Starting with polynomial:
P : t
Extension levels are: 1 46 48
-------------------------------------------------
Trying to find an order 46 Kronrod extension for:
P1 : t
Solvable: 1
-------------------------------------------------
Trying to find an order 48 Kronrod extension for:
P2 : t^47 - 1081/93*t^45 + 178365/2821*t^43 - 7669695/35867*t^41 + 524095825/1040143*t^39 - 1194938481/1360187*t^37 + 132638171391/112895521*t^35 - 73687872995/59768217*t^33 + 1621133205890/1573896381*t^31 - 736878729950/1066187871*t^29 + 29475149198/78782355*t^27 - 34834267234/213004145*t^25 + 174171336170/3024658859*t^23 - 147375745990/9073976577*t^21 + 736878729950/202652143553*t^19 - 1680083504286/2634477866189*t^17 + 4760236595477/55324035189969*t^15 - 1400069586905/160703149837529*t^13 + 1400069586905/2188035193941741*t^11 - 213307000775/6564105581825223*t^9 + 775661821/729345064647247*t^7 - 775661821/38655288426304091*t^5 + 352573555/1971419709741508641*t^3 - 15329285/32199855259111307803*t
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : t^95 - 214225/9021*t^93 + 2571832685/9418409*t^91 - 49851667491655/24612052791*t^89 + 316859277940469960195/29085157051584183*t^87 - 2269197026630463657403/50116430489093331*t^85 + 1565637460700490533016756599045/10345471851708622721458157*t^83 - 1352027509018958132140339632957935/3234755963832543523458249219*t^81 + 1235446102134220363360740331211526700688705/1270053914646649915628197114401006423*t^79 - 197328010243518099678684499269563450558185026155/101932923910892979104087288972325928669881*t^77 + 196446440821376106884122570800538231327152767117753837/58964774448577437004558859454360764507920812495*t^75 - 12658076172327180750179910953204722302697129846911331085/2530482229517435341995644144220173172609619838043*t^73 + 636519665987922827388840417190218493602501013547847615555204664525/96462722692895980992165376445363763611050990546512663075591*t^71 - 276404332301593162826110810350894346116721414325467442643708855935/35941936368287747079027048073752695532414645645371555640201*t^69 + 334890388681134544296033298358754906243555860097212824843552759898712628435/42103914801249928637697981708400064206872836410120187564132981839317*t^67 - 1300220994437441270312540840109115727987949544917171933304345423823100629983/177462908065062453626298197980062235743175408479641169154963785287661*t^65 + 1207358219183905302748567816030741962709720828844335279749435267488334068048440295129630/200303446571222234251458211819391302713250645888399768739646185158257881841870339*t^63 - 29672958408374477147390787150518823893611197356305579137556247260001311676964200953454150/6685478973443873052975569236707273847649885226817715015111756334251700266943317883*t^61 + 3521599433472425094404610639251230814534136275422397363408535353984264758319295915622728349263980811910/1201992875922410478986087882544211446934109881816955903512265741211716587727451118677417778777371*t^59 - 8581564054954422272752059213440183984172315131003257217031073768332008531517252948564229966396663330/4944514876711121547404639089359289959964178844075347647362481880276070836271586145730602813421*t^57 + 4611660930710389766072717529147874482072467860347207954350128416352829528029766317786525835984448125988117350/4995179469756044894371061847638055487356390104766307102499869236080875884121678044635490415294471829739*t^55 - 4659070740796103120983489523109076020862815278275840212704803325075967123641142004971953933706181356867979333307117270/10563205012627977955909907326166700443048861514297373782191183730502706135232790750973769148211995167657401575191*t^53 + 3137553052263959168390471574555576832466094864802753514110472655397450194897280663254815477652498729722726789542443014148910/16582954917853927136915091959133818751252021746206837153628413194357902767443624186758223431769575917881758567919827571*t^51 - 480912014968735687744401014421875294894006808563595716743895454498724752743746690753659240577603775069045782946805892311973130/6603356295996981527705168106671769883531088039049717573237441803744752686491976204463647576909870470359222688495861320701*t^49 + 38068162552288408091700908000287305205881451767626241149910912168167589711776156917084607415227412358774280926072427792833886515094330/1514960816602324927991413294386354409753936913305623295776902333389921080654517532141410412252207196017906108226999714750390023307*t^47 - 21043923948787329798818559690335883714385021539837831580444724308929048965022535591307238586473109476475159023221164724757870825795182/2711793876156798090345406775797960946229295029830139757010458848389914237804339893333606982153580873538065050341576732693806378445*t^45 + 363594967056845814263874893108972709522346637242473641233612737673874641635383936860235517793411451758045285211038347935316273942350/169829515476486345051934565757044018854763931161079459529947927878964326003908154936044073629820216322585892041593694370723227741*t^43 - 871902712322691880021277159925875117762056450085705460329848082711681719622145205727338058705130962940312636153243080395995905894/1656251838855455728188409118410781879303774272388621885888464412923132961778549147913408069908224165186509074674207071882522101*t^41 + 38464495046576049889096441877979394466960101480187438008481088256703717426027641734322673536982704799004322066687662233067555177206/334360889517234318590621031050879063780422918355137154865824876725970037186367104811689721820252961347530136855571022779795986097*t^39 - 240693163779444678773673937910594868758659576000749451548480584328950915419724215919256770683237779347928938501865371335525129846/10809883830546037055884069008333882775509771050500532320076835479434928738466717992797103603999259619931297624093154582624396429*t^37 + 15200866408157907055108457748672107506219782289507384746397002715288231798669951180921021495252711733653378914979192830351982659926/3998196222189797759723607685920248264401384238543237427033824149623432426646406371119685481641347781047562377992292444951753111645*t^35 - 953779345481591078752372129979122653518373950663414027663428252330818827494585301040996370619261396265412720750647148415268825434/1673194721555058222136434140830490450144444832600447259380541534884428023924294430939162495678479995766122743058959359315943739159*t^33 + 3784419404102536557301785418722796424830820088309561911323879874971519847182693216188343903199485083344994240657202246124460467/50702870350153279458679822449408801519528631290922644223652773784376606785584679725429166535711515023215840698756344221695264823*t^31 - 36161614685556941558127940990128853490106549267173461226122599202827350745482207284024180853859588486915584090276560209790530671/4263947838801599985444461197600282114884230379852752693260089717931284319032879356264317327696771602113667635537348044708372754631*t^29 + 3294979792130496237387524928330640620817580917853299550854357472482273073716396948224592139418990951695375082565635858147464569/3969882470608386193344843183972676451788766215724976645449049047729126779789232504108157511993545974381690557224427489900898771553*t^27 - 560868947908341172666699441936784947652756193350797057223569719325612317197247327954987517047899339371348275760330749938965913/8086797625313379282739495374759155735125264513513841314803618430559332329200288434294394931838704762629369653605315257205534534645*t^25 + 578233020167570320644047653304348991866838168507241622196577938117515400710782484435097337580540809216046142082086143996598625/118067245329575337527996632471483673732828861897302083196132829086166252006324211140698166004845089534388796942637602755200804205817*t^23 - 4619559284570522288566916509583154043168410765765223026401722315507313416795035512347860335803021164073149177153874521345920365/16003478435126984386749361728634741594149803008079764185948549833406716521948127164616451410293093499615790567406605973454945370079377*t^21 + 10662621367223914051922652661278649533460594806894671963685735762917471719477561532250785549287251310799106275737109835501305/762070401672713542226160082315940075911895381337131627902311896828891262949910817362688162394909214267418598447933617783568827146637*t^19 - 475393329115914656947071822589494095272040715644185762055216300299031084680286173977321097891017312086751669383171297429243935/867998187505220724595596333757855746463648839342992924180733250488107148499948420976101816967801595050589783632196390655484894120019543*t^17 + 33705974842118620873573726670947978905119021507163179517400100526429738136601307550823029280341582395999609424424354089614475/1991289959570800485836956295091551418357782631433924943708740986413892870088116965768704168337897776880764797744450543268465345334162481*t^15 - 266390797168038791201476696848489440579422652547580065321565806213040937276706651512970436226736477816726871433028531012925/663763319856933495278985431697183806119260877144641647902913662137964290029372321922901389445965925626921599248150181089488448444720827*t^13 + 21897626601240938248530772658005993077850344373210042924460635194348111891526612517516779184245238537504883775802171975725/3114581731636380247078316256425247090251916423524856963236748722339678591676285510561306519707993958710939811856704695881445796548305419*t^11 - 298978207696214239174456853137451211066364581728042531392351850944857170328220394999611250374951654931715425930732373021575/3458035153497737450687952403611049337567877752773552553819128376903135876376588630953203320472157292521518902018721313709099773931314007477*t^9 + 161542089590095832571551612699620686574345074956875711123436248652583224261042153197969317175559839531961663965383013625/232955998967039180842495481258137181970889402417815876329022646563028401120732567439542130950442792234608010022258566190376800168601206103*t^7 - 13675731032894716229375416314742741634195170352808439245579347099856187043277285392327975915254399947988498321730773301/4226487409830567995285275159969060301471850586723230899112268016214943848904719437831692947243747801970745324689548272311121945916050453583*t^5 + 1001000957225182624438566346817671970299502827510039977390704813504286311116784770674900545227174673378548670012001685/139474084524408743844414080278978989948571069361866619670704844535093147013855741448445867259043677465034595714755092986267024215229664968239*t^3 - 199871174876993166680110069031697867316353289281256154085685476769447471224373385810199582310514829713341385730481895/41888716718830759401272362110453356647887511165013941441101688308706308486494674348349908800132784465332056912998112926875529605973976045461113*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 + 1.8279275152869561115e-1809j)  +/-  (1.5e-476, 1.5e-476j)
| (-0.94026996183611670263 - 3.302331174943542941e-1838j)  +/-  (5.17e-477, 5.17e-477j)
| (-0.9285026930123606482 + 2.2046297794857412864e-1841j)  +/-  (2.76e-477, 2.76e-477j)
| (0.99654654372457549586 + 2.6603417331860795875e-1844j)  +/-  (5.73e-476, 5.73e-476j)
| (0.9285026930123606482 - 5.4231989403867886833e-1863j)  +/-  (2.54e-477, 2.54e-477j)
| (0.94026996183611670263 + 7.1067734311457514178e-1873j)  +/-  (5.63e-477, 5.63e-477j)
| (0.99325521098776863469 - 2.99575259933003208e-1896j)  +/-  (6.44e-476, 6.44e-476j)
| (-0.88717536721268257481 - 7.1807389812441087347e-1929j)  +/-  (1.88e-478, 1.88e-478j)
| (0.99871872858421210918 + 2.0038544599496072597e-1925j)  +/-  (4.29e-476, 4.29e-476j)
| (0.96934678732656449715 - 5.4614108950242374846e-1934j)  +/-  (2.8e-476, 2.8e-476j)
| (0.85474402331765646346 - 3.5225292322810326305e-1942j)  +/-  (2.02e-479, 2.02e-479j)
| (0.96069721783614626601 - 1.9133822632393107107e-1937j)  +/-  (1.84e-476, 1.84e-476j)
| (-0.90194132943852535687 + 2.0748825202878638543e-1946j)  +/-  (4.93e-478, 4.93e-478j)
| (-0.87143601579689631694 + 9.8768175957187857213e-1948j)  +/-  (6.49e-479, 6.49e-479j)
| (-0.99325521098776863469 + 1.7534633314130548613e-1942j)  +/-  (6.53e-476, 6.53e-476j)
| (0.87143601579689631694 + 2.8259548455595526536e-1949j)  +/-  (6.61e-479, 6.61e-479j)
| (0.91572066787615558927 - 5.3672015182362331431e-1946j)  +/-  (1.17e-477, 1.17e-477j)
| (-0.95100396925770844259 - 6.4612541410478157071e-1947j)  +/-  (9.9e-477, 9.9e-477j)
| (-0.77883311442837052294 + 3.9521467370828016849e-1952j)  +/-  (8.97e-482, 8.97e-482j)
| (-0.99871872858421210918 - 2.2648175339122590243e-1945j)  +/-  (4.25e-476, 4.25e-476j)
| (0.90194132943852535687 - 1.0384711159992465014e-1947j)  +/-  (5.03e-478, 5.03e-478j)
| (0.77883311442837052294 + 5.817377044213625791e-1952j)  +/-  (9.17e-482, 9.17e-482j)
| (-0.99654654372457549586 - 2.0128867767418252437e-1945j)  +/-  (6.32e-476, 6.32e-476j)
| (-0.81858068744931895656 + 4.5029390217469407635e-1951j)  +/-  (1.63e-480, 1.63e-480j)
| (-0.83712013989990212128 - 2.5017380613804728836e-1951j)  +/-  (5.9e-480, 5.9e-480j)
| (-0.98345100307162370876 - 1.5619467156391025709e-1945j)  +/-  (5.45e-476, 5.45e-476j)
| (0.75767291844543863357 - 1.120522373958073673e-1952j)  +/-  (2.04e-482, 2.04e-482j)
| (0.88717536721268257481 + 6.3045052694032096434e-1948j)  +/-  (1.81e-478, 1.81e-478j)
| (-0.32468148633773590221 - 9.0525499630658714202e-1969j)  +/-  (6.57e-498, 6.57e-498j)
| (-0.63993387448923818574 + 8.6421137749344336519e-1958j)  +/-  (2.46e-486, 2.46e-486j)
| (-0.97693791170018278869 - 4.0225743085623159089e-1948j)  +/-  (4.12e-476, 4.12e-476j)
| (0.83712013989990212128 - 1.4093688964178508279e-1950j)  +/-  (6.14e-480, 6.14e-480j)
| (0.6893143955276334509 + 5.6436128786189309959e-1955j)  +/-  (1.07e-484, 1.07e-484j)
| (0.98888579267420554154 + 4.0935965665026591154e-1944j)  +/-  (6.46e-476, 6.46e-476j)
| (-0.71288897340906430166 + 2.960414774747518623e-1966j)  +/-  (7.17e-484, 7.17e-484j)
| (-0.79914375416774194292 + 1.2034862236542783297e-1963j)  +/-  (3.9e-481, 3.9e-481j)
| (-0.96069721783614626601 + 7.1535229552027930097e-1957j)  +/-  (1.73e-476, 1.73e-476j)
| (0.6141786999563736086 - 1.7977606757750607401e-1970j)  +/-  (3.19e-487, 3.19e-487j)
| (0.81858068744931895656 + 1.6373315022438716401e-1964j)  +/-  (1.65e-480, 1.65e-480j)
| (-0.96934678732656449715 - 4.9050032647450297146e-1957j)  +/-  (2.83e-476, 2.83e-476j)
| (-0.6141786999563736086 + 1.4708370455770887269e-1970j)  +/-  (3.3e-487, 3.3e-487j)
| (-0.99978736333537280518 - 1.2304804067036438004e-1958j)  +/-  (1.46e-476, 1.46e-476j)
| (0.71288897340906430166 + 3.3263410279149863757e-1967j)  +/-  (6.38e-484, 6.38e-484j)
| (0.63993387448923818574 + 2.3065537157091998152e-1970j)  +/-  (2.41e-486, 2.41e-486j)
| (-0.98888579267420554154 + 6.8304269504020577956e-1960j)  +/-  (6.21e-476, 6.21e-476j)
| (-0.58775198710385153495 + 2.4745696054958849687e-1972j)  +/-  (4.09e-488, 4.09e-488j)
| (-0.75767291844543863357 - 8.5540047772906174979e-1967j)  +/-  (1.97e-482, 1.97e-482j)
| (0.95100396925770844259 + 1.3420778773946439244e-1958j)  +/-  (1.01e-476, 1.01e-476j)
| (0.50473758386357791977 - 5.3606211167226110574e-1988j)  +/-  (4.19e-491, 4.19e-491j)
| (0.73568410640186074833 + 2.6477555209736770306e-1980j)  +/-  (3.71e-483, 3.71e-483j)
| (-0.73568410640186074833 + 4.6890690793403548604e-1981j)  +/-  (3.63e-483, 3.63e-483j)
| (-0.50473758386357791977 - 1.3043651685455493275e-1988j)  +/-  (4.33e-491, 4.33e-491j)
| (0.98345100307162370876 + 6.8626920250970166598e-1973j)  +/-  (5.3e-476, 5.3e-476j)
| (0.56068400593466419448 - 9.4574054069973175121e-2012j)  +/-  (4.38e-489, 4.38e-489j)
| (0.58775198710385153495 + 6.2212435052680655804e-2011j)  +/-  (3.9e-488, 3.9e-488j)
| (-0.85474402331765646346 - 2.810665738501308965e-2001j)  +/-  (2.08e-479, 2.08e-479j)
| (-0.47592040311330105571 - 2.8792069551904149459e-2015j)  +/-  (3.99e-492, 3.99e-492j)
| (-0.6893143955276334509 - 2.8973169318152054631e-2007j)  +/-  (1.21e-484, 1.21e-484j)
| (0.79914375416774194292 + 2.7410584349037093406e-2004j)  +/-  (4.08e-481, 4.08e-481j)
| (0.38647776408466713958 - 4.2754338881410440409e-2018j)  +/-  (1.53e-495, 1.53e-495j)
| (0.13188486655451489705 - 2.9492603113908972328e-2028j)  +/-  (1.16e-505, 1.16e-505j)
| (-0.66498774739033272914 - 2.8783519702098772654e-2008j)  +/-  (1.72e-485, 1.72e-485j)
| (-0.56068400593466419448 + 1.9225568622729607927e-2012j)  +/-  (4.11e-489, 4.11e-489j)
| (-0.16458600672290529437 + 1.0205629602961548638e-2027j)  +/-  (2.71e-504, 2.71e-504j)
| (0.47592040311330105571 + 1.5832148432013466593e-2014j)  +/-  (3.73e-492, 3.73e-492j)
| (0.53300287901740309636 + 2.6729672350522872572e-2013j)  +/-  (4.79e-490, 4.79e-490j)
| (-0.44658407310485570273 + 1.4689094538993569874e-2015j)  +/-  (2.99e-493, 2.99e-493j)
| (-0.38647776408466713958 + 2.5195656871948482558e-2018j)  +/-  (1.49e-495, 1.49e-495j)
| (-0.91572066787615558927 + 1.712560724658801422e-2008j)  +/-  (1.25e-477, 1.25e-477j)
| (0.66498774739033272914 - 3.9419303691250644524e-2032j)  +/-  (1.71e-485, 1.71e-485j)
| (0.35577356508888427243 + 3.6974247807393672463e-2047j)  +/-  (1.05e-496, 1.05e-496j)
| (0.97693791170018278869 + 3.3961043941882120512e-2054j)  +/-  (4.05e-476, 4.05e-476j)
| (-0.53300287901740309636 - 1.7743698647930512335e-2086j)  +/-  (4.48e-490, 4.48e-490j)
| (-0.41675937971104376644 - 6.9600334574875432628e-2091j)  +/-  (2.22e-494, 2.22e-494j)
| (0.099039519178591554338 + 1.8972206042866728262e-2103j)  +/-  (4.86e-507, 4.86e-507j)
| (0.41675937971104376644 - 1.7680444893003675264e-2089j)  +/-  (2.08e-494, 2.08e-494j)
| (0.44658407310485570273 - 3.4860256600912561736e-2089j)  +/-  (2.85e-493, 2.85e-493j)
| (-0.22941067055020822405 + 6.7201829688108198473e-2099j)  +/-  (1.08e-501, 1.08e-501j)
| (-0.29323435397704283446 + 9.4795648216887394087e-2097j)  +/-  (4.05e-499, 4.05e-499j)
| (-1.4697229898397266404e-2140 - 5.4756526575193146973e-2142j)  +/-  (1.4e-2138, 1.4e-2138j)
| (0.32468148633773590221 + 2.6471563249350862758e-2095j)  +/-  (6.48e-498, 6.48e-498j)
| (0.29323435397704283446 + 5.4049828897725149614e-2096j)  +/-  (3.78e-499, 3.78e-499j)
| (0.06608692391635567516 + 6.7626387929750928626e-2105j)  +/-  (2.54e-508, 2.54e-508j)
| (-0.13188486655451489705 + 2.8183539834209731245e-2102j)  +/-  (1.24e-505, 1.24e-505j)
| (-0.35577356508888427243 - 4.8433421391031895758e-2094j)  +/-  (1.05e-496, 1.05e-496j)
| (0.033062060155888424294 - 1.363158716063920884e-2106j)  +/-  (1.28e-509, 1.28e-509j)
| (0.26146545921497457031 - 2.1822313927013091594e-2097j)  +/-  (2.13e-500, 2.13e-500j)
| (0.16458600672290529437 + 3.8379925889674008842e-2101j)  +/-  (2.58e-504, 2.58e-504j)
| (-0.06608692391635567516 - 5.823769420318534181e-2105j)  +/-  (2.33e-508, 2.33e-508j)
| (-0.26146545921497457031 + 1.5409770289370225845e-2097j)  +/-  (2.2e-500, 2.2e-500j)
| (-0.099039519178591554338 - 1.5680428548381232634e-2103j)  +/-  (4.86e-507, 4.86e-507j)
| (0.19710611027911180796 + 3.2968935050766003349e-2100j)  +/-  (5.34e-503, 5.34e-503j)
| (0.22941067055020822405 + 7.7214032495406838939e-2099j)  +/-  (1.13e-501, 1.13e-501j)
| (-0.033062060155888424294 + 1.2650711433851521652e-2106j)  +/-  (1.28e-509, 1.28e-509j)
| (-0.19710611027911180796 + 1.5961650443011628014e-2100j)  +/-  (5.11e-503, 5.11e-503j)
-------------------------------------------------
The weights are:
| (0.00057282909787725127892 - 1.9416438515016949478e-1809j)  +/-  (7.5e-113, 3.58e-341j)
| (0.011253024445611056264 - 1.0602631554977868916e-1811j)  +/-  (2.61e-113, 1.25e-341j)
| (0.01227813835915057342 + 1.1632395476117712845e-1811j)  +/-  (2.62e-113, 1.25e-341j)
| (0.0027384573077217931022 - 1.5445788607135086775e-1809j)  +/-  (1.16e-113, 5.52e-342j)
| (0.01227813835915057342 + 3.1466277990011374052e-1810j)  +/-  (7.82e-115, 3.73e-343j)
| (0.011253024445611056264 - 3.4560838504662022358e-1810j)  +/-  (7.94e-115, 3.79e-343j)
| (0.0038360448011181447075 + 1.0640941444994716101e-1809j)  +/-  (1.59e-114, 7.6e-343j)
| (0.015255590098533721554 - 1.4778306138007137752e-1811j)  +/-  (3.75e-117, 1.79e-345j)
| (0.0016049790581547967103 + 2.8779168455750736048e-1809j)  +/-  (7.88e-114, 3.76e-342j)
| (0.0081240148371922147966 + 4.8707691728375599543e-1810j)  +/-  (3.34e-116, 1.59e-344j)
| (0.017160955368708970502 - 2.1627316706332720205e-1810j)  +/-  (4.19e-119, 2e-347j)
| (0.0091725332877901255757 - 4.2892462454428201008e-1810j)  +/-  (2.24e-116, 1.07e-344j)
| (0.014274237260819816111 + 1.3725746891106578103e-1811j)  +/-  (6.24e-120, 2.98e-348j)
| (0.016219472513967278828 + 1.5839590170964427159e-1811j)  +/-  (2.22e-120, 1.06e-348j)
| (0.0038360448011181447075 + 3.4875446985494774893e-1812j)  +/-  (1.36e-123, 6.48e-352j)
| (0.016219472513967278828 + 2.3092403790226811397e-1810j)  +/-  (9.46e-120, 4.52e-348j)
| (0.013282883642136998522 - 2.8882006553470540554e-1810j)  +/-  (1.44e-118, 6.87e-347j)
| (0.010213870441402539533 + 9.5792032898184318453e-1812j)  +/-  (4.12e-122, 1.97e-350j)
| (0.020739134391547396356 - 2.1314066081824950687e-1811j)  +/-  (3.5e-124, 1.67e-352j)
| (0.0016049790581547967103 + 1.5388704415598260521e-1812j)  +/-  (1.83e-124, 8.72e-353j)
| (0.014274237260819816111 + 2.6677265958564851036e-1810j)  +/-  (5.85e-121, 2.8e-349j)
| (0.020739134391547396356 - 1.7157232587774008059e-1810j)  +/-  (8.88e-125, 4.24e-353j)
| (0.0027384573077217931022 - 2.5074469979800766114e-1812j)  +/-  (3.71e-124, 1.77e-352j)
| (0.018991736983159814179 - 1.9091579716014975986e-1811j)  +/-  (5.29e-125, 2.52e-353j)
| (0.018084241902683586238 + 1.7999827632900280613e-1811j)  +/-  (1.19e-124, 5.67e-353j)
| (0.0059718002966899935705 + 5.5218787496767127664e-1812j)  +/-  (3.64e-125, 1.74e-353j)
| (0.021577878644965910649 + 1.6293306619494909005e-1810j)  +/-  (1.4e-126, 6.68e-355j)
| (0.015255590098533721554 - 2.4763003821251200594e-1810j)  +/-  (1.05e-122, 5.04e-351j)
| (0.031274982759441086563 + 4.3165723780119513809e-1811j)  +/-  (1.74e-131, 8.29e-360j)
| (0.025409186298018740691 - 2.8325638348637875624e-1811j)  +/-  (5.6e-130, 2.67e-358j)
| (0.007054407728568693835 - 6.5233880266299167465e-1812j)  +/-  (1.15e-125, 5.48e-354j)
| (0.018084241902683586238 + 2.0326171270103778799e-1810j)  +/-  (1.23e-125, 5.88e-354j)
| (0.023954939607364325914 - 1.4103608937205204254e-1810j)  +/-  (4.75e-130, 2.27e-358j)
| (0.0049008175738398345295 - 8.2174757831313283632e-1810j)  +/-  (6.39e-124, 3.05e-352j)
| (0.023189583803358083852 + 2.4747115645465544482e-1811j)  +/-  (7.12e-130, 3.4e-358j)
| (0.019878038327026106491 + 2.0194899302044129548e-1811j)  +/-  (1.41e-127, 6.75e-356j)
| (0.0091725332877901255757 - 8.5523375917692104356e-1812j)  +/-  (2.26e-126, 1.08e-354j)
| (0.026096121692100985754 + 1.2369420453870120071e-1810j)  +/-  (2.67e-133, 1.28e-361j)
| (0.018991736983159814179 - 1.9157968890969822331e-1810j)  +/-  (7.59e-128, 3.62e-356j)
| (0.0081240148371922147966 + 7.5296555685289656745e-1812j)  +/-  (1.5e-126, 7.18e-355j)
| (0.026096121692100985754 + 2.9553011035818242554e-1811j)  +/-  (3.93e-134, 1.88e-362j)
| (0.00057282909787725127892 - 5.2365638333017832679e-1813j)  +/-  (1.62e-127, 7.72e-356j)
| (0.023189583803358083852 + 1.4773104645011565524e-1810j)  +/-  (6.77e-133, 3.23e-361j)
| (0.025409186298018740691 - 1.2906961364784797908e-1810j)  +/-  (1.53e-134, 7.28e-363j)
| (0.0049008175738398345295 - 4.5046815579284411539e-1812j)  +/-  (6.34e-127, 3.03e-355j)
| (0.026752197201090852402 - 3.0803064720712093106e-1811j)  +/-  (7.47e-136, 3.57e-364j)
| (0.021577878644965910649 + 2.2446281879003491509e-1811j)  +/-  (3.06e-132, 1.46e-360j)
| (0.010213870441402539533 + 3.8306122614541170661e-1810j)  +/-  (4.01e-130, 1.91e-358j)
| (0.028546810211110651092 + 1.0539903826706273884e-1810j)  +/-  (1.83e-139, 8.76e-368j)
| (0.022396103959964818799 - 1.5500927606490327211e-1810j)  +/-  (1.75e-133, 8.37e-362j)
| (0.022396103959964818799 - 2.3589240951247277283e-1811j)  +/-  (1.11e-133, 5.28e-362j)
| (0.028546810211110651092 + 3.4680561959301932452e-1811j)  +/-  (1.89e-139, 9.05e-368j)
| (0.0059718002966899935705 + 6.7035751013078584729e-1810j)  +/-  (2.48e-131, 1.19e-359j)
| (0.027379150949220806987 + 1.1398471621461819818e-1810j)  +/-  (1.08e-138, 5.17e-367j)
| (0.026752197201090852402 - 1.1868174477033087397e-1810j)  +/-  (9.04e-138, 4.32e-366j)
| (0.017160955368708970502 - 1.6914775739486295542e-1811j)  +/-  (2.43e-133, 1.16e-361j)
| (0.0290820389037254327 - 3.6023296970711145191e-1811j)  +/-  (1.53e-141, 7.31e-370j)
| (0.023954939607364325914 - 2.5923774577568218152e-1811j)  +/-  (7.61e-137, 3.63e-365j)
| (0.019878038327026106491 + 1.8106349322562917283e-1810j)  +/-  (1.13e-134, 5.38e-363j)
| (0.030498800862932261705 + 9.0894090077535590419e-1811j)  +/-  (1.07e-144, 5.09e-373j)
| (0.032779519015078161531 + 6.9034885976520818443e-1811j)  +/-  (2.86e-147, 1.37e-375j)
| (0.024694303450817654951 + 2.7117189979765718939e-1811j)  +/-  (1.35e-137, 6.46e-366j)
| (0.027379150949220806987 + 3.2074328672636213609e-1811j)  +/-  (2.28e-140, 1.09e-368j)
| (0.032616570770966320715 - 5.1204131509439747508e-1811j)  +/-  (5.32e-148, 2.54e-376j)
| (0.0290820389037254327 - 1.0147587679557133694e-1810j)  +/-  (1.06e-143, 5.06e-372j)
| (0.02797833098510408693 - 1.0956311265187558736e-1810j)  +/-  (5.57e-142, 2.66e-370j)
| (0.029585553312295452961 + 3.7392734248318961111e-1811j)  +/-  (4.07e-144, 1.94e-372j)
| (0.030498800862932261705 + 4.0213244102489585593e-1811j)  +/-  (6.03e-146, 2.88e-374j)
| (0.013282883642136998522 - 1.2675566009744385932e-1811j)  +/-  (8.58e-138, 4.1e-366j)
| (0.024694303450817654951 + 1.3483893290530298835e-1810j)  +/-  (2.94e-141, 1.4e-369j)
| (0.030903760414326294425 - 8.7715254146716360247e-1811j)  +/-  (3.38e-148, 1.61e-376j)
| (0.007054407728568693835 - 5.6434378369257691006e-1810j)  +/-  (1.37e-139, 6.55e-368j)
| (0.02797833098510408693 - 3.3365531451306573014e-1811j)  +/-  (6.42e-143, 3.06e-371j)
| (0.030058646434927059179 - 3.8788008345224746616e-1811j)  +/-  (1.83e-145, 8.72e-374j)
| (0.032904965828079190162 - 6.67755052836450032e-1811j)  +/-  (1.17e-151, 5.58e-380j)
| (0.030058646434927059179 - 9.4240805645598093343e-1811j)  +/-  (1.64e-147, 7.85e-376j)
| (0.029585553312295452961 + 9.7764752492040270595e-1811j)  +/-  (7.45e-147, 3.56e-375j)
| (0.032185534127331033138 - 4.7862770524925972708e-1811j)  +/-  (7.63e-152, 3.64e-380j)
| (0.031613783763204291763 - 4.4691983459648778149e-1811j)  +/-  (1.35e-150, 6.43e-379j)
| (0.033068384150785749304 + 6.0456469152804760111e-1811j)  +/-  (3.5e-154, 1.67e-382j)
| (0.031274982759441086563 + 8.4685467077576879174e-1811j)  +/-  (1.62e-151, 7.74e-380j)
| (0.031613783763204291763 - 8.1788209005824177872e-1811j)  +/-  (1.57e-152, 7.51e-381j)
| (0.032994444735302554245 + 6.4597226439895694091e-1811j)  +/-  (1.28e-154, 6.11e-383j)
| (0.032779519015078161531 + 5.2944260998464251973e-1811j)  +/-  (2.98e-155, 1.42e-383j)
| (0.030903760414326294425 - 4.1672663177780035859e-1811j)  +/-  (2.67e-152, 1.27e-380j)
| (0.033049486237294812342 - 6.2491449288187835525e-1811j)  +/-  (3.94e-155, 1.88e-383j)
| (0.031917972070491870835 + 7.9017812210338287109e-1811j)  +/-  (7.11e-155, 3.39e-383j)
| (0.032616570770966320715 - 7.1384854316295819158e-1811j)  +/-  (1.38e-155, 6.6e-384j)
| (0.032994444735302554245 + 5.6586840900061830322e-1811j)  +/-  (9.61e-157, 4.59e-385j)
| (0.031917972070491870835 + 4.6256056301698501611e-1811j)  +/-  (6.92e-156, 3.3e-384j)
| (0.032904965828079190162 - 5.4738278962663263138e-1811j)  +/-  (1.04e-156, 4.95e-385j)
| (0.032417934162393678959 + 7.3828458062643043207e-1811j)  +/-  (5.92e-157, 2.82e-385j)
| (0.032185534127331033138 - 7.6368903650051741779e-1811j)  +/-  (6.4e-157, 3.05e-385j)
| (0.033049486237294812342 - 5.8490680137132201571e-1811j)  +/-  (1.65e-157, 7.92e-386j)
| (0.032417934162393678959 + 4.951210824967837752e-1811j)  +/-  (1.53e-157, 7.2e-386j)
