Properties

Label 19.6.a.c.1.1
Level $19$
Weight $6$
Character 19.1
Self dual yes
Analytic conductor $3.047$
Analytic rank $1$
Dimension $2$
CM no
Inner twists $1$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [19,6,Mod(1,19)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(19, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0]))
 
N = Newforms(chi, 6, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("19.1");
 
S:= CuspForms(chi, 6);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 19 \)
Weight: \( k \) \(=\) \( 6 \)
Character orbit: \([\chi]\) \(=\) 19.a (trivial)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(3.04729257645\)
Analytic rank: \(1\)
Dimension: \(2\)
Coefficient field: \(\Q(\sqrt{177}) \)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{2} - x - 44 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Fricke sign: \(+1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.1
Root \(7.15207\) of defining polynomial
Character \(\chi\) \(=\) 19.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-10.1521 q^{2} +16.4562 q^{3} +71.0645 q^{4} -99.7603 q^{5} -167.064 q^{6} -57.1289 q^{7} -396.585 q^{8} +27.8066 q^{9} +O(q^{10})\) \(q-10.1521 q^{2} +16.4562 q^{3} +71.0645 q^{4} -99.7603 q^{5} -167.064 q^{6} -57.1289 q^{7} -396.585 q^{8} +27.8066 q^{9} +1012.77 q^{10} -438.977 q^{11} +1169.45 q^{12} -477.590 q^{13} +579.977 q^{14} -1641.68 q^{15} +1752.10 q^{16} +1671.39 q^{17} -282.294 q^{18} -361.000 q^{19} -7089.42 q^{20} -940.125 q^{21} +4456.52 q^{22} +459.514 q^{23} -6526.29 q^{24} +6827.12 q^{25} +4848.53 q^{26} -3541.27 q^{27} -4059.84 q^{28} -2696.78 q^{29} +16666.4 q^{30} -2314.43 q^{31} -5096.67 q^{32} -7223.89 q^{33} -16968.0 q^{34} +5699.20 q^{35} +1976.06 q^{36} +3022.51 q^{37} +3664.90 q^{38} -7859.32 q^{39} +39563.5 q^{40} +5483.05 q^{41} +9544.22 q^{42} +5101.80 q^{43} -31195.7 q^{44} -2773.99 q^{45} -4665.02 q^{46} +5803.63 q^{47} +28832.8 q^{48} -13543.3 q^{49} -69309.4 q^{50} +27504.7 q^{51} -33939.7 q^{52} -23207.5 q^{53} +35951.2 q^{54} +43792.5 q^{55} +22656.5 q^{56} -5940.69 q^{57} +27377.9 q^{58} -32849.5 q^{59} -116665. q^{60} -46911.5 q^{61} +23496.2 q^{62} -1588.56 q^{63} -4325.31 q^{64} +47644.5 q^{65} +73337.4 q^{66} -3565.12 q^{67} +118776. q^{68} +7561.86 q^{69} -57858.7 q^{70} +2346.44 q^{71} -11027.7 q^{72} +57370.0 q^{73} -30684.7 q^{74} +112349. q^{75} -25654.3 q^{76} +25078.3 q^{77} +79788.3 q^{78} -29715.8 q^{79} -174790. q^{80} -65032.8 q^{81} -55664.3 q^{82} +60526.0 q^{83} -66809.5 q^{84} -166738. q^{85} -51793.8 q^{86} -44378.8 q^{87} +174092. q^{88} +19134.9 q^{89} +28161.8 q^{90} +27284.2 q^{91} +32655.1 q^{92} -38086.7 q^{93} -58918.9 q^{94} +36013.5 q^{95} -83871.9 q^{96} -43189.4 q^{97} +137492. q^{98} -12206.4 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 2 q - 7 q^{2} - 7 q^{3} + 49 q^{4} - 133 q^{5} - 241 q^{6} + 72 q^{7} - 567 q^{8} + 335 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 2 q - 7 q^{2} - 7 q^{3} + 49 q^{4} - 133 q^{5} - 241 q^{6} + 72 q^{7} - 567 q^{8} + 335 q^{9} + 908 q^{10} - 705 q^{11} + 1687 q^{12} - 1341 q^{13} + 987 q^{14} - 862 q^{15} + 1921 q^{16} + 2784 q^{17} + 686 q^{18} - 722 q^{19} - 6356 q^{20} - 3969 q^{21} + 3618 q^{22} - 2713 q^{23} - 2529 q^{24} + 4807 q^{25} + 2127 q^{26} - 5047 q^{27} - 6909 q^{28} - 7775 q^{29} + 19124 q^{30} + 7132 q^{31} + 889 q^{32} - 984 q^{33} - 13461 q^{34} + 1407 q^{35} - 4802 q^{36} - 6248 q^{37} + 2527 q^{38} + 12393 q^{39} + 45228 q^{40} - 4174 q^{41} - 3 q^{42} + 25357 q^{43} - 25326 q^{44} - 12985 q^{45} - 14665 q^{46} + 11727 q^{47} + 24871 q^{48} - 13676 q^{49} - 75677 q^{50} + 1407 q^{51} - 14889 q^{52} - 29133 q^{53} + 31205 q^{54} + 52635 q^{55} + 651 q^{56} + 2527 q^{57} + 11371 q^{58} - 64515 q^{59} - 133868 q^{60} - 40939 q^{61} + 53272 q^{62} + 38079 q^{63} + 9137 q^{64} + 76344 q^{65} + 93006 q^{66} + 19039 q^{67} + 94227 q^{68} + 81977 q^{69} - 71388 q^{70} - 70236 q^{71} - 63378 q^{72} + 67058 q^{73} - 59906 q^{74} + 159733 q^{75} - 17689 q^{76} - 9273 q^{77} + 143625 q^{78} - 32850 q^{79} - 180404 q^{80} - 104362 q^{81} - 86104 q^{82} + 71534 q^{83} + 21 q^{84} - 203721 q^{85} + 12052 q^{86} + 74737 q^{87} + 219426 q^{88} - 87268 q^{89} - 4024 q^{90} - 84207 q^{91} + 102655 q^{92} - 259664 q^{93} - 40248 q^{94} + 48013 q^{95} - 224273 q^{96} - 62458 q^{97} + 137074 q^{98} - 93927 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Coefficient data

For each \(n\) we display the coefficients of the \(q\)-expansion \(a_n\), the Satake parameters \(\alpha_p\), and the Satake angles \(\theta_p = \textrm{Arg}(\alpha_p)\).



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −10.1521 −1.79465 −0.897324 0.441372i \(-0.854492\pi\)
−0.897324 + 0.441372i \(0.854492\pi\)
\(3\) 16.4562 1.05567 0.527833 0.849348i \(-0.323005\pi\)
0.527833 + 0.849348i \(0.323005\pi\)
\(4\) 71.0645 2.22076
\(5\) −99.7603 −1.78457 −0.892284 0.451475i \(-0.850898\pi\)
−0.892284 + 0.451475i \(0.850898\pi\)
\(6\) −167.064 −1.89455
\(7\) −57.1289 −0.440668 −0.220334 0.975425i \(-0.570715\pi\)
−0.220334 + 0.975425i \(0.570715\pi\)
\(8\) −396.585 −2.19084
\(9\) 27.8066 0.114430
\(10\) 1012.77 3.20267
\(11\) −438.977 −1.09386 −0.546928 0.837180i \(-0.684203\pi\)
−0.546928 + 0.837180i \(0.684203\pi\)
\(12\) 1169.45 2.34439
\(13\) −477.590 −0.783785 −0.391892 0.920011i \(-0.628179\pi\)
−0.391892 + 0.920011i \(0.628179\pi\)
\(14\) 579.977 0.790844
\(15\) −1641.68 −1.88391
\(16\) 1752.10 1.71103
\(17\) 1671.39 1.40267 0.701334 0.712833i \(-0.252588\pi\)
0.701334 + 0.712833i \(0.252588\pi\)
\(18\) −282.294 −0.205362
\(19\) −361.000 −0.229416
\(20\) −7089.42 −3.96310
\(21\) −940.125 −0.465198
\(22\) 4456.52 1.96309
\(23\) 459.514 0.181125 0.0905627 0.995891i \(-0.471133\pi\)
0.0905627 + 0.995891i \(0.471133\pi\)
\(24\) −6526.29 −2.31280
\(25\) 6827.12 2.18468
\(26\) 4848.53 1.40662
\(27\) −3541.27 −0.934866
\(28\) −4059.84 −0.978619
\(29\) −2696.78 −0.595457 −0.297729 0.954651i \(-0.596229\pi\)
−0.297729 + 0.954651i \(0.596229\pi\)
\(30\) 16666.4 3.38095
\(31\) −2314.43 −0.432553 −0.216277 0.976332i \(-0.569391\pi\)
−0.216277 + 0.976332i \(0.569391\pi\)
\(32\) −5096.67 −0.879856
\(33\) −7223.89 −1.15475
\(34\) −16968.0 −2.51730
\(35\) 5699.20 0.786401
\(36\) 1976.06 0.254123
\(37\) 3022.51 0.362964 0.181482 0.983394i \(-0.441911\pi\)
0.181482 + 0.983394i \(0.441911\pi\)
\(38\) 3664.90 0.411721
\(39\) −7859.32 −0.827415
\(40\) 39563.5 3.90971
\(41\) 5483.05 0.509404 0.254702 0.967020i \(-0.418023\pi\)
0.254702 + 0.967020i \(0.418023\pi\)
\(42\) 9544.22 0.834867
\(43\) 5101.80 0.420777 0.210388 0.977618i \(-0.432527\pi\)
0.210388 + 0.977618i \(0.432527\pi\)
\(44\) −31195.7 −2.42920
\(45\) −2773.99 −0.204209
\(46\) −4665.02 −0.325057
\(47\) 5803.63 0.383226 0.191613 0.981471i \(-0.438628\pi\)
0.191613 + 0.981471i \(0.438628\pi\)
\(48\) 28832.8 1.80628
\(49\) −13543.3 −0.805812
\(50\) −69309.4 −3.92073
\(51\) 27504.7 1.48075
\(52\) −33939.7 −1.74060
\(53\) −23207.5 −1.13485 −0.567426 0.823424i \(-0.692061\pi\)
−0.567426 + 0.823424i \(0.692061\pi\)
\(54\) 35951.2 1.67776
\(55\) 43792.5 1.95206
\(56\) 22656.5 0.965434
\(57\) −5940.69 −0.242186
\(58\) 27377.9 1.06864
\(59\) −32849.5 −1.22857 −0.614284 0.789085i \(-0.710555\pi\)
−0.614284 + 0.789085i \(0.710555\pi\)
\(60\) −116665. −4.18371
\(61\) −46911.5 −1.61419 −0.807095 0.590422i \(-0.798961\pi\)
−0.807095 + 0.590422i \(0.798961\pi\)
\(62\) 23496.2 0.776281
\(63\) −1588.56 −0.0504258
\(64\) −4325.31 −0.131998
\(65\) 47644.5 1.39872
\(66\) 73337.4 2.07236
\(67\) −3565.12 −0.0970257 −0.0485128 0.998823i \(-0.515448\pi\)
−0.0485128 + 0.998823i \(0.515448\pi\)
\(68\) 118776. 3.11499
\(69\) 7561.86 0.191208
\(70\) −57858.7 −1.41131
\(71\) 2346.44 0.0552413 0.0276207 0.999618i \(-0.491207\pi\)
0.0276207 + 0.999618i \(0.491207\pi\)
\(72\) −11027.7 −0.250699
\(73\) 57370.0 1.26002 0.630010 0.776587i \(-0.283051\pi\)
0.630010 + 0.776587i \(0.283051\pi\)
\(74\) −30684.7 −0.651393
\(75\) 112349. 2.30629
\(76\) −25654.3 −0.509478
\(77\) 25078.3 0.482027
\(78\) 79788.3 1.48492
\(79\) −29715.8 −0.535698 −0.267849 0.963461i \(-0.586313\pi\)
−0.267849 + 0.963461i \(0.586313\pi\)
\(80\) −174790. −3.05345
\(81\) −65032.8 −1.10134
\(82\) −55664.3 −0.914202
\(83\) 60526.0 0.964377 0.482188 0.876068i \(-0.339842\pi\)
0.482188 + 0.876068i \(0.339842\pi\)
\(84\) −66809.5 −1.03309
\(85\) −166738. −2.50315
\(86\) −51793.8 −0.755147
\(87\) −44378.8 −0.628604
\(88\) 174092. 2.39647
\(89\) 19134.9 0.256066 0.128033 0.991770i \(-0.459134\pi\)
0.128033 + 0.991770i \(0.459134\pi\)
\(90\) 28161.8 0.366483
\(91\) 27284.2 0.345389
\(92\) 32655.1 0.402237
\(93\) −38086.7 −0.456631
\(94\) −58918.9 −0.687756
\(95\) 36013.5 0.409408
\(96\) −83871.9 −0.928834
\(97\) −43189.4 −0.466067 −0.233033 0.972469i \(-0.574865\pi\)
−0.233033 + 0.972469i \(0.574865\pi\)
\(98\) 137492. 1.44615
\(99\) −12206.4 −0.125170
\(100\) 485166. 4.85166
\(101\) −55330.5 −0.539711 −0.269855 0.962901i \(-0.586976\pi\)
−0.269855 + 0.962901i \(0.586976\pi\)
\(102\) −279229. −2.65742
\(103\) −205641. −1.90993 −0.954964 0.296722i \(-0.904107\pi\)
−0.954964 + 0.296722i \(0.904107\pi\)
\(104\) 189405. 1.71715
\(105\) 93787.2 0.830177
\(106\) 235604. 2.03666
\(107\) 181889. 1.53585 0.767923 0.640543i \(-0.221291\pi\)
0.767923 + 0.640543i \(0.221291\pi\)
\(108\) −251658. −2.07612
\(109\) 24288.8 0.195813 0.0979063 0.995196i \(-0.468785\pi\)
0.0979063 + 0.995196i \(0.468785\pi\)
\(110\) −444584. −3.50326
\(111\) 49739.0 0.383169
\(112\) −100095. −0.753996
\(113\) −229667. −1.69201 −0.846006 0.533174i \(-0.820999\pi\)
−0.846006 + 0.533174i \(0.820999\pi\)
\(114\) 60310.3 0.434639
\(115\) −45841.3 −0.323231
\(116\) −191645. −1.32237
\(117\) −13280.1 −0.0896888
\(118\) 333491. 2.20485
\(119\) −95484.6 −0.618110
\(120\) 651064. 4.12735
\(121\) 31649.7 0.196520
\(122\) 476248. 2.89690
\(123\) 90230.2 0.537761
\(124\) −164474. −0.960599
\(125\) −369325. −2.11414
\(126\) 16127.2 0.0904965
\(127\) 8086.69 0.0444899 0.0222450 0.999753i \(-0.492919\pi\)
0.0222450 + 0.999753i \(0.492919\pi\)
\(128\) 207004. 1.11675
\(129\) 83956.2 0.444200
\(130\) −483691. −2.51021
\(131\) 118712. 0.604390 0.302195 0.953246i \(-0.402281\pi\)
0.302195 + 0.953246i \(0.402281\pi\)
\(132\) −513362. −2.56442
\(133\) 20623.5 0.101096
\(134\) 36193.3 0.174127
\(135\) 353278. 1.66833
\(136\) −662847. −3.07303
\(137\) 65348.7 0.297465 0.148732 0.988877i \(-0.452481\pi\)
0.148732 + 0.988877i \(0.452481\pi\)
\(138\) −76768.5 −0.343151
\(139\) −28437.6 −0.124841 −0.0624203 0.998050i \(-0.519882\pi\)
−0.0624203 + 0.998050i \(0.519882\pi\)
\(140\) 405011. 1.74641
\(141\) 95505.7 0.404559
\(142\) −23821.3 −0.0991388
\(143\) 209651. 0.857347
\(144\) 48719.8 0.195794
\(145\) 269032. 1.06263
\(146\) −582424. −2.26130
\(147\) −222871. −0.850668
\(148\) 214793. 0.806057
\(149\) 115852. 0.427502 0.213751 0.976888i \(-0.431432\pi\)
0.213751 + 0.976888i \(0.431432\pi\)
\(150\) −1.14057e6 −4.13898
\(151\) 35980.9 0.128419 0.0642096 0.997936i \(-0.479547\pi\)
0.0642096 + 0.997936i \(0.479547\pi\)
\(152\) 143167. 0.502614
\(153\) 46475.6 0.160508
\(154\) −254596. −0.865069
\(155\) 230888. 0.771920
\(156\) −558518. −1.83749
\(157\) 566234. 1.83336 0.916678 0.399627i \(-0.130860\pi\)
0.916678 + 0.399627i \(0.130860\pi\)
\(158\) 301677. 0.961390
\(159\) −381908. −1.19802
\(160\) 508446. 1.57016
\(161\) −26251.6 −0.0798161
\(162\) 660217. 1.97651
\(163\) −307841. −0.907523 −0.453761 0.891123i \(-0.649918\pi\)
−0.453761 + 0.891123i \(0.649918\pi\)
\(164\) 389650. 1.13127
\(165\) 720658. 2.06072
\(166\) −614464. −1.73072
\(167\) 126991. 0.352357 0.176179 0.984358i \(-0.443626\pi\)
0.176179 + 0.984358i \(0.443626\pi\)
\(168\) 372840. 1.01918
\(169\) −143201. −0.385681
\(170\) 1.69274e6 4.49228
\(171\) −10038.2 −0.0262521
\(172\) 362556. 0.934446
\(173\) −582515. −1.47976 −0.739881 0.672738i \(-0.765118\pi\)
−0.739881 + 0.672738i \(0.765118\pi\)
\(174\) 450536. 1.12812
\(175\) −390026. −0.962718
\(176\) −769130. −1.87162
\(177\) −540579. −1.29696
\(178\) −194259. −0.459548
\(179\) −233819. −0.545440 −0.272720 0.962093i \(-0.587923\pi\)
−0.272720 + 0.962093i \(0.587923\pi\)
\(180\) −197132. −0.453500
\(181\) 318180. 0.721899 0.360950 0.932585i \(-0.382453\pi\)
0.360950 + 0.932585i \(0.382453\pi\)
\(182\) −276991. −0.619851
\(183\) −771985. −1.70404
\(184\) −182237. −0.396818
\(185\) −301527. −0.647734
\(186\) 386659. 0.819493
\(187\) −733700. −1.53432
\(188\) 412432. 0.851055
\(189\) 202309. 0.411965
\(190\) −365611. −0.734743
\(191\) −182032. −0.361047 −0.180523 0.983571i \(-0.557779\pi\)
−0.180523 + 0.983571i \(0.557779\pi\)
\(192\) −71178.2 −0.139346
\(193\) 286026. 0.552729 0.276365 0.961053i \(-0.410870\pi\)
0.276365 + 0.961053i \(0.410870\pi\)
\(194\) 438462. 0.836426
\(195\) 784048. 1.47658
\(196\) −962446. −1.78952
\(197\) −465880. −0.855281 −0.427640 0.903949i \(-0.640655\pi\)
−0.427640 + 0.903949i \(0.640655\pi\)
\(198\) 123921. 0.224637
\(199\) 1.06447e6 1.90547 0.952736 0.303798i \(-0.0982548\pi\)
0.952736 + 0.303798i \(0.0982548\pi\)
\(200\) −2.70754e6 −4.78629
\(201\) −58668.3 −0.102427
\(202\) 561719. 0.968591
\(203\) 154064. 0.262399
\(204\) 1.95461e6 3.28839
\(205\) −546991. −0.909067
\(206\) 2.08768e6 3.42765
\(207\) 12777.5 0.0207263
\(208\) −836784. −1.34108
\(209\) 158471. 0.250948
\(210\) −952134. −1.48988
\(211\) 1.00586e6 1.55536 0.777679 0.628662i \(-0.216397\pi\)
0.777679 + 0.628662i \(0.216397\pi\)
\(212\) −1.64923e6 −2.52024
\(213\) 38613.5 0.0583164
\(214\) −1.84655e6 −2.75630
\(215\) −508957. −0.750905
\(216\) 1.40441e6 2.04814
\(217\) 132221. 0.190612
\(218\) −246582. −0.351415
\(219\) 944092. 1.33016
\(220\) 3.11209e6 4.33506
\(221\) −798238. −1.09939
\(222\) −504954. −0.687653
\(223\) −377403. −0.508210 −0.254105 0.967177i \(-0.581781\pi\)
−0.254105 + 0.967177i \(0.581781\pi\)
\(224\) 291167. 0.387724
\(225\) 189839. 0.249994
\(226\) 2.33160e6 3.03657
\(227\) −1.28433e6 −1.65429 −0.827145 0.561989i \(-0.810036\pi\)
−0.827145 + 0.561989i \(0.810036\pi\)
\(228\) −422172. −0.537839
\(229\) 299103. 0.376905 0.188452 0.982082i \(-0.439653\pi\)
0.188452 + 0.982082i \(0.439653\pi\)
\(230\) 465384. 0.580085
\(231\) 412693. 0.508859
\(232\) 1.06950e6 1.30455
\(233\) 564942. 0.681732 0.340866 0.940112i \(-0.389280\pi\)
0.340866 + 0.940112i \(0.389280\pi\)
\(234\) 134821. 0.160960
\(235\) −578972. −0.683893
\(236\) −2.33443e6 −2.72836
\(237\) −489010. −0.565518
\(238\) 969366. 1.10929
\(239\) −1.03635e6 −1.17358 −0.586789 0.809740i \(-0.699608\pi\)
−0.586789 + 0.809740i \(0.699608\pi\)
\(240\) −2.87637e6 −3.22342
\(241\) 821274. 0.910847 0.455423 0.890275i \(-0.349488\pi\)
0.455423 + 0.890275i \(0.349488\pi\)
\(242\) −321310. −0.352684
\(243\) −209665. −0.227777
\(244\) −3.33374e6 −3.58473
\(245\) 1.35108e6 1.43803
\(246\) −916023. −0.965092
\(247\) 172410. 0.179813
\(248\) 917868. 0.947656
\(249\) 996028. 1.01806
\(250\) 3.74941e6 3.79414
\(251\) 1.23062e6 1.23293 0.616467 0.787380i \(-0.288563\pi\)
0.616467 + 0.787380i \(0.288563\pi\)
\(252\) −112890. −0.111984
\(253\) −201716. −0.198125
\(254\) −82096.7 −0.0798438
\(255\) −2.74388e6 −2.64249
\(256\) −1.96311e6 −1.87217
\(257\) −1.05206e6 −0.993592 −0.496796 0.867867i \(-0.665490\pi\)
−0.496796 + 0.867867i \(0.665490\pi\)
\(258\) −852329. −0.797183
\(259\) −172673. −0.159946
\(260\) 3.38583e6 3.10622
\(261\) −74988.2 −0.0681384
\(262\) −1.20517e6 −1.08467
\(263\) 1.88157e6 1.67738 0.838688 0.544612i \(-0.183323\pi\)
0.838688 + 0.544612i \(0.183323\pi\)
\(264\) 2.86489e6 2.52987
\(265\) 2.31519e6 2.02522
\(266\) −209372. −0.181432
\(267\) 314888. 0.270320
\(268\) −253353. −0.215471
\(269\) −1.05389e6 −0.888002 −0.444001 0.896026i \(-0.646441\pi\)
−0.444001 + 0.896026i \(0.646441\pi\)
\(270\) −3.58650e6 −2.99407
\(271\) 688686. 0.569637 0.284818 0.958581i \(-0.408067\pi\)
0.284818 + 0.958581i \(0.408067\pi\)
\(272\) 2.92843e6 2.40001
\(273\) 448995. 0.364615
\(274\) −663425. −0.533845
\(275\) −2.99695e6 −2.38972
\(276\) 537380. 0.424628
\(277\) −522720. −0.409326 −0.204663 0.978832i \(-0.565610\pi\)
−0.204663 + 0.978832i \(0.565610\pi\)
\(278\) 288701. 0.224045
\(279\) −64356.3 −0.0494972
\(280\) −2.26022e6 −1.72288
\(281\) −2.00251e6 −1.51290 −0.756448 0.654053i \(-0.773067\pi\)
−0.756448 + 0.654053i \(0.773067\pi\)
\(282\) −969581. −0.726041
\(283\) −2.25219e6 −1.67163 −0.835813 0.549014i \(-0.815003\pi\)
−0.835813 + 0.549014i \(0.815003\pi\)
\(284\) 166749. 0.122678
\(285\) 592645. 0.432198
\(286\) −2.12839e6 −1.53864
\(287\) −313241. −0.224478
\(288\) −141721. −0.100682
\(289\) 1.37368e6 0.967476
\(290\) −2.73123e6 −1.90705
\(291\) −710734. −0.492011
\(292\) 4.07697e6 2.79821
\(293\) 1.76627e6 1.20195 0.600976 0.799267i \(-0.294779\pi\)
0.600976 + 0.799267i \(0.294779\pi\)
\(294\) 2.26260e6 1.52665
\(295\) 3.27708e6 2.19246
\(296\) −1.19868e6 −0.795197
\(297\) 1.55453e6 1.02261
\(298\) −1.17614e6 −0.767216
\(299\) −219459. −0.141963
\(300\) 7.98399e6 5.12173
\(301\) −291460. −0.185423
\(302\) −365281. −0.230467
\(303\) −910530. −0.569754
\(304\) −632507. −0.392537
\(305\) 4.67990e6 2.88063
\(306\) −471823. −0.288055
\(307\) −1.71867e6 −1.04075 −0.520376 0.853937i \(-0.674208\pi\)
−0.520376 + 0.853937i \(0.674208\pi\)
\(308\) 1.78218e6 1.07047
\(309\) −3.38407e6 −2.01625
\(310\) −2.34399e6 −1.38533
\(311\) 1.58149e6 0.927182 0.463591 0.886049i \(-0.346561\pi\)
0.463591 + 0.886049i \(0.346561\pi\)
\(312\) 3.11689e6 1.81274
\(313\) 54617.0 0.0315114 0.0157557 0.999876i \(-0.494985\pi\)
0.0157557 + 0.999876i \(0.494985\pi\)
\(314\) −5.74844e6 −3.29023
\(315\) 158475. 0.0899882
\(316\) −2.11174e6 −1.18966
\(317\) −1.03467e6 −0.578303 −0.289151 0.957283i \(-0.593373\pi\)
−0.289151 + 0.957283i \(0.593373\pi\)
\(318\) 3.87715e6 2.15003
\(319\) 1.18382e6 0.651344
\(320\) 431495. 0.235559
\(321\) 2.99321e6 1.62134
\(322\) 266508. 0.143242
\(323\) −603371. −0.321794
\(324\) −4.62152e6 −2.44581
\(325\) −3.26057e6 −1.71232
\(326\) 3.12522e6 1.62868
\(327\) 399702. 0.206713
\(328\) −2.17450e6 −1.11603
\(329\) −331555. −0.168875
\(330\) −7.31617e6 −3.69827
\(331\) 2.03987e6 1.02337 0.511685 0.859173i \(-0.329021\pi\)
0.511685 + 0.859173i \(0.329021\pi\)
\(332\) 4.30125e6 2.14165
\(333\) 84045.7 0.0415341
\(334\) −1.28923e6 −0.632358
\(335\) 355657. 0.173149
\(336\) −1.64719e6 −0.795968
\(337\) 1.22774e6 0.588887 0.294444 0.955669i \(-0.404866\pi\)
0.294444 + 0.955669i \(0.404866\pi\)
\(338\) 1.45378e6 0.692162
\(339\) −3.77945e6 −1.78620
\(340\) −1.18492e7 −5.55892
\(341\) 1.01598e6 0.473150
\(342\) 101908. 0.0471134
\(343\) 1.73388e6 0.795763
\(344\) −2.02330e6 −0.921857
\(345\) −754374. −0.341223
\(346\) 5.91373e6 2.65565
\(347\) 3.93267e6 1.75333 0.876665 0.481101i \(-0.159763\pi\)
0.876665 + 0.481101i \(0.159763\pi\)
\(348\) −3.15375e6 −1.39598
\(349\) −3.46176e6 −1.52136 −0.760682 0.649125i \(-0.775135\pi\)
−0.760682 + 0.649125i \(0.775135\pi\)
\(350\) 3.95957e6 1.72774
\(351\) 1.69127e6 0.732734
\(352\) 2.23732e6 0.962436
\(353\) −3.91227e6 −1.67106 −0.835531 0.549443i \(-0.814840\pi\)
−0.835531 + 0.549443i \(0.814840\pi\)
\(354\) 5.48799e6 2.32758
\(355\) −234082. −0.0985819
\(356\) 1.35981e6 0.568662
\(357\) −1.57131e6 −0.652518
\(358\) 2.37375e6 0.978874
\(359\) −949856. −0.388975 −0.194487 0.980905i \(-0.562304\pi\)
−0.194487 + 0.980905i \(0.562304\pi\)
\(360\) 1.10012e6 0.447389
\(361\) 130321. 0.0526316
\(362\) −3.23018e6 −1.29556
\(363\) 520834. 0.207459
\(364\) 1.93894e6 0.767027
\(365\) −5.72325e6 −2.24859
\(366\) 7.83724e6 3.05816
\(367\) 3.72584e6 1.44397 0.721986 0.691908i \(-0.243230\pi\)
0.721986 + 0.691908i \(0.243230\pi\)
\(368\) 805113. 0.309911
\(369\) 152465. 0.0582914
\(370\) 3.06112e6 1.16245
\(371\) 1.32582e6 0.500093
\(372\) −2.70661e6 −1.01407
\(373\) −4.15376e6 −1.54586 −0.772929 0.634493i \(-0.781209\pi\)
−0.772929 + 0.634493i \(0.781209\pi\)
\(374\) 7.44857e6 2.75356
\(375\) −6.07769e6 −2.23183
\(376\) −2.30163e6 −0.839589
\(377\) 1.28796e6 0.466710
\(378\) −2.05385e6 −0.739332
\(379\) 2.29264e6 0.819857 0.409928 0.912118i \(-0.365554\pi\)
0.409928 + 0.912118i \(0.365554\pi\)
\(380\) 2.55928e6 0.909198
\(381\) 133076. 0.0469665
\(382\) 1.84800e6 0.647952
\(383\) 3.09365e6 1.07764 0.538821 0.842420i \(-0.318870\pi\)
0.538821 + 0.842420i \(0.318870\pi\)
\(384\) 3.40651e6 1.17891
\(385\) −2.50182e6 −0.860209
\(386\) −2.90376e6 −0.991955
\(387\) 141864. 0.0481497
\(388\) −3.06923e6 −1.03502
\(389\) −4.53732e6 −1.52029 −0.760144 0.649755i \(-0.774871\pi\)
−0.760144 + 0.649755i \(0.774871\pi\)
\(390\) −7.95971e6 −2.64994
\(391\) 768026. 0.254059
\(392\) 5.37107e6 1.76541
\(393\) 1.95355e6 0.638034
\(394\) 4.72965e6 1.53493
\(395\) 2.96446e6 0.955989
\(396\) −867445. −0.277974
\(397\) −404604. −0.128841 −0.0644205 0.997923i \(-0.520520\pi\)
−0.0644205 + 0.997923i \(0.520520\pi\)
\(398\) −1.08066e7 −3.41965
\(399\) 339385. 0.106724
\(400\) 1.19618e7 3.73806
\(401\) −5.08752e6 −1.57996 −0.789978 0.613135i \(-0.789908\pi\)
−0.789978 + 0.613135i \(0.789908\pi\)
\(402\) 595604. 0.183820
\(403\) 1.10535e6 0.339029
\(404\) −3.93203e6 −1.19857
\(405\) 6.48769e6 1.96541
\(406\) −1.56407e6 −0.470913
\(407\) −1.32681e6 −0.397030
\(408\) −1.09079e7 −3.24409
\(409\) 367772. 0.108710 0.0543551 0.998522i \(-0.482690\pi\)
0.0543551 + 0.998522i \(0.482690\pi\)
\(410\) 5.55309e6 1.63146
\(411\) 1.07539e6 0.314024
\(412\) −1.46138e7 −4.24150
\(413\) 1.87666e6 0.541390
\(414\) −129718. −0.0371964
\(415\) −6.03809e6 −1.72099
\(416\) 2.43412e6 0.689618
\(417\) −467975. −0.131790
\(418\) −1.60880e6 −0.450363
\(419\) −4.12612e6 −1.14817 −0.574086 0.818795i \(-0.694643\pi\)
−0.574086 + 0.818795i \(0.694643\pi\)
\(420\) 6.66494e6 1.84363
\(421\) −2.05918e6 −0.566224 −0.283112 0.959087i \(-0.591367\pi\)
−0.283112 + 0.959087i \(0.591367\pi\)
\(422\) −1.02115e7 −2.79132
\(423\) 161379. 0.0438527
\(424\) 9.20376e6 2.48628
\(425\) 1.14108e7 3.06438
\(426\) −392007. −0.104657
\(427\) 2.68000e6 0.711321
\(428\) 1.29259e7 3.41075
\(429\) 3.45006e6 0.905072
\(430\) 5.16696e6 1.34761
\(431\) −3.23089e6 −0.837777 −0.418889 0.908038i \(-0.637580\pi\)
−0.418889 + 0.908038i \(0.637580\pi\)
\(432\) −6.20464e6 −1.59958
\(433\) −4.46477e6 −1.14440 −0.572202 0.820113i \(-0.693911\pi\)
−0.572202 + 0.820113i \(0.693911\pi\)
\(434\) −1.34231e6 −0.342082
\(435\) 4.42724e6 1.12179
\(436\) 1.72607e6 0.434854
\(437\) −165885. −0.0415530
\(438\) −9.58449e6 −2.38717
\(439\) 3.96204e6 0.981201 0.490601 0.871385i \(-0.336777\pi\)
0.490601 + 0.871385i \(0.336777\pi\)
\(440\) −1.73674e7 −4.27666
\(441\) −376592. −0.0922094
\(442\) 8.10376e6 1.97302
\(443\) 5.87689e6 1.42278 0.711391 0.702797i \(-0.248066\pi\)
0.711391 + 0.702797i \(0.248066\pi\)
\(444\) 3.53468e6 0.850927
\(445\) −1.90890e6 −0.456966
\(446\) 3.83142e6 0.912059
\(447\) 1.90649e6 0.451299
\(448\) 247101. 0.0581673
\(449\) −2.62215e6 −0.613820 −0.306910 0.951739i \(-0.599295\pi\)
−0.306910 + 0.951739i \(0.599295\pi\)
\(450\) −1.92726e6 −0.448651
\(451\) −2.40693e6 −0.557215
\(452\) −1.63212e7 −3.75756
\(453\) 592109. 0.135568
\(454\) 1.30386e7 2.96887
\(455\) −2.72188e6 −0.616369
\(456\) 2.35599e6 0.530593
\(457\) 5.12578e6 1.14807 0.574037 0.818830i \(-0.305377\pi\)
0.574037 + 0.818830i \(0.305377\pi\)
\(458\) −3.03651e6 −0.676411
\(459\) −5.91883e6 −1.31131
\(460\) −3.25769e6 −0.717819
\(461\) 2.65571e6 0.582008 0.291004 0.956722i \(-0.406011\pi\)
0.291004 + 0.956722i \(0.406011\pi\)
\(462\) −4.18969e6 −0.913223
\(463\) −2.94632e6 −0.638744 −0.319372 0.947629i \(-0.603472\pi\)
−0.319372 + 0.947629i \(0.603472\pi\)
\(464\) −4.72502e6 −1.01885
\(465\) 3.79954e6 0.814890
\(466\) −5.73533e6 −1.22347
\(467\) 1.82563e6 0.387364 0.193682 0.981064i \(-0.437957\pi\)
0.193682 + 0.981064i \(0.437957\pi\)
\(468\) −943747. −0.199178
\(469\) 203671. 0.0427561
\(470\) 5.87776e6 1.22735
\(471\) 9.31806e6 1.93541
\(472\) 1.30276e7 2.69160
\(473\) −2.23957e6 −0.460269
\(474\) 4.96446e6 1.01491
\(475\) −2.46459e6 −0.501200
\(476\) −6.78556e6 −1.37268
\(477\) −645322. −0.129862
\(478\) 1.05211e7 2.10616
\(479\) 5.92850e6 1.18061 0.590304 0.807181i \(-0.299008\pi\)
0.590304 + 0.807181i \(0.299008\pi\)
\(480\) 8.36709e6 1.65757
\(481\) −1.44352e6 −0.284486
\(482\) −8.33763e6 −1.63465
\(483\) −432001. −0.0842592
\(484\) 2.24917e6 0.436424
\(485\) 4.30859e6 0.831727
\(486\) 2.12853e6 0.408780
\(487\) −3.61261e6 −0.690237 −0.345118 0.938559i \(-0.612161\pi\)
−0.345118 + 0.938559i \(0.612161\pi\)
\(488\) 1.86044e7 3.53644
\(489\) −5.06589e6 −0.958041
\(490\) −1.37163e7 −2.58075
\(491\) −4.32852e6 −0.810281 −0.405140 0.914255i \(-0.632777\pi\)
−0.405140 + 0.914255i \(0.632777\pi\)
\(492\) 6.41216e6 1.19424
\(493\) −4.50736e6 −0.835228
\(494\) −1.75032e6 −0.322700
\(495\) 1.21772e6 0.223375
\(496\) −4.05510e6 −0.740112
\(497\) −134050. −0.0243431
\(498\) −1.01117e7 −1.82706
\(499\) −4.93615e6 −0.887435 −0.443718 0.896167i \(-0.646341\pi\)
−0.443718 + 0.896167i \(0.646341\pi\)
\(500\) −2.62459e7 −4.69501
\(501\) 2.08980e6 0.371972
\(502\) −1.24933e7 −2.21268
\(503\) 1.03023e6 0.181557 0.0907786 0.995871i \(-0.471064\pi\)
0.0907786 + 0.995871i \(0.471064\pi\)
\(504\) 630000. 0.110475
\(505\) 5.51979e6 0.963150
\(506\) 2.04784e6 0.355565
\(507\) −2.35654e6 −0.407151
\(508\) 574677. 0.0988017
\(509\) 4.99120e6 0.853907 0.426954 0.904274i \(-0.359587\pi\)
0.426954 + 0.904274i \(0.359587\pi\)
\(510\) 2.78560e7 4.74235
\(511\) −3.27749e6 −0.555250
\(512\) 1.33055e7 2.24314
\(513\) 1.27840e6 0.214473
\(514\) 1.06806e7 1.78315
\(515\) 2.05148e7 3.40839
\(516\) 5.96630e6 0.986463
\(517\) −2.54766e6 −0.419194
\(518\) 1.75299e6 0.287048
\(519\) −9.58598e6 −1.56213
\(520\) −1.88951e7 −3.06437
\(521\) 9.78050e6 1.57858 0.789291 0.614020i \(-0.210449\pi\)
0.789291 + 0.614020i \(0.210449\pi\)
\(522\) 761286. 0.122284
\(523\) −6.73157e6 −1.07612 −0.538062 0.842905i \(-0.680843\pi\)
−0.538062 + 0.842905i \(0.680843\pi\)
\(524\) 8.43622e6 1.34221
\(525\) −6.41835e6 −1.01631
\(526\) −1.91018e7 −3.01030
\(527\) −3.86830e6 −0.606728
\(528\) −1.26570e7 −1.97581
\(529\) −6.22519e6 −0.967194
\(530\) −2.35040e7 −3.63456
\(531\) −913433. −0.140586
\(532\) 1.46560e6 0.224511
\(533\) −2.61865e6 −0.399264
\(534\) −3.19676e6 −0.485129
\(535\) −1.81453e7 −2.74082
\(536\) 1.41387e6 0.212568
\(537\) −3.84777e6 −0.575803
\(538\) 1.06991e7 1.59365
\(539\) 5.94519e6 0.881442
\(540\) 2.51055e7 3.70497
\(541\) −6.68215e6 −0.981574 −0.490787 0.871280i \(-0.663291\pi\)
−0.490787 + 0.871280i \(0.663291\pi\)
\(542\) −6.99159e6 −1.02230
\(543\) 5.23603e6 0.762084
\(544\) −8.51851e6 −1.23415
\(545\) −2.42306e6 −0.349441
\(546\) −4.55822e6 −0.654356
\(547\) −235187. −0.0336081 −0.0168041 0.999859i \(-0.505349\pi\)
−0.0168041 + 0.999859i \(0.505349\pi\)
\(548\) 4.64397e6 0.660600
\(549\) −1.30445e6 −0.184712
\(550\) 3.04252e7 4.28872
\(551\) 973538. 0.136607
\(552\) −2.99892e6 −0.418907
\(553\) 1.69763e6 0.236065
\(554\) 5.30668e6 0.734597
\(555\) −4.96198e6 −0.683790
\(556\) −2.02090e6 −0.277242
\(557\) −4.80203e6 −0.655824 −0.327912 0.944708i \(-0.606345\pi\)
−0.327912 + 0.944708i \(0.606345\pi\)
\(558\) 653350. 0.0888301
\(559\) −2.43657e6 −0.329799
\(560\) 9.98555e6 1.34556
\(561\) −1.20739e7 −1.61972
\(562\) 2.03296e7 2.71512
\(563\) −8.37831e6 −1.11400 −0.557000 0.830512i \(-0.688048\pi\)
−0.557000 + 0.830512i \(0.688048\pi\)
\(564\) 6.78706e6 0.898430
\(565\) 2.29117e7 3.01951
\(566\) 2.28644e7 2.99998
\(567\) 3.71525e6 0.485323
\(568\) −930565. −0.121025
\(569\) −8.38130e6 −1.08525 −0.542626 0.839974i \(-0.682570\pi\)
−0.542626 + 0.839974i \(0.682570\pi\)
\(570\) −6.01657e6 −0.775643
\(571\) 3.97400e6 0.510079 0.255040 0.966931i \(-0.417912\pi\)
0.255040 + 0.966931i \(0.417912\pi\)
\(572\) 1.48987e7 1.90397
\(573\) −2.99555e6 −0.381145
\(574\) 3.18004e6 0.402859
\(575\) 3.13716e6 0.395701
\(576\) −120272. −0.0151046
\(577\) 1.40884e7 1.76166 0.880830 0.473432i \(-0.156985\pi\)
0.880830 + 0.473432i \(0.156985\pi\)
\(578\) −1.39457e7 −1.73628
\(579\) 4.70690e6 0.583497
\(580\) 1.91186e7 2.35986
\(581\) −3.45779e6 −0.424970
\(582\) 7.21542e6 0.882986
\(583\) 1.01876e7 1.24136
\(584\) −2.27521e7 −2.76051
\(585\) 1.32483e6 0.160056
\(586\) −1.79313e7 −2.15708
\(587\) 3.14647e6 0.376901 0.188451 0.982083i \(-0.439653\pi\)
0.188451 + 0.982083i \(0.439653\pi\)
\(588\) −1.58382e7 −1.88913
\(589\) 835508. 0.0992345
\(590\) −3.32691e7 −3.93470
\(591\) −7.66662e6 −0.902891
\(592\) 5.29573e6 0.621043
\(593\) −4.29402e6 −0.501450 −0.250725 0.968058i \(-0.580669\pi\)
−0.250725 + 0.968058i \(0.580669\pi\)
\(594\) −1.57817e7 −1.83522
\(595\) 9.52557e6 1.10306
\(596\) 8.23297e6 0.949382
\(597\) 1.75172e7 2.01154
\(598\) 2.22797e6 0.254774
\(599\) −6.82650e6 −0.777376 −0.388688 0.921370i \(-0.627072\pi\)
−0.388688 + 0.921370i \(0.627072\pi\)
\(600\) −4.45558e7 −5.05273
\(601\) 1.82575e6 0.206184 0.103092 0.994672i \(-0.467126\pi\)
0.103092 + 0.994672i \(0.467126\pi\)
\(602\) 2.95892e6 0.332769
\(603\) −99133.7 −0.0111027
\(604\) 2.55697e6 0.285189
\(605\) −3.15738e6 −0.350703
\(606\) 9.24376e6 1.02251
\(607\) −2.44884e6 −0.269767 −0.134883 0.990861i \(-0.543066\pi\)
−0.134883 + 0.990861i \(0.543066\pi\)
\(608\) 1.83990e6 0.201853
\(609\) 2.53531e6 0.277005
\(610\) −4.75107e7 −5.16972
\(611\) −2.77176e6 −0.300367
\(612\) 3.30276e6 0.356450
\(613\) −6.05994e6 −0.651354 −0.325677 0.945481i \(-0.605592\pi\)
−0.325677 + 0.945481i \(0.605592\pi\)
\(614\) 1.74481e7 1.86778
\(615\) −9.00140e6 −0.959670
\(616\) −9.94568e6 −1.05605
\(617\) 9.33155e6 0.986827 0.493414 0.869795i \(-0.335749\pi\)
0.493414 + 0.869795i \(0.335749\pi\)
\(618\) 3.43553e7 3.61845
\(619\) −9.73252e6 −1.02094 −0.510468 0.859897i \(-0.670528\pi\)
−0.510468 + 0.859897i \(0.670528\pi\)
\(620\) 1.64079e7 1.71425
\(621\) −1.62726e6 −0.169328
\(622\) −1.60554e7 −1.66397
\(623\) −1.09316e6 −0.112840
\(624\) −1.37703e7 −1.41573
\(625\) 1.55092e7 1.58815
\(626\) −554475. −0.0565518
\(627\) 2.60783e6 0.264917
\(628\) 4.02391e7 4.07145
\(629\) 5.05178e6 0.509118
\(630\) −1.60885e6 −0.161497
\(631\) 8.09784e6 0.809647 0.404824 0.914395i \(-0.367333\pi\)
0.404824 + 0.914395i \(0.367333\pi\)
\(632\) 1.17849e7 1.17363
\(633\) 1.65526e7 1.64194
\(634\) 1.05041e7 1.03785
\(635\) −806731. −0.0793953
\(636\) −2.71401e7 −2.66053
\(637\) 6.46814e6 0.631583
\(638\) −1.20183e7 −1.16893
\(639\) 65246.6 0.00632129
\(640\) −2.06508e7 −1.99291
\(641\) −1.54883e7 −1.48887 −0.744436 0.667694i \(-0.767282\pi\)
−0.744436 + 0.667694i \(0.767282\pi\)
\(642\) −3.03872e7 −2.90973
\(643\) 1.43966e7 1.37320 0.686600 0.727036i \(-0.259103\pi\)
0.686600 + 0.727036i \(0.259103\pi\)
\(644\) −1.86555e6 −0.177253
\(645\) −8.37550e6 −0.792704
\(646\) 6.12546e6 0.577507
\(647\) −6.47992e6 −0.608568 −0.304284 0.952581i \(-0.598417\pi\)
−0.304284 + 0.952581i \(0.598417\pi\)
\(648\) 2.57910e7 2.41286
\(649\) 1.44202e7 1.34388
\(650\) 3.31015e7 3.07301
\(651\) 2.17585e6 0.201223
\(652\) −2.18766e7 −2.01539
\(653\) −7.89619e6 −0.724660 −0.362330 0.932050i \(-0.618019\pi\)
−0.362330 + 0.932050i \(0.618019\pi\)
\(654\) −4.05780e6 −0.370977
\(655\) −1.18428e7 −1.07857
\(656\) 9.60683e6 0.871607
\(657\) 1.59526e6 0.144185
\(658\) 3.36597e6 0.303072
\(659\) −1.08756e7 −0.975530 −0.487765 0.872975i \(-0.662188\pi\)
−0.487765 + 0.872975i \(0.662188\pi\)
\(660\) 5.12132e7 4.57638
\(661\) −8.09950e6 −0.721032 −0.360516 0.932753i \(-0.617399\pi\)
−0.360516 + 0.932753i \(0.617399\pi\)
\(662\) −2.07089e7 −1.83659
\(663\) −1.31360e7 −1.16059
\(664\) −2.40037e7 −2.11280
\(665\) −2.05741e6 −0.180413
\(666\) −853238. −0.0745391
\(667\) −1.23921e6 −0.107852
\(668\) 9.02458e6 0.782503
\(669\) −6.21062e6 −0.536500
\(670\) −3.61066e6 −0.310741
\(671\) 2.05930e7 1.76569
\(672\) 4.79151e6 0.409307
\(673\) 6.23497e6 0.530636 0.265318 0.964161i \(-0.414523\pi\)
0.265318 + 0.964161i \(0.414523\pi\)
\(674\) −1.24641e7 −1.05685
\(675\) −2.41767e7 −2.04238
\(676\) −1.01765e7 −0.856507
\(677\) 1.16588e7 0.977649 0.488824 0.872382i \(-0.337426\pi\)
0.488824 + 0.872382i \(0.337426\pi\)
\(678\) 3.83693e7 3.20560
\(679\) 2.46737e6 0.205380
\(680\) 6.61259e7 5.48402
\(681\) −2.11352e7 −1.74638
\(682\) −1.03143e7 −0.849139
\(683\) −1.22340e6 −0.100350 −0.0501748 0.998740i \(-0.515978\pi\)
−0.0501748 + 0.998740i \(0.515978\pi\)
\(684\) −713358. −0.0582998
\(685\) −6.51921e6 −0.530846
\(686\) −1.76025e7 −1.42811
\(687\) 4.92209e6 0.397885
\(688\) 8.93884e6 0.719962
\(689\) 1.10837e7 0.889480
\(690\) 7.65845e6 0.612376
\(691\) −5.82015e6 −0.463702 −0.231851 0.972751i \(-0.574478\pi\)
−0.231851 + 0.972751i \(0.574478\pi\)
\(692\) −4.13961e7 −3.28620
\(693\) 697341. 0.0551585
\(694\) −3.99247e7 −3.14661
\(695\) 2.83695e6 0.222787
\(696\) 1.76000e7 1.37717
\(697\) 9.16430e6 0.714525
\(698\) 3.51440e7 2.73031
\(699\) 9.29680e6 0.719682
\(700\) −2.77170e7 −2.13797
\(701\) 9.44191e6 0.725713 0.362856 0.931845i \(-0.381802\pi\)
0.362856 + 0.931845i \(0.381802\pi\)
\(702\) −1.71699e7 −1.31500
\(703\) −1.09113e6 −0.0832696
\(704\) 1.89871e6 0.144387
\(705\) −9.52768e6 −0.721962
\(706\) 3.97177e7 2.99897
\(707\) 3.16097e6 0.237833
\(708\) −3.84159e7 −2.88024
\(709\) 7.88964e6 0.589443 0.294721 0.955583i \(-0.404773\pi\)
0.294721 + 0.955583i \(0.404773\pi\)
\(710\) 2.37642e6 0.176920
\(711\) −826296. −0.0613002
\(712\) −7.58862e6 −0.561000
\(713\) −1.06351e6 −0.0783464
\(714\) 1.59521e7 1.17104
\(715\) −2.09149e7 −1.52999
\(716\) −1.66162e7 −1.21129
\(717\) −1.70544e7 −1.23891
\(718\) 9.64300e6 0.698073
\(719\) 1.89500e7 1.36706 0.683530 0.729922i \(-0.260444\pi\)
0.683530 + 0.729922i \(0.260444\pi\)
\(720\) −4.86030e6 −0.349408
\(721\) 1.17481e7 0.841643
\(722\) −1.32303e6 −0.0944552
\(723\) 1.35150e7 0.961550
\(724\) 2.26113e7 1.60317
\(725\) −1.84113e7 −1.30088
\(726\) −5.28754e6 −0.372316
\(727\) 6.46947e6 0.453976 0.226988 0.973898i \(-0.427112\pi\)
0.226988 + 0.973898i \(0.427112\pi\)
\(728\) −1.08205e7 −0.756693
\(729\) 1.23527e7 0.860879
\(730\) 5.81028e7 4.03543
\(731\) 8.52707e6 0.590210
\(732\) −5.48607e7 −3.78428
\(733\) 6.39936e6 0.439923 0.219962 0.975509i \(-0.429407\pi\)
0.219962 + 0.975509i \(0.429407\pi\)
\(734\) −3.78249e7 −2.59142
\(735\) 2.22337e7 1.51807
\(736\) −2.34199e6 −0.159364
\(737\) 1.56500e6 0.106132
\(738\) −1.54783e6 −0.104613
\(739\) −1.28565e7 −0.865987 −0.432993 0.901397i \(-0.642543\pi\)
−0.432993 + 0.901397i \(0.642543\pi\)
\(740\) −2.14278e7 −1.43846
\(741\) 2.83721e6 0.189822
\(742\) −1.34598e7 −0.897491
\(743\) −2.19966e7 −1.46179 −0.730893 0.682492i \(-0.760896\pi\)
−0.730893 + 0.682492i \(0.760896\pi\)
\(744\) 1.51046e7 1.00041
\(745\) −1.15574e7 −0.762906
\(746\) 4.21693e7 2.77427
\(747\) 1.68302e6 0.110354
\(748\) −5.21400e7 −3.40735
\(749\) −1.03911e7 −0.676797
\(750\) 6.17011e7 4.00534
\(751\) 4.73982e6 0.306663 0.153332 0.988175i \(-0.451000\pi\)
0.153332 + 0.988175i \(0.451000\pi\)
\(752\) 1.01685e7 0.655712
\(753\) 2.02514e7 1.30157
\(754\) −1.30754e7 −0.837581
\(755\) −3.58947e6 −0.229173
\(756\) 1.43770e7 0.914877
\(757\) −8.15849e6 −0.517452 −0.258726 0.965951i \(-0.583303\pi\)
−0.258726 + 0.965951i \(0.583303\pi\)
\(758\) −2.32750e7 −1.47135
\(759\) −3.31948e6 −0.209154
\(760\) −1.42824e7 −0.896949
\(761\) −2.40805e7 −1.50731 −0.753657 0.657268i \(-0.771712\pi\)
−0.753657 + 0.657268i \(0.771712\pi\)
\(762\) −1.35100e6 −0.0842884
\(763\) −1.38760e6 −0.0862883
\(764\) −1.29360e7 −0.801800
\(765\) −4.63642e6 −0.286437
\(766\) −3.14069e7 −1.93399
\(767\) 1.56886e7 0.962933
\(768\) −3.23054e7 −1.97639
\(769\) −3.57395e6 −0.217938 −0.108969 0.994045i \(-0.534755\pi\)
−0.108969 + 0.994045i \(0.534755\pi\)
\(770\) 2.53986e7 1.54377
\(771\) −1.73129e7 −1.04890
\(772\) 2.03263e7 1.22748
\(773\) 1.38262e7 0.832251 0.416126 0.909307i \(-0.363388\pi\)
0.416126 + 0.909307i \(0.363388\pi\)
\(774\) −1.44021e6 −0.0864117
\(775\) −1.58009e7 −0.944990
\(776\) 1.71283e7 1.02108
\(777\) −2.84154e6 −0.168850
\(778\) 4.60632e7 2.72838
\(779\) −1.97938e6 −0.116865
\(780\) 5.57180e7 3.27913
\(781\) −1.03003e6 −0.0604260
\(782\) −7.79705e6 −0.455946
\(783\) 9.55002e6 0.556672
\(784\) −2.37291e7 −1.37877
\(785\) −5.64877e7 −3.27175
\(786\) −1.98326e7 −1.14505
\(787\) 2.52043e7 1.45057 0.725283 0.688451i \(-0.241709\pi\)
0.725283 + 0.688451i \(0.241709\pi\)
\(788\) −3.31075e7 −1.89938
\(789\) 3.09635e7 1.77075
\(790\) −3.00954e7 −1.71567
\(791\) 1.31207e7 0.745615
\(792\) 4.84090e6 0.274229
\(793\) 2.24045e7 1.26518
\(794\) 4.10757e6 0.231224
\(795\) 3.80993e7 2.13796
\(796\) 7.56464e7 4.23161
\(797\) 3.37562e7 1.88238 0.941190 0.337877i \(-0.109709\pi\)
0.941190 + 0.337877i \(0.109709\pi\)
\(798\) −3.44546e6 −0.191532
\(799\) 9.70011e6 0.537539
\(800\) −3.47956e7 −1.92220
\(801\) 532076. 0.0293017
\(802\) 5.16488e7 2.83547
\(803\) −2.51841e7 −1.37828
\(804\) −4.16923e6 −0.227466
\(805\) 2.61887e6 0.142437
\(806\) −1.12216e7 −0.608437
\(807\) −1.73430e7 −0.937433
\(808\) 2.19433e7 1.18242
\(809\) −2.10318e7 −1.12981 −0.564906 0.825155i \(-0.691088\pi\)
−0.564906 + 0.825155i \(0.691088\pi\)
\(810\) −6.58635e7 −3.52722
\(811\) −2.27692e7 −1.21561 −0.607807 0.794085i \(-0.707950\pi\)
−0.607807 + 0.794085i \(0.707950\pi\)
\(812\) 1.09485e7 0.582726
\(813\) 1.13332e7 0.601346
\(814\) 1.34699e7 0.712530
\(815\) 3.07103e7 1.61954
\(816\) 4.81908e7 2.53361
\(817\) −1.84175e6 −0.0965328
\(818\) −3.73365e6 −0.195097
\(819\) 758681. 0.0395230
\(820\) −3.88716e7 −2.01882
\(821\) −2.30273e7 −1.19230 −0.596149 0.802874i \(-0.703303\pi\)
−0.596149 + 0.802874i \(0.703303\pi\)
\(822\) −1.09175e7 −0.563562
\(823\) −1.70408e7 −0.876979 −0.438490 0.898736i \(-0.644486\pi\)
−0.438490 + 0.898736i \(0.644486\pi\)
\(824\) 8.15542e7 4.18435
\(825\) −4.93184e7 −2.52275
\(826\) −1.90520e7 −0.971605
\(827\) 3.62225e6 0.184168 0.0920840 0.995751i \(-0.470647\pi\)
0.0920840 + 0.995751i \(0.470647\pi\)
\(828\) 908028. 0.0460281
\(829\) 1.36980e7 0.692261 0.346131 0.938186i \(-0.387495\pi\)
0.346131 + 0.938186i \(0.387495\pi\)
\(830\) 6.12991e7 3.08858
\(831\) −8.60198e6 −0.432112
\(832\) 2.06573e6 0.103458
\(833\) −2.26361e7 −1.13029
\(834\) 4.75091e6 0.236517
\(835\) −1.26687e7 −0.628805
\(836\) 1.12616e7 0.557296
\(837\) 8.19600e6 0.404379
\(838\) 4.18887e7 2.06057
\(839\) −8.15272e6 −0.399850 −0.199925 0.979811i \(-0.564070\pi\)
−0.199925 + 0.979811i \(0.564070\pi\)
\(840\) −3.71946e7 −1.81879
\(841\) −1.32385e7 −0.645431
\(842\) 2.09049e7 1.01617
\(843\) −3.29537e7 −1.59711
\(844\) 7.14807e7 3.45408
\(845\) 1.42858e7 0.688274
\(846\) −1.63833e6 −0.0787002
\(847\) −1.80811e6 −0.0865999
\(848\) −4.06618e7 −1.94177
\(849\) −3.70625e7 −1.76468
\(850\) −1.15843e8 −5.49948
\(851\) 1.38889e6 0.0657420
\(852\) 2.74405e6 0.129507
\(853\) −3.76514e7 −1.77178 −0.885888 0.463899i \(-0.846450\pi\)
−0.885888 + 0.463899i \(0.846450\pi\)
\(854\) −2.72076e7 −1.27657
\(855\) 1.00141e6 0.0468487
\(856\) −7.21345e7 −3.36480
\(857\) 1.18679e7 0.551980 0.275990 0.961160i \(-0.410994\pi\)
0.275990 + 0.961160i \(0.410994\pi\)
\(858\) −3.50252e7 −1.62429
\(859\) −8.63985e6 −0.399506 −0.199753 0.979846i \(-0.564014\pi\)
−0.199753 + 0.979846i \(0.564014\pi\)
\(860\) −3.61687e7 −1.66758
\(861\) −5.15476e6 −0.236974
\(862\) 3.28002e7 1.50352
\(863\) −1.39409e7 −0.637181 −0.318591 0.947892i \(-0.603210\pi\)
−0.318591 + 0.947892i \(0.603210\pi\)
\(864\) 1.80487e7 0.822547
\(865\) 5.81119e7 2.64073
\(866\) 4.53267e7 2.05380
\(867\) 2.26055e7 1.02133
\(868\) 9.39620e6 0.423305
\(869\) 1.30446e7 0.585976
\(870\) −4.49456e7 −2.01321
\(871\) 1.70266e6 0.0760473
\(872\) −9.63260e6 −0.428995
\(873\) −1.20095e6 −0.0533322
\(874\) 1.68407e6 0.0745731
\(875\) 2.10992e7 0.931633
\(876\) 6.70914e7 2.95397
\(877\) 2.92561e7 1.28445 0.642224 0.766517i \(-0.278012\pi\)
0.642224 + 0.766517i \(0.278012\pi\)
\(878\) −4.02229e7 −1.76091
\(879\) 2.90661e7 1.26886
\(880\) 7.67286e7 3.34003
\(881\) −1.44235e7 −0.626081 −0.313041 0.949740i \(-0.601348\pi\)
−0.313041 + 0.949740i \(0.601348\pi\)
\(882\) 3.82319e6 0.165483
\(883\) −4.94360e6 −0.213374 −0.106687 0.994293i \(-0.534024\pi\)
−0.106687 + 0.994293i \(0.534024\pi\)
\(884\) −5.67263e7 −2.44149
\(885\) 5.39283e7 2.31451
\(886\) −5.96626e7 −2.55339
\(887\) −1.32368e7 −0.564903 −0.282452 0.959282i \(-0.591148\pi\)
−0.282452 + 0.959282i \(0.591148\pi\)
\(888\) −1.97258e7 −0.839463
\(889\) −461984. −0.0196053
\(890\) 1.93793e7 0.820094
\(891\) 2.85479e7 1.20470
\(892\) −2.68200e7 −1.12862
\(893\) −2.09511e6 −0.0879181
\(894\) −1.93548e7 −0.809924
\(895\) 2.33259e7 0.973375
\(896\) −1.18259e7 −0.492114
\(897\) −3.61147e6 −0.149866
\(898\) 2.66202e7 1.10159
\(899\) 6.24150e6 0.257567
\(900\) 1.34908e7 0.555177
\(901\) −3.87888e7 −1.59182
\(902\) 2.44353e7 1.00001
\(903\) −4.79633e6 −0.195744
\(904\) 9.10827e7 3.70693
\(905\) −3.17417e7 −1.28828
\(906\) −6.01113e6 −0.243297
\(907\) 7.51989e6 0.303524 0.151762 0.988417i \(-0.451505\pi\)
0.151762 + 0.988417i \(0.451505\pi\)
\(908\) −9.12701e7 −3.67379
\(909\) −1.53855e6 −0.0617593
\(910\) 2.76327e7 1.10617
\(911\) 4.53248e7 1.80942 0.904710 0.426027i \(-0.140087\pi\)
0.904710 + 0.426027i \(0.140087\pi\)
\(912\) −1.04087e7 −0.414388
\(913\) −2.65695e7 −1.05489
\(914\) −5.20373e7 −2.06039
\(915\) 7.70134e7 3.04098
\(916\) 2.12556e7 0.837016
\(917\) −6.78190e6 −0.266335
\(918\) 6.00883e7 2.35333
\(919\) 1.47088e7 0.574497 0.287249 0.957856i \(-0.407259\pi\)
0.287249 + 0.957856i \(0.407259\pi\)
\(920\) 1.81800e7 0.708148
\(921\) −2.82828e7 −1.09869
\(922\) −2.69610e7 −1.04450
\(923\) −1.12064e6 −0.0432973
\(924\) 2.93278e7 1.13006
\(925\) 2.06351e7 0.792960
\(926\) 2.99112e7 1.14632
\(927\) −5.71818e6 −0.218554
\(928\) 1.37446e7 0.523917
\(929\) −1.35395e7 −0.514711 −0.257356 0.966317i \(-0.582851\pi\)
−0.257356 + 0.966317i \(0.582851\pi\)
\(930\) −3.85732e7 −1.46244
\(931\) 4.88913e6 0.184866
\(932\) 4.01473e7 1.51397
\(933\) 2.60253e7 0.978795
\(934\) −1.85339e7 −0.695183
\(935\) 7.31942e7 2.73809
\(936\) 5.26671e6 0.196494
\(937\) −1.21203e7 −0.450988 −0.225494 0.974245i \(-0.572400\pi\)
−0.225494 + 0.974245i \(0.572400\pi\)
\(938\) −2.06769e6 −0.0767321
\(939\) 898788. 0.0332655
\(940\) −4.11444e7 −1.51877
\(941\) 2.61927e7 0.964288 0.482144 0.876092i \(-0.339858\pi\)
0.482144 + 0.876092i \(0.339858\pi\)
\(942\) −9.45976e7 −3.47338
\(943\) 2.51954e6 0.0922661
\(944\) −5.75555e7 −2.10212
\(945\) −2.01824e7 −0.735179
\(946\) 2.27363e7 0.826021
\(947\) −3.47875e7 −1.26051 −0.630257 0.776386i \(-0.717051\pi\)
−0.630257 + 0.776386i \(0.717051\pi\)
\(948\) −3.47512e7 −1.25588
\(949\) −2.73993e7 −0.987585
\(950\) 2.50207e7 0.899478
\(951\) −1.70268e7 −0.610494
\(952\) 3.78678e7 1.35418
\(953\) 1.16268e7 0.414695 0.207347 0.978267i \(-0.433517\pi\)
0.207347 + 0.978267i \(0.433517\pi\)
\(954\) 6.55136e6 0.233056
\(955\) 1.81595e7 0.644312
\(956\) −7.36477e7 −2.60624
\(957\) 1.94812e7 0.687602
\(958\) −6.01865e7 −2.11878
\(959\) −3.73330e6 −0.131083
\(960\) 7.10077e6 0.248672
\(961\) −2.32726e7 −0.812898
\(962\) 1.46547e7 0.510552
\(963\) 5.05772e6 0.175747
\(964\) 5.83634e7 2.02278
\(965\) −2.85341e7 −0.986383
\(966\) 4.38570e6 0.151216
\(967\) −2.70316e7 −0.929622 −0.464811 0.885410i \(-0.653878\pi\)
−0.464811 + 0.885410i \(0.653878\pi\)
\(968\) −1.25518e7 −0.430544
\(969\) −9.92919e6 −0.339707
\(970\) −4.37411e7 −1.49266
\(971\) −5.13472e6 −0.174771 −0.0873854 0.996175i \(-0.527851\pi\)
−0.0873854 + 0.996175i \(0.527851\pi\)
\(972\) −1.48997e7 −0.505840
\(973\) 1.62461e6 0.0550132
\(974\) 3.66754e7 1.23873
\(975\) −5.36565e7 −1.80764
\(976\) −8.21934e7 −2.76193
\(977\) −5.11922e6 −0.171580 −0.0857902 0.996313i \(-0.527341\pi\)
−0.0857902 + 0.996313i \(0.527341\pi\)
\(978\) 5.14293e7 1.71935
\(979\) −8.39978e6 −0.280099
\(980\) 9.60140e7 3.19352
\(981\) 675390. 0.0224069
\(982\) 4.39434e7 1.45417
\(983\) 3.30087e7 1.08954 0.544771 0.838585i \(-0.316616\pi\)
0.544771 + 0.838585i \(0.316616\pi\)
\(984\) −3.57840e7 −1.17815
\(985\) 4.64764e7 1.52631
\(986\) 4.57590e7 1.49894
\(987\) −5.45614e6 −0.178276
\(988\) 1.22522e7 0.399321
\(989\) 2.34435e6 0.0762134
\(990\) −1.23624e7 −0.400879
\(991\) −3.54462e7 −1.14653 −0.573265 0.819370i \(-0.694324\pi\)
−0.573265 + 0.819370i \(0.694324\pi\)
\(992\) 1.17959e7 0.380585
\(993\) 3.35685e7 1.08034
\(994\) 1.36088e6 0.0436873
\(995\) −1.06192e8 −3.40044
\(996\) 7.07822e7 2.26087
\(997\) 4.51197e7 1.43757 0.718784 0.695233i \(-0.244699\pi\)
0.718784 + 0.695233i \(0.244699\pi\)
\(998\) 5.01121e7 1.59264
\(999\) −1.07035e7 −0.339322
Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))

Twists

       By twisting character
Char Parity Ord Type Twist Min Dim
1.1 even 1 trivial 19.6.a.c.1.1 2
3.2 odd 2 171.6.a.f.1.2 2
4.3 odd 2 304.6.a.g.1.1 2
5.4 even 2 475.6.a.d.1.2 2
7.6 odd 2 931.6.a.c.1.1 2
19.18 odd 2 361.6.a.d.1.2 2
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
19.6.a.c.1.1 2 1.1 even 1 trivial
171.6.a.f.1.2 2 3.2 odd 2
304.6.a.g.1.1 2 4.3 odd 2
361.6.a.d.1.2 2 19.18 odd 2
475.6.a.d.1.2 2 5.4 even 2
931.6.a.c.1.1 2 7.6 odd 2