*t^57 - 1876069562970434418456964360388556772787081163568887504198219217219636729649937816523294873785232053516010473292610542095/165698099990009842116681910357657598807321081501433893664071382907174611542781747161887830048599356811*t^55 + 28744699561435738970131584738005900013869442261773905805875466994181706157191169235633207355529241102107806915552390219025/15063463635455440192425628214332508982483734681948535787642852991561328322071067923807984549872668801*t^53 - 306618649536270516192063617015421813809530553408351675941815646938263286714821478484625793368529087652088487072228497575575/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^51 + 35315391258756906593111138186518997277994030302016021656347945536085756619738030384845124254244482390881583222389821868792875/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^49 - 3401564131446968920357529496296424011350000113889177379956292664835785751441024843018118459893806319535218905515975930106931125/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^47 + 275319502397937583053968292625543277521029547574245156949443291304924466043876894288735619896249046095247681172820390266608710125/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^45 - 18785762381173464090884096051790423335474489915003511612536328321424678923663704157092804547520486571411680240768605443290486644375/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^43 + 1082558074258885008502758672600481898537289396076421066342463543449539371931886923997737837431198714757052408984902061384570146861875/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^41 - 52720689200219765499250617880917216771373238854125427409021648088382795504987436657198542368001675266440085822047869101582170877343125/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^39 + 2168801956423831331534544820353966580505767898115048053914035861284311592128489653919873262374911263120528891155905167529492479806816875/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^37 - 75251608558757504193508234802712980914091559759486045027843770054450778473799812038165270205813350946709652775923741685138901593185220625/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^35 + 2196678652459879370145269760085048814667446095027624603456809570221627628463259216117936612979449197428406868937660805627890386661423403125/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^33 - 53753165619358621144868776855839659099237823325480915925344348270514204259848087086963096551902903413876097888062496750033752951629044221875/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^31 + 1097385588103331289249161165253914149445298720059226434842606289970435743245229367059501096322208271401895274982250425433952753539934470746875/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^29 - 18578211526918280228012073012070739164308891910761812400772377626075465026158428944583145275131812221046108976235487262684403173898881512740625/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^27 + 258859106799329679030797820347983101920767263218375266446018736332713945538293773025462461938766465902216714875898623455801271834092131857353125/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^25 - 2940974405405004745894217942378719960662144249115138404502461329356815626640299165400967223019171430513290321939860776712354955053506585366171875/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^23 + 26933264211739418946990547542805734893415884901618370554237236308831153498392175520040263012675388212828341718796136295006368033080400101037734375/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^21 - 195997056423381963345877859230207162242619143522834649275587008842083411729368932897149616235416865684235183271974347677624814678057404694764328125/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^19 + 1113226938622617494966521863088428351732760720031594393539552477435055874472287725699239775716818405545186295942744255270912237637329832374001265625/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^17 - 4823544757395796399309993562340739339296653334117328974907494792783126061085339945098505382751777636413060927864964924325384313743606236512711234375/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^15 + 15477014896419054953405415566738107805114336811934904846681838245588410636026084116003763558819704417095056801881348089515832703422004331778190859375/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^13 - 35341846436546333684641264785335256740602419307966890884416252504368008337970023364118525765251898888326256504635926797871793072181286220695463828125/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^11 + 54355439513455013441571038398805718946048280478368850882521910379918395893917150205057178466795359370111450895825398323183982698034845008758036640625/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^9 - 51954071341963704348637667617247760720146793060294851069030567480372988551220141734598976839128921003241332250984929973376110075761086320584505234375/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^7 + 27188657270644708044105699168858463731765296860668103743961255506815216402616212160474140655060815351955699550767476447365623940571154472742267812500/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^5 - 6213049644380105844828540968528366008408593369796139321649009130781114073586958111816476526940916652583213599293994395954841251551089438000559375000/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*t^3 + 369937001110354807929492271084944397993794936877990613838850533066915187499494702057640100042252044413637461530425676050521263897236719083510937500/1158727971958110784032740631871731460191056513996041214434065614735486794005466763369844965374820677*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
Positive weights:   69 out of 69
Indefinite weights: 0 out of 69
Negative weights:   0 out of 69
Extension rule has valid weights: 1
-------------------------------------------------
The nodes are:
| (-9.1900337705906284132 - 9.1287482852536455651e-1795j)  +/-  (3.89e-494, 3.89e-494j)
| (-6.1378737726593598519 + 8.1434401760902515587e-1808j)  +/-  (8.97e-496, 8.97e-496j)
| (12.871050513589016998 - 6.3440457706805679137e-1809j)  +/-  (5.07e-496, 5.07e-496j)
| (-14.259339753925542206 + 7.6163939526189339162e-1808j)  +/-  (8.56e-498, 8.56e-498j)
| (9.6611502182713796328 - 5.3403397473152962147e-1806j)  +/-  (4e-494, 4e-494j)
| (-11.700494745400871971 + 4.247891661694096582e-1806j)  +/-  (5.32e-495, 5.32e-495j)
| (11.700494745400871971 - 5.0270787861756356066e-1816j)  +/-  (5.15e-495, 5.15e-495j)
| (-12.871050513589016998 + 6.8329770052099198083e-1815j)  +/-  (4.84e-496, 4.84e-496j)
| (-12.267517576906019303 - 1.2185659437408316521e-1831j)  +/-  (1.89e-495, 1.89e-495j)
| (2.1290252659381178426 + 1.9364821113895289981e-1857j)  +/-  (3.86e-503, 3.86e-503j)
| (9.1900337705906284132 - 1.3997327955718653447e-1846j)  +/-  (3.85e-494, 3.85e-494j)
| (-10.14510690357924488 + 1.0056769236609140987e-1858j)  +/-  (3.45e-494, 3.45e-494j)
| (15.146118328979596785 - 2.5855110827298332163e-1892j)  +/-  (3.64e-499, 3.64e-499j)
| (13.525599479363487851 - 2.0775959004557110158e-1888j)  +/-  (8.72e-497, 8.72e-497j)
| (-8.7299831804601010871 - 1.2698363095266275721e-1895j)  +/-  (3.95e-494, 3.95e-494j)
| (14.259339753925542206 - 6.0837840827575413304e-1925j)  +/-  (8.4e-498, 8.4e-498j)
| (-10.644164734403443143 + 1.4738842062600608593e-1923j)  +/-  (2.16e-494, 2.16e-494j)
| (11.161286229151998652 - 1.1590625677943453303e-1937j)  +/-  (1.18e-494, 1.18e-494j)
| (-13.525599479363487851 - 2.3638039098299909428e-1939j)  +/-  (8.52e-497, 8.52e-497j)
| (-2.1290252659381178426 + 1.486970569116512801e-1955j)  +/-  (3.8e-503, 3.8e-503j)
| (-11.161286229151998652 - 2.9586857385639531313e-1947j)  +/-  (1.22e-494, 1.22e-494j)
| (4.5253179528754200714 + 3.0906145588595388545e-1958j)  +/-  (9.92e-498, 9.92e-498j)
| (-15.146118328979596785 - 2.1078715940658611131e-1959j)  +/-  (3.68e-499, 3.68e-499j)
| (12.267517576906019303 + 9.870838161716529675e-1955j)  +/-  (1.84e-495, 1.84e-495j)
| (10.644164734403443143 + 6.2938045877734043581e-1954j)  +/-  (2.27e-494, 2.27e-494j)
| (3.4833773961004847262 + 1.0675677116664014926e-1959j)  +/-  (2.73e-499, 2.73e-499j)
| (-9.6611502182713796328 + 8.9256029116141867506e-1956j)  +/-  (3.99e-494, 3.99e-494j)
| (-3.2163521816263617622 - 2.2357846780441165171e-1964j)  +/-  (6.09e-500, 6.09e-500j)
| (8.279574906450260729 + 6.4101635879460455369e-1958j)  +/-  (2.54e-494, 2.54e-494j)
| (-4.139992456542033112 - 9.4893448066020408829e-1963j)  +/-  (2.6e-498, 2.6e-498j)
| (10.14510690357924488 + 3.9883922206362188436e-1961j)  +/-  (3.25e-494, 3.25e-494j)
| (6.1378737726593598519 - 4.3782147196803864327e-1961j)  +/-  (9.68e-496, 9.68e-496j)
| (3.7780112966253929304 + 7.2089163191475789288e-1964j)  +/-  (8.78e-499, 8.78e-499j)
| (7.8376473368263677891 - 7.0387521615205076164e-1960j)  +/-  (1.72e-494, 1.72e-494j)
| (-2.5067504052527259853 + 7.8298449972456839976e-1967j)  +/-  (4.73e-502, 4.73e-502j)
| (1 - 4.3904194417945214416e-1971j)  +/-  (1.31e-506, 1.31e-506j)
| (-7.4032412742413640027 + 6.6944447404546928236e-1958j)  +/-  (9.7e-495, 9.7e-495j)
| (1.3730280109898259306 - 6.6841018088396643032e-1980j)  +/-  (1.97e-505, 1.97e-505j)
| (8.7299831804601010871 + 2.1815327920578080412e-1969j)  +/-  (3.6e-494, 3.6e-494j)
| (-5.3209906630585591705 + 4.7833817956114678839e-1970j)  +/-  (1.2e-496, 1.2e-496j)
| (-4.9201308967182027912 - 4.1684428051225444662e-1971j)  +/-  (3.45e-497, 3.45e-497j)
| (5.3209906630585591705 - 1.1991288500744602621e-1971j)  +/-  (1.1e-496, 1.1e-496j)
| (2.5067504052527259853 + 1.3190498461644436578e-1976j)  +/-  (5.06e-502, 5.06e-502j)
| (-3.4833773961004847262 + 3.8799346089012562173e-1973j)  +/-  (2.67e-499, 2.67e-499j)
| (4.9201308967182027912 - 2.5114701388827547132e-1973j)  +/-  (3.41e-497, 3.41e-497j)
| (-4.5253179528754200714 - 1.2353633794819674462e-1971j)  +/-  (9.73e-498, 9.73e-498j)
| (-1.3730280109898259306 - 9.2978288882924526258e-1981j)  +/-  (1.85e-505, 1.85e-505j)
| (4.139992456542033112 + 2.8118213927465141685e-1973j)  +/-  (2.64e-498, 2.64e-498j)
| (2.87719403852238558 + 8.4450706342560322651e-1976j)  +/-  (5.92e-501, 5.92e-501j)
| (5.7269533529779261037 + 1.8285512402077612575e-1971j)  +/-  (3.53e-496, 3.53e-496j)
| (1.7502489736939910539 - 4.9768385061737445191e-1979j)  +/-  (2.71e-504, 2.71e-504j)
| (-5.7269533529779261037 - 1.7439195536488579855e-1969j)  +/-  (3.36e-496, 3.36e-496j)
| (-2.87719403852238558 + 2.866947025796566196e-1975j)  +/-  (6.82e-501, 6.82e-501j)
| (6.9755604009814077717 - 5.9874419291563226308e-1970j)  +/-  (4.92e-495, 4.92e-495j)
| (-6.9755604009814077717 + 7.2026664116318308869e-1968j)  +/-  (4.88e-495, 4.88e-495j)
| (6.5539471821659534943 + 1.6563014739351700626e-1988j)  +/-  (2.18e-495, 2.18e-495j)
| (-0.63670247091684206522 - 8.9632926799655564904e-2000j)  +/-  (8.15e-508, 8.15e-508j)
| (-7.8376473368263677891 + 2.7562244734596011399e-1985j)  +/-  (1.7e-494, 1.7e-494j)
| (3.2163521816263617622 - 1.0597877801124955788e-2015j)  +/-  (6.45e-500, 6.45e-500j)
| (7.4032412742413640027 + 1.0385191605716289754e-2011j)  +/-  (1.02e-494, 1.02e-494j)
| (-8.279574906450260729 + 1.7616827602507755045e-2014j)  +/-  (2.55e-494, 2.55e-494j)
| (-6.3363354853391860349e-2068 + 1.6194304133261011075e-2068j)  +/-  (4.51e-2066, 4.51e-2066j)
| (-1.7502489736939910539 + 1.1726320244656636566e-2041j)  +/-  (2.9e-504, 2.9e-504j)
| (-3.7780112966253929304 + 2.1259643364074289951e-2043j)  +/-  (9.01e-499, 9.01e-499j)
| (0.63670247091684206522 - 2.2925448569116675628e-2052j)  +/-  (8.52e-508, 8.52e-508j)
| (0.29760335955926347263 + 4.0434418175835925702e-2053j)  +/-  (5.67e-509, 5.67e-509j)
| (-0.29760335955926347263 - 9.1194895128835068374e-2053j)  +/-  (5.67e-509, 5.67e-509j)
| (-1 - 3.4220593507076434239e-2051j)  +/-  (1.22e-506, 1.22e-506j)
| (-6.5539471821659534943 + 4.3108339820328580856e-2053j)  +/-  (2.29e-495, 2.29e-495j)
-------------------------------------------------
The weights are:
| (8.4941215294083245181e-20 - 3.8430579995841103076e-1813j)  +/-  (3.07e-169, 6.13e-414j)
| (1.0880108378857097861e-09 + 1.2026532288635999619e-1808j)  +/-  (1.17e-157, 2.34e-402j)
| (2.6542640557784372154e-37 + 2.097464122136395716e-1824j)  +/-  (1.4e-180, 2.8e-425j)
| (2.2201911026646922001e-45 - 6.0548448456297731624e-1828j)  +/-  (6.61e-183, 1.32e-427j)
| (1.0269870040962709917e-21 + 3.8347236594377540679e-1816j)  +/-  (5.56e-173, 1.11e-417j)
| (4.1212315713866565354e-31 - 3.106609633435320761e-1820j)  +/-  (2.93e-177, 5.85e-422j)
| (4.1212315713866565354e-31 + 3.7332814515578077649e-1821j)  +/-  (7.61e-179, 1.52e-423j)
| (2.6542640557784372154e-37 - 1.2570530357184766703e-1823j)  +/-  (2.32e-180, 4.63e-425j)
| (4.8754814084174656057e-34 + 7.4998858457858950444e-1822j)  +/-  (8.24e-179, 1.65e-423j)
| (0.015669290074045456081 - 1.2207214778799092678e-1804j)  +/-  (4.12e-137, 8.24e-382j)
| (8.4941215294083245181e-20 - 4.2187384458363845221e-1815j)  +/-  (9.32e-174, 1.86e-418j)
| (8.761440103057705507e-24 + 5.9585531390537524305e-1816j)  +/-  (5.75e-175, 1.15e-419j)
| (6.2649947506354441441e-51 - 1.7557860101147305497e-1831j)  +/-  (1.09e-188, 2.17e-433j)
| (5.1628968588167792021e-41 - 2.4308351241888667286e-1826j)  +/-  (5.7e-185, 1.14e-429j)
| (5.1236554103618129575e-18 + 1.5539094724171212469e-1812j)  +/-  (2.11e-173, 4.22e-418j)
| (2.2201911026646922001e-45 + 1.3089416316747564482e-1828j)  +/-  (7.91e-187, 1.58e-431j)
| (5.0578364329912177273e-26 - 2.5448791349919441025e-1817j)  +/-  (1.05e-177, 2.09e-422j)
| (1.8709687379270821925e-28 - 9.4939453662150534294e-1820j)  +/-  (6.06e-181, 1.21e-425j)
| (5.1628968588167792021e-41 + 1.2736044799167826885e-1825j)  +/-  (6.29e-185, 1.26e-429j)
| (0.015669290074045456081 - 1.9568618957542064736e-1804j)  +/-  (1.2e-148, 2.4e-393j)
| (1.8709687379270821925e-28 + 9.8016019716345279098e-1819j)  +/-  (4.29e-179, 8.57e-424j)
| (5.5754247284471882277e-06 + 7.5403577454256231468e-1807j)  +/-  (4.41e-166, 8.81e-411j)
| (6.2649947506354441441e-51 + 7.174020940765191975e-1831j)  +/-  (6.81e-190, 1.36e-434j)
| (4.8754814084174656057e-34 - 1.0756482369620577145e-1822j)  +/-  (3.13e-184, 6.26e-429j)
| (5.0578364329912177273e-26 + 1.8657610772823605683e-1818j)  +/-  (1.41e-181, 2.82e-426j)
| (0.00023480940511553113034 - 3.1879507318078888767e-1805j)  +/-  (2.8e-163, 5.6e-408j)
| (1.0269870040962709917e-21 - 1.5344206600334439528e-1814j)  +/-  (2.48e-178, 4.95e-423j)
| (0.00068949440366552170878 + 1.0322214722996821815e-1804j)  +/-  (1.28e-162, 2.56e-407j)
| (2.3147232856056755713e-16 - 3.2903319824566627297e-1813j)  +/-  (5.99e-179, 1.2e-423j)
| (2.8597875815994954179e-05 - 7.9151242483453898578e-1806j)  +/-  (5.39e-168, 1.08e-412j)
| (8.761440103057705507e-24 - 2.9432700404723183824e-1817j)  +/-  (3.47e-181, 6.93e-426j)
| (1.0880108378857097861e-09 + 2.3947756581447297835e-1809j)  +/-  (7.8e-176, 1.56e-420j)
| (0.00010728369631343515305 + 1.1831701328811547023e-1805j)  +/-  (9.06e-168, 1.81e-412j)
| (8.0044116030623594897e-15 + 2.396841829024931577e-1812j)  +/-  (8.39e-179, 1.68e-423j)
| (0.0064764114828928785065 + 1.4645356442853736005e-1804j)  +/-  (2.32e-163, 4.64e-408j)
| (0.089420285589551931912 + 4.4409414942211474242e-1804j)  +/-  (1.06e-156, 2.12e-401j)
| (2.1572857923375143768e-13 - 1.4477457659815805318e-1810j)  +/-  (7.68e-180, 1.54e-424j)
| (0.058393134400698730728 - 2.8368749516079005354e-1804j)  +/-  (7.73e-157, 1.55e-401j)
| (5.1236554103618129575e-18 + 3.9892650444699428631e-1814j)  +/-  (7.22e-180, 1.44e-424j)
| (1.1445963338921024607e-07 + 1.7482649143838098811e-1807j)  +/-  (1.65e-175, 3.3e-420j)
| (8.7958069944826641094e-07 - 6.2782757281125222007e-1807j)  +/-  (1.88e-174, 3.76e-419j)
| (1.1445963338921024607e-07 + 4.6613609476208316376e-1808j)  +/-  (7.6e-176, 1.52e-420j)
| (0.0064764114828928785065 + 8.3680322306896534632e-1805j)  +/-  (2.24e-167, 4.47e-412j)
| (0.00023480940511553113034 - 7.0798393723345741909e-1805j)  +/-  (2.41e-171, 4.83e-416j)
| (8.7958069944826641094e-07 - 1.8998805515199098883e-1807j)  +/-  (7.26e-175, 1.45e-419j)
| (5.5754247284471882277e-06 + 2.2170409311402555276e-1806j)  +/-  (1.83e-174, 3.67e-419j)
| (0.058393134400698730728 - 3.8334480386655356296e-1804j)  +/-  (3.34e-164, 6.67e-409j)
| (2.8597875815994954179e-05 - 2.9986215825989876012e-1806j)  +/-  (5.51e-173, 1.1e-417j)
| (0.0023005293439980547226 - 6.1912335759827804621e-1805j)  +/-  (2.53e-170, 5.05e-415j)
| (1.2303633054103969261e-08 - 1.0902970668188537289e-1808j)  +/-  (2.31e-177, 4.61e-422j)
| (0.032629695868632955531 + 1.8441897517518203716e-1804j)  +/-  (2.1e-167, 4.21e-412j)
| (1.2303633054103969261e-08 - 4.6963817257405470317e-1808j)  +/-  (1.96e-179, 3.93e-424j)
| (0.0023005293439980547226 - 1.1834773138460732408e-1804j)  +/-  (1.45e-172, 2.89e-417j)
| (4.6003464535288993783e-12 + 9.1437468950046084591e-1811j)  +/-  (2.66e-181, 5.31e-426j)
| (4.6003464535288993783e-12 + 6.6749098073201482561e-1810j)  +/-  (3.29e-183, 6.59e-428j)
| (7.8612318071887212157e-11 - 4.88178137243523904e-1810j)  +/-  (1.38e-180, 2.76e-425j)
| (0.11556895064202711238 - 8.1534971030715475404e-1804j)  +/-  (3.81e-172, 7.58e-417j)
| (8.0044116030623594897e-15 + 3.0178251653459911977e-1811j)  +/-  (3.51e-185, 7e-430j)
| (0.00068949440366552170878 + 4.9701519990375089203e-1805j)  +/-  (3.77e-175, 7.56e-420j)
| (2.1572857923375143768e-13 - 1.5589576384232013193e-1811j)  +/-  (1.57e-182, 3.13e-427j)
| (2.3147232856056755713e-16 - 6.31338923562397565e-1812j)  +/-  (4.7e-186, 9.27e-431j)
| (0.11349880122787189303 - 1.3482397058588462296e-1803j)  +/-  (3.14e-175, 5.27e-420j)
| (0.032629695868632955531 + 2.7119006643465478731e-1804j)  +/-  (1.91e-176, 3.41e-421j)
| (0.00010728369631343515305 + 2.8350591143470480592e-1805j)  +/-  (1.79e-178, 3.32e-423j)
| (0.11556895064202711238 - 7.0969201006316360251e-1804j)  +/-  (2.18e-175, 3.62e-420j)
| (0.12172553366316463983 + 1.1002337580710157945e-1803j)  +/-  (1.14e-175, 1.94e-420j)
| (0.12172553366316463983 + 1.1738769013234409705e-1803j)  +/-  (8.98e-176, 1.46e-420j)
| (0.089420285589551931912 + 5.5254160220922613432e-1804j)  +/-  (1.54e-176, 2.24e-421j)
| (7.8612318071887212157e-11 - 2.9156353161859246907e-1809j)  +/-  (2.65e-183, 5.76e-428j)
