Starting with polynomial:
P : t
Extension levels are: 1 48 50
-------------------------------------------------
Trying to find an order 48 Kronrod extension for:
P1 : t
Solvable: 1
-------------------------------------------------
Trying to find an order 50 Kronrod extension for:
P2 : t^49 - 1176/97*t^47 + 635628/9215*t^45 - 13983816/57133*t^43 + 450978066/742729*t^41 - 73960402824/66102881*t^39 + 12326733804/7761067*t^37 - 1172800673352/659690695*t^35 + 1026200589183/644168561*t^33 - 6689307544304/5797517049*t^31 + 3344653772152/4924772547*t^29 - 55283533424/169819743*t^27 + 179671483628/1415164525*t^25 - 165850600272/4132280413*t^23 + 2997157276344/293391909323*t^21 - 608118867664/293391909323*t^19 + 6499270398159/19657257924641*t^17 - 51994163185272/1277721765101665*t^15 + 2888564621404/766633059060999*t^13 - 304059433832/1199092733403101*t^11 + 836163443038/70746471270782959*t^9 - 477807681736/1344182954144876221*t^7 + 41462650068/6720914770724381105*t^5 - 3605447832/71241696569678439713*t^3 + 150226993/1211108841684533475121*t
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : t^99 - 242451/9797*t^97 + 29639533572/99816785*t^95 - 53000933416332/23028257651*t^93 + 139248463910802591312/10749422045213033*t^91 - 45715835900056570903541304/810176497640136534341*t^89 + 140820921588259363570236831829764/711288839486314679715223777*t^87 - 13680924567544046916053525835356262804/23793960676892113874659902144365*t^85 + 838508260458477503433265661460858428529900918/594834457537729131151971260242414052141*t^83 - 135018658580178955746579993132642550814651651186/45601586184488800741204736493041935105701*t^81 + 2445930735144129432371567306939182951325186062474824492/453888968397343084031965888416699936171063912037*t^79 - 7819430206325034116297011727003364327062590130324332692/911881815351624170632032734233189202687254984219*t^77 + 2060373601824925222537920438340299663074349276989216798090298555336/171478594667184253323066377760834832333508807264738995029925*t^75 - 754044666991819923395544505529602717931536589167462719371302387089072/50572467139245979990038736129225408751798417438516824414225481*t^73 + 120886390792459671574775012244845711143651017284510537768655028605986900942004/7343285143318377479517903903488246570415901433596479808123344259101211*t^71 - 5563075659704700425242660910195185712131665836370039011719531683169284306163056924/342725493929301370694025265156677944431074736952416302936571816640591757769*t^69 + 1104045315426114745686898347392508594045453406305260037372906773419203514972010778557983536597/77012765946827607906392196401110470877164978096631552517501274227712719690114637168679*t^67 - 85782457992700055016198722380957251189176456944713640525409746430397079211347042231932468727773/7546101618521242476200966707064033452366986286632628989214863661267671712919441686751905*t^65 + 2536150339926031869708082832108172450831499772438932472991884759040835273660200855277205096759664488/312800656009329380604598954973524142481356975538744046124211949339313930874473023594239039049*t^63 - 196441425865725151076028866183387064877541415516354260182083794907883709404256527699892850403173053073816/37717369044180932714996568591155409590055246386043669048494852189070471221730725267983231511797399*t^61 + 1855490027140183657273914626661812570979556553113430078868339488151359665860370589482154639833577918302537672863360/615243794691198900611023026053042341898872482690794621871606854097096653225429181009016667737977986348415551*t^59 - 8201924642643557869163736114940090063777635734929797298449577546700197289334727006644069327761606266046462198582626602960/5207659575465555010607440149671134567114479276069133175809988803769073740108942366739761569740588991022292858858749*t^57 + 255947751164702770268075198045802362007566110917191609120303822404676580594887757696448199849933213635256583684985345670577096/345011010010092022200908062374762440058143330367505804409584680873619503595829085283391710147967001058220759257663971973*t^55 - 52901330723507104950557202799908112460312730960452899961299747024726234766540255496800460702898403603078931592404405993191102040/167894903325820235894678259808373031057385567950659870091318799701498654795315735774726893129278850605877793118752294724679*t^53 + 1765614512407021534659390809377235234568324196393344654145369922978161865356878871654046548155147555763797213010587270865100503395927420780/14640786161524720437374235498738444279950343332538776323208822358700528609607877866611380742836368454941169761191272463226097246965087*t^51 - 293504838969110485840015399260222270107542185980166644308758271530270258331754297340337433901315612274677053650197024839057113465992969284908356/7063494650876947484400850244775328949593537097776467321408436140203877588239057643410346735024985725807839219777133254000223407112928757255*t^49 + 474657367344342356568359834517795951069517239433093067210708132431524010072972692907550192699764273529625849155991873460311277397455853864904/36876336573159194270721097623411779043915001459677807563119505240741648538504809718801050823576100134734803710274544752730164916109262615*t^47 - 363682008983853878755725968302456115333280995518247583613130901813924783468652753345592122091548642601287998109911666518857969368366510776584/101632879507497686866114509176193029200587730334555395365251391805955739430489996918936951886570578605774326863720844564317112372863574975*t^45 + 292330052164401264485394241608109926883872038242498531809943143308212143488384590912292033717825715815970543419039493401358847092196868976/328126543864478513246588899634268063689238211785310537287982403451683780659186056322821085105325572389075991573610203351236216666849265*t^43 - 35104753780310830055892639615660846211164855029644019896302395232648591375552667109777458462634361093875470510055081878430879347095667070016/177180702836961083699361573502513259786056326498677334076503800598712690770363745157199599420012894541905940659247797944473342204362164745*t^41 + 2204421475237451412901166144570203119511801619246899017511571203182391199223777725437068533075934352665576100988002065408959434896125955288/56179247240987660685163425744699326273627615719092813243769497750811340975968992366916946157565064123043347038298082275076913381870930285*t^39 - 977145031200489531582898996032009310533396605242933311012366270429365141922088090808318428474926676726550844469710589805667713189145874776/141699073000547824319258357242703158981659937623460820448859907282410791206593855241252054478392854043141721477164798612845817963180524565*t^37 + 594703445526796484426985661205411833531701053735643476497308872429326571153207504710432962517112345785300683551460170644675079153198711703/555307177975119852061958427032215082495694350145995107164450987998636884458273216485987781063971995574474313896997183753044421747599353025*t^35 - 25527594150281531828632325819968885404280290788616385114065722889180606529557231960434512326372988514475053662658213697862130755352858649/174525113077894810648044077067267597355789652903027033680256024799571592258314439467024731191534055751977641510484829179528246834959796665*t^33 + 3286734351800244481544118836613932705410826069112123313496060821747416049292330919609370397893060094603122212982569228361503350974378572/188124472538509990698541018137444293253643392090275893447548702056681066979741538646273411544121125031352522667145984700010967367554066535*t^31 - 77024978596525561312095519378605268918543485508901762853459827309327562804919349744965787050558833241416643500191855488303550408285164/42479719605469997899670552482648711379854959504255846907510997238605402221231960339481092929317673394176376086129738480647637792673498895*t^29 + 18778866090926488844425862736287120235657444581182288849047101023831779053818702628879702801733597368561301182796758812052458591665072/115720615476969994278412884349284420655466958649524548472185130408614716395769822993758839359175730970342541751870666895557358124869186645*t^27 - 56434336596263368879193108358795764766293554024651246257865522998194284707013375686761578349075082235679126794706390750916990411118488/4546167036595249775223363313721887954321916232659892975692987266052721001262385903326240117681903716692028425966347628039753354905575189625*t^25 + 7157033025874667174866790310232833235364982941041139154481733740502476107677956489229932520114813411914173728586281652699604583657556/8910487391726689559437792094894900390470955816013390232358255041463333162474276370519430630656531284716375714894041350957916575614927371665*t^23 - 2567400154096041565322204909087068457248871032196399009969685119350651575703280685025646862372233481894152553877307322874701931523196/59133234508731667076268983902484338954943615869907044269286601638802120078238379549810766912538798525845038835205910783629810001808154375595*t^21 + 22011035161267809166119742480943293403927001249255800553611613087136128856196252487647086388212394205756365341121462955235222959008862/11395819050325574126555265612064481892888419686929228959895375087249151426506224858956389223573548458766422484098967663873801956062742893239665*t^19 - 101145766858905394677941697712720112954088416255500233710766740119091944738387852794002284530028919376672320636567719188435437594034/1456608450041614737980748236128542798339121313366893927204672003633350182335382124829012156396618975932550242328439475833493483105764129211085*t^17 + 5914353790590293179796842415936775250673448299845428404947636376442361190358378663261466688275604437328587437206983590867673072404/2998899750085677401725069897911705761286426233402428673656677654539250375396374962883260321993039068096426969499728332598368935805984971905175*t^15 - 22460218116258946365922413511460090388958152988012945790971179114154789890940197691743351403993739630448507227020451372094046847196/522408336464925003380507176216219143616095449858703074950993247420737415394048518534263948091187405662397578086852675538635868617402582105881485*t^13 + 306244456844685605577331812423692055722498492258957474508205777416388632436509848823708031309759702264411490162399747652447096504/442037823162628849014275302952185429213619226803517986496994286279085505333425669528992571461773958637413335304259956224999581137802184858822795*t^11 - 1842734043221431961583191262922966876620807685319185304158680682019141759330872455258049515424900592446396401858712026283416816/235056227260825054208089108792756137327790049620301594314092852106064147917027099488019711101092752600467614165528021554265032560201161811603155*t^9 + 58591136671340619027358760403282832360130002586805196783632267652441056705694990634657518095137094468754891632909461799198735756/1012387170812373508474239791570400683470791743714638966710797914020818285078635717494900895712406485450214014210929188834219495236786403922574788585*t^7 - 78564919585912031278739198316742664953308722651470618753961651943180081913147838629129802186619385111877566663648680250145401428/316009424032148016573744849225903641911954280002355163180441920305069707556688434675194065304515452958388231578697182514681371013196898938689416151175*t^5 + 50427307705019073018556792068115719193162222806358723957620809169873797637560495099814359252948334114190471319823216437192427/99317247552960805208891238328141144600899916572168765570996032095879050946387793755060991952847713786922015639019114504614145175576168237873816504655*t^3 - 11452842209842422634045530939525952147689092713823161817345597392532705192823898893638501727637096521224993652018487989911199/36846698842148458732498649419740364646933869048274612026839527907571127901109871483127628014506501814948067802076091481211847860138758416251185923227005*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:
| (0.98976423841406447106 - 2.7201057284519799597e-1784j)  +/-  (2.12e-474, 2.12e-474j)
| (-0.95485365867413723356 - 6.9090787298833073949e-1808j)  +/-  (4.07e-475, 4.07e-475j)
| (-0.94495505922132947316 + 6.9359927987658835435e-1810j)  +/-  (1.97e-475, 1.97e-475j)
| (0.99980419968563872799 + 2.0023572153349147452e-1805j)  +/-  (4.99e-475, 4.99e-475j)
| (0.92230547545393616876 + 4.2310398978355261061e-1825j)  +/-  (4.85e-476, 4.85e-476j)
| (0.95485365867413723356 - 3.2909230422537974338e-1824j)  +/-  (3.69e-475, 3.69e-475j)
| (-0.9968198142998264694 - 3.8962137597673835466e-1834j)  +/-  (1.94e-474, 1.94e-474j)
| (-0.90958565582807328521 + 4.7340547664229937612e-1839j)  +/-  (2.05e-476, 2.05e-476j)
| (-0.92230547545393616876 - 1.2957560071905439469e-1838j)  +/-  (5.17e-476, 5.17e-476j)
| (0.83252850148746016852 + 2.5805927328724320441e-1840j)  +/-  (8.92e-479, 8.92e-479j)
| (0.88140844557300891004 + 1.0000906198758183402e-1838j)  +/-  (2.99e-477, 2.99e-477j)
| (0.98475789591421300436 - 1.8516146979742241821e-1834j)  +/-  (1.79e-474, 1.79e-474j)
| (-0.88140844557300891004 + 2.7521827789243299536e-1852j)  +/-  (2.97e-477, 2.97e-477j)
| (-0.86598000431514572644 - 1.5478031476165584497e-1852j)  +/-  (9.88e-478, 9.88e-478j)
| (-0.99882015060663537936 + 9.832589885820694009e-1848j)  +/-  (1.56e-474, 1.56e-474j)
| (0.86598000431514572644 - 4.0594557869788270499e-1856j)  +/-  (9.76e-478, 9.76e-478j)
| (0.93410029475581014906 + 9.3143782071917994517e-1853j)  +/-  (1.03e-475, 1.03e-475j)
| (0.99882015060663537936 - 3.8581375675133487558e-1867j)  +/-  (1.51e-474, 1.51e-474j)
| (-0.77610689434544663502 + 6.1251346699192090844e-1897j)  +/-  (1.42e-480, 1.42e-480j)
| (-0.79572032076252483814 - 1.4672167464858986646e-1896j)  +/-  (5.75e-480, 5.75e-480j)
| (0.94495505922132947316 + 1.885850018752358147e-1889j)  +/-  (2.05e-475, 2.05e-475j)
| (0.81453442735985543154 + 1.261248201565157809e-1899j)  +/-  (2.46e-479, 2.46e-479j)
| (-0.98475789591421300436 - 3.8087845083148610397e-1892j)  +/-  (1.9e-474, 1.9e-474j)
| (-0.81453442735985543154 + 3.3092730713470491978e-1900j)  +/-  (2.27e-479, 2.27e-479j)
| (-0.83252850148746016852 - 3.7340938676591921269e-1899j)  +/-  (8.86e-479, 8.86e-479j)
| (-0.99980419968563872799 + 9.9934071131911296266e-1893j)  +/-  (5.27e-475, 5.27e-475j)
| (0.75571189036951430825 + 3.1435083982238752107e-1904j)  +/-  (2.77e-481, 2.77e-481j)
| (0.90958565582807328521 - 1.7708477554698110933e-1896j)  +/-  (2.01e-476, 2.01e-476j)
| (-0.96379001813635542826 + 3.095469413310919451e-1898j)  +/-  (6.49e-475, 6.49e-475j)
| (-0.66673570084157166787 - 1.5599876623165643567e-1907j)  +/-  (2.39e-484, 2.39e-484j)
| (0.9968198142998264694 - 1.4027593394976816466e-1894j)  +/-  (2e-474, 2e-474j)
| (0.79572032076252483814 - 1.8706612267023341006e-1910j)  +/-  (5.47e-480, 5.47e-480j)
| (0.73455425423740269621 + 1.1180623431237758232e-1911j)  +/-  (5.63e-482, 5.63e-482j)
| (-0.99378866194416779076 - 3.0759551651175268977e-1903j)  +/-  (2.3e-474, 2.3e-474j)
| (-0.6900438244251321135 - 4.4872140644601338652e-1914j)  +/-  (1.59e-483, 1.59e-483j)
| (-0.75571189036951430825 + 5.6631087667566555145e-1912j)  +/-  (2.95e-481, 2.95e-481j)
| (-0.97176220090155538014 + 4.0485491436655366151e-1905j)  +/-  (1.06e-474, 1.06e-474j)
| (0.64275483241923766406 + 7.2050621959061486128e-1916j)  +/-  (3.41e-485, 3.41e-485j)
| (0.84968211984416570103 + 1.135789673797759749e-1907j)  +/-  (2.98e-478, 2.98e-478j)
| (-0.93410029475581014906 + 1.5331344968017251735e-1906j)  +/-  (1.07e-475, 1.07e-475j)
| (-0.56703154949539173286 - 2.2356274322170529744e-1918j)  +/-  (5.93e-488, 5.93e-488j)
| (0.54061324699172606656 - 2.8723397590125463576e-1919j)  +/-  (6.41e-489, 6.41e-489j)
| (0.71265706670500883085 - 1.8722848471500493208e-1913j)  +/-  (9.56e-483, 9.56e-483j)
| (0.6900438244251321135 + 2.4900589835720911053e-1913j)  +/-  (1.56e-483, 1.56e-483j)
| (-0.97875730303120668453 + 2.3515297946125843728e-1905j)  +/-  (1.36e-474, 1.36e-474j)
| (-0.59287769410890071246 + 1.3346806237690006015e-1917j)  +/-  (5.39e-487, 5.39e-487j)
| (-0.71265706670500883085 + 6.5071014772056449985e-1914j)  +/-  (9.87e-483, 9.87e-483j)
| (0.89594962458359342074 + 3.4706994268026606207e-1906j)  +/-  (7.38e-477, 7.38e-477j)
| (0.51365062840173438231 + 2.5558249661223576424e-1921j)  +/-  (5.66e-490, 5.66e-490j)
| (0.15799287766436835867 - 8.6345136591817355525e-1935j)  +/-  (2.72e-504, 2.72e-504j)
| (-0.73455425423740269621 + 1.2716518439209561798e-1912j)  +/-  (5.68e-482, 5.68e-482j)
| (-0.51365062840173438231 - 2.5543405721421238622e-1920j)  +/-  (5.91e-490, 5.91e-490j)
| (0.96379001813635542826 - 5.9597741798685519499e-1903j)  +/-  (6.1e-475, 6.1e-475j)
| (0.66673570084157166787 - 1.9106175801853381037e-1919j)  +/-  (2.42e-484, 2.42e-484j)
| (0.56703154949539173286 - 2.4682712855780861898e-1922j)  +/-  (5.94e-488, 5.94e-488j)
| (-0.84968211984416570103 - 3.2770510107932950787e-1913j)  +/-  (3.14e-478, 3.14e-478j)
| (-0.48617194145249204218 + 1.2680585222707953006e-1926j)  +/-  (5.09e-491, 5.09e-491j)
| (-0.61812681780087929916 + 2.771790161022199812e-1921j)  +/-  (4.57e-486, 4.57e-486j)
| (0.97875730303120668453 - 3.8630065353809991963e-1907j)  +/-  (1.49e-474, 1.49e-474j)
| (0.42977299334157652466 - 1.4337961125756734023e-1950j)  +/-  (3.47e-493, 3.47e-493j)
| (0.97176220090155538014 + 2.2269433831315852806e-1931j)  +/-  (1.08e-474, 1.08e-474j)
| (-0.64275483241923766406 + 3.7544818319973713505e-1958j)  +/-  (3.49e-485, 3.49e-485j)
| (-0.45820369153902985485 - 8.7016812185675685342e-1966j)  +/-  (4.13e-492, 4.13e-492j)
| (-0.98976423841406447106 + 1.9322891247873943039e-1950j)  +/-  (2.18e-474, 2.18e-474j)
| (0.45820369153902985485 - 4.8156399586226565413e-1994j)  +/-  (4.4e-492, 4.4e-492j)
| (0.48617194145249204218 + 5.0401334116137291263e-1992j)  +/-  (5.05e-491, 5.05e-491j)
| (0.99378866194416779076 - 1.0763222922161074164e-1982j)  +/-  (2.35e-474, 2.35e-474j)
| (-0.37164350126228488886 - 1.4247953999357359074e-2038j)  +/-  (1.8e-495, 1.8e-495j)
| (-0.89594962458359342074 - 6.4853552541519481731e-2027j)  +/-  (8.53e-477, 8.53e-477j)
| (0.59287769410890071246 + 2.8470603126857152327e-2036j)  +/-  (5.28e-487, 5.28e-487j)
| (0.34200319599185596011 - 2.2636390651044701164e-2047j)  +/-  (1.15e-496, 1.15e-496j)
| (0.09505164998612337566 - 2.2138470915014820065e-2057j)  +/-  (5.78e-507, 5.78e-507j)
| (-0.42977299334157652466 - 6.0255066152549826088e-2044j)  +/-  (3.5e-493, 3.5e-493j)
| (-0.40090957392927988094 + 5.2033130119922134379e-2045j)  +/-  (2.67e-494, 2.67e-494j)
| (-0.12658599726967205107 - 1.4213047462441124759e-2056j)  +/-  (1.19e-505, 1.19e-505j)
| (0.40090957392927988094 - 2.3560402878815767482e-2044j)  +/-  (2.63e-494, 2.63e-494j)
| (0.77610689434544663502 - 6.0905059417547638432e-2042j)  +/-  (1.34e-480, 1.34e-480j)
| (-0.54061324699172606656 - 5.3824370263185541939e-2051j)  +/-  (5.91e-489, 5.91e-489j)
| (-0.34200319599185596011 + 3.6239209023675226481e-2059j)  +/-  (1.19e-496, 1.19e-496j)
| (-0.22029976550980533532 + 6.2450306636137283475e-2064j)  +/-  (1.01e-501, 1.01e-501j)
| (0.25113517861257727351 + 3.1580557060621245406e-2062j)  +/-  (1.97e-500, 1.97e-500j)
| (0.28171770824102941788 + 3.2558978273822836007e-2061j)  +/-  (3.59e-499, 3.59e-499j)
| (-0.031725863459073153631 + 3.0924627486559769647e-2071j)  +/-  (1.16e-509, 1.16e-509j)
| (-0.28171770824102941788 + 1.8715090322704546497e-2062j)  +/-  (3.93e-499, 3.93e-499j)
| (-0.31201753211974876221 + 1.189961347891809422e-2060j)  +/-  (6.53e-498, 6.53e-498j)
| (0.063420684982686786029 + 1.7569407081462716698e-2070j)  +/-  (2.79e-508, 2.79e-508j)
| (0.31201753211974876221 - 1.7867802539837024209e-2059j)  +/-  (6.74e-498, 6.74e-498j)
| (0.37164350126228488886 - 3.7460339779175396231e-2057j)  +/-  (1.84e-495, 1.84e-495j)
| (-0.09505164998612337566 + 1.2069478330192765494e-2070j)  +/-  (6.03e-507, 6.03e-507j)
| (-0.25113517861257727351 + 4.648173769580649034e-2063j)  +/-  (2.03e-500, 2.03e-500j)
| (-0.063420684982686786029 - 5.7248925292868790328e-2072j)  +/-  (2.63e-508, 2.63e-508j)
| (0.12658599726967205107 + 1.0844860064154380257e-2067j)  +/-  (1.24e-505, 1.24e-505j)
| (0.22029976550980533532 - 1.1817366857982145387e-2063j)  +/-  (1.05e-501, 1.05e-501j)
| (0.031725863459073153631 - 9.0001561246898801955e-2072j)  +/-  (1.16e-509, 1.16e-509j)
| (-0.15799287766436835867 + 6.8534882708407485459e-2067j)  +/-  (3.1e-504, 3.1e-504j)
| (-0.18924159246181358649 - 6.4738399307283528891e-2065j)  +/-  (5.93e-503, 5.93e-503j)
| (2.7238536074580577464e-2118 + 2.1445386422155702972e-2117j)  +/-  (2.14e-2115, 2.14e-2115j)
| (0.18924159246181358649 - 7.3529698841806057121e-2066j)  +/-  (5.96e-503, 5.96e-503j)
| (0.61812681780087929916 - 3.2015479938416667124e-2058j)  +/-  (4.57e-486, 4.57e-486j)
-------------------------------------------------
The weights are:
| (0.0045141331625998620836 + 3.1670687507191218531e-1785j)  +/-  (8.13e-116, 1.11e-343j)
| (0.0094175722296862066762 - 1.3184996853590067812e-1786j)  +/-  (3.77e-116, 5.12e-344j)
| (0.010378732924116607707 + 1.4591910524419161603e-1786j)  +/-  (3.53e-116, 4.8e-344j)
| (0.00052747696837833231426 - 1.4290823286088347051e-1785j)  +/-  (2.29e-117, 3.11e-345j)
| (0.012259174879947358908 + 4.943205352987101708e-1785j)  +/-  (1.39e-117, 1.9e-345j)
| (0.0094175722296862066762 - 7.3444156601096632389e-1785j)  +/-  (2.09e-117, 2.85e-345j)
| (0.0025218765731496496845 + 3.4530484142878394556e-1787j)  +/-  (3.62e-119, 4.92e-347j)
| (0.013179206821207936606 - 1.8881721058418222762e-1786j)  +/-  (9.18e-118, 1.25e-345j)
| (0.012259174879947358908 + 1.7439872393345945057e-1786j)  +/-  (1.46e-117, 1.98e-345j)
| (0.017576872641244826238 + 3.0407178987585052744e-1785j)  +/-  (1.33e-119, 1.81e-347j)
| (0.014988098934680295659 - 3.761449222923329486e-1785j)  +/-  (3.08e-119, 4.19e-347j)
| (0.005501420399338078204 - 2.9987198936785486688e-1784j)  +/-  (1.45e-119, 1.97e-347j)
| (0.014988098934680295659 - 2.1781785094937039843e-1786j)  +/-  (2.54e-119, 3.45e-347j)
| (0.01586572369887289313 + 2.3255600058266149907e-1786j)  +/-  (9.81e-120, 1.33e-347j)
| (0.0014779639281743620209 - 2.1192466335282948892e-1787j)  +/-  (5.13e-121, 6.98e-349j)
| (0.01586572369887289313 + 3.4864250874512188378e-1785j)  +/-  (3.27e-120, 4.45e-348j)
| (0.011327843857878022879 - 5.5323586490960400209e-1785j)  +/-  (4.66e-120, 6.33e-348j)
| (0.0014779639281743620209 + 4.6536457976881395034e-1785j)  +/-  (4.07e-120, 5.53e-348j)
| (0.020007064385927492927 - 3.0822743494050322628e-1786j)  +/-  (1.87e-123, 2.54e-351j)
| (0.019216932982655644212 + 2.9276136397116587086e-1786j)  +/-  (2.98e-123, 4.05e-351j)
| (0.010378732924116607707 + 6.3003276091118273773e-1785j)  +/-  (3.64e-121, 4.95e-349j)
| (0.018407753851982582028 - 2.8569549968225431563e-1785j)  +/-  (1.65e-123, 2.24e-351j)
| (0.005501420399338078204 - 7.603165640875536403e-1787j)  +/-  (3.19e-124, 4.33e-352j)
| (0.018407753851982582028 - 2.7746164965923728114e-1786j)  +/-  (1.59e-123, 2.17e-351j)
| (0.017576872641244826238 + 2.6236702211909489249e-1786j)  +/-  (1.46e-123, 1.99e-351j)
| (0.00052747696837833231426 + 7.2115796362491545618e-1788j)  +/-  (4.76e-124, 6.46e-352j)
| (0.020779853519856169334 + 2.4149895981814712372e-1785j)  +/-  (1.88e-127, 2.55e-355j)
| (0.013179206821207936606 - 4.4728896095105308967e-1785j)  +/-  (3.13e-124, 4.26e-352j)
| (0.0084551856397750456701 + 1.1772899993311976074e-1786j)  +/-  (1.69e-124, 2.3e-352j)
| (0.023648494373863135028 + 3.8832724041339360999e-1786j)  +/-  (4.92e-129, 6.69e-357j)
| (0.0025218765731496496845 - 9.7224819407244732254e-1785j)  +/-  (2.15e-124, 2.93e-352j)
| (0.019216932982655644212 + 2.6938277747653308355e-1785j)  +/-  (1.07e-126, 1.46e-354j)
| (0.021531481807781686754 - 2.2946216028298471202e-1785j)  +/-  (1.4e-128, 1.9e-356j)
| (0.0035329557014832599892 - 4.8025952075854338875e-1787j)  +/-  (3.56e-125, 4.84e-353j)
| (0.02296412163116801663 - 3.7189418122359274994e-1786j)  +/-  (7.84e-130, 1.07e-357j)
| (0.020779853519856169334 + 3.2382796684332157764e-1786j)  +/-  (3.33e-128, 4.52e-356j)
| (0.0074869102764140445198 - 1.0366125182149431175e-1786j)  +/-  (8.29e-126, 1.13e-353j)
| (0.024308902929811949709 - 1.9053387494165511843e-1785j)  +/-  (1.42e-132, 1.93e-360j)
| (0.016727898553777318682 - 3.2489253499573111615e-1785j)  +/-  (2.91e-127, 3.96e-355j)
| (0.011327843857878022879 - 1.6006995026470823915e-1786j)  +/-  (1.26e-125, 1.71e-353j)
| (0.0261366295727170562 + 4.5667130124140575585e-1786j)  +/-  (3.37e-134, 4.58e-362j)
| (0.026695273107158037743 - 1.6165827064279064162e-1785j)  +/-  (8.1e-135, 1.1e-362j)
| (0.022258913930129946636 + 2.1849524469917365305e-1785j)  +/-  (4.11e-131, 5.58e-359j)
| (0.02296412163116801663 - 2.0843119620321920154e-1785j)  +/-  (6.71e-132, 9.13e-360j)
| (0.0064998725321664845168 + 8.9815326562151719346e-1787j)  +/-  (9.95e-127, 1.35e-354j)
| (0.025551567629898396796 - 4.3919153746093279075e-1786j)  +/-  (8.26e-135, 1.12e-362j)
| (0.022258913930129946636 + 3.5564991526131777161e-1786j)  +/-  (8.91e-132, 1.21e-359j)
| (0.014091111047270544038 + 4.0856440499981250106e-1785j)  +/-  (3.21e-130, 4.37e-358j)
| (0.027225205808796711996 + 1.555415277393020033e-1785j)  +/-  (9.51e-138, 1.29e-365j)
| (0.031333052591231059759 + 1.0246712001057064353e-1785j)  +/-  (8.31e-142, 1.13e-369j)
| (0.021531481807781686754 - 3.3961843211989476553e-1786j)  +/-  (1.04e-131, 1.42e-359j)
| (0.027225205808796711996 + 4.9258152166367704691e-1786j)  +/-  (3.44e-138, 4.68e-366j)
| (0.0084551856397750456701 + 8.8545483359955396312e-1785j)  +/-  (4.19e-132, 5.69e-360j)
| (0.023648494373863135028 + 1.9913536277324616234e-1785j)  +/-  (1.26e-134, 1.71e-362j)
| (0.0261366295727170562 + 1.6817813641294382418e-1785j)  +/-  (3.99e-137, 5.42e-365j)
| (0.016727898553777318682 - 2.4742028711748849738e-1786j)  +/-  (2.47e-131, 3.35e-359j)
| (0.027727807550868872838 - 5.1104707241125354176e-1786j)  +/-  (1.62e-139, 2.2e-367j)
| (0.024942731211638013781 + 4.2196183497487375429e-1786j)  +/-  (5.17e-136, 7.03e-364j)
| (0.0064998725321664845168 + 1.6062909333045702237e-1784j)  +/-  (1.23e-133, 1.68e-361j)
| (0.02865216671090199985 - 1.3916722836077342439e-1785j)  +/-  (2.91e-143, 3.96e-371j)
| (0.0074869102764140445198 - 1.1295070685144638971e-1784j)  +/-  (1.65e-133, 2.25e-361j)
| (0.024308902929811949709 - 4.050001494417312373e-1786j)  +/-  (1.02e-136, 1.39e-364j)
| (0.028204220570029200521 + 5.2983536687545852238e-1786j)  +/-  (4.48e-142, 6.09e-370j)
| (0.0045141331625998620836 + 6.2029516717324020676e-1787j)  +/-  (1.57e-133, 2.13e-361j)
| (0.028204220570029200521 + 1.4432685493698887468e-1785j)  +/-  (5.63e-143, 7.65e-371j)
| (0.027727807550868872838 - 1.4977847523434403689e-1785j)  +/-  (2.54e-142, 3.45e-370j)
| (0.0035329557014832599892 + 2.3670971959077244944e-1784j)  +/-  (7.95e-136, 1.08e-363j)
| (0.029457845405642073408 - 5.8860224551790379751e-1786j)  +/-  (2.81e-146, 3.81e-374j)
| (0.014091111047270544038 + 2.03261547958303319e-1786j)  +/-  (1.5e-135, 2.03e-363j)
| (0.025551567629898396796 - 1.7513391511213786364e-1785j)  +/-  (3.73e-141, 5.08e-369j)
| (0.02981799732371075219 + 1.2521300297390442468e-1785j)  +/-  (4.82e-147, 6.55e-375j)
| (0.031587959458685973161 + 9.6033732603060055378e-1786j)  +/-  (7.78e-150, 1.06e-377j)
| (0.02865216671090199985 - 5.489988408874086276e-1786j)  +/-  (4.74e-145, 6.44e-373j)
| (0.029069614012150475693 + 5.6859072844046776355e-1786j)  +/-  (5.68e-146, 7.72e-374j)
| (0.031475635826998903519 - 7.6697222915451584411e-1786j)  +/-  (9.55e-152, 1.3e-379j)
| (0.029069614012150475693 + 1.3428173090472582148e-1785j)  +/-  (4.42e-147, 6.01e-375j)
| (0.020007064385927492927 - 2.5474899168976925007e-1785j)  +/-  (2.12e-141, 2.89e-369j)
| (0.026695273107158037743 - 4.7445139008678849794e-1786j)  +/-  (1.62e-143, 2.2e-371j)
| (0.02981799732371075219 + 6.0902604490680024393e-1786j)  +/-  (1.86e-148, 2.53e-376j)
| (0.030951992615566392528 + 6.9577057203250582346e-1786j)  +/-  (1.16e-151, 1.58e-379j)
| (0.030713855857739083392 - 1.1311359214420929715e-1785j)  +/-  (7.68e-152, 1.04e-379j)
| (0.030446279739685887739 + 1.169656179371882361e-1785j)  +/-  (2e-151, 2.72e-379j)
| (0.031715664503973344041 + 8.4455013847636068737e-1786j)  +/-  (4.52e-154, 6.15e-382j)
| (0.030446279739685887739 + 6.5134310516825813953e-1786j)  +/-  (1.62e-151, 2.2e-379j)
| (0.030148081066799933145 - 6.2991973689494622743e-1786j)  +/-  (1.06e-150, 1.44e-378j)
| (0.031668466056611715845 - 9.2986781632863376158e-1786j)  +/-  (1.34e-154, 1.82e-382j)
| (0.030148081066799933145 - 1.2099181342730111065e-1785j)  +/-  (1.69e-152, 2.3e-380j)
| (0.029457845405642073408 - 1.296393413900603361e-1785j)  +/-  (7.85e-152, 1.07e-379j)
| (0.031587959458685973161 + 7.9204766811070003901e-1786j)  +/-  (2.96e-155, 4.02e-383j)
| (0.030713855857739083392 - 6.7329378247626680388e-1786j)  +/-  (6.46e-154, 8.78e-382j)
| (0.031668466056611715845 - 8.178782643614126356e-1786j)  +/-  (1.74e-155, 2.37e-383j)
| (0.031475635826998903519 - 9.9192679792805137172e-1786j)  +/-  (6.76e-156, 9.19e-384j)
| (0.030951992615566392528 + 1.0941725756723953317e-1785j)  +/-  (7.68e-156, 1.04e-383j)
| (0.031715664503973344041 + 9.0048543935384616487e-1786j)  +/-  (1.59e-156, 2.16e-384j)
| (0.031333052591231059759 + 7.4257187909667953384e-1786j)  +/-  (1.21e-156, 1.64e-384j)
| (0.03115893749659741587 - 7.1883986603321987686e-1786j)  +/-  (1.29e-156, 1.76e-384j)
| (0.031730931398521894409 - 8.7207987194608048634e-1786j)  +/-  (5.32e-157, 7.22e-385j)
| (0.03115893749659741587 - 1.0587038328079396339e-1785j)  +/-  (2.8e-157, 3.85e-385j)
| (0.024942731211638013781 + 1.8256198727262247339e-1785j)  +/-  (1.52e-157, 1.97e-385j)
