Properties

Label 19.4.a.b.1.3
Level $19$
Weight $4$
Character 19.1
Self dual yes
Analytic conductor $1.121$
Analytic rank $0$
Dimension $3$
CM no
Inner twists $1$

Related objects

Downloads

Learn more

Show commands: Magma / Pari/GP / SageMath

Newspace parameters

Copy content comment:Compute space of new eigenforms
 
Copy content gp:[N,k,chi] = [19,4,Mod(1,19)] 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("19.1"); S:= CuspForms(chi, 4); N := Newforms(S);
 
Copy content sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(19, base_ring=CyclotomicField(2)) chi = DirichletCharacter(H, H._module([0])) N = Newforms(chi, 4, names="a")
 
Level: \( N \) \(=\) \( 19 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 19.a (trivial)

Newform invariants

Copy content comment:select newform
 
Copy content sage:traces = [3] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(1)] == traces)
 
Copy content gp:f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(1.12103629011\)
Analytic rank: \(0\)
Dimension: \(3\)
Coefficient field: 3.3.3144.1
Copy content comment:defining polynomial
 
Copy content gp:f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{3} - x^{2} - 16x - 8 \) 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 1.3
Root \(-0.526440\) of defining polynomial
Character \(\chi\) \(=\) 19.1

$q$-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)
 
\(f(q)\) \(=\) \(q+5.07177 q^{2} -8.66998 q^{3} +17.7229 q^{4} -2.61710 q^{5} -43.9722 q^{6} -15.1058 q^{7} +49.3121 q^{8} +48.1686 q^{9} -13.2733 q^{10} +12.6171 q^{11} -153.657 q^{12} +46.9571 q^{13} -76.6130 q^{14} +22.6902 q^{15} +108.317 q^{16} -28.9745 q^{17} +244.300 q^{18} -19.0000 q^{19} -46.3825 q^{20} +130.967 q^{21} +63.9911 q^{22} -112.166 q^{23} -427.535 q^{24} -118.151 q^{25} +238.155 q^{26} -183.531 q^{27} -267.717 q^{28} +295.107 q^{29} +115.080 q^{30} -57.6979 q^{31} +154.862 q^{32} -109.390 q^{33} -146.952 q^{34} +39.5333 q^{35} +853.685 q^{36} -341.167 q^{37} -96.3636 q^{38} -407.117 q^{39} -129.055 q^{40} +274.056 q^{41} +664.233 q^{42} +327.536 q^{43} +223.611 q^{44} -126.062 q^{45} -568.879 q^{46} +139.140 q^{47} -939.106 q^{48} -114.816 q^{49} -599.234 q^{50} +251.209 q^{51} +832.214 q^{52} +296.715 q^{53} -930.828 q^{54} -33.0202 q^{55} -744.897 q^{56} +164.730 q^{57} +1496.72 q^{58} +459.383 q^{59} +402.136 q^{60} -232.911 q^{61} -292.631 q^{62} -727.623 q^{63} -81.1127 q^{64} -122.891 q^{65} -554.801 q^{66} -320.784 q^{67} -513.511 q^{68} +972.475 q^{69} +200.504 q^{70} -9.54518 q^{71} +2375.30 q^{72} +320.868 q^{73} -1730.32 q^{74} +1024.37 q^{75} -336.734 q^{76} -190.591 q^{77} -2064.80 q^{78} -89.2323 q^{79} -283.476 q^{80} +290.661 q^{81} +1389.95 q^{82} -439.455 q^{83} +2321.10 q^{84} +75.8293 q^{85} +1661.19 q^{86} -2558.58 q^{87} +622.176 q^{88} +883.164 q^{89} -639.358 q^{90} -709.322 q^{91} -1987.90 q^{92} +500.240 q^{93} +705.688 q^{94} +49.7249 q^{95} -1342.65 q^{96} -1705.87 q^{97} -582.321 q^{98} +607.748 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 3 q + 3 q^{2} + q^{3} + 21 q^{4} + 14 q^{5} - 65 q^{6} - 35 q^{7} + 27 q^{8} + 48 q^{9} - 88 q^{10} + 16 q^{11} - 115 q^{12} + 65 q^{13} + 37 q^{14} + 140 q^{15} + 33 q^{16} + 29 q^{17} + 138 q^{18} - 57 q^{19}+ \cdots + 250 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 5.07177 1.79314 0.896571 0.442900i \(-0.146050\pi\)
0.896571 + 0.442900i \(0.146050\pi\)
\(3\) −8.66998 −1.66854 −0.834269 0.551357i \(-0.814110\pi\)
−0.834269 + 0.551357i \(0.814110\pi\)
\(4\) 17.7229 2.21536
\(5\) −2.61710 −0.234081 −0.117040 0.993127i \(-0.537341\pi\)
−0.117040 + 0.993127i \(0.537341\pi\)
\(6\) −43.9722 −2.99193
\(7\) −15.1058 −0.815634 −0.407817 0.913064i \(-0.633710\pi\)
−0.407817 + 0.913064i \(0.633710\pi\)
\(8\) 49.3121 2.17931
\(9\) 48.1686 1.78402
\(10\) −13.2733 −0.419740
\(11\) 12.6171 0.345836 0.172918 0.984936i \(-0.444680\pi\)
0.172918 + 0.984936i \(0.444680\pi\)
\(12\) −153.657 −3.69641
\(13\) 46.9571 1.00181 0.500906 0.865502i \(-0.333000\pi\)
0.500906 + 0.865502i \(0.333000\pi\)
\(14\) −76.6130 −1.46255
\(15\) 22.6902 0.390573
\(16\) 108.317 1.69245
\(17\) −28.9745 −0.413374 −0.206687 0.978407i \(-0.566268\pi\)
−0.206687 + 0.978407i \(0.566268\pi\)
\(18\) 244.300 3.19900
\(19\) −19.0000 −0.229416
\(20\) −46.3825 −0.518573
\(21\) 130.967 1.36092
\(22\) 63.9911 0.620134
\(23\) −112.166 −1.01688 −0.508439 0.861098i \(-0.669777\pi\)
−0.508439 + 0.861098i \(0.669777\pi\)
\(24\) −427.535 −3.63626
\(25\) −118.151 −0.945206
\(26\) 238.155 1.79639
\(27\) −183.531 −1.30817
\(28\) −267.717 −1.80692
\(29\) 295.107 1.88966 0.944828 0.327565i \(-0.106228\pi\)
0.944828 + 0.327565i \(0.106228\pi\)
\(30\) 115.080 0.700352
\(31\) −57.6979 −0.334285 −0.167143 0.985933i \(-0.553454\pi\)
−0.167143 + 0.985933i \(0.553454\pi\)
\(32\) 154.862 0.855498
\(33\) −109.390 −0.577041
\(34\) −146.952 −0.741238
\(35\) 39.5333 0.190924
\(36\) 853.685 3.95225
\(37\) −341.167 −1.51588 −0.757940 0.652324i \(-0.773794\pi\)
−0.757940 + 0.652324i \(0.773794\pi\)
\(38\) −96.3636 −0.411375
\(39\) −407.117 −1.67156
\(40\) −129.055 −0.510134
\(41\) 274.056 1.04391 0.521955 0.852973i \(-0.325203\pi\)
0.521955 + 0.852973i \(0.325203\pi\)
\(42\) 664.233 2.44032
\(43\) 327.536 1.16160 0.580800 0.814046i \(-0.302740\pi\)
0.580800 + 0.814046i \(0.302740\pi\)
\(44\) 223.611 0.766151
\(45\) −126.062 −0.417605
\(46\) −568.879 −1.82341
\(47\) 139.140 0.431823 0.215912 0.976413i \(-0.430728\pi\)
0.215912 + 0.976413i \(0.430728\pi\)
\(48\) −939.106 −2.82392
\(49\) −114.816 −0.334741
\(50\) −599.234 −1.69489
\(51\) 251.209 0.689730
\(52\) 832.214 2.21937
\(53\) 296.715 0.769000 0.384500 0.923125i \(-0.374374\pi\)
0.384500 + 0.923125i \(0.374374\pi\)
\(54\) −930.828 −2.34574
\(55\) −33.0202 −0.0809536
\(56\) −744.897 −1.77752
\(57\) 164.730 0.382789
\(58\) 1496.72 3.38842
\(59\) 459.383 1.01367 0.506836 0.862043i \(-0.330815\pi\)
0.506836 + 0.862043i \(0.330815\pi\)
\(60\) 402.136 0.865258
\(61\) −232.911 −0.488873 −0.244436 0.969665i \(-0.578603\pi\)
−0.244436 + 0.969665i \(0.578603\pi\)
\(62\) −292.631 −0.599421
\(63\) −727.623 −1.45511
\(64\) −81.1127 −0.158423
\(65\) −122.891 −0.234505
\(66\) −554.801 −1.03472
\(67\) −320.784 −0.584926 −0.292463 0.956277i \(-0.594475\pi\)
−0.292463 + 0.956277i \(0.594475\pi\)
\(68\) −513.511 −0.915771
\(69\) 972.475 1.69670
\(70\) 200.504 0.342354
\(71\) −9.54518 −0.0159550 −0.00797749 0.999968i \(-0.502539\pi\)
−0.00797749 + 0.999968i \(0.502539\pi\)
\(72\) 2375.30 3.88793
\(73\) 320.868 0.514448 0.257224 0.966352i \(-0.417192\pi\)
0.257224 + 0.966352i \(0.417192\pi\)
\(74\) −1730.32 −2.71819
\(75\) 1024.37 1.57711
\(76\) −336.734 −0.508238
\(77\) −190.591 −0.282076
\(78\) −2064.80 −2.99735
\(79\) −89.2323 −0.127081 −0.0635406 0.997979i \(-0.520239\pi\)
−0.0635406 + 0.997979i \(0.520239\pi\)
\(80\) −283.476 −0.396170
\(81\) 290.661 0.398712
\(82\) 1389.95 1.87188
\(83\) −439.455 −0.581163 −0.290581 0.956850i \(-0.593849\pi\)
−0.290581 + 0.956850i \(0.593849\pi\)
\(84\) 2321.10 3.01492
\(85\) 75.8293 0.0967628
\(86\) 1661.19 2.08292
\(87\) −2558.58 −3.15297
\(88\) 622.176 0.753684
\(89\) 883.164 1.05186 0.525928 0.850529i \(-0.323718\pi\)
0.525928 + 0.850529i \(0.323718\pi\)
\(90\) −639.358 −0.748825
\(91\) −709.322 −0.817112
\(92\) −1987.90 −2.25275
\(93\) 500.240 0.557768
\(94\) 705.688 0.774321
\(95\) 49.7249 0.0537018
\(96\) −1342.65 −1.42743
\(97\) −1705.87 −1.78562 −0.892808 0.450437i \(-0.851268\pi\)
−0.892808 + 0.450437i \(0.851268\pi\)
\(98\) −582.321 −0.600237
\(99\) 607.748 0.616979
\(100\) −2093.97 −2.09397
\(101\) −961.422 −0.947178 −0.473589 0.880746i \(-0.657042\pi\)
−0.473589 + 0.880746i \(0.657042\pi\)
\(102\) 1274.07 1.23678
\(103\) 173.142 0.165633 0.0828166 0.996565i \(-0.473608\pi\)
0.0828166 + 0.996565i \(0.473608\pi\)
\(104\) 2315.55 2.18326
\(105\) −342.753 −0.318565
\(106\) 1504.87 1.37893
\(107\) 921.087 0.832194 0.416097 0.909320i \(-0.363398\pi\)
0.416097 + 0.909320i \(0.363398\pi\)
\(108\) −3252.70 −2.89807
\(109\) 552.454 0.485463 0.242731 0.970094i \(-0.421957\pi\)
0.242731 + 0.970094i \(0.421957\pi\)
\(110\) −167.471 −0.145161
\(111\) 2957.91 2.52930
\(112\) −1636.21 −1.38042
\(113\) −1395.26 −1.16155 −0.580774 0.814064i \(-0.697250\pi\)
−0.580774 + 0.814064i \(0.697250\pi\)
\(114\) 835.471 0.686395
\(115\) 293.549 0.238031
\(116\) 5230.15 4.18627
\(117\) 2261.86 1.78725
\(118\) 2329.89 1.81766
\(119\) 437.682 0.337162
\(120\) 1118.90 0.851179
\(121\) −1171.81 −0.880397
\(122\) −1181.27 −0.876618
\(123\) −2376.06 −1.74180
\(124\) −1022.57 −0.740562
\(125\) 636.350 0.455335
\(126\) −3690.34 −2.60922
\(127\) 793.013 0.554083 0.277041 0.960858i \(-0.410646\pi\)
0.277041 + 0.960858i \(0.410646\pi\)
\(128\) −1650.28 −1.13957
\(129\) −2839.73 −1.93818
\(130\) −623.277 −0.420500
\(131\) 25.0544 0.0167100 0.00835501 0.999965i \(-0.497340\pi\)
0.00835501 + 0.999965i \(0.497340\pi\)
\(132\) −1938.70 −1.27835
\(133\) 287.009 0.187119
\(134\) −1626.95 −1.04886
\(135\) 480.320 0.306218
\(136\) −1428.80 −0.900869
\(137\) −716.056 −0.446546 −0.223273 0.974756i \(-0.571674\pi\)
−0.223273 + 0.974756i \(0.571674\pi\)
\(138\) 4932.17 3.04242
\(139\) 666.566 0.406744 0.203372 0.979102i \(-0.434810\pi\)
0.203372 + 0.979102i \(0.434810\pi\)
\(140\) 700.643 0.422966
\(141\) −1206.34 −0.720514
\(142\) −48.4109 −0.0286095
\(143\) 592.462 0.346463
\(144\) 5217.47 3.01937
\(145\) −772.326 −0.442332
\(146\) 1627.37 0.922479
\(147\) 995.453 0.558528
\(148\) −6046.46 −3.35822
\(149\) −268.063 −0.147386 −0.0736931 0.997281i \(-0.523479\pi\)
−0.0736931 + 0.997281i \(0.523479\pi\)
\(150\) 5195.35 2.82799
\(151\) 2809.46 1.51411 0.757055 0.653352i \(-0.226638\pi\)
0.757055 + 0.653352i \(0.226638\pi\)
\(152\) −936.930 −0.499968
\(153\) −1395.66 −0.737468
\(154\) −966.633 −0.505802
\(155\) 151.001 0.0782498
\(156\) −7215.28 −3.70311
\(157\) −1999.77 −1.01656 −0.508278 0.861193i \(-0.669718\pi\)
−0.508278 + 0.861193i \(0.669718\pi\)
\(158\) −452.566 −0.227875
\(159\) −2572.52 −1.28311
\(160\) −405.289 −0.200256
\(161\) 1694.35 0.829400
\(162\) 1474.16 0.714946
\(163\) 1642.08 0.789064 0.394532 0.918882i \(-0.370907\pi\)
0.394532 + 0.918882i \(0.370907\pi\)
\(164\) 4857.05 2.31263
\(165\) 286.285 0.135074
\(166\) −2228.82 −1.04211
\(167\) 2965.92 1.37431 0.687155 0.726511i \(-0.258859\pi\)
0.687155 + 0.726511i \(0.258859\pi\)
\(168\) 6458.24 2.96586
\(169\) 7.96603 0.00362587
\(170\) 384.589 0.173509
\(171\) −915.203 −0.409283
\(172\) 5804.88 2.57336
\(173\) 92.7872 0.0407773 0.0203887 0.999792i \(-0.493510\pi\)
0.0203887 + 0.999792i \(0.493510\pi\)
\(174\) −12976.5 −5.65372
\(175\) 1784.76 0.770943
\(176\) 1366.65 0.585311
\(177\) −3982.84 −1.69135
\(178\) 4479.21 1.88613
\(179\) −3294.07 −1.37548 −0.687738 0.725959i \(-0.741396\pi\)
−0.687738 + 0.725959i \(0.741396\pi\)
\(180\) −2234.18 −0.925145
\(181\) 3590.17 1.47434 0.737168 0.675709i \(-0.236162\pi\)
0.737168 + 0.675709i \(0.236162\pi\)
\(182\) −3597.52 −1.46520
\(183\) 2019.34 0.815703
\(184\) −5531.13 −2.21609
\(185\) 892.870 0.354838
\(186\) 2537.10 1.00016
\(187\) −365.574 −0.142960
\(188\) 2465.96 0.956643
\(189\) 2772.38 1.06699
\(190\) 252.194 0.0962950
\(191\) 480.480 0.182023 0.0910114 0.995850i \(-0.470990\pi\)
0.0910114 + 0.995850i \(0.470990\pi\)
\(192\) 703.246 0.264335
\(193\) 3504.07 1.30688 0.653442 0.756977i \(-0.273325\pi\)
0.653442 + 0.756977i \(0.273325\pi\)
\(194\) −8651.78 −3.20186
\(195\) 1065.47 0.391280
\(196\) −2034.87 −0.741570
\(197\) 603.790 0.218367 0.109183 0.994022i \(-0.465176\pi\)
0.109183 + 0.994022i \(0.465176\pi\)
\(198\) 3082.36 1.10633
\(199\) 3063.80 1.09139 0.545695 0.837984i \(-0.316266\pi\)
0.545695 + 0.837984i \(0.316266\pi\)
\(200\) −5826.27 −2.05990
\(201\) 2781.20 0.975972
\(202\) −4876.11 −1.69843
\(203\) −4457.82 −1.54127
\(204\) 4452.13 1.52800
\(205\) −717.232 −0.244359
\(206\) 878.139 0.297004
\(207\) −5402.87 −1.81413
\(208\) 5086.24 1.69552
\(209\) −239.725 −0.0793403
\(210\) −1738.37 −0.571231
\(211\) −2772.16 −0.904470 −0.452235 0.891899i \(-0.649373\pi\)
−0.452235 + 0.891899i \(0.649373\pi\)
\(212\) 5258.65 1.70361
\(213\) 82.7565 0.0266215
\(214\) 4671.54 1.49224
\(215\) −857.196 −0.271908
\(216\) −9050.32 −2.85091
\(217\) 871.571 0.272655
\(218\) 2801.92 0.870504
\(219\) −2781.92 −0.858377
\(220\) −585.213 −0.179341
\(221\) −1360.56 −0.414122
\(222\) 15001.9 4.53540
\(223\) −5653.47 −1.69769 −0.848844 0.528644i \(-0.822701\pi\)
−0.848844 + 0.528644i \(0.822701\pi\)
\(224\) −2339.30 −0.697773
\(225\) −5691.16 −1.68627
\(226\) −7076.44 −2.08282
\(227\) −5083.00 −1.48621 −0.743106 0.669173i \(-0.766648\pi\)
−0.743106 + 0.669173i \(0.766648\pi\)
\(228\) 2919.48 0.848015
\(229\) 501.966 0.144851 0.0724254 0.997374i \(-0.476926\pi\)
0.0724254 + 0.997374i \(0.476926\pi\)
\(230\) 1488.82 0.426824
\(231\) 1652.42 0.470655
\(232\) 14552.4 4.11815
\(233\) 2809.38 0.789909 0.394955 0.918701i \(-0.370760\pi\)
0.394955 + 0.918701i \(0.370760\pi\)
\(234\) 11471.6 3.20480
\(235\) −364.144 −0.101082
\(236\) 8141.58 2.24564
\(237\) 773.642 0.212040
\(238\) 2219.82 0.604579
\(239\) 2239.56 0.606130 0.303065 0.952970i \(-0.401990\pi\)
0.303065 + 0.952970i \(0.401990\pi\)
\(240\) 2457.74 0.661026
\(241\) −7214.25 −1.92826 −0.964130 0.265431i \(-0.914486\pi\)
−0.964130 + 0.265431i \(0.914486\pi\)
\(242\) −5943.15 −1.57868
\(243\) 2435.32 0.642905
\(244\) −4127.85 −1.08303
\(245\) 300.485 0.0783563
\(246\) −12050.8 −3.12330
\(247\) −892.184 −0.229831
\(248\) −2845.21 −0.728511
\(249\) 3810.07 0.969693
\(250\) 3227.42 0.816481
\(251\) 6212.82 1.56235 0.781174 0.624313i \(-0.214621\pi\)
0.781174 + 0.624313i \(0.214621\pi\)
\(252\) −12895.6 −3.22359
\(253\) −1415.21 −0.351673
\(254\) 4021.98 0.993549
\(255\) −657.438 −0.161453
\(256\) −7720.93 −1.88499
\(257\) −2796.37 −0.678727 −0.339364 0.940655i \(-0.610212\pi\)
−0.339364 + 0.940655i \(0.610212\pi\)
\(258\) −14402.5 −3.47542
\(259\) 5153.59 1.23640
\(260\) −2177.99 −0.519512
\(261\) 14214.9 3.37119
\(262\) 127.070 0.0299634
\(263\) 2976.00 0.697748 0.348874 0.937170i \(-0.386564\pi\)
0.348874 + 0.937170i \(0.386564\pi\)
\(264\) −5394.26 −1.25755
\(265\) −776.534 −0.180008
\(266\) 1455.65 0.335532
\(267\) −7657.02 −1.75506
\(268\) −5685.22 −1.29582
\(269\) −25.4734 −0.00577376 −0.00288688 0.999996i \(-0.500919\pi\)
−0.00288688 + 0.999996i \(0.500919\pi\)
\(270\) 2436.07 0.549091
\(271\) −4338.19 −0.972421 −0.486211 0.873842i \(-0.661621\pi\)
−0.486211 + 0.873842i \(0.661621\pi\)
\(272\) −3138.43 −0.699615
\(273\) 6149.81 1.36338
\(274\) −3631.67 −0.800720
\(275\) −1490.72 −0.326887
\(276\) 17235.0 3.75880
\(277\) 4276.02 0.927514 0.463757 0.885962i \(-0.346501\pi\)
0.463757 + 0.885962i \(0.346501\pi\)
\(278\) 3380.67 0.729349
\(279\) −2779.23 −0.596373
\(280\) 1949.47 0.416083
\(281\) −3716.43 −0.788980 −0.394490 0.918900i \(-0.629079\pi\)
−0.394490 + 0.918900i \(0.629079\pi\)
\(282\) −6118.30 −1.29198
\(283\) 3748.01 0.787265 0.393633 0.919268i \(-0.371218\pi\)
0.393633 + 0.919268i \(0.371218\pi\)
\(284\) −169.168 −0.0353460
\(285\) −431.114 −0.0896035
\(286\) 3004.83 0.621257
\(287\) −4139.82 −0.851449
\(288\) 7459.46 1.52623
\(289\) −4073.48 −0.829122
\(290\) −3917.06 −0.793165
\(291\) 14789.9 2.97937
\(292\) 5686.69 1.13969
\(293\) 8210.10 1.63699 0.818497 0.574510i \(-0.194808\pi\)
0.818497 + 0.574510i \(0.194808\pi\)
\(294\) 5048.71 1.00152
\(295\) −1202.25 −0.237281
\(296\) −16823.7 −3.30357
\(297\) −2315.63 −0.452413
\(298\) −1359.55 −0.264284
\(299\) −5266.98 −1.01872
\(300\) 18154.7 3.49387
\(301\) −4947.69 −0.947442
\(302\) 14248.9 2.71501
\(303\) 8335.51 1.58040
\(304\) −2058.02 −0.388275
\(305\) 609.553 0.114436
\(306\) −7078.48 −1.32238
\(307\) −2814.79 −0.523285 −0.261642 0.965165i \(-0.584264\pi\)
−0.261642 + 0.965165i \(0.584264\pi\)
\(308\) −3377.82 −0.624899
\(309\) −1501.14 −0.276366
\(310\) 765.844 0.140313
\(311\) −8650.75 −1.57730 −0.788648 0.614845i \(-0.789218\pi\)
−0.788648 + 0.614845i \(0.789218\pi\)
\(312\) −20075.8 −3.64285
\(313\) 1623.48 0.293178 0.146589 0.989197i \(-0.453171\pi\)
0.146589 + 0.989197i \(0.453171\pi\)
\(314\) −10142.4 −1.82283
\(315\) 1904.26 0.340613
\(316\) −1581.45 −0.281530
\(317\) 9372.31 1.66057 0.830286 0.557337i \(-0.188177\pi\)
0.830286 + 0.557337i \(0.188177\pi\)
\(318\) −13047.2 −2.30079
\(319\) 3723.40 0.653512
\(320\) 212.280 0.0370838
\(321\) −7985.80 −1.38855
\(322\) 8593.35 1.48723
\(323\) 550.516 0.0948344
\(324\) 5151.34 0.883289
\(325\) −5548.01 −0.946918
\(326\) 8328.24 1.41490
\(327\) −4789.76 −0.810014
\(328\) 13514.3 2.27500
\(329\) −2101.82 −0.352210
\(330\) 1451.97 0.242207
\(331\) −1765.55 −0.293182 −0.146591 0.989197i \(-0.546830\pi\)
−0.146591 + 0.989197i \(0.546830\pi\)
\(332\) −7788.41 −1.28748
\(333\) −16433.5 −2.70436
\(334\) 15042.5 2.46433
\(335\) 839.526 0.136920
\(336\) 14185.9 2.30329
\(337\) 10189.8 1.64711 0.823555 0.567237i \(-0.191988\pi\)
0.823555 + 0.567237i \(0.191988\pi\)
\(338\) 40.4019 0.00650169
\(339\) 12096.9 1.93809
\(340\) 1343.91 0.214364
\(341\) −727.980 −0.115608
\(342\) −4641.70 −0.733902
\(343\) 6915.66 1.08866
\(344\) 16151.5 2.53149
\(345\) −2545.07 −0.397165
\(346\) 470.595 0.0731195
\(347\) −11350.2 −1.75594 −0.877971 0.478714i \(-0.841103\pi\)
−0.877971 + 0.478714i \(0.841103\pi\)
\(348\) −45345.3 −6.98495
\(349\) 511.619 0.0784709 0.0392354 0.999230i \(-0.487508\pi\)
0.0392354 + 0.999230i \(0.487508\pi\)
\(350\) 9051.88 1.38241
\(351\) −8618.09 −1.31054
\(352\) 1953.90 0.295862
\(353\) 816.097 0.123049 0.0615247 0.998106i \(-0.480404\pi\)
0.0615247 + 0.998106i \(0.480404\pi\)
\(354\) −20200.1 −3.03283
\(355\) 24.9807 0.00373475
\(356\) 15652.2 2.33024
\(357\) −3794.70 −0.562567
\(358\) −16706.8 −2.46642
\(359\) 3998.35 0.587813 0.293906 0.955834i \(-0.405045\pi\)
0.293906 + 0.955834i \(0.405045\pi\)
\(360\) −6216.39 −0.910090
\(361\) 361.000 0.0526316
\(362\) 18208.5 2.64369
\(363\) 10159.6 1.46898
\(364\) −12571.2 −1.81019
\(365\) −839.744 −0.120422
\(366\) 10241.6 1.46267
\(367\) −3123.19 −0.444221 −0.222111 0.975021i \(-0.571295\pi\)
−0.222111 + 0.975021i \(0.571295\pi\)
\(368\) −12149.5 −1.72102
\(369\) 13200.9 1.86236
\(370\) 4528.43 0.636276
\(371\) −4482.11 −0.627223
\(372\) 8865.68 1.23566
\(373\) −7026.28 −0.975354 −0.487677 0.873024i \(-0.662156\pi\)
−0.487677 + 0.873024i \(0.662156\pi\)
\(374\) −1854.11 −0.256347
\(375\) −5517.15 −0.759745
\(376\) 6861.30 0.941076
\(377\) 13857.4 1.89308
\(378\) 14060.9 1.91326
\(379\) −11595.9 −1.57162 −0.785808 0.618470i \(-0.787753\pi\)
−0.785808 + 0.618470i \(0.787753\pi\)
\(380\) 881.268 0.118969
\(381\) −6875.41 −0.924508
\(382\) 2436.89 0.326393
\(383\) −10962.4 −1.46254 −0.731268 0.682091i \(-0.761071\pi\)
−0.731268 + 0.682091i \(0.761071\pi\)
\(384\) 14307.9 1.90142
\(385\) 498.796 0.0660286
\(386\) 17771.8 2.34343
\(387\) 15777.0 2.07232
\(388\) −30232.9 −3.95578
\(389\) 7126.21 0.928825 0.464413 0.885619i \(-0.346265\pi\)
0.464413 + 0.885619i \(0.346265\pi\)
\(390\) 5403.80 0.701621
\(391\) 3249.95 0.420350
\(392\) −5661.82 −0.729503
\(393\) −217.221 −0.0278813
\(394\) 3062.29 0.391563
\(395\) 233.530 0.0297473
\(396\) 10771.0 1.36683
\(397\) 4895.59 0.618899 0.309449 0.950916i \(-0.399855\pi\)
0.309449 + 0.950916i \(0.399855\pi\)
\(398\) 15538.9 1.95702
\(399\) −2488.37 −0.312216
\(400\) −12797.7 −1.59972
\(401\) −6148.05 −0.765634 −0.382817 0.923824i \(-0.625046\pi\)
−0.382817 + 0.923824i \(0.625046\pi\)
\(402\) 14105.6 1.75006
\(403\) −2709.32 −0.334891
\(404\) −17039.1 −2.09834
\(405\) −760.689 −0.0933307
\(406\) −22609.0 −2.76371
\(407\) −4304.54 −0.524246
\(408\) 12387.6 1.50313
\(409\) 2968.47 0.358878 0.179439 0.983769i \(-0.442572\pi\)
0.179439 + 0.983769i \(0.442572\pi\)
\(410\) −3637.64 −0.438171
\(411\) 6208.19 0.745079
\(412\) 3068.58 0.366937
\(413\) −6939.33 −0.826785
\(414\) −27402.1 −3.25300
\(415\) 1150.10 0.136039
\(416\) 7271.85 0.857047
\(417\) −5779.12 −0.678668
\(418\) −1215.83 −0.142268
\(419\) −11101.1 −1.29432 −0.647162 0.762352i \(-0.724044\pi\)
−0.647162 + 0.762352i \(0.724044\pi\)
\(420\) −6074.57 −0.705734
\(421\) 3241.73 0.375278 0.187639 0.982238i \(-0.439916\pi\)
0.187639 + 0.982238i \(0.439916\pi\)
\(422\) −14059.7 −1.62184
\(423\) 6702.19 0.770382
\(424\) 14631.7 1.67589
\(425\) 3423.36 0.390723
\(426\) 419.722 0.0477361
\(427\) 3518.30 0.398741
\(428\) 16324.3 1.84361
\(429\) −5136.64 −0.578086
\(430\) −4347.50 −0.487570
\(431\) 290.271 0.0324405 0.0162202 0.999868i \(-0.494837\pi\)
0.0162202 + 0.999868i \(0.494837\pi\)
\(432\) −19879.5 −2.21402
\(433\) 2104.16 0.233533 0.116766 0.993159i \(-0.462747\pi\)
0.116766 + 0.993159i \(0.462747\pi\)
\(434\) 4420.41 0.488909
\(435\) 6696.05 0.738049
\(436\) 9791.06 1.07547
\(437\) 2131.15 0.233288
\(438\) −14109.2 −1.53919
\(439\) 4013.82 0.436376 0.218188 0.975907i \(-0.429985\pi\)
0.218188 + 0.975907i \(0.429985\pi\)
\(440\) −1628.30 −0.176423
\(441\) −5530.53 −0.597185
\(442\) −6900.44 −0.742580
\(443\) 12013.8 1.28847 0.644236 0.764827i \(-0.277176\pi\)
0.644236 + 0.764827i \(0.277176\pi\)
\(444\) 52422.7 5.60331
\(445\) −2311.33 −0.246219
\(446\) −28673.1 −3.04419
\(447\) 2324.10 0.245920
\(448\) 1225.27 0.129215
\(449\) 4281.55 0.450020 0.225010 0.974356i \(-0.427759\pi\)
0.225010 + 0.974356i \(0.427759\pi\)
\(450\) −28864.2 −3.02372
\(451\) 3457.79 0.361022
\(452\) −24728.0 −2.57325
\(453\) −24358.0 −2.52635
\(454\) −25779.8 −2.66499
\(455\) 1856.37 0.191270
\(456\) 8123.17 0.834215
\(457\) 293.330 0.0300249 0.0150125 0.999887i \(-0.495221\pi\)
0.0150125 + 0.999887i \(0.495221\pi\)
\(458\) 2545.85 0.259738
\(459\) 5317.73 0.540763
\(460\) 5202.53 0.527325
\(461\) −5267.87 −0.532210 −0.266105 0.963944i \(-0.585737\pi\)
−0.266105 + 0.963944i \(0.585737\pi\)
\(462\) 8380.69 0.843951
\(463\) 8076.98 0.810733 0.405366 0.914154i \(-0.367144\pi\)
0.405366 + 0.914154i \(0.367144\pi\)
\(464\) 31965.1 3.19815
\(465\) −1309.18 −0.130563
\(466\) 14248.5 1.41642
\(467\) −3160.43 −0.313163 −0.156582 0.987665i \(-0.550047\pi\)
−0.156582 + 0.987665i \(0.550047\pi\)
\(468\) 40086.5 3.95940
\(469\) 4845.69 0.477086
\(470\) −1846.86 −0.181254
\(471\) 17338.0 1.69616
\(472\) 22653.2 2.20910
\(473\) 4132.56 0.401724
\(474\) 3923.74 0.380218
\(475\) 2244.86 0.216845
\(476\) 7756.98 0.746934
\(477\) 14292.4 1.37191
\(478\) 11358.5 1.08688
\(479\) −249.277 −0.0237782 −0.0118891 0.999929i \(-0.503785\pi\)
−0.0118891 + 0.999929i \(0.503785\pi\)
\(480\) 3513.85 0.334134
\(481\) −16020.2 −1.51863
\(482\) −36589.0 −3.45764
\(483\) −14690.0 −1.38389
\(484\) −20767.8 −1.95039
\(485\) 4464.44 0.417979
\(486\) 12351.4 1.15282
\(487\) 7265.71 0.676059 0.338029 0.941136i \(-0.390240\pi\)
0.338029 + 0.941136i \(0.390240\pi\)
\(488\) −11485.4 −1.06540
\(489\) −14236.8 −1.31658
\(490\) 1523.99 0.140504
\(491\) −8456.47 −0.777261 −0.388630 0.921394i \(-0.627052\pi\)
−0.388630 + 0.921394i \(0.627052\pi\)
\(492\) −42110.5 −3.85872
\(493\) −8550.59 −0.781134
\(494\) −4524.95 −0.412120
\(495\) −1590.54 −0.144423
\(496\) −6249.66 −0.565762
\(497\) 144.187 0.0130134
\(498\) 19323.8 1.73880
\(499\) 1905.15 0.170914 0.0854571 0.996342i \(-0.472765\pi\)
0.0854571 + 0.996342i \(0.472765\pi\)
\(500\) 11278.0 1.00873
\(501\) −25714.5 −2.29309
\(502\) 31510.0 2.80151
\(503\) 6082.63 0.539187 0.269593 0.962974i \(-0.413111\pi\)
0.269593 + 0.962974i \(0.413111\pi\)
\(504\) −35880.6 −3.17113
\(505\) 2516.14 0.221716
\(506\) −7177.61 −0.630600
\(507\) −69.0653 −0.00604990
\(508\) 14054.5 1.22749
\(509\) 13858.9 1.20684 0.603422 0.797422i \(-0.293803\pi\)
0.603422 + 0.797422i \(0.293803\pi\)
\(510\) −3334.38 −0.289507
\(511\) −4846.95 −0.419602
\(512\) −25956.6 −2.24049
\(513\) 3487.09 0.300115
\(514\) −14182.6 −1.21705
\(515\) −453.131 −0.0387716
\(516\) −50328.2 −4.29375
\(517\) 1755.55 0.149340
\(518\) 26137.8 2.21705
\(519\) −804.463 −0.0680385
\(520\) −6060.04 −0.511058
\(521\) 4086.72 0.343651 0.171826 0.985127i \(-0.445033\pi\)
0.171826 + 0.985127i \(0.445033\pi\)
\(522\) 72094.7 6.04502
\(523\) 20188.4 1.68791 0.843957 0.536411i \(-0.180220\pi\)
0.843957 + 0.536411i \(0.180220\pi\)
\(524\) 444.036 0.0370187
\(525\) −15473.8 −1.28635
\(526\) 15093.6 1.25116
\(527\) 1671.77 0.138185
\(528\) −11848.8 −0.976615
\(529\) 414.164 0.0340399
\(530\) −3938.40 −0.322780
\(531\) 22127.8 1.80841
\(532\) 5086.63 0.414536
\(533\) 12868.9 1.04580
\(534\) −38834.7 −3.14708
\(535\) −2410.58 −0.194801
\(536\) −15818.6 −1.27473
\(537\) 28559.5 2.29503
\(538\) −129.195 −0.0103532
\(539\) −1448.65 −0.115765
\(540\) 8512.64 0.678381
\(541\) 16356.6 1.29986 0.649932 0.759992i \(-0.274797\pi\)
0.649932 + 0.759992i \(0.274797\pi\)
\(542\) −22002.3 −1.74369
\(543\) −31126.7 −2.45999
\(544\) −4487.04 −0.353640
\(545\) −1445.83 −0.113638
\(546\) 31190.4 2.44474
\(547\) −12751.0 −0.996697 −0.498349 0.866977i \(-0.666060\pi\)
−0.498349 + 0.866977i \(0.666060\pi\)
\(548\) −12690.6 −0.989259
\(549\) −11219.0 −0.872159
\(550\) −7560.59 −0.586154
\(551\) −5607.04 −0.433517
\(552\) 47954.8 3.69763
\(553\) 1347.92 0.103652
\(554\) 21687.0 1.66316
\(555\) −7741.17 −0.592062
\(556\) 11813.5 0.901083
\(557\) −7353.77 −0.559406 −0.279703 0.960087i \(-0.590236\pi\)
−0.279703 + 0.960087i \(0.590236\pi\)
\(558\) −14095.6 −1.06938
\(559\) 15380.1 1.16370
\(560\) 4282.13 0.323130
\(561\) 3169.52 0.238534
\(562\) −18848.9 −1.41475
\(563\) −5597.74 −0.419035 −0.209517 0.977805i \(-0.567189\pi\)
−0.209517 + 0.977805i \(0.567189\pi\)
\(564\) −21379.9 −1.59620
\(565\) 3651.54 0.271896
\(566\) 19009.0 1.41168
\(567\) −4390.65 −0.325203
\(568\) −470.693 −0.0347708
\(569\) −19640.2 −1.44703 −0.723515 0.690309i \(-0.757475\pi\)
−0.723515 + 0.690309i \(0.757475\pi\)
\(570\) −2186.51 −0.160672
\(571\) −9749.71 −0.714558 −0.357279 0.933998i \(-0.616295\pi\)
−0.357279 + 0.933998i \(0.616295\pi\)
\(572\) 10500.1 0.767539
\(573\) −4165.76 −0.303712
\(574\) −20996.2 −1.52677
\(575\) 13252.5 0.961159
\(576\) −3907.09 −0.282631
\(577\) 11197.9 0.807927 0.403964 0.914775i \(-0.367632\pi\)
0.403964 + 0.914775i \(0.367632\pi\)
\(578\) −20659.7 −1.48673
\(579\) −30380.2 −2.18059
\(580\) −13687.8 −0.979924
\(581\) 6638.31 0.474016
\(582\) 75010.8 5.34243
\(583\) 3743.69 0.265948
\(584\) 15822.7 1.12114
\(585\) −5919.51 −0.418362
\(586\) 41639.8 2.93536
\(587\) −18654.4 −1.31167 −0.655833 0.754906i \(-0.727682\pi\)
−0.655833 + 0.754906i \(0.727682\pi\)
\(588\) 17642.3 1.23734
\(589\) 1096.26 0.0766903
\(590\) −6097.55 −0.425478
\(591\) −5234.85 −0.364354
\(592\) −36954.2 −2.56555
\(593\) 21513.4 1.48980 0.744900 0.667176i \(-0.232497\pi\)
0.744900 + 0.667176i \(0.232497\pi\)
\(594\) −11744.4 −0.811240
\(595\) −1145.46 −0.0789231
\(596\) −4750.84 −0.326513
\(597\) −26563.1 −1.82103
\(598\) −26712.9 −1.82671
\(599\) 22762.8 1.55269 0.776346 0.630308i \(-0.217071\pi\)
0.776346 + 0.630308i \(0.217071\pi\)
\(600\) 50513.6 3.43702
\(601\) −13941.0 −0.946195 −0.473098 0.881010i \(-0.656864\pi\)
−0.473098 + 0.881010i \(0.656864\pi\)
\(602\) −25093.5 −1.69890
\(603\) −15451.7 −1.04352
\(604\) 49791.6 3.35429
\(605\) 3066.74 0.206084
\(606\) 42275.8 2.83389
\(607\) 8031.64 0.537058 0.268529 0.963272i \(-0.413462\pi\)
0.268529 + 0.963272i \(0.413462\pi\)
\(608\) −2942.37 −0.196265
\(609\) 38649.2 2.57167
\(610\) 3091.51 0.205199
\(611\) 6533.62 0.432606
\(612\) −24735.1 −1.63375
\(613\) −19429.7 −1.28019 −0.640095 0.768296i \(-0.721105\pi\)
−0.640095 + 0.768296i \(0.721105\pi\)
\(614\) −14276.0 −0.938324
\(615\) 6218.39 0.407723
\(616\) −9398.44 −0.614731
\(617\) −11264.0 −0.734959 −0.367480 0.930032i \(-0.619779\pi\)
−0.367480 + 0.930032i \(0.619779\pi\)
\(618\) −7613.45 −0.495563
\(619\) −22183.9 −1.44046 −0.720231 0.693734i \(-0.755964\pi\)
−0.720231 + 0.693734i \(0.755964\pi\)
\(620\) 2676.18 0.173351
\(621\) 20585.9 1.33025
\(622\) −43874.6 −2.82831
\(623\) −13340.9 −0.857930
\(624\) −44097.6 −2.82904
\(625\) 13103.5 0.838621
\(626\) 8233.93 0.525710
\(627\) 2078.41 0.132382
\(628\) −35441.7 −2.25204
\(629\) 9885.16 0.626625
\(630\) 9657.99 0.610768
\(631\) −23139.3 −1.45984 −0.729920 0.683532i \(-0.760443\pi\)
−0.729920 + 0.683532i \(0.760443\pi\)
\(632\) −4400.23 −0.276949
\(633\) 24034.5 1.50914
\(634\) 47534.2 2.97764
\(635\) −2075.40 −0.129700
\(636\) −45592.4 −2.84254
\(637\) −5391.42 −0.335347
\(638\) 18884.2 1.17184
\(639\) −459.778 −0.0284640
\(640\) 4318.95 0.266752
\(641\) −4988.45 −0.307382 −0.153691 0.988119i \(-0.549116\pi\)
−0.153691 + 0.988119i \(0.549116\pi\)
\(642\) −40502.2 −2.48986
\(643\) −11115.2 −0.681712 −0.340856 0.940115i \(-0.610717\pi\)
−0.340856 + 0.940115i \(0.610717\pi\)
\(644\) 30028.7 1.83742
\(645\) 7431.88 0.453690
\(646\) 2792.09 0.170052
\(647\) 11916.2 0.724071 0.362036 0.932164i \(-0.382082\pi\)
0.362036 + 0.932164i \(0.382082\pi\)
\(648\) 14333.1 0.868915
\(649\) 5796.09 0.350564
\(650\) −28138.3 −1.69796
\(651\) −7556.50 −0.454935
\(652\) 29102.3 1.74806
\(653\) −18100.5 −1.08473 −0.542363 0.840144i \(-0.682470\pi\)
−0.542363 + 0.840144i \(0.682470\pi\)
\(654\) −24292.6 −1.45247
\(655\) −65.5699 −0.00391149
\(656\) 29684.9 1.76677
\(657\) 15455.7 0.917787
\(658\) −10659.9 −0.631562
\(659\) 331.740 0.0196096 0.00980481 0.999952i \(-0.496879\pi\)
0.00980481 + 0.999952i \(0.496879\pi\)
\(660\) 5073.79 0.299238
\(661\) −30555.8 −1.79801 −0.899004 0.437939i \(-0.855708\pi\)
−0.899004 + 0.437939i \(0.855708\pi\)
\(662\) −8954.46 −0.525717
\(663\) 11796.0 0.690979
\(664\) −21670.5 −1.26653
\(665\) −751.133 −0.0438010
\(666\) −83347.2 −4.84931
\(667\) −33100.9 −1.92155
\(668\) 52564.6 3.04459
\(669\) 49015.5 2.83266
\(670\) 4257.88 0.245517
\(671\) −2938.67 −0.169070
\(672\) 20281.7 1.16426
\(673\) 3261.14 0.186787 0.0933936 0.995629i \(-0.470228\pi\)
0.0933936 + 0.995629i \(0.470228\pi\)
\(674\) 51680.5 2.95350
\(675\) 21684.4 1.23649
\(676\) 141.181 0.00803259
\(677\) 11556.6 0.656063 0.328031 0.944667i \(-0.393615\pi\)
0.328031 + 0.944667i \(0.393615\pi\)
\(678\) 61352.6 3.47527
\(679\) 25768.5 1.45641
\(680\) 3739.30 0.210876
\(681\) 44069.5 2.47980
\(682\) −3692.15 −0.207302
\(683\) 19704.1 1.10389 0.551944 0.833881i \(-0.313886\pi\)
0.551944 + 0.833881i \(0.313886\pi\)
\(684\) −16220.0 −0.906707
\(685\) 1873.99 0.104528
\(686\) 35074.6 1.95212
\(687\) −4352.03 −0.241689
\(688\) 35477.7 1.96595
\(689\) 13932.9 0.770393
\(690\) −12908.0 −0.712173
\(691\) −2956.51 −0.162765 −0.0813827 0.996683i \(-0.525934\pi\)
−0.0813827 + 0.996683i \(0.525934\pi\)
\(692\) 1644.45 0.0903364
\(693\) −9180.49 −0.503230
\(694\) −57565.7 −3.14865
\(695\) −1744.47 −0.0952109
\(696\) −126169. −6.87129
\(697\) −7940.63 −0.431525
\(698\) 2594.81 0.140709
\(699\) −24357.3 −1.31799
\(700\) 31631.0 1.70791
\(701\) 29022.1 1.56370 0.781848 0.623469i \(-0.214277\pi\)
0.781848 + 0.623469i \(0.214277\pi\)
\(702\) −43709.0 −2.34998
\(703\) 6482.18 0.347767
\(704\) −1023.41 −0.0547885
\(705\) 3157.13 0.168658
\(706\) 4139.05 0.220645
\(707\) 14523.0 0.772551
\(708\) −70587.4 −3.74694
\(709\) −5110.64 −0.270711 −0.135356 0.990797i \(-0.543218\pi\)
−0.135356 + 0.990797i \(0.543218\pi\)
\(710\) 126.696 0.00669694
\(711\) −4298.19 −0.226716
\(712\) 43550.7 2.29232
\(713\) 6471.73 0.339927
\(714\) −19245.8 −1.00876
\(715\) −1550.53 −0.0811003
\(716\) −58380.3 −3.04717
\(717\) −19416.9 −1.01135
\(718\) 20278.7 1.05403
\(719\) −25225.9 −1.30844 −0.654219 0.756305i \(-0.727002\pi\)
−0.654219 + 0.756305i \(0.727002\pi\)
\(720\) −13654.7 −0.706777
\(721\) −2615.45 −0.135096
\(722\) 1830.91 0.0943759
\(723\) 62547.4 3.21738
\(724\) 63628.0 3.26618
\(725\) −34867.2 −1.78612
\(726\) 51527.0 2.63408
\(727\) −12817.7 −0.653893 −0.326947 0.945043i \(-0.606020\pi\)
−0.326947 + 0.945043i \(0.606020\pi\)
\(728\) −34978.2 −1.78074
\(729\) −28962.0 −1.47142
\(730\) −4258.99 −0.215935
\(731\) −9490.21 −0.480175
\(732\) 35788.4 1.80707
\(733\) −15307.5 −0.771342 −0.385671 0.922636i \(-0.626030\pi\)
−0.385671 + 0.922636i \(0.626030\pi\)
\(734\) −15840.1 −0.796551
\(735\) −2605.20 −0.130741
\(736\) −17370.2 −0.869936
\(737\) −4047.37 −0.202289
\(738\) 66951.8 3.33947
\(739\) 34340.1 1.70936 0.854682 0.519152i \(-0.173752\pi\)
0.854682 + 0.519152i \(0.173752\pi\)
\(740\) 15824.2 0.786094
\(741\) 7735.22 0.383482
\(742\) −22732.2 −1.12470
\(743\) −1883.40 −0.0929948 −0.0464974 0.998918i \(-0.514806\pi\)
−0.0464974 + 0.998918i \(0.514806\pi\)
\(744\) 24667.9 1.21555
\(745\) 701.547 0.0345003
\(746\) −35635.7 −1.74895
\(747\) −21167.9 −1.03681
\(748\) −6479.03 −0.316707
\(749\) −13913.7 −0.678766
\(750\) −27981.7 −1.36233
\(751\) −9431.98 −0.458292 −0.229146 0.973392i \(-0.573593\pi\)
−0.229146 + 0.973392i \(0.573593\pi\)
\(752\) 15071.2 0.730840
\(753\) −53865.0 −2.60684
\(754\) 70281.4 3.39456
\(755\) −7352.64 −0.354424
\(756\) 49134.5 2.36376
\(757\) −12355.0 −0.593196 −0.296598 0.955002i \(-0.595852\pi\)
−0.296598 + 0.955002i \(0.595852\pi\)
\(758\) −58811.9 −2.81813
\(759\) 12269.8 0.586780
\(760\) 2452.04 0.117033
\(761\) −27257.6 −1.29841 −0.649204 0.760614i \(-0.724898\pi\)
−0.649204 + 0.760614i \(0.724898\pi\)
\(762\) −34870.5 −1.65777
\(763\) −8345.23 −0.395960
\(764\) 8515.49 0.403246
\(765\) 3652.59 0.172627
\(766\) −55598.6 −2.62253
\(767\) 21571.3 1.01551
\(768\) 66940.3 3.14518
\(769\) −1191.72 −0.0558835 −0.0279418 0.999610i \(-0.508895\pi\)
−0.0279418 + 0.999610i \(0.508895\pi\)
\(770\) 2529.78 0.118399
\(771\) 24244.5 1.13248
\(772\) 62102.1 2.89521
\(773\) −7481.03 −0.348091 −0.174045 0.984738i \(-0.555684\pi\)
−0.174045 + 0.984738i \(0.555684\pi\)
\(774\) 80017.2 3.71597
\(775\) 6817.05 0.315969
\(776\) −84120.1 −3.89141
\(777\) −44681.5 −2.06299
\(778\) 36142.5 1.66552
\(779\) −5207.06 −0.239489
\(780\) 18883.1 0.866826
\(781\) −120.432 −0.00551781
\(782\) 16483.0 0.753748
\(783\) −54161.4 −2.47199
\(784\) −12436.5 −0.566532
\(785\) 5233.61 0.237956
\(786\) −1101.70 −0.0499952
\(787\) 27403.6 1.24121 0.620604 0.784124i \(-0.286887\pi\)
0.620604 + 0.784124i \(0.286887\pi\)
\(788\) 10700.9 0.483761
\(789\) −25801.8 −1.16422
\(790\) 1184.41 0.0533411
\(791\) 21076.5 0.947399
\(792\) 29969.3 1.34459
\(793\) −10936.8 −0.489758
\(794\) 24829.3 1.10977
\(795\) 6732.54 0.300350
\(796\) 54299.2 2.41782
\(797\) 30558.5 1.35814 0.679070 0.734073i \(-0.262383\pi\)
0.679070 + 0.734073i \(0.262383\pi\)
\(798\) −12620.4 −0.559847
\(799\) −4031.52 −0.178504
\(800\) −18297.0 −0.808622
\(801\) 42540.8 1.87654
\(802\) −31181.5 −1.37289
\(803\) 4048.42 0.177915
\(804\) 49290.7 2.16213
\(805\) −4434.29 −0.194147
\(806\) −13741.1 −0.600507
\(807\) 220.854 0.00963374
\(808\) −47409.7 −2.06419
\(809\) −28018.7 −1.21766 −0.608829 0.793302i \(-0.708360\pi\)
−0.608829 + 0.793302i \(0.708360\pi\)
\(810\) −3858.04 −0.167355
\(811\) 2520.45 0.109131 0.0545654 0.998510i \(-0.482623\pi\)
0.0545654 + 0.998510i \(0.482623\pi\)
\(812\) −79005.3 −3.41446
\(813\) 37612.0 1.62252
\(814\) −21831.7 −0.940048
\(815\) −4297.49 −0.184705
\(816\) 27210.1 1.16733
\(817\) −6223.19 −0.266490
\(818\) 15055.4 0.643520
\(819\) −34167.0 −1.45774
\(820\) −12711.4 −0.541343
\(821\) 21887.7 0.930434 0.465217 0.885197i \(-0.345976\pi\)
0.465217 + 0.885197i \(0.345976\pi\)
\(822\) 31486.5 1.33603
\(823\) 8149.95 0.345188 0.172594 0.984993i \(-0.444785\pi\)
0.172594 + 0.984993i \(0.444785\pi\)
\(824\) 8538.02 0.360966
\(825\) 12924.5 0.545423
\(826\) −35194.7 −1.48254
\(827\) 22007.0 0.925345 0.462672 0.886529i \(-0.346891\pi\)
0.462672 + 0.886529i \(0.346891\pi\)
\(828\) −95754.3 −4.01895
\(829\) 8082.69 0.338629 0.169314 0.985562i \(-0.445845\pi\)
0.169314 + 0.985562i \(0.445845\pi\)
\(830\) 5833.04 0.243937
\(831\) −37073.0 −1.54759
\(832\) −3808.82 −0.158710
\(833\) 3326.74 0.138373
\(834\) −29310.4 −1.21695
\(835\) −7762.12 −0.321700
\(836\) −4248.61 −0.175767
\(837\) 10589.4 0.437302
\(838\) −56302.0 −2.32091
\(839\) −1144.88 −0.0471105 −0.0235552 0.999723i \(-0.507499\pi\)
−0.0235552 + 0.999723i \(0.507499\pi\)
\(840\) −16901.9 −0.694251
\(841\) 62699.3 2.57080
\(842\) 16441.3 0.672927
\(843\) 32221.3 1.31644
\(844\) −49130.5 −2.00372
\(845\) −20.8479 −0.000848746 0
\(846\) 33992.0 1.38140
\(847\) 17701.1 0.718082
\(848\) 32139.3 1.30150
\(849\) −32495.2 −1.31358
\(850\) 17362.5 0.700622
\(851\) 38267.3 1.54146
\(852\) 1466.68 0.0589762
\(853\) −12853.7 −0.515948 −0.257974 0.966152i \(-0.583055\pi\)
−0.257974 + 0.966152i \(0.583055\pi\)
\(854\) 17844.0 0.715000
\(855\) 2395.18 0.0958052
\(856\) 45420.7 1.81361
\(857\) 24528.1 0.977669 0.488834 0.872377i \(-0.337422\pi\)
0.488834 + 0.872377i \(0.337422\pi\)
\(858\) −26051.8 −1.03659
\(859\) −37536.3 −1.49095 −0.745473 0.666536i \(-0.767776\pi\)
−0.745473 + 0.666536i \(0.767776\pi\)
\(860\) −15192.0 −0.602374
\(861\) 35892.2 1.42068
\(862\) 1472.19 0.0581704
\(863\) −2098.30 −0.0827659 −0.0413830 0.999143i \(-0.513176\pi\)
−0.0413830 + 0.999143i \(0.513176\pi\)
\(864\) −28421.9 −1.11914
\(865\) −242.833 −0.00954519
\(866\) 10671.8 0.418757
\(867\) 35317.0 1.38342
\(868\) 15446.7 0.604028
\(869\) −1125.85 −0.0439493
\(870\) 33960.8 1.32343
\(871\) −15063.1 −0.585986
\(872\) 27242.7 1.05797
\(873\) −82169.3 −3.18558
\(874\) 10808.7 0.418318
\(875\) −9612.56 −0.371387
\(876\) −49303.5 −1.90161
\(877\) −9857.12 −0.379534 −0.189767 0.981829i \(-0.560773\pi\)
−0.189767 + 0.981829i \(0.560773\pi\)
\(878\) 20357.2 0.782484
\(879\) −71181.5 −2.73139
\(880\) −3576.65 −0.137010
\(881\) 2301.91 0.0880289 0.0440144 0.999031i \(-0.485985\pi\)
0.0440144 + 0.999031i \(0.485985\pi\)
\(882\) −28049.6 −1.07084
\(883\) 25401.4 0.968093 0.484047 0.875042i \(-0.339166\pi\)
0.484047 + 0.875042i \(0.339166\pi\)
\(884\) −24113.0 −0.917429
\(885\) 10423.5 0.395912
\(886\) 60931.2 2.31041
\(887\) −11451.6 −0.433493 −0.216746 0.976228i \(-0.569544\pi\)
−0.216746 + 0.976228i \(0.569544\pi\)
\(888\) 145861. 5.51214
\(889\) −11979.1 −0.451929
\(890\) −11722.5 −0.441506
\(891\) 3667.30 0.137889
\(892\) −100196. −3.76098
\(893\) −2643.67 −0.0990671
\(894\) 11787.3 0.440969
\(895\) 8620.91 0.321972
\(896\) 24928.7 0.929475
\(897\) 45664.6 1.69977
\(898\) 21715.0 0.806949
\(899\) −17027.1 −0.631685
\(900\) −100864. −3.73569
\(901\) −8597.18 −0.317884
\(902\) 17537.1 0.647364
\(903\) 42896.4 1.58084
\(904\) −68803.2 −2.53137
\(905\) −9395.83 −0.345114
\(906\) −123538. −4.53010
\(907\) 53074.7 1.94302 0.971508 0.237005i \(-0.0761659\pi\)
0.971508 + 0.237005i \(0.0761659\pi\)
\(908\) −90085.2 −3.29249
\(909\) −46310.3 −1.68979
\(910\) 9415.08 0.342974
\(911\) −20284.7 −0.737718 −0.368859 0.929485i \(-0.620251\pi\)
−0.368859 + 0.929485i \(0.620251\pi\)
\(912\) 17843.0 0.647852
\(913\) −5544.65 −0.200987
\(914\) 1487.70 0.0538389
\(915\) −5284.81 −0.190940
\(916\) 8896.27 0.320896
\(917\) −378.466 −0.0136293
\(918\) 26970.3 0.969665
\(919\) 34782.0 1.24848 0.624240 0.781233i \(-0.285409\pi\)
0.624240 + 0.781233i \(0.285409\pi\)
\(920\) 14475.5 0.518744
\(921\) 24404.2 0.873121
\(922\) −26717.4 −0.954329
\(923\) −448.213 −0.0159839
\(924\) 29285.6 1.04267
\(925\) 40309.2 1.43282
\(926\) 40964.6 1.45376
\(927\) 8340.02 0.295493
\(928\) 45700.8 1.61660
\(929\) −15586.2 −0.550448 −0.275224 0.961380i \(-0.588752\pi\)
−0.275224 + 0.961380i \(0.588752\pi\)
\(930\) −6639.85 −0.234118
\(931\) 2181.50 0.0767948
\(932\) 49790.3 1.74993
\(933\) 75001.8 2.63178
\(934\) −16029.0 −0.561546
\(935\) 956.746 0.0334641
\(936\) 111537. 3.89498
\(937\) −15194.9 −0.529770 −0.264885 0.964280i \(-0.585334\pi\)
−0.264885 + 0.964280i \(0.585334\pi\)
\(938\) 24576.2 0.855483
\(939\) −14075.6 −0.489179
\(940\) −6453.68 −0.223932
\(941\) −48650.1 −1.68538 −0.842692 0.538396i \(-0.819031\pi\)
−0.842692 + 0.538396i \(0.819031\pi\)
\(942\) 87934.4 3.04146
\(943\) −30739.7 −1.06153
\(944\) 49759.0 1.71559
\(945\) −7255.60 −0.249762
\(946\) 20959.4 0.720348
\(947\) 3258.29 0.111806 0.0559030 0.998436i \(-0.482196\pi\)
0.0559030 + 0.998436i \(0.482196\pi\)
\(948\) 13711.2 0.469744
\(949\) 15067.0 0.515380
\(950\) 11385.4 0.388834
\(951\) −81257.8 −2.77073
\(952\) 21583.0 0.734780
\(953\) −44488.8 −1.51221 −0.756104 0.654451i \(-0.772900\pi\)
−0.756104 + 0.654451i \(0.772900\pi\)
\(954\) 72487.6 2.46003
\(955\) −1257.47 −0.0426080
\(956\) 39691.4 1.34279
\(957\) −32281.8 −1.09041
\(958\) −1264.27 −0.0426376
\(959\) 10816.6 0.364218
\(960\) −1840.47 −0.0618758
\(961\) −26462.0 −0.888253
\(962\) −81250.9 −2.72311
\(963\) 44367.4 1.48465
\(964\) −127857. −4.27179
\(965\) −9170.51 −0.305916
\(966\) −74504.2 −2.48150
\(967\) −5791.53 −0.192599 −0.0962994 0.995352i \(-0.530701\pi\)
−0.0962994 + 0.995352i \(0.530701\pi\)
\(968\) −57784.4 −1.91866
\(969\) −4772.96 −0.158235
\(970\) 22642.6 0.749495
\(971\) −17829.5 −0.589265 −0.294632 0.955611i \(-0.595197\pi\)
−0.294632 + 0.955611i \(0.595197\pi\)
\(972\) 43160.8 1.42426
\(973\) −10069.0 −0.331754
\(974\) 36850.0 1.21227
\(975\) 48101.2 1.57997
\(976\) −25228.2 −0.827394
\(977\) −2645.66 −0.0866349 −0.0433174 0.999061i \(-0.513793\pi\)
−0.0433174 + 0.999061i \(0.513793\pi\)
\(978\) −72205.7 −2.36082
\(979\) 11143.0 0.363770
\(980\) 5325.46 0.173587
\(981\) 26610.9 0.866076
\(982\) −42889.3 −1.39374
\(983\) 3880.50 0.125909 0.0629545 0.998016i \(-0.479948\pi\)
0.0629545 + 0.998016i \(0.479948\pi\)
\(984\) −117168. −3.79593
\(985\) −1580.18 −0.0511155
\(986\) −43366.6 −1.40068
\(987\) 18222.7 0.587676
\(988\) −15812.1 −0.509158
\(989\) −36738.4 −1.18121
\(990\) −8066.85 −0.258971
\(991\) 57787.1 1.85234 0.926170 0.377106i \(-0.123081\pi\)
0.926170 + 0.377106i \(0.123081\pi\)
\(992\) −8935.19 −0.285980
\(993\) 15307.3 0.489186
\(994\) 731.284 0.0233349
\(995\) −8018.27 −0.255474
\(996\) 67525.4 2.14822
\(997\) 30649.0 0.973585 0.486793 0.873518i \(-0.338167\pi\)
0.486793 + 0.873518i \(0.338167\pi\)
\(998\) 9662.48 0.306473
\(999\) 62614.9 1.98303
Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))

Twists

       By twisting character
Char Parity Ord Type Twist Min Dim
1.1 even 1 trivial 19.4.a.b.1.3 3
3.2 odd 2 171.4.a.f.1.1 3
4.3 odd 2 304.4.a.i.1.3 3
5.2 odd 4 475.4.b.f.324.6 6
5.3 odd 4 475.4.b.f.324.1 6
5.4 even 2 475.4.a.f.1.1 3
7.6 odd 2 931.4.a.c.1.3 3
8.3 odd 2 1216.4.a.u.1.1 3
8.5 even 2 1216.4.a.s.1.3 3
11.10 odd 2 2299.4.a.h.1.1 3
19.18 odd 2 361.4.a.i.1.1 3
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
19.4.a.b.1.3 3 1.1 even 1 trivial
171.4.a.f.1.1 3 3.2 odd 2
304.4.a.i.1.3 3 4.3 odd 2
361.4.a.i.1.1 3 19.18 odd 2
475.4.a.f.1.1 3 5.4 even 2
475.4.b.f.324.1 6 5.3 odd 4
475.4.b.f.324.6 6 5.2 odd 4
931.4.a.c.1.3 3 7.6 odd 2
1216.4.a.s.1.3 3 8.5 even 2
1216.4.a.u.1.1 3 8.3 odd 2
2299.4.a.h.1.1 3 11.10 odd 2