Starting with polynomial:
P : 50803160635786570329644235/4398046511104*t^47 - 590518458572960027165004495/4398046511104*t^45 + 3212160846083683664249200275/4398046511104*t^43 - 10863600164844817785831564975/4398046511104*t^41 + 25598138319461926966614607125/4398046511104*t^39 - 44631107046403030311203350305/4398046511104*t^37 + 59687384122298028488476769685/4398046511104*t^35 - 62634909264139906438525005225/4398046511104*t^33 + 26163949439450846993307913575/2199023255552*t^31 - 17555896810021131099405742875/2199023255552*t^29 + 9503592139824772301811642143/2199023255552*t^27 - 4154123089761513173021029131/2199023255552*t^25 + 1462719397803349708810221525/2199023255552*t^23 - 412561881431714020433652225/2199023255552*t^21 + 92364600320532989649325125/2199023255552*t^19 - 16199329902370401261573945/2199023255552*t^17 + 4371247751433282880107255/4398046511104*t^15 - 442604642141267794032075/4398046511104*t^13 + 32507685580997069618175/4398046511104*t^11 - 1650898159699758844875/4398046511104*t^9 + 54029394317446653105/4398046511104*t^7 - 1019422534291446285/4398046511104*t^5 + 9085762337713425/4398046511104*t^3 - 24185702762325/4398046511104*t
Extension levels are: 47 48
-------------------------------------------------
Trying to find an order 48 Kronrod extension for:
P1 : 50803160635786570329644235/4398046511104*t^47 - 590518458572960027165004495/4398046511104*t^45 + 3212160846083683664249200275/4398046511104*t^43 - 10863600164844817785831564975/4398046511104*t^41 + 25598138319461926966614607125/4398046511104*t^39 - 44631107046403030311203350305/4398046511104*t^37 + 59687384122298028488476769685/4398046511104*t^35 - 62634909264139906438525005225/4398046511104*t^33 + 26163949439450846993307913575/2199023255552*t^31 - 17555896810021131099405742875/2199023255552*t^29 + 9503592139824772301811642143/2199023255552*t^27 - 4154123089761513173021029131/2199023255552*t^25 + 1462719397803349708810221525/2199023255552*t^23 - 412561881431714020433652225/2199023255552*t^21 + 92364600320532989649325125/2199023255552*t^19 - 16199329902370401261573945/2199023255552*t^17 + 4371247751433282880107255/4398046511104*t^15 - 442604642141267794032075/4398046511104*t^13 + 32507685580997069618175/4398046511104*t^11 - 1650898159699758844875/4398046511104*t^9 + 54029394317446653105/4398046511104*t^7 - 1019422534291446285/4398046511104*t^5 + 9085762337713425/4398046511104*t^3 - 24185702762325/4398046511104*t
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : 50803160635786570329644235/4398046511104*t^95 - 117024807389262129342667056375/426610511577088*t^93 + 1435793725543091013822310637305725/455193415852752896*t^91 - 9485476672435836440199066918018656775/405411808646310920192*t^89 + 61676064353061453876931458466491098540081325/490106795002420380840230912*t^87 - 2260438844277582373036052110544750936272823955/4321850828657706994682036224*t^85 + 958305197751469929466428969957712996538997553293864525/548191161242551164112073120353878016*t^83 - 2543972989803426147071198020152836774607985884427750750175/526911377074317587105177191045595660288*t^81 + 264829395711312990287414170599315998575840385307842751571527986775/23568591511500742896161553938552517525153775616*t^79 - 53041728054717395997732463038820754967494774545941774855349017382645325/2371988044301229448306136914978898963992205817020416*t^77 + 73926667328717856603698628169155903719863178662664855908316494631364507527257/1920961633641483572399069899006406262685979857531434958848*t^75 - 326265995496073146918112150312961012604127081849321803651264682773861642996725/5646462983734057773415447884958224469107274126683308818432*t^73 + 16868654584779163721084922345476612082324588341828355607839310630587888071267590587258875/221308054768431829341980403877787627452128013266423215479269089083392*t^71 - 520081988679450672749858402847966948252686131136918167201067568149440605230725049163640175/5854603994328514758046936138948745417142659260048105064042482265751552*t^69 + 9404914434244709171552519974561024907968650532181757993554167760299516066435515902334394602153025/102363170588975850869738299669812776050241385888180006077254366514706647089152*t^67 - 188191840576716483106186558909745229102527434122200813818163486582366428565226643856545614839783755/2223618585942785833638195392162207909011562877043236185230290529367141954617344*t^65 + 162268818926288761520174493920171007549808102937744345288615769665855500853094742422736820125188378572172241225/2330539350144630737562586236816731574261834741005690913891537957562590643728430999642570752*t^63 - 457644223606454875661756380671568615083183872834755610833548454837045514837432197754243946220635952171573735375/8926243920526404780875617257816884661383023603980474565511115538102447727264725160247164928*t^61 + 56154545421718328167389777344779382806831799485839838658422950944771162008622622532024243963151901597231907048340180946877225/1659265716987577078754090809534683018587389078184818794661624734088604735738091756605749878463163157970944*t^59 - 8073529207224842333218764179138157316586851346774465384062608518644434165726956543719327252502976725511529141895960925377825/402707525974466163400700938761128238873169492703738339655156628540270206922255797474790003863870291050496*t^57 + 4338647241864091326069049121962852229579940376268499613746527902143450747321872266412475607952968596087324698269775279676408572795875/406833919246275961735234088284895443687898775639026777655551207599291072158107361400427322303738590214111482609664*t^55 - 82702836917595234607188280369614472874293142306819003226147764203205857585966813331237615928924085578751724863573794240670541231620752104975/16232518152293767544125712597342916229858328592437045065239600424264596122323952122004704924149014404919127371953546985472*t^53 + 173635742611621322648603137095966317991907259434046122578956414406163011492203750802532872709450407085425405470695114822343231584446171643694567575/79447284335797803010473254810840757848366283521493810337109068304890516474777666265339165446705321523413427751246031663858188288*t^51 - 9233503532931396360347633130808019831464091299043036506834553252910903915062127766093309917399376199677944345977754087123892995988450612069865373925/10975762705663702543174168747958273182748542017408796403844855830363511048742769106172159250652410934098236882361535101682711527424*t^49 + 35814499578761905005533682501322251120148310983955542594469289406456104624076962812759331860746358387872283574090423944249862992165628956395227768392340105325/123386446924391147203103764256407942230443471642450286141772428972483315815009300389091300843844410988331011133318643087251037930159270264832*t^47 - 3959621662138958353405582898753722152468363772230183392968179325738541709563099254397867195256717615751917499871093014520255693681828195230741388532633470651/44172576280979994419612540950258902537633324260525680607646558753331214819989453515798643317824039826534783819236183972956662052702717476864*t^45 + 11034512256721902085764574940016888382517814977732696834630569058560827601580845888793591532498521491710830708857886977486011246539966106205643277345519625/446187639201818125450631726770291944824579032934602834420672310639709240605954075917158013311353937641765493123597817908653152047502196736*t^43 - 63098879704996755470342525817205117103452826552361559345563840584612595876255015344406430470286789325798579175742827995800235659902367220186055614757295/10376456725623677336061202948146324298246024021734949637690053735807191641998931998073442170031486921901523095897623672294259349941911552*t^41 + 1008932135402304139990399118340002090865531976689715463662324327912079348964062863079234027843614216105724652177111761717289305615633299628303151421745/759252931143195902638624605961926168164343221102557290562686858717599388438946243761471378294986847944013885065679780899579952434774016*t^39 - 2830160265792808541606094791959792092120607836501672695229927567398894178134445945107809540408608277451677639191127022929452215502408053263759096865/11003665668741969603458327622636611132816568421776192616850534184313034615057191938572048960796910839768317174864924360863477571518464*t^37 + 300399116043104210530069202225919903013093043878804892296104556685742931166843854041626388707071967817512392122991729475922204628147155945909638827/6840116496785548672420041495152488001480569559482498113177359087545940436386903096950192597252133765261386351943061089185404976889856*t^35 - 135119209204441237677161577090157350261621332587238320308560317824851025342631149940493530784964651749797879514823376728387981536173254604796547245/20520349490356646017260124485457464004441708678447494339532077262637821309160709290850577791756401295784159055829183267556214930669568*t^33 + 1072255883088101572723618074826672252105548361476053636045486847664926675456218827458201380084554567926394538423728219367769631470917980139330995/1243657544870099758621825726391361454814649010814999656941338015917443715706709653990944108591297048229342973080556561670073632161792*t^31 - 4020514141338847209353272650503681371159784835750726450213604732825924372183413573465507124019902592059211669860449092630427491996911339239665215/41040698980713292034520248970914928008883417356894988679064154525275642618321418581701155583512802591568318111658366535112429861339136*t^29 + 10623913671486225727291897977777305316572332341290905532001403119283105701670631549324927981028658592493506039824528877984114611973198964960352165/1108098872479258884932046722214703056239852268636164694334732172182442350694678301705931200754845669972344589014775896448035606256156672*t^27 - 361678896958742433183345207802734038273091779748717624281809004046107433868296269621741872502005368945791567733103654329926902584864346639487041/451447688787846212379722738680064208097717590925844875469705699778032068801535604398712711418640828507251499228242031886236728474730496*t^25 + 25539465622178811794712220410166465259946767848467993852610118704865390562766786160397142801707676233425789243528785584108153778754212955813125/451447688787846212379722738680064208097717590925844875469705699778032068801535604398712711418640828507251499228242031886236728474730496*t^23 - 410537727206220009747962554918986915829967908752536511403720652670069943132584556174262147737112247812064326125983854393848023409774014787025/123122096942139876103560746912744784026650252070684966037192463575826927854964255745103466750538407774704954334975099605337289584017408*t^21 + 6633069630141751187631227713999365758873203037519631217956546228265673453318174419646965353500111242767283376078192412307989255134186520475/41040698980713292034520248970914928008883417356894988679064154525275642618321418581701155583512802591568318111658366535112429861339136*t^19 - 259644978564999362208156376084495368678930705582299938124228526919922204126056191389818579537563104863472082666872520181990429422974910175/41040698980713292034520248970914928008883417356894988679064154525275642618321418581701155583512802591568318111658366535112429861339136*t^17 + 24073503875587119771881632724199444721246270992106613129176396403016823855963746972089588272340766420731569257871362002336948948924846375/123122096942139876103560746912744784026650252070684966037192463575826927854964255745103466750538407774704954334975099605337289584017408*t^15 - 190261813167674919008000712853923413769461466898823085911609480923220271055310555116430085246788883521780284753545838184202000232066625/41040698980713292034520248970914928008883417356894988679064154525275642618321418581701155583512802591568318111658366535112429861339136*t^13 + 3333058812352971865696943744003504884075451220694866933316300262641937065412494850672232874764469232373936714900956039057727515386625/41040698980713292034520248970914928008883417356894988679064154525275642618321418581701155583512802591568318111658366535112429861339136*t^11 - 771317976879486792491870741921576264087453419799897720797096438019444511501171890657789010517986582754565084073768323157102190033625/772311335364331950104153776089035463439897035716114786960570907884732547453866695128376291435195466950421986283025624797115725572472832*t^9 + 59536263616779055600641526804461425709562486048347437956093868277416410376040046786931886769013263979777484211884805422222550625/7432567531940202494440675010480656253577311804792005823767524047884565198593642735268713215911767398473002492662538821319573911896064*t^7 - 35281291148010093894682977218888099549346305323075278292828881445343471101643171881243354100365773620554293051949980788071886315/943936076556405716793965726331043344204318599208584739618475554081339780221392627379126578420794459606071316568142430307585886810800128*t^5 + 2582429131309338631451176553003756418291946965635271016194081823724202028582736283666147572046090032564314075652948558821883275/31149890526361388654200868968924430358742513773883296407409693284684212747305956703511177087886217167000353446748700200150334264756404224*t^3 - 572294133092917689052659362309495978954924118498359964835854510916110486068816681191131617023431769640656089882874767181925/10383296842120462884733622989641476786247504591294432135803231094894737582435318901170392362628739055666784482249566733383444754918801408*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 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:
| (0.99978736333537280518 - 3.9478886332375469981e-1811j)  +/-  (1.83e-476, 1.83e-476j)
| (-0.94026996183611670263 + 5.2161667194210669459e-1837j)  +/-  (6.61e-477, 6.61e-477j)
| (-0.9285026930123606482 - 1.2069151246810344398e-1839j)  +/-  (2.94e-477, 2.94e-477j)
| (0.99654654372457549586 - 6.2151992256930275817e-1846j)  +/-  (7.57e-476, 7.57e-476j)
| (0.9285026930123606482 - 1.3639683281356791769e-1861j)  +/-  (2.98e-477, 2.98e-477j)
| (0.94026996183611670263 - 3.1905808120859920464e-1872j)  +/-  (6.1e-477, 6.1e-477j)
| (0.99325521098776863469 + 2.1886277105483108645e-1897j)  +/-  (7.72e-476, 7.72e-476j)
| (-0.88717536721268257481 - 1.8255154344685261556e-1926j)  +/-  (2.04e-478, 2.04e-478j)
| (0.99871872858421210918 - 2.72658546187080483e-1924j)  +/-  (5.26e-476, 5.26e-476j)
| (0.96934678732656449715 - 1.6629045589321839338e-1933j)  +/-  (3.35e-476, 3.35e-476j)
| (0.85474402331765646346 + 6.7726128004908878475e-1944j)  +/-  (2.12e-479, 2.12e-479j)
| (0.96069721783614626601 - 1.1040490395658502193e-1937j)  +/-  (2.23e-476, 2.23e-476j)
| (-0.90194132943852535687 + 5.7747081128247846022e-1945j)  +/-  (5.36e-478, 5.36e-478j)
| (-0.87143601579689631694 + 1.3713999969970300883e-1945j)  +/-  (6.91e-479, 6.91e-479j)
| (-0.99325521098776863469 - 1.3640748558807763227e-1943j)  +/-  (7.99e-476, 7.99e-476j)
| (0.87143601579689631694 + 4.391140218041887756e-1948j)  +/-  (7.11e-479, 7.11e-479j)
| (0.91572066787615558927 - 2.7998575932096123353e-1945j)  +/-  (1.32e-477, 1.32e-477j)
| (-0.95100396925770844259 + 1.6069267505812989531e-1945j)  +/-  (1.2e-476, 1.2e-476j)
| (-0.77883311442837052294 + 2.7848734202419456563e-1951j)  +/-  (9.44e-482, 9.44e-482j)
| (-0.99871872858421210918 + 1.0606479181291296648e-1943j)  +/-  (4.9e-476, 4.9e-476j)
| (0.90194132943852535687 + 1.0703537233029609064e-1947j)  +/-  (5.31e-478, 5.31e-478j)
| (0.77883311442837052294 - 5.4106883783822920473e-1952j)  +/-  (9.26e-482, 9.26e-482j)
| (-0.99654654372457549586 + 1.1755245267469822175e-1945j)  +/-  (7.22e-476, 7.22e-476j)
| (-0.81858068744931895656 - 2.635477006262661399e-1952j)  +/-  (1.71e-480, 1.71e-480j)
| (-0.83712013989990212128 - 1.3776069200364846813e-1951j)  +/-  (6.74e-480, 6.74e-480j)
| (-0.98345100307162370876 - 1.725352908747814486e-1945j)  +/-  (6.39e-476, 6.39e-476j)
| (0.75767291844543863357 + 8.5437028977340966273e-1953j)  +/-  (2.05e-482, 2.05e-482j)
| (0.88717536721268257481 - 1.6877693310674889431e-1948j)  +/-  (1.97e-478, 1.97e-478j)
| (-0.32468148633773590221 + 1.812001355048118936e-1968j)  +/-  (6.44e-498, 6.44e-498j)
| (-0.63993387448923818574 + 7.103030872908957745e-1958j)  +/-  (2.53e-486, 2.53e-486j)
| (-0.97693791170018278869 + 7.8601977513273749345e-1947j)  +/-  (4.71e-476, 4.71e-476j)
| (0.83712013989990212128 - 1.1174971197556957647e-1949j)  +/-  (6.36e-480, 6.36e-480j)
| (0.6893143955276334509 + 1.417739094109478156e-1954j)  +/-  (1.21e-484, 1.21e-484j)
| (0.98888579267420554154 - 9.2463501047770807935e-1945j)  +/-  (7.53e-476, 7.53e-476j)
| (-0.71288897340906430166 + 4.1240013951162218976e-1967j)  +/-  (7.34e-484, 7.34e-484j)
| (-0.79914375416774194292 - 3.887237596562106251e-1963j)  +/-  (4.4e-481, 4.4e-481j)
| (-0.96069721783614626601 - 3.5795748509657674255e-1957j)  +/-  (2.04e-476, 2.04e-476j)
| (0.6141786999563736086 - 3.1158302524363491701e-1969j)  +/-  (3.46e-487, 3.46e-487j)
| (0.81858068744931895656 + 5.5565671577816409634e-1963j)  +/-  (1.86e-480, 1.86e-480j)
| (-0.96934678732656449715 - 6.0726501593753562878e-1957j)  +/-  (3.6e-476, 3.6e-476j)
| (-0.6141786999563736086 - 3.9314441293603846074e-1970j)  +/-  (3.28e-487, 3.28e-487j)
| (-0.99978736333537280518 + 5.0826756808383097731e-1957j)  +/-  (1.79e-476, 1.79e-476j)
| (0.71288897340906430166 - 8.8372251635027250348e-1966j)  +/-  (7.18e-484, 7.18e-484j)
| (0.63993387448923818574 + 2.9774441430041971077e-1968j)  +/-  (2.45e-486, 2.45e-486j)
| (-0.98888579267420554154 - 2.6993733643270895539e-1959j)  +/-  (7.61e-476, 7.61e-476j)
| (-0.58775198710385153495 - 4.446325268227763524e-1971j)  +/-  (4.15e-488, 4.15e-488j)
| (-0.75767291844543863357 + 2.3083841608824553915e-1965j)  +/-  (2.05e-482, 2.05e-482j)
| (0.95100396925770844259 - 1.5847732103234056802e-1956j)  +/-  (1.23e-476, 1.23e-476j)
| (0.50473758386357791977 - 4.0129535531813335289e-1986j)  +/-  (4.55e-491, 4.55e-491j)
| (0.73568410640186074833 - 3.2184274588275956198e-1977j)  +/-  (4.08e-483, 4.08e-483j)
| (-0.73568410640186074833 + 5.2403272173084188157e-1979j)  +/-  (4.14e-483, 4.14e-483j)
| (-0.50473758386357791977 - 1.931790353933244894e-1987j)  +/-  (4.22e-491, 4.22e-491j)
| (0.98345100307162370876 - 1.6177188312358361822e-1973j)  +/-  (6.59e-476, 6.59e-476j)
| (0.56068400593466419448 + 1.5379582221027789948e-2012j)  +/-  (4.74e-489, 4.74e-489j)
| (0.58775198710385153495 - 1.3546861971733718597e-2012j)  +/-  (3.93e-488, 3.93e-488j)
| (-0.85474402331765646346 - 3.2679561689482292688e-2000j)  +/-  (2.19e-479, 2.19e-479j)
| (-0.47592040311330105571 + 2.1063649570179792528e-2014j)  +/-  (3.54e-492, 3.54e-492j)
| (-0.6893143955276334509 - 4.1690597389676357357e-2007j)  +/-  (1.16e-484, 1.16e-484j)
| (0.79914375416774194292 - 6.2068834205296013428e-2004j)  +/-  (4.34e-481, 4.34e-481j)
| (0.38647776408466713958 + 5.28016561052874179e-2019j)  +/-  (1.55e-495, 1.55e-495j)
| (0.13188486655451489705 + 1.3431294442586152674e-2028j)  +/-  (1.27e-505, 1.27e-505j)
| (-0.66498774739033272914 + 1.8766909123597992752e-2007j)  +/-  (1.97e-485, 1.97e-485j)
| (-0.56068400593466419448 + 1.1666489843880181373e-2011j)  +/-  (4.45e-489, 4.45e-489j)
| (-0.16458600672290529437 + 6.4627840385192843812e-2027j)  +/-  (2.76e-504, 2.76e-504j)
| (0.47592040311330105571 - 6.1930710901594396806e-2018j)  +/-  (3.85e-492, 3.85e-492j)
| (0.53300287901740309636 + 5.8286509718588953627e-2014j)  +/-  (4.69e-490, 4.69e-490j)
| (-0.44658407310485570273 - 1.5508102507792516881e-2016j)  +/-  (2.94e-493, 2.94e-493j)
| (-0.38647776408466713958 + 7.9428363624289076403e-2019j)  +/-  (1.5e-495, 1.5e-495j)
| (-0.91572066787615558927 + 3.5565780778941400287e-2007j)  +/-  (1.35e-477, 1.35e-477j)
| (0.66498774739033272914 + 6.6094290830684425697e-2034j)  +/-  (1.81e-485, 1.81e-485j)
| (0.35577356508888427243 + 8.4854640772283634103e-2048j)  +/-  (9.35e-497, 9.35e-497j)
| (0.97693791170018278869 + 3.4781305652566235189e-2055j)  +/-  (4.8e-476, 4.8e-476j)
| (-0.53300287901740309636 + 3.7771198547349585135e-2087j)  +/-  (4.55e-490, 4.55e-490j)
| (-0.41675937971104376644 + 6.9841294099440541499e-2092j)  +/-  (2.1e-494, 2.1e-494j)
| (0.099039519178591554338 - 3.7400068310579880514e-2104j)  +/-  (5.88e-507, 5.88e-507j)
| (0.41675937971104376644 - 9.6078007758083275683e-2092j)  +/-  (2.15e-494, 2.15e-494j)
| (0.44658407310485570273 + 8.8742872087547387869e-2091j)  +/-  (3.12e-493, 3.12e-493j)
| (-0.22941067055020822405 + 9.0397760742274859916e-2099j)  +/-  (9.8e-502, 9.8e-502j)
| (-0.29323435397704283446 - 3.5463917674941273827e-2097j)  +/-  (3.3e-499, 3.3e-499j)
| (5.0399500593535974645e-2138 + 1.8776259289109020567e-2139j)  +/-  (4.79e-2136, 4.79e-2136j)
| (0.32468148633773590221 - 8.7304332320017767996e-2096j)  +/-  (6.01e-498, 6.01e-498j)
| (0.29323435397704283446 + 7.4480447659267962479e-2097j)  +/-  (3.44e-499, 3.44e-499j)
| (0.06608692391635567516 + 2.9483733026777066317e-2105j)  +/-  (2.56e-508, 2.56e-508j)
| (-0.13188486655451489705 - 1.8721526689850902509e-2104j)  +/-  (1.26e-505, 1.26e-505j)
| (-0.35577356508888427243 - 4.9140412031527354524e-2094j)  +/-  (1.01e-496, 1.01e-496j)
| (0.033062060155888424294 - 1.4641570605580835577e-2106j)  +/-  (1.07e-509, 1.07e-509j)
| (0.26146545921497457031 - 4.8787370455462488087e-2098j)  +/-  (1.91e-500, 1.91e-500j)
| (0.16458600672290529437 - 1.9443441501048657698e-2101j)  +/-  (2.61e-504, 2.61e-504j)
| (-0.06608692391635567516 - 2.6759984700861253692e-2105j)  +/-  (2.56e-508, 2.56e-508j)
| (-0.26146545921497457031 - 1.0908395492223028258e-2097j)  +/-  (1.87e-500, 1.87e-500j)
| (-0.099039519178591554338 + 3.8484047102730845767e-2104j)  +/-  (6.2e-507, 6.2e-507j)
| (0.19710611027911180796 + 5.3155085776037658584e-2100j)  +/-  (5.39e-503, 5.39e-503j)
| (0.22941067055020822405 - 1.2460074256103247333e-2098j)  +/-  (9.58e-502, 9.58e-502j)
| (-0.033062060155888424294 + 1.4559159743654048701e-2106j)  +/-  (1.07e-509, 1.07e-509j)
| (-0.19710611027911180796 - 4.2011844330510242926e-2100j)  +/-  (5.64e-503, 5.64e-503j)
-------------------------------------------------
The weights are:
| (0.00057282909787725127892 + 4.1934888703372714827e-1811j)  +/-  (7.5e-113, 4.46e-341j)
| (0.011253024445611056264 + 2.2899162164935086076e-1813j)  +/-  (2.61e-113, 1.55e-341j)
| (0.01227813835915057342 - 2.5123207289912545719e-1813j)  +/-  (2.62e-113, 1.56e-341j)
| (0.0027384573077217931022 + 3.3359229380562159625e-1811j)  +/-  (1.16e-113, 6.88e-342j)
| (0.01227813835915057342 - 6.7959675735586958847e-1812j)  +/-  (7.82e-115, 4.65e-343j)
| (0.011253024445611056264 + 7.4643190359927603233e-1812j)  +/-  (7.94e-115, 4.72e-343j)
| (0.0038360448011181447075 - 2.2981902414793597975e-1811j)  +/-  (1.59e-114, 9.46e-343j)
| (0.015255590098533721554 + 3.1917626017891684733e-1813j)  +/-  (3.75e-117, 2.23e-345j)
| (0.0016049790581547967103 - 6.2156158310605007718e-1811j)  +/-  (7.88e-114, 4.69e-342j)
| (0.0081240148371922147966 - 1.051970282834248976e-1811j)  +/-  (3.34e-116, 1.99e-344j)
| (0.017160955368708970502 + 4.6709859706311040274e-1812j)  +/-  (4.19e-119, 2.5e-347j)
| (0.0091725332877901255757 + 9.2637516290585761831e-1812j)  +/-  (2.24e-116, 1.33e-344j)
| (0.014274237260819816111 - 2.9644348411478795158e-1813j)  +/-  (6.24e-120, 3.71e-348j)
| (0.016219472513967278828 - 3.4209747086866811414e-1813j)  +/-  (2.22e-120, 1.32e-348j)
| (0.0038360448011181447075 - 7.5322669844213814448e-1814j)  +/-  (1.36e-123, 8.08e-352j)
| (0.016219472513967278828 - 4.9874099314740277764e-1812j)  +/-  (9.46e-120, 5.63e-348j)
| (0.013282883642136998522 + 6.2378264140106706359e-1812j)  +/-  (1.44e-118, 8.57e-347j)
| (0.010213870441402539533 - 2.0688800549845175313e-1813j)  +/-  (4.12e-122, 2.45e-350j)
| (0.020739134391547396356 + 4.6033312868700443337e-1813j)  +/-  (3.5e-124, 2.09e-352j)
| (0.0016049790581547967103 - 3.3235941105167709411e-1814j)  +/-  (1.83e-124, 1.09e-352j)
| (0.014274237260819816111 - 5.7616548885495444834e-1812j)  +/-  (5.85e-121, 3.48e-349j)
| (0.020739134391547396356 + 3.7055541286303421199e-1812j)  +/-  (8.88e-125, 5.28e-353j)
| (0.0027384573077217931022 + 5.4154890820258522302e-1814j)  +/-  (3.71e-124, 2.21e-352j)
| (0.018991736983159814179 + 4.1233270970031817755e-1813j)  +/-  (5.29e-125, 3.14e-353j)
| (0.018084241902683586238 - 3.887534615999617551e-1813j)  +/-  (1.19e-124, 7.07e-353j)
| (0.0059718002966899935705 - 1.192594463820543222e-1813j)  +/-  (3.64e-125, 2.17e-353j)
| (0.021577878644965910649 - 3.5189666692478308484e-1812j)  +/-  (1.4e-126, 8.32e-355j)
| (0.015255590098533721554 + 5.3482198004655842335e-1812j)  +/-  (1.05e-122, 6.28e-351j)
| (0.031274982759441086563 - 9.3227695754803084187e-1813j)  +/-  (1.74e-131, 1.03e-359j)
| (0.025409186298018740691 + 6.1176641158131491613e-1813j)  +/-  (5.6e-130, 3.33e-358j)
| (0.007054407728568693835 + 1.4088966452527657168e-1813j)  +/-  (1.15e-125, 6.83e-354j)
| (0.018084241902683586238 - 4.3899695060876096189e-1812j)  +/-  (1.23e-125, 7.33e-354j)
| (0.023954939607364325914 + 3.0460440550936778833e-1812j)  +/-  (4.75e-130, 2.82e-358j)
| (0.0049008175738398345295 + 1.7747793042568289923e-1811j)  +/-  (6.39e-124, 3.8e-352j)
| (0.023189583803358083852 - 5.3447883324198053511e-1813j)  +/-  (7.12e-130, 4.24e-358j)
| (0.019878038327026106491 - 4.3616178834859850193e-1813j)  +/-  (1.41e-127, 8.41e-356j)
| (0.0091725332877901255757 + 1.8471014897357935853e-1813j)  +/-  (2.26e-126, 1.34e-354j)
| (0.026096121692100985754 - 2.6715005929490498622e-1812j)  +/-  (2.67e-133, 1.59e-361j)
| (0.018991736983159814179 + 4.1376655796280309108e-1812j)  +/-  (7.59e-128, 4.51e-356j)
| (0.0081240148371922147966 - 1.6262264987308726446e-1813j)  +/-  (1.5e-126, 8.95e-355j)
| (0.026096121692100985754 - 6.3827474213568551093e-1813j)  +/-  (3.93e-134, 2.34e-362j)
| (0.00057282909787725127892 + 1.1309732285237552345e-1814j)  +/-  (1.62e-127, 9.62e-356j)
| (0.023189583803358083852 - 3.1906392030273821967e-1812j)  +/-  (6.77e-133, 4.03e-361j)
| (0.025409186298018740691 + 2.787596643495510879e-1812j)  +/-  (1.53e-134, 9.08e-363j)
| (0.0049008175738398345295 + 9.7290406595300305243e-1814j)  +/-  (6.34e-127, 3.77e-355j)
| (0.026752197201090852402 + 6.6527292829053647861e-1813j)  +/-  (7.47e-136, 4.44e-364j)
| (0.021577878644965910649 - 4.8478629676216987911e-1813j)  +/-  (3.06e-132, 1.82e-360j)
| (0.010213870441402539533 - 8.2732113165663654397e-1812j)  +/-  (4.01e-130, 2.39e-358j)
| (0.028546810211110651092 - 2.2763685192592795139e-1812j)  +/-  (1.83e-139, 1.09e-367j)
| (0.022396103959964818799 + 3.3478316503537314014e-1812j)  +/-  (1.75e-133, 1.04e-361j)
| (0.022396103959964818799 + 5.0947149402426490991e-1813j)  +/-  (1.11e-133, 6.58e-362j)
| (0.028546810211110651092 - 7.4901764543943118024e-1813j)  +/-  (1.89e-139, 1.13e-367j)
| (0.0059718002966899935705 - 1.447812767365282798e-1811j)  +/-  (2.48e-131, 1.48e-359j)
| (0.027379150949220806987 - 2.4617987406128403336e-1812j)  +/-  (1.08e-138, 6.44e-367j)
| (0.026752197201090852402 + 2.5632433848343002251e-1812j)  +/-  (9.04e-138, 5.38e-366j)
| (0.017160955368708970502 + 3.6531892165974163318e-1813j)  +/-  (2.43e-133, 1.45e-361j)
| (0.0290820389037254327 + 7.7801752779067610696e-1813j)  +/-  (1.53e-141, 9.11e-370j)
| (0.023954939607364325914 + 5.5989186731689205272e-1813j)  +/-  (7.61e-137, 4.53e-365j)
| (0.019878038327026106491 - 3.910540767189718941e-1812j)  +/-  (1.13e-134, 6.7e-363j)
| (0.030498800862932261705 - 1.9630961405449396105e-1812j)  +/-  (1.07e-144, 6.34e-373j)
| (0.032779519015078161531 - 1.4909893273353994235e-1812j)  +/-  (2.86e-147, 1.7e-375j)
| (0.024694303450817654951 - 5.8566680128809222551e-1813j)  +/-  (1.35e-137, 8.05e-366j)
| (0.027379150949220806987 - 6.9272920576146236533e-1813j)  +/-  (2.28e-140, 1.36e-368j)
| (0.032616570770966320715 + 1.1058874439514281454e-1812j)  +/-  (5.32e-148, 3.17e-376j)
| (0.0290820389037254327 + 2.1916375632988896524e-1812j)  +/-  (1.06e-143, 6.3e-372j)
| (0.02797833098510408693 + 2.3663026211001698615e-1812j)  +/-  (5.57e-142, 3.31e-370j)
| (0.029585553312295452961 - 8.0759411557649402192e-1813j)  +/-  (4.07e-144, 2.42e-372j)
| (0.030498800862932261705 - 8.685104194238414323e-1813j)  +/-  (6.03e-146, 3.59e-374j)
| (0.013282883642136998522 + 2.7376207508899115761e-1813j)  +/-  (8.58e-138, 5.1e-366j)
| (0.024694303450817654951 - 2.9122002162714780946e-1812j)  +/-  (2.94e-141, 1.75e-369j)
| (0.030903760414326294425 + 1.8944408457739200361e-1812j)  +/-  (3.38e-148, 2.01e-376j)
| (0.007054407728568693835 + 1.2188483352024149287e-1811j)  +/-  (1.37e-139, 8.16e-368j)
| (0.02797833098510408693 + 7.2061611446263816772e-1813j)  +/-  (6.42e-143, 3.82e-371j)
| (0.030058646434927059179 + 8.3772871720242558099e-1813j)  +/-  (1.83e-145, 1.09e-373j)
| (0.032904965828079190162 + 1.4421920786427424978e-1812j)  +/-  (1.17e-151, 6.96e-380j)
| (0.030058646434927059179 + 2.0353772361536948907e-1812j)  +/-  (1.64e-147, 9.78e-376j)
| (0.029585553312295452961 - 2.1114861058044609963e-1812j)  +/-  (7.45e-147, 4.43e-375j)
| (0.032185534127331033138 + 1.0337219946106509802e-1812j)  +/-  (7.63e-152, 4.54e-380j)
| (0.031613783763204291763 + 9.6524053618991399034e-1813j)  +/-  (1.35e-150, 8.01e-379j)
| (0.033068384150785749304 - 1.3057159289851052365e-1812j)  +/-  (3.5e-154, 2.09e-382j)
| (0.031274982759441086563 - 1.8290046518802681444e-1812j)  +/-  (1.62e-151, 9.64e-380j)
| (0.031613783763204291763 + 1.7664307690902132718e-1812j)  +/-  (1.57e-152, 9.35e-381j)
| (0.032994444735302554245 - 1.395146436978391706e-1812j)  +/-  (1.28e-154, 7.61e-383j)
| (0.032779519015078161531 - 1.1434701017572156174e-1812j)  +/-  (2.98e-155, 1.77e-383j)
| (0.030903760414326294425 + 9.0003040000449774619e-1813j)  +/-  (2.67e-152, 1.59e-380j)
| (0.033049486237294812342 + 1.3496666594060642694e-1812j)  +/-  (3.94e-155, 2.34e-383j)
| (0.031917972070491870835 - 1.7065967881090828431e-1812j)  +/-  (7.11e-155, 4.23e-383j)
| (0.032616570770966320715 + 1.5417430537248696637e-1812j)  +/-  (1.38e-155, 8.22e-384j)
| (0.032994444735302554245 - 1.2221411632129490404e-1812j)  +/-  (9.61e-157, 5.71e-385j)
| (0.031917972070491870835 - 9.9902078919800060193e-1813j)  +/-  (6.92e-156, 4.11e-384j)
| (0.032904965828079190162 + 1.1822166224450087853e-1812j)  +/-  (1.04e-156, 6.17e-385j)
| (0.032417934162393678959 - 1.5945190821705405602e-1812j)  +/-  (5.92e-157, 3.52e-385j)
| (0.032185534127331033138 + 1.6493866640303979816e-1812j)  +/-  (6.4e-157, 3.8e-385j)
| (0.033049486237294812342 + 1.2632595621685107142e-1812j)  +/-  (1.65e-157, 9.87e-386j)
| (0.032417934162393678959 - 1.0693437662698937616e-1812j)  +/-  (1.53e-157, 8.97e-386j)
