Starting with polynomial:
P : 25674715590128696833261065/4398046511104*t^46 - 292014622371243969477200025/4398046511104*t^44 + 1551942880692116826547366425/4398046511104*t^42 - 5119627663892385393322921425/4398046511104*t^40 + 11745028170106060608211407975/4398046511104*t^38 - 19895794707432676162825589895/4398046511104*t^36 + 25790844991116432062922060975/4398046511104*t^34 - 26163949439450846993307913575/4398046511104*t^32 + 10533538086012678659643445725/2199023255552*t^30 - 6788280099874837358436887245/2199023255552*t^28 + 3515027229798203454094716957/2199023255552*t^26 - 1462719397803349708810221525/2199023255552*t^24 + 487573132601116569603407175/2199023255552*t^22 - 129310440448746185509055175/2199023255552*t^20 + 26998883170617335435956575/2199023255552*t^18 - 4371247751433282880107255/2199023255552*t^16 + 1074896988057364642649325/4398046511104*t^14 - 97523056742991208854525/4398046511104*t^12 + 6273413006859083610525/4398046511104*t^10 - 270146971587233265525/4398046511104*t^8 + 7135957740040123995/4398046511104*t^6 - 99943385714847675/4398046511104*t^4 + 556271163533475/4398046511104*t^2 - 514589420475/4398046511104
Extension levels are: 46 48
-------------------------------------------------
Trying to find an order 48 Kronrod extension for:
P1 : 25674715590128696833261065/4398046511104*t^46 - 292014622371243969477200025/4398046511104*t^44 + 1551942880692116826547366425/4398046511104*t^42 - 5119627663892385393322921425/4398046511104*t^40 + 11745028170106060608211407975/4398046511104*t^38 - 19895794707432676162825589895/4398046511104*t^36 + 25790844991116432062922060975/4398046511104*t^34 - 26163949439450846993307913575/4398046511104*t^32 + 10533538086012678659643445725/2199023255552*t^30 - 6788280099874837358436887245/2199023255552*t^28 + 3515027229798203454094716957/2199023255552*t^26 - 1462719397803349708810221525/2199023255552*t^24 + 487573132601116569603407175/2199023255552*t^22 - 129310440448746185509055175/2199023255552*t^20 + 26998883170617335435956575/2199023255552*t^18 - 4371247751433282880107255/2199023255552*t^16 + 1074896988057364642649325/4398046511104*t^14 - 97523056742991208854525/4398046511104*t^12 + 6273413006859083610525/4398046511104*t^10 - 270146971587233265525/4398046511104*t^8 + 7135957740040123995/4398046511104*t^6 - 99943385714847675/4398046511104*t^4 + 556271163533475/4398046511104*t^2 - 514589420475/4398046511104
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : 25674715590128696833261065/4398046511104*t^94 - 11340493662186669425650496739/83562883710976*t^92 + 1175518814784617480253119075354049/770031973396643840*t^90 - 8907268883664921218094172873459776117/804683412199492812800*t^88 + 43553068302916545047404228523831627024087247/748930921985250953265152000*t^86 - 1728681156136398653075865278747811913106982701823/7328289071625680577699512320000*t^84 + 571102606481883977695580243263259822398222342230740423/742832021745337111758511066316800000*t^82 - 15620316140530283013273615146116356572410656820966488293283/7550887501041351741025264989110272000000*t^80 + 3589513515735456270956380905236296656979640868460995855045415442427/766021944397955483735667915973034581688320000000*t^78 - 805651401040251116795822687678393240501116203280605548908049514268257601/88854715440440846335918799913292146302936678400000000*t^76 + 48143936155162296586724792447893250725568229219691301744960470424913811373954783/3176656334733015553930712791946096394968398066352128000000000*t^74 - 1266328175453536201160635112723800201061824663746908321309647794232699319029787087/57363587532162305663955433474398517545503717148590080000000000*t^72 + 18045273086594507707919148968602789977625900767110786537530560764899697710423248762612917143/639548644261187358545702781286909173946957271937175245343948800000000000*t^70 - 644436694983703041364104640783660721314985313558100763636846771695878003278615387938546009643/20252373734937599687280588074085457174986980278010549435891712000000000000*t^68 + 635057105606668690023547392727120428751039224435539491783658978580087707987876487543165666911239091/19968941764517147979657096243988631201823037489019791796536407490560000000000000*t^66 - 22417641546345517631267346568046996643204842047713841955883671670632423904559949084176156209892698192816521/793112750277983389209654483507813321861634154208208112017452405270931046400000000000000*t^64 + 100131783077375213368582503100719206947734922751183661391917860069128660394539667259338136623184989048239679185493/4469980596548449488867818300853289881575174481660792945245512804195503899148288000000000000000*t^62 - 855475627404273926615262799555876812388005294433744835278097806365501166417145125807207894225561375994392486245790333/53930315897357043083190227799794942421204480121237466884387111982618754543224094720000000000000000*t^60 + 2360291489448233424479655694742543554421196703586420754204591572282945773460402881707918363045123047844140831857681682639948881/234830732451980426244584344129867389340035269620555103580922039380017371881444367390054809600000000000000000*t^58 - 5556568134450843568181042474330337117220917984159449806476708748772069949074054093689642043818268408120074871914510889728317300911/974156155121632134871284054232066553445579643475936088021524926694772064354858384056410701824000000000000000000*t^56 + 30607821185340353878556898093975732990643244493879928885771144172680927302502908406977235390092439933044590284386011814596316410738107516939/10552636060693393452161897165404184053634504835038618459880616626239007736255136691453687950805817098240000000000000000000*t^54 - 14034347073428122589249531952359053052405032544471417036989957024430244859288782066170137254852585585634268250371336242985166288678276919330751981/10619487010137886099681342783947019559614279423168588107823960332566231850264312982394047063974171949557350400000000000000000000*t^52 + 55432395870274146590663867220249387152326863672365040871263422017339723960349803599750285989370654994133970619609319155391735832777634186256435987081707/102784120962607791635794606966360065099018479323684965897415550119315917100694988220776787927146268239101256794112000000000000000000000*t^50 - 267302669559946942504924410702505685606258307375357172996677482209373851561029304078760699493527323179065151459343066494321045397455953228852471432595499319/1357264317311235888550667784990784659632539019469259974675372339325566685314677319455357484577966472097332095966248960000000000000000000000*t^48 + 876126586369074129357078228391920814307633622869972684980446039597811744233347077021395513067102071825759510664269669473833841335670190521962643663417899180588306889/13631474561800553685944183576175570677190495290876040820487913098889105260066915085758052808225675464257436554354780882101862400000000000000000000000*t^46 - 246452132014367160714147858659938264143140668647298079800175911489958791228199534914007815755818662191666562714549481285081740368602070370139951495636512986407699/13170506822995704044390515532536783262985985788286029778249191399892855323736149841312128317126256487205252709521527422320640000000000000000000000*t^44 + 135030176696057867873370427134518677703413810248481232925732061522545637325193049197743466697542187398257462514918495529110815153631311894806078514599325487751/27844623304430663941628996897540767997856206740562430820822814798927812523755073660279341051006884750962479301314011463680000000000000000000000*t^42 - 2272972518848490090709190100946774594710911049831654497592956039993106225840368827431493220917233796739044786911022565743497388041574112741094795010919872973/2037411461299804678655780260795665951062649273699690060060205960897157013933298072703366418366357420802132631803464253440000000000000000000000*t^40 + 154219591806532953941912075935835660425347218733630305303211952403390449490293246503728637732624335453202370126250834979627343238618652133456186835984414383/679137153766601559551926753598555317020883091233230020020068653632385671311099357567788806122119140267377543934488084480000000000000000000000*t^38 - 196775165180118138440031046090172700194734599593896252568289545342295100679614677777007950683392471674505312725685251052640801943850516459387998791696429/4830278476291618488989521718339653748370434503792532148080146896389656268215500409443732618222753486965700881468620800000000000000000000000*t^36 + 133684697510548755475391851702878676713208354490054187724462986902828513131530342479146130801407522844130246732923521973701494097779632065226093841893/20850122919244396355350453460458937043325616563133232293871137682257509071433814717023306265709727281866334740152320000000000000000000000*t^34 - 77336212389600437035952043591395292969343338364441396436175959101964270403638144407304367491843546704620163168888114428991401325732626139085923848583/87823245023483972527082213060720977243098809159864220874184489025266477603918189262613320331322790672103652390338560000000000000000000000*t^32 + 202627562559154928260896564525240116748339061245468951905761089573820222101524434788071106508491863582661984942486418707697969997026880485520679841711/1932111390516647395595808687335861499348173801517012859232058758555862507286200163777493047289101394786280352587448320000000000000000000000*t^30 - 1682535299910706287784207564450977125852876302301665906627155926283875585773879769772913481114847270519257642758896782153065974930593843800461714394423/156501022631848439043260503674204781447202077922878041597796759443024863090182213265976936830417212977688708559583313920000000000000000000000*t^28 + 136281347631747267219873067294442498685407607595005838498123749817069960542247331633947736351358028002251273029861357635970599255835096078812624113009/144908354288748554669685651550189612451113035113775964442404406891689688046465012283311978546682604608971026444058624000000000000000000000000*t^26 - 4430309998748840062854883259495669268281506577372956330000918717886056743973037315370362472210616985156253906043447210885136384646383761566325260787/63759675887049364054661686682083429478489735450061424354657939032343462740444605404657270560540346027947251635385794560000000000000000000000*t^24 + 819253562926401473020520308992302918535025186622228040246230946757453175700283300945146384613595489514410948994991184462991965014666526070496337857/191279027661148092163985060046250288435469206350184273063973817097030388221333816213971811681621038083841754906157383680000000000000000000000*t^22 - 1257922098076890462181083711042679685508521565038624226437453806626653873414037101306277054112709762042980465605179482016357336871338774525837689/5796334171549942186787426062007584498044521404551038577696176275667587521858600491332479141867304184358841057762344960000000000000000000000*t^20 + 2708131658962493205010568504365066667736936670294844687940765624459656938323000556846892429306626394403558751394315681439740403883551747233503/305070219555260115094075055895136026212869547607949398826114540824609869571505289017498902203542325492570581987491840000000000000000000000*t^18 - 57020831289076623574364802642434869687092779069834975824453031660642546353040161645121772418541760078768669011246961352509406706166373660103/198958838840387031583092427757697408399697531048662651408335570103006436677068666750542762306658038364719944774451200000000000000000000000*t^16 + 2164927564963815531688767320527976444703359430925551628331288402156702291500567623507951855784932528556478721154431448082671495089560280737/305070219555260115094075055895136026212869547607949398826114540824609869571505289017498902203542325492570581987491840000000000000000000000*t^14 - 39597758884069659004958155742192650826629619796369911653533595772009540164553085586104554691228927533984646533287742030837357433106034729/305070219555260115094075055895136026212869547607949398826114540824609869571505289017498902203542325492570581987491840000000000000000000000*t^12 + 7902003372645493964246465005404266628249389748804306177347411870691782288865688617410990750147122731142662627243861551751075958146960349/4742455231268134516462439505278932771127335694632667927205962407364389790611582220181119297891430696293597229078282240000000000000000000000*t^10 - 1536121700443655368055688243850860016419583606319726089879726302522927922040686909776328926235221012598124872989273228176321280524777797/110130349259448901548961095178144105462845906686469732976227349237684162915313409335317103695478779502817980097484554240000000000000000000000*t^8 + 37401615769655470065288893712088814496199930017199984102725311596647797639765768492177361211119624857485561150772365977418185395937161/550651746297244507744805475890720527314229533432348664881136746188420814576567046676585518477393897514089900487422771200000000000000000000000*t^6 - 1194711108841290030218526010900940526896405126736535884343282927089315000612217463610701011269318569972816558618409695863608191797697/7598994098901974206878315567291943276936367561366411575359687097400207241156625244136880154988035785694440626726434242560000000000000000000000*t^4 + 3040541803229973022175075349719710022901472539886274589306575439571406172373329315219216417980910298339609804417389912810140305133/27862978362640572091887157080070458682100014391676842442985519357134093217574292561835227234956131214212948964663592222720000000000000000000000*t^2 - 1711128415671627544499613263533743259586471744358919352006635848710185402271103484508485537049617474969040217077067057639773/27862978362640572091887157080070458682100014391676842442985519357134093217574292561835227234956131214212948964663592222720000000000000000000000
-------------------------------------------------
Computing nodes and weights
  current precision for roots: 53
  current precision for roots: 106
  current precision for roots: 212
 current precision for weights: 53
Linear system for weights solvable: 0
  current precision for roots: 106
  current precision for roots: 212
  current precision for roots: 424
 current precision for weights: 106
Linear system for weights solvable: 0
  current precision for roots: 212
  current precision for roots: 424
 current precision for weights: 212
Linear system for weights solvable: 0
  current precision for roots: 424
  current precision for roots: 848
 current precision for weights: 424
Linear system for weights solvable: 1
  current precision for roots: 848
  current precision for roots: 1696
 current precision for weights: 848
Linear system for weights solvable: 1
Sufficient bits for target precision reached
-------------------------------------------------
The nodes are:
| (0.99977808587528795695 - 4.0117696127452452578e-1859j)  +/-  (2.92e-477, 2.92e-477j)
| (-0.99296234890617436407 + 1.7581124873640254259e-1883j)  +/-  (1.25e-476, 1.25e-476j)
| (-0.9377008899136639499 - 1.975210431243779804e-1896j)  +/-  (9.07e-478, 9.07e-478j)
| (0.99639659167086041518 + 4.452609891751042717e-1895j)  +/-  (1.1e-476, 1.1e-476j)
| (0.9377008899136639499 + 7.958324154556513348e-1914j)  +/-  (8.68e-478, 8.68e-478j)
| (0.94889236344608979562 - 1.5531975452522160777e-1935j)  +/-  (1.77e-477, 1.77e-477j)
| (-0.99639659167086041518 + 2.8716755888198858758e-1943j)  +/-  (1.17e-476, 1.17e-476j)
| (-0.92543379880675395098 + 5.4170580019936724144e-1958j)  +/-  (4.3e-478, 4.3e-478j)
| (0.99866304213381798113 - 1.4458460612080982516e-1953j)  +/-  (8.24e-477, 8.24e-477j)
| (0.95900027025605600738 + 3.1183120832175842925e-1975j)  +/-  (2.96e-477, 2.96e-477j)
| (0.86597539486685806292 + 9.8956015549612114275e-1992j)  +/-  (9.83e-480, 9.83e-480j)
| (0.8977527115339419657 + 5.5621559898500612018e-1989j)  +/-  (7.27e-479, 7.27e-479j)
| (-0.8977527115339419657 + 6.4685466089163289871e-1993j)  +/-  (7.58e-479, 7.58e-479j)
| (-0.88236939914498384344 + 7.7258828267854753262e-1993j)  +/-  (2.81e-479, 2.81e-479j)
| (0.99296234890617436407 - 3.5424489189652184909e-1987j)  +/-  (1.25e-476, 1.25e-476j)
| (0.88236939914498384344 - 2.5800154033552581966e-2002j)  +/-  (2.69e-479, 2.69e-479j)
| (0.84859354079356444389 - 1.6995600332349107583e-2003j)  +/-  (3.06e-480, 3.06e-480j)
| (-0.96802139185399194274 - 9.0133510470474913801e-2001j)  +/-  (5.38e-477, 5.38e-477j)
| (-0.79073005707527425519 + 1.4328656731015775388e-2006j)  +/-  (5.2e-482, 5.2e-482j)
| (0.92543379880675395098 - 5.0481130707883091657e-2001j)  +/-  (4.31e-478, 4.31e-478j)
| (0.91211131805188657936 + 9.5214311963758567107e-2002j)  +/-  (1.78e-478, 1.78e-478j)
| (0.81095264056057379757 - 4.3294306736217972889e-2005j)  +/-  (2.19e-481, 2.19e-481j)
| (-0.84859354079356444389 + 1.3789530497378729771e-2004j)  +/-  (2.91e-480, 2.91e-480j)
| (-0.83024683706606605303 - 3.6524792452721818276e-2005j)  +/-  (8.51e-481, 8.51e-481j)
| (-0.76960535052312200406 - 3.8917658292471029079e-2007j)  +/-  (1.27e-482, 1.27e-482j)
| (-0.97593954733487980715 - 1.3811183394508461022e-2000j)  +/-  (7.48e-477, 7.48e-477j)
| (0.747605359615666054 - 8.3248381915364146011e-2007j)  +/-  (2.45e-483, 2.45e-483j)
| (0.98273366980416686348 + 4.8954361239082949929e-1999j)  +/-  (9.85e-477, 9.85e-477j)
| (-0.99977808587528795695 - 2.4572645811402379687e-2006j)  +/-  (2.83e-477, 2.83e-477j)
| (-0.62533963177076082317 - 1.2276778649800758412e-2019j)  +/-  (2.44e-487, 2.44e-487j)
| (0.00075048505359012030993 - 6.6420171453860586541e-2044j)  +/-  (8.76e-512, 8.76e-512j)
| (0.83024683706606605303 + 9.1737442835478485397e-2014j)  +/-  (8.41e-481, 8.41e-481j)
| (0.67658686628046857775 + 1.4502558986550571007e-2018j)  +/-  (1.31e-485, 1.31e-485j)
| (-0.98273366980416686348 + 6.6348215681792887728e-2007j)  +/-  (9.54e-477, 9.54e-477j)
| (-0.70106951202040569751 - 2.9888332383714604754e-2019j)  +/-  (7.8e-485, 7.8e-485j)
| (-0.72475226474903740042 - 9.1469998933809283067e-2020j)  +/-  (4.77e-484, 4.77e-484j)
| (-0.91211131805188657936 - 2.3790140243497494595e-2011j)  +/-  (1.8e-478, 1.8e-478j)
| (0.62533963177076082317 - 1.8992888870534171163e-2022j)  +/-  (2.45e-487, 2.45e-487j)
| (-0.747605359615666054 - 5.1619949236428701491e-2018j)  +/-  (2.4e-483, 2.4e-483j)
| (0.96802139185399194274 - 4.5894191562787161838e-2010j)  +/-  (4.83e-477, 4.83e-477j)
| (-0.57123388186653430896 + 7.7314426274686317536e-2040j)  +/-  (3.61e-489, 3.61e-489j)
| (-0.81095264056057379757 + 2.6430623405655226505e-2030j)  +/-  (2.16e-481, 2.16e-481j)
| (0.70106951202040569751 - 1.795503622487024949e-2035j)  +/-  (8.29e-485, 8.29e-485j)
| (0.65133484620199771511 + 5.6428411491053019518e-2037j)  +/-  (1.87e-486, 1.87e-486j)
| (-0.99866304213381798113 + 3.9137909936006873799e-2024j)  +/-  (7.76e-477, 7.76e-477j)
| (-0.59862828971271515318 + 2.2367576561897685305e-2038j)  +/-  (3.02e-488, 3.02e-488j)
| (0.76960535052312200406 - 1.0230700933189053613e-2033j)  +/-  (1.23e-482, 1.23e-482j)
| (0.79073005707527425519 - 1.1952809339253814339e-2032j)  +/-  (5.64e-482, 5.64e-482j)
| (0.51452704204363947516 - 7.5864944921608763561e-2042j)  +/-  (3.46e-491, 3.46e-491j)
| (0.54319033026180263527 + 4.1021071963959111268e-2041j)  +/-  (3.6e-490, 3.6e-490j)
| (-0.86597539486685806292 + 2.0740026574203061361e-2029j)  +/-  (9.03e-480, 9.03e-480j)
| (-0.51452704204363947516 + 5.3189790132944802078e-2042j)  +/-  (3.55e-491, 3.55e-491j)
| (-0.95900027025605600738 + 4.1861395033394968877e-2025j)  +/-  (3.18e-477, 3.18e-477j)
| (0.39433468542278858589 - 4.6570159866735014105e-2047j)  +/-  (1.4e-495, 1.4e-495j)
| (0.59862828971271515318 + 1.8375595963488523737e-2039j)  +/-  (2.97e-488, 2.97e-488j)
| (-0.23425292220626976863 - 6.2362265409736644417e-2053j)  +/-  (1.12e-501, 1.12e-501j)
| (-0.45546699447459049041 + 3.5856897766658998117e-2044j)  +/-  (2.41e-493, 2.41e-493j)
| (-0.98840346164176389886 - 1.8720189050794837213e-2026j)  +/-  (1.24e-476, 1.24e-476j)
| (0.97593954733487980715 - 5.1043891943825512305e-2028j)  +/-  (7.07e-477, 7.07e-477j)
| (0.42514331328282839732 + 4.903214392245942645e-2068j)  +/-  (2.04e-494, 2.04e-494j)
| (0.72475226474903740042 + 9.6707665725622970474e-2057j)  +/-  (4.8e-484, 4.8e-484j)
| (-0.65133484620199771511 + 3.3514052742345898442e-2060j)  +/-  (1.88e-486, 1.88e-486j)
| (-0.42514331328282839732 - 3.4580543221952157336e-2068j)  +/-  (1.93e-494, 1.93e-494j)
| (0.067497474171624609272 - 2.4192334587253740975e-2081j)  +/-  (2.26e-508, 2.26e-508j)
| (0.45546699447459049041 - 2.8508959776499120385e-2066j)  +/-  (2.44e-493, 2.44e-493j)
| (0.48527391838816466277 + 6.8058452607164664006e-2066j)  +/-  (3.12e-492, 3.12e-492j)
| (-0.54319033026180263527 + 5.1043778095771727449e-2064j)  +/-  (3.66e-490, 3.66e-490j)
| (-0.36307287702099571012 - 2.7537946042468506405e-2072j)  +/-  (9.12e-497, 9.12e-497j)
| (-0.48527391838816466277 + 2.1857985072568374835e-2066j)  +/-  (3.22e-492, 3.22e-492j)
| (0.57123388186653430896 - 4.153895106565824223e-2062j)  +/-  (3.39e-489, 3.39e-489j)
| (0.36307287702099571012 + 2.0174551224931989199e-2070j)  +/-  (9.8e-497, 9.8e-497j)
| (0.98840346164176389886 + 2.3571501579398357815e-2059j)  +/-  (1.27e-476, 1.27e-476j)
| (-0.39433468542278858589 + 3.9950609020861106994e-2107j)  +/-  (1.37e-495, 1.37e-495j)
| (-0.33139656249380076399 + 8.3435557703748812634e-2110j)  +/-  (6.11e-498, 6.11e-498j)
| (-0.00075048505359012030993 - 2.5513198439713418117e-2123j)  +/-  (8.76e-512, 8.76e-512j)
| (0.29934582270187001548 - 1.3195684449652340309e-2111j)  +/-  (3.46e-499, 3.46e-499j)
| (0.33139656249380076399 - 3.3287344026988810227e-2110j)  +/-  (6.26e-498, 6.26e-498j)
| (-0.94889236344608979562 - 4.8122942718784920322e-2108j)  +/-  (1.81e-477, 1.81e-477j)
| (-0.29934582270187001548 + 1.4083981486717690651e-2131j)  +/-  (3.73e-499, 3.73e-499j)
| (-0.13470791477571624363 - 7.1356345311813930391e-2139j)  +/-  (1.42e-505, 1.42e-505j)
| (0.16809117946710352861 - 8.5976026075237715661e-2137j)  +/-  (2.81e-504, 2.81e-504j)
| (0.26695389972009350677 + 4.3797900664039866162e-2133j)  +/-  (2.03e-500, 2.03e-500j)
| (0.03377219001605204152 + 2.7561103129822560591e-2141j)  +/-  (9.75e-510, 9.75e-510j)
| (-0.16809117946710352861 - 6.9290102488973565104e-2137j)  +/-  (2.6e-504, 2.6e-504j)
| (-0.20128400160086191138 - 9.7110173148794429436e-2135j)  +/-  (6.19e-503, 6.19e-503j)
| (-0.67658686628046857775 + 5.2138045329320772186e-2131j)  +/-  (1.32e-485, 1.32e-485j)
| (0.23425292220626976863 + 3.954666710656222957e-2146j)  +/-  (1.2e-501, 1.2e-501j)
| (0.13470791477571624363 - 1.0751337462870060035e-2149j)  +/-  (1.26e-505, 1.26e-505j)
| (-0.03377219001605204152 + 3.768164882250549311e-2153j)  +/-  (9.75e-510, 9.75e-510j)
| (-0.26695389972009350677 - 1.6842042834251055648e-2145j)  +/-  (2e-500, 2e-500j)
| (-0.067497474171624609272 + 5.1727792420537367931e-2152j)  +/-  (2.58e-508, 2.58e-508j)
| (0.10116247530558423952 + 8.9302849624854659842e-2151j)  +/-  (5.21e-507, 5.21e-507j)
| (0.20128400160086191138 - 1.048208157250252084e-2146j)  +/-  (5.15e-503, 5.15e-503j)
| (-0.10116247530558423952 + 1.4695524400155096434e-2152j)  +/-  (5.3e-507, 5.3e-507j)
-------------------------------------------------
The weights are:
| (0.00059777639539780594728 + 4.2641558234956197279e-1859j)  +/-  (1.42e-119, 2.11e-348j)
| (0.0040025686036661201255 + 8.0418203811098751061e-1862j)  +/-  (2.56e-120, 3.83e-349j)
| (0.01173185172572989752 - 2.590030250286049226e-1861j)  +/-  (2.58e-120, 3.85e-349j)
| (0.0028573441568729649566 + 3.4014279005180386301e-1859j)  +/-  (5.64e-120, 8.41e-349j)
| (0.01173185172572989752 + 8.0836917306780647516e-1860j)  +/-  (5.03e-121, 7.51e-350j)
| (0.010649926294169864133 - 8.8549651910602808069e-1860j)  +/-  (4.04e-121, 6.03e-350j)
| (0.0028573441568729649566 - 5.7619750725016312845e-1862j)  +/-  (4.81e-123, 7.18e-352j)
| (0.012798640936975529762 + 2.8794408919346158421e-1861j)  +/-  (1.06e-122, 1.58e-351j)
| (0.0016746124477369368616 - 6.3237713685495927082e-1859j)  +/-  (2.25e-120, 3.36e-349j)
| (0.0095657741457838796768 + 9.8110848795486101923e-1860j)  +/-  (1.68e-121, 2.51e-350j)
| (0.016892165699543102531 - 5.8453143545420741788e-1860j)  +/-  (1.29e-123, 1.93e-352j)
| (0.014872601648044516715 - 6.5156098494090773466e-1860j)  +/-  (2.54e-123, 3.8e-352j)
| (0.014872601648044516715 + 3.5032766522458583031e-1861j)  +/-  (1.03e-125, 1.54e-354j)
| (0.015891826529437793503 - 3.8380384701654173492e-1861j)  +/-  (4.03e-126, 6.02e-355j)
| (0.0040025686036661201255 - 2.351214654454520559e-1859j)  +/-  (3.13e-122, 4.67e-351j)
| (0.015891826529437793503 + 6.1526575717743578277e-1860j)  +/-  (1.04e-123, 1.56e-352j)
| (0.017867577298623887214 + 5.5859642013387806308e-1860j)  +/-  (4.9e-125, 7.31e-354j)
| (0.0084736182528135143175 + 1.7813071602631983597e-1861j)  +/-  (1.73e-128, 2.58e-357j)
| (0.020678413840231769615 + 5.8567253973798735001e-1861j)  +/-  (2.78e-130, 4.15e-359j)
| (0.012798640936975529762 - 7.4565700270710718932e-1860j)  +/-  (1.15e-123, 1.72e-352j)
| (0.013842960500650169057 + 6.9436166796787053696e-1860j)  +/-  (8.39e-124, 1.25e-352j)
| (0.019762217373382185807 + 5.1762978698216872486e-1860j)  +/-  (1.51e-127, 2.25e-356j)
| (0.017867577298623887214 - 4.5689483891514862982e-1861j)  +/-  (7.82e-130, 1.17e-358j)
| (0.018823116083988723222 + 4.9703150622697385363e-1861j)  +/-  (3.6e-130, 5.37e-359j)
| (0.021566404491100441842 - 6.3522459980099239391e-1861j)  +/-  (1.95e-131, 2.91e-360j)
| (0.0073585850483248998728 - 1.5306860296576160232e-1861j)  +/-  (5.09e-131, 7.6e-360j)
| (0.022430023191381130396 - 4.7729072661328270297e-1860j)  +/-  (4.91e-132, 7.33e-361j)
| (0.006229699668583481974 - 1.4966299935422444227e-1859j)  +/-  (5.41e-128, 8.07e-357j)
| (0.00059777639539780594728 - 1.1993367388993001216e-1862j)  +/-  (3.78e-132, 5.65e-361j)
| (0.026358288627019585488 - 1.0402938432329749474e-1860j)  +/-  (1.68e-135, 2.51e-364j)
| (0.016906469584478685283 + 9.0442590032015248663e-1858j)  +/-  (9.07e-138, 1.35e-366j)
| (0.018823116083988723222 - 5.3652648126601010778e-1860j)  +/-  (3.93e-129, 5.86e-358j)
| (0.024872050953232643183 + 4.5621344471108128183e-1860j)  +/-  (3.18e-134, 4.75e-363j)
| (0.006229699668583481974 + 1.2867103683685685664e-1861j)  +/-  (7.85e-132, 1.17e-360j)
| (0.024088033987050860228 + 8.1010111472013143569e-1861j)  +/-  (2.66e-135, 3.96e-364j)
| (0.023272377632176010306 - 7.4682686127100146053e-1861j)  +/-  (5.81e-135, 8.68e-364j)
| (0.013842960500650169057 - 3.1838893508260536384e-1861j)  +/-  (5.79e-133, 8.65e-362j)
| (0.026358288627019585488 + 4.5150276037729442705e-1860j)  +/-  (3.72e-138, 5.56e-367j)
| (0.022430023191381130396 + 6.887996109788626305e-1861j)  +/-  (1.15e-134, 1.72e-363j)
| (0.0084736182528135143175 - 1.1037847004133134749e-1859j)  +/-  (4.24e-132, 6.32e-361j)
| (0.027724270343435105554 - 1.2390997526090798171e-1860j)  +/-  (2.57e-139, 3.84e-368j)
| (0.019762217373382185807 - 5.3979133179817262416e-1861j)  +/-  (3.28e-134, 4.89e-363j)
| (0.024088033987050860228 - 4.6127184005563448607e-1860j)  +/-  (3.65e-137, 5.45e-366j)
| (0.025627750701977259763 - 4.529842984305264765e-1860j)  +/-  (4.8e-138, 7.17e-367j)
| (0.0016746124477369368616 + 3.5283909984443224161e-1862j)  +/-  (5.16e-135, 7.7e-364j)
| (0.02705876365494641294 + 1.134062802086625833e-1860j)  +/-  (3.47e-139, 5.17e-368j)
| (0.021566404491100441842 + 4.8830973988340712797e-1860j)  +/-  (2.09e-136, 3.12e-365j)
| (0.020678413840231769615 - 5.0163182954793513435e-1860j)  +/-  (6.32e-136, 9.43e-365j)
| (0.02896367837225095093 + 4.652845487735825851e-1860j)  +/-  (1.33e-143, 1.99e-372j)
| (0.028358049920753713767 - 4.5867427645240728674e-1860j)  +/-  (6.3e-143, 9.4e-372j)
| (0.016892165699543102531 + 4.191972832964124409e-1861j)  +/-  (4.68e-138, 6.99e-367j)
| (0.02896367837225095093 - 1.4909796500616899697e-1860j)  +/-  (2.32e-145, 3.46e-374j)
| (0.0095657741457838796768 - 2.0424700374626822563e-1861j)  +/-  (9.91e-139, 1.48e-367j)
| (0.031041029120161307521 + 5.2147942779630553619e-1860j)  +/-  (1.8e-147, 2.69e-376j)
| (0.02705876365494641294 - 4.518743946806926995e-1860j)  +/-  (5.09e-143, 7.6e-372j)
| (0.032842574925716194625 + 4.5557674972769492756e-1860j)  +/-  (6.41e-150, 9.57e-379j)
| (0.030071080773649452053 - 1.8196823553063844146e-1860j)  +/-  (2.15e-147, 3.21e-376j)
| (0.0051130520477363463393 - 1.0435890529794600297e-1861j)  +/-  (1.02e-138, 1.53e-367j)
| (0.0073585850483248998728 + 1.268619456086520274e-1859j)  +/-  (2.3e-139, 3.44e-368j)
| (0.030571099852774451789 - 5.019864417933864793e-1860j)  +/-  (2.06e-147, 3.07e-376j)
| (0.023272377632176010306 + 4.682926074538006806e-1860j)  +/-  (2.03e-141, 3.02e-370j)
| (0.025627750701977259763 + 9.5595712079903321196e-1861j)  +/-  (1.75e-144, 2.61e-373j)
| (0.030571099852774451789 + 2.0243843975876156298e-1860j)  +/-  (5.27e-149, 7.87e-378j)
| (0.033705708754773867104 + 2.1483690524557337502e-1859j)  +/-  (4.14e-152, 6.17e-381j)
| (0.030071080773649452053 + 4.8650189885799969225e-1860j)  +/-  (2.88e-147, 4.3e-376j)
| (0.029536443600296631409 - 4.7441288711709900571e-1860j)  +/-  (1.08e-146, 1.61e-375j)
| (0.028358049920753713767 + 1.3572867484050744109e-1860j)  +/-  (1.77e-147, 2.65e-376j)
| (0.031476017257084466064 + 2.5509532598716204365e-1860j)  +/-  (7.26e-152, 1.08e-380j)
| (0.029536443600296631409 + 1.6436286866089020505e-1860j)  +/-  (7.6e-149, 1.13e-377j)
| (0.027724270343435105554 + 4.5424498158305103225e-1860j)  +/-  (3.9e-147, 5.82e-376j)
| (0.031476017257084466064 - 5.4602491988015953128e-1860j)  +/-  (7.19e-152, 1.07e-380j)
| (0.0051130520477363463393 + 1.8240993774628933307e-1859j)  +/-  (1.01e-144, 1.51e-373j)
| (0.031041029120161307521 - 2.2647111806962502637e-1860j)  +/-  (1.52e-151, 2.27e-380j)
| (0.031869733730268432664 - 2.8975770643175741112e-1860j)  +/-  (2.94e-153, 4.38e-382j)
| (0.016906469584478685283 - 9.0306910124416025986e-1858j)  +/-  (5.16e-155, 7.7e-384j)
| (0.032226332314054970881 - 6.1659010483691339806e-1860j)  +/-  (5.24e-155, 7.82e-384j)
| (0.031869733730268432664 + 5.7709272246201040816e-1860j)  +/-  (4.99e-154, 7.45e-383j)
| (0.010649926294169864133 + 2.3123011948450443038e-1861j)  +/-  (6.95e-150, 1.04e-378j)
| (0.032226332314054970881 + 3.3243911510662799565e-1860j)  +/-  (2e-155, 2.99e-384j)
| (0.033469694869619198646 - 8.7841369111614571299e-1860j)  +/-  (3.4e-158, 5.08e-387j)
| (0.033292560607450998649 - 9.5548145693377700238e-1860j)  +/-  (2.07e-158, 3.09e-387j)
| (0.032552400678530441112 + 6.6740054399661174983e-1860j)  +/-  (6.79e-157, 1.01e-385j)
| (0.033733109000676395768 - 4.1536694745763875084e-1859j)  +/-  (5.78e-158, 8.63e-387j)
| (0.033292560607450998649 + 6.8043696381945805503e-1860j)  +/-  (9.07e-159, 1.35e-387j)
| (0.033087608823971117638 - 5.4894680822594602883e-1860j)  +/-  (1.41e-158, 2.1e-387j)
| (0.024872050953232643183 - 8.795470186973256446e-1861j)  +/-  (6.23e-156, 9.3e-385j)
| (0.032842574925716194625 - 7.3439236540636751176e-1860j)  +/-  (4.2e-159, 6.27e-388j)
| (0.033469694869619198646 + 1.1519852014834268836e-1859j)  +/-  (7.17e-160, 1.07e-388j)
| (0.033733109000676395768 + 3.882219661187693349e-1859j)  +/-  (6.4e-160, 9.54e-389j)
| (0.032552400678530441112 - 3.8610161111860873271e-1860j)  +/-  (8.94e-160, 1.33e-388j)
| (0.033705708754773867104 - 1.8766313868375412591e-1859j)  +/-  (1.17e-160, 1.75e-389j)
| (0.033614115533475885242 - 1.4823139731887301065e-1859j)  +/-  (5.88e-161, 8.82e-390j)
| (0.033087608823971117638 + 8.2570329872929899417e-1860j)  +/-  (2.98e-161, 4.48e-390j)
| (0.033614115533475885242 + 1.2099022627018612052e-1859j)  +/-  (5.27e-161, 7.83e-390j)
