Starting with polynomial:
P : t
Extension levels are: 1 44 46
-------------------------------------------------
Trying to find an order 44 Kronrod extension for:
P1 : t
Solvable: 1
-------------------------------------------------
Trying to find an order 46 Kronrod extension for:
P2 : t^45 - 990/89*t^43 + 148995/2581*t^41 - 8145060/43877*t^39 + 1508872365/3641791*t^37 - 2481256778/3641791*t^35 + 43421993615/50770851*t^33 - 14178610160/16923617*t^31 + 10988422874/16923617*t^29 - 153837920236/383407461*t^27 + 2999839444602/15123294295*t^25 - 5454253535640/69567153757*t^23 + 4999732407670/202652143553*t^21 - 1242537048060/202652143553*t^19 + 240900039930/202652143553*t^17 - 2184160362032/12361780756733*t^15 + 14333552375835/729345064647247*t^13 - 1153784401770/729345064647247*t^11 + 192297400295/2188035193941741*t^9 - 121450989660/38655288426304091*t^7 + 42507846381/657139903247169547*t^5 - 2891690230/4599979322730186829*t^3 + 394321395/216199028168318780963*t
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : t^91 - 188279/8277*t^89 + 5961515014/23827995*t^87 - 223338484485298/126006545835*t^85 + 543498667943131757311/59789031236993025*t^83 - 243352463144099720693191/6766245426615367275*t^81 + 5389776113531852497491550034894828/47183521469473259847572891625*t^79 - 16621051585054111355120955735361868/55545158185582445137016188875*t^77 + 380772259169787380428208308255446325586539/577602713214443802578578259792405625*t^75 - 10275986116028034812649461414136953764028212041557/8292075756399191590027839521998015125169125*t^73 + 2676187531669960993557240320786253833767121559958315587074/1331368893600490657014359038116283124506002559528125*t^71 - 12862005541962744208369163352057317005232103566976794264644846/4532411002330898524436192676422147115140455783885415625*t^69 + 45009177648999919358854961394402757566708844449096104426958806342238959/12819894457399013407227579882504662611668120478101110676200296875*t^67 - 68104775192657864140551373597663604214839425188806646491913674801255579/17794778873703108162271118344372143625151271708409004371442203125*t^65 + 52765925516123595971918990589221508440292871818272544425863649231221385552/14292442849924269146696848233866171720746498685799413965608351328125*t^63 - 27629121979477929827879720058723118018931299406864712239858982553360466849884857872/8737859175471985369598285549050903143977819592128950308530320315860259921875*t^61 + 8686474194615485974001129023748901627778983533916477923194927927667797844812880091705692902/3603247476243159536416588743184385249223221785975463632217586932627032385544549609375*t^59 - 9310251155347245950428066925206531491115591204617286700291980731876359369965918221395533262/5679695174417183676046487340951658104707790272808781657563314995496847658570222265625*t^57 + 6908157159203240860394378856695401133196213008578802609000696825577460808979823695005808226853951353564/6940180404482921125781151589589535488468616252614107753751010075984849932372993018849956833984375*t^55 - 158919574964018397015090953426339506642540378443285083206433649952581127733794277854942628311693583022618028/294190083237788336769187547191746655634891561778560459216853066514952197723331750273238360218497265625*t^53 + 5882914246806977346456731224450168211002501845118623744321545962180112382817201633644924140177880347255465407975469138/22447331372352059613827475818476678523878443413822159946389068560420835355209082907517396712377483595956669921875*t^51 - 9475600270796876516178751618303339120189470019867804018814391770962456356748066840456943510704161675204920103286781160226/83381272598230324025550800912314518749844239191331054949095912493229087657375762256529473540970644507875049150390625*t^49 + 24600541144461603544769382010931941685376577200865714801855913021046701876603796314750757592183540848364719521186912194933885208/558924741289413293099836026100892397746505004948497403156302648101050444712061545571145954311257163784285850091899560546875*t^47 - 53590569508535524226675917800756087159566281899969531845665168512719800281471574477192915701797648638572176336357649195210373832/3523631929128359607810495204627149945417229227139438601491564591516815297415327141079648987570374826212561116289407373046875*t^45 + 1432908122625103464215251074994123088299743736330731777052668291690669213201761491744766973045117251116276676871321997141186202/306093278691958511385558169290843328591799710640395676493206621081258702603755691043282639324295186923515410101908115234375*t^43 - 776506289158782397077163912415120567149730222403428165426460390819825626818360005089366090621719730952881679781566094312898/606260193692763046919209459594637949141430382708250032444539652302926995253905786199002000664565964975917914745072265625*t^41 + 417677786706039857524900742559502325619215923769893659965563059706200026891215238138942998506926084712406624043968940234505868/1344345012428720790503900683391378271858369347412696382919398109490746531061191330543469924156561334287453102903615732421875*t^39 - 133529581160190172089821428738545516004633393427169809843570020851690088710874259944690639854417882486738468838264536249159188/2004725018534057319172483475232757072069498149650512149967523496609007984915811633266577957075573919551465153452760302734375*t^37 + 227063707717037612948184465890778590854759445264955901194050133993821841950054377027200956021018823155013834909250290537562/18060585752559074947499851128223036685310794140995604954662373843324396260502807506906107721401566842805992373448291015625*t^35 - 2971233332983853044174475060131046345969445110383927772460633528851402796157324085226231288850180393196586426695910366481202/1428486094287701892612252931000511478062876105998981789531707521749057835992474998457997202482149810402172785019916005859375*t^33 + 451443068843668465177321299588875630269556494834865766101463530385637192155308747976379175991391339655335101500956217408176/1504672019316379326884906420653872090226229498318927484973398589575674253912073665042423719947864466956955333554311526171875*t^31 - 1501595035731702967178315516016669953906186870647303510042830697807238106927467482583107224307660430807893345426439174695792/40043690836645578860646703130304660465698043100423070164614639883868750305724541085806437708289941459338327425235709970703125*t^29 + 417501177291533418255513299892122078456951669890674158539780026160749641965559997796661673533204421925493710082228415369071/103561269405117876363741473612856880514736318363163112494693034182419181825149675221913200969715365843116364030782008544921875*t^27 - 103490278469858498231504568992509559129645209854905185770201636694317550592795254513203976526771627835016457098835495969191/279998987650874258316782502731057491762064860759663230078244129456170380490219492266654210029230433575833132379521726806640625*t^25 + 523155488850162226936314342142317105388621178102857483588629187439265208051013414395770214583183912155162982276388631675706/18289533873355106553252233078392675361898076704821202188710906536077049253621137234857852999109331921173420207030359195009765625*t^23 - 4213955425188556854418961304491522883463339878533581669289369147099145536018754544907171624599375450641314098972935086/2282862559603300173070800883510631416088796759495053320829320557862747982561406769485065903778988798149376352032081447265625*t^21 + 484234888743206539778597442309070953885153720064319079386753036700291282803240262596252324105707863600874884040608479/4947368127979232414571211312068494710046030430434461827401642952262986349677682699275602477886708784549125121104595986328125*t^19 - 30248304687410712084543012848829789044103725269187484864279145255763717683362782421868757582651459368143710670502205939/7222723487189330269799006128662803285903165302957960367846100320571305422604006417898583512234078447478165736012613245654296875*t^17 + 69910697134016200322307161025436731721950675776289413016758290364134491957227927065951311339330914535355285742804/494477536187188386123573190208238409666201289558284535418222156267955886562828958862987894585517423626044923012250927734375*t^15 - 360413862123412205071378539417548148238578437314387115155993787281483469803303088350960031946079197871011570696651332/98483959078263926855259389448472811863079630425038541956866238488731093938800511039346568125638787301496401035748455902509765625*t^13 + 731657797304890348004552280104634209695944693596816304694835184051614560898182042819768026553986041143550504484727849/10458996454111629032028547159427812619859056751139093155819194527503242176300614272378605534942839211418917789996486016846537109375*t^11 - 2796914790691802763542603212903796939749131687813953537425163919416713848625869194499595615477139266697330237657601671/2980813989421814274128135940436926596659831174074641549408470440338424020245675067627902577458709175254391570148998514801263076171875*t^9 + 149476866268828049263390954565104373595699689569157901826917690887870800253208682079392766892603718035428666798965258/18216085490911087230783052969336773646254523841567253913051763802068146790390236524392737973358778293221281817577213146007718798828125*t^7 - 40297348773181015911961265991409918828479240007381800424663754274182816760370965681306449917033484785962095984845366/965452531018287623231501807374849003251489763603064457391743481509611779890682535792815112588015249540727936331592296738409096337890625*t^5 + 52298332221726676151734237206249978728884710441618658274367537293620578815902673517742823463993425511427063263173/518295569283501776682174654485445254377115557302697761336620184810423166046576940267721797284092397121864471083275864564830146455078125*t^3 - 1679877882569839598468701660516990295765275669455339586208793843331208893618072588554644477225822049724752861169/22977770238235245432909743015521406277385456373752934085923494859928760361398244351868999679594762939069324884691896662374136492841796875*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:
| (-0.99860364518193663816 - 3.6568913318599397401e-1799j)  +/-  (1.34e-477, 1.34e-477j)
| (-0.95719162401328142633 + 5.0155814878640673806e-1801j)  +/-  (4.82e-478, 4.82e-478j)
| (-0.94664169099562906178 - 1.5689316394256561665e-1802j)  +/-  (2.7e-478, 2.7e-478j)
| (-0.99976825819812844184 - 1.4837715679074217639e-1800j)  +/-  (4.97e-478, 4.97e-478j)
| (0.90826680768346396974 - 3.8654423591658574208e-1800j)  +/-  (2.75e-479, 2.75e-479j)
| (0.95719162401328142633 + 3.3559185566118470497e-1810j)  +/-  (4.87e-478, 4.87e-478j)
| (0.9221639367190003881 - 9.995841888015553863e-1824j)  +/-  (6.28e-479, 6.28e-479j)
| (-0.90826680768346396974 - 2.8778867252092892405e-1844j)  +/-  (2.65e-479, 2.65e-479j)
| (-0.9221639367190003881 + 4.4046823452733003425e-1844j)  +/-  (6.43e-479, 6.43e-479j)
| (0.99623648400262042935 + 4.6893317823397605327e-1840j)  +/-  (1.72e-477, 1.72e-477j)
| (0.87725158719302201213 - 2.5782115311484535509e-1864j)  +/-  (3.77e-480, 3.77e-480j)
| (0.98196871503454056824 - 6.6170657538138937707e-1875j)  +/-  (1.62e-477, 1.62e-477j)
| (-0.87725158719302201213 + 4.9012456832323044924e-1904j)  +/-  (3.76e-480, 3.76e-480j)
| (-0.89329167175324173846 - 1.9813102851023027628e-1903j)  +/-  (1.11e-479, 1.11e-479j)
| (0.99860364518193663816 - 3.4872200019046587254e-1899j)  +/-  (1.26e-477, 1.26e-477j)
| (0.82293422050208633704 - 3.6675983194341310227e-1919j)  +/-  (1.08e-481, 1.08e-481j)
| (0.89329167175324173846 - 3.4091251669656073547e-1915j)  +/-  (1.1e-479, 1.1e-479j)
| (-0.99264999844720374175 + 9.1835950842519214819e-1920j)  +/-  (1.96e-477, 1.96e-477j)
| (-0.80283895116683677465 + 2.9865914089614751332e-1932j)  +/-  (2.77e-482, 2.77e-482j)
| (-0.68852168077120052523 + 7.1474523618977494288e-1936j)  +/-  (8.3e-486, 8.3e-486j)
| (0.97487472859984626283 - 7.6124276038054615292e-1925j)  +/-  (1.2e-477, 1.2e-477j)
| (0.80283895116683677465 + 7.206401124811772591e-1949j)  +/-  (2.91e-482, 2.91e-482j)
| (0.99264999844720374175 + 6.5637105335356266412e-1943j)  +/-  (2.07e-477, 2.07e-477j)
| (-0.84204857691040695823 - 7.1188844256705741241e-1969j)  +/-  (4.09e-481, 4.09e-481j)
| (-0.78178431259390629131 + 2.6945607291596466252e-1970j)  +/-  (6.97e-483, 6.97e-483j)
| (0.98788929755834198036 + 1.970803413333358169e-1962j)  +/-  (1.99e-477, 1.99e-477j)
| (0.68852168077120052523 + 2.1696817528504424309e-1984j)  +/-  (8.21e-486, 8.21e-486j)
| (0.9349627017082307285 - 2.6561326666392374336e-1975j)  +/-  (1.37e-478, 1.37e-478j)
| (0.84204857691040695823 - 2.8101207035314788806e-1991j)  +/-  (3.92e-481, 3.92e-481j)
| (-0.63685339445322335927 + 1.8257597853271709963e-1997j)  +/-  (1.87e-487, 1.87e-487j)
| (0.86016247596066422534 - 3.3661580795337181075e-1988j)  +/-  (1.26e-480, 1.26e-480j)
| (0.99976825819812844184 + 3.0175387776513628568e-1985j)  +/-  (4.74e-478, 4.74e-478j)
| (0.71314122427549174186 - 5.0125595115053350376e-2010j)  +/-  (5.21e-485, 5.21e-485j)
| (-0.98788929755834198036 - 6.9282145718903195684e-2001j)  +/-  (1.95e-477, 1.95e-477j)
| (-0.71314122427549174186 + 2.2174286675262744849e-2010j)  +/-  (4.92e-485, 4.92e-485j)
| (-0.73690884894549035262 + 4.0999278453114113757e-2009j)  +/-  (2.74e-484, 2.74e-484j)
| (-0.98196871503454056824 + 2.7451378101624993442e-2001j)  +/-  (1.65e-477, 1.65e-477j)
| (0.60986605449389570894 - 2.510358350047190268e-2015j)  +/-  (2.3e-488, 2.3e-488j)
| (0.96660831039689460474 + 4.3629096417938106411e-2004j)  +/-  (8.05e-478, 8.05e-478j)
| (-0.99623648400262042935 - 1.6011325502132441195e-2015j)  +/-  (1.85e-477, 1.85e-477j)
| (-0.55374067215934876332 + 3.2083918679061015852e-2031j)  +/-  (2.94e-490, 2.94e-490j)
| (-0.46469512391963509858 - 1.2014049399877933495e-2034j)  +/-  (2.57e-493, 2.57e-493j)
| (0.66308170860223379808 - 1.7637600203269182621e-2028j)  +/-  (1.24e-486, 1.24e-486j)
| (0.63685339445322335927 + 1.1857485305965580539e-2029j)  +/-  (1.86e-487, 1.86e-487j)
| (-0.86016247596066422534 - 2.1311556202486315741e-2021j)  +/-  (1.29e-480, 1.29e-480j)
| (-0.58215021256935318668 - 2.5750639814793098026e-2030j)  +/-  (2.6e-489, 2.6e-489j)
| (-0.82293422050208633704 + 3.0273732189110425631e-2022j)  +/-  (1.11e-481, 1.11e-481j)
| (0.94664169099562906178 - 2.2884623798156518054e-2019j)  +/-  (2.76e-478, 2.76e-478j)
| (0.49497965749810183703 - 1.0658165420729759218e-2041j)  +/-  (2.95e-492, 2.95e-492j)
| (0.75979816452041089332 + 8.6272908597219627775e-2034j)  +/-  (1.5e-483, 1.5e-483j)
| (-0.9349627017082307285 - 1.4006656772022497556e-2025j)  +/-  (1.4e-478, 1.4e-478j)
| (-0.49497965749810183703 + 3.5084776763297677335e-2043j)  +/-  (2.85e-492, 2.85e-492j)
| (0.73690884894549035262 - 1.9936508032374628471e-2033j)  +/-  (2.64e-484, 2.64e-484j)
| (0.20564748978326374572 - 2.4748147587870761348e-2052j)  +/-  (5.16e-503, 5.16e-503j)
| (0.58215021256935318668 - 1.9231362507826534546e-2038j)  +/-  (2.67e-489, 2.67e-489j)
| (-0.97487472859984626283 + 9.0632408519421111741e-2025j)  +/-  (1.2e-477, 1.2e-477j)
| (-0.52467282046291606709 - 1.2753448282913519963e-2042j)  +/-  (3.33e-491, 3.33e-491j)
| (-0.60986605449389570894 + 6.0695735787839964238e-2040j)  +/-  (2.23e-488, 2.23e-488j)
| (0.10337830283214540467 + 1.3198088577088669497e-2059j)  +/-  (5.62e-507, 5.62e-507j)
| (0.43385684374178294432 - 3.585623163001327234e-2047j)  +/-  (1.97e-494, 1.97e-494j)
| (-0.75979816452041089332 - 5.801291753322545667e-2035j)  +/-  (1.39e-483, 1.39e-483j)
| (-0.66308170860223379808 - 5.5151994207823676085e-2038j)  +/-  (1.3e-486, 1.3e-486j)
| (-0.40250294385854191408 - 1.2730376066210909957e-2047j)  +/-  (1.43e-495, 1.43e-495j)
| (0.17174806594978090965 + 5.8861371070810167846e-2057j)  +/-  (2.82e-504, 2.82e-504j)
| (0.46469512391963509858 + 2.7683143139879746346e-2046j)  +/-  (2.59e-493, 2.59e-493j)
| (0.52467282046291606709 + 9.9061693436037486938e-2044j)  +/-  (3.06e-491, 3.06e-491j)
| (0.78178431259390629131 + 4.2213162657548324748e-2036j)  +/-  (6.63e-483, 6.63e-483j)
| (-0.37066934235973061895 + 1.4793363833708549737e-2048j)  +/-  (9.83e-497, 9.83e-497j)
| (-0.06898698016314417249 + 2.1431924587052269071e-2060j)  +/-  (2.47e-508, 2.47e-508j)
| (0.55374067215934876332 - 5.8056618374860892335e-2043j)  +/-  (2.94e-490, 2.94e-490j)
| (0.37066934235973061895 - 1.4189107975994224362e-2050j)  +/-  (1e-496, 1e-496j)
| (0.06898698016314417249 - 1.547730180583315874e-2060j)  +/-  (2.47e-508, 2.47e-508j)
| (-0.43385684374178294432 + 1.9379256808075010522e-2046j)  +/-  (1.94e-494, 1.94e-494j)
| (-0.33839265425060216164 + 2.6828805408406558836e-2050j)  +/-  (5.76e-498, 5.76e-498j)
| (-0.96660831039689460474 - 4.3147006888084723951e-2056j)  +/-  (7.61e-478, 7.61e-478j)
| (0.33839265425060216164 + 3.353043275254136623e-2079j)  +/-  (5.7e-498, 5.7e-498j)
| (0.23930185320471224179 + 2.5449774767376461458e-2082j)  +/-  (9.21e-502, 9.21e-502j)
| (-0.10337830283214540467 - 6.6167435845026773141e-2088j)  +/-  (5.84e-507, 5.84e-507j)
| (-0.30571272186623304326 - 2.439721328954141785e-2080j)  +/-  (3.35e-499, 3.35e-499j)
| (-0.13764520598325302876 + 1.6013659497888370112e-2086j)  +/-  (1.27e-505, 1.27e-505j)
| (0.40250294385854191408 + 6.9372211929796943836e-2077j)  +/-  (1.32e-495, 1.32e-495j)
| (0.30571272186623304326 + 1.5280827338978768287e-2079j)  +/-  (3.52e-499, 3.52e-499j)
| (2.9496160130520902253e-2146 - 2.2124098463231856754e-2145j)  +/-  (2.03e-2143, 2.03e-2143j)
| (-0.23930185320471224179 - 2.2817000102723283227e-2082j)  +/-  (9.59e-502, 9.59e-502j)
| (-0.20564748978326374572 + 9.0120755438093457422e-2084j)  +/-  (4.68e-503, 4.68e-503j)
| (0.034513448751777669495 - 1.074592866195044345e-2092j)  +/-  (1.05e-509, 1.05e-509j)
| (0.27266976975237756061 - 3.7798624290676345313e-2081j)  +/-  (1.85e-500, 1.85e-500j)
| (0.13764520598325302876 - 1.4099205015613707932e-2086j)  +/-  (1.28e-505, 1.28e-505j)
| (-0.17174806594978090965 - 2.1508132262473264115e-2085j)  +/-  (2.73e-504, 2.73e-504j)
| (-0.27266976975237756061 + 3.2128417564382016435e-2081j)  +/-  (1.94e-500, 1.94e-500j)
| (-0.034513448751777669495 + 1.0032209514552082543e-2092j)  +/-  (1.17e-509, 1.17e-509j)
-------------------------------------------------
The weights are:
| (0.0017490965174853528129 - 8.4765102502762849625e-1800j)  +/-  (1.44e-120, 1.62e-351j)
| (0.0099846967209594327231 + 8.0980473562507754906e-1800j)  +/-  (5.67e-121, 6.38e-352j)
| (0.011114900084471905081 - 7.7108053167281826744e-1800j)  +/-  (4.63e-121, 5.21e-352j)
| (0.00062429185718321579858 - 2.0282072283092858733e-1799j)  +/-  (3.56e-121, 4.01e-352j)
| (0.014438762165928273765 + 4.0399991099252711846e-1801j)  +/-  (1.11e-122, 1.25e-353j)
| (0.0099846967209594327231 - 6.1565080375623829221e-1801j)  +/-  (2.21e-123, 2.49e-354j)
| (0.013351970068858539986 + 3.4759349991945130386e-1800j)  +/-  (8.66e-123, 9.74e-354j)
| (0.014438762165928273765 + 5.5261399484357435788e-1800j)  +/-  (1.16e-122, 1.3e-353j)
| (0.013351970068858539986 - 6.0624770898272995839e-1800j)  +/-  (2.21e-122, 2.49e-353j)
| (0.00298417191546646642 - 8.0369530056222231797e-1802j)  +/-  (9.4e-126, 1.06e-356j)
| (0.016568054970638997573 + 2.364567127710483617e-1800j)  +/-  (6.99e-125, 7.86e-356j)
| (0.006505054713816962459 + 2.3047216733791745552e-1801j)  +/-  (1.54e-125, 1.74e-356j)
| (0.016568054970638997573 + 4.7056127864189228542e-1800j)  +/-  (1.22e-124, 1.38e-355j)
| (0.015509579891057820851 - 5.0829731464996759916e-1800j)  +/-  (4.9e-124, 5.51e-355j)
| (0.0017490965174853528129 + 4.7307294971275278692e-1802j)  +/-  (3.13e-126, 3.52e-357j)
| (0.019607914513681521187 - 1.2537390273522136547e-1800j)  +/-  (2.1e-127, 2.36e-358j)
| (0.015509579891057820851 - 4.2832681010429489585e-1800j)  +/-  (2.17e-125, 2.44e-356j)
| (0.0041798425326650940223 - 2.3361873193212348964e-1799j)  +/-  (9.41e-127, 1.06e-357j)
| (0.020579131317433792232 + 3.6276402551650965698e-1800j)  +/-  (2.86e-128, 3.22e-359j)
| (0.025035285477274227456 - 2.805639158805630707e-1800j)  +/-  (3.9e-130, 4.39e-361j)
| (0.0076828331843214920939 - 3.1376622753916699197e-1801j)  +/-  (1.85e-126, 2.09e-357j)
| (0.020579131317433792232 + 1.1421366361776466973e-1800j)  +/-  (5.04e-129, 5.67e-360j)
| (0.0041798425326650940223 + 1.1919941238880077673e-1801j)  +/-  (1.14e-126, 1.29e-357j)
| (0.018617706025624844797 + 4.0983271377064474018e-1800j)  +/-  (4.65e-129, 5.23e-360j)
| (0.021525361049768482006 - 3.4289295878238883626e-1800j)  +/-  (5.82e-130, 6.54e-361j)
| (0.0053393274180809112316 - 1.6801227359779548921e-1801j)  +/-  (9.93e-127, 1.12e-357j)
| (0.025035285477274227456 - 9.4378430415554021154e-1801j)  +/-  (2.19e-133, 2.47e-364j)
| (0.012241673811402288111 - 1.5577224731099561118e-1800j)  +/-  (4.45e-128, 5e-359j)
| (0.018617706025624844797 + 1.4299946672179054484e-1800j)  +/-  (5.67e-130, 6.38e-361j)
| (0.026612605704540351681 - 2.5673583109092666601e-1800j)  +/-  (4.69e-136, 5.28e-367j)
| (0.017605928233491798926 - 1.7356061279413109927e-1800j)  +/-  (1.55e-129, 1.74e-360j)
| (0.00062429185718321579858 - 1.5773349892807319453e-1802j)  +/-  (3.48e-128, 3.91e-359j)
| (0.024198444172321291133 + 9.5905335960557135745e-1801j)  +/-  (2.36e-134, 2.65e-365j)
| (0.0053393274180809112316 + 1.6638705569983244831e-1799j)  +/-  (1.95e-134, 2.19e-365j)
| (0.024198444172321291133 + 2.9408887147702857772e-1800j)  +/-  (4.4e-136, 4.95e-367j)
| (0.023332489150752030013 - 3.0886845820913653768e-1800j)  +/-  (6.29e-136, 7.07e-367j)
| (0.006505054713816962459 - 1.3019765669989022113e-1799j)  +/-  (4.49e-135, 5.06e-366j)
| (0.02735705869931106757 + 9.3150860596503548848e-1801j)  +/-  (3.29e-140, 3.7e-371j)
| (0.0088456967773005162411 + 4.3267388526166947478e-1801j)  +/-  (3.65e-132, 4.11e-363j)
| (0.00298417191546646642 + 4.2690020884743068518e-1799j)  +/-  (2.81e-134, 3.16e-365j)
| (0.028744378351913464777 + 2.2712666671005330479e-1800j)  +/-  (1.61e-141, 1.81e-372j)
| (0.030567891994471739722 - 2.0304968417471283579e-1800j)  +/-  (7.45e-143, 8.38e-374j)
| (0.025839233289975131159 + 9.350099666469835069e-1801j)  +/-  (2.18e-139, 2.45e-370j)
| (0.026612605704540351681 - 9.312677487838907381e-1801j)  +/-  (4.65e-140, 5.23e-371j)
| (0.017605928233491798926 - 4.3805950487300148382e-1800j)  +/-  (2.65e-137, 2.98e-368j)
| (0.02806873537773934427 - 2.3627751006146782983e-1800j)  +/-  (4.53e-142, 5.1e-373j)
| (0.019607914513681521187 - 3.8495731068940320885e-1800j)  +/-  (9.41e-138, 1.06e-368j)
| (0.011114900084471905081 + 9.2655190480400670878e-1801j)  +/-  (9.95e-135, 1.12e-365j)
| (0.029994827990452852922 + 9.6201177849796020099e-1801j)  +/-  (1.97e-145, 2.21e-376j)
| (0.022442120993116343723 + 1.0173474150084234443e-1800j)  +/-  (1.58e-139, 1.77e-370j)
| (0.012241673811402288111 + 6.7481998378758255223e-1800j)  +/-  (2.79e-138, 3.14e-369j)
| (0.029994827990452852922 + 2.105681888591107269e-1800j)  +/-  (4.96e-145, 5.58e-376j)
| (0.023332489150752030013 - 9.8265020085806100416e-1801j)  +/-  (6.57e-140, 7.39e-371j)
| (0.033783960627018866959 - 1.1378805546884017387e-1800j)  +/-  (1.93e-150, 2.17e-381j)
| (0.02806873537773934427 - 9.3514047268613785406e-1801j)  +/-  (7.3e-144, 8.21e-375j)
| (0.0076828331843214920939 + 1.0630304166234567817e-1799j)  +/-  (8.71e-140, 9.79e-371j)
| (0.029385905838167421073 - 2.18582707126421904e-1800j)  +/-  (5.22e-145, 5.87e-376j)
| (0.02735705869931106757 + 2.4612736401047048516e-1800j)  +/-  (9.37e-144, 1.05e-374j)
| (0.034335936273322179003 + 1.22239924253076414e-1800j)  +/-  (1.74e-152, 1.96e-383j)
| (0.03110225031086367085 + 9.9021776614800441147e-1801j)  +/-  (7.95e-150, 8.95e-381j)
| (0.022442120993116343723 + 3.2504490008756273445e-1800j)  +/-  (3.47e-142, 3.91e-373j)
| (0.025839233289975131159 + 2.6816895012988596193e-1800j)  +/-  (2.42e-143, 2.73e-374j)
| (0.031599633541729714553 - 1.8935307000440985984e-1800j)  +/-  (5.81e-150, 6.54e-381j)
| (0.034007891275067314481 + 1.1646557108101543422e-1800j)  +/-  (7.56e-153, 8.5e-384j)
| (0.030567891994471739722 - 9.7517940694887855057e-1801j)  +/-  (5.25e-150, 5.9e-381j)
| (0.029385905838167421073 - 9.5081504860617369305e-1801j)  +/-  (3.04e-149, 3.42e-380j)
| (0.021525361049768482006 - 1.0678834762476811431e-1800j)  +/-  (1.97e-145, 2.22e-376j)
| (0.032061527034868518929 + 1.830717172469794027e-1800j)  +/-  (8.9e-153, 1e-383j)
| (0.034439614252685771597 - 1.3936675954534550078e-1800j)  +/-  (1.5e-156, 1.69e-387j)
| (0.028744378351913464777 + 9.4173426356929261598e-1801j)  +/-  (5.01e-149, 5.64e-380j)
| (0.032061527034868518929 + 1.0251223293998396828e-1800j)  +/-  (1.79e-153, 2.01e-384j)
| (0.034439614252685771597 - 1.2534361646576561659e-1800j)  +/-  (5.52e-156, 6.21e-387j)
| (0.03110225031086367085 + 1.9599648042537095273e-1800j)  +/-  (1.61e-152, 1.82e-383j)
| (0.032485140588613364324 - 1.7713492197021203228e-1800j)  +/-  (4.65e-155, 5.23e-386j)
| (0.0088456967773005162411 - 8.774954002189292042e-1800j)  +/-  (9.1e-149, 1.02e-379j)
| (0.032485140588613364324 - 1.0448168613107285846e-1800j)  +/-  (3.6e-155, 4.05e-386j)
| (0.033517805610850078063 + 1.1125633993339585605e-1800j)  +/-  (4.49e-156, 5.05e-387j)
| (0.034335936273322179003 + 1.4331365002910637851e-1800j)  +/-  (1.45e-158, 1.63e-389j)
| (0.032867959995471594696 + 1.7152648040156732415e-1800j)  +/-  (2.66e-157, 2.99e-388j)
| (0.034191322586924112015 - 1.4745488179348039227e-1800j)  +/-  (5.91e-159, 6.65e-390j)
| (0.031599633541729714553 - 1.0069214643773555281e-1800j)  +/-  (9.16e-156, 1.03e-386j)
| (0.032867959995471594696 + 1.0660199969217589328e-1800j)  +/-  (3.7e-157, 4.16e-388j)
| (0.034519959991185894724 - 1.3202985649390444231e-1800j)  +/-  (8.69e-160, 9.77e-391j)
| (0.033517805610850078063 + 1.6115551235816295944e-1800j)  +/-  (4.86e-160, 5.47e-391j)
| (0.033783960627018866959 - 1.5635271156814349255e-1800j)  +/-  (2.75e-160, 3.09e-391j)
| (0.034500341752513025429 + 1.2860722450875909283e-1800j)  +/-  (2.67e-160, 3e-391j)
| (0.033211665344805867921 - 1.0886303660941121396e-1800j)  +/-  (1.52e-159, 1.71e-390j)
| (0.034191322586924112015 - 1.1928413935346332275e-1800j)  +/-  (4.02e-160, 4.53e-391j)
| (0.034007891275067314481 + 1.5179399087419353311e-1800j)  +/-  (3.18e-161, 3.58e-392j)
| (0.033211665344805867921 - 1.6621049098293985232e-1800j)  +/-  (3.08e-161, 3.49e-392j)
| (0.034500341752513025429 + 1.3561123070267559136e-1800j)  +/-  (3.15e-161, 3.52e-392j)
