Properties

Label 578.4.a.g.1.2
Level $578$
Weight $4$
Character 578.1
Self dual yes
Analytic conductor $34.103$
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] = [578,4,Mod(1,578)] 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("578.1"); S:= CuspForms(chi, 4); N := Newforms(S);
 
Copy content sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(578, base_ring=CyclotomicField(2)) chi = DirichletCharacter(H, H._module([0])) N = Newforms(chi, 4, names="a")
 
Level: \( N \) \(=\) \( 578 = 2 \cdot 17^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 578.a (trivial)

Newform invariants

Copy content comment:select newform
 
Copy content sage:traces = [2,-4,7,8,-1,-14,19] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(7)] == traces)
 
Copy content gp:f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(34.1031039833\)
Analytic rank: \(0\)
Dimension: \(2\)
Coefficient field: \(\Q(\sqrt{13}) \)
Copy content comment:defining polynomial
 
Copy content gp:f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{2} - x - 3 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Fricke sign: \(+1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.2
Root \(2.30278\) of defining polynomial
Character \(\chi\) \(=\) 578.1

$q$-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)
 
\(f(q)\) \(=\) \(q-2.00000 q^{2} +8.90833 q^{3} +4.00000 q^{4} +1.30278 q^{5} -17.8167 q^{6} +32.9361 q^{7} -8.00000 q^{8} +52.3583 q^{9} -2.60555 q^{10} +39.2389 q^{11} +35.6333 q^{12} +67.5694 q^{13} -65.8722 q^{14} +11.6056 q^{15} +16.0000 q^{16} -104.717 q^{18} -26.0639 q^{19} +5.21110 q^{20} +293.405 q^{21} -78.4777 q^{22} -50.0917 q^{23} -71.2666 q^{24} -123.303 q^{25} -135.139 q^{26} +225.900 q^{27} +131.744 q^{28} -215.902 q^{29} -23.2111 q^{30} -93.8999 q^{31} -32.0000 q^{32} +349.553 q^{33} +42.9083 q^{35} +209.433 q^{36} -193.761 q^{37} +52.1278 q^{38} +601.930 q^{39} -10.4222 q^{40} -282.955 q^{41} -586.811 q^{42} +124.522 q^{43} +156.955 q^{44} +68.2111 q^{45} +100.183 q^{46} +202.817 q^{47} +142.533 q^{48} +741.786 q^{49} +246.606 q^{50} +270.278 q^{52} -569.258 q^{53} -451.800 q^{54} +51.1194 q^{55} -263.489 q^{56} -232.186 q^{57} +431.805 q^{58} +137.566 q^{59} +46.4222 q^{60} -3.34988 q^{61} +187.800 q^{62} +1724.48 q^{63} +64.0000 q^{64} +88.0278 q^{65} -699.105 q^{66} -764.560 q^{67} -446.233 q^{69} -85.8167 q^{70} -492.934 q^{71} -418.866 q^{72} +342.739 q^{73} +387.522 q^{74} -1098.42 q^{75} -104.256 q^{76} +1292.37 q^{77} -1203.86 q^{78} -645.643 q^{79} +20.8444 q^{80} +598.717 q^{81} +565.911 q^{82} -1274.67 q^{83} +1173.62 q^{84} -249.045 q^{86} -1923.33 q^{87} -313.911 q^{88} -830.700 q^{89} -136.422 q^{90} +2225.47 q^{91} -200.367 q^{92} -836.491 q^{93} -405.633 q^{94} -33.9554 q^{95} -285.066 q^{96} +956.748 q^{97} -1483.57 q^{98} +2054.48 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 2 q - 4 q^{2} + 7 q^{3} + 8 q^{4} - q^{5} - 14 q^{6} + 19 q^{7} - 16 q^{8} + 29 q^{9} + 2 q^{10} + 28 q^{11} + 28 q^{12} + 45 q^{13} - 38 q^{14} + 16 q^{15} + 32 q^{16} - 58 q^{18} - 99 q^{19} - 4 q^{20}+ \cdots + 2317 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −2.00000 −0.707107
\(3\) 8.90833 1.71441 0.857204 0.514977i \(-0.172199\pi\)
0.857204 + 0.514977i \(0.172199\pi\)
\(4\) 4.00000 0.500000
\(5\) 1.30278 0.116524 0.0582619 0.998301i \(-0.481444\pi\)
0.0582619 + 0.998301i \(0.481444\pi\)
\(6\) −17.8167 −1.21227
\(7\) 32.9361 1.77838 0.889191 0.457537i \(-0.151268\pi\)
0.889191 + 0.457537i \(0.151268\pi\)
\(8\) −8.00000 −0.353553
\(9\) 52.3583 1.93920
\(10\) −2.60555 −0.0823948
\(11\) 39.2389 1.07554 0.537771 0.843091i \(-0.319267\pi\)
0.537771 + 0.843091i \(0.319267\pi\)
\(12\) 35.6333 0.857204
\(13\) 67.5694 1.44157 0.720784 0.693160i \(-0.243782\pi\)
0.720784 + 0.693160i \(0.243782\pi\)
\(14\) −65.8722 −1.25751
\(15\) 11.6056 0.199769
\(16\) 16.0000 0.250000
\(17\) 0 0
\(18\) −104.717 −1.37122
\(19\) −26.0639 −0.314709 −0.157355 0.987542i \(-0.550297\pi\)
−0.157355 + 0.987542i \(0.550297\pi\)
\(20\) 5.21110 0.0582619
\(21\) 293.405 3.04887
\(22\) −78.4777 −0.760523
\(23\) −50.0917 −0.454123 −0.227062 0.973880i \(-0.572912\pi\)
−0.227062 + 0.973880i \(0.572912\pi\)
\(24\) −71.2666 −0.606135
\(25\) −123.303 −0.986422
\(26\) −135.139 −1.01934
\(27\) 225.900 1.61017
\(28\) 131.744 0.889191
\(29\) −215.902 −1.38249 −0.691243 0.722623i \(-0.742936\pi\)
−0.691243 + 0.722623i \(0.742936\pi\)
\(30\) −23.2111 −0.141258
\(31\) −93.8999 −0.544030 −0.272015 0.962293i \(-0.587690\pi\)
−0.272015 + 0.962293i \(0.587690\pi\)
\(32\) −32.0000 −0.176777
\(33\) 349.553 1.84392
\(34\) 0 0
\(35\) 42.9083 0.207224
\(36\) 209.433 0.969598
\(37\) −193.761 −0.860923 −0.430461 0.902609i \(-0.641649\pi\)
−0.430461 + 0.902609i \(0.641649\pi\)
\(38\) 52.1278 0.222533
\(39\) 601.930 2.47144
\(40\) −10.4222 −0.0411974
\(41\) −282.955 −1.07781 −0.538905 0.842367i \(-0.681162\pi\)
−0.538905 + 0.842367i \(0.681162\pi\)
\(42\) −586.811 −2.15588
\(43\) 124.522 0.441616 0.220808 0.975317i \(-0.429131\pi\)
0.220808 + 0.975317i \(0.429131\pi\)
\(44\) 156.955 0.537771
\(45\) 68.2111 0.225962
\(46\) 100.183 0.321114
\(47\) 202.817 0.629444 0.314722 0.949184i \(-0.398089\pi\)
0.314722 + 0.949184i \(0.398089\pi\)
\(48\) 142.533 0.428602
\(49\) 741.786 2.16264
\(50\) 246.606 0.697506
\(51\) 0 0
\(52\) 270.278 0.720784
\(53\) −569.258 −1.47535 −0.737676 0.675155i \(-0.764077\pi\)
−0.737676 + 0.675155i \(0.764077\pi\)
\(54\) −451.800 −1.13856
\(55\) 51.1194 0.125326
\(56\) −263.489 −0.628753
\(57\) −232.186 −0.539540
\(58\) 431.805 0.977565
\(59\) 137.566 0.303552 0.151776 0.988415i \(-0.451501\pi\)
0.151776 + 0.988415i \(0.451501\pi\)
\(60\) 46.4222 0.0998847
\(61\) −3.34988 −0.00703129 −0.00351565 0.999994i \(-0.501119\pi\)
−0.00351565 + 0.999994i \(0.501119\pi\)
\(62\) 187.800 0.384687
\(63\) 1724.48 3.44863
\(64\) 64.0000 0.125000
\(65\) 88.0278 0.167977
\(66\) −699.105 −1.30385
\(67\) −764.560 −1.39412 −0.697059 0.717014i \(-0.745508\pi\)
−0.697059 + 0.717014i \(0.745508\pi\)
\(68\) 0 0
\(69\) −446.233 −0.778553
\(70\) −85.8167 −0.146529
\(71\) −492.934 −0.823950 −0.411975 0.911195i \(-0.635161\pi\)
−0.411975 + 0.911195i \(0.635161\pi\)
\(72\) −418.866 −0.685609
\(73\) 342.739 0.549515 0.274757 0.961514i \(-0.411402\pi\)
0.274757 + 0.961514i \(0.411402\pi\)
\(74\) 387.522 0.608764
\(75\) −1098.42 −1.69113
\(76\) −104.256 −0.157355
\(77\) 1292.37 1.91272
\(78\) −1203.86 −1.74757
\(79\) −645.643 −0.919501 −0.459750 0.888048i \(-0.652061\pi\)
−0.459750 + 0.888048i \(0.652061\pi\)
\(80\) 20.8444 0.0291309
\(81\) 598.717 0.821285
\(82\) 565.911 0.762127
\(83\) −1274.67 −1.68570 −0.842849 0.538150i \(-0.819124\pi\)
−0.842849 + 0.538150i \(0.819124\pi\)
\(84\) 1173.62 1.52444
\(85\) 0 0
\(86\) −249.045 −0.312269
\(87\) −1923.33 −2.37014
\(88\) −313.911 −0.380261
\(89\) −830.700 −0.989371 −0.494685 0.869072i \(-0.664717\pi\)
−0.494685 + 0.869072i \(0.664717\pi\)
\(90\) −136.422 −0.159780
\(91\) 2225.47 2.56366
\(92\) −200.367 −0.227062
\(93\) −836.491 −0.932689
\(94\) −405.633 −0.445084
\(95\) −33.9554 −0.0366711
\(96\) −285.066 −0.303067
\(97\) 956.748 1.00147 0.500737 0.865599i \(-0.333062\pi\)
0.500737 + 0.865599i \(0.333062\pi\)
\(98\) −1483.57 −1.52922
\(99\) 2054.48 2.08569
\(100\) −493.211 −0.493211
\(101\) 1229.79 1.21158 0.605788 0.795626i \(-0.292858\pi\)
0.605788 + 0.795626i \(0.292858\pi\)
\(102\) 0 0
\(103\) 483.810 0.462827 0.231414 0.972855i \(-0.425665\pi\)
0.231414 + 0.972855i \(0.425665\pi\)
\(104\) −540.555 −0.509671
\(105\) 382.241 0.355266
\(106\) 1138.52 1.04323
\(107\) 729.239 0.658862 0.329431 0.944180i \(-0.393143\pi\)
0.329431 + 0.944180i \(0.393143\pi\)
\(108\) 903.600 0.805083
\(109\) 2235.27 1.96422 0.982108 0.188316i \(-0.0603030\pi\)
0.982108 + 0.188316i \(0.0603030\pi\)
\(110\) −102.239 −0.0886190
\(111\) −1726.09 −1.47597
\(112\) 526.977 0.444595
\(113\) 241.664 0.201185 0.100592 0.994928i \(-0.467926\pi\)
0.100592 + 0.994928i \(0.467926\pi\)
\(114\) 464.372 0.381512
\(115\) −65.2582 −0.0529162
\(116\) −863.610 −0.691243
\(117\) 3537.82 2.79548
\(118\) −275.132 −0.214644
\(119\) 0 0
\(120\) −92.8444 −0.0706291
\(121\) 208.688 0.156790
\(122\) 6.69977 0.00497187
\(123\) −2520.66 −1.84781
\(124\) −375.600 −0.272015
\(125\) −323.483 −0.231465
\(126\) −3448.95 −2.43855
\(127\) 951.589 0.664881 0.332440 0.943124i \(-0.392128\pi\)
0.332440 + 0.943124i \(0.392128\pi\)
\(128\) −128.000 −0.0883883
\(129\) 1109.29 0.757109
\(130\) −176.056 −0.118778
\(131\) −74.6493 −0.0497874 −0.0248937 0.999690i \(-0.507925\pi\)
−0.0248937 + 0.999690i \(0.507925\pi\)
\(132\) 1398.21 0.921959
\(133\) −858.443 −0.559673
\(134\) 1529.12 0.985790
\(135\) 294.297 0.187623
\(136\) 0 0
\(137\) −544.661 −0.339661 −0.169830 0.985473i \(-0.554322\pi\)
−0.169830 + 0.985473i \(0.554322\pi\)
\(138\) 892.466 0.550520
\(139\) −1385.49 −0.845437 −0.422718 0.906261i \(-0.638924\pi\)
−0.422718 + 0.906261i \(0.638924\pi\)
\(140\) 171.633 0.103612
\(141\) 1806.76 1.07912
\(142\) 985.867 0.582621
\(143\) 2651.35 1.55047
\(144\) 837.733 0.484799
\(145\) −281.272 −0.161092
\(146\) −685.478 −0.388566
\(147\) 6608.07 3.70765
\(148\) −775.045 −0.430461
\(149\) 481.628 0.264809 0.132404 0.991196i \(-0.457730\pi\)
0.132404 + 0.991196i \(0.457730\pi\)
\(150\) 2196.84 1.19581
\(151\) −202.793 −0.109292 −0.0546460 0.998506i \(-0.517403\pi\)
−0.0546460 + 0.998506i \(0.517403\pi\)
\(152\) 208.511 0.111266
\(153\) 0 0
\(154\) −2584.75 −1.35250
\(155\) −122.331 −0.0633924
\(156\) 2407.72 1.23572
\(157\) 2186.07 1.11126 0.555628 0.831431i \(-0.312478\pi\)
0.555628 + 0.831431i \(0.312478\pi\)
\(158\) 1291.29 0.650185
\(159\) −5071.14 −2.52935
\(160\) −41.6888 −0.0205987
\(161\) −1649.82 −0.807604
\(162\) −1197.43 −0.580736
\(163\) 354.790 0.170486 0.0852432 0.996360i \(-0.472833\pi\)
0.0852432 + 0.996360i \(0.472833\pi\)
\(164\) −1131.82 −0.538905
\(165\) 455.389 0.214860
\(166\) 2549.34 1.19197
\(167\) −1120.78 −0.519333 −0.259666 0.965698i \(-0.583613\pi\)
−0.259666 + 0.965698i \(0.583613\pi\)
\(168\) −2347.24 −1.07794
\(169\) 2368.62 1.07812
\(170\) 0 0
\(171\) −1364.66 −0.610283
\(172\) 498.089 0.220808
\(173\) 1731.68 0.761025 0.380512 0.924776i \(-0.375748\pi\)
0.380512 + 0.924776i \(0.375748\pi\)
\(174\) 3846.66 1.67595
\(175\) −4061.11 −1.75423
\(176\) 627.822 0.268885
\(177\) 1225.48 0.520412
\(178\) 1661.40 0.699591
\(179\) 4198.04 1.75294 0.876470 0.481457i \(-0.159892\pi\)
0.876470 + 0.481457i \(0.159892\pi\)
\(180\) 272.844 0.112981
\(181\) 47.4660 0.0194924 0.00974619 0.999953i \(-0.496898\pi\)
0.00974619 + 0.999953i \(0.496898\pi\)
\(182\) −4450.94 −1.81278
\(183\) −29.8419 −0.0120545
\(184\) 400.733 0.160557
\(185\) −252.427 −0.100318
\(186\) 1672.98 0.659511
\(187\) 0 0
\(188\) 811.267 0.314722
\(189\) 7440.26 2.86349
\(190\) 67.9109 0.0259304
\(191\) 1349.60 0.511276 0.255638 0.966773i \(-0.417715\pi\)
0.255638 + 0.966773i \(0.417715\pi\)
\(192\) 570.133 0.214301
\(193\) 2853.94 1.06441 0.532205 0.846615i \(-0.321364\pi\)
0.532205 + 0.846615i \(0.321364\pi\)
\(194\) −1913.50 −0.708149
\(195\) 784.180 0.287981
\(196\) 2967.14 1.08132
\(197\) −4980.68 −1.80131 −0.900657 0.434530i \(-0.856914\pi\)
−0.900657 + 0.434530i \(0.856914\pi\)
\(198\) −4108.96 −1.47480
\(199\) −2954.72 −1.05254 −0.526268 0.850319i \(-0.676409\pi\)
−0.526268 + 0.850319i \(0.676409\pi\)
\(200\) 986.422 0.348753
\(201\) −6810.95 −2.39009
\(202\) −2459.59 −0.856713
\(203\) −7110.98 −2.45859
\(204\) 0 0
\(205\) −368.627 −0.125591
\(206\) −967.620 −0.327268
\(207\) −2622.71 −0.880634
\(208\) 1081.11 0.360392
\(209\) −1022.72 −0.338483
\(210\) −764.483 −0.251211
\(211\) 2142.09 0.698899 0.349449 0.936955i \(-0.386369\pi\)
0.349449 + 0.936955i \(0.386369\pi\)
\(212\) −2277.03 −0.737676
\(213\) −4391.21 −1.41259
\(214\) −1458.48 −0.465885
\(215\) 162.225 0.0514587
\(216\) −1807.20 −0.569279
\(217\) −3092.70 −0.967492
\(218\) −4470.53 −1.38891
\(219\) 3053.23 0.942093
\(220\) 204.478 0.0626631
\(221\) 0 0
\(222\) 3452.18 1.04367
\(223\) −3170.14 −0.951966 −0.475983 0.879454i \(-0.657908\pi\)
−0.475983 + 0.879454i \(0.657908\pi\)
\(224\) −1053.95 −0.314376
\(225\) −6455.92 −1.91287
\(226\) −483.329 −0.142259
\(227\) −2228.79 −0.651674 −0.325837 0.945426i \(-0.605646\pi\)
−0.325837 + 0.945426i \(0.605646\pi\)
\(228\) −928.744 −0.269770
\(229\) −1977.95 −0.570772 −0.285386 0.958413i \(-0.592122\pi\)
−0.285386 + 0.958413i \(0.592122\pi\)
\(230\) 130.516 0.0374174
\(231\) 11512.9 3.27919
\(232\) 1727.22 0.488782
\(233\) 4826.83 1.35715 0.678576 0.734530i \(-0.262597\pi\)
0.678576 + 0.734530i \(0.262597\pi\)
\(234\) −7075.64 −1.97670
\(235\) 264.225 0.0733452
\(236\) 550.264 0.151776
\(237\) −5751.60 −1.57640
\(238\) 0 0
\(239\) 149.720 0.0405212 0.0202606 0.999795i \(-0.493550\pi\)
0.0202606 + 0.999795i \(0.493550\pi\)
\(240\) 185.689 0.0499423
\(241\) 7345.74 1.96340 0.981702 0.190422i \(-0.0609856\pi\)
0.981702 + 0.190422i \(0.0609856\pi\)
\(242\) −417.376 −0.110868
\(243\) −765.735 −0.202148
\(244\) −13.3995 −0.00351565
\(245\) 966.380 0.251999
\(246\) 5041.32 1.30660
\(247\) −1761.12 −0.453674
\(248\) 751.199 0.192344
\(249\) −11355.2 −2.88998
\(250\) 646.966 0.163671
\(251\) 1960.43 0.492992 0.246496 0.969144i \(-0.420721\pi\)
0.246496 + 0.969144i \(0.420721\pi\)
\(252\) 6897.91 1.72431
\(253\) −1965.54 −0.488429
\(254\) −1903.18 −0.470142
\(255\) 0 0
\(256\) 256.000 0.0625000
\(257\) −4022.21 −0.976259 −0.488129 0.872771i \(-0.662321\pi\)
−0.488129 + 0.872771i \(0.662321\pi\)
\(258\) −2218.57 −0.535357
\(259\) −6381.73 −1.53105
\(260\) 352.111 0.0839885
\(261\) −11304.3 −2.68091
\(262\) 149.299 0.0352050
\(263\) 970.195 0.227471 0.113735 0.993511i \(-0.463718\pi\)
0.113735 + 0.993511i \(0.463718\pi\)
\(264\) −2796.42 −0.651923
\(265\) −741.616 −0.171914
\(266\) 1716.89 0.395748
\(267\) −7400.15 −1.69619
\(268\) −3058.24 −0.697059
\(269\) 1617.17 0.366545 0.183272 0.983062i \(-0.441331\pi\)
0.183272 + 0.983062i \(0.441331\pi\)
\(270\) −588.594 −0.132669
\(271\) −4493.83 −1.00731 −0.503655 0.863905i \(-0.668012\pi\)
−0.503655 + 0.863905i \(0.668012\pi\)
\(272\) 0 0
\(273\) 19825.2 4.39515
\(274\) 1089.32 0.240176
\(275\) −4838.26 −1.06094
\(276\) −1784.93 −0.389276
\(277\) 2694.17 0.584394 0.292197 0.956358i \(-0.405614\pi\)
0.292197 + 0.956358i \(0.405614\pi\)
\(278\) 2770.98 0.597814
\(279\) −4916.44 −1.05498
\(280\) −343.267 −0.0732647
\(281\) 2980.66 0.632779 0.316390 0.948629i \(-0.397529\pi\)
0.316390 + 0.948629i \(0.397529\pi\)
\(282\) −3613.51 −0.763055
\(283\) −2863.55 −0.601486 −0.300743 0.953705i \(-0.597235\pi\)
−0.300743 + 0.953705i \(0.597235\pi\)
\(284\) −1971.73 −0.411975
\(285\) −302.486 −0.0628692
\(286\) −5302.69 −1.09635
\(287\) −9319.44 −1.91676
\(288\) −1675.47 −0.342805
\(289\) 0 0
\(290\) 562.545 0.113910
\(291\) 8523.02 1.71694
\(292\) 1370.96 0.274757
\(293\) −754.928 −0.150524 −0.0752618 0.997164i \(-0.523979\pi\)
−0.0752618 + 0.997164i \(0.523979\pi\)
\(294\) −13216.1 −2.62170
\(295\) 179.218 0.0353711
\(296\) 1550.09 0.304382
\(297\) 8864.06 1.73180
\(298\) −963.256 −0.187248
\(299\) −3384.66 −0.654649
\(300\) −4393.69 −0.845565
\(301\) 4101.28 0.785361
\(302\) 405.586 0.0772810
\(303\) 10955.4 2.07713
\(304\) −417.023 −0.0786773
\(305\) −4.36415 −0.000819313 0
\(306\) 0 0
\(307\) −7983.00 −1.48408 −0.742042 0.670354i \(-0.766142\pi\)
−0.742042 + 0.670354i \(0.766142\pi\)
\(308\) 5169.50 0.956362
\(309\) 4309.94 0.793475
\(310\) 244.661 0.0448252
\(311\) −3528.06 −0.643272 −0.321636 0.946863i \(-0.604233\pi\)
−0.321636 + 0.946863i \(0.604233\pi\)
\(312\) −4815.44 −0.873784
\(313\) 2801.14 0.505846 0.252923 0.967486i \(-0.418608\pi\)
0.252923 + 0.967486i \(0.418608\pi\)
\(314\) −4372.13 −0.785776
\(315\) 2246.61 0.401847
\(316\) −2582.57 −0.459750
\(317\) −9021.98 −1.59850 −0.799251 0.600998i \(-0.794770\pi\)
−0.799251 + 0.600998i \(0.794770\pi\)
\(318\) 10142.3 1.78852
\(319\) −8471.77 −1.48692
\(320\) 83.3776 0.0145655
\(321\) 6496.30 1.12956
\(322\) 3299.65 0.571063
\(323\) 0 0
\(324\) 2394.87 0.410642
\(325\) −8331.49 −1.42199
\(326\) −709.579 −0.120552
\(327\) 19912.5 3.36747
\(328\) 2263.64 0.381063
\(329\) 6679.99 1.11939
\(330\) −910.777 −0.151929
\(331\) 10122.6 1.68093 0.840464 0.541867i \(-0.182282\pi\)
0.840464 + 0.541867i \(0.182282\pi\)
\(332\) −5098.67 −0.842849
\(333\) −10145.0 −1.66950
\(334\) 2241.56 0.367224
\(335\) −996.050 −0.162448
\(336\) 4694.49 0.762218
\(337\) −1939.05 −0.313433 −0.156716 0.987644i \(-0.550091\pi\)
−0.156716 + 0.987644i \(0.550091\pi\)
\(338\) −4737.25 −0.762344
\(339\) 2152.83 0.344913
\(340\) 0 0
\(341\) −3684.53 −0.585127
\(342\) 2729.32 0.431535
\(343\) 13134.4 2.06762
\(344\) −996.178 −0.156135
\(345\) −581.341 −0.0907199
\(346\) −3463.36 −0.538126
\(347\) −6610.95 −1.02275 −0.511375 0.859358i \(-0.670864\pi\)
−0.511375 + 0.859358i \(0.670864\pi\)
\(348\) −7693.32 −1.18507
\(349\) 4923.51 0.755156 0.377578 0.925978i \(-0.376757\pi\)
0.377578 + 0.925978i \(0.376757\pi\)
\(350\) 8122.22 1.24043
\(351\) 15263.9 2.32116
\(352\) −1255.64 −0.190131
\(353\) 2041.87 0.307869 0.153934 0.988081i \(-0.450806\pi\)
0.153934 + 0.988081i \(0.450806\pi\)
\(354\) −2450.97 −0.367987
\(355\) −642.182 −0.0960098
\(356\) −3322.80 −0.494685
\(357\) 0 0
\(358\) −8396.08 −1.23952
\(359\) 505.112 0.0742585 0.0371293 0.999310i \(-0.488179\pi\)
0.0371293 + 0.999310i \(0.488179\pi\)
\(360\) −545.689 −0.0798898
\(361\) −6179.67 −0.900958
\(362\) −94.9320 −0.0137832
\(363\) 1859.06 0.268803
\(364\) 8901.88 1.28183
\(365\) 446.512 0.0640316
\(366\) 59.6837 0.00852382
\(367\) 9550.08 1.35834 0.679169 0.733982i \(-0.262340\pi\)
0.679169 + 0.733982i \(0.262340\pi\)
\(368\) −801.467 −0.113531
\(369\) −14815.1 −2.09008
\(370\) 504.855 0.0709355
\(371\) −18749.1 −2.62374
\(372\) −3345.96 −0.466345
\(373\) 1068.56 0.148332 0.0741662 0.997246i \(-0.476370\pi\)
0.0741662 + 0.997246i \(0.476370\pi\)
\(374\) 0 0
\(375\) −2881.69 −0.396826
\(376\) −1622.53 −0.222542
\(377\) −14588.4 −1.99295
\(378\) −14880.5 −2.02479
\(379\) 8247.52 1.11780 0.558901 0.829234i \(-0.311223\pi\)
0.558901 + 0.829234i \(0.311223\pi\)
\(380\) −135.822 −0.0183355
\(381\) 8477.06 1.13988
\(382\) −2699.20 −0.361526
\(383\) 4557.54 0.608040 0.304020 0.952666i \(-0.401671\pi\)
0.304020 + 0.952666i \(0.401671\pi\)
\(384\) −1140.27 −0.151534
\(385\) 1683.67 0.222878
\(386\) −5707.88 −0.752652
\(387\) 6519.77 0.856379
\(388\) 3826.99 0.500737
\(389\) 8456.75 1.10225 0.551123 0.834424i \(-0.314199\pi\)
0.551123 + 0.834424i \(0.314199\pi\)
\(390\) −1568.36 −0.203633
\(391\) 0 0
\(392\) −5934.28 −0.764609
\(393\) −665.001 −0.0853559
\(394\) 9961.36 1.27372
\(395\) −841.129 −0.107144
\(396\) 8217.92 1.04284
\(397\) 3414.24 0.431627 0.215814 0.976435i \(-0.430760\pi\)
0.215814 + 0.976435i \(0.430760\pi\)
\(398\) 5909.44 0.744255
\(399\) −7647.29 −0.959508
\(400\) −1972.84 −0.246606
\(401\) 5788.46 0.720852 0.360426 0.932788i \(-0.382631\pi\)
0.360426 + 0.932788i \(0.382631\pi\)
\(402\) 13621.9 1.69005
\(403\) −6344.76 −0.784256
\(404\) 4919.18 0.605788
\(405\) 779.993 0.0956992
\(406\) 14222.0 1.73848
\(407\) −7602.97 −0.925958
\(408\) 0 0
\(409\) −12554.4 −1.51779 −0.758897 0.651211i \(-0.774261\pi\)
−0.758897 + 0.651211i \(0.774261\pi\)
\(410\) 737.255 0.0888059
\(411\) −4852.02 −0.582317
\(412\) 1935.24 0.231414
\(413\) 4530.89 0.539832
\(414\) 5245.43 0.622702
\(415\) −1660.61 −0.196424
\(416\) −2162.22 −0.254836
\(417\) −12342.4 −1.44942
\(418\) 2045.44 0.239343
\(419\) 5105.66 0.595293 0.297647 0.954676i \(-0.403798\pi\)
0.297647 + 0.954676i \(0.403798\pi\)
\(420\) 1528.97 0.177633
\(421\) 10075.1 1.16634 0.583170 0.812350i \(-0.301812\pi\)
0.583170 + 0.812350i \(0.301812\pi\)
\(422\) −4284.18 −0.494196
\(423\) 10619.1 1.22061
\(424\) 4554.07 0.521616
\(425\) 0 0
\(426\) 8782.43 0.998850
\(427\) −110.332 −0.0125043
\(428\) 2916.96 0.329431
\(429\) 23619.1 2.65813
\(430\) −324.449 −0.0363868
\(431\) 13974.2 1.56175 0.780873 0.624690i \(-0.214774\pi\)
0.780873 + 0.624690i \(0.214774\pi\)
\(432\) 3614.40 0.402541
\(433\) 1828.71 0.202962 0.101481 0.994838i \(-0.467642\pi\)
0.101481 + 0.994838i \(0.467642\pi\)
\(434\) 6185.39 0.684120
\(435\) −2505.67 −0.276178
\(436\) 8941.06 0.982108
\(437\) 1305.59 0.142917
\(438\) −6106.47 −0.666160
\(439\) 9759.54 1.06104 0.530521 0.847672i \(-0.321996\pi\)
0.530521 + 0.847672i \(0.321996\pi\)
\(440\) −408.955 −0.0443095
\(441\) 38838.6 4.19378
\(442\) 0 0
\(443\) 8806.00 0.944438 0.472219 0.881481i \(-0.343453\pi\)
0.472219 + 0.881481i \(0.343453\pi\)
\(444\) −6904.35 −0.737986
\(445\) −1082.22 −0.115285
\(446\) 6340.29 0.673142
\(447\) 4290.50 0.453991
\(448\) 2107.91 0.222298
\(449\) −17257.7 −1.81390 −0.906952 0.421235i \(-0.861597\pi\)
−0.906952 + 0.421235i \(0.861597\pi\)
\(450\) 12911.8 1.35260
\(451\) −11102.8 −1.15923
\(452\) 966.658 0.100592
\(453\) −1806.55 −0.187371
\(454\) 4457.58 0.460803
\(455\) 2899.29 0.298727
\(456\) 1857.49 0.190756
\(457\) −8456.02 −0.865549 −0.432775 0.901502i \(-0.642465\pi\)
−0.432775 + 0.901502i \(0.642465\pi\)
\(458\) 3955.90 0.403597
\(459\) 0 0
\(460\) −261.033 −0.0264581
\(461\) 13792.9 1.39349 0.696743 0.717321i \(-0.254632\pi\)
0.696743 + 0.717321i \(0.254632\pi\)
\(462\) −23025.8 −2.31874
\(463\) −12478.0 −1.25249 −0.626243 0.779628i \(-0.715408\pi\)
−0.626243 + 0.779628i \(0.715408\pi\)
\(464\) −3454.44 −0.345621
\(465\) −1089.76 −0.108680
\(466\) −9653.67 −0.959651
\(467\) −16066.1 −1.59197 −0.795985 0.605316i \(-0.793047\pi\)
−0.795985 + 0.605316i \(0.793047\pi\)
\(468\) 14151.3 1.39774
\(469\) −25181.6 −2.47927
\(470\) −528.449 −0.0518629
\(471\) 19474.2 1.90515
\(472\) −1100.53 −0.107322
\(473\) 4886.11 0.474976
\(474\) 11503.2 1.11468
\(475\) 3213.75 0.310436
\(476\) 0 0
\(477\) −29805.4 −2.86100
\(478\) −299.439 −0.0286528
\(479\) 13352.5 1.27368 0.636838 0.770997i \(-0.280242\pi\)
0.636838 + 0.770997i \(0.280242\pi\)
\(480\) −371.378 −0.0353146
\(481\) −13092.3 −1.24108
\(482\) −14691.5 −1.38834
\(483\) −14697.2 −1.38456
\(484\) 834.752 0.0783952
\(485\) 1246.43 0.116696
\(486\) 1531.47 0.142940
\(487\) 11085.4 1.03147 0.515736 0.856748i \(-0.327519\pi\)
0.515736 + 0.856748i \(0.327519\pi\)
\(488\) 26.7991 0.00248594
\(489\) 3160.58 0.292283
\(490\) −1932.76 −0.178190
\(491\) −13437.6 −1.23510 −0.617548 0.786533i \(-0.711874\pi\)
−0.617548 + 0.786533i \(0.711874\pi\)
\(492\) −10082.6 −0.923903
\(493\) 0 0
\(494\) 3522.25 0.320796
\(495\) 2676.53 0.243032
\(496\) −1502.40 −0.136007
\(497\) −16235.3 −1.46530
\(498\) 22710.3 2.04352
\(499\) 13165.2 1.18107 0.590535 0.807012i \(-0.298917\pi\)
0.590535 + 0.807012i \(0.298917\pi\)
\(500\) −1293.93 −0.115733
\(501\) −9984.28 −0.890349
\(502\) −3920.86 −0.348598
\(503\) −7873.67 −0.697951 −0.348976 0.937132i \(-0.613470\pi\)
−0.348976 + 0.937132i \(0.613470\pi\)
\(504\) −13795.8 −1.21927
\(505\) 1602.15 0.141177
\(506\) 3931.08 0.345371
\(507\) 21100.5 1.84833
\(508\) 3806.35 0.332440
\(509\) 8039.79 0.700113 0.350056 0.936729i \(-0.386162\pi\)
0.350056 + 0.936729i \(0.386162\pi\)
\(510\) 0 0
\(511\) 11288.5 0.977247
\(512\) −512.000 −0.0441942
\(513\) −5887.84 −0.506734
\(514\) 8044.42 0.690319
\(515\) 630.296 0.0539304
\(516\) 4437.14 0.378555
\(517\) 7958.29 0.676993
\(518\) 12763.5 1.08261
\(519\) 15426.4 1.30471
\(520\) −704.222 −0.0593888
\(521\) −11806.6 −0.992813 −0.496407 0.868090i \(-0.665347\pi\)
−0.496407 + 0.868090i \(0.665347\pi\)
\(522\) 22608.6 1.89569
\(523\) −2991.18 −0.250086 −0.125043 0.992151i \(-0.539907\pi\)
−0.125043 + 0.992151i \(0.539907\pi\)
\(524\) −298.597 −0.0248937
\(525\) −36177.7 −3.00747
\(526\) −1940.39 −0.160846
\(527\) 0 0
\(528\) 5592.84 0.460980
\(529\) −9657.82 −0.793772
\(530\) 1483.23 0.121561
\(531\) 7202.72 0.588647
\(532\) −3433.77 −0.279836
\(533\) −19119.1 −1.55374
\(534\) 14800.3 1.19938
\(535\) 950.035 0.0767730
\(536\) 6116.48 0.492895
\(537\) 37397.5 3.00525
\(538\) −3234.34 −0.259186
\(539\) 29106.8 2.32601
\(540\) 1177.19 0.0938113
\(541\) 17360.1 1.37961 0.689805 0.723995i \(-0.257696\pi\)
0.689805 + 0.723995i \(0.257696\pi\)
\(542\) 8987.66 0.712275
\(543\) 422.843 0.0334179
\(544\) 0 0
\(545\) 2912.05 0.228878
\(546\) −39650.4 −3.10784
\(547\) −3124.54 −0.244234 −0.122117 0.992516i \(-0.538968\pi\)
−0.122117 + 0.992516i \(0.538968\pi\)
\(548\) −2178.64 −0.169830
\(549\) −175.394 −0.0136351
\(550\) 9676.52 0.750197
\(551\) 5627.26 0.435081
\(552\) 3569.86 0.275260
\(553\) −21265.0 −1.63522
\(554\) −5388.35 −0.413229
\(555\) −2248.70 −0.171986
\(556\) −5541.96 −0.422718
\(557\) −7434.65 −0.565559 −0.282779 0.959185i \(-0.591256\pi\)
−0.282779 + 0.959185i \(0.591256\pi\)
\(558\) 9832.88 0.745984
\(559\) 8413.89 0.636619
\(560\) 686.533 0.0518059
\(561\) 0 0
\(562\) −5961.31 −0.447443
\(563\) −22605.6 −1.69221 −0.846105 0.533017i \(-0.821058\pi\)
−0.846105 + 0.533017i \(0.821058\pi\)
\(564\) 7227.03 0.539562
\(565\) 314.834 0.0234428
\(566\) 5727.11 0.425315
\(567\) 19719.4 1.46056
\(568\) 3943.47 0.291310
\(569\) −22968.0 −1.69222 −0.846108 0.533012i \(-0.821060\pi\)
−0.846108 + 0.533012i \(0.821060\pi\)
\(570\) 604.972 0.0444553
\(571\) −20889.0 −1.53096 −0.765479 0.643461i \(-0.777498\pi\)
−0.765479 + 0.643461i \(0.777498\pi\)
\(572\) 10605.4 0.775233
\(573\) 12022.7 0.876535
\(574\) 18638.9 1.35535
\(575\) 6176.44 0.447957
\(576\) 3350.93 0.242399
\(577\) −14649.6 −1.05697 −0.528485 0.848942i \(-0.677240\pi\)
−0.528485 + 0.848942i \(0.677240\pi\)
\(578\) 0 0
\(579\) 25423.8 1.82483
\(580\) −1125.09 −0.0805462
\(581\) −41982.6 −2.99781
\(582\) −17046.0 −1.21406
\(583\) −22337.0 −1.58680
\(584\) −2741.91 −0.194283
\(585\) 4608.98 0.325740
\(586\) 1509.86 0.106436
\(587\) 13888.4 0.976548 0.488274 0.872690i \(-0.337627\pi\)
0.488274 + 0.872690i \(0.337627\pi\)
\(588\) 26432.3 1.85382
\(589\) 2447.40 0.171211
\(590\) −358.435 −0.0250111
\(591\) −44369.5 −3.08819
\(592\) −3100.18 −0.215231
\(593\) 14653.3 1.01474 0.507368 0.861729i \(-0.330618\pi\)
0.507368 + 0.861729i \(0.330618\pi\)
\(594\) −17728.1 −1.22457
\(595\) 0 0
\(596\) 1926.51 0.132404
\(597\) −26321.6 −1.80448
\(598\) 6769.33 0.462907
\(599\) −7698.71 −0.525143 −0.262572 0.964913i \(-0.584571\pi\)
−0.262572 + 0.964913i \(0.584571\pi\)
\(600\) 8787.37 0.597905
\(601\) 19478.7 1.32205 0.661026 0.750363i \(-0.270121\pi\)
0.661026 + 0.750363i \(0.270121\pi\)
\(602\) −8202.55 −0.555334
\(603\) −40031.1 −2.70347
\(604\) −811.173 −0.0546460
\(605\) 271.874 0.0182698
\(606\) −21910.8 −1.46876
\(607\) −3136.14 −0.209707 −0.104853 0.994488i \(-0.533437\pi\)
−0.104853 + 0.994488i \(0.533437\pi\)
\(608\) 834.045 0.0556332
\(609\) −63346.9 −4.21502
\(610\) 8.72830 0.000579342 0
\(611\) 13704.2 0.907385
\(612\) 0 0
\(613\) 2865.35 0.188793 0.0943967 0.995535i \(-0.469908\pi\)
0.0943967 + 0.995535i \(0.469908\pi\)
\(614\) 15966.0 1.04941
\(615\) −3283.85 −0.215313
\(616\) −10339.0 −0.676250
\(617\) 15952.4 1.04087 0.520437 0.853900i \(-0.325769\pi\)
0.520437 + 0.853900i \(0.325769\pi\)
\(618\) −8619.88 −0.561072
\(619\) −14278.9 −0.927171 −0.463585 0.886052i \(-0.653437\pi\)
−0.463585 + 0.886052i \(0.653437\pi\)
\(620\) −489.322 −0.0316962
\(621\) −11315.7 −0.731214
\(622\) 7056.11 0.454862
\(623\) −27360.0 −1.75948
\(624\) 9630.88 0.617859
\(625\) 14991.4 0.959451
\(626\) −5602.28 −0.357687
\(627\) −9110.71 −0.580298
\(628\) 8744.27 0.555628
\(629\) 0 0
\(630\) −4493.21 −0.284149
\(631\) 22216.4 1.40162 0.700808 0.713349i \(-0.252823\pi\)
0.700808 + 0.713349i \(0.252823\pi\)
\(632\) 5165.15 0.325093
\(633\) 19082.5 1.19820
\(634\) 18044.0 1.13031
\(635\) 1239.71 0.0774744
\(636\) −20284.6 −1.26468
\(637\) 50122.0 3.11759
\(638\) 16943.5 1.05141
\(639\) −25809.2 −1.59780
\(640\) −166.755 −0.0102993
\(641\) −22674.5 −1.39718 −0.698589 0.715523i \(-0.746188\pi\)
−0.698589 + 0.715523i \(0.746188\pi\)
\(642\) −12992.6 −0.798718
\(643\) 22509.4 1.38053 0.690267 0.723555i \(-0.257493\pi\)
0.690267 + 0.723555i \(0.257493\pi\)
\(644\) −6599.29 −0.403802
\(645\) 1445.15 0.0882213
\(646\) 0 0
\(647\) −75.5368 −0.00458989 −0.00229494 0.999997i \(-0.500731\pi\)
−0.00229494 + 0.999997i \(0.500731\pi\)
\(648\) −4789.73 −0.290368
\(649\) 5397.94 0.326483
\(650\) 16663.0 1.00550
\(651\) −27550.7 −1.65868
\(652\) 1419.16 0.0852432
\(653\) −1134.04 −0.0679610 −0.0339805 0.999422i \(-0.510818\pi\)
−0.0339805 + 0.999422i \(0.510818\pi\)
\(654\) −39825.0 −2.38116
\(655\) −97.2513 −0.00580141
\(656\) −4527.29 −0.269453
\(657\) 17945.2 1.06562
\(658\) −13360.0 −0.791529
\(659\) −33374.8 −1.97283 −0.986416 0.164264i \(-0.947475\pi\)
−0.986416 + 0.164264i \(0.947475\pi\)
\(660\) 1821.55 0.107430
\(661\) −4598.54 −0.270594 −0.135297 0.990805i \(-0.543199\pi\)
−0.135297 + 0.990805i \(0.543199\pi\)
\(662\) −20245.2 −1.18860
\(663\) 0 0
\(664\) 10197.3 0.595984
\(665\) −1118.36 −0.0652152
\(666\) 20290.0 1.18051
\(667\) 10814.9 0.627819
\(668\) −4483.12 −0.259666
\(669\) −28240.7 −1.63206
\(670\) 1992.10 0.114868
\(671\) −131.446 −0.00756245
\(672\) −9388.97 −0.538969
\(673\) −2426.84 −0.139001 −0.0695007 0.997582i \(-0.522141\pi\)
−0.0695007 + 0.997582i \(0.522141\pi\)
\(674\) 3878.10 0.221630
\(675\) −27854.1 −1.58830
\(676\) 9474.49 0.539058
\(677\) 24830.9 1.40964 0.704821 0.709385i \(-0.251027\pi\)
0.704821 + 0.709385i \(0.251027\pi\)
\(678\) −4305.65 −0.243890
\(679\) 31511.5 1.78100
\(680\) 0 0
\(681\) −19854.8 −1.11724
\(682\) 7369.05 0.413747
\(683\) 6611.10 0.370376 0.185188 0.982703i \(-0.440711\pi\)
0.185188 + 0.982703i \(0.440711\pi\)
\(684\) −5458.65 −0.305141
\(685\) −709.571 −0.0395786
\(686\) −26268.9 −1.46203
\(687\) −17620.2 −0.978536
\(688\) 1992.36 0.110404
\(689\) −38464.4 −2.12682
\(690\) 1162.68 0.0641487
\(691\) 1055.68 0.0581186 0.0290593 0.999578i \(-0.490749\pi\)
0.0290593 + 0.999578i \(0.490749\pi\)
\(692\) 6926.73 0.380512
\(693\) 67666.5 3.70915
\(694\) 13221.9 0.723193
\(695\) −1804.98 −0.0985135
\(696\) 15386.6 0.837973
\(697\) 0 0
\(698\) −9847.01 −0.533976
\(699\) 42999.0 2.32671
\(700\) −16244.4 −0.877117
\(701\) 13811.1 0.744137 0.372068 0.928205i \(-0.378649\pi\)
0.372068 + 0.928205i \(0.378649\pi\)
\(702\) −30527.8 −1.64131
\(703\) 5050.17 0.270940
\(704\) 2511.29 0.134443
\(705\) 2353.80 0.125744
\(706\) −4083.74 −0.217696
\(707\) 40504.6 2.15464
\(708\) 4901.93 0.260206
\(709\) 15046.7 0.797025 0.398512 0.917163i \(-0.369527\pi\)
0.398512 + 0.917163i \(0.369527\pi\)
\(710\) 1284.36 0.0678892
\(711\) −33804.8 −1.78309
\(712\) 6645.60 0.349795
\(713\) 4703.60 0.247057
\(714\) 0 0
\(715\) 3454.11 0.180666
\(716\) 16792.2 0.876470
\(717\) 1333.75 0.0694698
\(718\) −1010.22 −0.0525087
\(719\) 36534.1 1.89498 0.947492 0.319779i \(-0.103609\pi\)
0.947492 + 0.319779i \(0.103609\pi\)
\(720\) 1091.38 0.0564906
\(721\) 15934.8 0.823084
\(722\) 12359.3 0.637074
\(723\) 65438.2 3.36608
\(724\) 189.864 0.00974619
\(725\) 26621.4 1.36371
\(726\) −3718.12 −0.190072
\(727\) 18950.4 0.966756 0.483378 0.875412i \(-0.339410\pi\)
0.483378 + 0.875412i \(0.339410\pi\)
\(728\) −17803.8 −0.906390
\(729\) −22986.8 −1.16785
\(730\) −893.025 −0.0452772
\(731\) 0 0
\(732\) −119.367 −0.00602725
\(733\) 35398.9 1.78375 0.891874 0.452283i \(-0.149390\pi\)
0.891874 + 0.452283i \(0.149390\pi\)
\(734\) −19100.2 −0.960491
\(735\) 8608.83 0.432029
\(736\) 1602.93 0.0802784
\(737\) −30000.5 −1.49943
\(738\) 29630.1 1.47791
\(739\) 19350.5 0.963220 0.481610 0.876386i \(-0.340052\pi\)
0.481610 + 0.876386i \(0.340052\pi\)
\(740\) −1009.71 −0.0501590
\(741\) −15688.7 −0.777783
\(742\) 37498.3 1.85526
\(743\) −17426.3 −0.860443 −0.430221 0.902723i \(-0.641564\pi\)
−0.430221 + 0.902723i \(0.641564\pi\)
\(744\) 6691.93 0.329755
\(745\) 627.454 0.0308565
\(746\) −2137.12 −0.104887
\(747\) −66739.4 −3.26890
\(748\) 0 0
\(749\) 24018.3 1.17171
\(750\) 5763.38 0.280599
\(751\) 11096.1 0.539152 0.269576 0.962979i \(-0.413116\pi\)
0.269576 + 0.962979i \(0.413116\pi\)
\(752\) 3245.07 0.157361
\(753\) 17464.1 0.845190
\(754\) 29176.8 1.40923
\(755\) −264.194 −0.0127351
\(756\) 29761.0 1.43174
\(757\) 13378.2 0.642326 0.321163 0.947024i \(-0.395926\pi\)
0.321163 + 0.947024i \(0.395926\pi\)
\(758\) −16495.0 −0.790405
\(759\) −17509.7 −0.837366
\(760\) 271.643 0.0129652
\(761\) −6331.90 −0.301618 −0.150809 0.988563i \(-0.548188\pi\)
−0.150809 + 0.988563i \(0.548188\pi\)
\(762\) −16954.1 −0.806015
\(763\) 73620.9 3.49313
\(764\) 5398.40 0.255638
\(765\) 0 0
\(766\) −9115.08 −0.429949
\(767\) 9295.26 0.437591
\(768\) 2280.53 0.107151
\(769\) −14799.5 −0.693996 −0.346998 0.937866i \(-0.612799\pi\)
−0.346998 + 0.937866i \(0.612799\pi\)
\(770\) −3367.35 −0.157598
\(771\) −35831.2 −1.67371
\(772\) 11415.8 0.532205
\(773\) 9139.21 0.425245 0.212623 0.977134i \(-0.431800\pi\)
0.212623 + 0.977134i \(0.431800\pi\)
\(774\) −13039.5 −0.605551
\(775\) 11578.1 0.536643
\(776\) −7653.98 −0.354075
\(777\) −56850.6 −2.62484
\(778\) −16913.5 −0.779406
\(779\) 7374.93 0.339197
\(780\) 3136.72 0.143991
\(781\) −19342.1 −0.886193
\(782\) 0 0
\(783\) −48772.4 −2.22603
\(784\) 11868.6 0.540660
\(785\) 2847.95 0.129488
\(786\) 1330.00 0.0603557
\(787\) −14159.4 −0.641332 −0.320666 0.947192i \(-0.603907\pi\)
−0.320666 + 0.947192i \(0.603907\pi\)
\(788\) −19922.7 −0.900657
\(789\) 8642.82 0.389978
\(790\) 1682.26 0.0757621
\(791\) 7959.48 0.357783
\(792\) −16435.8 −0.737402
\(793\) −226.350 −0.0101361
\(794\) −6828.49 −0.305207
\(795\) −6606.56 −0.294730
\(796\) −11818.9 −0.526268
\(797\) −35152.0 −1.56229 −0.781146 0.624349i \(-0.785364\pi\)
−0.781146 + 0.624349i \(0.785364\pi\)
\(798\) 15294.6 0.678474
\(799\) 0 0
\(800\) 3945.69 0.174376
\(801\) −43494.0 −1.91858
\(802\) −11576.9 −0.509720
\(803\) 13448.7 0.591026
\(804\) −27243.8 −1.19504
\(805\) −2149.35 −0.0941051
\(806\) 12689.5 0.554553
\(807\) 14406.3 0.628408
\(808\) −9838.35 −0.428356
\(809\) 16641.9 0.723234 0.361617 0.932327i \(-0.382225\pi\)
0.361617 + 0.932327i \(0.382225\pi\)
\(810\) −1559.99 −0.0676696
\(811\) 5699.29 0.246768 0.123384 0.992359i \(-0.460625\pi\)
0.123384 + 0.992359i \(0.460625\pi\)
\(812\) −28443.9 −1.22929
\(813\) −40032.5 −1.72694
\(814\) 15205.9 0.654751
\(815\) 462.211 0.0198657
\(816\) 0 0
\(817\) −3245.54 −0.138980
\(818\) 25108.9 1.07324
\(819\) 116522. 4.97143
\(820\) −1474.51 −0.0627953
\(821\) −9843.36 −0.418436 −0.209218 0.977869i \(-0.567092\pi\)
−0.209218 + 0.977869i \(0.567092\pi\)
\(822\) 9704.04 0.411761
\(823\) 25466.1 1.07860 0.539302 0.842112i \(-0.318688\pi\)
0.539302 + 0.842112i \(0.318688\pi\)
\(824\) −3870.48 −0.163634
\(825\) −43100.8 −1.81888
\(826\) −9061.78 −0.381719
\(827\) 20037.3 0.842521 0.421260 0.906940i \(-0.361588\pi\)
0.421260 + 0.906940i \(0.361588\pi\)
\(828\) −10490.9 −0.440317
\(829\) −21911.2 −0.917982 −0.458991 0.888441i \(-0.651789\pi\)
−0.458991 + 0.888441i \(0.651789\pi\)
\(830\) 3321.21 0.138893
\(831\) 24000.6 1.00189
\(832\) 4324.44 0.180196
\(833\) 0 0
\(834\) 24684.8 1.02490
\(835\) −1460.13 −0.0605146
\(836\) −4090.87 −0.169241
\(837\) −21212.0 −0.875978
\(838\) −10211.3 −0.420936
\(839\) 39532.6 1.62672 0.813360 0.581761i \(-0.197636\pi\)
0.813360 + 0.581761i \(0.197636\pi\)
\(840\) −3057.93 −0.125606
\(841\) 22224.9 0.911266
\(842\) −20150.1 −0.824726
\(843\) 26552.7 1.08484
\(844\) 8568.37 0.349449
\(845\) 3085.78 0.125626
\(846\) −21238.3 −0.863105
\(847\) 6873.37 0.278833
\(848\) −9108.13 −0.368838
\(849\) −25509.5 −1.03119
\(850\) 0 0
\(851\) 9705.82 0.390965
\(852\) −17564.9 −0.706293
\(853\) 32412.3 1.30103 0.650513 0.759495i \(-0.274554\pi\)
0.650513 + 0.759495i \(0.274554\pi\)
\(854\) 220.664 0.00884189
\(855\) −1777.85 −0.0711124
\(856\) −5833.91 −0.232943
\(857\) −41373.5 −1.64912 −0.824559 0.565777i \(-0.808576\pi\)
−0.824559 + 0.565777i \(0.808576\pi\)
\(858\) −47238.1 −1.87958
\(859\) −19281.0 −0.765843 −0.382922 0.923781i \(-0.625082\pi\)
−0.382922 + 0.923781i \(0.625082\pi\)
\(860\) 648.898 0.0257294
\(861\) −83020.7 −3.28610
\(862\) −27948.4 −1.10432
\(863\) 36539.7 1.44128 0.720640 0.693309i \(-0.243848\pi\)
0.720640 + 0.693309i \(0.243848\pi\)
\(864\) −7228.80 −0.284640
\(865\) 2255.99 0.0886775
\(866\) −3657.43 −0.143515
\(867\) 0 0
\(868\) −12370.8 −0.483746
\(869\) −25334.3 −0.988962
\(870\) 5011.33 0.195288
\(871\) −51660.9 −2.00971
\(872\) −17882.1 −0.694456
\(873\) 50093.7 1.94205
\(874\) −2611.17 −0.101057
\(875\) −10654.3 −0.411634
\(876\) 12212.9 0.471047
\(877\) −42217.1 −1.62551 −0.812753 0.582608i \(-0.802032\pi\)
−0.812753 + 0.582608i \(0.802032\pi\)
\(878\) −19519.1 −0.750270
\(879\) −6725.15 −0.258059
\(880\) 817.911 0.0313316
\(881\) 18566.8 0.710023 0.355012 0.934862i \(-0.384477\pi\)
0.355012 + 0.934862i \(0.384477\pi\)
\(882\) −77677.2 −2.96545
\(883\) 1627.71 0.0620347 0.0310174 0.999519i \(-0.490125\pi\)
0.0310174 + 0.999519i \(0.490125\pi\)
\(884\) 0 0
\(885\) 1596.53 0.0606404
\(886\) −17612.0 −0.667818
\(887\) −32502.7 −1.23037 −0.615183 0.788384i \(-0.710918\pi\)
−0.615183 + 0.788384i \(0.710918\pi\)
\(888\) 13808.7 0.521835
\(889\) 31341.6 1.18241
\(890\) 2164.43 0.0815190
\(891\) 23493.0 0.883326
\(892\) −12680.6 −0.475983
\(893\) −5286.20 −0.198092
\(894\) −8581.00 −0.321020
\(895\) 5469.10 0.204259
\(896\) −4215.82 −0.157188
\(897\) −30151.7 −1.12234
\(898\) 34515.5 1.28262
\(899\) 20273.2 0.752113
\(900\) −25823.7 −0.956433
\(901\) 0 0
\(902\) 22205.7 0.819699
\(903\) 36535.5 1.34643
\(904\) −1933.32 −0.0711295
\(905\) 61.8375 0.00227133
\(906\) 3613.10 0.132491
\(907\) 9352.99 0.342404 0.171202 0.985236i \(-0.445235\pi\)
0.171202 + 0.985236i \(0.445235\pi\)
\(908\) −8915.16 −0.325837
\(909\) 64389.9 2.34948
\(910\) −5798.58 −0.211232
\(911\) −20763.9 −0.755148 −0.377574 0.925979i \(-0.623242\pi\)
−0.377574 + 0.925979i \(0.623242\pi\)
\(912\) −3714.97 −0.134885
\(913\) −50016.5 −1.81304
\(914\) 16912.0 0.612036
\(915\) −38.8773 −0.00140464
\(916\) −7911.81 −0.285386
\(917\) −2458.66 −0.0885409
\(918\) 0 0
\(919\) 7827.21 0.280953 0.140477 0.990084i \(-0.455137\pi\)
0.140477 + 0.990084i \(0.455137\pi\)
\(920\) 522.066 0.0187087
\(921\) −71115.1 −2.54433
\(922\) −27585.7 −0.985343
\(923\) −33307.2 −1.18778
\(924\) 46051.6 1.63959
\(925\) 23891.3 0.849233
\(926\) 24956.0 0.885641
\(927\) 25331.5 0.897513
\(928\) 6908.88 0.244391
\(929\) −36622.2 −1.29336 −0.646682 0.762759i \(-0.723844\pi\)
−0.646682 + 0.762759i \(0.723844\pi\)
\(930\) 2179.52 0.0768487
\(931\) −19333.8 −0.680603
\(932\) 19307.3 0.678576
\(933\) −31429.1 −1.10283
\(934\) 32132.2 1.12569
\(935\) 0 0
\(936\) −28302.5 −0.988352
\(937\) −17041.0 −0.594136 −0.297068 0.954856i \(-0.596009\pi\)
−0.297068 + 0.954856i \(0.596009\pi\)
\(938\) 50363.2 1.75311
\(939\) 24953.5 0.867227
\(940\) 1056.90 0.0366726
\(941\) −41668.5 −1.44352 −0.721760 0.692143i \(-0.756667\pi\)
−0.721760 + 0.692143i \(0.756667\pi\)
\(942\) −38948.4 −1.34714
\(943\) 14173.7 0.489459
\(944\) 2201.06 0.0758880
\(945\) 9692.99 0.333664
\(946\) −9772.22 −0.335859
\(947\) 52253.7 1.79305 0.896524 0.442995i \(-0.146084\pi\)
0.896524 + 0.442995i \(0.146084\pi\)
\(948\) −23006.4 −0.788200
\(949\) 23158.7 0.792163
\(950\) −6427.51 −0.219511
\(951\) −80370.7 −2.74048
\(952\) 0 0
\(953\) 55894.2 1.89988 0.949942 0.312425i \(-0.101141\pi\)
0.949942 + 0.312425i \(0.101141\pi\)
\(954\) 59610.8 2.02303
\(955\) 1758.23 0.0595758
\(956\) 598.879 0.0202606
\(957\) −75469.3 −2.54919
\(958\) −26705.0 −0.900625
\(959\) −17939.0 −0.604046
\(960\) 742.755 0.0249712
\(961\) −20973.8 −0.704032
\(962\) 26184.6 0.877575
\(963\) 38181.7 1.27766
\(964\) 29382.9 0.981702
\(965\) 3718.04 0.124029
\(966\) 29394.3 0.979034
\(967\) −27667.3 −0.920082 −0.460041 0.887898i \(-0.652165\pi\)
−0.460041 + 0.887898i \(0.652165\pi\)
\(968\) −1669.50 −0.0554338
\(969\) 0 0
\(970\) −2492.86 −0.0825162
\(971\) −42803.0 −1.41464 −0.707319 0.706894i \(-0.750096\pi\)
−0.707319 + 0.706894i \(0.750096\pi\)
\(972\) −3062.94 −0.101074
\(973\) −45632.6 −1.50351
\(974\) −22170.8 −0.729360
\(975\) −74219.7 −2.43788
\(976\) −53.5982 −0.00175782
\(977\) 30623.7 1.00280 0.501401 0.865215i \(-0.332818\pi\)
0.501401 + 0.865215i \(0.332818\pi\)
\(978\) −6321.16 −0.206675
\(979\) −32595.7 −1.06411
\(980\) 3865.52 0.126000
\(981\) 117035. 3.80900
\(982\) 26875.3 0.873344
\(983\) −17370.2 −0.563603 −0.281802 0.959473i \(-0.590932\pi\)
−0.281802 + 0.959473i \(0.590932\pi\)
\(984\) 20165.3 0.653298
\(985\) −6488.71 −0.209896
\(986\) 0 0
\(987\) 59507.5 1.91909
\(988\) −7044.49 −0.226837
\(989\) −6237.53 −0.200548
\(990\) −5353.05 −0.171850
\(991\) 56024.6 1.79584 0.897922 0.440155i \(-0.145077\pi\)
0.897922 + 0.440155i \(0.145077\pi\)
\(992\) 3004.80 0.0961718
\(993\) 90175.3 2.88180
\(994\) 32470.6 1.03612
\(995\) −3849.34 −0.122645
\(996\) −45420.6 −1.44499
\(997\) 11709.6 0.371962 0.185981 0.982553i \(-0.440454\pi\)
0.185981 + 0.982553i \(0.440454\pi\)
\(998\) −26330.3 −0.835142
\(999\) −43770.6 −1.38623
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 578.4.a.g.1.2 yes 2
17.4 even 4 578.4.b.f.577.1 4
17.13 even 4 578.4.b.f.577.4 4
17.16 even 2 578.4.a.e.1.1 2
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
578.4.a.e.1.1 2 17.16 even 2
578.4.a.g.1.2 yes 2 1.1 even 1 trivial
578.4.b.f.577.1 4 17.4 even 4
578.4.b.f.577.4 4 17.13 even 4