Properties

Label 13.8.a.c.1.2
Level $13$
Weight $8$
Character 13.1
Self dual yes
Analytic conductor $4.061$
Analytic rank $0$
Dimension $4$
CM no
Inner twists $1$

Related objects

Downloads

Learn more

Show commands: Magma / Pari/GP / SageMath

Newspace parameters

Copy content comment:Compute space of new eigenforms
 
Copy content gp:[N,k,chi] = [13,8,Mod(1,13)] mf = mfinit([N,k,chi],0) lf = mfeigenbasis(mf)
 
Copy content magma://Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code chi := DirichletCharacter("13.1"); S:= CuspForms(chi, 8); N := Newforms(S);
 
Copy content sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(13, base_ring=CyclotomicField(2)) chi = DirichletCharacter(H, H._module([0])) N = Newforms(chi, 8, names="a")
 
Level: \( N \) \(=\) \( 13 \)
Weight: \( k \) \(=\) \( 8 \)
Character orbit: \([\chi]\) \(=\) 13.a (trivial)

Newform invariants

Copy content comment:select newform
 
Copy content sage:traces = [4] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(1)] == traces)
 
Copy content gp:f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(4.06100533129\)
Analytic rank: \(0\)
Dimension: \(4\)
Coefficient field: \(\mathbb{Q}[x]/(x^{4} - \cdots)\)
Copy content comment:defining polynomial
 
Copy content gp:f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{4} - x^{3} - 354x^{2} - 640x + 20912 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 2 \)
Twist minimal: yes
Fricke sign: \(+1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.2
Root \(7.26058\) of defining polynomial
Character \(\chi\) \(=\) 13.1

$q$-expansion

Copy content comment:q-expansion
 
Copy content sage:f.q_expansion() # note that sage often uses an isomorphic number field
 
Copy content gp:mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-3.26058 q^{2} +66.7551 q^{3} -117.369 q^{4} +259.973 q^{5} -217.660 q^{6} +1453.99 q^{7} +800.043 q^{8} +2269.24 q^{9} -847.662 q^{10} -4450.41 q^{11} -7834.95 q^{12} -2197.00 q^{13} -4740.86 q^{14} +17354.5 q^{15} +12414.6 q^{16} -19258.2 q^{17} -7399.03 q^{18} -39326.5 q^{19} -30512.7 q^{20} +97061.4 q^{21} +14510.9 q^{22} +28432.1 q^{23} +53406.9 q^{24} -10539.1 q^{25} +7163.49 q^{26} +5489.83 q^{27} -170653. q^{28} +246229. q^{29} -56585.7 q^{30} -100837. q^{31} -142884. q^{32} -297088. q^{33} +62792.8 q^{34} +377999. q^{35} -266337. q^{36} -100757. q^{37} +128227. q^{38} -146661. q^{39} +207990. q^{40} +49018.9 q^{41} -316476. q^{42} -55968.9 q^{43} +522339. q^{44} +589941. q^{45} -92705.2 q^{46} -777743. q^{47} +828736. q^{48} +1.29055e6 q^{49} +34363.5 q^{50} -1.28558e6 q^{51} +257859. q^{52} +763116. q^{53} -17900.0 q^{54} -1.15699e6 q^{55} +1.16326e6 q^{56} -2.62524e6 q^{57} -802850. q^{58} +1.18041e6 q^{59} -2.03688e6 q^{60} -2.69377e6 q^{61} +328787. q^{62} +3.29946e6 q^{63} -1.12318e6 q^{64} -571161. q^{65} +968677. q^{66} +977111. q^{67} +2.26031e6 q^{68} +1.89799e6 q^{69} -1.23249e6 q^{70} +877610. q^{71} +1.81549e6 q^{72} -3.74799e6 q^{73} +328527. q^{74} -703537. q^{75} +4.61569e6 q^{76} -6.47087e6 q^{77} +478199. q^{78} +6.82797e6 q^{79} +3.22746e6 q^{80} -4.59635e6 q^{81} -159830. q^{82} +5.67139e6 q^{83} -1.13920e7 q^{84} -5.00661e6 q^{85} +182491. q^{86} +1.64371e7 q^{87} -3.56052e6 q^{88} +6.04479e6 q^{89} -1.92355e6 q^{90} -3.19442e6 q^{91} -3.33704e6 q^{92} -6.73138e6 q^{93} +2.53589e6 q^{94} -1.02238e7 q^{95} -9.53825e6 q^{96} -5.51192e6 q^{97} -4.20795e6 q^{98} -1.00990e7 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 4 q + 15 q^{2} + 80 q^{3} + 253 q^{4} + 258 q^{5} + 1579 q^{6} + 1692 q^{7} + 1893 q^{8} + 3494 q^{9} - 4495 q^{10} + 1836 q^{11} - 3655 q^{12} - 8788 q^{13} - 18285 q^{14} - 29736 q^{15} - 36159 q^{16}+ \cdots + 6200852 q^{99}+O(q^{100}) \) Copy content Toggle raw display

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −3.26058 −0.288197 −0.144099 0.989563i \(-0.546028\pi\)
−0.144099 + 0.989563i \(0.546028\pi\)
\(3\) 66.7551 1.42745 0.713723 0.700428i \(-0.247007\pi\)
0.713723 + 0.700428i \(0.247007\pi\)
\(4\) −117.369 −0.916942
\(5\) 259.973 0.930107 0.465054 0.885282i \(-0.346035\pi\)
0.465054 + 0.885282i \(0.346035\pi\)
\(6\) −217.660 −0.411386
\(7\) 1453.99 1.60221 0.801105 0.598524i \(-0.204246\pi\)
0.801105 + 0.598524i \(0.204246\pi\)
\(8\) 800.043 0.552457
\(9\) 2269.24 1.03760
\(10\) −847.662 −0.268054
\(11\) −4450.41 −1.00815 −0.504076 0.863659i \(-0.668167\pi\)
−0.504076 + 0.863659i \(0.668167\pi\)
\(12\) −7834.95 −1.30889
\(13\) −2197.00 −0.277350
\(14\) −4740.86 −0.461752
\(15\) 17354.5 1.32768
\(16\) 12414.6 0.757726
\(17\) −19258.2 −0.950701 −0.475351 0.879796i \(-0.657679\pi\)
−0.475351 + 0.879796i \(0.657679\pi\)
\(18\) −7399.03 −0.299034
\(19\) −39326.5 −1.31537 −0.657684 0.753294i \(-0.728464\pi\)
−0.657684 + 0.753294i \(0.728464\pi\)
\(20\) −30512.7 −0.852855
\(21\) 97061.4 2.28707
\(22\) 14510.9 0.290546
\(23\) 28432.1 0.487261 0.243631 0.969868i \(-0.421662\pi\)
0.243631 + 0.969868i \(0.421662\pi\)
\(24\) 53406.9 0.788603
\(25\) −10539.1 −0.134900
\(26\) 7163.49 0.0799315
\(27\) 5489.83 0.0536767
\(28\) −170653. −1.46913
\(29\) 246229. 1.87476 0.937382 0.348302i \(-0.113242\pi\)
0.937382 + 0.348302i \(0.113242\pi\)
\(30\) −56585.7 −0.382633
\(31\) −100837. −0.607931 −0.303965 0.952683i \(-0.598311\pi\)
−0.303965 + 0.952683i \(0.598311\pi\)
\(32\) −142884. −0.770831
\(33\) −297088. −1.43908
\(34\) 62792.8 0.273989
\(35\) 377999. 1.49023
\(36\) −266337. −0.951423
\(37\) −100757. −0.327017 −0.163509 0.986542i \(-0.552281\pi\)
−0.163509 + 0.986542i \(0.552281\pi\)
\(38\) 128227. 0.379085
\(39\) −146661. −0.395902
\(40\) 207990. 0.513844
\(41\) 49018.9 0.111076 0.0555379 0.998457i \(-0.482313\pi\)
0.0555379 + 0.998457i \(0.482313\pi\)
\(42\) −316476. −0.659126
\(43\) −55968.9 −0.107351 −0.0536757 0.998558i \(-0.517094\pi\)
−0.0536757 + 0.998558i \(0.517094\pi\)
\(44\) 522339. 0.924417
\(45\) 589941. 0.965083
\(46\) −92705.2 −0.140427
\(47\) −777743. −1.09268 −0.546341 0.837563i \(-0.683980\pi\)
−0.546341 + 0.837563i \(0.683980\pi\)
\(48\) 828736. 1.08161
\(49\) 1.29055e6 1.56708
\(50\) 34363.5 0.0388778
\(51\) −1.28558e6 −1.35707
\(52\) 257859. 0.254314
\(53\) 763116. 0.704085 0.352042 0.935984i \(-0.385487\pi\)
0.352042 + 0.935984i \(0.385487\pi\)
\(54\) −17900.0 −0.0154695
\(55\) −1.15699e6 −0.937689
\(56\) 1.16326e6 0.885152
\(57\) −2.62524e6 −1.87762
\(58\) −802850. −0.540302
\(59\) 1.18041e6 0.748257 0.374128 0.927377i \(-0.377942\pi\)
0.374128 + 0.927377i \(0.377942\pi\)
\(60\) −2.03688e6 −1.21740
\(61\) −2.69377e6 −1.51952 −0.759761 0.650203i \(-0.774684\pi\)
−0.759761 + 0.650203i \(0.774684\pi\)
\(62\) 328787. 0.175204
\(63\) 3.29946e6 1.66246
\(64\) −1.12318e6 −0.535575
\(65\) −571161. −0.257965
\(66\) 968677. 0.414739
\(67\) 977111. 0.396901 0.198450 0.980111i \(-0.436409\pi\)
0.198450 + 0.980111i \(0.436409\pi\)
\(68\) 2.26031e6 0.871738
\(69\) 1.89799e6 0.695540
\(70\) −1.23249e6 −0.429479
\(71\) 877610. 0.291003 0.145502 0.989358i \(-0.453520\pi\)
0.145502 + 0.989358i \(0.453520\pi\)
\(72\) 1.81549e6 0.573231
\(73\) −3.74799e6 −1.12763 −0.563817 0.825899i \(-0.690668\pi\)
−0.563817 + 0.825899i \(0.690668\pi\)
\(74\) 328527. 0.0942454
\(75\) −703537. −0.192563
\(76\) 4.61569e6 1.20612
\(77\) −6.47087e6 −1.61527
\(78\) 478199. 0.114098
\(79\) 6.82797e6 1.55811 0.779053 0.626958i \(-0.215700\pi\)
0.779053 + 0.626958i \(0.215700\pi\)
\(80\) 3.22746e6 0.704767
\(81\) −4.59635e6 −0.960983
\(82\) −159830. −0.0320117
\(83\) 5.67139e6 1.08872 0.544360 0.838852i \(-0.316772\pi\)
0.544360 + 0.838852i \(0.316772\pi\)
\(84\) −1.13920e7 −2.09711
\(85\) −5.00661e6 −0.884254
\(86\) 182491. 0.0309383
\(87\) 1.64371e7 2.67613
\(88\) −3.56052e6 −0.556961
\(89\) 6.04479e6 0.908900 0.454450 0.890772i \(-0.349836\pi\)
0.454450 + 0.890772i \(0.349836\pi\)
\(90\) −1.92355e6 −0.278134
\(91\) −3.19442e6 −0.444373
\(92\) −3.33704e6 −0.446791
\(93\) −6.73138e6 −0.867789
\(94\) 2.53589e6 0.314908
\(95\) −1.02238e7 −1.22343
\(96\) −9.53825e6 −1.10032
\(97\) −5.51192e6 −0.613200 −0.306600 0.951838i \(-0.599191\pi\)
−0.306600 + 0.951838i \(0.599191\pi\)
\(98\) −4.20795e6 −0.451627
\(99\) −1.00990e7 −1.04606
\(100\) 1.23696e6 0.123696
\(101\) 1.35091e7 1.30467 0.652337 0.757929i \(-0.273789\pi\)
0.652337 + 0.757929i \(0.273789\pi\)
\(102\) 4.19174e6 0.391105
\(103\) 1.81950e7 1.64067 0.820335 0.571883i \(-0.193787\pi\)
0.820335 + 0.571883i \(0.193787\pi\)
\(104\) −1.75770e6 −0.153224
\(105\) 2.52333e7 2.12722
\(106\) −2.48820e6 −0.202915
\(107\) 5.88068e6 0.464071 0.232035 0.972707i \(-0.425462\pi\)
0.232035 + 0.972707i \(0.425462\pi\)
\(108\) −644334. −0.0492184
\(109\) −1.55224e7 −1.14806 −0.574031 0.818834i \(-0.694621\pi\)
−0.574031 + 0.818834i \(0.694621\pi\)
\(110\) 3.77245e6 0.270239
\(111\) −6.72606e6 −0.466799
\(112\) 1.80507e7 1.21404
\(113\) 7.99095e6 0.520983 0.260492 0.965476i \(-0.416115\pi\)
0.260492 + 0.965476i \(0.416115\pi\)
\(114\) 8.55980e6 0.541124
\(115\) 7.39159e6 0.453205
\(116\) −2.88996e7 −1.71905
\(117\) −4.98552e6 −0.287779
\(118\) −3.84882e6 −0.215645
\(119\) −2.80013e7 −1.52322
\(120\) 1.38844e7 0.733485
\(121\) 319007. 0.0163701
\(122\) 8.78326e6 0.437921
\(123\) 3.27226e6 0.158555
\(124\) 1.18351e7 0.557438
\(125\) −2.30503e7 −1.05558
\(126\) −1.07581e7 −0.479115
\(127\) 1.73773e7 0.752780 0.376390 0.926461i \(-0.377165\pi\)
0.376390 + 0.926461i \(0.377165\pi\)
\(128\) 2.19514e7 0.925182
\(129\) −3.73621e6 −0.153238
\(130\) 1.86231e6 0.0743449
\(131\) −3.23735e7 −1.25817 −0.629086 0.777336i \(-0.716571\pi\)
−0.629086 + 0.777336i \(0.716571\pi\)
\(132\) 3.48688e7 1.31956
\(133\) −5.71804e7 −2.10750
\(134\) −3.18595e6 −0.114386
\(135\) 1.42721e6 0.0499251
\(136\) −1.54074e7 −0.525222
\(137\) 9.16741e6 0.304596 0.152298 0.988335i \(-0.451333\pi\)
0.152298 + 0.988335i \(0.451333\pi\)
\(138\) −6.18854e6 −0.200452
\(139\) 9.03804e6 0.285445 0.142722 0.989763i \(-0.454414\pi\)
0.142722 + 0.989763i \(0.454414\pi\)
\(140\) −4.43652e7 −1.36645
\(141\) −5.19183e7 −1.55975
\(142\) −2.86152e6 −0.0838662
\(143\) 9.77756e6 0.279611
\(144\) 2.81716e7 0.786219
\(145\) 6.40130e7 1.74373
\(146\) 1.22206e7 0.324981
\(147\) 8.61510e7 2.23692
\(148\) 1.18257e7 0.299856
\(149\) 4.06925e7 1.00777 0.503887 0.863770i \(-0.331903\pi\)
0.503887 + 0.863770i \(0.331903\pi\)
\(150\) 2.29394e6 0.0554960
\(151\) −6.97424e6 −0.164846 −0.0824228 0.996597i \(-0.526266\pi\)
−0.0824228 + 0.996597i \(0.526266\pi\)
\(152\) −3.14629e7 −0.726685
\(153\) −4.37014e7 −0.986451
\(154\) 2.10988e7 0.465516
\(155\) −2.62149e7 −0.565441
\(156\) 1.72134e7 0.363020
\(157\) −8.41804e6 −0.173605 −0.0868025 0.996226i \(-0.527665\pi\)
−0.0868025 + 0.996226i \(0.527665\pi\)
\(158\) −2.22631e7 −0.449041
\(159\) 5.09419e7 1.00504
\(160\) −3.71460e7 −0.716956
\(161\) 4.13401e7 0.780695
\(162\) 1.49868e7 0.276952
\(163\) 3.03063e7 0.548121 0.274060 0.961712i \(-0.411633\pi\)
0.274060 + 0.961712i \(0.411633\pi\)
\(164\) −5.75328e6 −0.101850
\(165\) −7.72347e7 −1.33850
\(166\) −1.84920e7 −0.313766
\(167\) −5.08939e7 −0.845586 −0.422793 0.906226i \(-0.638950\pi\)
−0.422793 + 0.906226i \(0.638950\pi\)
\(168\) 7.76534e7 1.26351
\(169\) 4.82681e6 0.0769231
\(170\) 1.63244e7 0.254839
\(171\) −8.92411e7 −1.36483
\(172\) 6.56900e6 0.0984350
\(173\) −4.67458e7 −0.686407 −0.343203 0.939261i \(-0.611512\pi\)
−0.343203 + 0.939261i \(0.611512\pi\)
\(174\) −5.35943e7 −0.771252
\(175\) −1.53238e7 −0.216138
\(176\) −5.52500e7 −0.763903
\(177\) 7.87983e7 1.06810
\(178\) −1.97095e7 −0.261942
\(179\) 1.23980e8 1.61572 0.807859 0.589376i \(-0.200626\pi\)
0.807859 + 0.589376i \(0.200626\pi\)
\(180\) −6.92405e7 −0.884925
\(181\) 7.81974e7 0.980205 0.490103 0.871665i \(-0.336959\pi\)
0.490103 + 0.871665i \(0.336959\pi\)
\(182\) 1.04157e7 0.128067
\(183\) −1.79823e8 −2.16904
\(184\) 2.27469e7 0.269191
\(185\) −2.61942e7 −0.304161
\(186\) 2.19482e7 0.250094
\(187\) 8.57069e7 0.958451
\(188\) 9.12827e7 1.00193
\(189\) 7.98217e6 0.0860013
\(190\) 3.33355e7 0.352590
\(191\) 3.55311e7 0.368971 0.184486 0.982835i \(-0.440938\pi\)
0.184486 + 0.982835i \(0.440938\pi\)
\(192\) −7.49780e7 −0.764504
\(193\) −6.71166e7 −0.672016 −0.336008 0.941859i \(-0.609077\pi\)
−0.336008 + 0.941859i \(0.609077\pi\)
\(194\) 1.79720e7 0.176722
\(195\) −3.81279e7 −0.368232
\(196\) −1.51471e8 −1.43692
\(197\) 3.27770e7 0.305448 0.152724 0.988269i \(-0.451195\pi\)
0.152724 + 0.988269i \(0.451195\pi\)
\(198\) 3.29287e7 0.301472
\(199\) −9.03328e7 −0.812568 −0.406284 0.913747i \(-0.633176\pi\)
−0.406284 + 0.913747i \(0.633176\pi\)
\(200\) −8.43172e6 −0.0745266
\(201\) 6.52271e7 0.566555
\(202\) −4.40475e7 −0.376003
\(203\) 3.58016e8 3.00377
\(204\) 1.50887e8 1.24436
\(205\) 1.27436e7 0.103312
\(206\) −5.93262e7 −0.472836
\(207\) 6.45193e7 0.505584
\(208\) −2.72748e7 −0.210155
\(209\) 1.75019e8 1.32609
\(210\) −8.22753e7 −0.613058
\(211\) −1.30945e7 −0.0959625 −0.0479812 0.998848i \(-0.515279\pi\)
−0.0479812 + 0.998848i \(0.515279\pi\)
\(212\) −8.95659e7 −0.645605
\(213\) 5.85849e7 0.415391
\(214\) −1.91744e7 −0.133744
\(215\) −1.45504e7 −0.0998483
\(216\) 4.39210e6 0.0296541
\(217\) −1.46616e8 −0.974033
\(218\) 5.06119e7 0.330868
\(219\) −2.50197e8 −1.60964
\(220\) 1.35794e8 0.859807
\(221\) 4.23102e7 0.263677
\(222\) 2.19308e7 0.134530
\(223\) 2.84081e7 0.171544 0.0857720 0.996315i \(-0.472664\pi\)
0.0857720 + 0.996315i \(0.472664\pi\)
\(224\) −2.07753e8 −1.23503
\(225\) −2.39157e7 −0.139973
\(226\) −2.60551e7 −0.150146
\(227\) −2.74035e8 −1.55495 −0.777474 0.628915i \(-0.783499\pi\)
−0.777474 + 0.628915i \(0.783499\pi\)
\(228\) 3.08121e8 1.72167
\(229\) −2.74411e8 −1.51000 −0.755000 0.655725i \(-0.772363\pi\)
−0.755000 + 0.655725i \(0.772363\pi\)
\(230\) −2.41008e7 −0.130612
\(231\) −4.31963e8 −2.30571
\(232\) 1.96994e8 1.03573
\(233\) −2.87263e7 −0.148776 −0.0743881 0.997229i \(-0.523700\pi\)
−0.0743881 + 0.997229i \(0.523700\pi\)
\(234\) 1.62557e7 0.0829372
\(235\) −2.02192e8 −1.01631
\(236\) −1.38543e8 −0.686109
\(237\) 4.55802e8 2.22411
\(238\) 9.13003e7 0.438988
\(239\) 2.46037e8 1.16575 0.582877 0.812560i \(-0.301927\pi\)
0.582877 + 0.812560i \(0.301927\pi\)
\(240\) 2.15449e8 1.00602
\(241\) −3.12621e8 −1.43866 −0.719331 0.694667i \(-0.755552\pi\)
−0.719331 + 0.694667i \(0.755552\pi\)
\(242\) −1.04015e6 −0.00471781
\(243\) −3.18836e8 −1.42543
\(244\) 3.16165e8 1.39331
\(245\) 3.35509e8 1.45755
\(246\) −1.06694e7 −0.0456950
\(247\) 8.64003e7 0.364818
\(248\) −8.06740e7 −0.335856
\(249\) 3.78594e8 1.55409
\(250\) 7.51571e7 0.304215
\(251\) 3.36400e8 1.34276 0.671380 0.741113i \(-0.265702\pi\)
0.671380 + 0.741113i \(0.265702\pi\)
\(252\) −3.87253e8 −1.52438
\(253\) −1.26535e8 −0.491234
\(254\) −5.66599e7 −0.216949
\(255\) −3.34216e8 −1.26223
\(256\) 7.21930e7 0.268940
\(257\) −3.58158e7 −0.131616 −0.0658081 0.997832i \(-0.520963\pi\)
−0.0658081 + 0.997832i \(0.520963\pi\)
\(258\) 1.21822e7 0.0441628
\(259\) −1.46500e8 −0.523950
\(260\) 6.70363e7 0.236539
\(261\) 5.58753e8 1.94526
\(262\) 1.05556e8 0.362601
\(263\) −5.64174e8 −1.91235 −0.956176 0.292792i \(-0.905416\pi\)
−0.956176 + 0.292792i \(0.905416\pi\)
\(264\) −2.37683e8 −0.795031
\(265\) 1.98389e8 0.654875
\(266\) 1.86441e8 0.607374
\(267\) 4.03520e8 1.29741
\(268\) −1.14682e8 −0.363935
\(269\) 3.96388e7 0.124162 0.0620809 0.998071i \(-0.480226\pi\)
0.0620809 + 0.998071i \(0.480226\pi\)
\(270\) −4.65352e6 −0.0143883
\(271\) 1.83544e8 0.560205 0.280102 0.959970i \(-0.409632\pi\)
0.280102 + 0.959970i \(0.409632\pi\)
\(272\) −2.39082e8 −0.720371
\(273\) −2.13244e8 −0.634319
\(274\) −2.98910e7 −0.0877838
\(275\) 4.69032e7 0.136000
\(276\) −2.22764e8 −0.637770
\(277\) 2.59168e8 0.732660 0.366330 0.930485i \(-0.380614\pi\)
0.366330 + 0.930485i \(0.380614\pi\)
\(278\) −2.94692e7 −0.0822644
\(279\) −2.28823e8 −0.630791
\(280\) 3.02416e8 0.823287
\(281\) −5.83114e6 −0.0156777 −0.00783883 0.999969i \(-0.502495\pi\)
−0.00783883 + 0.999969i \(0.502495\pi\)
\(282\) 1.69284e8 0.449514
\(283\) 9.19774e7 0.241228 0.120614 0.992699i \(-0.461514\pi\)
0.120614 + 0.992699i \(0.461514\pi\)
\(284\) −1.03004e8 −0.266833
\(285\) −6.82492e8 −1.74639
\(286\) −3.18805e7 −0.0805831
\(287\) 7.12731e7 0.177967
\(288\) −3.24238e8 −0.799817
\(289\) −3.94612e7 −0.0961674
\(290\) −2.08719e8 −0.502539
\(291\) −3.67949e8 −0.875310
\(292\) 4.39897e8 1.03398
\(293\) −4.48184e8 −1.04092 −0.520462 0.853885i \(-0.674240\pi\)
−0.520462 + 0.853885i \(0.674240\pi\)
\(294\) −2.80902e8 −0.644673
\(295\) 3.06875e8 0.695959
\(296\) −8.06102e7 −0.180663
\(297\) −2.44320e7 −0.0541142
\(298\) −1.32681e8 −0.290437
\(299\) −6.24654e7 −0.135142
\(300\) 8.25731e7 0.176569
\(301\) −8.13785e7 −0.171999
\(302\) 2.27400e7 0.0475080
\(303\) 9.01802e8 1.86235
\(304\) −4.88222e8 −0.996689
\(305\) −7.00308e8 −1.41332
\(306\) 1.42492e8 0.284292
\(307\) 2.89460e8 0.570957 0.285479 0.958385i \(-0.407847\pi\)
0.285479 + 0.958385i \(0.407847\pi\)
\(308\) 7.59477e8 1.48111
\(309\) 1.21461e9 2.34197
\(310\) 8.54757e7 0.162958
\(311\) 4.13068e8 0.778683 0.389341 0.921094i \(-0.372703\pi\)
0.389341 + 0.921094i \(0.372703\pi\)
\(312\) −1.17335e8 −0.218719
\(313\) 5.30900e8 0.978606 0.489303 0.872114i \(-0.337251\pi\)
0.489303 + 0.872114i \(0.337251\pi\)
\(314\) 2.74477e7 0.0500324
\(315\) 8.57770e8 1.54626
\(316\) −8.01390e8 −1.42869
\(317\) −1.95230e8 −0.344223 −0.172112 0.985077i \(-0.555059\pi\)
−0.172112 + 0.985077i \(0.555059\pi\)
\(318\) −1.66100e8 −0.289650
\(319\) −1.09582e9 −1.89005
\(320\) −2.91997e8 −0.498142
\(321\) 3.92565e8 0.662436
\(322\) −1.34793e8 −0.224994
\(323\) 7.57356e8 1.25052
\(324\) 5.39467e8 0.881166
\(325\) 2.31544e7 0.0374146
\(326\) −9.88160e7 −0.157967
\(327\) −1.03620e9 −1.63880
\(328\) 3.92172e7 0.0613646
\(329\) −1.13083e9 −1.75071
\(330\) 2.51830e8 0.385752
\(331\) 1.98439e8 0.300766 0.150383 0.988628i \(-0.451949\pi\)
0.150383 + 0.988628i \(0.451949\pi\)
\(332\) −6.65644e8 −0.998294
\(333\) −2.28642e8 −0.339314
\(334\) 1.65943e8 0.243695
\(335\) 2.54022e8 0.369160
\(336\) 1.20498e9 1.73297
\(337\) −9.24024e8 −1.31516 −0.657580 0.753385i \(-0.728420\pi\)
−0.657580 + 0.753385i \(0.728420\pi\)
\(338\) −1.57382e7 −0.0221690
\(339\) 5.33436e8 0.743676
\(340\) 5.87618e8 0.810810
\(341\) 4.48767e8 0.612887
\(342\) 2.90978e8 0.393340
\(343\) 6.79032e8 0.908574
\(344\) −4.47776e7 −0.0593070
\(345\) 4.93426e8 0.646927
\(346\) 1.52418e8 0.197820
\(347\) −7.88057e8 −1.01252 −0.506261 0.862380i \(-0.668973\pi\)
−0.506261 + 0.862380i \(0.668973\pi\)
\(348\) −1.92919e9 −2.45385
\(349\) −6.05575e8 −0.762569 −0.381284 0.924458i \(-0.624518\pi\)
−0.381284 + 0.924458i \(0.624518\pi\)
\(350\) 4.99643e7 0.0622904
\(351\) −1.20612e7 −0.0148872
\(352\) 6.35894e8 0.777115
\(353\) −3.09363e8 −0.374333 −0.187166 0.982328i \(-0.559930\pi\)
−0.187166 + 0.982328i \(0.559930\pi\)
\(354\) −2.56928e8 −0.307822
\(355\) 2.28155e8 0.270664
\(356\) −7.09468e8 −0.833409
\(357\) −1.86923e9 −2.17432
\(358\) −4.04246e8 −0.465645
\(359\) 2.65762e8 0.303153 0.151576 0.988446i \(-0.451565\pi\)
0.151576 + 0.988446i \(0.451565\pi\)
\(360\) 4.71978e8 0.533167
\(361\) 6.52700e8 0.730194
\(362\) −2.54969e8 −0.282492
\(363\) 2.12953e7 0.0233674
\(364\) 3.74925e8 0.407464
\(365\) −9.74376e8 −1.04882
\(366\) 5.86327e8 0.625109
\(367\) −8.08965e8 −0.854276 −0.427138 0.904186i \(-0.640478\pi\)
−0.427138 + 0.904186i \(0.640478\pi\)
\(368\) 3.52973e8 0.369211
\(369\) 1.11235e8 0.115253
\(370\) 8.54081e7 0.0876583
\(371\) 1.10957e9 1.12809
\(372\) 7.90053e8 0.795712
\(373\) 6.57479e8 0.655996 0.327998 0.944678i \(-0.393626\pi\)
0.327998 + 0.944678i \(0.393626\pi\)
\(374\) −2.79454e8 −0.276223
\(375\) −1.53872e9 −1.50678
\(376\) −6.22228e8 −0.603660
\(377\) −5.40966e8 −0.519966
\(378\) −2.60265e7 −0.0247853
\(379\) 1.18091e9 1.11424 0.557119 0.830433i \(-0.311907\pi\)
0.557119 + 0.830433i \(0.311907\pi\)
\(380\) 1.19996e9 1.12182
\(381\) 1.16002e9 1.07455
\(382\) −1.15852e8 −0.106336
\(383\) 1.25293e9 1.13954 0.569772 0.821803i \(-0.307032\pi\)
0.569772 + 0.821803i \(0.307032\pi\)
\(384\) 1.46537e9 1.32065
\(385\) −1.68225e9 −1.50238
\(386\) 2.18839e8 0.193673
\(387\) −1.27007e8 −0.111388
\(388\) 6.46927e8 0.562269
\(389\) 8.65648e8 0.745620 0.372810 0.927908i \(-0.378394\pi\)
0.372810 + 0.927908i \(0.378394\pi\)
\(390\) 1.24319e8 0.106123
\(391\) −5.47551e8 −0.463240
\(392\) 1.03250e9 0.865742
\(393\) −2.16109e9 −1.79597
\(394\) −1.06872e8 −0.0880292
\(395\) 1.77509e9 1.44921
\(396\) 1.18531e9 0.959178
\(397\) 9.76000e8 0.782858 0.391429 0.920208i \(-0.371981\pi\)
0.391429 + 0.920208i \(0.371981\pi\)
\(398\) 2.94537e8 0.234180
\(399\) −3.81708e9 −3.00834
\(400\) −1.30838e8 −0.102217
\(401\) 1.48866e9 1.15289 0.576447 0.817134i \(-0.304439\pi\)
0.576447 + 0.817134i \(0.304439\pi\)
\(402\) −2.12678e8 −0.163279
\(403\) 2.21539e8 0.168610
\(404\) −1.58555e9 −1.19631
\(405\) −1.19493e9 −0.893817
\(406\) −1.16734e9 −0.865676
\(407\) 4.48412e8 0.329683
\(408\) −1.02852e9 −0.749726
\(409\) 3.66344e8 0.264763 0.132381 0.991199i \(-0.457738\pi\)
0.132381 + 0.991199i \(0.457738\pi\)
\(410\) −4.15514e7 −0.0297743
\(411\) 6.11971e8 0.434795
\(412\) −2.13552e9 −1.50440
\(413\) 1.71631e9 1.19886
\(414\) −2.10370e8 −0.145708
\(415\) 1.47441e9 1.01263
\(416\) 3.13917e8 0.213790
\(417\) 6.03335e8 0.407457
\(418\) −5.70663e8 −0.382175
\(419\) 8.82815e8 0.586301 0.293150 0.956066i \(-0.405296\pi\)
0.293150 + 0.956066i \(0.405296\pi\)
\(420\) −2.96160e9 −1.95054
\(421\) −5.84465e8 −0.381743 −0.190872 0.981615i \(-0.561131\pi\)
−0.190872 + 0.981615i \(0.561131\pi\)
\(422\) 4.26957e7 0.0276561
\(423\) −1.76489e9 −1.13377
\(424\) 6.10526e8 0.388977
\(425\) 2.02963e8 0.128250
\(426\) −1.91021e8 −0.119715
\(427\) −3.91673e9 −2.43459
\(428\) −6.90207e8 −0.425526
\(429\) 6.52701e8 0.399130
\(430\) 4.74427e7 0.0287760
\(431\) −9.46875e8 −0.569668 −0.284834 0.958577i \(-0.591939\pi\)
−0.284834 + 0.958577i \(0.591939\pi\)
\(432\) 6.81539e7 0.0406722
\(433\) 1.63557e9 0.968190 0.484095 0.875016i \(-0.339149\pi\)
0.484095 + 0.875016i \(0.339149\pi\)
\(434\) 4.78054e8 0.280713
\(435\) 4.27319e9 2.48908
\(436\) 1.82184e9 1.05271
\(437\) −1.11814e9 −0.640928
\(438\) 8.15788e8 0.463893
\(439\) −2.41064e8 −0.135990 −0.0679950 0.997686i \(-0.521660\pi\)
−0.0679950 + 0.997686i \(0.521660\pi\)
\(440\) −9.25640e8 −0.518033
\(441\) 2.92858e9 1.62600
\(442\) −1.37956e8 −0.0759909
\(443\) −1.42230e9 −0.777282 −0.388641 0.921389i \(-0.627055\pi\)
−0.388641 + 0.921389i \(0.627055\pi\)
\(444\) 7.89429e8 0.428028
\(445\) 1.57148e9 0.845374
\(446\) −9.26269e7 −0.0494385
\(447\) 2.71643e9 1.43854
\(448\) −1.63310e9 −0.858103
\(449\) −2.97627e9 −1.55171 −0.775855 0.630912i \(-0.782681\pi\)
−0.775855 + 0.630912i \(0.782681\pi\)
\(450\) 7.79789e7 0.0403398
\(451\) −2.18154e8 −0.111981
\(452\) −9.37887e8 −0.477712
\(453\) −4.65566e8 −0.235308
\(454\) 8.93513e8 0.448131
\(455\) −8.30464e8 −0.413315
\(456\) −2.10031e9 −1.03730
\(457\) −1.87138e9 −0.917183 −0.458591 0.888647i \(-0.651646\pi\)
−0.458591 + 0.888647i \(0.651646\pi\)
\(458\) 8.94737e8 0.435177
\(459\) −1.05724e8 −0.0510305
\(460\) −8.67540e8 −0.415563
\(461\) −1.95250e9 −0.928190 −0.464095 0.885785i \(-0.653620\pi\)
−0.464095 + 0.885785i \(0.653620\pi\)
\(462\) 1.40845e9 0.664499
\(463\) 3.23616e9 1.51529 0.757645 0.652667i \(-0.226350\pi\)
0.757645 + 0.652667i \(0.226350\pi\)
\(464\) 3.05683e9 1.42056
\(465\) −1.74998e9 −0.807137
\(466\) 9.36642e7 0.0428769
\(467\) 3.81990e9 1.73557 0.867786 0.496939i \(-0.165543\pi\)
0.867786 + 0.496939i \(0.165543\pi\)
\(468\) 5.85143e8 0.263877
\(469\) 1.42071e9 0.635918
\(470\) 6.59263e8 0.292898
\(471\) −5.61947e8 −0.247812
\(472\) 9.44379e8 0.413380
\(473\) 2.49085e8 0.108226
\(474\) −1.48618e9 −0.640983
\(475\) 4.14465e8 0.177443
\(476\) 3.28647e9 1.39671
\(477\) 1.73169e9 0.730561
\(478\) −8.02222e8 −0.335967
\(479\) −4.00597e9 −1.66546 −0.832728 0.553682i \(-0.813222\pi\)
−0.832728 + 0.553682i \(0.813222\pi\)
\(480\) −2.47969e9 −1.02342
\(481\) 2.21364e8 0.0906982
\(482\) 1.01933e9 0.414618
\(483\) 2.75966e9 1.11440
\(484\) −3.74414e7 −0.0150104
\(485\) −1.43295e9 −0.570342
\(486\) 1.03959e9 0.410804
\(487\) −5.88400e8 −0.230845 −0.115423 0.993316i \(-0.536822\pi\)
−0.115423 + 0.993316i \(0.536822\pi\)
\(488\) −2.15514e9 −0.839470
\(489\) 2.02310e9 0.782413
\(490\) −1.09395e9 −0.420061
\(491\) −3.55177e9 −1.35413 −0.677064 0.735924i \(-0.736748\pi\)
−0.677064 + 0.735924i \(0.736748\pi\)
\(492\) −3.84060e8 −0.145386
\(493\) −4.74193e9 −1.78234
\(494\) −2.81715e8 −0.105139
\(495\) −2.62548e9 −0.972950
\(496\) −1.25185e9 −0.460645
\(497\) 1.27604e9 0.466248
\(498\) −1.23444e9 −0.447884
\(499\) 2.12974e9 0.767318 0.383659 0.923475i \(-0.374664\pi\)
0.383659 + 0.923475i \(0.374664\pi\)
\(500\) 2.70538e9 0.967905
\(501\) −3.39742e9 −1.20703
\(502\) −1.09686e9 −0.386979
\(503\) −1.46630e9 −0.513730 −0.256865 0.966447i \(-0.582690\pi\)
−0.256865 + 0.966447i \(0.582690\pi\)
\(504\) 2.63971e9 0.918437
\(505\) 3.51200e9 1.21349
\(506\) 4.12576e8 0.141572
\(507\) 3.22214e8 0.109804
\(508\) −2.03954e9 −0.690256
\(509\) −5.86398e8 −0.197097 −0.0985485 0.995132i \(-0.531420\pi\)
−0.0985485 + 0.995132i \(0.531420\pi\)
\(510\) 1.08974e9 0.363770
\(511\) −5.44955e9 −1.80671
\(512\) −3.04517e9 −1.00269
\(513\) −2.15896e8 −0.0706046
\(514\) 1.16780e8 0.0379314
\(515\) 4.73020e9 1.52600
\(516\) 4.38514e8 0.140511
\(517\) 3.46128e9 1.10159
\(518\) 4.77676e8 0.151001
\(519\) −3.12052e9 −0.979809
\(520\) −4.56953e8 −0.142515
\(521\) 1.66374e9 0.515410 0.257705 0.966224i \(-0.417034\pi\)
0.257705 + 0.966224i \(0.417034\pi\)
\(522\) −1.82186e9 −0.560619
\(523\) 2.30166e9 0.703534 0.351767 0.936088i \(-0.385581\pi\)
0.351767 + 0.936088i \(0.385581\pi\)
\(524\) 3.79963e9 1.15367
\(525\) −1.02294e9 −0.308526
\(526\) 1.83953e9 0.551134
\(527\) 1.94194e9 0.577961
\(528\) −3.68822e9 −1.09043
\(529\) −2.59644e9 −0.762576
\(530\) −6.46864e8 −0.188733
\(531\) 2.67863e9 0.776394
\(532\) 6.71119e9 1.93245
\(533\) −1.07694e8 −0.0308069
\(534\) −1.31571e9 −0.373908
\(535\) 1.52882e9 0.431635
\(536\) 7.81731e8 0.219271
\(537\) 8.27628e9 2.30635
\(538\) −1.29245e8 −0.0357831
\(539\) −5.74350e9 −1.57985
\(540\) −1.67509e8 −0.0457784
\(541\) −6.78529e9 −1.84238 −0.921188 0.389118i \(-0.872780\pi\)
−0.921188 + 0.389118i \(0.872780\pi\)
\(542\) −5.98458e8 −0.161449
\(543\) 5.22007e9 1.39919
\(544\) 2.75169e9 0.732830
\(545\) −4.03540e9 −1.06782
\(546\) 6.95298e8 0.182809
\(547\) 3.81983e9 0.997904 0.498952 0.866630i \(-0.333718\pi\)
0.498952 + 0.866630i \(0.333718\pi\)
\(548\) −1.07597e9 −0.279297
\(549\) −6.11282e9 −1.57666
\(550\) −1.52932e8 −0.0391948
\(551\) −9.68333e9 −2.46601
\(552\) 1.51847e9 0.384256
\(553\) 9.92783e9 2.49641
\(554\) −8.45038e8 −0.211150
\(555\) −1.74859e9 −0.434174
\(556\) −1.06078e9 −0.261737
\(557\) −1.45371e9 −0.356439 −0.178220 0.983991i \(-0.557034\pi\)
−0.178220 + 0.983991i \(0.557034\pi\)
\(558\) 7.46096e8 0.181792
\(559\) 1.22964e8 0.0297739
\(560\) 4.69270e9 1.12918
\(561\) 5.72137e9 1.36814
\(562\) 1.90129e7 0.00451826
\(563\) −2.63864e9 −0.623161 −0.311580 0.950220i \(-0.600858\pi\)
−0.311580 + 0.950220i \(0.600858\pi\)
\(564\) 6.09358e9 1.43020
\(565\) 2.07743e9 0.484570
\(566\) −2.99899e8 −0.0695213
\(567\) −6.68306e9 −1.53970
\(568\) 7.02126e8 0.160767
\(569\) −1.38350e9 −0.314837 −0.157419 0.987532i \(-0.550317\pi\)
−0.157419 + 0.987532i \(0.550317\pi\)
\(570\) 2.22532e9 0.503303
\(571\) −1.97521e9 −0.444004 −0.222002 0.975046i \(-0.571259\pi\)
−0.222002 + 0.975046i \(0.571259\pi\)
\(572\) −1.14758e9 −0.256387
\(573\) 2.37188e9 0.526686
\(574\) −2.32391e8 −0.0512895
\(575\) −2.99648e8 −0.0657317
\(576\) −2.54877e9 −0.555714
\(577\) 3.38318e9 0.733178 0.366589 0.930383i \(-0.380525\pi\)
0.366589 + 0.930383i \(0.380525\pi\)
\(578\) 1.28666e8 0.0277152
\(579\) −4.48037e9 −0.959267
\(580\) −7.51311e9 −1.59890
\(581\) 8.24617e9 1.74436
\(582\) 1.19972e9 0.252262
\(583\) −3.39618e9 −0.709824
\(584\) −2.99856e9 −0.622970
\(585\) −1.29610e9 −0.267666
\(586\) 1.46134e9 0.299991
\(587\) −6.59389e9 −1.34558 −0.672789 0.739835i \(-0.734904\pi\)
−0.672789 + 0.739835i \(0.734904\pi\)
\(588\) −1.01114e10 −2.05112
\(589\) 3.96557e9 0.799653
\(590\) −1.00059e9 −0.200573
\(591\) 2.18803e9 0.436011
\(592\) −1.25086e9 −0.247789
\(593\) 2.97850e9 0.586552 0.293276 0.956028i \(-0.405254\pi\)
0.293276 + 0.956028i \(0.405254\pi\)
\(594\) 7.96624e7 0.0155956
\(595\) −7.27957e9 −1.41676
\(596\) −4.77603e9 −0.924070
\(597\) −6.03017e9 −1.15990
\(598\) 2.03673e8 0.0389475
\(599\) 1.71578e9 0.326187 0.163094 0.986611i \(-0.447853\pi\)
0.163094 + 0.986611i \(0.447853\pi\)
\(600\) −5.62860e8 −0.106383
\(601\) −4.20852e9 −0.790804 −0.395402 0.918508i \(-0.629395\pi\)
−0.395402 + 0.918508i \(0.629395\pi\)
\(602\) 2.65341e8 0.0495697
\(603\) 2.21730e9 0.411826
\(604\) 8.18557e8 0.151154
\(605\) 8.29331e7 0.0152259
\(606\) −2.94039e9 −0.536724
\(607\) 1.61275e9 0.292690 0.146345 0.989234i \(-0.453249\pi\)
0.146345 + 0.989234i \(0.453249\pi\)
\(608\) 5.61913e9 1.01393
\(609\) 2.38994e10 4.28772
\(610\) 2.28341e9 0.407314
\(611\) 1.70870e9 0.303056
\(612\) 5.12917e9 0.904518
\(613\) 8.17364e9 1.43319 0.716595 0.697489i \(-0.245699\pi\)
0.716595 + 0.697489i \(0.245699\pi\)
\(614\) −9.43806e8 −0.164548
\(615\) 8.50698e8 0.147473
\(616\) −5.17698e9 −0.892368
\(617\) −9.17589e9 −1.57272 −0.786358 0.617771i \(-0.788036\pi\)
−0.786358 + 0.617771i \(0.788036\pi\)
\(618\) −3.96032e9 −0.674949
\(619\) −2.25520e9 −0.382180 −0.191090 0.981573i \(-0.561202\pi\)
−0.191090 + 0.981573i \(0.561202\pi\)
\(620\) 3.07681e9 0.518477
\(621\) 1.56088e8 0.0261546
\(622\) −1.34684e9 −0.224414
\(623\) 8.78908e9 1.45625
\(624\) −1.82073e9 −0.299986
\(625\) −5.16908e9 −0.846902
\(626\) −1.73104e9 −0.282031
\(627\) 1.16834e10 1.89292
\(628\) 9.88014e8 0.159186
\(629\) 1.94040e9 0.310896
\(630\) −2.79682e9 −0.445629
\(631\) 8.57121e9 1.35812 0.679062 0.734081i \(-0.262387\pi\)
0.679062 + 0.734081i \(0.262387\pi\)
\(632\) 5.46267e9 0.860787
\(633\) −8.74126e8 −0.136981
\(634\) 6.36564e8 0.0992041
\(635\) 4.51762e9 0.700166
\(636\) −5.97898e9 −0.921567
\(637\) −2.83535e9 −0.434629
\(638\) 3.57301e9 0.544706
\(639\) 1.99151e9 0.301946
\(640\) 5.70677e9 0.860519
\(641\) −1.25720e10 −1.88538 −0.942691 0.333666i \(-0.891714\pi\)
−0.942691 + 0.333666i \(0.891714\pi\)
\(642\) −1.27999e9 −0.190912
\(643\) −9.15051e9 −1.35740 −0.678699 0.734417i \(-0.737456\pi\)
−0.678699 + 0.734417i \(0.737456\pi\)
\(644\) −4.85204e9 −0.715852
\(645\) −9.71314e8 −0.142528
\(646\) −2.46942e9 −0.360397
\(647\) 1.12770e9 0.163693 0.0818463 0.996645i \(-0.473918\pi\)
0.0818463 + 0.996645i \(0.473918\pi\)
\(648\) −3.67728e9 −0.530902
\(649\) −5.25331e9 −0.754357
\(650\) −7.54965e7 −0.0107828
\(651\) −9.78739e9 −1.39038
\(652\) −3.55701e9 −0.502595
\(653\) 1.30242e10 1.83044 0.915220 0.402955i \(-0.132017\pi\)
0.915220 + 0.402955i \(0.132017\pi\)
\(654\) 3.37860e9 0.472296
\(655\) −8.41623e9 −1.17023
\(656\) 6.08549e8 0.0841651
\(657\) −8.50508e9 −1.17004
\(658\) 3.68717e9 0.504548
\(659\) 1.16522e10 1.58601 0.793007 0.609212i \(-0.208514\pi\)
0.793007 + 0.609212i \(0.208514\pi\)
\(660\) 9.06494e9 1.22733
\(661\) 9.54083e8 0.128493 0.0642467 0.997934i \(-0.479536\pi\)
0.0642467 + 0.997934i \(0.479536\pi\)
\(662\) −6.47024e8 −0.0866798
\(663\) 2.82442e9 0.376385
\(664\) 4.53736e9 0.601471
\(665\) −1.48654e10 −1.96020
\(666\) 7.45506e8 0.0977893
\(667\) 7.00083e9 0.913501
\(668\) 5.97334e9 0.775354
\(669\) 1.89639e9 0.244870
\(670\) −8.28259e8 −0.106391
\(671\) 1.19884e10 1.53191
\(672\) −1.38686e10 −1.76294
\(673\) −7.36144e9 −0.930915 −0.465457 0.885070i \(-0.654110\pi\)
−0.465457 + 0.885070i \(0.654110\pi\)
\(674\) 3.01285e9 0.379025
\(675\) −5.78577e7 −0.00724099
\(676\) −5.66516e8 −0.0705340
\(677\) 9.55774e9 1.18384 0.591922 0.805995i \(-0.298369\pi\)
0.591922 + 0.805995i \(0.298369\pi\)
\(678\) −1.73931e9 −0.214325
\(679\) −8.01430e9 −0.982475
\(680\) −4.00550e9 −0.488512
\(681\) −1.82932e10 −2.21960
\(682\) −1.46324e9 −0.176632
\(683\) −2.52339e9 −0.303048 −0.151524 0.988454i \(-0.548418\pi\)
−0.151524 + 0.988454i \(0.548418\pi\)
\(684\) 1.04741e10 1.25147
\(685\) 2.38328e9 0.283307
\(686\) −2.21403e9 −0.261848
\(687\) −1.83183e10 −2.15544
\(688\) −6.94831e8 −0.0813429
\(689\) −1.67657e9 −0.195278
\(690\) −1.60885e9 −0.186442
\(691\) 8.78987e9 1.01347 0.506733 0.862103i \(-0.330853\pi\)
0.506733 + 0.862103i \(0.330853\pi\)
\(692\) 5.48650e9 0.629396
\(693\) −1.46840e10 −1.67601
\(694\) 2.56952e9 0.291806
\(695\) 2.34965e9 0.265494
\(696\) 1.31504e10 1.47844
\(697\) −9.44014e8 −0.105600
\(698\) 1.97452e9 0.219770
\(699\) −1.91762e9 −0.212370
\(700\) 1.79853e9 0.198186
\(701\) −2.87525e7 −0.00315255 −0.00157627 0.999999i \(-0.500502\pi\)
−0.00157627 + 0.999999i \(0.500502\pi\)
\(702\) 3.93263e7 0.00429045
\(703\) 3.96243e9 0.430148
\(704\) 4.99862e9 0.539941
\(705\) −1.34974e10 −1.45073
\(706\) 1.00870e9 0.107882
\(707\) 1.96422e10 2.09036
\(708\) −9.24845e9 −0.979383
\(709\) −1.37312e10 −1.44693 −0.723464 0.690362i \(-0.757451\pi\)
−0.723464 + 0.690362i \(0.757451\pi\)
\(710\) −7.43917e8 −0.0780046
\(711\) 1.54943e10 1.61670
\(712\) 4.83609e9 0.502128
\(713\) −2.86701e9 −0.296221
\(714\) 6.09476e9 0.626632
\(715\) 2.54190e9 0.260068
\(716\) −1.45513e10 −1.48152
\(717\) 1.64242e10 1.66405
\(718\) −8.66536e8 −0.0873677
\(719\) −2.72927e8 −0.0273839 −0.0136919 0.999906i \(-0.504358\pi\)
−0.0136919 + 0.999906i \(0.504358\pi\)
\(720\) 7.32387e9 0.731268
\(721\) 2.64554e10 2.62870
\(722\) −2.12818e9 −0.210440
\(723\) −2.08691e10 −2.05361
\(724\) −9.17792e9 −0.898792
\(725\) −2.59503e9 −0.252906
\(726\) −6.94350e7 −0.00673442
\(727\) −7.05933e8 −0.0681386 −0.0340693 0.999419i \(-0.510847\pi\)
−0.0340693 + 0.999419i \(0.510847\pi\)
\(728\) −2.55568e9 −0.245497
\(729\) −1.12317e10 −1.07374
\(730\) 3.17703e9 0.302267
\(731\) 1.07786e9 0.102059
\(732\) 2.11056e10 1.98888
\(733\) 6.15204e9 0.576973 0.288486 0.957484i \(-0.406848\pi\)
0.288486 + 0.957484i \(0.406848\pi\)
\(734\) 2.63769e9 0.246200
\(735\) 2.23969e10 2.08057
\(736\) −4.06250e9 −0.375596
\(737\) −4.34855e9 −0.400136
\(738\) −3.62692e8 −0.0332155
\(739\) −6.51163e9 −0.593519 −0.296759 0.954952i \(-0.595906\pi\)
−0.296759 + 0.954952i \(0.595906\pi\)
\(740\) 3.07437e9 0.278898
\(741\) 5.76765e9 0.520757
\(742\) −3.61782e9 −0.325113
\(743\) −1.93477e10 −1.73049 −0.865245 0.501349i \(-0.832837\pi\)
−0.865245 + 0.501349i \(0.832837\pi\)
\(744\) −5.38540e9 −0.479416
\(745\) 1.05790e10 0.937337
\(746\) −2.14376e9 −0.189056
\(747\) 1.28697e10 1.12966
\(748\) −1.00593e10 −0.878844
\(749\) 8.55046e9 0.743538
\(750\) 5.01712e9 0.434250
\(751\) −2.60822e9 −0.224700 −0.112350 0.993669i \(-0.535838\pi\)
−0.112350 + 0.993669i \(0.535838\pi\)
\(752\) −9.65536e9 −0.827954
\(753\) 2.24564e10 1.91672
\(754\) 1.76386e9 0.149853
\(755\) −1.81311e9 −0.153324
\(756\) −9.36857e8 −0.0788582
\(757\) −9.81364e9 −0.822233 −0.411116 0.911583i \(-0.634861\pi\)
−0.411116 + 0.911583i \(0.634861\pi\)
\(758\) −3.85043e9 −0.321120
\(759\) −8.44684e9 −0.701210
\(760\) −8.17950e9 −0.675895
\(761\) −5.79005e9 −0.476251 −0.238126 0.971234i \(-0.576533\pi\)
−0.238126 + 0.971234i \(0.576533\pi\)
\(762\) −3.78233e9 −0.309683
\(763\) −2.25694e10 −1.83944
\(764\) −4.17024e9 −0.338325
\(765\) −1.13612e10 −0.917505
\(766\) −4.08527e9 −0.328413
\(767\) −2.59336e9 −0.207529
\(768\) 4.81925e9 0.383897
\(769\) −1.82078e10 −1.44383 −0.721913 0.691984i \(-0.756737\pi\)
−0.721913 + 0.691984i \(0.756737\pi\)
\(770\) 5.48511e9 0.432980
\(771\) −2.39089e9 −0.187875
\(772\) 7.87739e9 0.616200
\(773\) 1.68623e10 1.31307 0.656537 0.754294i \(-0.272021\pi\)
0.656537 + 0.754294i \(0.272021\pi\)
\(774\) 4.14116e8 0.0321017
\(775\) 1.06273e9 0.0820100
\(776\) −4.40978e9 −0.338767
\(777\) −9.77965e9 −0.747911
\(778\) −2.82251e9 −0.214886
\(779\) −1.92774e9 −0.146106
\(780\) 4.47501e9 0.337647
\(781\) −3.90573e9 −0.293375
\(782\) 1.78533e9 0.133504
\(783\) 1.35176e9 0.100631
\(784\) 1.60217e10 1.18741
\(785\) −2.18846e9 −0.161471
\(786\) 7.04641e9 0.517594
\(787\) 2.34354e10 1.71380 0.856900 0.515482i \(-0.172387\pi\)
0.856900 + 0.515482i \(0.172387\pi\)
\(788\) −3.84699e9 −0.280078
\(789\) −3.76615e10 −2.72978
\(790\) −5.78781e9 −0.417657
\(791\) 1.16188e10 0.834724
\(792\) −8.07968e9 −0.577904
\(793\) 5.91822e9 0.421439
\(794\) −3.18232e9 −0.225617
\(795\) 1.32435e10 0.934798
\(796\) 1.06022e10 0.745078
\(797\) −2.70750e10 −1.89437 −0.947185 0.320686i \(-0.896086\pi\)
−0.947185 + 0.320686i \(0.896086\pi\)
\(798\) 1.24459e10 0.866994
\(799\) 1.49779e10 1.03881
\(800\) 1.50587e9 0.103985
\(801\) 1.37171e10 0.943077
\(802\) −4.85388e9 −0.332261
\(803\) 1.66801e10 1.13683
\(804\) −7.65562e9 −0.519498
\(805\) 1.07473e10 0.726130
\(806\) −7.22345e8 −0.0485928
\(807\) 2.64609e9 0.177234
\(808\) 1.08079e10 0.720777
\(809\) 3.46307e9 0.229954 0.114977 0.993368i \(-0.463321\pi\)
0.114977 + 0.993368i \(0.463321\pi\)
\(810\) 3.89615e9 0.257595
\(811\) −2.19790e10 −1.44689 −0.723445 0.690382i \(-0.757442\pi\)
−0.723445 + 0.690382i \(0.757442\pi\)
\(812\) −4.20198e10 −2.75428
\(813\) 1.22525e10 0.799662
\(814\) −1.46208e9 −0.0950136
\(815\) 7.87882e9 0.509811
\(816\) −1.59600e10 −1.02829
\(817\) 2.20106e9 0.141207
\(818\) −1.19449e9 −0.0763039
\(819\) −7.24891e9 −0.461083
\(820\) −1.49570e9 −0.0947316
\(821\) 1.70104e10 1.07278 0.536392 0.843969i \(-0.319787\pi\)
0.536392 + 0.843969i \(0.319787\pi\)
\(822\) −1.99538e9 −0.125307
\(823\) 7.93771e9 0.496359 0.248179 0.968714i \(-0.420168\pi\)
0.248179 + 0.968714i \(0.420168\pi\)
\(824\) 1.45568e10 0.906400
\(825\) 3.13103e9 0.194133
\(826\) −5.59616e9 −0.345509
\(827\) 2.72776e10 1.67702 0.838508 0.544890i \(-0.183428\pi\)
0.838508 + 0.544890i \(0.183428\pi\)
\(828\) −7.57254e9 −0.463592
\(829\) 1.73055e10 1.05498 0.527488 0.849562i \(-0.323134\pi\)
0.527488 + 0.849562i \(0.323134\pi\)
\(830\) −4.80742e9 −0.291836
\(831\) 1.73008e10 1.04583
\(832\) 2.46763e9 0.148542
\(833\) −2.48537e10 −1.48982
\(834\) −1.96722e9 −0.117428
\(835\) −1.32310e10 −0.786486
\(836\) −2.05417e10 −1.21595
\(837\) −5.53578e8 −0.0326317
\(838\) −2.87848e9 −0.168970
\(839\) −1.68504e10 −0.985014 −0.492507 0.870309i \(-0.663919\pi\)
−0.492507 + 0.870309i \(0.663919\pi\)
\(840\) 2.01878e10 1.17520
\(841\) 4.33790e10 2.51474
\(842\) 1.90569e9 0.110017
\(843\) −3.89258e8 −0.0223790
\(844\) 1.53689e9 0.0879920
\(845\) 1.25484e9 0.0715467
\(846\) 5.75454e9 0.326749
\(847\) 4.63833e8 0.0262283
\(848\) 9.47377e9 0.533503
\(849\) 6.13996e9 0.344341
\(850\) −6.61778e8 −0.0369612
\(851\) −2.86475e9 −0.159343
\(852\) −6.87603e9 −0.380890
\(853\) 1.48578e10 0.819661 0.409830 0.912162i \(-0.365588\pi\)
0.409830 + 0.912162i \(0.365588\pi\)
\(854\) 1.27708e10 0.701642
\(855\) −2.32003e10 −1.26944
\(856\) 4.70480e9 0.256379
\(857\) −6.63563e9 −0.360122 −0.180061 0.983655i \(-0.557629\pi\)
−0.180061 + 0.983655i \(0.557629\pi\)
\(858\) −2.12818e9 −0.115028
\(859\) −1.48045e10 −0.796925 −0.398462 0.917185i \(-0.630456\pi\)
−0.398462 + 0.917185i \(0.630456\pi\)
\(860\) 1.70776e9 0.0915551
\(861\) 4.75784e9 0.254038
\(862\) 3.08736e9 0.164177
\(863\) −1.21462e10 −0.643284 −0.321642 0.946861i \(-0.604235\pi\)
−0.321642 + 0.946861i \(0.604235\pi\)
\(864\) −7.84410e8 −0.0413757
\(865\) −1.21527e10 −0.638432
\(866\) −5.33289e9 −0.279029
\(867\) −2.63424e9 −0.137274
\(868\) 1.72082e10 0.893132
\(869\) −3.03873e10 −1.57081
\(870\) −1.39331e10 −0.717347
\(871\) −2.14671e9 −0.110080
\(872\) −1.24186e10 −0.634255
\(873\) −1.25079e10 −0.636258
\(874\) 3.64577e9 0.184714
\(875\) −3.35149e10 −1.69126
\(876\) 2.93653e10 1.47595
\(877\) −2.24896e10 −1.12586 −0.562929 0.826505i \(-0.690326\pi\)
−0.562929 + 0.826505i \(0.690326\pi\)
\(878\) 7.86008e8 0.0391919
\(879\) −2.99185e10 −1.48586
\(880\) −1.43635e10 −0.710512
\(881\) −2.25206e9 −0.110960 −0.0554798 0.998460i \(-0.517669\pi\)
−0.0554798 + 0.998460i \(0.517669\pi\)
\(882\) −9.54885e9 −0.468609
\(883\) −3.28243e10 −1.60448 −0.802239 0.597004i \(-0.796358\pi\)
−0.802239 + 0.597004i \(0.796358\pi\)
\(884\) −4.96589e9 −0.241777
\(885\) 2.04854e10 0.993445
\(886\) 4.63752e9 0.224010
\(887\) 1.94755e10 0.937034 0.468517 0.883454i \(-0.344788\pi\)
0.468517 + 0.883454i \(0.344788\pi\)
\(888\) −5.38114e9 −0.257887
\(889\) 2.52664e10 1.20611
\(890\) −5.12393e9 −0.243634
\(891\) 2.04557e10 0.968816
\(892\) −3.33422e9 −0.157296
\(893\) 3.05859e10 1.43728
\(894\) −8.85714e9 −0.414584
\(895\) 3.22314e10 1.50279
\(896\) 3.19172e10 1.48234
\(897\) −4.16988e9 −0.192908
\(898\) 9.70436e9 0.447198
\(899\) −2.48290e10 −1.13973
\(900\) 2.80695e9 0.128347
\(901\) −1.46962e10 −0.669374
\(902\) 7.11308e8 0.0322727
\(903\) −5.43243e9 −0.245520
\(904\) 6.39310e9 0.287821
\(905\) 2.03292e10 0.911696
\(906\) 1.51801e9 0.0678152
\(907\) −1.31624e10 −0.585746 −0.292873 0.956151i \(-0.594611\pi\)
−0.292873 + 0.956151i \(0.594611\pi\)
\(908\) 3.21631e10 1.42580
\(909\) 3.06554e10 1.35373
\(910\) 2.70779e9 0.119116
\(911\) 3.27282e10 1.43419 0.717097 0.696973i \(-0.245470\pi\)
0.717097 + 0.696973i \(0.245470\pi\)
\(912\) −3.25913e10 −1.42272
\(913\) −2.52400e10 −1.09760
\(914\) 6.10179e9 0.264329
\(915\) −4.67491e10 −2.01744
\(916\) 3.22072e10 1.38458
\(917\) −4.70708e10 −2.01585
\(918\) 3.44721e8 0.0147068
\(919\) −1.31775e10 −0.560052 −0.280026 0.959992i \(-0.590343\pi\)
−0.280026 + 0.959992i \(0.590343\pi\)
\(920\) 5.91359e9 0.250377
\(921\) 1.93229e10 0.815011
\(922\) 6.36626e9 0.267502
\(923\) −1.92811e9 −0.0807097
\(924\) 5.06990e10 2.11421
\(925\) 1.06189e9 0.0441147
\(926\) −1.05517e10 −0.436702
\(927\) 4.12888e10 1.70237
\(928\) −3.51823e10 −1.44513
\(929\) 3.19728e9 0.130836 0.0654178 0.997858i \(-0.479162\pi\)
0.0654178 + 0.997858i \(0.479162\pi\)
\(930\) 5.70594e9 0.232614
\(931\) −5.07529e10 −2.06128
\(932\) 3.37156e9 0.136419
\(933\) 2.75744e10 1.11153
\(934\) −1.24551e10 −0.500186
\(935\) 2.22815e10 0.891462
\(936\) −3.98863e9 −0.158986
\(937\) −2.69430e10 −1.06993 −0.534967 0.844873i \(-0.679676\pi\)
−0.534967 + 0.844873i \(0.679676\pi\)
\(938\) −4.63234e9 −0.183270
\(939\) 3.54403e10 1.39691
\(940\) 2.37310e10 0.931899
\(941\) −7.15449e9 −0.279908 −0.139954 0.990158i \(-0.544695\pi\)
−0.139954 + 0.990158i \(0.544695\pi\)
\(942\) 1.83227e9 0.0714186
\(943\) 1.39371e9 0.0541230
\(944\) 1.46543e10 0.566974
\(945\) 2.07515e9 0.0799904
\(946\) −8.12161e8 −0.0311905
\(947\) 2.89770e10 1.10874 0.554368 0.832271i \(-0.312960\pi\)
0.554368 + 0.832271i \(0.312960\pi\)
\(948\) −5.34968e10 −2.03938
\(949\) 8.23434e9 0.312750
\(950\) −1.35139e9 −0.0511387
\(951\) −1.30326e10 −0.491360
\(952\) −2.24022e10 −0.841515
\(953\) 1.57016e10 0.587651 0.293826 0.955859i \(-0.405072\pi\)
0.293826 + 0.955859i \(0.405072\pi\)
\(954\) −5.64632e9 −0.210545
\(955\) 9.23713e9 0.343183
\(956\) −2.88770e10 −1.06893
\(957\) −7.31517e10 −2.69794
\(958\) 1.30618e10 0.479979
\(959\) 1.33294e10 0.488027
\(960\) −1.94923e10 −0.711071
\(961\) −1.73445e10 −0.630420
\(962\) −7.21774e8 −0.0261390
\(963\) 1.33447e10 0.481521
\(964\) 3.66919e10 1.31917
\(965\) −1.74485e10 −0.625047
\(966\) −8.99810e9 −0.321167
\(967\) 4.38024e10 1.55778 0.778888 0.627162i \(-0.215784\pi\)
0.778888 + 0.627162i \(0.215784\pi\)
\(968\) 2.55219e8 0.00904377
\(969\) 5.05574e10 1.78505
\(970\) 4.67225e9 0.164371
\(971\) 2.65581e10 0.930957 0.465479 0.885059i \(-0.345882\pi\)
0.465479 + 0.885059i \(0.345882\pi\)
\(972\) 3.74213e10 1.30704
\(973\) 1.31412e10 0.457343
\(974\) 1.91852e9 0.0665289
\(975\) 1.54567e9 0.0534073
\(976\) −3.34421e10 −1.15138
\(977\) 4.86322e10 1.66837 0.834186 0.551484i \(-0.185938\pi\)
0.834186 + 0.551484i \(0.185938\pi\)
\(978\) −6.59647e9 −0.225489
\(979\) −2.69018e10 −0.916309
\(980\) −3.93783e10 −1.33649
\(981\) −3.52240e10 −1.19123
\(982\) 1.15808e10 0.390256
\(983\) 5.65601e9 0.189921 0.0949605 0.995481i \(-0.469728\pi\)
0.0949605 + 0.995481i \(0.469728\pi\)
\(984\) 2.61795e9 0.0875947
\(985\) 8.52113e9 0.284100
\(986\) 1.54614e10 0.513665
\(987\) −7.54889e10 −2.49904
\(988\) −1.01407e10 −0.334517
\(989\) −1.59132e9 −0.0523082
\(990\) 8.56058e9 0.280401
\(991\) −1.64542e10 −0.537054 −0.268527 0.963272i \(-0.586537\pi\)
−0.268527 + 0.963272i \(0.586537\pi\)
\(992\) 1.44080e10 0.468612
\(993\) 1.32468e10 0.429327
\(994\) −4.16063e9 −0.134371
\(995\) −2.34841e10 −0.755775
\(996\) −4.44351e10 −1.42501
\(997\) −5.55883e10 −1.77644 −0.888219 0.459420i \(-0.848057\pi\)
−0.888219 + 0.459420i \(0.848057\pi\)
\(998\) −6.94419e9 −0.221139
\(999\) −5.53140e8 −0.0175532
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 13.8.a.c.1.2 4
3.2 odd 2 117.8.a.e.1.3 4
4.3 odd 2 208.8.a.k.1.2 4
5.4 even 2 325.8.a.c.1.3 4
13.5 odd 4 169.8.b.c.168.5 8
13.8 odd 4 169.8.b.c.168.4 8
13.12 even 2 169.8.a.c.1.3 4
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
13.8.a.c.1.2 4 1.1 even 1 trivial
117.8.a.e.1.3 4 3.2 odd 2
169.8.a.c.1.3 4 13.12 even 2
169.8.b.c.168.4 8 13.8 odd 4
169.8.b.c.168.5 8 13.5 odd 4
208.8.a.k.1.2 4 4.3 odd 2
325.8.a.c.1.3 4 5.4 even 2