Properties

Label 289.10.a.i.1.12
Level $289$
Weight $10$
Character 289.1
Self dual yes
Analytic conductor $148.845$
Analytic rank $0$
Dimension $52$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [289,10,Mod(1,289)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(289, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0]))
 
N = Newforms(chi, 10, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("289.1");
 
S:= CuspForms(chi, 10);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 289 = 17^{2} \)
Weight: \( k \) \(=\) \( 10 \)
Character orbit: \([\chi]\) \(=\) 289.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: \(148.845356651\)
Analytic rank: \(0\)
Dimension: \(52\)
Twist minimal: no (minimal twist has level 17)
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.12
Character \(\chi\) \(=\) 289.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-26.9890 q^{2} +111.659 q^{3} +216.409 q^{4} +2126.40 q^{5} -3013.56 q^{6} +8475.21 q^{7} +7977.73 q^{8} -7215.34 q^{9} +O(q^{10})\) \(q-26.9890 q^{2} +111.659 q^{3} +216.409 q^{4} +2126.40 q^{5} -3013.56 q^{6} +8475.21 q^{7} +7977.73 q^{8} -7215.34 q^{9} -57389.5 q^{10} +7768.93 q^{11} +24163.9 q^{12} +188698. q^{13} -228738. q^{14} +237431. q^{15} -326113. q^{16} +194735. q^{18} +117938. q^{19} +460172. q^{20} +946331. q^{21} -209676. q^{22} -1.84165e6 q^{23} +890782. q^{24} +2.56845e6 q^{25} -5.09279e6 q^{26} -3.00343e6 q^{27} +1.83411e6 q^{28} +5.18387e6 q^{29} -6.40804e6 q^{30} +4.70232e6 q^{31} +4.71687e6 q^{32} +867468. q^{33} +1.80217e7 q^{35} -1.56146e6 q^{36} -337590. q^{37} -3.18303e6 q^{38} +2.10698e7 q^{39} +1.69638e7 q^{40} +1.68128e7 q^{41} -2.55406e7 q^{42} -1.06248e7 q^{43} +1.68126e6 q^{44} -1.53427e7 q^{45} +4.97043e7 q^{46} +9.90984e6 q^{47} -3.64133e7 q^{48} +3.14756e7 q^{49} -6.93202e7 q^{50} +4.08360e7 q^{52} +8.09197e7 q^{53} +8.10598e7 q^{54} +1.65199e7 q^{55} +6.76129e7 q^{56} +1.31688e7 q^{57} -1.39908e8 q^{58} +3.54248e7 q^{59} +5.13822e7 q^{60} -1.51754e7 q^{61} -1.26911e8 q^{62} -6.11516e7 q^{63} +3.96658e7 q^{64} +4.01248e8 q^{65} -2.34121e7 q^{66} -1.17520e8 q^{67} -2.05636e8 q^{69} -4.86388e8 q^{70} +3.17626e8 q^{71} -5.75620e7 q^{72} -1.04290e8 q^{73} +9.11124e6 q^{74} +2.86790e8 q^{75} +2.55228e7 q^{76} +6.58433e7 q^{77} -5.68654e8 q^{78} +1.97824e8 q^{79} -6.93446e8 q^{80} -1.93340e8 q^{81} -4.53760e8 q^{82} +1.02741e7 q^{83} +2.04794e8 q^{84} +2.86754e8 q^{86} +5.78823e8 q^{87} +6.19784e7 q^{88} -9.95387e8 q^{89} +4.14085e8 q^{90} +1.59926e9 q^{91} -3.98549e8 q^{92} +5.25054e8 q^{93} -2.67457e8 q^{94} +2.50783e8 q^{95} +5.26679e8 q^{96} -2.90283e8 q^{97} -8.49497e8 q^{98} -5.60555e7 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 52 q + 64 q^{2} + 13312 q^{4} + 49152 q^{8} + 341172 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 52 q + 64 q^{2} + 13312 q^{4} + 49152 q^{8} + 341172 q^{9} + 156200 q^{13} + 1207872 q^{15} + 3407880 q^{16} + 2193336 q^{18} + 1185568 q^{19} + 5198336 q^{21} + 13827692 q^{25} + 3618944 q^{26} - 9167544 q^{30} + 61884888 q^{32} + 1635208 q^{33} + 46992776 q^{35} + 156027320 q^{36} + 84813952 q^{38} - 4635776 q^{42} + 125448912 q^{43} + 164193176 q^{47} + 270850284 q^{49} - 226223888 q^{50} + 103553016 q^{52} + 426167208 q^{53} + 677761520 q^{55} + 375214512 q^{59} + 336918024 q^{60} + 190014416 q^{64} + 1377178928 q^{66} + 311910088 q^{67} + 533688136 q^{69} + 1477690280 q^{70} + 2757942680 q^{72} + 4047975520 q^{76} + 3440336432 q^{77} + 3266558756 q^{81} + 2072890608 q^{83} + 2630025952 q^{84} + 1538547296 q^{86} - 1010436256 q^{87} + 1873849184 q^{89} - 1998451624 q^{93} - 6880776704 q^{94} - 4667454128 q^{98}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −26.9890 −1.19276 −0.596379 0.802703i \(-0.703395\pi\)
−0.596379 + 0.802703i \(0.703395\pi\)
\(3\) 111.659 0.795878 0.397939 0.917412i \(-0.369725\pi\)
0.397939 + 0.917412i \(0.369725\pi\)
\(4\) 216.409 0.422673
\(5\) 2126.40 1.52153 0.760764 0.649028i \(-0.224824\pi\)
0.760764 + 0.649028i \(0.224824\pi\)
\(6\) −3013.56 −0.949291
\(7\) 8475.21 1.33416 0.667082 0.744984i \(-0.267543\pi\)
0.667082 + 0.744984i \(0.267543\pi\)
\(8\) 7977.73 0.688611
\(9\) −7215.34 −0.366577
\(10\) −57389.5 −1.81482
\(11\) 7768.93 0.159990 0.0799952 0.996795i \(-0.474509\pi\)
0.0799952 + 0.996795i \(0.474509\pi\)
\(12\) 24163.9 0.336397
\(13\) 188698. 1.83241 0.916205 0.400709i \(-0.131236\pi\)
0.916205 + 0.400709i \(0.131236\pi\)
\(14\) −228738. −1.59134
\(15\) 237431. 1.21095
\(16\) −326113. −1.24402
\(17\) 0 0
\(18\) 194735. 0.437238
\(19\) 117938. 0.207616 0.103808 0.994597i \(-0.466897\pi\)
0.103808 + 0.994597i \(0.466897\pi\)
\(20\) 460172. 0.643109
\(21\) 946331. 1.06183
\(22\) −209676. −0.190830
\(23\) −1.84165e6 −1.37224 −0.686122 0.727486i \(-0.740689\pi\)
−0.686122 + 0.727486i \(0.740689\pi\)
\(24\) 890782. 0.548051
\(25\) 2.56845e6 1.31505
\(26\) −5.09279e6 −2.18562
\(27\) −3.00343e6 −1.08763
\(28\) 1.83411e6 0.563916
\(29\) 5.18387e6 1.36101 0.680507 0.732741i \(-0.261760\pi\)
0.680507 + 0.732741i \(0.261760\pi\)
\(30\) −6.40804e6 −1.44437
\(31\) 4.70232e6 0.914501 0.457250 0.889338i \(-0.348834\pi\)
0.457250 + 0.889338i \(0.348834\pi\)
\(32\) 4.71687e6 0.795205
\(33\) 867468. 0.127333
\(34\) 0 0
\(35\) 1.80217e7 2.02997
\(36\) −1.56146e6 −0.154942
\(37\) −337590. −0.0296130 −0.0148065 0.999890i \(-0.504713\pi\)
−0.0148065 + 0.999890i \(0.504713\pi\)
\(38\) −3.18303e6 −0.247636
\(39\) 2.10698e7 1.45838
\(40\) 1.69638e7 1.04774
\(41\) 1.68128e7 0.929205 0.464603 0.885519i \(-0.346197\pi\)
0.464603 + 0.885519i \(0.346197\pi\)
\(42\) −2.55406e7 −1.26651
\(43\) −1.06248e7 −0.473929 −0.236965 0.971518i \(-0.576153\pi\)
−0.236965 + 0.971518i \(0.576153\pi\)
\(44\) 1.68126e6 0.0676237
\(45\) −1.53427e7 −0.557758
\(46\) 4.97043e7 1.63676
\(47\) 9.90984e6 0.296228 0.148114 0.988970i \(-0.452680\pi\)
0.148114 + 0.988970i \(0.452680\pi\)
\(48\) −3.64133e7 −0.990089
\(49\) 3.14756e7 0.779995
\(50\) −6.93202e7 −1.56854
\(51\) 0 0
\(52\) 4.08360e7 0.774511
\(53\) 8.09197e7 1.40868 0.704341 0.709862i \(-0.251243\pi\)
0.704341 + 0.709862i \(0.251243\pi\)
\(54\) 8.10598e7 1.29728
\(55\) 1.65199e7 0.243430
\(56\) 6.76129e7 0.918721
\(57\) 1.31688e7 0.165237
\(58\) −1.39908e8 −1.62336
\(59\) 3.54248e7 0.380604 0.190302 0.981726i \(-0.439053\pi\)
0.190302 + 0.981726i \(0.439053\pi\)
\(60\) 5.13822e7 0.511837
\(61\) −1.51754e7 −0.140331 −0.0701657 0.997535i \(-0.522353\pi\)
−0.0701657 + 0.997535i \(0.522353\pi\)
\(62\) −1.26911e8 −1.09078
\(63\) −6.11516e7 −0.489075
\(64\) 3.96658e7 0.295533
\(65\) 4.01248e8 2.78806
\(66\) −2.34121e7 −0.151878
\(67\) −1.17520e8 −0.712486 −0.356243 0.934393i \(-0.615943\pi\)
−0.356243 + 0.934393i \(0.615943\pi\)
\(68\) 0 0
\(69\) −2.05636e8 −1.09214
\(70\) −4.86388e8 −2.42126
\(71\) 3.17626e8 1.48338 0.741692 0.670740i \(-0.234024\pi\)
0.741692 + 0.670740i \(0.234024\pi\)
\(72\) −5.75620e7 −0.252429
\(73\) −1.04290e8 −0.429824 −0.214912 0.976633i \(-0.568947\pi\)
−0.214912 + 0.976633i \(0.568947\pi\)
\(74\) 9.11124e6 0.0353211
\(75\) 2.86790e8 1.04662
\(76\) 2.55228e7 0.0877539
\(77\) 6.58433e7 0.213454
\(78\) −5.68654e8 −1.73949
\(79\) 1.97824e8 0.571423 0.285712 0.958316i \(-0.407770\pi\)
0.285712 + 0.958316i \(0.407770\pi\)
\(80\) −6.93446e8 −1.89281
\(81\) −1.93340e8 −0.499044
\(82\) −4.53760e8 −1.10832
\(83\) 1.02741e7 0.0237626 0.0118813 0.999929i \(-0.496218\pi\)
0.0118813 + 0.999929i \(0.496218\pi\)
\(84\) 2.04794e8 0.448808
\(85\) 0 0
\(86\) 2.86754e8 0.565283
\(87\) 5.78823e8 1.08320
\(88\) 6.19784e7 0.110171
\(89\) −9.95387e8 −1.68166 −0.840828 0.541303i \(-0.817931\pi\)
−0.840828 + 0.541303i \(0.817931\pi\)
\(90\) 4.14085e8 0.665271
\(91\) 1.59926e9 2.44474
\(92\) −3.98549e8 −0.580011
\(93\) 5.25054e8 0.727832
\(94\) −2.67457e8 −0.353329
\(95\) 2.50783e8 0.315894
\(96\) 5.26679e8 0.632887
\(97\) −2.90283e8 −0.332926 −0.166463 0.986048i \(-0.553235\pi\)
−0.166463 + 0.986048i \(0.553235\pi\)
\(98\) −8.49497e8 −0.930346
\(99\) −5.60555e7 −0.0586489
\(100\) 5.55836e8 0.555836
\(101\) −1.04616e8 −0.100035 −0.0500176 0.998748i \(-0.515928\pi\)
−0.0500176 + 0.998748i \(0.515928\pi\)
\(102\) 0 0
\(103\) −2.89721e8 −0.253637 −0.126818 0.991926i \(-0.540477\pi\)
−0.126818 + 0.991926i \(0.540477\pi\)
\(104\) 1.50538e9 1.26182
\(105\) 2.01228e9 1.61561
\(106\) −2.18395e9 −1.68022
\(107\) −2.59660e8 −0.191504 −0.0957520 0.995405i \(-0.530526\pi\)
−0.0957520 + 0.995405i \(0.530526\pi\)
\(108\) −6.49969e8 −0.459712
\(109\) 8.72678e8 0.592154 0.296077 0.955164i \(-0.404321\pi\)
0.296077 + 0.955164i \(0.404321\pi\)
\(110\) −4.45855e8 −0.290353
\(111\) −3.76949e7 −0.0235683
\(112\) −2.76387e9 −1.65973
\(113\) −1.61677e9 −0.932815 −0.466408 0.884570i \(-0.654452\pi\)
−0.466408 + 0.884570i \(0.654452\pi\)
\(114\) −3.55413e8 −0.197088
\(115\) −3.91608e9 −2.08791
\(116\) 1.12183e9 0.575264
\(117\) −1.36152e9 −0.671720
\(118\) −9.56082e8 −0.453969
\(119\) 0 0
\(120\) 1.89416e9 0.833875
\(121\) −2.29759e9 −0.974403
\(122\) 4.09569e8 0.167382
\(123\) 1.87729e9 0.739535
\(124\) 1.01762e9 0.386535
\(125\) 1.30844e9 0.479356
\(126\) 1.65042e9 0.583348
\(127\) −4.64829e9 −1.58554 −0.792769 0.609522i \(-0.791361\pi\)
−0.792769 + 0.609522i \(0.791361\pi\)
\(128\) −3.48558e9 −1.14770
\(129\) −1.18635e9 −0.377190
\(130\) −1.08293e10 −3.32549
\(131\) −3.87389e9 −1.14928 −0.574641 0.818405i \(-0.694858\pi\)
−0.574641 + 0.818405i \(0.694858\pi\)
\(132\) 1.87728e8 0.0538203
\(133\) 9.99547e8 0.276994
\(134\) 3.17176e9 0.849824
\(135\) −6.38650e9 −1.65486
\(136\) 0 0
\(137\) −2.81827e9 −0.683502 −0.341751 0.939790i \(-0.611020\pi\)
−0.341751 + 0.939790i \(0.611020\pi\)
\(138\) 5.54992e9 1.30266
\(139\) 6.78367e9 1.54134 0.770670 0.637235i \(-0.219922\pi\)
0.770670 + 0.637235i \(0.219922\pi\)
\(140\) 3.90005e9 0.858014
\(141\) 1.10652e9 0.235762
\(142\) −8.57243e9 −1.76932
\(143\) 1.46598e9 0.293168
\(144\) 2.35301e9 0.456030
\(145\) 1.10230e10 2.07082
\(146\) 2.81469e9 0.512677
\(147\) 3.51453e9 0.620781
\(148\) −7.30575e7 −0.0125166
\(149\) −8.91855e9 −1.48237 −0.741184 0.671302i \(-0.765736\pi\)
−0.741184 + 0.671302i \(0.765736\pi\)
\(150\) −7.74020e9 −1.24836
\(151\) 9.82516e9 1.53795 0.768977 0.639276i \(-0.220766\pi\)
0.768977 + 0.639276i \(0.220766\pi\)
\(152\) 9.40875e8 0.142967
\(153\) 0 0
\(154\) −1.77705e9 −0.254599
\(155\) 9.99901e9 1.39144
\(156\) 4.55969e9 0.616417
\(157\) −3.59938e8 −0.0472802 −0.0236401 0.999721i \(-0.507526\pi\)
−0.0236401 + 0.999721i \(0.507526\pi\)
\(158\) −5.33909e9 −0.681570
\(159\) 9.03539e9 1.12114
\(160\) 1.00300e10 1.20993
\(161\) −1.56084e10 −1.83080
\(162\) 5.21805e9 0.595239
\(163\) 2.33468e9 0.259050 0.129525 0.991576i \(-0.458655\pi\)
0.129525 + 0.991576i \(0.458655\pi\)
\(164\) 3.63843e9 0.392750
\(165\) 1.84459e9 0.193741
\(166\) −2.77289e8 −0.0283431
\(167\) 1.41903e10 1.41178 0.705891 0.708321i \(-0.250547\pi\)
0.705891 + 0.708321i \(0.250547\pi\)
\(168\) 7.54957e9 0.731190
\(169\) 2.50025e10 2.35773
\(170\) 0 0
\(171\) −8.50961e8 −0.0761075
\(172\) −2.29930e9 −0.200317
\(173\) −1.14445e10 −0.971380 −0.485690 0.874131i \(-0.661432\pi\)
−0.485690 + 0.874131i \(0.661432\pi\)
\(174\) −1.56219e10 −1.29200
\(175\) 2.17682e10 1.75449
\(176\) −2.53355e9 −0.199031
\(177\) 3.95549e9 0.302915
\(178\) 2.68645e10 2.00581
\(179\) 1.03273e10 0.751883 0.375941 0.926643i \(-0.377319\pi\)
0.375941 + 0.926643i \(0.377319\pi\)
\(180\) −3.32030e9 −0.235749
\(181\) 7.53319e9 0.521706 0.260853 0.965379i \(-0.415996\pi\)
0.260853 + 0.965379i \(0.415996\pi\)
\(182\) −4.31624e10 −2.91598
\(183\) −1.69446e9 −0.111687
\(184\) −1.46922e10 −0.944943
\(185\) −7.17852e8 −0.0450570
\(186\) −1.41707e10 −0.868127
\(187\) 0 0
\(188\) 2.14458e9 0.125208
\(189\) −2.54547e10 −1.45108
\(190\) −6.76839e9 −0.376786
\(191\) 1.86443e10 1.01367 0.506834 0.862044i \(-0.330816\pi\)
0.506834 + 0.862044i \(0.330816\pi\)
\(192\) 4.42903e9 0.235208
\(193\) −2.71011e10 −1.40598 −0.702989 0.711200i \(-0.748152\pi\)
−0.702989 + 0.711200i \(0.748152\pi\)
\(194\) 7.83445e9 0.397101
\(195\) 4.48028e10 2.21896
\(196\) 6.81160e9 0.329683
\(197\) 1.57089e9 0.0743101 0.0371551 0.999310i \(-0.488170\pi\)
0.0371551 + 0.999310i \(0.488170\pi\)
\(198\) 1.51288e9 0.0699540
\(199\) 1.15986e10 0.524285 0.262143 0.965029i \(-0.415571\pi\)
0.262143 + 0.965029i \(0.415571\pi\)
\(200\) 2.04904e10 0.905558
\(201\) −1.31222e10 −0.567052
\(202\) 2.82349e9 0.119318
\(203\) 4.39344e10 1.81582
\(204\) 0 0
\(205\) 3.57507e10 1.41381
\(206\) 7.81928e9 0.302527
\(207\) 1.32881e10 0.503034
\(208\) −6.15369e10 −2.27956
\(209\) 9.16250e8 0.0332166
\(210\) −5.43095e10 −1.92703
\(211\) −3.17418e10 −1.10246 −0.551228 0.834355i \(-0.685840\pi\)
−0.551228 + 0.834355i \(0.685840\pi\)
\(212\) 1.75117e10 0.595412
\(213\) 3.54657e10 1.18059
\(214\) 7.00797e9 0.228418
\(215\) −2.25926e10 −0.721097
\(216\) −2.39606e10 −0.748954
\(217\) 3.98531e10 1.22009
\(218\) −2.35527e10 −0.706297
\(219\) −1.16449e10 −0.342088
\(220\) 3.57504e9 0.102891
\(221\) 0 0
\(222\) 1.01735e9 0.0281113
\(223\) 4.39482e10 1.19006 0.595030 0.803704i \(-0.297140\pi\)
0.595030 + 0.803704i \(0.297140\pi\)
\(224\) 3.99765e10 1.06093
\(225\) −1.85323e10 −0.482067
\(226\) 4.36351e10 1.11262
\(227\) −3.84258e10 −0.960520 −0.480260 0.877126i \(-0.659458\pi\)
−0.480260 + 0.877126i \(0.659458\pi\)
\(228\) 2.84984e9 0.0698414
\(229\) −1.92884e10 −0.463487 −0.231744 0.972777i \(-0.574443\pi\)
−0.231744 + 0.972777i \(0.574443\pi\)
\(230\) 1.05691e11 2.49037
\(231\) 7.35198e9 0.169883
\(232\) 4.13555e10 0.937210
\(233\) 7.60123e10 1.68959 0.844797 0.535087i \(-0.179721\pi\)
0.844797 + 0.535087i \(0.179721\pi\)
\(234\) 3.67462e10 0.801200
\(235\) 2.10723e10 0.450720
\(236\) 7.66624e9 0.160871
\(237\) 2.20888e10 0.454784
\(238\) 0 0
\(239\) 2.69458e10 0.534196 0.267098 0.963669i \(-0.413935\pi\)
0.267098 + 0.963669i \(0.413935\pi\)
\(240\) −7.74292e10 −1.50645
\(241\) 7.71206e10 1.47263 0.736315 0.676639i \(-0.236564\pi\)
0.736315 + 0.676639i \(0.236564\pi\)
\(242\) 6.20098e10 1.16223
\(243\) 3.75285e10 0.690452
\(244\) −3.28408e9 −0.0593144
\(245\) 6.69298e10 1.18678
\(246\) −5.06663e10 −0.882086
\(247\) 2.22546e10 0.380438
\(248\) 3.75138e10 0.629736
\(249\) 1.14720e9 0.0189122
\(250\) −3.53135e10 −0.571756
\(251\) −2.37776e10 −0.378125 −0.189063 0.981965i \(-0.560545\pi\)
−0.189063 + 0.981965i \(0.560545\pi\)
\(252\) −1.32337e10 −0.206719
\(253\) −1.43076e10 −0.219546
\(254\) 1.25453e11 1.89116
\(255\) 0 0
\(256\) 7.37636e10 1.07340
\(257\) −4.21200e10 −0.602267 −0.301134 0.953582i \(-0.597365\pi\)
−0.301134 + 0.953582i \(0.597365\pi\)
\(258\) 3.20185e10 0.449897
\(259\) −2.86115e9 −0.0395086
\(260\) 8.68336e10 1.17844
\(261\) −3.74034e10 −0.498917
\(262\) 1.04553e11 1.37082
\(263\) 4.71166e10 0.607257 0.303629 0.952790i \(-0.401802\pi\)
0.303629 + 0.952790i \(0.401802\pi\)
\(264\) 6.92043e9 0.0876829
\(265\) 1.72068e11 2.14335
\(266\) −2.69768e10 −0.330388
\(267\) −1.11144e11 −1.33839
\(268\) −2.54324e10 −0.301149
\(269\) 5.69389e9 0.0663015 0.0331508 0.999450i \(-0.489446\pi\)
0.0331508 + 0.999450i \(0.489446\pi\)
\(270\) 1.72366e11 1.97385
\(271\) −1.51533e11 −1.70666 −0.853328 0.521375i \(-0.825419\pi\)
−0.853328 + 0.521375i \(0.825419\pi\)
\(272\) 0 0
\(273\) 1.78571e11 1.94571
\(274\) 7.60624e10 0.815253
\(275\) 1.99541e10 0.210395
\(276\) −4.45014e10 −0.461618
\(277\) −5.65276e10 −0.576901 −0.288451 0.957495i \(-0.593140\pi\)
−0.288451 + 0.957495i \(0.593140\pi\)
\(278\) −1.83085e11 −1.83845
\(279\) −3.39288e10 −0.335235
\(280\) 1.43772e11 1.39786
\(281\) −3.63183e10 −0.347493 −0.173747 0.984790i \(-0.555587\pi\)
−0.173747 + 0.984790i \(0.555587\pi\)
\(282\) −2.98639e10 −0.281207
\(283\) −2.29141e10 −0.212355 −0.106178 0.994347i \(-0.533861\pi\)
−0.106178 + 0.994347i \(0.533861\pi\)
\(284\) 6.87371e10 0.626987
\(285\) 2.80021e10 0.251413
\(286\) −3.95655e10 −0.349679
\(287\) 1.42492e11 1.23971
\(288\) −3.40338e10 −0.291504
\(289\) 0 0
\(290\) −2.97500e11 −2.46999
\(291\) −3.24126e10 −0.264969
\(292\) −2.25693e10 −0.181675
\(293\) 7.83040e10 0.620697 0.310348 0.950623i \(-0.399554\pi\)
0.310348 + 0.950623i \(0.399554\pi\)
\(294\) −9.48537e10 −0.740442
\(295\) 7.53273e10 0.579100
\(296\) −2.69320e9 −0.0203918
\(297\) −2.33335e10 −0.174010
\(298\) 2.40703e11 1.76811
\(299\) −3.47516e11 −2.51452
\(300\) 6.20639e10 0.442378
\(301\) −9.00476e10 −0.632300
\(302\) −2.65172e11 −1.83441
\(303\) −1.16813e10 −0.0796158
\(304\) −3.84610e10 −0.258279
\(305\) −3.22689e10 −0.213518
\(306\) 0 0
\(307\) −9.62528e10 −0.618430 −0.309215 0.950992i \(-0.600066\pi\)
−0.309215 + 0.950992i \(0.600066\pi\)
\(308\) 1.42491e10 0.0902212
\(309\) −3.23498e10 −0.201864
\(310\) −2.69864e11 −1.65965
\(311\) 2.06836e11 1.25373 0.626865 0.779128i \(-0.284338\pi\)
0.626865 + 0.779128i \(0.284338\pi\)
\(312\) 1.68089e11 1.00425
\(313\) 4.43872e10 0.261402 0.130701 0.991422i \(-0.458277\pi\)
0.130701 + 0.991422i \(0.458277\pi\)
\(314\) 9.71439e9 0.0563939
\(315\) −1.30033e11 −0.744141
\(316\) 4.28109e10 0.241525
\(317\) −1.67214e10 −0.0930052 −0.0465026 0.998918i \(-0.514808\pi\)
−0.0465026 + 0.998918i \(0.514808\pi\)
\(318\) −2.43857e11 −1.33725
\(319\) 4.02731e10 0.217749
\(320\) 8.43453e10 0.449662
\(321\) −2.89933e10 −0.152414
\(322\) 4.21255e11 2.18370
\(323\) 0 0
\(324\) −4.18404e10 −0.210932
\(325\) 4.84663e11 2.40971
\(326\) −6.30107e10 −0.308984
\(327\) 9.74420e10 0.471283
\(328\) 1.34128e11 0.639861
\(329\) 8.39880e10 0.395217
\(330\) −4.97836e10 −0.231086
\(331\) −2.85648e11 −1.30799 −0.653995 0.756499i \(-0.726908\pi\)
−0.653995 + 0.756499i \(0.726908\pi\)
\(332\) 2.22341e9 0.0100438
\(333\) 2.43583e9 0.0108554
\(334\) −3.82983e11 −1.68391
\(335\) −2.49895e11 −1.08407
\(336\) −3.08610e11 −1.32094
\(337\) −1.51192e11 −0.638549 −0.319274 0.947662i \(-0.603439\pi\)
−0.319274 + 0.947662i \(0.603439\pi\)
\(338\) −6.74795e11 −2.81220
\(339\) −1.80526e11 −0.742407
\(340\) 0 0
\(341\) 3.65320e10 0.146311
\(342\) 2.29666e10 0.0907779
\(343\) −7.52429e10 −0.293523
\(344\) −8.47619e10 −0.326353
\(345\) −4.37265e11 −1.66172
\(346\) 3.08876e11 1.15862
\(347\) −3.16975e9 −0.0117366 −0.00586830 0.999983i \(-0.501868\pi\)
−0.00586830 + 0.999983i \(0.501868\pi\)
\(348\) 1.25262e11 0.457841
\(349\) −1.16871e11 −0.421689 −0.210844 0.977520i \(-0.567621\pi\)
−0.210844 + 0.977520i \(0.567621\pi\)
\(350\) −5.87503e11 −2.09269
\(351\) −5.66743e11 −1.99298
\(352\) 3.66450e10 0.127225
\(353\) 6.42891e9 0.0220369 0.0110185 0.999939i \(-0.496493\pi\)
0.0110185 + 0.999939i \(0.496493\pi\)
\(354\) −1.06755e11 −0.361304
\(355\) 6.75401e11 2.25701
\(356\) −2.15410e11 −0.710791
\(357\) 0 0
\(358\) −2.78725e11 −0.896815
\(359\) −4.93384e10 −0.156769 −0.0783846 0.996923i \(-0.524976\pi\)
−0.0783846 + 0.996923i \(0.524976\pi\)
\(360\) −1.22400e11 −0.384079
\(361\) −3.08778e11 −0.956895
\(362\) −2.03314e11 −0.622269
\(363\) −2.56546e11 −0.775506
\(364\) 3.46093e11 1.03333
\(365\) −2.21763e11 −0.653990
\(366\) 4.57319e10 0.133215
\(367\) 4.03374e11 1.16068 0.580338 0.814376i \(-0.302921\pi\)
0.580338 + 0.814376i \(0.302921\pi\)
\(368\) 6.00585e11 1.70710
\(369\) −1.21310e11 −0.340626
\(370\) 1.93741e10 0.0537421
\(371\) 6.85812e11 1.87941
\(372\) 1.13626e11 0.307635
\(373\) −4.66959e10 −0.124908 −0.0624538 0.998048i \(-0.519893\pi\)
−0.0624538 + 0.998048i \(0.519893\pi\)
\(374\) 0 0
\(375\) 1.46098e11 0.381509
\(376\) 7.90580e10 0.203986
\(377\) 9.78186e11 2.49394
\(378\) 6.86999e11 1.73078
\(379\) −4.32289e10 −0.107621 −0.0538106 0.998551i \(-0.517137\pi\)
−0.0538106 + 0.998551i \(0.517137\pi\)
\(380\) 5.42716e10 0.133520
\(381\) −5.19022e11 −1.26190
\(382\) −5.03192e11 −1.20906
\(383\) −6.63545e11 −1.57571 −0.787854 0.615862i \(-0.788808\pi\)
−0.787854 + 0.615862i \(0.788808\pi\)
\(384\) −3.89195e11 −0.913433
\(385\) 1.40009e11 0.324776
\(386\) 7.31432e11 1.67699
\(387\) 7.66617e10 0.173732
\(388\) −6.28197e10 −0.140719
\(389\) 3.77536e11 0.835959 0.417979 0.908456i \(-0.362738\pi\)
0.417979 + 0.908456i \(0.362738\pi\)
\(390\) −1.20919e12 −2.64668
\(391\) 0 0
\(392\) 2.51104e11 0.537114
\(393\) −4.32554e11 −0.914690
\(394\) −4.23969e10 −0.0886341
\(395\) 4.20654e11 0.869437
\(396\) −1.21309e10 −0.0247893
\(397\) 8.10743e11 1.63805 0.819023 0.573760i \(-0.194516\pi\)
0.819023 + 0.573760i \(0.194516\pi\)
\(398\) −3.13036e11 −0.625346
\(399\) 1.11608e11 0.220454
\(400\) −8.37605e11 −1.63595
\(401\) 7.54539e11 1.45724 0.728622 0.684916i \(-0.240161\pi\)
0.728622 + 0.684916i \(0.240161\pi\)
\(402\) 3.54155e11 0.676357
\(403\) 8.87319e11 1.67574
\(404\) −2.26398e10 −0.0422822
\(405\) −4.11118e11 −0.759309
\(406\) −1.18575e12 −2.16583
\(407\) −2.62271e9 −0.00473779
\(408\) 0 0
\(409\) 4.84207e11 0.855611 0.427805 0.903871i \(-0.359287\pi\)
0.427805 + 0.903871i \(0.359287\pi\)
\(410\) −9.64877e11 −1.68634
\(411\) −3.14684e11 −0.543985
\(412\) −6.26981e10 −0.107205
\(413\) 3.00233e11 0.507788
\(414\) −3.58634e11 −0.599998
\(415\) 2.18469e10 0.0361555
\(416\) 8.90065e11 1.45714
\(417\) 7.57456e11 1.22672
\(418\) −2.47287e10 −0.0396194
\(419\) −7.47691e10 −0.118511 −0.0592555 0.998243i \(-0.518873\pi\)
−0.0592555 + 0.998243i \(0.518873\pi\)
\(420\) 4.35475e11 0.682875
\(421\) −5.91134e11 −0.917100 −0.458550 0.888669i \(-0.651631\pi\)
−0.458550 + 0.888669i \(0.651631\pi\)
\(422\) 8.56682e11 1.31496
\(423\) −7.15029e10 −0.108591
\(424\) 6.45556e11 0.970035
\(425\) 0 0
\(426\) −9.57186e11 −1.40816
\(427\) −1.28614e11 −0.187225
\(428\) −5.61927e10 −0.0809436
\(429\) 1.63690e11 0.233326
\(430\) 6.09753e11 0.860094
\(431\) 4.74524e11 0.662386 0.331193 0.943563i \(-0.392549\pi\)
0.331193 + 0.943563i \(0.392549\pi\)
\(432\) 9.79457e11 1.35303
\(433\) −1.35727e12 −1.85554 −0.927770 0.373153i \(-0.878277\pi\)
−0.927770 + 0.373153i \(0.878277\pi\)
\(434\) −1.07560e12 −1.45528
\(435\) 1.23081e12 1.64812
\(436\) 1.88855e11 0.250288
\(437\) −2.17200e11 −0.284900
\(438\) 3.14285e11 0.408028
\(439\) −5.54359e11 −0.712362 −0.356181 0.934417i \(-0.615921\pi\)
−0.356181 + 0.934417i \(0.615921\pi\)
\(440\) 1.31791e11 0.167629
\(441\) −2.27107e11 −0.285929
\(442\) 0 0
\(443\) 1.17232e12 1.44621 0.723103 0.690740i \(-0.242715\pi\)
0.723103 + 0.690740i \(0.242715\pi\)
\(444\) −8.15750e9 −0.00996170
\(445\) −2.11659e12 −2.55869
\(446\) −1.18612e12 −1.41945
\(447\) −9.95834e11 −1.17979
\(448\) 3.36176e11 0.394290
\(449\) −9.38348e11 −1.08957 −0.544786 0.838575i \(-0.683389\pi\)
−0.544786 + 0.838575i \(0.683389\pi\)
\(450\) 5.00169e11 0.574990
\(451\) 1.30617e11 0.148664
\(452\) −3.49883e11 −0.394276
\(453\) 1.09706e12 1.22402
\(454\) 1.03708e12 1.14567
\(455\) 3.40066e12 3.71974
\(456\) 1.05057e11 0.113784
\(457\) −1.33793e12 −1.43487 −0.717433 0.696628i \(-0.754683\pi\)
−0.717433 + 0.696628i \(0.754683\pi\)
\(458\) 5.20577e11 0.552828
\(459\) 0 0
\(460\) −8.47475e11 −0.882504
\(461\) 8.45027e11 0.871398 0.435699 0.900092i \(-0.356501\pi\)
0.435699 + 0.900092i \(0.356501\pi\)
\(462\) −1.98423e11 −0.202630
\(463\) −3.24656e11 −0.328328 −0.164164 0.986433i \(-0.552493\pi\)
−0.164164 + 0.986433i \(0.552493\pi\)
\(464\) −1.69052e12 −1.69313
\(465\) 1.11648e12 1.10742
\(466\) −2.05150e12 −2.01528
\(467\) 7.41373e11 0.721292 0.360646 0.932703i \(-0.382556\pi\)
0.360646 + 0.932703i \(0.382556\pi\)
\(468\) −2.94645e11 −0.283918
\(469\) −9.96010e11 −0.950574
\(470\) −5.68721e11 −0.537600
\(471\) −4.01902e10 −0.0376293
\(472\) 2.82609e11 0.262088
\(473\) −8.25435e10 −0.0758242
\(474\) −5.96156e11 −0.542447
\(475\) 3.02918e11 0.273026
\(476\) 0 0
\(477\) −5.83864e11 −0.516391
\(478\) −7.27242e11 −0.637167
\(479\) −3.31368e11 −0.287608 −0.143804 0.989606i \(-0.545933\pi\)
−0.143804 + 0.989606i \(0.545933\pi\)
\(480\) 1.11993e12 0.962955
\(481\) −6.37027e10 −0.0542631
\(482\) −2.08141e12 −1.75649
\(483\) −1.74281e12 −1.45709
\(484\) −4.97219e11 −0.411854
\(485\) −6.17257e11 −0.506557
\(486\) −1.01286e12 −0.823542
\(487\) 1.84180e12 1.48375 0.741877 0.670536i \(-0.233936\pi\)
0.741877 + 0.670536i \(0.233936\pi\)
\(488\) −1.21065e11 −0.0966338
\(489\) 2.60687e11 0.206172
\(490\) −1.80637e12 −1.41555
\(491\) −1.63755e12 −1.27153 −0.635767 0.771881i \(-0.719316\pi\)
−0.635767 + 0.771881i \(0.719316\pi\)
\(492\) 4.06262e11 0.312582
\(493\) 0 0
\(494\) −6.00632e11 −0.453771
\(495\) −1.19196e11 −0.0892360
\(496\) −1.53348e12 −1.13766
\(497\) 2.69195e12 1.97908
\(498\) −3.09618e10 −0.0225576
\(499\) −8.40100e11 −0.606567 −0.303283 0.952900i \(-0.598083\pi\)
−0.303283 + 0.952900i \(0.598083\pi\)
\(500\) 2.83157e11 0.202611
\(501\) 1.58447e12 1.12361
\(502\) 6.41734e11 0.451012
\(503\) −8.41199e11 −0.585926 −0.292963 0.956124i \(-0.594641\pi\)
−0.292963 + 0.956124i \(0.594641\pi\)
\(504\) −4.87850e11 −0.336782
\(505\) −2.22456e11 −0.152206
\(506\) 3.86150e11 0.261865
\(507\) 2.79175e12 1.87647
\(508\) −1.00593e12 −0.670165
\(509\) 1.64594e12 1.08688 0.543442 0.839447i \(-0.317121\pi\)
0.543442 + 0.839447i \(0.317121\pi\)
\(510\) 0 0
\(511\) −8.83882e11 −0.573456
\(512\) −2.06193e11 −0.132605
\(513\) −3.54218e11 −0.225810
\(514\) 1.13678e12 0.718359
\(515\) −6.16062e11 −0.385915
\(516\) −2.56737e11 −0.159428
\(517\) 7.69889e10 0.0473937
\(518\) 7.72197e10 0.0471242
\(519\) −1.27788e12 −0.773101
\(520\) 3.20105e12 1.91989
\(521\) −3.51701e11 −0.209124 −0.104562 0.994518i \(-0.533344\pi\)
−0.104562 + 0.994518i \(0.533344\pi\)
\(522\) 1.00948e12 0.595088
\(523\) 5.05119e11 0.295213 0.147607 0.989046i \(-0.452843\pi\)
0.147607 + 0.989046i \(0.452843\pi\)
\(524\) −8.38345e11 −0.485771
\(525\) 2.43061e12 1.39636
\(526\) −1.27163e12 −0.724311
\(527\) 0 0
\(528\) −2.82892e11 −0.158405
\(529\) 1.59052e12 0.883055
\(530\) −4.64395e12 −2.55650
\(531\) −2.55602e11 −0.139521
\(532\) 2.16311e11 0.117078
\(533\) 3.17254e12 1.70269
\(534\) 2.99966e12 1.59638
\(535\) −5.52141e11 −0.291379
\(536\) −9.37545e11 −0.490626
\(537\) 1.15314e12 0.598407
\(538\) −1.53673e11 −0.0790817
\(539\) 2.44532e11 0.124792
\(540\) −1.38209e12 −0.699465
\(541\) 2.41525e11 0.121220 0.0606099 0.998162i \(-0.480695\pi\)
0.0606099 + 0.998162i \(0.480695\pi\)
\(542\) 4.08974e12 2.03563
\(543\) 8.41146e11 0.415214
\(544\) 0 0
\(545\) 1.85566e12 0.900979
\(546\) −4.81946e12 −2.32077
\(547\) 2.61893e12 1.25078 0.625389 0.780313i \(-0.284940\pi\)
0.625389 + 0.780313i \(0.284940\pi\)
\(548\) −6.09898e11 −0.288898
\(549\) 1.09495e11 0.0514423
\(550\) −5.38543e11 −0.250951
\(551\) 6.11373e11 0.282569
\(552\) −1.64051e12 −0.752060
\(553\) 1.67660e12 0.762373
\(554\) 1.52563e12 0.688104
\(555\) −8.01544e10 −0.0358599
\(556\) 1.46805e12 0.651483
\(557\) −1.90268e12 −0.837565 −0.418782 0.908087i \(-0.637543\pi\)
−0.418782 + 0.908087i \(0.637543\pi\)
\(558\) 9.15707e11 0.399855
\(559\) −2.00488e12 −0.868433
\(560\) −5.87710e12 −2.52532
\(561\) 0 0
\(562\) 9.80195e11 0.414476
\(563\) 2.77945e12 1.16593 0.582964 0.812498i \(-0.301893\pi\)
0.582964 + 0.812498i \(0.301893\pi\)
\(564\) 2.39460e11 0.0996501
\(565\) −3.43790e12 −1.41930
\(566\) 6.18429e11 0.253289
\(567\) −1.63860e12 −0.665806
\(568\) 2.53394e12 1.02148
\(569\) −2.91719e12 −1.16670 −0.583350 0.812221i \(-0.698258\pi\)
−0.583350 + 0.812221i \(0.698258\pi\)
\(570\) −7.55750e11 −0.299876
\(571\) 1.08718e12 0.427994 0.213997 0.976834i \(-0.431352\pi\)
0.213997 + 0.976834i \(0.431352\pi\)
\(572\) 3.17252e11 0.123914
\(573\) 2.08180e12 0.806756
\(574\) −3.84572e12 −1.47868
\(575\) −4.73019e12 −1.80457
\(576\) −2.86202e11 −0.108336
\(577\) 7.13293e11 0.267902 0.133951 0.990988i \(-0.457233\pi\)
0.133951 + 0.990988i \(0.457233\pi\)
\(578\) 0 0
\(579\) −3.02607e12 −1.11899
\(580\) 2.38547e12 0.875281
\(581\) 8.70755e10 0.0317032
\(582\) 8.74784e11 0.316044
\(583\) 6.28660e11 0.225376
\(584\) −8.31999e11 −0.295982
\(585\) −2.89514e12 −1.02204
\(586\) −2.11335e12 −0.740341
\(587\) −6.12219e11 −0.212831 −0.106416 0.994322i \(-0.533937\pi\)
−0.106416 + 0.994322i \(0.533937\pi\)
\(588\) 7.60574e11 0.262388
\(589\) 5.54580e11 0.189865
\(590\) −2.03301e12 −0.690726
\(591\) 1.75404e11 0.0591418
\(592\) 1.10092e11 0.0368391
\(593\) 1.86289e12 0.618643 0.309322 0.950957i \(-0.399898\pi\)
0.309322 + 0.950957i \(0.399898\pi\)
\(594\) 6.29748e11 0.207552
\(595\) 0 0
\(596\) −1.93005e12 −0.626558
\(597\) 1.29509e12 0.417267
\(598\) 9.37912e12 2.99921
\(599\) 5.47380e12 1.73727 0.868637 0.495449i \(-0.164996\pi\)
0.868637 + 0.495449i \(0.164996\pi\)
\(600\) 2.28793e12 0.720714
\(601\) 4.44329e12 1.38921 0.694607 0.719389i \(-0.255578\pi\)
0.694607 + 0.719389i \(0.255578\pi\)
\(602\) 2.43030e12 0.754181
\(603\) 8.47950e11 0.261181
\(604\) 2.12625e12 0.650052
\(605\) −4.88560e12 −1.48258
\(606\) 3.15267e11 0.0949624
\(607\) −1.25061e12 −0.373916 −0.186958 0.982368i \(-0.559863\pi\)
−0.186958 + 0.982368i \(0.559863\pi\)
\(608\) 5.56297e11 0.165098
\(609\) 4.90565e12 1.44517
\(610\) 8.70907e11 0.254676
\(611\) 1.86997e12 0.542812
\(612\) 0 0
\(613\) 6.34599e12 1.81521 0.907606 0.419823i \(-0.137908\pi\)
0.907606 + 0.419823i \(0.137908\pi\)
\(614\) 2.59777e12 0.737638
\(615\) 3.99187e12 1.12522
\(616\) 5.25280e11 0.146987
\(617\) −3.48028e12 −0.966786 −0.483393 0.875403i \(-0.660596\pi\)
−0.483393 + 0.875403i \(0.660596\pi\)
\(618\) 8.73091e11 0.240775
\(619\) −2.75090e12 −0.753125 −0.376563 0.926391i \(-0.622894\pi\)
−0.376563 + 0.926391i \(0.622894\pi\)
\(620\) 2.16387e12 0.588124
\(621\) 5.53127e12 1.49249
\(622\) −5.58230e12 −1.49540
\(623\) −8.43612e12 −2.24360
\(624\) −6.87112e12 −1.81425
\(625\) −2.23425e12 −0.585695
\(626\) −1.19797e12 −0.311789
\(627\) 1.02307e11 0.0264364
\(628\) −7.78938e10 −0.0199841
\(629\) 0 0
\(630\) 3.50946e12 0.887581
\(631\) −3.13630e12 −0.787563 −0.393782 0.919204i \(-0.628833\pi\)
−0.393782 + 0.919204i \(0.628833\pi\)
\(632\) 1.57819e12 0.393489
\(633\) −3.54425e12 −0.877421
\(634\) 4.51296e11 0.110933
\(635\) −9.88413e12 −2.41244
\(636\) 1.95534e12 0.473876
\(637\) 5.93939e12 1.42927
\(638\) −1.08693e12 −0.259722
\(639\) −2.29178e12 −0.543775
\(640\) −7.41174e12 −1.74627
\(641\) −3.99573e12 −0.934836 −0.467418 0.884036i \(-0.654816\pi\)
−0.467418 + 0.884036i \(0.654816\pi\)
\(642\) 7.82501e11 0.181793
\(643\) 4.46811e12 1.03080 0.515400 0.856950i \(-0.327643\pi\)
0.515400 + 0.856950i \(0.327643\pi\)
\(644\) −3.37779e12 −0.773830
\(645\) −2.52266e12 −0.573905
\(646\) 0 0
\(647\) −2.65786e12 −0.596297 −0.298148 0.954520i \(-0.596369\pi\)
−0.298148 + 0.954520i \(0.596369\pi\)
\(648\) −1.54241e12 −0.343647
\(649\) 2.75213e11 0.0608930
\(650\) −1.30806e13 −2.87420
\(651\) 4.44995e12 0.971047
\(652\) 5.05245e11 0.109493
\(653\) −1.39817e12 −0.300919 −0.150459 0.988616i \(-0.548075\pi\)
−0.150459 + 0.988616i \(0.548075\pi\)
\(654\) −2.62987e12 −0.562126
\(655\) −8.23745e12 −1.74867
\(656\) −5.48285e12 −1.15595
\(657\) 7.52490e11 0.157564
\(658\) −2.26676e12 −0.471399
\(659\) −3.25916e12 −0.673165 −0.336582 0.941654i \(-0.609271\pi\)
−0.336582 + 0.941654i \(0.609271\pi\)
\(660\) 3.99184e11 0.0818890
\(661\) −3.38834e12 −0.690368 −0.345184 0.938535i \(-0.612183\pi\)
−0.345184 + 0.938535i \(0.612183\pi\)
\(662\) 7.70936e12 1.56012
\(663\) 0 0
\(664\) 8.19643e10 0.0163632
\(665\) 2.12544e12 0.421455
\(666\) −6.57407e10 −0.0129479
\(667\) −9.54686e12 −1.86764
\(668\) 3.07090e12 0.596722
\(669\) 4.90719e12 0.947143
\(670\) 6.74444e12 1.29303
\(671\) −1.17896e11 −0.0224517
\(672\) 4.46372e12 0.844375
\(673\) −3.81702e12 −0.717228 −0.358614 0.933486i \(-0.616750\pi\)
−0.358614 + 0.933486i \(0.616750\pi\)
\(674\) 4.08052e12 0.761634
\(675\) −7.71418e12 −1.43029
\(676\) 5.41077e12 0.996549
\(677\) −9.52051e12 −1.74185 −0.870926 0.491414i \(-0.836480\pi\)
−0.870926 + 0.491414i \(0.836480\pi\)
\(678\) 4.87224e12 0.885513
\(679\) −2.46021e12 −0.444178
\(680\) 0 0
\(681\) −4.29057e12 −0.764457
\(682\) −9.85963e11 −0.174514
\(683\) 3.65262e12 0.642260 0.321130 0.947035i \(-0.395937\pi\)
0.321130 + 0.947035i \(0.395937\pi\)
\(684\) −1.84155e11 −0.0321686
\(685\) −5.99277e12 −1.03997
\(686\) 2.03073e12 0.350102
\(687\) −2.15372e12 −0.368879
\(688\) 3.46489e12 0.589578
\(689\) 1.52694e13 2.58128
\(690\) 1.18014e13 1.98203
\(691\) 7.17157e12 1.19664 0.598320 0.801258i \(-0.295835\pi\)
0.598320 + 0.801258i \(0.295835\pi\)
\(692\) −2.47669e12 −0.410577
\(693\) −4.75082e11 −0.0782473
\(694\) 8.55485e10 0.0139989
\(695\) 1.44248e13 2.34519
\(696\) 4.61770e12 0.745905
\(697\) 0 0
\(698\) 3.15424e12 0.502973
\(699\) 8.48743e12 1.34471
\(700\) 4.71083e12 0.741577
\(701\) 2.77953e12 0.434750 0.217375 0.976088i \(-0.430251\pi\)
0.217375 + 0.976088i \(0.430251\pi\)
\(702\) 1.52958e13 2.37715
\(703\) −3.98146e10 −0.00614814
\(704\) 3.08161e11 0.0472825
\(705\) 2.35290e12 0.358718
\(706\) −1.73510e11 −0.0262847
\(707\) −8.86644e11 −0.133463
\(708\) 8.56002e11 0.128034
\(709\) −2.42496e12 −0.360410 −0.180205 0.983629i \(-0.557676\pi\)
−0.180205 + 0.983629i \(0.557676\pi\)
\(710\) −1.82284e13 −2.69207
\(711\) −1.42737e12 −0.209471
\(712\) −7.94093e12 −1.15801
\(713\) −8.66001e12 −1.25492
\(714\) 0 0
\(715\) 3.11727e12 0.446064
\(716\) 2.23493e12 0.317801
\(717\) 3.00874e12 0.425155
\(718\) 1.33160e12 0.186988
\(719\) 1.26802e13 1.76948 0.884742 0.466081i \(-0.154334\pi\)
0.884742 + 0.466081i \(0.154334\pi\)
\(720\) 5.00345e12 0.693862
\(721\) −2.45544e12 −0.338393
\(722\) 8.33363e12 1.14135
\(723\) 8.61118e12 1.17203
\(724\) 1.63025e12 0.220511
\(725\) 1.33145e13 1.78980
\(726\) 6.92393e12 0.924992
\(727\) 3.80482e12 0.505160 0.252580 0.967576i \(-0.418721\pi\)
0.252580 + 0.967576i \(0.418721\pi\)
\(728\) 1.27584e13 1.68347
\(729\) 7.99589e12 1.04856
\(730\) 5.98517e12 0.780052
\(731\) 0 0
\(732\) −3.66696e11 −0.0472070
\(733\) −1.10980e13 −1.41996 −0.709979 0.704223i \(-0.751296\pi\)
−0.709979 + 0.704223i \(0.751296\pi\)
\(734\) −1.08867e13 −1.38441
\(735\) 7.47329e12 0.944537
\(736\) −8.68682e12 −1.09122
\(737\) −9.13007e11 −0.113991
\(738\) 3.27404e12 0.406284
\(739\) 2.33123e12 0.287531 0.143765 0.989612i \(-0.454079\pi\)
0.143765 + 0.989612i \(0.454079\pi\)
\(740\) −1.55349e11 −0.0190444
\(741\) 2.48492e12 0.302783
\(742\) −1.85094e13 −2.24169
\(743\) 1.09510e13 1.31827 0.659136 0.752024i \(-0.270922\pi\)
0.659136 + 0.752024i \(0.270922\pi\)
\(744\) 4.18874e12 0.501193
\(745\) −1.89644e13 −2.25547
\(746\) 1.26028e12 0.148985
\(747\) −7.41315e10 −0.00871084
\(748\) 0 0
\(749\) −2.20067e12 −0.255498
\(750\) −3.94306e12 −0.455048
\(751\) 4.36338e12 0.500545 0.250272 0.968175i \(-0.419480\pi\)
0.250272 + 0.968175i \(0.419480\pi\)
\(752\) −3.23172e12 −0.368514
\(753\) −2.65497e12 −0.300942
\(754\) −2.64003e13 −2.97467
\(755\) 2.08922e13 2.34004
\(756\) −5.50863e12 −0.613331
\(757\) 5.31168e12 0.587896 0.293948 0.955821i \(-0.405031\pi\)
0.293948 + 0.955821i \(0.405031\pi\)
\(758\) 1.16671e12 0.128366
\(759\) −1.59757e12 −0.174732
\(760\) 2.00068e12 0.217528
\(761\) 1.63902e13 1.77155 0.885777 0.464111i \(-0.153626\pi\)
0.885777 + 0.464111i \(0.153626\pi\)
\(762\) 1.40079e13 1.50514
\(763\) 7.39613e12 0.790031
\(764\) 4.03479e12 0.428450
\(765\) 0 0
\(766\) 1.79084e13 1.87944
\(767\) 6.68460e12 0.697423
\(768\) 8.23634e12 0.854297
\(769\) 1.34189e13 1.38372 0.691859 0.722033i \(-0.256792\pi\)
0.691859 + 0.722033i \(0.256792\pi\)
\(770\) −3.77872e12 −0.387379
\(771\) −4.70306e12 −0.479331
\(772\) −5.86491e12 −0.594270
\(773\) −5.22917e12 −0.526775 −0.263387 0.964690i \(-0.584840\pi\)
−0.263387 + 0.964690i \(0.584840\pi\)
\(774\) −2.06903e12 −0.207220
\(775\) 1.20777e13 1.20261
\(776\) −2.31579e12 −0.229257
\(777\) −3.19472e11 −0.0314440
\(778\) −1.01893e13 −0.997097
\(779\) 1.98286e12 0.192918
\(780\) 9.69572e12 0.937896
\(781\) 2.46762e12 0.237327
\(782\) 0 0
\(783\) −1.55694e13 −1.48028
\(784\) −1.02646e13 −0.970330
\(785\) −7.65373e11 −0.0719382
\(786\) 1.16742e13 1.09100
\(787\) −6.84661e12 −0.636194 −0.318097 0.948058i \(-0.603044\pi\)
−0.318097 + 0.948058i \(0.603044\pi\)
\(788\) 3.39955e11 0.0314089
\(789\) 5.26097e12 0.483303
\(790\) −1.13531e13 −1.03703
\(791\) −1.37025e13 −1.24453
\(792\) −4.47195e11 −0.0403863
\(793\) −2.86357e12 −0.257145
\(794\) −2.18812e13 −1.95379
\(795\) 1.92129e13 1.70585
\(796\) 2.51004e12 0.221601
\(797\) −1.71243e13 −1.50332 −0.751658 0.659553i \(-0.770745\pi\)
−0.751658 + 0.659553i \(0.770745\pi\)
\(798\) −3.01220e12 −0.262948
\(799\) 0 0
\(800\) 1.21151e13 1.04573
\(801\) 7.18206e12 0.616457
\(802\) −2.03643e13 −1.73814
\(803\) −8.10224e11 −0.0687678
\(804\) −2.83975e12 −0.239678
\(805\) −3.31896e13 −2.78561
\(806\) −2.39479e13 −1.99875
\(807\) 6.35772e11 0.0527680
\(808\) −8.34599e11 −0.0688853
\(809\) 1.37472e13 1.12836 0.564178 0.825653i \(-0.309193\pi\)
0.564178 + 0.825653i \(0.309193\pi\)
\(810\) 1.10957e13 0.905672
\(811\) 4.44088e12 0.360475 0.180237 0.983623i \(-0.442313\pi\)
0.180237 + 0.983623i \(0.442313\pi\)
\(812\) 9.50778e12 0.767497
\(813\) −1.69200e13 −1.35829
\(814\) 7.07846e10 0.00565104
\(815\) 4.96446e12 0.394151
\(816\) 0 0
\(817\) −1.25307e12 −0.0983955
\(818\) −1.30683e13 −1.02054
\(819\) −1.15392e13 −0.896185
\(820\) 7.73676e12 0.597581
\(821\) 3.20955e12 0.246547 0.123274 0.992373i \(-0.460661\pi\)
0.123274 + 0.992373i \(0.460661\pi\)
\(822\) 8.49303e12 0.648843
\(823\) −1.82964e12 −0.139016 −0.0695081 0.997581i \(-0.522143\pi\)
−0.0695081 + 0.997581i \(0.522143\pi\)
\(824\) −2.31131e12 −0.174657
\(825\) 2.22805e12 0.167449
\(826\) −8.10299e12 −0.605669
\(827\) −4.67524e12 −0.347560 −0.173780 0.984785i \(-0.555598\pi\)
−0.173780 + 0.984785i \(0.555598\pi\)
\(828\) 2.87567e12 0.212619
\(829\) −2.09218e13 −1.53852 −0.769260 0.638936i \(-0.779375\pi\)
−0.769260 + 0.638936i \(0.779375\pi\)
\(830\) −5.89628e11 −0.0431248
\(831\) −6.31179e12 −0.459143
\(832\) 7.48486e12 0.541538
\(833\) 0 0
\(834\) −2.04430e13 −1.46318
\(835\) 3.01743e13 2.14807
\(836\) 1.98285e11 0.0140398
\(837\) −1.41231e13 −0.994638
\(838\) 2.01795e12 0.141355
\(839\) 2.22899e13 1.55303 0.776515 0.630098i \(-0.216985\pi\)
0.776515 + 0.630098i \(0.216985\pi\)
\(840\) 1.60534e13 1.11253
\(841\) 1.23653e13 0.852360
\(842\) 1.59541e13 1.09388
\(843\) −4.05525e12 −0.276563
\(844\) −6.86921e12 −0.465979
\(845\) 5.31654e13 3.58735
\(846\) 1.92980e12 0.129522
\(847\) −1.94726e13 −1.30001
\(848\) −2.63889e13 −1.75243
\(849\) −2.55855e12 −0.169009
\(850\) 0 0
\(851\) 6.21722e11 0.0406362
\(852\) 7.67509e12 0.499006
\(853\) 1.82969e13 1.18333 0.591666 0.806183i \(-0.298470\pi\)
0.591666 + 0.806183i \(0.298470\pi\)
\(854\) 3.47118e12 0.223315
\(855\) −1.80948e12 −0.115800
\(856\) −2.07150e12 −0.131872
\(857\) −2.46088e13 −1.55839 −0.779197 0.626780i \(-0.784373\pi\)
−0.779197 + 0.626780i \(0.784373\pi\)
\(858\) −4.41783e12 −0.278302
\(859\) 9.01006e12 0.564623 0.282311 0.959323i \(-0.408899\pi\)
0.282311 + 0.959323i \(0.408899\pi\)
\(860\) −4.88924e12 −0.304788
\(861\) 1.59104e13 0.986661
\(862\) −1.28070e13 −0.790066
\(863\) 2.76290e13 1.69557 0.847785 0.530339i \(-0.177935\pi\)
0.847785 + 0.530339i \(0.177935\pi\)
\(864\) −1.41668e13 −0.864888
\(865\) −2.43356e13 −1.47798
\(866\) 3.66314e13 2.21321
\(867\) 0 0
\(868\) 8.62456e12 0.515701
\(869\) 1.53688e12 0.0914223
\(870\) −3.32184e13 −1.96581
\(871\) −2.21759e13 −1.30557
\(872\) 6.96198e12 0.407764
\(873\) 2.09449e12 0.122043
\(874\) 5.86202e12 0.339817
\(875\) 1.10893e13 0.639540
\(876\) −2.52006e12 −0.144591
\(877\) −1.67098e12 −0.0953833 −0.0476916 0.998862i \(-0.515186\pi\)
−0.0476916 + 0.998862i \(0.515186\pi\)
\(878\) 1.49616e13 0.849677
\(879\) 8.74332e12 0.493999
\(880\) −5.38733e12 −0.302832
\(881\) 2.17946e13 1.21887 0.609434 0.792837i \(-0.291397\pi\)
0.609434 + 0.792837i \(0.291397\pi\)
\(882\) 6.12941e12 0.341044
\(883\) −2.01668e13 −1.11639 −0.558193 0.829711i \(-0.688505\pi\)
−0.558193 + 0.829711i \(0.688505\pi\)
\(884\) 0 0
\(885\) 8.41095e12 0.460893
\(886\) −3.16399e13 −1.72497
\(887\) −1.66457e13 −0.902914 −0.451457 0.892293i \(-0.649096\pi\)
−0.451457 + 0.892293i \(0.649096\pi\)
\(888\) −3.00719e11 −0.0162294
\(889\) −3.93953e13 −2.11537
\(890\) 5.71248e13 3.05190
\(891\) −1.50204e12 −0.0798422
\(892\) 9.51077e12 0.503007
\(893\) 1.16874e12 0.0615018
\(894\) 2.68766e13 1.40720
\(895\) 2.19601e13 1.14401
\(896\) −2.95410e13 −1.53123
\(897\) −3.88032e13 −2.00125
\(898\) 2.53251e13 1.29960
\(899\) 2.43762e13 1.24465
\(900\) −4.01055e12 −0.203757
\(901\) 0 0
\(902\) −3.52523e12 −0.177320
\(903\) −1.00546e13 −0.503234
\(904\) −1.28982e13 −0.642347
\(905\) 1.60186e13 0.793790
\(906\) −2.96087e13 −1.45997
\(907\) −2.83791e13 −1.39241 −0.696204 0.717844i \(-0.745129\pi\)
−0.696204 + 0.717844i \(0.745129\pi\)
\(908\) −8.31568e12 −0.405986
\(909\) 7.54841e11 0.0366706
\(910\) −9.17807e13 −4.43675
\(911\) −2.64888e13 −1.27418 −0.637088 0.770791i \(-0.719861\pi\)
−0.637088 + 0.770791i \(0.719861\pi\)
\(912\) −4.29450e12 −0.205559
\(913\) 7.98191e10 0.00380179
\(914\) 3.61095e13 1.71145
\(915\) −3.60310e12 −0.169935
\(916\) −4.17419e12 −0.195904
\(917\) −3.28321e13 −1.53333
\(918\) 0 0
\(919\) −3.71751e13 −1.71922 −0.859612 0.510947i \(-0.829295\pi\)
−0.859612 + 0.510947i \(0.829295\pi\)
\(920\) −3.12414e13 −1.43776
\(921\) −1.07475e13 −0.492195
\(922\) −2.28065e13 −1.03937
\(923\) 5.99355e13 2.71817
\(924\) 1.59103e12 0.0718051
\(925\) −8.67085e11 −0.0389425
\(926\) 8.76214e12 0.391616
\(927\) 2.09043e12 0.0929774
\(928\) 2.44516e13 1.08229
\(929\) −1.56182e13 −0.687953 −0.343977 0.938978i \(-0.611774\pi\)
−0.343977 + 0.938978i \(0.611774\pi\)
\(930\) −3.01326e13 −1.32088
\(931\) 3.71216e12 0.161940
\(932\) 1.64497e13 0.714146
\(933\) 2.30950e13 0.997816
\(934\) −2.00090e13 −0.860327
\(935\) 0 0
\(936\) −1.08619e13 −0.462554
\(937\) −1.17488e13 −0.497927 −0.248964 0.968513i \(-0.580090\pi\)
−0.248964 + 0.968513i \(0.580090\pi\)
\(938\) 2.68814e13 1.13381
\(939\) 4.95621e12 0.208044
\(940\) 4.56023e12 0.190507
\(941\) 6.72829e12 0.279738 0.139869 0.990170i \(-0.455332\pi\)
0.139869 + 0.990170i \(0.455332\pi\)
\(942\) 1.08470e12 0.0448827
\(943\) −3.09632e13 −1.27510
\(944\) −1.15525e13 −0.473479
\(945\) −5.41270e13 −2.20785
\(946\) 2.22777e12 0.0904399
\(947\) 3.08477e13 1.24637 0.623186 0.782074i \(-0.285838\pi\)
0.623186 + 0.782074i \(0.285838\pi\)
\(948\) 4.78021e12 0.192225
\(949\) −1.96794e13 −0.787614
\(950\) −8.17546e12 −0.325654
\(951\) −1.86709e12 −0.0740208
\(952\) 0 0
\(953\) 1.93554e13 0.760123 0.380062 0.924961i \(-0.375903\pi\)
0.380062 + 0.924961i \(0.375903\pi\)
\(954\) 1.57579e13 0.615930
\(955\) 3.96452e13 1.54232
\(956\) 5.83131e12 0.225791
\(957\) 4.49684e12 0.173302
\(958\) 8.94330e12 0.343047
\(959\) −2.38854e13 −0.911905
\(960\) 9.41788e12 0.357876
\(961\) −4.32785e12 −0.163688
\(962\) 1.71927e12 0.0647228
\(963\) 1.87354e12 0.0702010
\(964\) 1.66896e13 0.622441
\(965\) −5.76278e13 −2.13924
\(966\) 4.70368e13 1.73796
\(967\) −3.72066e13 −1.36836 −0.684181 0.729312i \(-0.739840\pi\)
−0.684181 + 0.729312i \(0.739840\pi\)
\(968\) −1.83296e13 −0.670985
\(969\) 0 0
\(970\) 1.66592e13 0.604200
\(971\) 4.17404e13 1.50685 0.753426 0.657533i \(-0.228400\pi\)
0.753426 + 0.657533i \(0.228400\pi\)
\(972\) 8.12150e12 0.291835
\(973\) 5.74931e13 2.05640
\(974\) −4.97084e13 −1.76976
\(975\) 5.41168e13 1.91784
\(976\) 4.94888e12 0.174575
\(977\) −3.20906e12 −0.112681 −0.0563407 0.998412i \(-0.517943\pi\)
−0.0563407 + 0.998412i \(0.517943\pi\)
\(978\) −7.03569e12 −0.245913
\(979\) −7.73309e12 −0.269049
\(980\) 1.44842e13 0.501622
\(981\) −6.29667e12 −0.217070
\(982\) 4.41959e13 1.51663
\(983\) 7.14967e12 0.244228 0.122114 0.992516i \(-0.461033\pi\)
0.122114 + 0.992516i \(0.461033\pi\)
\(984\) 1.49765e13 0.509252
\(985\) 3.34034e12 0.113065
\(986\) 0 0
\(987\) 9.37799e12 0.314545
\(988\) 4.81610e12 0.160801
\(989\) 1.95672e13 0.650347
\(990\) 3.21700e12 0.106437
\(991\) −4.53035e13 −1.49211 −0.746053 0.665886i \(-0.768054\pi\)
−0.746053 + 0.665886i \(0.768054\pi\)
\(992\) 2.21802e13 0.727216
\(993\) −3.18950e13 −1.04100
\(994\) −7.26532e13 −2.36056
\(995\) 2.46633e13 0.797715
\(996\) 2.48263e11 0.00799366
\(997\) −1.60620e13 −0.514838 −0.257419 0.966300i \(-0.582872\pi\)
−0.257419 + 0.966300i \(0.582872\pi\)
\(998\) 2.26735e13 0.723488
\(999\) 1.01393e12 0.0322079
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 289.10.a.i.1.12 52
17.11 odd 16 17.10.d.a.2.4 52
17.14 odd 16 17.10.d.a.9.4 yes 52
17.16 even 2 inner 289.10.a.i.1.11 52
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
17.10.d.a.2.4 52 17.11 odd 16
17.10.d.a.9.4 yes 52 17.14 odd 16
289.10.a.i.1.11 52 17.16 even 2 inner
289.10.a.i.1.12 52 1.1 even 1 trivial