Properties

Label 70.6.a.h.1.2
Level $70$
Weight $6$
Character 70.1
Self dual yes
Analytic conductor $11.227$
Analytic rank $0$
Dimension $2$
CM no
Inner twists $1$

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Show commands: Magma / Pari/GP / SageMath

Newspace parameters

Copy content comment:Compute space of new eigenforms
 
Copy content gp:[N,k,chi] = [70,6,Mod(1,70)] 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("70.1"); S:= CuspForms(chi, 6); N := Newforms(S);
 
Copy content sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(70, base_ring=CyclotomicField(2)) chi = DirichletCharacter(H, H._module([0, 0])) N = Newforms(chi, 6, names="a")
 
Level: \( N \) \(=\) \( 70 = 2 \cdot 5 \cdot 7 \)
Weight: \( k \) \(=\) \( 6 \)
Character orbit: \([\chi]\) \(=\) 70.a (trivial)

Newform invariants

Copy content comment:select newform
 
Copy content sage:traces = [2,8,5] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(3)] == traces)
 
Copy content gp:f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(11.2268673869\)
Analytic rank: \(0\)
Dimension: \(2\)
Coefficient field: \(\Q(\sqrt{1129}) \)
Copy content comment:defining polynomial
 
Copy content gp:f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{2} - x - 282 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.2
Root \(-16.3003\) of defining polynomial
Character \(\chi\) \(=\) 70.1

$q$-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)
 
\(f(q)\) \(=\) \(q+4.00000 q^{2} +19.3003 q^{3} +16.0000 q^{4} +25.0000 q^{5} +77.2012 q^{6} +49.0000 q^{7} +64.0000 q^{8} +129.501 q^{9} +100.000 q^{10} -10.9039 q^{11} +308.805 q^{12} +29.6967 q^{13} +196.000 q^{14} +482.507 q^{15} +256.000 q^{16} -432.519 q^{17} +518.006 q^{18} -956.234 q^{19} +400.000 q^{20} +945.715 q^{21} -43.6155 q^{22} +979.429 q^{23} +1235.22 q^{24} +625.000 q^{25} +118.787 q^{26} -2190.56 q^{27} +784.000 q^{28} +996.928 q^{29} +1930.03 q^{30} +4790.53 q^{31} +1024.00 q^{32} -210.448 q^{33} -1730.08 q^{34} +1225.00 q^{35} +2072.02 q^{36} -1889.95 q^{37} -3824.94 q^{38} +573.156 q^{39} +1600.00 q^{40} -1928.56 q^{41} +3782.86 q^{42} -18079.7 q^{43} -174.462 q^{44} +3237.54 q^{45} +3917.72 q^{46} -28563.5 q^{47} +4940.88 q^{48} +2401.00 q^{49} +2500.00 q^{50} -8347.75 q^{51} +475.148 q^{52} -287.102 q^{53} -8762.22 q^{54} -272.597 q^{55} +3136.00 q^{56} -18455.6 q^{57} +3987.71 q^{58} +11271.3 q^{59} +7720.12 q^{60} -32884.4 q^{61} +19162.1 q^{62} +6345.57 q^{63} +4096.00 q^{64} +742.418 q^{65} -841.792 q^{66} -37022.2 q^{67} -6920.31 q^{68} +18903.3 q^{69} +4900.00 q^{70} -63930.2 q^{71} +8288.10 q^{72} +49142.9 q^{73} -7559.81 q^{74} +12062.7 q^{75} -15299.7 q^{76} -534.290 q^{77} +2292.62 q^{78} +71237.6 q^{79} +6400.00 q^{80} -73747.2 q^{81} -7714.26 q^{82} +94396.8 q^{83} +15131.4 q^{84} -10813.0 q^{85} -72319.0 q^{86} +19241.0 q^{87} -697.848 q^{88} +78631.8 q^{89} +12950.1 q^{90} +1455.14 q^{91} +15670.9 q^{92} +92458.7 q^{93} -114254. q^{94} -23905.8 q^{95} +19763.5 q^{96} +93414.6 q^{97} +9604.00 q^{98} -1412.07 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 2 q + 8 q^{2} + 5 q^{3} + 32 q^{4} + 50 q^{5} + 20 q^{6} + 98 q^{7} + 128 q^{8} + 91 q^{9} + 200 q^{10} + 415 q^{11} + 80 q^{12} + 429 q^{13} + 392 q^{14} + 125 q^{15} + 512 q^{16} + 1319 q^{17} + 364 q^{18}+ \cdots - 17810 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 4.00000 0.707107
\(3\) 19.3003 1.23811 0.619057 0.785346i \(-0.287515\pi\)
0.619057 + 0.785346i \(0.287515\pi\)
\(4\) 16.0000 0.500000
\(5\) 25.0000 0.447214
\(6\) 77.2012 0.875479
\(7\) 49.0000 0.377964
\(8\) 64.0000 0.353553
\(9\) 129.501 0.532928
\(10\) 100.000 0.316228
\(11\) −10.9039 −0.0271706 −0.0135853 0.999908i \(-0.504324\pi\)
−0.0135853 + 0.999908i \(0.504324\pi\)
\(12\) 308.805 0.619057
\(13\) 29.6967 0.0487360 0.0243680 0.999703i \(-0.492243\pi\)
0.0243680 + 0.999703i \(0.492243\pi\)
\(14\) 196.000 0.267261
\(15\) 482.507 0.553702
\(16\) 256.000 0.250000
\(17\) −432.519 −0.362980 −0.181490 0.983393i \(-0.558092\pi\)
−0.181490 + 0.983393i \(0.558092\pi\)
\(18\) 518.006 0.376837
\(19\) −956.234 −0.607687 −0.303844 0.952722i \(-0.598270\pi\)
−0.303844 + 0.952722i \(0.598270\pi\)
\(20\) 400.000 0.223607
\(21\) 945.715 0.467963
\(22\) −43.6155 −0.0192125
\(23\) 979.429 0.386059 0.193029 0.981193i \(-0.438169\pi\)
0.193029 + 0.981193i \(0.438169\pi\)
\(24\) 1235.22 0.437740
\(25\) 625.000 0.200000
\(26\) 118.787 0.0344616
\(27\) −2190.56 −0.578289
\(28\) 784.000 0.188982
\(29\) 996.928 0.220125 0.110062 0.993925i \(-0.464895\pi\)
0.110062 + 0.993925i \(0.464895\pi\)
\(30\) 1930.03 0.391526
\(31\) 4790.53 0.895323 0.447661 0.894203i \(-0.352257\pi\)
0.447661 + 0.894203i \(0.352257\pi\)
\(32\) 1024.00 0.176777
\(33\) −210.448 −0.0336403
\(34\) −1730.08 −0.256666
\(35\) 1225.00 0.169031
\(36\) 2072.02 0.266464
\(37\) −1889.95 −0.226959 −0.113479 0.993540i \(-0.536200\pi\)
−0.113479 + 0.993540i \(0.536200\pi\)
\(38\) −3824.94 −0.429700
\(39\) 573.156 0.0603408
\(40\) 1600.00 0.158114
\(41\) −1928.56 −0.179174 −0.0895869 0.995979i \(-0.528555\pi\)
−0.0895869 + 0.995979i \(0.528555\pi\)
\(42\) 3782.86 0.330900
\(43\) −18079.7 −1.49115 −0.745574 0.666422i \(-0.767825\pi\)
−0.745574 + 0.666422i \(0.767825\pi\)
\(44\) −174.462 −0.0135853
\(45\) 3237.54 0.238333
\(46\) 3917.72 0.272985
\(47\) −28563.5 −1.88611 −0.943055 0.332635i \(-0.892062\pi\)
−0.943055 + 0.332635i \(0.892062\pi\)
\(48\) 4940.88 0.309529
\(49\) 2401.00 0.142857
\(50\) 2500.00 0.141421
\(51\) −8347.75 −0.449411
\(52\) 475.148 0.0243680
\(53\) −287.102 −0.0140393 −0.00701966 0.999975i \(-0.502234\pi\)
−0.00701966 + 0.999975i \(0.502234\pi\)
\(54\) −8762.22 −0.408912
\(55\) −272.597 −0.0121511
\(56\) 3136.00 0.133631
\(57\) −18455.6 −0.752387
\(58\) 3987.71 0.155652
\(59\) 11271.3 0.421546 0.210773 0.977535i \(-0.432402\pi\)
0.210773 + 0.977535i \(0.432402\pi\)
\(60\) 7720.12 0.276851
\(61\) −32884.4 −1.13153 −0.565764 0.824567i \(-0.691419\pi\)
−0.565764 + 0.824567i \(0.691419\pi\)
\(62\) 19162.1 0.633089
\(63\) 6345.57 0.201428
\(64\) 4096.00 0.125000
\(65\) 742.418 0.0217954
\(66\) −841.792 −0.0237873
\(67\) −37022.2 −1.00757 −0.503785 0.863829i \(-0.668059\pi\)
−0.503785 + 0.863829i \(0.668059\pi\)
\(68\) −6920.31 −0.181490
\(69\) 18903.3 0.477985
\(70\) 4900.00 0.119523
\(71\) −63930.2 −1.50508 −0.752541 0.658546i \(-0.771172\pi\)
−0.752541 + 0.658546i \(0.771172\pi\)
\(72\) 8288.10 0.188418
\(73\) 49142.9 1.07933 0.539664 0.841880i \(-0.318551\pi\)
0.539664 + 0.841880i \(0.318551\pi\)
\(74\) −7559.81 −0.160484
\(75\) 12062.7 0.247623
\(76\) −15299.7 −0.303844
\(77\) −534.290 −0.0102695
\(78\) 2292.62 0.0426674
\(79\) 71237.6 1.28423 0.642113 0.766610i \(-0.278058\pi\)
0.642113 + 0.766610i \(0.278058\pi\)
\(80\) 6400.00 0.111803
\(81\) −73747.2 −1.24892
\(82\) −7714.26 −0.126695
\(83\) 94396.8 1.50405 0.752025 0.659135i \(-0.229077\pi\)
0.752025 + 0.659135i \(0.229077\pi\)
\(84\) 15131.4 0.233982
\(85\) −10813.0 −0.162330
\(86\) −72319.0 −1.05440
\(87\) 19241.0 0.272540
\(88\) −697.848 −0.00960625
\(89\) 78631.8 1.05226 0.526130 0.850404i \(-0.323642\pi\)
0.526130 + 0.850404i \(0.323642\pi\)
\(90\) 12950.1 0.168527
\(91\) 1455.14 0.0184205
\(92\) 15670.9 0.193029
\(93\) 92458.7 1.10851
\(94\) −114254. −1.33368
\(95\) −23905.8 −0.271766
\(96\) 19763.5 0.218870
\(97\) 93414.6 1.00806 0.504029 0.863687i \(-0.331851\pi\)
0.504029 + 0.863687i \(0.331851\pi\)
\(98\) 9604.00 0.101015
\(99\) −1412.07 −0.0144800
\(100\) 10000.0 0.100000
\(101\) −14190.4 −0.138417 −0.0692086 0.997602i \(-0.522047\pi\)
−0.0692086 + 0.997602i \(0.522047\pi\)
\(102\) −33391.0 −0.317782
\(103\) 197607. 1.83531 0.917657 0.397374i \(-0.130079\pi\)
0.917657 + 0.397374i \(0.130079\pi\)
\(104\) 1900.59 0.0172308
\(105\) 23642.9 0.209280
\(106\) −1148.41 −0.00992730
\(107\) 163104. 1.37723 0.688615 0.725128i \(-0.258219\pi\)
0.688615 + 0.725128i \(0.258219\pi\)
\(108\) −35048.9 −0.289144
\(109\) −67208.1 −0.541820 −0.270910 0.962605i \(-0.587325\pi\)
−0.270910 + 0.962605i \(0.587325\pi\)
\(110\) −1090.39 −0.00859209
\(111\) −36476.6 −0.281001
\(112\) 12544.0 0.0944911
\(113\) 55975.9 0.412387 0.206193 0.978511i \(-0.433892\pi\)
0.206193 + 0.978511i \(0.433892\pi\)
\(114\) −73822.4 −0.532018
\(115\) 24485.7 0.172651
\(116\) 15950.8 0.110062
\(117\) 3845.77 0.0259728
\(118\) 45085.4 0.298078
\(119\) −21193.4 −0.137194
\(120\) 30880.5 0.195763
\(121\) −160932. −0.999262
\(122\) −131538. −0.800111
\(123\) −37221.9 −0.221838
\(124\) 76648.5 0.447661
\(125\) 15625.0 0.0894427
\(126\) 25382.3 0.142431
\(127\) −86091.4 −0.473642 −0.236821 0.971553i \(-0.576106\pi\)
−0.236821 + 0.971553i \(0.576106\pi\)
\(128\) 16384.0 0.0883883
\(129\) −348944. −1.84621
\(130\) 2969.67 0.0154117
\(131\) 221094. 1.12564 0.562820 0.826580i \(-0.309717\pi\)
0.562820 + 0.826580i \(0.309717\pi\)
\(132\) −3367.17 −0.0168201
\(133\) −46855.5 −0.229684
\(134\) −148089. −0.712459
\(135\) −54763.9 −0.258619
\(136\) −27681.2 −0.128333
\(137\) −425173. −1.93537 −0.967686 0.252158i \(-0.918860\pi\)
−0.967686 + 0.252158i \(0.918860\pi\)
\(138\) 75613.1 0.337986
\(139\) −14492.4 −0.0636216 −0.0318108 0.999494i \(-0.510127\pi\)
−0.0318108 + 0.999494i \(0.510127\pi\)
\(140\) 19600.0 0.0845154
\(141\) −551285. −2.33522
\(142\) −255721. −1.06425
\(143\) −323.809 −0.00132419
\(144\) 33152.4 0.133232
\(145\) 24923.2 0.0984427
\(146\) 196572. 0.763201
\(147\) 46340.0 0.176874
\(148\) −30239.2 −0.113479
\(149\) −36977.8 −0.136451 −0.0682253 0.997670i \(-0.521734\pi\)
−0.0682253 + 0.997670i \(0.521734\pi\)
\(150\) 48250.7 0.175096
\(151\) 81428.5 0.290626 0.145313 0.989386i \(-0.453581\pi\)
0.145313 + 0.989386i \(0.453581\pi\)
\(152\) −61199.0 −0.214850
\(153\) −56011.9 −0.193442
\(154\) −2137.16 −0.00726164
\(155\) 119763. 0.400401
\(156\) 9170.49 0.0301704
\(157\) −113780. −0.368397 −0.184199 0.982889i \(-0.558969\pi\)
−0.184199 + 0.982889i \(0.558969\pi\)
\(158\) 284950. 0.908085
\(159\) −5541.15 −0.0173823
\(160\) 25600.0 0.0790569
\(161\) 47992.0 0.145917
\(162\) −294989. −0.883117
\(163\) 440567. 1.29880 0.649401 0.760446i \(-0.275020\pi\)
0.649401 + 0.760446i \(0.275020\pi\)
\(164\) −30857.0 −0.0895869
\(165\) −5261.20 −0.0150444
\(166\) 377587. 1.06352
\(167\) 621094. 1.72332 0.861661 0.507484i \(-0.169424\pi\)
0.861661 + 0.507484i \(0.169424\pi\)
\(168\) 60525.7 0.165450
\(169\) −370411. −0.997625
\(170\) −43251.9 −0.114784
\(171\) −123834. −0.323854
\(172\) −289276. −0.745574
\(173\) 506925. 1.28774 0.643871 0.765134i \(-0.277327\pi\)
0.643871 + 0.765134i \(0.277327\pi\)
\(174\) 76964.0 0.192715
\(175\) 30625.0 0.0755929
\(176\) −2791.39 −0.00679265
\(177\) 217540. 0.521923
\(178\) 314527. 0.744061
\(179\) 800840. 1.86816 0.934078 0.357070i \(-0.116224\pi\)
0.934078 + 0.357070i \(0.116224\pi\)
\(180\) 51800.6 0.119166
\(181\) −91559.5 −0.207734 −0.103867 0.994591i \(-0.533122\pi\)
−0.103867 + 0.994591i \(0.533122\pi\)
\(182\) 5820.56 0.0130253
\(183\) −634678. −1.40096
\(184\) 62683.5 0.136492
\(185\) −47248.8 −0.101499
\(186\) 369835. 0.783837
\(187\) 4716.13 0.00986239
\(188\) −457016. −0.943055
\(189\) −107337. −0.218573
\(190\) −95623.4 −0.192168
\(191\) 409991. 0.813187 0.406594 0.913609i \(-0.366717\pi\)
0.406594 + 0.913609i \(0.366717\pi\)
\(192\) 79054.0 0.154764
\(193\) −65112.4 −0.125826 −0.0629130 0.998019i \(-0.520039\pi\)
−0.0629130 + 0.998019i \(0.520039\pi\)
\(194\) 373658. 0.712804
\(195\) 14328.9 0.0269852
\(196\) 38416.0 0.0714286
\(197\) 183218. 0.336360 0.168180 0.985756i \(-0.446211\pi\)
0.168180 + 0.985756i \(0.446211\pi\)
\(198\) −5648.27 −0.0102389
\(199\) −563040. −1.00787 −0.503937 0.863740i \(-0.668116\pi\)
−0.503937 + 0.863740i \(0.668116\pi\)
\(200\) 40000.0 0.0707107
\(201\) −714539. −1.24749
\(202\) −56761.5 −0.0978758
\(203\) 48849.5 0.0831993
\(204\) −133564. −0.224706
\(205\) −48214.1 −0.0801290
\(206\) 790430. 1.29776
\(207\) 126838. 0.205742
\(208\) 7602.36 0.0121840
\(209\) 10426.6 0.0165112
\(210\) 94571.5 0.147983
\(211\) −564811. −0.873367 −0.436684 0.899615i \(-0.643847\pi\)
−0.436684 + 0.899615i \(0.643847\pi\)
\(212\) −4593.63 −0.00701966
\(213\) −1.23387e6 −1.86346
\(214\) 652418. 0.973848
\(215\) −451993. −0.666862
\(216\) −140196. −0.204456
\(217\) 234736. 0.338400
\(218\) −268832. −0.383125
\(219\) 948473. 1.33633
\(220\) −4361.55 −0.00607553
\(221\) −12844.4 −0.0176902
\(222\) −145907. −0.198698
\(223\) −1.17657e6 −1.58437 −0.792186 0.610280i \(-0.791057\pi\)
−0.792186 + 0.610280i \(0.791057\pi\)
\(224\) 50176.0 0.0668153
\(225\) 80938.4 0.106586
\(226\) 223903. 0.291601
\(227\) 984829. 1.26852 0.634258 0.773121i \(-0.281306\pi\)
0.634258 + 0.773121i \(0.281306\pi\)
\(228\) −295290. −0.376193
\(229\) 174251. 0.219577 0.109789 0.993955i \(-0.464983\pi\)
0.109789 + 0.993955i \(0.464983\pi\)
\(230\) 97942.9 0.122083
\(231\) −10311.9 −0.0127148
\(232\) 63803.4 0.0778258
\(233\) 895160. 1.08022 0.540108 0.841596i \(-0.318383\pi\)
0.540108 + 0.841596i \(0.318383\pi\)
\(234\) 15383.1 0.0183655
\(235\) −714088. −0.843494
\(236\) 180341. 0.210773
\(237\) 1.37491e6 1.59002
\(238\) −84773.8 −0.0970106
\(239\) 250128. 0.283249 0.141624 0.989920i \(-0.454768\pi\)
0.141624 + 0.989920i \(0.454768\pi\)
\(240\) 123522. 0.138425
\(241\) −824888. −0.914855 −0.457427 0.889247i \(-0.651229\pi\)
−0.457427 + 0.889247i \(0.651229\pi\)
\(242\) −643728. −0.706585
\(243\) −891039. −0.968012
\(244\) −526150. −0.565764
\(245\) 60025.0 0.0638877
\(246\) −148888. −0.156863
\(247\) −28397.0 −0.0296163
\(248\) 306594. 0.316544
\(249\) 1.82189e6 1.86219
\(250\) 62500.0 0.0632456
\(251\) 729516. 0.730887 0.365444 0.930834i \(-0.380917\pi\)
0.365444 + 0.930834i \(0.380917\pi\)
\(252\) 101529. 0.100714
\(253\) −10679.6 −0.0104894
\(254\) −344366. −0.334916
\(255\) −208694. −0.200983
\(256\) 65536.0 0.0625000
\(257\) 118644. 0.112050 0.0560252 0.998429i \(-0.482157\pi\)
0.0560252 + 0.998429i \(0.482157\pi\)
\(258\) −1.39578e6 −1.30547
\(259\) −92607.7 −0.0857823
\(260\) 11878.7 0.0108977
\(261\) 129104. 0.117311
\(262\) 884377. 0.795947
\(263\) −766194. −0.683045 −0.341523 0.939874i \(-0.610943\pi\)
−0.341523 + 0.939874i \(0.610943\pi\)
\(264\) −13468.7 −0.0118936
\(265\) −7177.54 −0.00627858
\(266\) −187422. −0.162411
\(267\) 1.51762e6 1.30282
\(268\) −592355. −0.503785
\(269\) −774789. −0.652834 −0.326417 0.945226i \(-0.605841\pi\)
−0.326417 + 0.945226i \(0.605841\pi\)
\(270\) −219056. −0.182871
\(271\) −1.63371e6 −1.35130 −0.675648 0.737224i \(-0.736136\pi\)
−0.675648 + 0.737224i \(0.736136\pi\)
\(272\) −110725. −0.0907451
\(273\) 28084.6 0.0228067
\(274\) −1.70069e6 −1.36851
\(275\) −6814.92 −0.00543412
\(276\) 302452. 0.238993
\(277\) −2.14606e6 −1.68051 −0.840257 0.542189i \(-0.817596\pi\)
−0.840257 + 0.542189i \(0.817596\pi\)
\(278\) −57969.8 −0.0449873
\(279\) 620381. 0.477143
\(280\) 78400.0 0.0597614
\(281\) 913760. 0.690345 0.345173 0.938539i \(-0.387820\pi\)
0.345173 + 0.938539i \(0.387820\pi\)
\(282\) −2.20514e6 −1.65125
\(283\) −1.11656e6 −0.828738 −0.414369 0.910109i \(-0.635998\pi\)
−0.414369 + 0.910109i \(0.635998\pi\)
\(284\) −1.02288e6 −0.752541
\(285\) −461390. −0.336477
\(286\) −1295.24 −0.000936341 0
\(287\) −94499.7 −0.0677213
\(288\) 132610. 0.0942092
\(289\) −1.23278e6 −0.868245
\(290\) 99692.8 0.0696095
\(291\) 1.80293e6 1.24809
\(292\) 786287. 0.539664
\(293\) 396556. 0.269858 0.134929 0.990855i \(-0.456919\pi\)
0.134929 + 0.990855i \(0.456919\pi\)
\(294\) 185360. 0.125068
\(295\) 281783. 0.188521
\(296\) −120957. −0.0802420
\(297\) 23885.5 0.0157124
\(298\) −147911. −0.0964852
\(299\) 29085.8 0.0188150
\(300\) 193003. 0.123811
\(301\) −885907. −0.563601
\(302\) 325714. 0.205504
\(303\) −273878. −0.171376
\(304\) −244796. −0.151922
\(305\) −822110. −0.506034
\(306\) −224048. −0.136784
\(307\) 1.43537e6 0.869197 0.434598 0.900624i \(-0.356890\pi\)
0.434598 + 0.900624i \(0.356890\pi\)
\(308\) −8548.63 −0.00513476
\(309\) 3.81388e6 2.27233
\(310\) 479053. 0.283126
\(311\) 1.61306e6 0.945691 0.472846 0.881145i \(-0.343227\pi\)
0.472846 + 0.881145i \(0.343227\pi\)
\(312\) 36682.0 0.0213337
\(313\) 2.21419e6 1.27748 0.638740 0.769423i \(-0.279456\pi\)
0.638740 + 0.769423i \(0.279456\pi\)
\(314\) −455120. −0.260496
\(315\) 158639. 0.0900813
\(316\) 1.13980e6 0.642113
\(317\) −2.33004e6 −1.30231 −0.651155 0.758944i \(-0.725715\pi\)
−0.651155 + 0.758944i \(0.725715\pi\)
\(318\) −22164.6 −0.0122911
\(319\) −10870.4 −0.00598091
\(320\) 102400. 0.0559017
\(321\) 3.14796e6 1.70517
\(322\) 191968. 0.103179
\(323\) 413590. 0.220579
\(324\) −1.17996e6 −0.624458
\(325\) 18560.5 0.00974721
\(326\) 1.76227e6 0.918391
\(327\) −1.29714e6 −0.670836
\(328\) −123428. −0.0633475
\(329\) −1.39961e6 −0.712883
\(330\) −21044.8 −0.0106380
\(331\) 2.63604e6 1.32246 0.661230 0.750184i \(-0.270035\pi\)
0.661230 + 0.750184i \(0.270035\pi\)
\(332\) 1.51035e6 0.752025
\(333\) −244752. −0.120953
\(334\) 2.48438e6 1.21857
\(335\) −925554. −0.450599
\(336\) 242103. 0.116991
\(337\) 1.13473e6 0.544275 0.272138 0.962258i \(-0.412269\pi\)
0.272138 + 0.962258i \(0.412269\pi\)
\(338\) −1.48164e6 −0.705427
\(339\) 1.08035e6 0.510582
\(340\) −173008. −0.0811649
\(341\) −52235.3 −0.0243264
\(342\) −495335. −0.228999
\(343\) 117649. 0.0539949
\(344\) −1.15710e6 −0.527201
\(345\) 472582. 0.213761
\(346\) 2.02770e6 0.910571
\(347\) −2.62759e6 −1.17148 −0.585740 0.810499i \(-0.699196\pi\)
−0.585740 + 0.810499i \(0.699196\pi\)
\(348\) 307856. 0.136270
\(349\) −3.82656e6 −1.68169 −0.840844 0.541278i \(-0.817941\pi\)
−0.840844 + 0.541278i \(0.817941\pi\)
\(350\) 122500. 0.0534522
\(351\) −65052.3 −0.0281835
\(352\) −11165.6 −0.00480313
\(353\) 1.49143e6 0.637040 0.318520 0.947916i \(-0.396814\pi\)
0.318520 + 0.947916i \(0.396814\pi\)
\(354\) 870161. 0.369055
\(355\) −1.59825e6 −0.673093
\(356\) 1.25811e6 0.526130
\(357\) −409040. −0.169862
\(358\) 3.20336e6 1.32099
\(359\) −406372. −0.166413 −0.0832066 0.996532i \(-0.526516\pi\)
−0.0832066 + 0.996532i \(0.526516\pi\)
\(360\) 207202. 0.0842633
\(361\) −1.56172e6 −0.630716
\(362\) −366238. −0.146890
\(363\) −3.10604e6 −1.23720
\(364\) 23282.2 0.00921024
\(365\) 1.22857e6 0.482690
\(366\) −2.53871e6 −0.990629
\(367\) 2.09427e6 0.811647 0.405824 0.913951i \(-0.366985\pi\)
0.405824 + 0.913951i \(0.366985\pi\)
\(368\) 250734. 0.0965147
\(369\) −249752. −0.0954867
\(370\) −188995. −0.0717706
\(371\) −14068.0 −0.00530637
\(372\) 1.47934e6 0.554256
\(373\) 2.11130e6 0.785736 0.392868 0.919595i \(-0.371483\pi\)
0.392868 + 0.919595i \(0.371483\pi\)
\(374\) 18864.5 0.00697376
\(375\) 301567. 0.110740
\(376\) −1.82807e6 −0.666841
\(377\) 29605.5 0.0107280
\(378\) −429349. −0.154554
\(379\) 1.21058e6 0.432907 0.216453 0.976293i \(-0.430551\pi\)
0.216453 + 0.976293i \(0.430551\pi\)
\(380\) −382494. −0.135883
\(381\) −1.66159e6 −0.586424
\(382\) 1.63996e6 0.575010
\(383\) −994517. −0.346430 −0.173215 0.984884i \(-0.555416\pi\)
−0.173215 + 0.984884i \(0.555416\pi\)
\(384\) 316216. 0.109435
\(385\) −13357.2 −0.00459267
\(386\) −260449. −0.0889724
\(387\) −2.34135e6 −0.794675
\(388\) 1.49463e6 0.504029
\(389\) −2.49121e6 −0.834711 −0.417355 0.908743i \(-0.637043\pi\)
−0.417355 + 0.908743i \(0.637043\pi\)
\(390\) 57315.6 0.0190814
\(391\) −423622. −0.140132
\(392\) 153664. 0.0505076
\(393\) 4.26719e6 1.39367
\(394\) 732874. 0.237842
\(395\) 1.78094e6 0.574324
\(396\) −22593.1 −0.00723998
\(397\) 2.30834e6 0.735062 0.367531 0.930011i \(-0.380203\pi\)
0.367531 + 0.930011i \(0.380203\pi\)
\(398\) −2.25216e6 −0.712675
\(399\) −904324. −0.284375
\(400\) 160000. 0.0500000
\(401\) −633811. −0.196833 −0.0984167 0.995145i \(-0.531378\pi\)
−0.0984167 + 0.995145i \(0.531378\pi\)
\(402\) −2.85816e6 −0.882106
\(403\) 142263. 0.0436345
\(404\) −227046. −0.0692086
\(405\) −1.84368e6 −0.558532
\(406\) 195398. 0.0588308
\(407\) 20607.8 0.00616660
\(408\) −534256. −0.158891
\(409\) 942669. 0.278645 0.139322 0.990247i \(-0.455508\pi\)
0.139322 + 0.990247i \(0.455508\pi\)
\(410\) −192856. −0.0566597
\(411\) −8.20597e6 −2.39621
\(412\) 3.16172e6 0.917657
\(413\) 552296. 0.159330
\(414\) 507350. 0.145481
\(415\) 2.35992e6 0.672631
\(416\) 30409.4 0.00861540
\(417\) −279709. −0.0787709
\(418\) 41706.6 0.0116752
\(419\) −3.93604e6 −1.09528 −0.547639 0.836715i \(-0.684473\pi\)
−0.547639 + 0.836715i \(0.684473\pi\)
\(420\) 378286. 0.104640
\(421\) −5.76142e6 −1.58425 −0.792125 0.610358i \(-0.791025\pi\)
−0.792125 + 0.610358i \(0.791025\pi\)
\(422\) −2.25924e6 −0.617564
\(423\) −3.69902e6 −1.00516
\(424\) −18374.5 −0.00496365
\(425\) −270325. −0.0725961
\(426\) −4.93549e6 −1.31767
\(427\) −1.61133e6 −0.427677
\(428\) 2.60967e6 0.688615
\(429\) −6249.61 −0.00163949
\(430\) −1.80797e6 −0.471543
\(431\) 1.93127e6 0.500785 0.250392 0.968144i \(-0.419440\pi\)
0.250392 + 0.968144i \(0.419440\pi\)
\(432\) −560782. −0.144572
\(433\) 1.40458e6 0.360021 0.180010 0.983665i \(-0.442387\pi\)
0.180010 + 0.983665i \(0.442387\pi\)
\(434\) 938945. 0.239285
\(435\) 481025. 0.121883
\(436\) −1.07533e6 −0.270910
\(437\) −936563. −0.234603
\(438\) 3.79389e6 0.944930
\(439\) −3.66469e6 −0.907562 −0.453781 0.891113i \(-0.649925\pi\)
−0.453781 + 0.891113i \(0.649925\pi\)
\(440\) −17446.2 −0.00429605
\(441\) 310933. 0.0761326
\(442\) −51377.6 −0.0125089
\(443\) 4.68414e6 1.13402 0.567009 0.823711i \(-0.308100\pi\)
0.567009 + 0.823711i \(0.308100\pi\)
\(444\) −583626. −0.140500
\(445\) 1.96580e6 0.470585
\(446\) −4.70630e6 −1.12032
\(447\) −713683. −0.168942
\(448\) 200704. 0.0472456
\(449\) −873525. −0.204484 −0.102242 0.994760i \(-0.532602\pi\)
−0.102242 + 0.994760i \(0.532602\pi\)
\(450\) 323754. 0.0753674
\(451\) 21028.8 0.00486826
\(452\) 895614. 0.206193
\(453\) 1.57160e6 0.359828
\(454\) 3.93932e6 0.896977
\(455\) 36378.5 0.00823789
\(456\) −1.18116e6 −0.266009
\(457\) 5.20487e6 1.16579 0.582894 0.812548i \(-0.301920\pi\)
0.582894 + 0.812548i \(0.301920\pi\)
\(458\) 697005. 0.155264
\(459\) 947457. 0.209908
\(460\) 391772. 0.0863254
\(461\) −1.93474e6 −0.424004 −0.212002 0.977269i \(-0.567998\pi\)
−0.212002 + 0.977269i \(0.567998\pi\)
\(462\) −41247.8 −0.00899075
\(463\) −2.35881e6 −0.511375 −0.255688 0.966759i \(-0.582302\pi\)
−0.255688 + 0.966759i \(0.582302\pi\)
\(464\) 255213. 0.0550312
\(465\) 2.31147e6 0.495742
\(466\) 3.58064e6 0.763828
\(467\) −3.37402e6 −0.715905 −0.357953 0.933740i \(-0.616525\pi\)
−0.357953 + 0.933740i \(0.616525\pi\)
\(468\) 61532.3 0.0129864
\(469\) −1.81409e6 −0.380825
\(470\) −2.85635e6 −0.596441
\(471\) −2.19599e6 −0.456118
\(472\) 721366. 0.149039
\(473\) 197139. 0.0405154
\(474\) 5.49963e6 1.12431
\(475\) −597646. −0.121537
\(476\) −339095. −0.0685969
\(477\) −37180.1 −0.00748195
\(478\) 1.00051e6 0.200287
\(479\) 4.74768e6 0.945459 0.472729 0.881208i \(-0.343269\pi\)
0.472729 + 0.881208i \(0.343269\pi\)
\(480\) 494088. 0.0978816
\(481\) −56125.4 −0.0110611
\(482\) −3.29955e6 −0.646900
\(483\) 926260. 0.180661
\(484\) −2.57491e6 −0.499631
\(485\) 2.33536e6 0.450817
\(486\) −3.56415e6 −0.684488
\(487\) 5.24868e6 1.00283 0.501416 0.865207i \(-0.332813\pi\)
0.501416 + 0.865207i \(0.332813\pi\)
\(488\) −2.10460e6 −0.400055
\(489\) 8.50307e6 1.60807
\(490\) 240100. 0.0451754
\(491\) −4.42605e6 −0.828537 −0.414269 0.910155i \(-0.635963\pi\)
−0.414269 + 0.910155i \(0.635963\pi\)
\(492\) −595550. −0.110919
\(493\) −431191. −0.0799009
\(494\) −113588. −0.0209419
\(495\) −35301.7 −0.00647564
\(496\) 1.22638e6 0.223831
\(497\) −3.13258e6 −0.568867
\(498\) 7.28754e6 1.31676
\(499\) −45902.0 −0.00825240 −0.00412620 0.999991i \(-0.501313\pi\)
−0.00412620 + 0.999991i \(0.501313\pi\)
\(500\) 250000. 0.0447214
\(501\) 1.19873e7 2.13367
\(502\) 2.91806e6 0.516815
\(503\) −2.04449e6 −0.360301 −0.180150 0.983639i \(-0.557658\pi\)
−0.180150 + 0.983639i \(0.557658\pi\)
\(504\) 406117. 0.0712155
\(505\) −354759. −0.0619021
\(506\) −42718.3 −0.00741716
\(507\) −7.14904e6 −1.23517
\(508\) −1.37746e6 −0.236821
\(509\) 398969. 0.0682566 0.0341283 0.999417i \(-0.489135\pi\)
0.0341283 + 0.999417i \(0.489135\pi\)
\(510\) −834775. −0.142116
\(511\) 2.40800e6 0.407948
\(512\) 262144. 0.0441942
\(513\) 2.09468e6 0.351419
\(514\) 474576. 0.0792315
\(515\) 4.94019e6 0.820777
\(516\) −5.58311e6 −0.923107
\(517\) 311453. 0.0512467
\(518\) −370431. −0.0606572
\(519\) 9.78381e6 1.59437
\(520\) 47514.8 0.00770584
\(521\) 1.02501e7 1.65437 0.827187 0.561927i \(-0.189940\pi\)
0.827187 + 0.561927i \(0.189940\pi\)
\(522\) 516414. 0.0829511
\(523\) 1.51839e6 0.242733 0.121367 0.992608i \(-0.461272\pi\)
0.121367 + 0.992608i \(0.461272\pi\)
\(524\) 3.53751e6 0.562820
\(525\) 591072. 0.0935927
\(526\) −3.06478e6 −0.482986
\(527\) −2.07200e6 −0.324985
\(528\) −53874.7 −0.00841007
\(529\) −5.47706e6 −0.850959
\(530\) −28710.2 −0.00443962
\(531\) 1.45966e6 0.224654
\(532\) −749687. −0.114842
\(533\) −57272.1 −0.00873222
\(534\) 6.07047e6 0.921232
\(535\) 4.07761e6 0.615916
\(536\) −2.36942e6 −0.356230
\(537\) 1.54564e7 2.31299
\(538\) −3.09916e6 −0.461624
\(539\) −26180.2 −0.00388151
\(540\) −876222. −0.129309
\(541\) 3.59686e6 0.528360 0.264180 0.964473i \(-0.414899\pi\)
0.264180 + 0.964473i \(0.414899\pi\)
\(542\) −6.53483e6 −0.955511
\(543\) −1.76713e6 −0.257198
\(544\) −442900. −0.0641665
\(545\) −1.68020e6 −0.242309
\(546\) 112339. 0.0161268
\(547\) −7.64729e6 −1.09280 −0.546398 0.837526i \(-0.684001\pi\)
−0.546398 + 0.837526i \(0.684001\pi\)
\(548\) −6.80277e6 −0.967686
\(549\) −4.25858e6 −0.603023
\(550\) −27259.7 −0.00384250
\(551\) −953296. −0.133767
\(552\) 1.20981e6 0.168993
\(553\) 3.49064e6 0.485392
\(554\) −8.58423e6 −1.18830
\(555\) −911916. −0.125667
\(556\) −231879. −0.0318108
\(557\) −8.89209e6 −1.21441 −0.607206 0.794544i \(-0.707710\pi\)
−0.607206 + 0.794544i \(0.707710\pi\)
\(558\) 2.48152e6 0.337391
\(559\) −536909. −0.0726727
\(560\) 313600. 0.0422577
\(561\) 91022.8 0.0122108
\(562\) 3.65504e6 0.488148
\(563\) −3.33731e6 −0.443737 −0.221869 0.975077i \(-0.571216\pi\)
−0.221869 + 0.975077i \(0.571216\pi\)
\(564\) −8.82055e6 −1.16761
\(565\) 1.39940e6 0.184425
\(566\) −4.46625e6 −0.586006
\(567\) −3.61361e6 −0.472046
\(568\) −4.09153e6 −0.532127
\(569\) −1.17027e7 −1.51532 −0.757661 0.652648i \(-0.773658\pi\)
−0.757661 + 0.652648i \(0.773658\pi\)
\(570\) −1.84556e6 −0.237926
\(571\) 685949. 0.0880444 0.0440222 0.999031i \(-0.485983\pi\)
0.0440222 + 0.999031i \(0.485983\pi\)
\(572\) −5180.95 −0.000662093 0
\(573\) 7.91294e6 1.00682
\(574\) −377999. −0.0478862
\(575\) 612143. 0.0772118
\(576\) 530438. 0.0666160
\(577\) −1.10785e7 −1.38530 −0.692648 0.721276i \(-0.743556\pi\)
−0.692648 + 0.721276i \(0.743556\pi\)
\(578\) −4.93114e6 −0.613942
\(579\) −1.25669e6 −0.155787
\(580\) 398771. 0.0492214
\(581\) 4.62544e6 0.568477
\(582\) 7.21172e6 0.882533
\(583\) 3130.52 0.000381457 0
\(584\) 3.14515e6 0.381600
\(585\) 96144.3 0.0116154
\(586\) 1.58622e6 0.190819
\(587\) −8.07328e6 −0.967063 −0.483531 0.875327i \(-0.660646\pi\)
−0.483531 + 0.875327i \(0.660646\pi\)
\(588\) 741440. 0.0884368
\(589\) −4.58087e6 −0.544076
\(590\) 1.12713e6 0.133305
\(591\) 3.53617e6 0.416452
\(592\) −483828. −0.0567396
\(593\) 1.33847e7 1.56304 0.781521 0.623879i \(-0.214444\pi\)
0.781521 + 0.623879i \(0.214444\pi\)
\(594\) 95542.1 0.0111104
\(595\) −529836. −0.0613549
\(596\) −591645. −0.0682253
\(597\) −1.08668e7 −1.24786
\(598\) 116343. 0.0133042
\(599\) −2.30111e6 −0.262042 −0.131021 0.991380i \(-0.541826\pi\)
−0.131021 + 0.991380i \(0.541826\pi\)
\(600\) 772012. 0.0875479
\(601\) 5.21404e6 0.588828 0.294414 0.955678i \(-0.404876\pi\)
0.294414 + 0.955678i \(0.404876\pi\)
\(602\) −3.54363e6 −0.398526
\(603\) −4.79443e6 −0.536962
\(604\) 1.30286e6 0.145313
\(605\) −4.02330e6 −0.446883
\(606\) −1.09551e6 −0.121181
\(607\) 1.75294e7 1.93106 0.965529 0.260296i \(-0.0838200\pi\)
0.965529 + 0.260296i \(0.0838200\pi\)
\(608\) −979184. −0.107425
\(609\) 942809. 0.103010
\(610\) −3.28844e6 −0.357820
\(611\) −848243. −0.0919216
\(612\) −896190. −0.0967212
\(613\) −1.70871e7 −1.83661 −0.918304 0.395876i \(-0.870441\pi\)
−0.918304 + 0.395876i \(0.870441\pi\)
\(614\) 5.74148e6 0.614615
\(615\) −930547. −0.0992089
\(616\) −34194.5 −0.00363082
\(617\) −4.74820e6 −0.502130 −0.251065 0.967970i \(-0.580781\pi\)
−0.251065 + 0.967970i \(0.580781\pi\)
\(618\) 1.52555e7 1.60678
\(619\) 1.68570e6 0.176829 0.0884144 0.996084i \(-0.471820\pi\)
0.0884144 + 0.996084i \(0.471820\pi\)
\(620\) 1.91621e6 0.200200
\(621\) −2.14549e6 −0.223253
\(622\) 6.45224e6 0.668705
\(623\) 3.85296e6 0.397717
\(624\) 146728. 0.0150852
\(625\) 390625. 0.0400000
\(626\) 8.85676e6 0.903315
\(627\) 201237. 0.0204428
\(628\) −1.82048e6 −0.184199
\(629\) 817441. 0.0823815
\(630\) 634557. 0.0636971
\(631\) −8.18052e6 −0.817913 −0.408957 0.912554i \(-0.634107\pi\)
−0.408957 + 0.912554i \(0.634107\pi\)
\(632\) 4.55921e6 0.454043
\(633\) −1.09010e7 −1.08133
\(634\) −9.32015e6 −0.920873
\(635\) −2.15229e6 −0.211819
\(636\) −88658.4 −0.00869115
\(637\) 71301.8 0.00696229
\(638\) −43481.5 −0.00422914
\(639\) −8.27905e6 −0.802100
\(640\) 409600. 0.0395285
\(641\) 7.88556e6 0.758032 0.379016 0.925390i \(-0.376263\pi\)
0.379016 + 0.925390i \(0.376263\pi\)
\(642\) 1.25919e7 1.20574
\(643\) 7.75540e6 0.739736 0.369868 0.929084i \(-0.379403\pi\)
0.369868 + 0.929084i \(0.379403\pi\)
\(644\) 767872. 0.0729583
\(645\) −8.72361e6 −0.825652
\(646\) 1.65436e6 0.155973
\(647\) −7.60702e6 −0.714420 −0.357210 0.934024i \(-0.616272\pi\)
−0.357210 + 0.934024i \(0.616272\pi\)
\(648\) −4.71982e6 −0.441558
\(649\) −122901. −0.0114537
\(650\) 74241.8 0.00689232
\(651\) 4.53048e6 0.418978
\(652\) 7.04907e6 0.649401
\(653\) −1.23713e7 −1.13535 −0.567677 0.823252i \(-0.692158\pi\)
−0.567677 + 0.823252i \(0.692158\pi\)
\(654\) −5.18854e6 −0.474352
\(655\) 5.52736e6 0.503401
\(656\) −493713. −0.0447935
\(657\) 6.36408e6 0.575204
\(658\) −5.59845e6 −0.504084
\(659\) 1.94708e7 1.74650 0.873252 0.487269i \(-0.162007\pi\)
0.873252 + 0.487269i \(0.162007\pi\)
\(660\) −84179.2 −0.00752220
\(661\) −3.17932e6 −0.283029 −0.141515 0.989936i \(-0.545197\pi\)
−0.141515 + 0.989936i \(0.545197\pi\)
\(662\) 1.05442e7 0.935120
\(663\) −247901. −0.0219025
\(664\) 6.04139e6 0.531762
\(665\) −1.17139e6 −0.102718
\(666\) −979007. −0.0855264
\(667\) 976420. 0.0849811
\(668\) 9.93751e6 0.861661
\(669\) −2.27082e7 −1.96163
\(670\) −3.70222e6 −0.318621
\(671\) 358567. 0.0307443
\(672\) 968412. 0.0827250
\(673\) −1.79934e7 −1.53136 −0.765678 0.643224i \(-0.777597\pi\)
−0.765678 + 0.643224i \(0.777597\pi\)
\(674\) 4.53893e6 0.384861
\(675\) −1.36910e6 −0.115658
\(676\) −5.92658e6 −0.498812
\(677\) 1.47781e7 1.23921 0.619606 0.784913i \(-0.287292\pi\)
0.619606 + 0.784913i \(0.287292\pi\)
\(678\) 4.32140e6 0.361036
\(679\) 4.57731e6 0.381010
\(680\) −692031. −0.0573922
\(681\) 1.90075e7 1.57057
\(682\) −208941. −0.0172014
\(683\) −882971. −0.0724260 −0.0362130 0.999344i \(-0.511529\pi\)
−0.0362130 + 0.999344i \(0.511529\pi\)
\(684\) −1.98134e6 −0.161927
\(685\) −1.06293e7 −0.865525
\(686\) 470596. 0.0381802
\(687\) 3.36310e6 0.271862
\(688\) −4.62841e6 −0.372787
\(689\) −8525.98 −0.000684221 0
\(690\) 1.89033e6 0.151152
\(691\) −1.56459e7 −1.24654 −0.623270 0.782007i \(-0.714196\pi\)
−0.623270 + 0.782007i \(0.714196\pi\)
\(692\) 8.11081e6 0.643871
\(693\) −69191.3 −0.00547291
\(694\) −1.05104e7 −0.828361
\(695\) −362311. −0.0284525
\(696\) 1.23142e6 0.0963573
\(697\) 834142. 0.0650366
\(698\) −1.53063e7 −1.18913
\(699\) 1.72769e7 1.33743
\(700\) 490000. 0.0377964
\(701\) −1.39490e7 −1.07213 −0.536067 0.844175i \(-0.680091\pi\)
−0.536067 + 0.844175i \(0.680091\pi\)
\(702\) −260209. −0.0199287
\(703\) 1.80724e6 0.137920
\(704\) −44662.2 −0.00339632
\(705\) −1.37821e7 −1.04434
\(706\) 5.96573e6 0.450455
\(707\) −695328. −0.0523168
\(708\) 3.48064e6 0.260961
\(709\) −7.66584e6 −0.572722 −0.286361 0.958122i \(-0.592446\pi\)
−0.286361 + 0.958122i \(0.592446\pi\)
\(710\) −6.39302e6 −0.475949
\(711\) 9.22538e6 0.684400
\(712\) 5.03244e6 0.372030
\(713\) 4.69199e6 0.345647
\(714\) −1.63616e6 −0.120110
\(715\) −8095.23 −0.000592194 0
\(716\) 1.28134e7 0.934078
\(717\) 4.82755e6 0.350694
\(718\) −1.62549e6 −0.117672
\(719\) 1.46181e7 1.05456 0.527278 0.849693i \(-0.323213\pi\)
0.527278 + 0.849693i \(0.323213\pi\)
\(720\) 828810. 0.0595832
\(721\) 9.68276e6 0.693683
\(722\) −6.24686e6 −0.445984
\(723\) −1.59206e7 −1.13270
\(724\) −1.46495e6 −0.103867
\(725\) 623080. 0.0440249
\(726\) −1.24242e7 −0.874833
\(727\) 1.17581e7 0.825089 0.412544 0.910938i \(-0.364640\pi\)
0.412544 + 0.910938i \(0.364640\pi\)
\(728\) 93128.9 0.00651263
\(729\) 723267. 0.0504057
\(730\) 4.91429e6 0.341314
\(731\) 7.81984e6 0.541258
\(732\) −1.01549e7 −0.700480
\(733\) −9.42125e6 −0.647662 −0.323831 0.946115i \(-0.604971\pi\)
−0.323831 + 0.946115i \(0.604971\pi\)
\(734\) 8.37707e6 0.573921
\(735\) 1.15850e6 0.0791002
\(736\) 1.00294e6 0.0682462
\(737\) 403685. 0.0273762
\(738\) −999008. −0.0675193
\(739\) 8.69064e6 0.585384 0.292692 0.956207i \(-0.405449\pi\)
0.292692 + 0.956207i \(0.405449\pi\)
\(740\) −755981. −0.0507495
\(741\) −548071. −0.0366683
\(742\) −56272.0 −0.00375217
\(743\) 1.42528e7 0.947172 0.473586 0.880748i \(-0.342959\pi\)
0.473586 + 0.880748i \(0.342959\pi\)
\(744\) 5.91736e6 0.391918
\(745\) −924445. −0.0610226
\(746\) 8.44518e6 0.555600
\(747\) 1.22245e7 0.801550
\(748\) 75458.1 0.00493119
\(749\) 7.99212e6 0.520544
\(750\) 1.20627e6 0.0783052
\(751\) 1.37921e7 0.892343 0.446172 0.894947i \(-0.352787\pi\)
0.446172 + 0.894947i \(0.352787\pi\)
\(752\) −7.31226e6 −0.471528
\(753\) 1.40799e7 0.904922
\(754\) 118422. 0.00758584
\(755\) 2.03571e6 0.129972
\(756\) −1.71740e6 −0.109286
\(757\) 2.62790e6 0.166674 0.0833371 0.996521i \(-0.473442\pi\)
0.0833371 + 0.996521i \(0.473442\pi\)
\(758\) 4.84231e6 0.306111
\(759\) −206119. −0.0129871
\(760\) −1.52997e6 −0.0960838
\(761\) −7.93120e6 −0.496452 −0.248226 0.968702i \(-0.579848\pi\)
−0.248226 + 0.968702i \(0.579848\pi\)
\(762\) −6.64636e6 −0.414664
\(763\) −3.29320e6 −0.204789
\(764\) 6.55985e6 0.406594
\(765\) −1.40030e6 −0.0865101
\(766\) −3.97807e6 −0.244963
\(767\) 334722. 0.0205445
\(768\) 1.26486e6 0.0773822
\(769\) 3.06343e6 0.186806 0.0934032 0.995628i \(-0.470225\pi\)
0.0934032 + 0.995628i \(0.470225\pi\)
\(770\) −53429.0 −0.00324751
\(771\) 2.28986e6 0.138731
\(772\) −1.04180e6 −0.0629130
\(773\) 1.17714e7 0.708562 0.354281 0.935139i \(-0.384726\pi\)
0.354281 + 0.935139i \(0.384726\pi\)
\(774\) −9.36541e6 −0.561920
\(775\) 2.99408e6 0.179065
\(776\) 5.97853e6 0.356402
\(777\) −1.78736e6 −0.106208
\(778\) −9.96483e6 −0.590230
\(779\) 1.84416e6 0.108882
\(780\) 229262. 0.0134926
\(781\) 697086. 0.0408939
\(782\) −1.69449e6 −0.0990881
\(783\) −2.18382e6 −0.127296
\(784\) 614656. 0.0357143
\(785\) −2.84450e6 −0.164752
\(786\) 1.70687e7 0.985474
\(787\) 1.28179e7 0.737701 0.368851 0.929489i \(-0.379751\pi\)
0.368851 + 0.929489i \(0.379751\pi\)
\(788\) 2.93150e6 0.168180
\(789\) −1.47878e7 −0.845689
\(790\) 7.12376e6 0.406108
\(791\) 2.74282e6 0.155868
\(792\) −90372.3 −0.00511944
\(793\) −976559. −0.0551462
\(794\) 9.23337e6 0.519767
\(795\) −138529. −0.00777360
\(796\) −9.00864e6 −0.503937
\(797\) −3.33470e7 −1.85957 −0.929783 0.368108i \(-0.880006\pi\)
−0.929783 + 0.368108i \(0.880006\pi\)
\(798\) −3.61730e6 −0.201084
\(799\) 1.23543e7 0.684621
\(800\) 640000. 0.0353553
\(801\) 1.01829e7 0.560779
\(802\) −2.53524e6 −0.139182
\(803\) −535848. −0.0293260
\(804\) −1.14326e7 −0.623743
\(805\) 1.19980e6 0.0652558
\(806\) 569053. 0.0308542
\(807\) −1.49537e7 −0.808284
\(808\) −908184. −0.0489379
\(809\) 1.95295e7 1.04911 0.524554 0.851377i \(-0.324232\pi\)
0.524554 + 0.851377i \(0.324232\pi\)
\(810\) −7.37472e6 −0.394942
\(811\) −2.21959e7 −1.18501 −0.592504 0.805568i \(-0.701861\pi\)
−0.592504 + 0.805568i \(0.701861\pi\)
\(812\) 781591. 0.0415996
\(813\) −3.15310e7 −1.67306
\(814\) 82431.2 0.00436044
\(815\) 1.10142e7 0.580842
\(816\) −2.13702e6 −0.112353
\(817\) 1.72885e7 0.906152
\(818\) 3.77068e6 0.197032
\(819\) 188443. 0.00981679
\(820\) −771426. −0.0400645
\(821\) 2.37914e7 1.23186 0.615930 0.787801i \(-0.288780\pi\)
0.615930 + 0.787801i \(0.288780\pi\)
\(822\) −3.28239e7 −1.69438
\(823\) −1.75911e7 −0.905300 −0.452650 0.891688i \(-0.649521\pi\)
−0.452650 + 0.891688i \(0.649521\pi\)
\(824\) 1.26469e7 0.648881
\(825\) −131530. −0.00672806
\(826\) 2.20918e6 0.112663
\(827\) −1.50096e6 −0.0763145 −0.0381572 0.999272i \(-0.512149\pi\)
−0.0381572 + 0.999272i \(0.512149\pi\)
\(828\) 2.02940e6 0.102871
\(829\) −3.12166e7 −1.57761 −0.788805 0.614644i \(-0.789300\pi\)
−0.788805 + 0.614644i \(0.789300\pi\)
\(830\) 9.43968e6 0.475622
\(831\) −4.14195e7 −2.08067
\(832\) 121638. 0.00609200
\(833\) −1.03848e6 −0.0518543
\(834\) −1.11883e6 −0.0556994
\(835\) 1.55274e7 0.770693
\(836\) 166826. 0.00825561
\(837\) −1.04939e7 −0.517755
\(838\) −1.57442e7 −0.774478
\(839\) −2.72358e7 −1.33578 −0.667890 0.744260i \(-0.732802\pi\)
−0.667890 + 0.744260i \(0.732802\pi\)
\(840\) 1.51314e6 0.0739915
\(841\) −1.95173e7 −0.951545
\(842\) −2.30457e7 −1.12023
\(843\) 1.76358e7 0.854727
\(844\) −9.03697e6 −0.436684
\(845\) −9.26028e6 −0.446151
\(846\) −1.47961e7 −0.710756
\(847\) −7.88567e6 −0.377685
\(848\) −73498.1 −0.00350983
\(849\) −2.15500e7 −1.02607
\(850\) −1.08130e6 −0.0513332
\(851\) −1.85107e6 −0.0876193
\(852\) −1.97419e7 −0.931732
\(853\) 2.58892e6 0.121828 0.0609140 0.998143i \(-0.480598\pi\)
0.0609140 + 0.998143i \(0.480598\pi\)
\(854\) −6.44534e6 −0.302413
\(855\) −3.09584e6 −0.144832
\(856\) 1.04387e7 0.486924
\(857\) 3.19020e7 1.48377 0.741883 0.670529i \(-0.233933\pi\)
0.741883 + 0.670529i \(0.233933\pi\)
\(858\) −24998.5 −0.00115930
\(859\) 2.89610e7 1.33915 0.669577 0.742742i \(-0.266475\pi\)
0.669577 + 0.742742i \(0.266475\pi\)
\(860\) −7.23190e6 −0.333431
\(861\) −1.82387e6 −0.0838468
\(862\) 7.72510e6 0.354108
\(863\) −3.43636e7 −1.57062 −0.785311 0.619101i \(-0.787497\pi\)
−0.785311 + 0.619101i \(0.787497\pi\)
\(864\) −2.24313e6 −0.102228
\(865\) 1.26731e7 0.575896
\(866\) 5.61833e6 0.254573
\(867\) −2.37931e7 −1.07499
\(868\) 3.75578e6 0.169200
\(869\) −776766. −0.0348932
\(870\) 1.92410e6 0.0861846
\(871\) −1.09944e6 −0.0491049
\(872\) −4.30132e6 −0.191562
\(873\) 1.20973e7 0.537222
\(874\) −3.74625e6 −0.165889
\(875\) 765625. 0.0338062
\(876\) 1.51756e7 0.668166
\(877\) 1.55161e7 0.681213 0.340607 0.940206i \(-0.389368\pi\)
0.340607 + 0.940206i \(0.389368\pi\)
\(878\) −1.46588e7 −0.641743
\(879\) 7.65365e6 0.334115
\(880\) −69784.8 −0.00303776
\(881\) −2.13678e7 −0.927515 −0.463757 0.885962i \(-0.653499\pi\)
−0.463757 + 0.885962i \(0.653499\pi\)
\(882\) 1.24373e6 0.0538339
\(883\) 1.70291e7 0.735003 0.367502 0.930023i \(-0.380213\pi\)
0.367502 + 0.930023i \(0.380213\pi\)
\(884\) −205511. −0.00884511
\(885\) 5.43850e6 0.233411
\(886\) 1.87365e7 0.801872
\(887\) 3.88954e7 1.65993 0.829964 0.557817i \(-0.188361\pi\)
0.829964 + 0.557817i \(0.188361\pi\)
\(888\) −2.33451e6 −0.0993488
\(889\) −4.21848e6 −0.179020
\(890\) 7.86318e6 0.332754
\(891\) 804130. 0.0339338
\(892\) −1.88252e7 −0.792186
\(893\) 2.73134e7 1.14617
\(894\) −2.85473e6 −0.119460
\(895\) 2.00210e7 0.835465
\(896\) 802816. 0.0334077
\(897\) 561365. 0.0232951
\(898\) −3.49410e6 −0.144592
\(899\) 4.77582e6 0.197083
\(900\) 1.29501e6 0.0532928
\(901\) 124177. 0.00509600
\(902\) 84115.3 0.00344238
\(903\) −1.70983e7 −0.697803
\(904\) 3.58245e6 0.145801
\(905\) −2.28899e6 −0.0929014
\(906\) 6.28638e6 0.254437
\(907\) −9.89966e6 −0.399578 −0.199789 0.979839i \(-0.564026\pi\)
−0.199789 + 0.979839i \(0.564026\pi\)
\(908\) 1.57573e7 0.634258
\(909\) −1.83767e6 −0.0737664
\(910\) 145514. 0.00582507
\(911\) 8.31180e6 0.331817 0.165909 0.986141i \(-0.446944\pi\)
0.165909 + 0.986141i \(0.446944\pi\)
\(912\) −4.72463e6 −0.188097
\(913\) −1.02929e6 −0.0408659
\(914\) 2.08195e7 0.824337
\(915\) −1.58670e7 −0.626529
\(916\) 2.78802e6 0.109789
\(917\) 1.08336e7 0.425452
\(918\) 3.78983e6 0.148427
\(919\) −1.40148e7 −0.547393 −0.273697 0.961816i \(-0.588246\pi\)
−0.273697 + 0.961816i \(0.588246\pi\)
\(920\) 1.56709e6 0.0610413
\(921\) 2.77031e7 1.07617
\(922\) −7.73896e6 −0.299816
\(923\) −1.89852e6 −0.0733517
\(924\) −164991. −0.00635742
\(925\) −1.18122e6 −0.0453917
\(926\) −9.43522e6 −0.361597
\(927\) 2.55905e7 0.978090
\(928\) 1.02085e6 0.0389129
\(929\) 2.55744e7 0.972225 0.486112 0.873896i \(-0.338415\pi\)
0.486112 + 0.873896i \(0.338415\pi\)
\(930\) 9.24587e6 0.350542
\(931\) −2.29592e6 −0.0868125
\(932\) 1.43226e7 0.540108
\(933\) 3.11325e7 1.17087
\(934\) −1.34961e7 −0.506221
\(935\) 117903. 0.00441059
\(936\) 246129. 0.00918277
\(937\) 4.55745e7 1.69579 0.847896 0.530162i \(-0.177869\pi\)
0.847896 + 0.530162i \(0.177869\pi\)
\(938\) −7.25635e6 −0.269284
\(939\) 4.27345e7 1.58167
\(940\) −1.14254e7 −0.421747
\(941\) −1.44078e7 −0.530425 −0.265213 0.964190i \(-0.585442\pi\)
−0.265213 + 0.964190i \(0.585442\pi\)
\(942\) −8.78395e6 −0.322524
\(943\) −1.88889e6 −0.0691716
\(944\) 2.88546e6 0.105387
\(945\) −2.68343e6 −0.0977486
\(946\) 788556. 0.0286487
\(947\) −4.58169e7 −1.66016 −0.830082 0.557641i \(-0.811707\pi\)
−0.830082 + 0.557641i \(0.811707\pi\)
\(948\) 2.19985e7 0.795010
\(949\) 1.45938e6 0.0526022
\(950\) −2.39058e6 −0.0859400
\(951\) −4.49704e7 −1.61241
\(952\) −1.35638e6 −0.0485053
\(953\) 2.52608e7 0.900980 0.450490 0.892781i \(-0.351249\pi\)
0.450490 + 0.892781i \(0.351249\pi\)
\(954\) −148720. −0.00529054
\(955\) 1.02498e7 0.363668
\(956\) 4.00205e6 0.141624
\(957\) −209801. −0.00740506
\(958\) 1.89907e7 0.668540
\(959\) −2.08335e7 −0.731502
\(960\) 1.97635e6 0.0692127
\(961\) −5.67994e6 −0.198397
\(962\) −224502. −0.00782135
\(963\) 2.11223e7 0.733964
\(964\) −1.31982e7 −0.457427
\(965\) −1.62781e6 −0.0562711
\(966\) 3.70504e6 0.127747
\(967\) 5.68247e7 1.95421 0.977105 0.212758i \(-0.0682447\pi\)
0.977105 + 0.212758i \(0.0682447\pi\)
\(968\) −1.02997e7 −0.353292
\(969\) 7.98240e6 0.273102
\(970\) 9.34146e6 0.318776
\(971\) −2.46332e7 −0.838441 −0.419221 0.907884i \(-0.637697\pi\)
−0.419221 + 0.907884i \(0.637697\pi\)
\(972\) −1.42566e7 −0.484006
\(973\) −710130. −0.0240467
\(974\) 2.09947e7 0.709109
\(975\) 358222. 0.0120682
\(976\) −8.41840e6 −0.282882
\(977\) −4.16806e7 −1.39700 −0.698502 0.715608i \(-0.746150\pi\)
−0.698502 + 0.715608i \(0.746150\pi\)
\(978\) 3.40123e7 1.13707
\(979\) −857391. −0.0285905
\(980\) 960400. 0.0319438
\(981\) −8.70355e6 −0.288751
\(982\) −1.77042e7 −0.585864
\(983\) 3.85482e6 0.127239 0.0636196 0.997974i \(-0.479736\pi\)
0.0636196 + 0.997974i \(0.479736\pi\)
\(984\) −2.38220e6 −0.0784315
\(985\) 4.58046e6 0.150425
\(986\) −1.72476e6 −0.0564985
\(987\) −2.70129e7 −0.882631
\(988\) −454352. −0.0148081
\(989\) −1.77078e7 −0.575671
\(990\) −141207. −0.00457897
\(991\) −3.85510e7 −1.24696 −0.623478 0.781841i \(-0.714281\pi\)
−0.623478 + 0.781841i \(0.714281\pi\)
\(992\) 4.90551e6 0.158272
\(993\) 5.08764e7 1.63736
\(994\) −1.25303e7 −0.402250
\(995\) −1.40760e7 −0.450735
\(996\) 2.91502e7 0.931093
\(997\) 3.80257e6 0.121155 0.0605773 0.998164i \(-0.480706\pi\)
0.0605773 + 0.998164i \(0.480706\pi\)
\(998\) −183608. −0.00583533
\(999\) 4.14004e6 0.131248
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 70.6.a.h.1.2 2
3.2 odd 2 630.6.a.s.1.2 2
4.3 odd 2 560.6.a.k.1.1 2
5.2 odd 4 350.6.c.k.99.3 4
5.3 odd 4 350.6.c.k.99.2 4
5.4 even 2 350.6.a.p.1.1 2
7.6 odd 2 490.6.a.u.1.1 2
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
70.6.a.h.1.2 2 1.1 even 1 trivial
350.6.a.p.1.1 2 5.4 even 2
350.6.c.k.99.2 4 5.3 odd 4
350.6.c.k.99.3 4 5.2 odd 4
490.6.a.u.1.1 2 7.6 odd 2
560.6.a.k.1.1 2 4.3 odd 2
630.6.a.s.1.2 2 3.2 odd 2