Starting with polynomial:
P : 1/2*t^2 - 2*t + 1
Extension levels are: 2 30
-------------------------------------------------
Trying to find an order 30 Kronrod extension for:
P1 : 1/2*t^2 - 2*t + 1
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : 1/2*t^32 - 4274729692139483358921175620974382372407278704248767447/8839866537711680468484631375864425900454364529026411*t^31 + 4172560193624610153286185255038909271108540047346169873991/19039712542763619470582282963400301939440169754826116*t^30 - 3831462651689468890886756742341999484244765891264109714247225/61879065763981763279392419631050981303180551703184877*t^29 + 1515088994211587300028196854188374229083950388273253943086463675/123758131527963526558784839262101962606361103406369754*t^28 - 15932832943016267593855308264730697709855745423295962754633300160/8839866537711680468484631375864425900454364529026411*t^27 + 1814744063044247350980361775734386876106496798846586836699234400990/8839866537711680468484631375864425900454364529026411*t^26 - 12617039943682129524096882668884967161250652237393222098981157615240/679989733670129266806510105835725069265720348386647*t^25 + 920997807102666427578972507238711002729004419080067078541260421612500/679989733670129266806510105835725069265720348386647*t^24 - 54980759292980627127265775883835231932021803145347772958319057329200000/679989733670129266806510105835725069265720348386647*t^23 + 2708263037719586412586596137162585209244705592244773510337876737141180000/679989733670129266806510105835725069265720348386647*t^22 - 110768802719938931474459480366141308802309255067424578800058232254394320000/679989733670129266806510105835725069265720348386647*t^21 + 3777492167285611265628905232051525500211321168995010269470921394774747160000/679989733670129266806510105835725069265720348386647*t^20 - 107676225660804240953233351987058384262401756260346761905313561914909408000000/679989733670129266806510105835725069265720348386647*t^19 + 2568026261561736460250795277802616641538596262896074859606458852131777052000000/679989733670129266806510105835725069265720348386647*t^18 - 51227441409396754167805476541504164241610190192427630661886085717249158403200000/679989733670129266806510105835725069265720348386647*t^17 + 853395391984192293242654585207830618311355922216584158907877442852785170228800000/679989733670129266806510105835725069265720348386647*t^16 - 11839467527969155662710245995902883204338430758648227338663754991648068616294400000/679989733670129266806510105835725069265720348386647*t^15 + 136235935264424888867497314617167929420105985204785532655266830014465144964480000000/679989733670129266806510105835725069265720348386647*t^14 - 1293258610327958499645977942933426408378250585845763971897931203639115400081920000000/679989733670129266806510105835725069265720348386647*t^13 + 10058037800390587033405104554589668158761166282369986631177167386184344931988224000000/679989733670129266806510105835725069265720348386647*t^12 - 63534713122192872357998701666170146223006899050337258380552024294623122441158656000000/679989733670129266806510105835725069265720348386647*t^11 + 322470676517648806843179261471931762689807793083093457081621023607015441474556928000000/679989733670129266806510105835725069265720348386647*t^10 - 1297482497242523703836560280049433243255661312407879333162145887994422789476249600000000/679989733670129266806510105835725069265720348386647*t^9 + 4068955991491469996380654910609095248964708434458317838430136189630097549464934400000000/679989733670129266806510105835725069265720348386647*t^8 - 9732516751834734695390521250759543714861955786149072462646736015042029669449662464000000/679989733670129266806510105835725069265720348386647*t^7 + 17259716685931955632334028002421779225347122912675356828406439479649957067196973056000000/679989733670129266806510105835725069265720348386647*t^6 - 21845527105419309510032662169951321103718005776575157449195300965575268022417686528000000/679989733670129266806510105835725069265720348386647*t^5 + 18708734203490799775137000642878715522832581696990541613182824716598717118731878400000000/679989733670129266806510105835725069265720348386647*t^4 - 10018581866361461194158147612535743750095051423183853814737425676804184667298201600000000/679989733670129266806510105835725069265720348386647*t^3 + 2955272475048993242068294429096775820455082922444818821771221520621831989259796480000000/679989733670129266806510105835725069265720348386647*t^2 - 380091847804156234985857912035837236982014523929500568065526232565891014100254720000000/679989733670129266806510105835725069265720348386647*t + 12003599178258431836547409077837142836673807826538660833189709872309377057423360000000/679989733670129266806510105835725069265720348386647
-------------------------------------------------
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 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: 1
  current precision for roots: 424
  current precision for roots: 848
 current precision for weights: 424
Linear system for weights solvable: 1
Sufficient bits for target precision reached
Positive weights:   32 out of 32
Indefinite weights: 0 out of 32
Negative weights:   0 out of 32
Extension rule has valid weights: 1
-------------------------------------------------
The nodes are:
| (62.893130319942079438 + 4.8194834205640361968e-575j)  +/-  (9.05e-240, 9.05e-240j)
| (76.872438013375851527 - 2.2367427803712213999e-582j)  +/-  (1.09e-240, 1.09e-240j)
| (95.25358125806869315 + 3.4681717284553900135e-590j)  +/-  (2.36e-242, 2.36e-242j)
| (108.01652136939424698 - 7.6207426799487483692e-594j)  +/-  (1.09e-243, 1.09e-243j)
| (41.864675068057473914 + 3.9332168900928633097e-606j)  +/-  (3.53e-239, 3.53e-239j)
| (46.47192869790437712 + 1.1685481681057022132e-628j)  +/-  (3.62e-239, 3.62e-239j)
| (85.295363492724697073 - 2.1983088020104618556e-643j)  +/-  (1.98e-241, 1.98e-241j)
| (30.026130462937194444 - 1.2898283495067944248e-658j)  +/-  (1.46e-239, 1.46e-239j)
| (5.1040272647534643149 - 3.0886602322875897158e-678j)  +/-  (4.8e-245, 4.8e-245j)
| (13.290774401656248577 + 1.5297778976421582096e-672j)  +/-  (5.25e-242, 5.25e-242j)
| (6.2899712806176497912 - 1.1191821075865473561e-678j)  +/-  (1.75e-244, 1.75e-244j)
| (7.7405264256522700719 - 7.115570211227720352e-679j)  +/-  (7.83e-244, 7.83e-244j)
| (51.472700215972760463 + 1.7077698126561818416e-677j)  +/-  (3.11e-239, 3.11e-239j)
| (26.650800056089210771 - 1.2141360549074464556e-696j)  +/-  (9.16e-240, 9.16e-240j)
| (1.7376572116872155068 + 2.7786079403422281228e-719j)  +/-  (5.53e-249, 5.53e-249j)
| (4.2492690443757161993 + 4.0434263935694706502e-719j)  +/-  (1.17e-245, 1.17e-245j)
| (11.246999577126137776 - 3.5487488996719546925e-713j)  +/-  (1.4e-242, 1.4e-242j)
| (0.045260384801686564689 + 6.8506936948277912727e-722j)  +/-  (1.08e-254, 1.08e-254j)
| (69.491087037179704216 - 1.9331859529883290431e-717j)  +/-  (3.94e-240, 3.94e-240j)
| (37.608923536533231487 + 3.5894107683750634437e-729j)  +/-  (3.19e-239, 3.19e-239j)
| (0.5857864376269049512 - 9.2320224740069899657e-750j)  +/-  (1.16e-251, 1.16e-251j)
| (1.0865181265925772857 - 1.4019925898743079875e-747j)  +/-  (2.77e-250, 2.77e-250j)
| (17.980274695966167677 - 2.2635575949900725769e-736j)  +/-  (5.72e-241, 5.72e-241j)
| (23.527647042372799954 - 6.6068914516192897494e-741j)  +/-  (3.86e-240, 3.86e-240j)
| (20.641670220751675206 - 3.8055199450803650844e-759j)  +/-  (1.58e-240, 1.58e-240j)
| (9.3969897819859168773 + 2.5451541693698829417e-774j)  +/-  (3.54e-243, 3.54e-243j)
| (2.5284236583858487169 + 6.6805316875013331143e-782j)  +/-  (1.01e-247, 1.01e-247j)
| (3.4142135623730950488 - 3.3643635825944294044e-780j)  +/-  (1.48e-246, 1.48e-246j)
| (33.671601283710611465 - 2.0291926353697448474e-781j)  +/-  (2.53e-239, 2.53e-239j)
| (56.921788172290247378 - 4.244722032036310406e-803j)  +/-  (1.87e-239, 1.87e-239j)
| (15.532893223865582689 - 3.2230696484884689115e-819j)  +/-  (1.75e-241, 1.75e-241j)
| (0.23844474608106481794 - 2.1467642785883653041e-831j)  +/-  (4.02e-253, 4.02e-253j)
-------------------------------------------------
The weights are:
| (3.0388183810554924519e-27 - 7.4563998118354650668e-602j)  +/-  (6.36e-90, 9.66e-208j)
| (3.2314630167231815455e-33 + 9.6424290796767328197e-606j)  +/-  (8.24e-93, 1.25e-210j)
| (4.7209525842978621085e-41 + 4.471405729574694584e-610j)  +/-  (3.14e-96, 4.76e-214j)
| (1.8670015807269314268e-46 - 5.9548706343012939182e-613j)  +/-  (2.73e-98, 4.15e-216j)
| (2.9130619816429092998e-18 - 2.7447475579945668615e-598j)  +/-  (1.65e-87, 2.51e-205j)
| (3.1505499629816327889e-20 + 3.430250760634118303e-599j)  +/-  (1.34e-88, 2.04e-206j)
| (8.2143041858765524665e-37 - 9.0539350384746431467e-608j)  +/-  (3.48e-95, 5.29e-213j)
| (3.1971904302347283022e-13 + 7.1955462204885787859e-596j)  +/-  (2.52e-85, 3.82e-203j)
| (0.0061433074480213825648 - 5.1499902387420476961e-590j)  +/-  (3.52e-69, 5.34e-187j)
| (3.6199380084734048991e-06 + 3.0499233389619056737e-592j)  +/-  (1.26e-78, 1.92e-196j)
| (0.0024766624887650387688 + 2.0207542754761576802e-590j)  +/-  (1.34e-71, 2.03e-189j)
| (0.0006772841833618112451 - 7.3299522678393369969e-591j)  +/-  (1e-73, 1.52e-191j)
| (2.3062194388555652118e-22 - 3.9701548567891346703e-600j)  +/-  (1.32e-90, 2e-208j)
| (8.6521136316622894451e-12 - 3.6811938198608514748e-595j)  +/-  (1.93e-85, 2.94e-203j)
| (0.1273781158445313214 - 5.4938619755803370622e-590j)  +/-  (3.62e-66, 5.51e-184j)
| (0.011058417703291815891 + 8.1804009061936591853e-590j)  +/-  (2.22e-71, 3.38e-189j)
| (2.5393224770379651044e-05 - 9.2183553788596136175e-592j)  +/-  (1.18e-78, 1.79e-196j)
| (0.11101032890871266662 - 5.0473657156127338443e-591j)  +/-  (5.57e-68, 8.46e-186j)
| (4.6010132333221103661e-30 - 8.1596495160414225598e-604j)  +/-  (2.91e-94, 4.42e-212j)
| (1.8991029369017628491e-16 + 1.9702712325005243379e-597j)  +/-  (3.05e-88, 4.63e-206j)
| (0.23617897339500385208 - 3.0373621538042949455e-590j)  +/-  (1.08e-69, 1.65e-187j)
| (0.19459363874176938276 + 4.3305353947832093699e-590j)  +/-  (5.39e-70, 8.19e-188j)
| (3.9653338776840550517e-08 + 2.6981936338007414152e-593j)  +/-  (6.27e-84, 9.52e-202j)
| (1.8177074765829438062e-10 + 1.6966659999779634845e-594j)  +/-  (9.63e-86, 1.46e-203j)
| (3.0074130470823088798e-09 - 7.0859582586609652566e-594j)  +/-  (4.69e-85, 7.13e-203j)
| (0.00014551684591043697592 + 2.641385783904854385e-591j)  +/-  (3.88e-81, 5.9e-199j)
| (0.06794382022810503761 + 6.6874842560526522797e-590j)  +/-  (5.55e-78, 8.43e-196j)
| (0.029410189182494086214 - 8.1774487137657374302e-590j)  +/-  (1.63e-78, 2.48e-196j)
| (9.0147242810490601925e-15 - 1.2604306798353616163e-596j)  +/-  (9.27e-89, 1.41e-206j)
| (1.0832784845516433719e-24 + 4.9055874244114167056e-601j)  +/-  (4.46e-94, 6.78e-212j)
| (4.2073028221625856132e-07 - 9.4310083153922311815e-593j)  +/-  (2.28e-84, 3.46e-202j)
| (0.21295426828546848672 + 1.6820682378161533109e-590j)  +/-  (6.11e-81, 9.27e-199j)
Starting with polynomial:
P : 1/2*t^2 - 2*t + 1
Extension levels are: 2 30
-------------------------------------------------
Trying to find an order 30 Kronrod extension for:
P1 : 1/2*t^2 - 2*t + 1
Solvable: 1
-------------------------------------------------
Ending with final polynomial:
P : 1/2*t^32 - 4274729692139483358921175620974382372407278704248767447/8839866537711680468484631375864425900454364529026411*t^31 + 4172560193624610153286185255038909271108540047346169873991/19039712542763619470582282963400301939440169754826116*t^30 - 3831462651689468890886756742341999484244765891264109714247225/61879065763981763279392419631050981303180551703184877*t^29 + 1515088994211587300028196854188374229083950388273253943086463675/123758131527963526558784839262101962606361103406369754*t^28 - 15932832943016267593855308264730697709855745423295962754633300160/8839866537711680468484631375864425900454364529026411*t^27 + 1814744063044247350980361775734386876106496798846586836699234400990/8839866537711680468484631375864425900454364529026411*t^26 - 12617039943682129524096882668884967161250652237393222098981157615240/679989733670129266806510105835725069265720348386647*t^25 + 920997807102666427578972507238711002729004419080067078541260421612500/679989733670129266806510105835725069265720348386647*t^24 - 54980759292980627127265775883835231932021803145347772958319057329200000/679989733670129266806510105835725069265720348386647*t^23 + 2708263037719586412586596137162585209244705592244773510337876737141180000/679989733670129266806510105835725069265720348386647*t^22 - 110768802719938931474459480366141308802309255067424578800058232254394320000/679989733670129266806510105835725069265720348386647*t^21 + 3777492167285611265628905232051525500211321168995010269470921394774747160000/679989733670129266806510105835725069265720348386647*t^20 - 107676225660804240953233351987058384262401756260346761905313561914909408000000/679989733670129266806510105835725069265720348386647*t^19 + 2568026261561736460250795277802616641538596262896074859606458852131777052000000/679989733670129266806510105835725069265720348386647*t^18 - 51227441409396754167805476541504164241610190192427630661886085717249158403200000/679989733670129266806510105835725069265720348386647*t^17 + 853395391984192293242654585207830618311355922216584158907877442852785170228800000/679989733670129266806510105835725069265720348386647*t^16 - 11839467527969155662710245995902883204338430758648227338663754991648068616294400000/679989733670129266806510105835725069265720348386647*t^15 + 136235935264424888867497314617167929420105985204785532655266830014465144964480000000/679989733670129266806510105835725069265720348386647*t^14 - 1293258610327958499645977942933426408378250585845763971897931203639115400081920000000/679989733670129266806510105835725069265720348386647*t^13 + 10058037800390587033405104554589668158761166282369986631177167386184344931988224000000/679989733670129266806510105835725069265720348386647*t^12 - 63534713122192872357998701666170146223006899050337258380552024294623122441158656000000/679989733670129266806510105835725069265720348386647*t^11 + 322470676517648806843179261471931762689807793083093457081621023607015441474556928000000/679989733670129266806510105835725069265720348386647*t^10 - 1297482497242523703836560280049433243255661312407879333162145887994422789476249600000000/679989733670129266806510105835725069265720348386647*t^9 + 4068955991491469996380654910609095248964708434458317838430136189630097549464934400000000/679989733670129266806510105835725069265720348386647*t^8 - 9732516751834734695390521250759543714861955786149072462646736015042029669449662464000000/679989733670129266806510105835725069265720348386647*t^7 + 17259716685931955632334028002421779225347122912675356828406439479649957067196973056000000/679989733670129266806510105835725069265720348386647*t^6 - 21845527105419309510032662169951321103718005776575157449195300965575268022417686528000000/679989733670129266806510105835725069265720348386647*t^5 + 18708734203490799775137000642878715522832581696990541613182824716598717118731878400000000/679989733670129266806510105835725069265720348386647*t^4 - 10018581866361461194158147612535743750095051423183853814737425676804184667298201600000000/679989733670129266806510105835725069265720348386647*t^3 + 2955272475048993242068294429096775820455082922444818821771221520621831989259796480000000/679989733670129266806510105835725069265720348386647*t^2 - 380091847804156234985857912035837236982014523929500568065526232565891014100254720000000/679989733670129266806510105835725069265720348386647*t + 12003599178258431836547409077837142836673807826538660833189709872309377057423360000000/679989733670129266806510105835725069265720348386647
-------------------------------------------------
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 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: 1
  current precision for roots: 424
  current precision for roots: 848
 current precision for weights: 424
Linear system for weights solvable: 1
Sufficient bits for target precision reached
Positive weights:   32 out of 32
Indefinite weights: 0 out of 32
Negative weights:   0 out of 32
Extension rule has valid weights: 1
-------------------------------------------------
The nodes are:
| (62.893130319942079438 + 4.8194834205640361968e-575j)  +/-  (9.05e-240, 9.05e-240j)
| (76.872438013375851527 - 2.2367427803712213999e-582j)  +/-  (1.09e-240, 1.09e-240j)
| (95.25358125806869315 + 3.4681717284553900135e-590j)  +/-  (2.36e-242, 2.36e-242j)
| (108.01652136939424698 - 7.6207426799487483692e-594j)  +/-  (1.09e-243, 1.09e-243j)
| (41.864675068057473914 + 3.9332168900928633097e-606j)  +/-  (3.53e-239, 3.53e-239j)
| (46.47192869790437712 + 1.1685481681057022132e-628j)  +/-  (3.62e-239, 3.62e-239j)
| (85.295363492724697073 - 2.1983088020104618556e-643j)  +/-  (1.98e-241, 1.98e-241j)
| (30.026130462937194444 - 1.2898283495067944248e-658j)  +/-  (1.46e-239, 1.46e-239j)
| (5.1040272647534643149 - 3.0886602322875897158e-678j)  +/-  (4.8e-245, 4.8e-245j)
| (13.290774401656248577 + 1.5297778976421582096e-672j)  +/-  (5.25e-242, 5.25e-242j)
| (6.2899712806176497912 - 1.1191821075865473561e-678j)  +/-  (1.75e-244, 1.75e-244j)
| (7.7405264256522700719 - 7.115570211227720352e-679j)  +/-  (7.83e-244, 7.83e-244j)
| (51.472700215972760463 + 1.7077698126561818416e-677j)  +/-  (3.11e-239, 3.11e-239j)
| (26.650800056089210771 - 1.2141360549074464556e-696j)  +/-  (9.16e-240, 9.16e-240j)
| (1.7376572116872155068 + 2.7786079403422281228e-719j)  +/-  (5.53e-249, 5.53e-249j)
| (4.2492690443757161993 + 4.0434263935694706502e-719j)  +/-  (1.17e-245, 1.17e-245j)
| (11.246999577126137776 - 3.5487488996719546925e-713j)  +/-  (1.4e-242, 1.4e-242j)
| (0.045260384801686564689 + 6.8506936948277912727e-722j)  +/-  (1.08e-254, 1.08e-254j)
| (69.491087037179704216 - 1.9331859529883290431e-717j)  +/-  (3.94e-240, 3.94e-240j)
| (37.608923536533231487 + 3.5894107683750634437e-729j)  +/-  (3.19e-239, 3.19e-239j)
| (0.5857864376269049512 - 9.2320224740069899657e-750j)  +/-  (1.16e-251, 1.16e-251j)
| (1.0865181265925772857 - 1.4019925898743079875e-747j)  +/-  (2.77e-250, 2.77e-250j)
| (17.980274695966167677 - 2.2635575949900725769e-736j)  +/-  (5.72e-241, 5.72e-241j)
| (23.527647042372799954 - 6.6068914516192897494e-741j)  +/-  (3.86e-240, 3.86e-240j)
| (20.641670220751675206 - 3.8055199450803650844e-759j)  +/-  (1.58e-240, 1.58e-240j)
| (9.3969897819859168773 + 2.5451541693698829417e-774j)  +/-  (3.54e-243, 3.54e-243j)
| (2.5284236583858487169 + 6.6805316875013331143e-782j)  +/-  (1.01e-247, 1.01e-247j)
| (3.4142135623730950488 - 3.3643635825944294044e-780j)  +/-  (1.48e-246, 1.48e-246j)
| (33.671601283710611465 - 2.0291926353697448474e-781j)  +/-  (2.53e-239, 2.53e-239j)
| (56.921788172290247378 - 4.244722032036310406e-803j)  +/-  (1.87e-239, 1.87e-239j)
| (15.532893223865582689 - 3.2230696484884689115e-819j)  +/-  (1.75e-241, 1.75e-241j)
| (0.23844474608106481794 - 2.1467642785883653041e-831j)  +/-  (4.02e-253, 4.02e-253j)
-------------------------------------------------
The weights are:
| (3.0388183810554924519e-27 - 7.4563998118354650668e-602j)  +/-  (6.36e-90, 9.66e-208j)
| (3.2314630167231815455e-33 + 9.6424290796767328197e-606j)  +/-  (8.24e-93, 1.25e-210j)
| (4.7209525842978621085e-41 + 4.471405729574694584e-610j)  +/-  (3.14e-96, 4.76e-214j)
| (1.8670015807269314268e-46 - 5.9548706343012939182e-613j)  +/-  (2.73e-98, 4.15e-216j)
| (2.9130619816429092998e-18 - 2.7447475579945668615e-598j)  +/-  (1.65e-87, 2.51e-205j)
| (3.1505499629816327889e-20 + 3.430250760634118303e-599j)  +/-  (1.34e-88, 2.04e-206j)
| (8.2143041858765524665e-37 - 9.0539350384746431467e-608j)  +/-  (3.48e-95, 5.29e-213j)
| (3.1971904302347283022e-13 + 7.1955462204885787859e-596j)  +/-  (2.52e-85, 3.82e-203j)
| (0.0061433074480213825648 - 5.1499902387420476961e-590j)  +/-  (3.52e-69, 5.34e-187j)
| (3.6199380084734048991e-06 + 3.0499233389619056737e-592j)  +/-  (1.26e-78, 1.92e-196j)
| (0.0024766624887650387688 + 2.0207542754761576802e-590j)  +/-  (1.34e-71, 2.03e-189j)
| (0.0006772841833618112451 - 7.3299522678393369969e-591j)  +/-  (1e-73, 1.52e-191j)
| (2.3062194388555652118e-22 - 3.9701548567891346703e-600j)  +/-  (1.32e-90, 2e-208j)
| (8.6521136316622894451e-12 - 3.6811938198608514748e-595j)  +/-  (1.93e-85, 2.94e-203j)
| (0.1273781158445313214 - 5.4938619755803370622e-590j)  +/-  (3.62e-66, 5.51e-184j)
| (0.011058417703291815891 + 8.1804009061936591853e-590j)  +/-  (2.22e-71, 3.38e-189j)
| (2.5393224770379651044e-05 - 9.2183553788596136175e-592j)  +/-  (1.18e-78, 1.79e-196j)
| (0.11101032890871266662 - 5.0473657156127338443e-591j)  +/-  (5.57e-68, 8.46e-186j)
| (4.6010132333221103661e-30 - 8.1596495160414225598e-604j)  +/-  (2.91e-94, 4.42e-212j)
| (1.8991029369017628491e-16 + 1.9702712325005243379e-597j)  +/-  (3.05e-88, 4.63e-206j)
| (0.23617897339500385208 - 3.0373621538042949455e-590j)  +/-  (1.08e-69, 1.65e-187j)
| (0.19459363874176938276 + 4.3305353947832093699e-590j)  +/-  (5.39e-70, 8.19e-188j)
| (3.9653338776840550517e-08 + 2.6981936338007414152e-593j)  +/-  (6.27e-84, 9.52e-202j)
| (1.8177074765829438062e-10 + 1.6966659999779634845e-594j)  +/-  (9.63e-86, 1.46e-203j)
| (3.0074130470823088798e-09 - 7.0859582586609652566e-594j)  +/-  (4.69e-85, 7.13e-203j)
| (0.00014551684591043697592 + 2.641385783904854385e-591j)  +/-  (3.88e-81, 5.9e-199j)
| (0.06794382022810503761 + 6.6874842560526522797e-590j)  +/-  (5.55e-78, 8.43e-196j)
| (0.029410189182494086214 - 8.1774487137657374302e-590j)  +/-  (1.63e-78, 2.48e-196j)
| (9.0147242810490601925e-15 - 1.2604306798353616163e-596j)  +/-  (9.27e-89, 1.41e-206j)
| (1.0832784845516433719e-24 + 4.9055874244114167056e-601j)  +/-  (4.46e-94, 6.78e-212j)
| (4.2073028221625856132e-07 - 9.4310083153922311815e-593j)  +/-  (2.28e-84, 3.46e-202j)
| (0.21295426828546848672 + 1.6820682378161533109e-590j)  +/-  (6.11e-81, 9.27e-199j)
