Starting with polynomial:
P : 1073741824*t^30 - 233538846720*t^28 + 22069421015040*t^26 - 1195426971648000*t^24 + 41242230521856000*t^22 - 952695525054873600*t^20 + 15084345813368832000*t^18 - 164850350674673664000*t^16 + 1236377630060052480000*t^14 - 6250575796414709760000*t^12 + 20626900128168542208000*t^10 - 42191386625799290880000*t^8 + 49223284396765839360000*t^6 - 28398048690441830400000*t^4 + 6085296147951820800000*t^2 - 202843204931727360000
Extension levels are: 30 47
-------------------------------------------------
Trying to find an order 47 Kronrod extension for:
P1 : 1073741824*t^30 - 233538846720*t^28 + 22069421015040*t^26 - 1195426971648000*t^24 + 41242230521856000*t^22 - 952695525054873600*t^20 + 15084345813368832000*t^18 - 164850350674673664000*t^16 + 1236377630060052480000*t^14 - 6250575796414709760000*t^12 + 20626900128168542208000*t^10 - 42191386625799290880000*t^8 + 49223284396765839360000*t^6 - 28398048690441830400000*t^4 + 6085296147951820800000*t^2 - 202843204931727360000
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : 1073741824*t^77 - 69847134488631141447865888647816441226232598790818883440644053263716450304/61405459363328973517010012524244243272390723943972761892078927*t^75 + 104903100671174153874092281007753545699343593452035322515029111995896745164800/184216378089986920551030037572732729817172171831918285676236781*t^73 - 33044341706721519533175879321988084130795895430679786915919499431219310886912000/184216378089986920551030037572732729817172171831918285676236781*t^71 + 7356777884916439550446994002033075120874916400871111117363752531459380874313728000/184216378089986920551030037572732729817172171831918285676236781*t^69 - 410929438166200265297800960850075899967616355001805512746047450904145907576576409600/61405459363328973517010012524244243272390723943972761892078927*t^67 + 53896982007551011139274643185920487934845639998220859825232242386824968973799181516800/61405459363328973517010012524244243272390723943972761892078927*t^65 - 183248946478369111173693948039653924256342013130158164571516100860438297139458080768000/1980821269784805597322903629814330428141636256257185867486417*t^63 + 490228187371262676612037885865790004782836755978090538276582959694540122469044017954816000/61405459363328973517010012524244243272390723943972761892078927*t^61 - 35115074078050810597663618931895572030351581383897612216820699244357353122957673587671040000/61405459363328973517010012524244243272390723943972761892078927*t^59 + 2109247896678941422796013123907228077449745230233100124194851648358449506899231025926897664000/61405459363328973517010012524244243272390723943972761892078927*t^57 - 107063552708076967192694529118574783803831464129982843850936685468102969792987171247242412032000/61405459363328973517010012524244243272390723943972761892078927*t^55 + 148998053917968029341345500438814780640953889151767328093396261425566951086010657351656407040000/1980821269784805597322903629814330428141636256257185867486417*t^53 - 170089133967191585966088015689313896576611491029134652924322718757290765196690440505439474401280000/61405459363328973517010012524244243272390723943972761892078927*t^51 + 5362302891353614286079722650813106434740278318361234170325394190967683737971087387425359550976000000/61405459363328973517010012524244243272390723943972761892078927*t^49 - 145015895675392073399903922468290167049472461803773388176822682656108466336154847300197632713431040000/61405459363328973517010012524244243272390723943972761892078927*t^47 + 3367572341794440421388523643789522799455536883621975388058422885620066814978876198484179513384709120000/61405459363328973517010012524244243272390723943972761892078927*t^45 - 67164347220680100849740626248229129610455428188844638937415340711978819702791967599773519640729651200000/61405459363328973517010012524244243272390723943972761892078927*t^43 + 1149802359979012152011103606750734232996785008913187361222965154978773909865198506096913417862967849600000/61405459363328973517010012524244243272390723943972761892078927*t^41 - 16872560761822866372640004791092074506582871297817017606296365426426507388339316818580772201008347224000000/61405459363328973517010012524244243272390723943972761892078927*t^39 + 6831715559126566933293118616721411997319318652015345951521225870566305087187286576843428206493100642400000/1980821269784805597322903629814330428141636256257185867486417*t^37 - 2267207624920021477840776333855618070238419342398935730698283866153481641822678041278659128499627508349200000/61405459363328973517010012524244243272390723943972761892078927*t^35 + 20623044583569877734388502234919976291472924081235548159012992646925512310469930381746143775525971519946000000/61405459363328973517010012524244243272390723943972761892078927*t^33 - 158653587421215121005877262003717968611560005327468510220241476745490260531936995729567115533215179311973000000/61405459363328973517010012524244243272390723943972761892078927*t^31 + 33109159862350106946278296818809163550813467631708122081757779541232354548912635044209669826239037074327500000/1980821269784805597322903629814330428141636256257185867486417*t^29 - 178889529192032727620082744501420147693737587864987263309270776371699229111324600324862793210386187142448750000/1980821269784805597322903629814330428141636256257185867486417*t^27 + 800587932037536395445595498471929711295209377861242219820930395056456574251112804113314965460716453439985000000/1980821269784805597322903629814330428141636256257185867486417*t^25 - 2938362810342301173138142548735612850302154351281629942241711135587921280265483045826423997376333150542806250000/1980821269784805597322903629814330428141636256257185867486417*t^23 + 8739085396227951802726012376481525812857640783923028131981112473481403797096860450696960916237843949226560937500/1980821269784805597322903629814330428141636256257185867486417*t^21 - 20756629730484390204511525220585682035368325578698973118812223451379790189851540595568545006507062571337164062500/1980821269784805597322903629814330428141636256257185867486417*t^19 + 77342248131901777785541452886762104301016961755979411259101481898451414043870275303388213126882415044572678515625/3961642539569611194645807259628660856283272512514371734972834*t^17 - 221045539387093941026813790520159281244533126715023335443891516443444354204800195656145311873712129309774073046875/7923285079139222389291614519257321712566545025028743469945668*t^15 + 470910725814023539858056828196539849328370488131045414658940673768998198004861700700119577665625339486889931640625/15846570158278444778583229038514643425133090050057486939891336*t^13 - 1440665450950943191293720515004170072072747926807120927695278404390540487374386217375302220220925057408800314453125/63386280633113779114332916154058573700532360200229947759565344*t^11 + 3008132771064119761212395540845895023244432769839096702411823589108979260038728519084471425027249976652531591796875/253545122532455116457331664616234294802129440800919791038261376*t^9 - 1994342278670421225071489228847827869195324362180279318962847258330758341206233276192685593162370784498980697265625/507090245064910232914663329232468589604258881601839582076522752*t^7 + 751648644179051747401447045077002756314759098476203680382768689202890179083808410192122737908832542516221615234375/1014180490129820465829326658464937179208517763203679164153045504*t^5 - 132162076060972934416355065900214535045468762619927379816313743060839207337172557382417622711473794828685146484375/2028360980259640931658653316929874358417035526407358328306091008*t^3 + 1677332671414231768845065891018740555175964500794715477282397255158414876885590268636819013596740479364423828125/1014180490129820465829326658464937179208517763203679164153045504*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:   77 out of 77
Indefinite weights: 0 out of 77
Negative weights:   0 out of 77
Extension rule has valid weights: 1
-------------------------------------------------
The nodes are:
| (-6.4359342517300615216 - 2.6225009177510196694e-1929j)  +/-  (1.86e-492, 1.86e-492j)
| (-9.2264015066867705168 - 1.2317653669432483225e-1935j)  +/-  (1.86e-496, 1.86e-496j)
| (-7.93257938387067297 + 1.2292468540599544328e-1933j)  +/-  (2.64e-494, 2.64e-494j)
| (-8.761480135870933068 - 3.7352058702275900386e-1935j)  +/-  (1.22e-495, 1.22e-495j)
| (-6.8633452935298915811 + 5.2873956414785659591e-1931j)  +/-  (9.77e-493, 9.77e-493j)
| (7.5532695979513487663 - 9.1848683962626899798e-1931j)  +/-  (8.32e-494, 8.32e-494j)
| (8.761480135870933068 + 1.3493049705608128615e-1940j)  +/-  (1.24e-495, 1.24e-495j)
| (-4.4830553570925183419 - 2.0107600699568782066e-1939j)  +/-  (1.17e-493, 1.17e-493j)
| (-1.0083382710467234618 - 6.7009467864280908043e-1950j)  +/-  (2.3e-504, 2.3e-504j)
| (-3.3069541832457830425 + 4.292212239180054741e-1942j)  +/-  (1.19e-495, 1.19e-495j)
| (6.6341174638796474421 + 1.7575790512316507506e-1937j)  +/-  (1.86e-492, 1.86e-492j)
| (-5.8308084801270057537 + 6.0748716817114219246e-1955j)  +/-  (8.5e-493, 8.5e-493j)
| (5.5331471515674957251 - 3.6852186847019575752e-1954j)  +/-  (6.94e-493, 6.94e-493j)
| (-1.8267411436036880388 - 1.726462713842580148e-1976j)  +/-  (1.64e-500, 1.64e-500j)
| (-9.7481469879001896721 - 1.5336141964136024852e-1974j)  +/-  (1.54e-497, 1.54e-497j)
| (6.4359342517300615216 + 1.3394956778513947682e-1966j)  +/-  (1.68e-492, 1.68e-492j)
| (6.8633452935298915811 + 6.9843342785622332609e-1982j)  +/-  (8.77e-493, 8.77e-493j)
| (-3.5444438731553498869 + 2.3086650483657153351e-2003j)  +/-  (3.77e-495, 3.77e-495j)
| (9.2264015066867705168 + 7.7655696366232228956e-2002j)  +/-  (1.9e-496, 1.9e-496j)
| (5.2517864772762860358 + 1.402418024424926396e-2001j)  +/-  (4.93e-493, 4.93e-493j)
| (2.0668984846713412074 - 1.8066373155379574393e-2023j)  +/-  (1.91e-499, 1.91e-499j)
| (1.4155278001981885119 - 9.8426550726046310885e-2026j)  +/-  (3.86e-502, 3.86e-502j)
| (-5.5331471515674957251 + 2.4410212681990338099e-2015j)  +/-  (6.2e-493, 6.2e-493j)
| (-7.5532695979513487663 + 3.386246631397360275e-2019j)  +/-  (8.16e-494, 8.16e-494j)
| (-10.379178935188691058 + 8.7828040641859522352e-2027j)  +/-  (5.8e-499, 5.8e-499j)
| (4.7361034867196227243 - 1.5231467592553776365e-2018j)  +/-  (2.08e-493, 2.08e-493j)
| (-8.3335242004564663099 - 1.0755422191841763076e-2033j)  +/-  (6.06e-495, 6.06e-495j)
| (-6.6341174638796474421 + 8.6712225971204931544e-2030j)  +/-  (1.84e-492, 1.84e-492j)
| (3.3069541832457830425 - 2.1114692492749630646e-2034j)  +/-  (1.23e-495, 1.23e-495j)
| (-0.60392105862555230778 + 1.7176143306017028629e-2058j)  +/-  (1.9e-506, 1.9e-506j)
| (7.1938925040961231164 - 2.3010550759519804653e-2043j)  +/-  (2.88e-493, 2.88e-493j)
| (1.2478706736244514377 + 4.4394755457186646051e-2069j)  +/-  (4.89e-503, 4.89e-503j)
| (-4.7361034867196227243 - 4.7730673444653296135e-2057j)  +/-  (2.16e-493, 2.16e-493j)
| (8.3335242004564663099 + 1.0742150750625539575e-2063j)  +/-  (6.21e-495, 6.21e-495j)
| (-2.9014939213519118959 - 7.315509511787510441e-2079j)  +/-  (9.83e-497, 9.83e-497j)
| (9.7481469879001896721 + 1.3999630619006806859e-2076j)  +/-  (1.66e-497, 1.66e-497j)
| (-2.4272537797664154489 + 5.4385796650233311189e-2084j)  +/-  (4.3e-498, 4.3e-498j)
| (-3.0999705295864417487 - 1.0230894175684735136e-2079j)  +/-  (4.2e-496, 4.2e-496j)
| (1.8267411436036880388 + 2.3139726563980708045e-2087j)  +/-  (1.62e-500, 1.62e-500j)
| (6.1382792201239346204 - 4.4682823940896145655e-2086j)  +/-  (1.16e-492, 1.16e-492j)
| (-6.1382792201239346204 - 4.2236207734900727236e-2099j)  +/-  (1.16e-492, 1.16e-492j)
| (3.5444438731553498869 - 1.3637827110636673648e-2102j)  +/-  (3.56e-495, 3.56e-495j)
| (-2.2433914677615040725 + 3.5236305436336608688e-2117j)  +/-  (1.02e-498, 1.02e-498j)
| (3.0999705295864417487 + 2.3097787270219861447e-2112j)  +/-  (4.04e-496, 4.04e-496j)
| (4.4830553570925183419 + 2.6236727254003606769e-2122j)  +/-  (1.16e-493, 1.16e-493j)
| (-7.1938925040961231164 + 8.8792344006871518399e-2135j)  +/-  (2.81e-493, 2.81e-493j)
| (2.4272537797664154489 - 1.1027845494271188245e-2142j)  +/-  (3.93e-498, 3.93e-498j)
| (7.93257938387067297 + 2.9518064754654498805e-2138j)  +/-  (2.57e-494, 2.57e-494j)
| (0.77769399658219074699 - 2.7779046963612547536e-2159j)  +/-  (1.38e-505, 1.38e-505j)
| (-4.9889189685899439445 - 5.9493901151042186483e-2145j)  +/-  (3.99e-493, 3.99e-493j)
| (-1.4155278001981885119 - 2.7507003761125045454e-2160j)  +/-  (3.9e-502, 3.9e-502j)
| (0.20112857654887148555 - 1.7913781026815469524e-2164j)  +/-  (4.76e-509, 4.76e-509j)
| (10.379178935188691058 - 3.5290016404047418956e-2155j)  +/-  (5.4e-499, 5.4e-499j)
| (-1.2478706736244514377 - 7.1784075822698152058e-2160j)  +/-  (4.78e-503, 4.78e-503j)
| (2.6671321245356172006 + 1.8432604307602759221e-2149j)  +/-  (1.82e-497, 1.82e-497j)
| (5.8308084801270057537 - 5.3238215905369421278e-2150j)  +/-  (8.31e-493, 8.31e-493j)
| (-0.77769399658219074699 - 5.342798460223643992e-2173j)  +/-  (1.54e-505, 1.54e-505j)
| (2.9014939213519118959 + 5.9432116951712977336e-2165j)  +/-  (1.01e-496, 1.01e-496j)
| (4.9889189685899439445 + 7.1741649375969315432e-2161j)  +/-  (3.45e-493, 3.45e-493j)
| (0.41909523800039305084 + 3.0058848607524913025e-2177j)  +/-  (1.15e-507, 1.15e-507j)
| (2.2433914677615040725 - 3.169399295688194531e-2168j)  +/-  (1.03e-498, 1.03e-498j)
| (-2.0668984846713412074 + 2.3175721034643372258e-2169j)  +/-  (1.9e-499, 1.9e-499j)
| (-4.0039086038612288152 + 6.1192144487205587235e-2163j)  +/-  (2.85e-494, 2.85e-494j)
| (-1.583381474452191797 - 2.0993812207221014452e-2173j)  +/-  (1.85e-501, 1.85e-501j)
| (1.583381474452191797 + 5.1672339618448599634e-2171j)  +/-  (1.75e-501, 1.75e-501j)
| (3.7808344410474219805 - 5.8215658977461929956e-2163j)  +/-  (1.14e-494, 1.14e-494j)
| (-4.2348161951628903439 + 3.8438225027906214285e-2164j)  +/-  (6.05e-494, 6.05e-494j)
| (-0.41909523800039305084 - 3.5932024630837181768e-2178j)  +/-  (1.22e-507, 1.22e-507j)
| (-2.6671321245356172006 - 4.3098129923270869726e-2167j)  +/-  (1.79e-497, 1.79e-497j)
| (4.0039086038612288152 + 8.4572929575684406588e-2164j)  +/-  (3e-494, 3e-494j)
| (0.60392105862555230778 + 3.0100324903435303069e-2185j)  +/-  (1.86e-506, 1.86e-506j)
| (-3.7808344410474219805 - 2.7555856608609009374e-2172j)  +/-  (1.09e-494, 1.09e-494j)
| (7.3359737826051096257e-2212 - 8.5204447637526487595e-2212j)  +/-  (8.66e-2210, 8.66e-2210j)
| (-0.20112857654887148555 + 1.6863456759209568472e-2189j)  +/-  (4.86e-509, 4.86e-509j)
| (-5.2517864772762860358 - 4.1825163377455736054e-2178j)  +/-  (4.84e-493, 4.84e-493j)
| (1.0083382710467234618 + 1.8159990378742748264e-2191j)  +/-  (2.21e-504, 2.21e-504j)
| (4.2348161951628903439 + 1.2804249733008472128e-2189j)  +/-  (5.96e-494, 5.96e-494j)
-------------------------------------------------
The weights are:
| (1.5579088051701360375e-19 - 2.3047947438853290955e-1947j)  +/-  (2.25e-168, 6.35e-412j)
| (2.9543857212850574129e-38 + 1.5707564537330105086e-1961j)  +/-  (1.18e-180, 3.31e-424j)
| (1.0318394412044708519e-28 - 3.5726466900857464312e-1955j)  +/-  (5.78e-176, 1.63e-419j)
| (1.1509753935243679596e-34 - 3.1552921260570515994e-1959j)  +/-  (4.3e-179, 1.21e-422j)
| (5.9484541191988502187e-22 + 1.5869805212212455645e-1949j)  +/-  (1.73e-171, 4.87e-415j)
| (3.4806169003125693736e-26 - 1.8200035352216103818e-1954j)  +/-  (2.9e-179, 8.18e-423j)
| (1.1509753935243679596e-34 + 4.8976175372124154562e-1960j)  +/-  (3.65e-184, 1.03e-427j)
| (2.6660601584038179665e-10 + 6.3803801928712648967e-1942j)  +/-  (1.1e-161, 3.11e-405j)
| (0.04979652964012951257 + 1.9928030536245548062e-1935j)  +/-  (1.36e-120, 3.82e-364j)
| (2.2806539923620986008e-06 - 8.6145085108356061521e-1939j)  +/-  (2.65e-153, 7.47e-397j)
| (6.8370553428556014094e-21 + 6.2662420512787176852e-1950j)  +/-  (6.2e-176, 1.75e-419j)
| (2.9435648995824311846e-16 - 5.1925604988316347675e-1946j)  +/-  (2.37e-169, 6.69e-413j)
| (8.2826952903667069297e-15 + 2.8389245494510276579e-1946j)  +/-  (1.16e-171, 3.27e-415j)
| (0.0050205767093351453466 + 3.0836036215919916645e-1936j)  +/-  (4.96e-140, 1.4e-383j)
| (1.7054983444349769883e-42 - 3.652909496437982293e-1964j)  +/-  (5.56e-186, 1.57e-429j)
| (1.5579088051701360375e-19 - 3.121019756992886151e-1949j)  +/-  (1.89e-175, 5.32e-419j)
| (5.9484541191988502187e-22 - 4.8501383396263943664e-1951j)  +/-  (2.41e-177, 6.8e-421j)
| (4.7697855082874369634e-07 + 2.1380863421278890395e-1939j)  +/-  (1.26e-159, 3.55e-403j)
| (2.9543857212850574129e-38 - 2.8284990193454821157e-1962j)  +/-  (2.84e-188, 8.02e-432j)
| (1.6115633662503175461e-13 - 2.9125231232035341278e-1945j)  +/-  (1.77e-171, 4.98e-415j)
| (0.0017188508475573956182 - 9.8388929761442847929e-1937j)  +/-  (4.44e-150, 1.25e-393j)
| (0.0094380941124022434662 + 1.0174590577091711555e-1935j)  +/-  (7.57e-141, 2.13e-384j)
| (8.2826952903667069297e-15 + 3.7924377512209943977e-1945j)  +/-  (9.31e-172, 2.62e-415j)
| (3.4806169003125693736e-26 + 2.7008838653489601783e-1953j)  +/-  (3.76e-180, 1.06e-423j)
| (6.7457854913403627047e-48 + 1.9933464769191748085e-1967j)  +/-  (3.54e-192, 9.99e-436j)
| (2.580880076342571051e-11 - 1.7341928825797659957e-1943j)  +/-  (1.07e-172, 3e-416j)
| (1.6103632571963168737e-31 + 3.9271725876955363758e-1957j)  +/-  (3.07e-183, 8.64e-427j)
| (6.8370553428556014094e-21 - 4.2323487915353287497e-1948j)  +/-  (1.66e-176, 4.69e-420j)
| (2.2806539923620986008e-06 - 2.7597008942067668689e-1939j)  +/-  (9.63e-167, 2.72e-410j)
| (0.061822812479140167007 + 5.0087704550386550978e-1935j)  +/-  (1.14e-142, 3.22e-386j)
| (6.5753697158164698556e-24 + 1.0436939142608261538e-1952j)  +/-  (1.17e-182, 3.31e-426j)
| (0.026431646382079562933 - 1.2018521595845645787e-1935j)  +/-  (2.78e-147, 7.84e-391j)
| (2.580880076342571051e-11 - 1.1453119764692091094e-1942j)  +/-  (8.05e-172, 2.27e-415j)
| (1.6103632571963168737e-31 - 5.1537249938076586371e-1958j)  +/-  (2.59e-188, 7.29e-432j)
| (2.7057432046601054797e-05 - 6.3914253053859642475e-1938j)  +/-  (6.6e-164, 1.86e-407j)
| (1.7054983444349769883e-42 + 7.5389535427909442882e-1965j)  +/-  (8.08e-195, 2.28e-438j)
| (0.00034961689003865898549 - 5.2203463902761646295e-1937j)  +/-  (7.3e-162, 2.06e-405j)
| (7.1945119746657343082e-06 + 2.7629709260483117724e-1938j)  +/-  (8.87e-165, 2.5e-408j)
| (0.0050205767093351453466 + 1.7181137078401290602e-1936j)  +/-  (5.25e-159, 1.48e-402j)
| (7.5445380126056376077e-18 + 2.3951662523216593253e-1948j)  +/-  (3.26e-180, 9.19e-424j)
| (7.5445380126056376077e-18 + 1.0240982653162497065e-1946j)  +/-  (3.08e-178, 8.68e-422j)
| (4.7697855082874369634e-07 + 6.1772364874363408839e-1940j)  +/-  (6.54e-172, 1.84e-415j)
| (0.00055135224762898289369 + 1.2708585430318491463e-1936j)  +/-  (1.44e-162, 4.07e-406j)
| (7.1945119746657343082e-06 + 9.6438303636845356135e-1939j)  +/-  (7.7e-170, 2.17e-413j)
| (2.6660601584038179665e-10 + 1.1362804829265195836e-1942j)  +/-  (5.94e-176, 1.67e-419j)
| (6.5753697158164698556e-24 - 1.942859573064861845e-1951j)  +/-  (6.19e-183, 1.74e-426j)
| (0.00034961689003865898549 - 2.357202360279103857e-1937j)  +/-  (3.02e-167, 8.52e-411j)
| (1.0318394412044708519e-28 + 3.8777611129846677881e-1956j)  +/-  (3.71e-188, 1.05e-431j)
| (0.06370665516478103765 - 2.7565032802611824428e-1935j)  +/-  (2.12e-159, 5.99e-403j)
| (2.2363536149921804636e-12 + 1.9558456855908875554e-1943j)  +/-  (6.56e-177, 1.85e-420j)
| (0.0094380941124022434662 + 1.5926287392760031403e-1935j)  +/-  (1.67e-162, 4.72e-406j)
| (0.11560038904900218794 + 4.508344341275872168e-1935j)  +/-  (5.84e-160, 1.65e-403j)
| (6.7457854913403627047e-48 - 4.7060904923791348327e-1968j)  +/-  (9.73e-200, 2.74e-443j)
| (0.026431646382079562933 - 1.781391999307852376e-1935j)  +/-  (1.25e-161, 3.53e-405j)
| (0.00011238639603170811186 + 6.4729998548203996267e-1938j)  +/-  (6.19e-170, 1.74e-413j)
| (2.9435648995824311846e-16 - 2.5377667138398235572e-1947j)  +/-  (9.14e-181, 2.58e-424j)
| (0.06370665516478103765 - 3.5159080009835997024e-1935j)  +/-  (1.01e-162, 2.85e-406j)
| (2.7057432046601054797e-05 - 2.4143019384056526571e-1938j)  +/-  (3.41e-171, 9.61e-415j)
| (2.2363536149921804636e-12 + 2.4635624679554001507e-1944j)  +/-  (1.58e-178, 4.45e-422j)
| (0.10064673892609279479 - 4.3582303917333824052e-1935j)  +/-  (7.9e-165, 2.23e-408j)
| (0.00055135224762898289369 + 6.129713353366675246e-1937j)  +/-  (7.09e-169, 2e-412j)
| (0.0017188508475573956182 - 1.9174007485828495924e-1936j)  +/-  (1.35e-169, 3.82e-413j)
| (1.3684601779294746241e-08 + 1.573901964709268232e-1940j)  +/-  (1.43e-177, 4.02e-421j)
| (0.010293597570418241006 - 8.3169529776608845499e-1936j)  +/-  (4.72e-169, 1.34e-412j)
| (0.010293597570418241006 - 5.0276075229391113401e-1936j)  +/-  (7.09e-169, 2.01e-412j)
| (7.9870553497504512993e-08 - 1.5065073968588681526e-1940j)  +/-  (1e-176, 2.84e-420j)
| (2.2126671729318644883e-09 - 3.4548047219945554089e-1941j)  +/-  (2.32e-178, 6.54e-422j)
| (0.10064673892609279479 - 4.9666276009991309936e-1935j)  +/-  (1.89e-169, 5.35e-413j)
| (0.00011238639603170811186 + 1.566370110123088164e-1937j)  +/-  (2.04e-173, 5.8e-417j)
| (1.3684601779294746241e-08 + 3.6540025834382612109e-1941j)  +/-  (3.55e-178, 1.01e-421j)
| (0.061822812479140167007 + 4.1478796487856716535e-1935j)  +/-  (2.07e-170, 5.8e-414j)
| (7.9870553497504512993e-08 - 5.8149332495445908433e-1940j)  +/-  (4.06e-177, 1.14e-420j)
| (0.10894729589230908602 - 4.9235471025280404703e-1935j)  +/-  (8.23e-171, 2.3e-414j)
| (0.11560038904900218794 + 4.7997981688834191277e-1935j)  +/-  (6.95e-171, 1.94e-414j)
| (1.6115633662503175461e-13 - 2.8930984682763477826e-1944j)  +/-  (2.5e-182, 7.03e-426j)
| (0.04979652964012951257 + 1.4520437516159014662e-1935j)  +/-  (1.72e-172, 4.51e-416j)
| (2.2126671729318644883e-09 - 7.0994210517967588258e-1942j)  +/-  (2.42e-179, 7.12e-423j)
