Properties

Label 5.8.a.a.1.1
Level $5$
Weight $8$
Character 5.1
Self dual yes
Analytic conductor $1.562$
Analytic rank $1$
Dimension $1$
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] = [5,8,Mod(1,5)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(5, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0]))
 
N = Newforms(chi, 8, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("5.1");
 
S:= CuspForms(chi, 8);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 5 \)
Weight: \( k \) \(=\) \( 8 \)
Character orbit: \([\chi]\) \(=\) 5.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: \(1.56192512742\)
Analytic rank: \(1\)
Dimension: \(1\)
Coefficient field: \(\mathbb{Q}\)
Coefficient ring: \(\mathbb{Z}\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.1
Character \(\chi\) \(=\) 5.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-14.0000 q^{2} -48.0000 q^{3} +68.0000 q^{4} +125.000 q^{5} +672.000 q^{6} -1644.00 q^{7} +840.000 q^{8} +117.000 q^{9} +O(q^{10})\) \(q-14.0000 q^{2} -48.0000 q^{3} +68.0000 q^{4} +125.000 q^{5} +672.000 q^{6} -1644.00 q^{7} +840.000 q^{8} +117.000 q^{9} -1750.00 q^{10} +172.000 q^{11} -3264.00 q^{12} +3862.00 q^{13} +23016.0 q^{14} -6000.00 q^{15} -20464.0 q^{16} -12254.0 q^{17} -1638.00 q^{18} -25940.0 q^{19} +8500.00 q^{20} +78912.0 q^{21} -2408.00 q^{22} +12972.0 q^{23} -40320.0 q^{24} +15625.0 q^{25} -54068.0 q^{26} +99360.0 q^{27} -111792. q^{28} -81610.0 q^{29} +84000.0 q^{30} -156888. q^{31} +178976. q^{32} -8256.00 q^{33} +171556. q^{34} -205500. q^{35} +7956.00 q^{36} +110126. q^{37} +363160. q^{38} -185376. q^{39} +105000. q^{40} +467882. q^{41} -1.10477e6 q^{42} -499208. q^{43} +11696.0 q^{44} +14625.0 q^{45} -181608. q^{46} -396884. q^{47} +982272. q^{48} +1.87919e6 q^{49} -218750. q^{50} +588192. q^{51} +262616. q^{52} -1.28050e6 q^{53} -1.39104e6 q^{54} +21500.0 q^{55} -1.38096e6 q^{56} +1.24512e6 q^{57} +1.14254e6 q^{58} -1.33742e6 q^{59} -408000. q^{60} -923978. q^{61} +2.19643e6 q^{62} -192348. q^{63} +113728. q^{64} +482750. q^{65} +115584. q^{66} -797304. q^{67} -833272. q^{68} -622656. q^{69} +2.87700e6 q^{70} +5.10339e6 q^{71} +98280.0 q^{72} -4.26748e6 q^{73} -1.54176e6 q^{74} -750000. q^{75} -1.76392e6 q^{76} -282768. q^{77} +2.59526e6 q^{78} -960.000 q^{79} -2.55800e6 q^{80} -5.02516e6 q^{81} -6.55035e6 q^{82} +6.14083e6 q^{83} +5.36602e6 q^{84} -1.53175e6 q^{85} +6.98891e6 q^{86} +3.91728e6 q^{87} +144480. q^{88} +2.01057e6 q^{89} -204750. q^{90} -6.34913e6 q^{91} +882096. q^{92} +7.53062e6 q^{93} +5.55638e6 q^{94} -3.24250e6 q^{95} -8.59085e6 q^{96} -4.88193e6 q^{97} -2.63087e7 q^{98} +20124.0 q^{99} +O(q^{100})\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −14.0000 −1.23744 −0.618718 0.785613i \(-0.712348\pi\)
−0.618718 + 0.785613i \(0.712348\pi\)
\(3\) −48.0000 −1.02640 −0.513200 0.858269i \(-0.671540\pi\)
−0.513200 + 0.858269i \(0.671540\pi\)
\(4\) 68.0000 0.531250
\(5\) 125.000 0.447214
\(6\) 672.000 1.27011
\(7\) −1644.00 −1.81158 −0.905792 0.423722i \(-0.860723\pi\)
−0.905792 + 0.423722i \(0.860723\pi\)
\(8\) 840.000 0.580049
\(9\) 117.000 0.0534979
\(10\) −1750.00 −0.553399
\(11\) 172.000 0.0389631 0.0194816 0.999810i \(-0.493798\pi\)
0.0194816 + 0.999810i \(0.493798\pi\)
\(12\) −3264.00 −0.545275
\(13\) 3862.00 0.487540 0.243770 0.969833i \(-0.421616\pi\)
0.243770 + 0.969833i \(0.421616\pi\)
\(14\) 23016.0 2.24172
\(15\) −6000.00 −0.459020
\(16\) −20464.0 −1.24902
\(17\) −12254.0 −0.604932 −0.302466 0.953160i \(-0.597810\pi\)
−0.302466 + 0.953160i \(0.597810\pi\)
\(18\) −1638.00 −0.0662003
\(19\) −25940.0 −0.867626 −0.433813 0.901003i \(-0.642832\pi\)
−0.433813 + 0.901003i \(0.642832\pi\)
\(20\) 8500.00 0.237582
\(21\) 78912.0 1.85941
\(22\) −2408.00 −0.0482144
\(23\) 12972.0 0.222310 0.111155 0.993803i \(-0.464545\pi\)
0.111155 + 0.993803i \(0.464545\pi\)
\(24\) −40320.0 −0.595362
\(25\) 15625.0 0.200000
\(26\) −54068.0 −0.603300
\(27\) 99360.0 0.971490
\(28\) −111792. −0.962404
\(29\) −81610.0 −0.621370 −0.310685 0.950513i \(-0.600558\pi\)
−0.310685 + 0.950513i \(0.600558\pi\)
\(30\) 84000.0 0.568009
\(31\) −156888. −0.945853 −0.472927 0.881102i \(-0.656802\pi\)
−0.472927 + 0.881102i \(0.656802\pi\)
\(32\) 178976. 0.965539
\(33\) −8256.00 −0.0399918
\(34\) 171556. 0.748565
\(35\) −205500. −0.810165
\(36\) 7956.00 0.0284208
\(37\) 110126. 0.357424 0.178712 0.983901i \(-0.442807\pi\)
0.178712 + 0.983901i \(0.442807\pi\)
\(38\) 363160. 1.07363
\(39\) −185376. −0.500412
\(40\) 105000. 0.259406
\(41\) 467882. 1.06021 0.530106 0.847931i \(-0.322152\pi\)
0.530106 + 0.847931i \(0.322152\pi\)
\(42\) −1.10477e6 −2.30090
\(43\) −499208. −0.957507 −0.478753 0.877949i \(-0.658911\pi\)
−0.478753 + 0.877949i \(0.658911\pi\)
\(44\) 11696.0 0.0206992
\(45\) 14625.0 0.0239250
\(46\) −181608. −0.275095
\(47\) −396884. −0.557598 −0.278799 0.960349i \(-0.589936\pi\)
−0.278799 + 0.960349i \(0.589936\pi\)
\(48\) 982272. 1.28200
\(49\) 1.87919e6 2.28184
\(50\) −218750. −0.247487
\(51\) 588192. 0.620903
\(52\) 262616. 0.259006
\(53\) −1.28050e6 −1.18144 −0.590722 0.806875i \(-0.701157\pi\)
−0.590722 + 0.806875i \(0.701157\pi\)
\(54\) −1.39104e6 −1.20216
\(55\) 21500.0 0.0174248
\(56\) −1.38096e6 −1.05081
\(57\) 1.24512e6 0.890531
\(58\) 1.14254e6 0.768906
\(59\) −1.33742e6 −0.847785 −0.423893 0.905712i \(-0.639337\pi\)
−0.423893 + 0.905712i \(0.639337\pi\)
\(60\) −408000. −0.243855
\(61\) −923978. −0.521203 −0.260602 0.965446i \(-0.583921\pi\)
−0.260602 + 0.965446i \(0.583921\pi\)
\(62\) 2.19643e6 1.17043
\(63\) −192348. −0.0969161
\(64\) 113728. 0.0542297
\(65\) 482750. 0.218035
\(66\) 115584. 0.0494873
\(67\) −797304. −0.323864 −0.161932 0.986802i \(-0.551772\pi\)
−0.161932 + 0.986802i \(0.551772\pi\)
\(68\) −833272. −0.321370
\(69\) −622656. −0.228179
\(70\) 2.87700e6 1.00253
\(71\) 5.10339e6 1.69221 0.846106 0.533015i \(-0.178941\pi\)
0.846106 + 0.533015i \(0.178941\pi\)
\(72\) 98280.0 0.0310314
\(73\) −4.26748e6 −1.28393 −0.641965 0.766734i \(-0.721881\pi\)
−0.641965 + 0.766734i \(0.721881\pi\)
\(74\) −1.54176e6 −0.442290
\(75\) −750000. −0.205280
\(76\) −1.76392e6 −0.460926
\(77\) −282768. −0.0705850
\(78\) 2.59526e6 0.619228
\(79\) −960.000 −0.000219067 0 −0.000109533 1.00000i \(-0.500035\pi\)
−0.000109533 1.00000i \(0.500035\pi\)
\(80\) −2.55800e6 −0.558580
\(81\) −5.02516e6 −1.05064
\(82\) −6.55035e6 −1.31195
\(83\) 6.14083e6 1.17884 0.589419 0.807828i \(-0.299357\pi\)
0.589419 + 0.807828i \(0.299357\pi\)
\(84\) 5.36602e6 0.987812
\(85\) −1.53175e6 −0.270534
\(86\) 6.98891e6 1.18485
\(87\) 3.91728e6 0.637775
\(88\) 144480. 0.0226005
\(89\) 2.01057e6 0.302311 0.151156 0.988510i \(-0.451701\pi\)
0.151156 + 0.988510i \(0.451701\pi\)
\(90\) −204750. −0.0296057
\(91\) −6.34913e6 −0.883221
\(92\) 882096. 0.118102
\(93\) 7.53062e6 0.970824
\(94\) 5.55638e6 0.689992
\(95\) −3.24250e6 −0.388014
\(96\) −8.59085e6 −0.991030
\(97\) −4.88193e6 −0.543114 −0.271557 0.962422i \(-0.587539\pi\)
−0.271557 + 0.962422i \(0.587539\pi\)
\(98\) −2.63087e7 −2.82363
\(99\) 20124.0 0.00208445
\(100\) 1.06250e6 0.106250
\(101\) 9.72670e6 0.939379 0.469689 0.882832i \(-0.344366\pi\)
0.469689 + 0.882832i \(0.344366\pi\)
\(102\) −8.23469e6 −0.768328
\(103\) 1.63151e7 1.47115 0.735577 0.677441i \(-0.236911\pi\)
0.735577 + 0.677441i \(0.236911\pi\)
\(104\) 3.24408e6 0.282797
\(105\) 9.86400e6 0.831554
\(106\) 1.79270e7 1.46196
\(107\) −4.08974e6 −0.322740 −0.161370 0.986894i \(-0.551591\pi\)
−0.161370 + 0.986894i \(0.551591\pi\)
\(108\) 6.75648e6 0.516104
\(109\) −2.68318e7 −1.98453 −0.992263 0.124158i \(-0.960377\pi\)
−0.992263 + 0.124158i \(0.960377\pi\)
\(110\) −301000. −0.0215622
\(111\) −5.28605e6 −0.366860
\(112\) 3.36428e7 2.26271
\(113\) −1.74810e7 −1.13971 −0.569853 0.821747i \(-0.693000\pi\)
−0.569853 + 0.821747i \(0.693000\pi\)
\(114\) −1.74317e7 −1.10198
\(115\) 1.62150e6 0.0994202
\(116\) −5.54948e6 −0.330103
\(117\) 451854. 0.0260824
\(118\) 1.87239e7 1.04908
\(119\) 2.01456e7 1.09589
\(120\) −5.04000e6 −0.266254
\(121\) −1.94576e7 −0.998482
\(122\) 1.29357e7 0.644956
\(123\) −2.24583e7 −1.08820
\(124\) −1.06684e7 −0.502485
\(125\) 1.95312e6 0.0894427
\(126\) 2.69287e6 0.119928
\(127\) −1.25018e7 −0.541575 −0.270787 0.962639i \(-0.587284\pi\)
−0.270787 + 0.962639i \(0.587284\pi\)
\(128\) −2.45011e7 −1.03264
\(129\) 2.39620e7 0.982786
\(130\) −6.75850e6 −0.269804
\(131\) −7.75619e6 −0.301439 −0.150719 0.988577i \(-0.548159\pi\)
−0.150719 + 0.988577i \(0.548159\pi\)
\(132\) −561408. −0.0212456
\(133\) 4.26454e7 1.57178
\(134\) 1.11623e7 0.400761
\(135\) 1.24200e7 0.434464
\(136\) −1.02934e7 −0.350890
\(137\) 3.61720e7 1.20185 0.600926 0.799305i \(-0.294799\pi\)
0.600926 + 0.799305i \(0.294799\pi\)
\(138\) 8.71718e6 0.282358
\(139\) 1.09092e7 0.344542 0.172271 0.985050i \(-0.444890\pi\)
0.172271 + 0.985050i \(0.444890\pi\)
\(140\) −1.39740e7 −0.430400
\(141\) 1.90504e7 0.572319
\(142\) −7.14475e7 −2.09401
\(143\) 664264. 0.0189961
\(144\) −2.39429e6 −0.0668202
\(145\) −1.02012e7 −0.277885
\(146\) 5.97447e7 1.58878
\(147\) −9.02013e7 −2.34208
\(148\) 7.48857e6 0.189882
\(149\) −3.64580e7 −0.902904 −0.451452 0.892295i \(-0.649094\pi\)
−0.451452 + 0.892295i \(0.649094\pi\)
\(150\) 1.05000e7 0.254021
\(151\) 7.18955e6 0.169935 0.0849674 0.996384i \(-0.472921\pi\)
0.0849674 + 0.996384i \(0.472921\pi\)
\(152\) −2.17896e7 −0.503265
\(153\) −1.43372e6 −0.0323626
\(154\) 3.95875e6 0.0873445
\(155\) −1.96110e7 −0.422998
\(156\) −1.26056e7 −0.265844
\(157\) 8.79932e7 1.81468 0.907341 0.420396i \(-0.138109\pi\)
0.907341 + 0.420396i \(0.138109\pi\)
\(158\) 13440.0 0.000271081 0
\(159\) 6.14639e7 1.21264
\(160\) 2.23720e7 0.431802
\(161\) −2.13260e7 −0.402734
\(162\) 7.03522e7 1.30010
\(163\) −5.48875e7 −0.992697 −0.496349 0.868123i \(-0.665326\pi\)
−0.496349 + 0.868123i \(0.665326\pi\)
\(164\) 3.18160e7 0.563238
\(165\) −1.03200e6 −0.0178849
\(166\) −8.59716e7 −1.45874
\(167\) 8.61460e6 0.143129 0.0715644 0.997436i \(-0.477201\pi\)
0.0715644 + 0.997436i \(0.477201\pi\)
\(168\) 6.62861e7 1.07855
\(169\) −4.78335e7 −0.762304
\(170\) 2.14445e7 0.334769
\(171\) −3.03498e6 −0.0464162
\(172\) −3.39461e7 −0.508676
\(173\) −5.12524e7 −0.752580 −0.376290 0.926502i \(-0.622800\pi\)
−0.376290 + 0.926502i \(0.622800\pi\)
\(174\) −5.48419e7 −0.789206
\(175\) −2.56875e7 −0.362317
\(176\) −3.51981e6 −0.0486659
\(177\) 6.41962e7 0.870167
\(178\) −2.81480e7 −0.374091
\(179\) −5.01627e7 −0.653725 −0.326862 0.945072i \(-0.605991\pi\)
−0.326862 + 0.945072i \(0.605991\pi\)
\(180\) 994500. 0.0127102
\(181\) 6.90817e7 0.865940 0.432970 0.901408i \(-0.357466\pi\)
0.432970 + 0.901408i \(0.357466\pi\)
\(182\) 8.88878e7 1.09293
\(183\) 4.43509e7 0.534963
\(184\) 1.08965e7 0.128951
\(185\) 1.37658e7 0.159845
\(186\) −1.05429e8 −1.20133
\(187\) −2.10769e6 −0.0235701
\(188\) −2.69881e7 −0.296224
\(189\) −1.63348e8 −1.75994
\(190\) 4.53950e7 0.480143
\(191\) 1.54745e8 1.60695 0.803473 0.595342i \(-0.202983\pi\)
0.803473 + 0.595342i \(0.202983\pi\)
\(192\) −5.45894e6 −0.0556614
\(193\) −1.59406e7 −0.159607 −0.0798037 0.996811i \(-0.525429\pi\)
−0.0798037 + 0.996811i \(0.525429\pi\)
\(194\) 6.83471e7 0.672069
\(195\) −2.31720e7 −0.223791
\(196\) 1.27785e8 1.21223
\(197\) −1.68188e8 −1.56734 −0.783670 0.621177i \(-0.786655\pi\)
−0.783670 + 0.621177i \(0.786655\pi\)
\(198\) −281736. −0.00257937
\(199\) 1.77773e8 1.59911 0.799556 0.600591i \(-0.205068\pi\)
0.799556 + 0.600591i \(0.205068\pi\)
\(200\) 1.31250e7 0.116010
\(201\) 3.82706e7 0.332414
\(202\) −1.36174e8 −1.16242
\(203\) 1.34167e8 1.12566
\(204\) 3.99971e7 0.329855
\(205\) 5.84852e7 0.474141
\(206\) −2.28411e8 −1.82046
\(207\) 1.51772e6 0.0118931
\(208\) −7.90320e7 −0.608949
\(209\) −4.46168e6 −0.0338054
\(210\) −1.38096e8 −1.02900
\(211\) −1.61996e8 −1.18718 −0.593590 0.804767i \(-0.702290\pi\)
−0.593590 + 0.804767i \(0.702290\pi\)
\(212\) −8.70739e7 −0.627642
\(213\) −2.44963e8 −1.73689
\(214\) 5.72564e7 0.399370
\(215\) −6.24010e7 −0.428210
\(216\) 8.34624e7 0.563511
\(217\) 2.57924e8 1.71349
\(218\) 3.75645e8 2.45572
\(219\) 2.04839e8 1.31783
\(220\) 1.46200e6 0.00925695
\(221\) −4.73249e7 −0.294929
\(222\) 7.40047e7 0.453966
\(223\) 1.75932e7 0.106237 0.0531187 0.998588i \(-0.483084\pi\)
0.0531187 + 0.998588i \(0.483084\pi\)
\(224\) −2.94237e8 −1.74916
\(225\) 1.82812e6 0.0106996
\(226\) 2.44735e8 1.41031
\(227\) −2.03036e8 −1.15208 −0.576039 0.817422i \(-0.695403\pi\)
−0.576039 + 0.817422i \(0.695403\pi\)
\(228\) 8.46682e7 0.473095
\(229\) 1.59559e8 0.878005 0.439003 0.898486i \(-0.355332\pi\)
0.439003 + 0.898486i \(0.355332\pi\)
\(230\) −2.27010e7 −0.123026
\(231\) 1.35729e7 0.0724485
\(232\) −6.85524e7 −0.360425
\(233\) −1.94985e7 −0.100985 −0.0504924 0.998724i \(-0.516079\pi\)
−0.0504924 + 0.998724i \(0.516079\pi\)
\(234\) −6.32596e6 −0.0322753
\(235\) −4.96105e7 −0.249365
\(236\) −9.09446e7 −0.450386
\(237\) 46080.0 0.000224850 0
\(238\) −2.82038e8 −1.35609
\(239\) −1.60220e8 −0.759146 −0.379573 0.925162i \(-0.623929\pi\)
−0.379573 + 0.925162i \(0.623929\pi\)
\(240\) 1.22784e8 0.573327
\(241\) −3.78779e8 −1.74311 −0.871557 0.490294i \(-0.836890\pi\)
−0.871557 + 0.490294i \(0.836890\pi\)
\(242\) 2.72406e8 1.23556
\(243\) 2.39073e7 0.106883
\(244\) −6.28305e7 −0.276889
\(245\) 2.34899e8 1.02047
\(246\) 3.14417e8 1.34658
\(247\) −1.00180e8 −0.423002
\(248\) −1.31786e8 −0.548641
\(249\) −2.94760e8 −1.20996
\(250\) −2.73438e7 −0.110680
\(251\) 1.61304e8 0.643855 0.321927 0.946764i \(-0.395669\pi\)
0.321927 + 0.946764i \(0.395669\pi\)
\(252\) −1.30797e7 −0.0514867
\(253\) 2.23118e6 0.00866191
\(254\) 1.75025e8 0.670164
\(255\) 7.35240e7 0.277676
\(256\) 3.28458e8 1.22360
\(257\) 2.27387e8 0.835603 0.417801 0.908538i \(-0.362801\pi\)
0.417801 + 0.908538i \(0.362801\pi\)
\(258\) −3.35468e8 −1.21614
\(259\) −1.81047e8 −0.647504
\(260\) 3.28270e7 0.115831
\(261\) −9.54837e6 −0.0332420
\(262\) 1.08587e8 0.373011
\(263\) 4.57728e8 1.55154 0.775768 0.631018i \(-0.217363\pi\)
0.775768 + 0.631018i \(0.217363\pi\)
\(264\) −6.93504e6 −0.0231972
\(265\) −1.60062e8 −0.528358
\(266\) −5.97035e8 −1.94498
\(267\) −9.65074e7 −0.310292
\(268\) −5.42167e7 −0.172053
\(269\) 4.67286e8 1.46369 0.731847 0.681469i \(-0.238659\pi\)
0.731847 + 0.681469i \(0.238659\pi\)
\(270\) −1.73880e8 −0.537621
\(271\) −4.45932e7 −0.136106 −0.0680528 0.997682i \(-0.521679\pi\)
−0.0680528 + 0.997682i \(0.521679\pi\)
\(272\) 2.50766e8 0.755574
\(273\) 3.04758e8 0.906538
\(274\) −5.06408e8 −1.48722
\(275\) 2.68750e6 0.00779263
\(276\) −4.23406e7 −0.121220
\(277\) 3.16657e8 0.895179 0.447590 0.894239i \(-0.352283\pi\)
0.447590 + 0.894239i \(0.352283\pi\)
\(278\) −1.52729e8 −0.426349
\(279\) −1.83559e7 −0.0506012
\(280\) −1.72620e8 −0.469935
\(281\) −2.25818e8 −0.607136 −0.303568 0.952810i \(-0.598178\pi\)
−0.303568 + 0.952810i \(0.598178\pi\)
\(282\) −2.66706e8 −0.708208
\(283\) 2.08210e7 0.0546072 0.0273036 0.999627i \(-0.491308\pi\)
0.0273036 + 0.999627i \(0.491308\pi\)
\(284\) 3.47031e8 0.898987
\(285\) 1.55640e8 0.398258
\(286\) −9.29970e6 −0.0235065
\(287\) −7.69198e8 −1.92066
\(288\) 2.09402e7 0.0516544
\(289\) −2.60178e8 −0.634057
\(290\) 1.42818e8 0.343865
\(291\) 2.34333e8 0.557452
\(292\) −2.90189e8 −0.682088
\(293\) −1.78825e8 −0.415329 −0.207665 0.978200i \(-0.566586\pi\)
−0.207665 + 0.978200i \(0.566586\pi\)
\(294\) 1.26282e9 2.89818
\(295\) −1.67178e8 −0.379141
\(296\) 9.25058e7 0.207323
\(297\) 1.70899e7 0.0378523
\(298\) 5.10413e8 1.11729
\(299\) 5.00979e7 0.108385
\(300\) −5.10000e7 −0.109055
\(301\) 8.20698e8 1.73461
\(302\) −1.00654e8 −0.210284
\(303\) −4.66882e8 −0.964179
\(304\) 5.30836e8 1.08368
\(305\) −1.15497e8 −0.233089
\(306\) 2.00721e7 0.0400467
\(307\) −8.55159e7 −0.168680 −0.0843398 0.996437i \(-0.526878\pi\)
−0.0843398 + 0.996437i \(0.526878\pi\)
\(308\) −1.92282e7 −0.0374983
\(309\) −7.83122e8 −1.50999
\(310\) 2.74554e8 0.523434
\(311\) −4.84706e8 −0.913728 −0.456864 0.889537i \(-0.651027\pi\)
−0.456864 + 0.889537i \(0.651027\pi\)
\(312\) −1.55716e8 −0.290263
\(313\) 5.70821e8 1.05219 0.526096 0.850425i \(-0.323655\pi\)
0.526096 + 0.850425i \(0.323655\pi\)
\(314\) −1.23190e9 −2.24555
\(315\) −2.40435e7 −0.0433422
\(316\) −65280.0 −0.000116379 0
\(317\) −5.50191e8 −0.970076 −0.485038 0.874493i \(-0.661194\pi\)
−0.485038 + 0.874493i \(0.661194\pi\)
\(318\) −8.60495e8 −1.50056
\(319\) −1.40369e7 −0.0242105
\(320\) 1.42160e7 0.0242523
\(321\) 1.96308e8 0.331261
\(322\) 2.98564e8 0.498358
\(323\) 3.17869e8 0.524855
\(324\) −3.41711e8 −0.558150
\(325\) 6.03438e7 0.0975081
\(326\) 7.68425e8 1.22840
\(327\) 1.28792e9 2.03692
\(328\) 3.93021e8 0.614975
\(329\) 6.52477e8 1.01014
\(330\) 1.44480e7 0.0221314
\(331\) −9.39839e8 −1.42448 −0.712238 0.701938i \(-0.752319\pi\)
−0.712238 + 0.701938i \(0.752319\pi\)
\(332\) 4.17577e8 0.626257
\(333\) 1.28847e7 0.0191215
\(334\) −1.20604e8 −0.177113
\(335\) −9.96630e7 −0.144836
\(336\) −1.61486e9 −2.32245
\(337\) 5.33632e8 0.759516 0.379758 0.925086i \(-0.376007\pi\)
0.379758 + 0.925086i \(0.376007\pi\)
\(338\) 6.69669e8 0.943304
\(339\) 8.39090e8 1.16979
\(340\) −1.04159e8 −0.143721
\(341\) −2.69847e7 −0.0368534
\(342\) 4.24897e7 0.0574371
\(343\) −1.73549e9 −2.32216
\(344\) −4.19335e8 −0.555401
\(345\) −7.78320e7 −0.102045
\(346\) 7.17533e8 0.931270
\(347\) 1.07934e9 1.38677 0.693385 0.720567i \(-0.256118\pi\)
0.693385 + 0.720567i \(0.256118\pi\)
\(348\) 2.66375e8 0.338818
\(349\) −4.27217e8 −0.537972 −0.268986 0.963144i \(-0.586689\pi\)
−0.268986 + 0.963144i \(0.586689\pi\)
\(350\) 3.59625e8 0.448344
\(351\) 3.83728e8 0.473641
\(352\) 3.07839e7 0.0376204
\(353\) −1.48966e9 −1.80250 −0.901250 0.433299i \(-0.857350\pi\)
−0.901250 + 0.433299i \(0.857350\pi\)
\(354\) −8.98746e8 −1.07678
\(355\) 6.37924e8 0.756780
\(356\) 1.36719e8 0.160603
\(357\) −9.66988e8 −1.12482
\(358\) 7.02277e8 0.808943
\(359\) 8.41275e8 0.959638 0.479819 0.877367i \(-0.340702\pi\)
0.479819 + 0.877367i \(0.340702\pi\)
\(360\) 1.22850e7 0.0138777
\(361\) −2.20988e8 −0.247226
\(362\) −9.67143e8 −1.07155
\(363\) 9.33964e8 1.02484
\(364\) −4.31741e8 −0.469211
\(365\) −5.33435e8 −0.574191
\(366\) −6.20913e8 −0.661983
\(367\) −7.50462e8 −0.792496 −0.396248 0.918143i \(-0.629688\pi\)
−0.396248 + 0.918143i \(0.629688\pi\)
\(368\) −2.65459e8 −0.277671
\(369\) 5.47422e7 0.0567192
\(370\) −1.92720e8 −0.197798
\(371\) 2.10514e9 2.14029
\(372\) 5.12082e8 0.515750
\(373\) 1.71074e8 0.170688 0.0853439 0.996352i \(-0.472801\pi\)
0.0853439 + 0.996352i \(0.472801\pi\)
\(374\) 2.95076e7 0.0291665
\(375\) −9.37500e7 −0.0918040
\(376\) −3.33383e8 −0.323434
\(377\) −3.15178e8 −0.302943
\(378\) 2.28687e9 2.17781
\(379\) 4.66239e7 0.0439918 0.0219959 0.999758i \(-0.492998\pi\)
0.0219959 + 0.999758i \(0.492998\pi\)
\(380\) −2.20490e8 −0.206132
\(381\) 6.00085e8 0.555872
\(382\) −2.16644e9 −1.98849
\(383\) −4.42266e8 −0.402242 −0.201121 0.979566i \(-0.564458\pi\)
−0.201121 + 0.979566i \(0.564458\pi\)
\(384\) 1.17605e9 1.05991
\(385\) −3.53460e7 −0.0315666
\(386\) 2.23168e8 0.197504
\(387\) −5.84073e7 −0.0512247
\(388\) −3.31972e8 −0.288529
\(389\) −4.64033e8 −0.399691 −0.199846 0.979827i \(-0.564044\pi\)
−0.199846 + 0.979827i \(0.564044\pi\)
\(390\) 3.24408e8 0.276927
\(391\) −1.58959e8 −0.134483
\(392\) 1.57852e9 1.32358
\(393\) 3.72297e8 0.309397
\(394\) 2.35463e9 1.93948
\(395\) −120000. −9.79696e−5 0
\(396\) 1.36843e6 0.00110736
\(397\) −3.17792e8 −0.254904 −0.127452 0.991845i \(-0.540680\pi\)
−0.127452 + 0.991845i \(0.540680\pi\)
\(398\) −2.48882e9 −1.97880
\(399\) −2.04698e9 −1.61327
\(400\) −3.19750e8 −0.249805
\(401\) −1.19563e9 −0.925958 −0.462979 0.886369i \(-0.653219\pi\)
−0.462979 + 0.886369i \(0.653219\pi\)
\(402\) −5.35788e8 −0.411341
\(403\) −6.05901e8 −0.461142
\(404\) 6.61416e8 0.499045
\(405\) −6.28145e8 −0.469859
\(406\) −1.87834e9 −1.39294
\(407\) 1.89417e7 0.0139264
\(408\) 4.94081e8 0.360154
\(409\) 2.21305e9 1.59941 0.799704 0.600395i \(-0.204990\pi\)
0.799704 + 0.600395i \(0.204990\pi\)
\(410\) −8.18794e8 −0.586720
\(411\) −1.73626e9 −1.23358
\(412\) 1.10942e9 0.781551
\(413\) 2.19872e9 1.53583
\(414\) −2.12481e7 −0.0147170
\(415\) 7.67604e8 0.527192
\(416\) 6.91205e8 0.470739
\(417\) −5.23643e8 −0.353638
\(418\) 6.24635e7 0.0418321
\(419\) −8.02299e8 −0.532828 −0.266414 0.963859i \(-0.585839\pi\)
−0.266414 + 0.963859i \(0.585839\pi\)
\(420\) 6.70752e8 0.441763
\(421\) 3.44713e7 0.0225149 0.0112575 0.999937i \(-0.496417\pi\)
0.0112575 + 0.999937i \(0.496417\pi\)
\(422\) 2.26795e9 1.46906
\(423\) −4.64354e7 −0.0298303
\(424\) −1.07562e9 −0.685295
\(425\) −1.91469e8 −0.120986
\(426\) 3.42948e9 2.14929
\(427\) 1.51902e9 0.944204
\(428\) −2.78103e8 −0.171456
\(429\) −3.18847e7 −0.0194976
\(430\) 8.73614e8 0.529883
\(431\) 1.72692e9 1.03897 0.519485 0.854480i \(-0.326124\pi\)
0.519485 + 0.854480i \(0.326124\pi\)
\(432\) −2.03330e9 −1.21341
\(433\) 4.88308e8 0.289059 0.144529 0.989501i \(-0.453833\pi\)
0.144529 + 0.989501i \(0.453833\pi\)
\(434\) −3.61093e9 −2.12034
\(435\) 4.89660e8 0.285221
\(436\) −1.82456e9 −1.05428
\(437\) −3.36494e8 −0.192882
\(438\) −2.86775e9 −1.63073
\(439\) −2.88640e9 −1.62828 −0.814142 0.580665i \(-0.802793\pi\)
−0.814142 + 0.580665i \(0.802793\pi\)
\(440\) 1.80600e7 0.0101073
\(441\) 2.19866e8 0.122074
\(442\) 6.62549e8 0.364956
\(443\) 9.26583e8 0.506374 0.253187 0.967417i \(-0.418521\pi\)
0.253187 + 0.967417i \(0.418521\pi\)
\(444\) −3.59451e8 −0.194895
\(445\) 2.51321e8 0.135198
\(446\) −2.46304e8 −0.131462
\(447\) 1.74999e9 0.926741
\(448\) −1.86969e8 −0.0982418
\(449\) 1.35535e9 0.706627 0.353313 0.935505i \(-0.385055\pi\)
0.353313 + 0.935505i \(0.385055\pi\)
\(450\) −2.55938e7 −0.0132401
\(451\) 8.04757e7 0.0413092
\(452\) −1.18871e9 −0.605469
\(453\) −3.45098e8 −0.174421
\(454\) 2.84250e9 1.42563
\(455\) −7.93641e8 −0.394988
\(456\) 1.04590e9 0.516551
\(457\) 4.63429e7 0.0227131 0.0113566 0.999936i \(-0.496385\pi\)
0.0113566 + 0.999936i \(0.496385\pi\)
\(458\) −2.23383e9 −1.08648
\(459\) −1.21756e9 −0.587686
\(460\) 1.10262e8 0.0528170
\(461\) −1.52117e8 −0.0723144 −0.0361572 0.999346i \(-0.511512\pi\)
−0.0361572 + 0.999346i \(0.511512\pi\)
\(462\) −1.90020e8 −0.0896505
\(463\) 1.63450e9 0.765337 0.382668 0.923886i \(-0.375005\pi\)
0.382668 + 0.923886i \(0.375005\pi\)
\(464\) 1.67007e9 0.776106
\(465\) 9.41328e8 0.434166
\(466\) 2.72979e8 0.124962
\(467\) −1.11380e9 −0.506057 −0.253029 0.967459i \(-0.581427\pi\)
−0.253029 + 0.967459i \(0.581427\pi\)
\(468\) 3.07261e7 0.0138563
\(469\) 1.31077e9 0.586706
\(470\) 6.94547e8 0.308574
\(471\) −4.22367e9 −1.86259
\(472\) −1.12343e9 −0.491756
\(473\) −8.58638e7 −0.0373075
\(474\) −645120. −0.000278238 0
\(475\) −4.05312e8 −0.173525
\(476\) 1.36990e9 0.582189
\(477\) −1.49818e8 −0.0632049
\(478\) 2.24309e9 0.939395
\(479\) 1.27745e9 0.531091 0.265546 0.964098i \(-0.414448\pi\)
0.265546 + 0.964098i \(0.414448\pi\)
\(480\) −1.07386e9 −0.443202
\(481\) 4.25307e8 0.174259
\(482\) 5.30290e9 2.15699
\(483\) 1.02365e9 0.413366
\(484\) −1.32312e9 −0.530443
\(485\) −6.10242e8 −0.242888
\(486\) −3.34702e8 −0.132261
\(487\) 9.79673e8 0.384352 0.192176 0.981360i \(-0.438445\pi\)
0.192176 + 0.981360i \(0.438445\pi\)
\(488\) −7.76142e8 −0.302323
\(489\) 2.63460e9 1.01890
\(490\) −3.28859e9 −1.26277
\(491\) −4.92125e9 −1.87625 −0.938124 0.346298i \(-0.887438\pi\)
−0.938124 + 0.346298i \(0.887438\pi\)
\(492\) −1.52717e9 −0.578108
\(493\) 1.00005e9 0.375887
\(494\) 1.40252e9 0.523439
\(495\) 2.51550e6 0.000932194 0
\(496\) 3.21056e9 1.18139
\(497\) −8.38998e9 −3.06559
\(498\) 4.12664e9 1.49725
\(499\) −3.65786e9 −1.31788 −0.658940 0.752196i \(-0.728995\pi\)
−0.658940 + 0.752196i \(0.728995\pi\)
\(500\) 1.32812e8 0.0475164
\(501\) −4.13501e8 −0.146908
\(502\) −2.25826e9 −0.796729
\(503\) −3.88358e9 −1.36064 −0.680322 0.732914i \(-0.738160\pi\)
−0.680322 + 0.732914i \(0.738160\pi\)
\(504\) −1.61572e8 −0.0562160
\(505\) 1.21584e9 0.420103
\(506\) −3.12366e7 −0.0107186
\(507\) 2.29601e9 0.782430
\(508\) −8.50120e8 −0.287711
\(509\) 3.90072e9 1.31109 0.655545 0.755156i \(-0.272439\pi\)
0.655545 + 0.755156i \(0.272439\pi\)
\(510\) −1.02934e9 −0.343607
\(511\) 7.01573e9 2.32595
\(512\) −1.46228e9 −0.481487
\(513\) −2.57740e9 −0.842890
\(514\) −3.18342e9 −1.03401
\(515\) 2.03938e9 0.657920
\(516\) 1.62941e9 0.522105
\(517\) −6.82640e7 −0.0217258
\(518\) 2.53466e9 0.801245
\(519\) 2.46011e9 0.772448
\(520\) 4.05510e8 0.126471
\(521\) 2.88399e9 0.893431 0.446716 0.894676i \(-0.352594\pi\)
0.446716 + 0.894676i \(0.352594\pi\)
\(522\) 1.33677e8 0.0411349
\(523\) 8.77188e8 0.268125 0.134062 0.990973i \(-0.457198\pi\)
0.134062 + 0.990973i \(0.457198\pi\)
\(524\) −5.27421e8 −0.160139
\(525\) 1.23300e9 0.371882
\(526\) −6.40819e9 −1.91993
\(527\) 1.92251e9 0.572177
\(528\) 1.68951e8 0.0499507
\(529\) −3.23655e9 −0.950578
\(530\) 2.24087e9 0.653810
\(531\) −1.56478e8 −0.0453548
\(532\) 2.89988e9 0.835007
\(533\) 1.80696e9 0.516896
\(534\) 1.35110e9 0.383967
\(535\) −5.11218e8 −0.144334
\(536\) −6.69735e8 −0.187857
\(537\) 2.40781e9 0.670983
\(538\) −6.54201e9 −1.81123
\(539\) 3.23221e8 0.0889077
\(540\) 8.44560e8 0.230809
\(541\) −6.53485e8 −0.177437 −0.0887187 0.996057i \(-0.528277\pi\)
−0.0887187 + 0.996057i \(0.528277\pi\)
\(542\) 6.24305e8 0.168422
\(543\) −3.31592e9 −0.888801
\(544\) −2.19317e9 −0.584086
\(545\) −3.35397e9 −0.887507
\(546\) −4.26661e9 −1.12178
\(547\) −4.59299e9 −1.19988 −0.599942 0.800043i \(-0.704810\pi\)
−0.599942 + 0.800043i \(0.704810\pi\)
\(548\) 2.45970e9 0.638484
\(549\) −1.08105e8 −0.0278833
\(550\) −3.76250e7 −0.00964289
\(551\) 2.11696e9 0.539117
\(552\) −5.23031e8 −0.132355
\(553\) 1.57824e6 0.000396858 0
\(554\) −4.43320e9 −1.10773
\(555\) −6.60756e8 −0.164065
\(556\) 7.41827e8 0.183038
\(557\) 6.83164e9 1.67507 0.837533 0.546387i \(-0.183997\pi\)
0.837533 + 0.546387i \(0.183997\pi\)
\(558\) 2.56983e8 0.0626158
\(559\) −1.92794e9 −0.466823
\(560\) 4.20535e9 1.01192
\(561\) 1.01169e8 0.0241923
\(562\) 3.16145e9 0.751292
\(563\) 3.42509e9 0.808897 0.404449 0.914561i \(-0.367463\pi\)
0.404449 + 0.914561i \(0.367463\pi\)
\(564\) 1.29543e9 0.304044
\(565\) −2.18513e9 −0.509692
\(566\) −2.91494e8 −0.0675729
\(567\) 8.26136e9 1.90332
\(568\) 4.28685e9 0.981565
\(569\) −7.50930e9 −1.70886 −0.854430 0.519566i \(-0.826094\pi\)
−0.854430 + 0.519566i \(0.826094\pi\)
\(570\) −2.17896e9 −0.492819
\(571\) −1.35841e8 −0.0305355 −0.0152677 0.999883i \(-0.504860\pi\)
−0.0152677 + 0.999883i \(0.504860\pi\)
\(572\) 4.51700e7 0.0100917
\(573\) −7.42778e9 −1.64937
\(574\) 1.07688e10 2.37670
\(575\) 2.02688e8 0.0444621
\(576\) 1.33062e7 0.00290118
\(577\) 1.63775e9 0.354922 0.177461 0.984128i \(-0.443212\pi\)
0.177461 + 0.984128i \(0.443212\pi\)
\(578\) 3.64249e9 0.784606
\(579\) 7.65147e8 0.163821
\(580\) −6.93685e8 −0.147627
\(581\) −1.00955e10 −2.13556
\(582\) −3.28066e9 −0.689812
\(583\) −2.20246e8 −0.0460328
\(584\) −3.58468e9 −0.744742
\(585\) 5.64818e7 0.0116644
\(586\) 2.50356e9 0.513944
\(587\) −5.97205e9 −1.21868 −0.609341 0.792909i \(-0.708566\pi\)
−0.609341 + 0.792909i \(0.708566\pi\)
\(588\) −6.13369e9 −1.24423
\(589\) 4.06967e9 0.820647
\(590\) 2.34048e9 0.469163
\(591\) 8.07303e9 1.60872
\(592\) −2.25362e9 −0.446431
\(593\) 8.31347e9 1.63716 0.818579 0.574394i \(-0.194762\pi\)
0.818579 + 0.574394i \(0.194762\pi\)
\(594\) −2.39259e8 −0.0468399
\(595\) 2.51820e9 0.490095
\(596\) −2.47915e9 −0.479668
\(597\) −8.53308e9 −1.64133
\(598\) −7.01370e8 −0.134120
\(599\) 9.78368e9 1.85998 0.929990 0.367585i \(-0.119815\pi\)
0.929990 + 0.367585i \(0.119815\pi\)
\(600\) −6.30000e8 −0.119072
\(601\) 5.40159e9 1.01499 0.507494 0.861655i \(-0.330572\pi\)
0.507494 + 0.861655i \(0.330572\pi\)
\(602\) −1.14898e10 −2.14646
\(603\) −9.32846e7 −0.0173260
\(604\) 4.88890e8 0.0902779
\(605\) −2.43220e9 −0.446535
\(606\) 6.53634e9 1.19311
\(607\) −2.84439e9 −0.516214 −0.258107 0.966116i \(-0.583099\pi\)
−0.258107 + 0.966116i \(0.583099\pi\)
\(608\) −4.64264e9 −0.837726
\(609\) −6.44001e9 −1.15538
\(610\) 1.61696e9 0.288433
\(611\) −1.53277e9 −0.271851
\(612\) −9.74928e7 −0.0171926
\(613\) −7.02106e9 −1.23109 −0.615547 0.788101i \(-0.711065\pi\)
−0.615547 + 0.788101i \(0.711065\pi\)
\(614\) 1.19722e9 0.208730
\(615\) −2.80729e9 −0.486659
\(616\) −2.37525e8 −0.0409428
\(617\) 3.35166e9 0.574462 0.287231 0.957861i \(-0.407265\pi\)
0.287231 + 0.957861i \(0.407265\pi\)
\(618\) 1.09637e10 1.86852
\(619\) −3.92362e9 −0.664921 −0.332461 0.943117i \(-0.607879\pi\)
−0.332461 + 0.943117i \(0.607879\pi\)
\(620\) −1.33355e9 −0.224718
\(621\) 1.28890e9 0.215972
\(622\) 6.78588e9 1.13068
\(623\) −3.30538e9 −0.547662
\(624\) 3.79353e9 0.625026
\(625\) 2.44141e8 0.0400000
\(626\) −7.99150e9 −1.30202
\(627\) 2.14161e8 0.0346979
\(628\) 5.98354e9 0.964049
\(629\) −1.34948e9 −0.216217
\(630\) 3.36609e8 0.0536332
\(631\) −6.81545e8 −0.107992 −0.0539960 0.998541i \(-0.517196\pi\)
−0.0539960 + 0.998541i \(0.517196\pi\)
\(632\) −806400. −0.000127069 0
\(633\) 7.77583e9 1.21852
\(634\) 7.70267e9 1.20041
\(635\) −1.56272e9 −0.242200
\(636\) 4.17955e9 0.644213
\(637\) 7.25744e9 1.11249
\(638\) 1.96517e8 0.0299590
\(639\) 5.97097e8 0.0905298
\(640\) −3.06264e9 −0.461813
\(641\) 9.65199e9 1.44748 0.723742 0.690071i \(-0.242421\pi\)
0.723742 + 0.690071i \(0.242421\pi\)
\(642\) −2.74831e9 −0.409914
\(643\) −5.07826e9 −0.753315 −0.376657 0.926353i \(-0.622927\pi\)
−0.376657 + 0.926353i \(0.622927\pi\)
\(644\) −1.45017e9 −0.213952
\(645\) 2.99525e9 0.439515
\(646\) −4.45016e9 −0.649474
\(647\) −2.08330e9 −0.302404 −0.151202 0.988503i \(-0.548314\pi\)
−0.151202 + 0.988503i \(0.548314\pi\)
\(648\) −4.22113e9 −0.609420
\(649\) −2.30036e8 −0.0330324
\(650\) −8.44812e8 −0.120660
\(651\) −1.23803e10 −1.75873
\(652\) −3.73235e9 −0.527370
\(653\) 6.84881e9 0.962540 0.481270 0.876572i \(-0.340176\pi\)
0.481270 + 0.876572i \(0.340176\pi\)
\(654\) −1.80309e10 −2.52056
\(655\) −9.69524e8 −0.134807
\(656\) −9.57474e9 −1.32423
\(657\) −4.99295e8 −0.0686876
\(658\) −9.13468e9 −1.24998
\(659\) 6.99913e9 0.952676 0.476338 0.879262i \(-0.341964\pi\)
0.476338 + 0.879262i \(0.341964\pi\)
\(660\) −7.01760e7 −0.00950134
\(661\) −1.99594e9 −0.268809 −0.134404 0.990927i \(-0.542912\pi\)
−0.134404 + 0.990927i \(0.542912\pi\)
\(662\) 1.31577e10 1.76270
\(663\) 2.27160e9 0.302715
\(664\) 5.15830e9 0.683783
\(665\) 5.33067e9 0.702920
\(666\) −1.80386e8 −0.0236616
\(667\) −1.05864e9 −0.138137
\(668\) 5.85793e8 0.0760372
\(669\) −8.44472e8 −0.109042
\(670\) 1.39528e9 0.179226
\(671\) −1.58924e8 −0.0203077
\(672\) 1.41234e10 1.79533
\(673\) −1.17939e10 −1.49144 −0.745718 0.666261i \(-0.767894\pi\)
−0.745718 + 0.666261i \(0.767894\pi\)
\(674\) −7.47085e9 −0.939853
\(675\) 1.55250e9 0.194298
\(676\) −3.25268e9 −0.404974
\(677\) 7.80222e9 0.966402 0.483201 0.875509i \(-0.339474\pi\)
0.483201 + 0.875509i \(0.339474\pi\)
\(678\) −1.17473e10 −1.44755
\(679\) 8.02590e9 0.983897
\(680\) −1.28667e9 −0.156923
\(681\) 9.74572e9 1.18249
\(682\) 3.77786e8 0.0456038
\(683\) 4.51153e9 0.541815 0.270908 0.962605i \(-0.412676\pi\)
0.270908 + 0.962605i \(0.412676\pi\)
\(684\) −2.06379e8 −0.0246586
\(685\) 4.52150e9 0.537484
\(686\) 2.42968e10 2.87353
\(687\) −7.65883e9 −0.901185
\(688\) 1.02158e10 1.19595
\(689\) −4.94528e9 −0.576002
\(690\) 1.08965e9 0.126274
\(691\) −1.06331e10 −1.22599 −0.612997 0.790086i \(-0.710036\pi\)
−0.612997 + 0.790086i \(0.710036\pi\)
\(692\) −3.48516e9 −0.399808
\(693\) −3.30839e7 −0.00377615
\(694\) −1.51107e10 −1.71604
\(695\) 1.36365e9 0.154084
\(696\) 3.29052e9 0.369940
\(697\) −5.73343e9 −0.641356
\(698\) 5.98104e9 0.665707
\(699\) 9.35929e8 0.103651
\(700\) −1.74675e9 −0.192481
\(701\) −4.38514e9 −0.480807 −0.240403 0.970673i \(-0.577280\pi\)
−0.240403 + 0.970673i \(0.577280\pi\)
\(702\) −5.37220e9 −0.586100
\(703\) −2.85667e9 −0.310110
\(704\) 1.95612e7 0.00211296
\(705\) 2.38130e9 0.255949
\(706\) 2.08552e10 2.23048
\(707\) −1.59907e10 −1.70176
\(708\) 4.36534e9 0.462276
\(709\) −5.98805e9 −0.630992 −0.315496 0.948927i \(-0.602171\pi\)
−0.315496 + 0.948927i \(0.602171\pi\)
\(710\) −8.93094e9 −0.936468
\(711\) −112320. −1.17196e−5 0
\(712\) 1.68888e9 0.175355
\(713\) −2.03515e9 −0.210273
\(714\) 1.35378e10 1.39189
\(715\) 8.30330e7 0.00849532
\(716\) −3.41106e9 −0.347291
\(717\) 7.69058e9 0.779188
\(718\) −1.17779e10 −1.18749
\(719\) −1.17768e10 −1.18161 −0.590807 0.806813i \(-0.701191\pi\)
−0.590807 + 0.806813i \(0.701191\pi\)
\(720\) −2.99286e8 −0.0298829
\(721\) −2.68219e10 −2.66512
\(722\) 3.09383e9 0.305926
\(723\) 1.81814e10 1.78913
\(724\) 4.69755e9 0.460031
\(725\) −1.27516e9 −0.124274
\(726\) −1.30755e10 −1.26818
\(727\) 8.41051e9 0.811805 0.405902 0.913916i \(-0.366957\pi\)
0.405902 + 0.913916i \(0.366957\pi\)
\(728\) −5.33327e9 −0.512311
\(729\) 9.84247e9 0.940931
\(730\) 7.46809e9 0.710525
\(731\) 6.11729e9 0.579227
\(732\) 3.01586e9 0.284199
\(733\) 1.44084e10 1.35130 0.675650 0.737223i \(-0.263863\pi\)
0.675650 + 0.737223i \(0.263863\pi\)
\(734\) 1.05065e10 0.980664
\(735\) −1.12752e10 −1.04741
\(736\) 2.32168e9 0.214649
\(737\) −1.37136e8 −0.0126187
\(738\) −7.66391e8 −0.0701864
\(739\) 8.21708e9 0.748966 0.374483 0.927234i \(-0.377820\pi\)
0.374483 + 0.927234i \(0.377820\pi\)
\(740\) 9.36071e8 0.0849176
\(741\) 4.80865e9 0.434170
\(742\) −2.94719e10 −2.64847
\(743\) −1.72531e10 −1.54314 −0.771570 0.636144i \(-0.780528\pi\)
−0.771570 + 0.636144i \(0.780528\pi\)
\(744\) 6.32572e9 0.563125
\(745\) −4.55726e9 −0.403791
\(746\) −2.39503e9 −0.211215
\(747\) 7.18477e8 0.0630654
\(748\) −1.43323e8 −0.0125216
\(749\) 6.72354e9 0.584671
\(750\) 1.31250e9 0.113602
\(751\) 1.58498e10 1.36548 0.682739 0.730662i \(-0.260789\pi\)
0.682739 + 0.730662i \(0.260789\pi\)
\(752\) 8.12183e9 0.696453
\(753\) −7.74260e9 −0.660853
\(754\) 4.41249e9 0.374873
\(755\) 8.98694e8 0.0759972
\(756\) −1.11077e10 −0.934966
\(757\) 7.13856e9 0.598102 0.299051 0.954237i \(-0.403330\pi\)
0.299051 + 0.954237i \(0.403330\pi\)
\(758\) −6.52735e8 −0.0544371
\(759\) −1.07097e8 −0.00889059
\(760\) −2.72370e9 −0.225067
\(761\) −2.59993e9 −0.213853 −0.106926 0.994267i \(-0.534101\pi\)
−0.106926 + 0.994267i \(0.534101\pi\)
\(762\) −8.40119e9 −0.687857
\(763\) 4.41114e10 3.59514
\(764\) 1.05227e10 0.853690
\(765\) −1.79215e8 −0.0144730
\(766\) 6.19172e9 0.497749
\(767\) −5.16512e9 −0.413329
\(768\) −1.57660e10 −1.25591
\(769\) −4.96477e9 −0.393692 −0.196846 0.980434i \(-0.563070\pi\)
−0.196846 + 0.980434i \(0.563070\pi\)
\(770\) 4.94844e8 0.0390617
\(771\) −1.09146e10 −0.857663
\(772\) −1.08396e9 −0.0847914
\(773\) −1.49681e10 −1.16557 −0.582786 0.812626i \(-0.698037\pi\)
−0.582786 + 0.812626i \(0.698037\pi\)
\(774\) 8.17703e8 0.0633873
\(775\) −2.45138e9 −0.189171
\(776\) −4.10082e9 −0.315032
\(777\) 8.69026e9 0.664598
\(778\) 6.49646e9 0.494593
\(779\) −1.21369e10 −0.919867
\(780\) −1.57570e9 −0.118889
\(781\) 8.77783e8 0.0659339
\(782\) 2.22542e9 0.166414
\(783\) −8.10877e9 −0.603655
\(784\) −3.84558e10 −2.85007
\(785\) 1.09992e10 0.811550
\(786\) −5.21216e9 −0.382859
\(787\) −9.79990e9 −0.716655 −0.358328 0.933596i \(-0.616653\pi\)
−0.358328 + 0.933596i \(0.616653\pi\)
\(788\) −1.14368e10 −0.832650
\(789\) −2.19709e10 −1.59250
\(790\) 1.68000e6 0.000121231 0
\(791\) 2.87388e10 2.06467
\(792\) 1.69042e7 0.00120908
\(793\) −3.56840e9 −0.254108
\(794\) 4.44909e9 0.315428
\(795\) 7.68299e9 0.542307
\(796\) 1.20885e10 0.849529
\(797\) 3.93169e9 0.275090 0.137545 0.990495i \(-0.456079\pi\)
0.137545 + 0.990495i \(0.456079\pi\)
\(798\) 2.86577e10 1.99632
\(799\) 4.86342e9 0.337309
\(800\) 2.79650e9 0.193108
\(801\) 2.35237e8 0.0161730
\(802\) 1.67388e10 1.14581
\(803\) −7.34006e8 −0.0500259
\(804\) 2.60240e9 0.176595
\(805\) −2.66575e9 −0.180108
\(806\) 8.48262e9 0.570634
\(807\) −2.24297e10 −1.50234
\(808\) 8.17043e9 0.544885
\(809\) 1.26324e10 0.838816 0.419408 0.907798i \(-0.362238\pi\)
0.419408 + 0.907798i \(0.362238\pi\)
\(810\) 8.79403e9 0.581420
\(811\) 1.16653e10 0.767934 0.383967 0.923347i \(-0.374558\pi\)
0.383967 + 0.923347i \(0.374558\pi\)
\(812\) 9.12335e9 0.598009
\(813\) 2.14047e9 0.139699
\(814\) −2.65183e8 −0.0172330
\(815\) −6.86094e9 −0.443948
\(816\) −1.20368e10 −0.775522
\(817\) 1.29495e10 0.830758
\(818\) −3.09827e10 −1.97917
\(819\) −7.42848e8 −0.0472505
\(820\) 3.97700e9 0.251888
\(821\) −8.17500e9 −0.515569 −0.257784 0.966202i \(-0.582992\pi\)
−0.257784 + 0.966202i \(0.582992\pi\)
\(822\) 2.43076e10 1.52648
\(823\) −1.75211e10 −1.09563 −0.547813 0.836601i \(-0.684540\pi\)
−0.547813 + 0.836601i \(0.684540\pi\)
\(824\) 1.37046e10 0.853341
\(825\) −1.29000e8 −0.00799836
\(826\) −3.07821e10 −1.90050
\(827\) 1.22225e10 0.751437 0.375718 0.926734i \(-0.377396\pi\)
0.375718 + 0.926734i \(0.377396\pi\)
\(828\) 1.03205e8 0.00631823
\(829\) −1.06634e10 −0.650063 −0.325032 0.945703i \(-0.605375\pi\)
−0.325032 + 0.945703i \(0.605375\pi\)
\(830\) −1.07465e10 −0.652367
\(831\) −1.51995e10 −0.918812
\(832\) 4.39218e8 0.0264392
\(833\) −2.30276e10 −1.38036
\(834\) 7.33100e9 0.437605
\(835\) 1.07682e9 0.0640092
\(836\) −3.03394e8 −0.0179591
\(837\) −1.55884e10 −0.918887
\(838\) 1.12322e10 0.659341
\(839\) −2.31400e9 −0.135268 −0.0676342 0.997710i \(-0.521545\pi\)
−0.0676342 + 0.997710i \(0.521545\pi\)
\(840\) 8.28576e9 0.482342
\(841\) −1.05897e10 −0.613899
\(842\) −4.82599e8 −0.0278608
\(843\) 1.08392e10 0.623164
\(844\) −1.10158e10 −0.630690
\(845\) −5.97918e9 −0.340913
\(846\) 6.50096e8 0.0369132
\(847\) 3.19883e10 1.80883
\(848\) 2.62041e10 1.47565
\(849\) −9.99410e8 −0.0560488
\(850\) 2.68056e9 0.149713
\(851\) 1.42855e9 0.0794590
\(852\) −1.66575e10 −0.922721
\(853\) −4.22377e9 −0.233012 −0.116506 0.993190i \(-0.537169\pi\)
−0.116506 + 0.993190i \(0.537169\pi\)
\(854\) −2.12663e10 −1.16839
\(855\) −3.79372e8 −0.0207579
\(856\) −3.43538e9 −0.187205
\(857\) −3.52104e9 −0.191090 −0.0955450 0.995425i \(-0.530459\pi\)
−0.0955450 + 0.995425i \(0.530459\pi\)
\(858\) 4.46385e8 0.0241271
\(859\) 2.44930e10 1.31846 0.659229 0.751943i \(-0.270883\pi\)
0.659229 + 0.751943i \(0.270883\pi\)
\(860\) −4.24327e9 −0.227487
\(861\) 3.69215e10 1.97137
\(862\) −2.41769e10 −1.28566
\(863\) −5.40573e9 −0.286297 −0.143148 0.989701i \(-0.545723\pi\)
−0.143148 + 0.989701i \(0.545723\pi\)
\(864\) 1.77831e10 0.938012
\(865\) −6.40655e9 −0.336564
\(866\) −6.83631e9 −0.357692
\(867\) 1.24886e10 0.650797
\(868\) 1.75388e10 0.910293
\(869\) −165120. −8.53553e−6 0
\(870\) −6.85524e9 −0.352944
\(871\) −3.07919e9 −0.157897
\(872\) −2.25387e10 −1.15112
\(873\) −5.71186e8 −0.0290555
\(874\) 4.71091e9 0.238679
\(875\) −3.21094e9 −0.162033
\(876\) 1.39290e10 0.700095
\(877\) −2.89155e10 −1.44755 −0.723773 0.690039i \(-0.757594\pi\)
−0.723773 + 0.690039i \(0.757594\pi\)
\(878\) 4.04096e10 2.01490
\(879\) 8.58362e9 0.426294
\(880\) −4.39976e8 −0.0217640
\(881\) 7.80643e8 0.0384624 0.0192312 0.999815i \(-0.493878\pi\)
0.0192312 + 0.999815i \(0.493878\pi\)
\(882\) −3.07812e9 −0.151059
\(883\) −1.36907e10 −0.669211 −0.334605 0.942358i \(-0.608603\pi\)
−0.334605 + 0.942358i \(0.608603\pi\)
\(884\) −3.21810e9 −0.156681
\(885\) 8.02452e9 0.389151
\(886\) −1.29722e10 −0.626606
\(887\) 3.58403e9 0.172441 0.0862203 0.996276i \(-0.472521\pi\)
0.0862203 + 0.996276i \(0.472521\pi\)
\(888\) −4.44028e9 −0.212797
\(889\) 2.05529e10 0.981108
\(890\) −3.51850e9 −0.167299
\(891\) −8.64327e8 −0.0409361
\(892\) 1.19634e9 0.0564386
\(893\) 1.02952e10 0.483786
\(894\) −2.44998e10 −1.14678
\(895\) −6.27033e9 −0.292355
\(896\) 4.02798e10 1.87072
\(897\) −2.40470e9 −0.111247
\(898\) −1.89749e10 −0.874406
\(899\) 1.28036e10 0.587725
\(900\) 1.24312e8 0.00568416
\(901\) 1.56912e10 0.714694
\(902\) −1.12666e9 −0.0511175
\(903\) −3.93935e10 −1.78040
\(904\) −1.46841e10 −0.661085
\(905\) 8.63521e9 0.387260
\(906\) 4.83138e9 0.215835
\(907\) −3.01108e10 −1.33998 −0.669988 0.742372i \(-0.733701\pi\)
−0.669988 + 0.742372i \(0.733701\pi\)
\(908\) −1.38064e10 −0.612042
\(909\) 1.13802e9 0.0502548
\(910\) 1.11110e10 0.488773
\(911\) −2.48800e10 −1.09027 −0.545137 0.838347i \(-0.683523\pi\)
−0.545137 + 0.838347i \(0.683523\pi\)
\(912\) −2.54801e10 −1.11229
\(913\) 1.05622e9 0.0459312
\(914\) −6.48801e8 −0.0281060
\(915\) 5.54387e9 0.239243
\(916\) 1.08500e10 0.466440
\(917\) 1.27512e10 0.546082
\(918\) 1.70458e10 0.727224
\(919\) 1.08420e10 0.460794 0.230397 0.973097i \(-0.425997\pi\)
0.230397 + 0.973097i \(0.425997\pi\)
\(920\) 1.36206e9 0.0576685
\(921\) 4.10477e9 0.173133
\(922\) 2.12964e9 0.0894846
\(923\) 1.97093e10 0.825021
\(924\) 9.22955e8 0.0384883
\(925\) 1.72072e9 0.0714848
\(926\) −2.28831e10 −0.947056
\(927\) 1.90886e9 0.0787037
\(928\) −1.46062e10 −0.599957
\(929\) 1.07045e10 0.438038 0.219019 0.975721i \(-0.429714\pi\)
0.219019 + 0.975721i \(0.429714\pi\)
\(930\) −1.31786e10 −0.537253
\(931\) −4.87463e10 −1.97978
\(932\) −1.32590e9 −0.0536482
\(933\) 2.32659e10 0.937851
\(934\) 1.55933e10 0.626214
\(935\) −2.63461e8 −0.0105409
\(936\) 3.79557e8 0.0151291
\(937\) 3.42787e10 1.36124 0.680621 0.732635i \(-0.261710\pi\)
0.680621 + 0.732635i \(0.261710\pi\)
\(938\) −1.83507e10 −0.726012
\(939\) −2.73994e10 −1.07997
\(940\) −3.37351e9 −0.132475
\(941\) −3.73695e9 −0.146202 −0.0731010 0.997325i \(-0.523290\pi\)
−0.0731010 + 0.997325i \(0.523290\pi\)
\(942\) 5.91314e10 2.30484
\(943\) 6.06937e9 0.235696
\(944\) 2.73690e10 1.05890
\(945\) −2.04185e10 −0.787068
\(946\) 1.20209e9 0.0461657
\(947\) 3.32150e10 1.27089 0.635447 0.772145i \(-0.280816\pi\)
0.635447 + 0.772145i \(0.280816\pi\)
\(948\) 3.13344e6 0.000119452 0
\(949\) −1.64810e10 −0.625968
\(950\) 5.67438e9 0.214726
\(951\) 2.64091e10 0.995686
\(952\) 1.69223e10 0.635667
\(953\) 4.69895e10 1.75864 0.879318 0.476235i \(-0.157999\pi\)
0.879318 + 0.476235i \(0.157999\pi\)
\(954\) 2.09746e9 0.0782120
\(955\) 1.93432e10 0.718648
\(956\) −1.08950e10 −0.403296
\(957\) 6.73772e8 0.0248497
\(958\) −1.78843e10 −0.657192
\(959\) −5.94668e10 −2.17726
\(960\) −6.82368e8 −0.0248925
\(961\) −2.89877e9 −0.105361
\(962\) −5.95429e9 −0.215634
\(963\) −4.78500e8 −0.0172659
\(964\) −2.57570e10 −0.926030
\(965\) −1.99257e9 −0.0713786
\(966\) −1.43311e10 −0.511515
\(967\) −1.42294e10 −0.506050 −0.253025 0.967460i \(-0.581425\pi\)
−0.253025 + 0.967460i \(0.581425\pi\)
\(968\) −1.63444e10 −0.579168
\(969\) −1.52577e10 −0.538711
\(970\) 8.54338e9 0.300558
\(971\) 5.45474e8 0.0191208 0.00956041 0.999954i \(-0.496957\pi\)
0.00956041 + 0.999954i \(0.496957\pi\)
\(972\) 1.62570e9 0.0567816
\(973\) −1.79348e10 −0.624167
\(974\) −1.37154e10 −0.475612
\(975\) −2.89650e9 −0.100082
\(976\) 1.89083e10 0.650995
\(977\) −1.97916e10 −0.678968 −0.339484 0.940612i \(-0.610252\pi\)
−0.339484 + 0.940612i \(0.610252\pi\)
\(978\) −3.68844e10 −1.26083
\(979\) 3.45818e8 0.0117790
\(980\) 1.59731e10 0.542125
\(981\) −3.13932e9 −0.106168
\(982\) 6.88975e10 2.32174
\(983\) −4.71503e10 −1.58324 −0.791620 0.611013i \(-0.790762\pi\)
−0.791620 + 0.611013i \(0.790762\pi\)
\(984\) −1.88650e10 −0.631210
\(985\) −2.10235e10 −0.700936
\(986\) −1.40007e10 −0.465136
\(987\) −3.13189e10 −1.03680
\(988\) −6.81226e9 −0.224720
\(989\) −6.47573e9 −0.212864
\(990\) −3.52170e7 −0.00115353
\(991\) 3.87968e10 1.26631 0.633153 0.774027i \(-0.281761\pi\)
0.633153 + 0.774027i \(0.281761\pi\)
\(992\) −2.80792e10 −0.913258
\(993\) 4.51123e10 1.46208
\(994\) 1.17460e11 3.79347
\(995\) 2.22216e10 0.715145
\(996\) −2.00437e10 −0.642791
\(997\) −5.66394e10 −1.81003 −0.905015 0.425380i \(-0.860140\pi\)
−0.905015 + 0.425380i \(0.860140\pi\)
\(998\) 5.12101e10 1.63079
\(999\) 1.09421e10 0.347234
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 5.8.a.a.1.1 1
3.2 odd 2 45.8.a.f.1.1 1
4.3 odd 2 80.8.a.d.1.1 1
5.2 odd 4 25.8.b.a.24.1 2
5.3 odd 4 25.8.b.a.24.2 2
5.4 even 2 25.8.a.a.1.1 1
7.6 odd 2 245.8.a.a.1.1 1
8.3 odd 2 320.8.a.a.1.1 1
8.5 even 2 320.8.a.h.1.1 1
11.10 odd 2 605.8.a.c.1.1 1
15.2 even 4 225.8.b.b.199.2 2
15.8 even 4 225.8.b.b.199.1 2
15.14 odd 2 225.8.a.b.1.1 1
20.3 even 4 400.8.c.e.49.2 2
20.7 even 4 400.8.c.e.49.1 2
20.19 odd 2 400.8.a.e.1.1 1
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
5.8.a.a.1.1 1 1.1 even 1 trivial
25.8.a.a.1.1 1 5.4 even 2
25.8.b.a.24.1 2 5.2 odd 4
25.8.b.a.24.2 2 5.3 odd 4
45.8.a.f.1.1 1 3.2 odd 2
80.8.a.d.1.1 1 4.3 odd 2
225.8.a.b.1.1 1 15.14 odd 2
225.8.b.b.199.1 2 15.8 even 4
225.8.b.b.199.2 2 15.2 even 4
245.8.a.a.1.1 1 7.6 odd 2
320.8.a.a.1.1 1 8.3 odd 2
320.8.a.h.1.1 1 8.5 even 2
400.8.a.e.1.1 1 20.19 odd 2
400.8.c.e.49.1 2 20.7 even 4
400.8.c.e.49.2 2 20.3 even 4
605.8.a.c.1.1 1 11.10 odd 2