Properties

Label 1849.4.a.f.1.9
Level $1849$
Weight $4$
Character 1849.1
Self dual yes
Analytic conductor $109.095$
Analytic rank $1$
Dimension $10$
CM no
Inner twists $1$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [1849,4,Mod(1,1849)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(1849, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("1849.1");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 1849 = 43^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 1849.a (trivial)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(109.094531601\)
Analytic rank: \(1\)
Dimension: \(10\)
Coefficient field: \(\mathbb{Q}[x]/(x^{10} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{10} - x^{9} - 59x^{8} + 42x^{7} + 1187x^{6} - 541x^{5} - 9389x^{4} + 2180x^{3} + 22676x^{2} - 320x - 768 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 2^{3} \)
Twist minimal: no (minimal twist has level 43)
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.9
Root \(4.23473\) of defining polynomial
Character \(\chi\) \(=\) 1849.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+4.23473 q^{2} +8.85858 q^{3} +9.93292 q^{4} -5.96488 q^{5} +37.5137 q^{6} -22.5055 q^{7} +8.18537 q^{8} +51.4744 q^{9} +O(q^{10})\) \(q+4.23473 q^{2} +8.85858 q^{3} +9.93292 q^{4} -5.96488 q^{5} +37.5137 q^{6} -22.5055 q^{7} +8.18537 q^{8} +51.4744 q^{9} -25.2597 q^{10} -46.0555 q^{11} +87.9915 q^{12} +9.08413 q^{13} -95.3047 q^{14} -52.8404 q^{15} -44.8005 q^{16} -80.2232 q^{17} +217.980 q^{18} +144.978 q^{19} -59.2487 q^{20} -199.367 q^{21} -195.033 q^{22} -111.217 q^{23} +72.5108 q^{24} -89.4201 q^{25} +38.4688 q^{26} +216.809 q^{27} -223.545 q^{28} +81.3734 q^{29} -223.765 q^{30} -244.968 q^{31} -255.201 q^{32} -407.987 q^{33} -339.723 q^{34} +134.243 q^{35} +511.291 q^{36} +176.027 q^{37} +613.941 q^{38} +80.4725 q^{39} -48.8248 q^{40} -186.729 q^{41} -844.264 q^{42} -457.466 q^{44} -307.039 q^{45} -470.972 q^{46} +29.1612 q^{47} -396.869 q^{48} +163.498 q^{49} -378.670 q^{50} -710.664 q^{51} +90.2319 q^{52} -547.832 q^{53} +918.126 q^{54} +274.716 q^{55} -184.216 q^{56} +1284.30 q^{57} +344.594 q^{58} -281.600 q^{59} -524.859 q^{60} +699.247 q^{61} -1037.37 q^{62} -1158.46 q^{63} -722.302 q^{64} -54.1858 q^{65} -1727.71 q^{66} +30.6364 q^{67} -796.850 q^{68} -985.221 q^{69} +568.482 q^{70} -344.362 q^{71} +421.337 q^{72} +649.371 q^{73} +745.425 q^{74} -792.136 q^{75} +1440.05 q^{76} +1036.50 q^{77} +340.779 q^{78} -124.517 q^{79} +267.230 q^{80} +530.808 q^{81} -790.745 q^{82} +752.750 q^{83} -1980.29 q^{84} +478.522 q^{85} +720.853 q^{87} -376.981 q^{88} +44.3603 q^{89} -1300.23 q^{90} -204.443 q^{91} -1104.70 q^{92} -2170.07 q^{93} +123.490 q^{94} -864.775 q^{95} -2260.72 q^{96} -1133.55 q^{97} +692.370 q^{98} -2370.68 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 10 q + q^{2} - 5 q^{3} + 39 q^{4} - 19 q^{5} - 15 q^{6} - 51 q^{7} + 36 q^{8} + 117 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 10 q + q^{2} - 5 q^{3} + 39 q^{4} - 19 q^{5} - 15 q^{6} - 51 q^{7} + 36 q^{8} + 117 q^{9} - 27 q^{10} + 27 q^{11} - 72 q^{12} + 15 q^{13} - 96 q^{14} - 65 q^{15} + 67 q^{16} + 82 q^{17} + 247 q^{18} + 78 q^{19} - 495 q^{20} - 9 q^{21} - 190 q^{22} + 61 q^{23} - 202 q^{24} + 151 q^{25} - 21 q^{26} + 97 q^{27} - 794 q^{28} - 53 q^{29} + 627 q^{30} - 253 q^{31} + 399 q^{32} - 424 q^{33} - 231 q^{34} + 355 q^{35} + 1092 q^{36} - 129 q^{37} + 854 q^{38} - 691 q^{39} - 1345 q^{40} + 391 q^{41} - 31 q^{42} + 377 q^{44} - 944 q^{45} - 40 q^{46} - 334 q^{47} - 2401 q^{48} + 115 q^{49} + 424 q^{50} - 795 q^{51} + 564 q^{52} - 773 q^{53} + 182 q^{54} - 1242 q^{55} + 923 q^{56} + 765 q^{57} - 1328 q^{58} - 1483 q^{59} + 1075 q^{60} + 437 q^{61} + 1509 q^{62} - 2222 q^{63} - 738 q^{64} + 1063 q^{65} - 1483 q^{66} + 642 q^{67} + 1052 q^{68} - 3503 q^{69} + 85 q^{70} - 1545 q^{71} + 3834 q^{72} + 1292 q^{73} + 2232 q^{74} - 82 q^{75} - 252 q^{76} + 1448 q^{77} + 2822 q^{78} + 1405 q^{79} - 3157 q^{80} - 974 q^{81} - 3304 q^{82} - 543 q^{83} + 3652 q^{84} - 973 q^{85} + 1409 q^{87} + 2686 q^{88} - 2196 q^{89} - 742 q^{90} - 3513 q^{91} - 2629 q^{92} - 983 q^{93} - 4939 q^{94} + 149 q^{95} - 3540 q^{96} - 425 q^{97} - 213 q^{98} + 3181 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Coefficient data

For each \(n\) we display the coefficients of the \(q\)-expansion \(a_n\), the Satake parameters \(\alpha_p\), and the Satake angles \(\theta_p = \textrm{Arg}(\alpha_p)\).



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 4.23473 1.49720 0.748601 0.663021i \(-0.230726\pi\)
0.748601 + 0.663021i \(0.230726\pi\)
\(3\) 8.85858 1.70483 0.852417 0.522862i \(-0.175136\pi\)
0.852417 + 0.522862i \(0.175136\pi\)
\(4\) 9.93292 1.24161
\(5\) −5.96488 −0.533516 −0.266758 0.963764i \(-0.585952\pi\)
−0.266758 + 0.963764i \(0.585952\pi\)
\(6\) 37.5137 2.55248
\(7\) −22.5055 −1.21518 −0.607592 0.794249i \(-0.707864\pi\)
−0.607592 + 0.794249i \(0.707864\pi\)
\(8\) 8.18537 0.361746
\(9\) 51.4744 1.90646
\(10\) −25.2597 −0.798781
\(11\) −46.0555 −1.26239 −0.631194 0.775625i \(-0.717435\pi\)
−0.631194 + 0.775625i \(0.717435\pi\)
\(12\) 87.9915 2.11675
\(13\) 9.08413 0.193806 0.0969032 0.995294i \(-0.469106\pi\)
0.0969032 + 0.995294i \(0.469106\pi\)
\(14\) −95.3047 −1.81938
\(15\) −52.8404 −0.909556
\(16\) −44.8005 −0.700008
\(17\) −80.2232 −1.14453 −0.572264 0.820069i \(-0.693935\pi\)
−0.572264 + 0.820069i \(0.693935\pi\)
\(18\) 217.980 2.85436
\(19\) 144.978 1.75054 0.875268 0.483639i \(-0.160685\pi\)
0.875268 + 0.483639i \(0.160685\pi\)
\(20\) −59.2487 −0.662421
\(21\) −199.367 −2.07169
\(22\) −195.033 −1.89005
\(23\) −111.217 −1.00827 −0.504136 0.863624i \(-0.668189\pi\)
−0.504136 + 0.863624i \(0.668189\pi\)
\(24\) 72.5108 0.616717
\(25\) −89.4201 −0.715361
\(26\) 38.4688 0.290167
\(27\) 216.809 1.54537
\(28\) −223.545 −1.50879
\(29\) 81.3734 0.521057 0.260529 0.965466i \(-0.416103\pi\)
0.260529 + 0.965466i \(0.416103\pi\)
\(30\) −223.765 −1.36179
\(31\) −244.968 −1.41928 −0.709638 0.704566i \(-0.751142\pi\)
−0.709638 + 0.704566i \(0.751142\pi\)
\(32\) −255.201 −1.40980
\(33\) −407.987 −2.15216
\(34\) −339.723 −1.71359
\(35\) 134.243 0.648319
\(36\) 511.291 2.36709
\(37\) 176.027 0.782125 0.391062 0.920364i \(-0.372108\pi\)
0.391062 + 0.920364i \(0.372108\pi\)
\(38\) 613.941 2.62091
\(39\) 80.4725 0.330408
\(40\) −48.8248 −0.192997
\(41\) −186.729 −0.711271 −0.355636 0.934625i \(-0.615736\pi\)
−0.355636 + 0.934625i \(0.615736\pi\)
\(42\) −844.264 −3.10173
\(43\) 0 0
\(44\) −457.466 −1.56740
\(45\) −307.039 −1.01713
\(46\) −470.972 −1.50959
\(47\) 29.1612 0.0905020 0.0452510 0.998976i \(-0.485591\pi\)
0.0452510 + 0.998976i \(0.485591\pi\)
\(48\) −396.869 −1.19340
\(49\) 163.498 0.476671
\(50\) −378.670 −1.07104
\(51\) −710.664 −1.95123
\(52\) 90.2319 0.240633
\(53\) −547.832 −1.41982 −0.709910 0.704292i \(-0.751265\pi\)
−0.709910 + 0.704292i \(0.751265\pi\)
\(54\) 918.126 2.31373
\(55\) 274.716 0.673503
\(56\) −184.216 −0.439587
\(57\) 1284.30 2.98437
\(58\) 344.594 0.780128
\(59\) −281.600 −0.621376 −0.310688 0.950512i \(-0.600560\pi\)
−0.310688 + 0.950512i \(0.600560\pi\)
\(60\) −524.859 −1.12932
\(61\) 699.247 1.46770 0.733848 0.679314i \(-0.237723\pi\)
0.733848 + 0.679314i \(0.237723\pi\)
\(62\) −1037.37 −2.12494
\(63\) −1158.46 −2.31670
\(64\) −722.302 −1.41075
\(65\) −54.1858 −0.103399
\(66\) −1727.71 −3.22222
\(67\) 30.6364 0.0558631 0.0279316 0.999610i \(-0.491108\pi\)
0.0279316 + 0.999610i \(0.491108\pi\)
\(68\) −796.850 −1.42106
\(69\) −985.221 −1.71894
\(70\) 568.482 0.970665
\(71\) −344.362 −0.575609 −0.287805 0.957689i \(-0.592925\pi\)
−0.287805 + 0.957689i \(0.592925\pi\)
\(72\) 421.337 0.689654
\(73\) 649.371 1.04114 0.520569 0.853819i \(-0.325720\pi\)
0.520569 + 0.853819i \(0.325720\pi\)
\(74\) 745.425 1.17100
\(75\) −792.136 −1.21957
\(76\) 1440.05 2.17349
\(77\) 1036.50 1.53403
\(78\) 340.779 0.494687
\(79\) −124.517 −0.177332 −0.0886662 0.996061i \(-0.528260\pi\)
−0.0886662 + 0.996061i \(0.528260\pi\)
\(80\) 267.230 0.373465
\(81\) 530.808 0.728132
\(82\) −790.745 −1.06492
\(83\) 752.750 0.995483 0.497741 0.867326i \(-0.334163\pi\)
0.497741 + 0.867326i \(0.334163\pi\)
\(84\) −1980.29 −2.57224
\(85\) 478.522 0.610624
\(86\) 0 0
\(87\) 720.853 0.888317
\(88\) −376.981 −0.456663
\(89\) 44.3603 0.0528335 0.0264167 0.999651i \(-0.491590\pi\)
0.0264167 + 0.999651i \(0.491590\pi\)
\(90\) −1300.23 −1.52284
\(91\) −204.443 −0.235510
\(92\) −1104.70 −1.25188
\(93\) −2170.07 −2.41963
\(94\) 123.490 0.135500
\(95\) −864.775 −0.933938
\(96\) −2260.72 −2.40347
\(97\) −1133.55 −1.18654 −0.593271 0.805003i \(-0.702164\pi\)
−0.593271 + 0.805003i \(0.702164\pi\)
\(98\) 692.370 0.713673
\(99\) −2370.68 −2.40669
\(100\) −888.203 −0.888203
\(101\) 941.388 0.927442 0.463721 0.885981i \(-0.346514\pi\)
0.463721 + 0.885981i \(0.346514\pi\)
\(102\) −3009.47 −2.92139
\(103\) 93.1351 0.0890959 0.0445479 0.999007i \(-0.485815\pi\)
0.0445479 + 0.999007i \(0.485815\pi\)
\(104\) 74.3569 0.0701086
\(105\) 1189.20 1.10528
\(106\) −2319.92 −2.12576
\(107\) 493.709 0.446062 0.223031 0.974811i \(-0.428405\pi\)
0.223031 + 0.974811i \(0.428405\pi\)
\(108\) 2153.54 1.91875
\(109\) −1345.60 −1.18243 −0.591215 0.806514i \(-0.701352\pi\)
−0.591215 + 0.806514i \(0.701352\pi\)
\(110\) 1163.35 1.00837
\(111\) 1559.35 1.33339
\(112\) 1008.26 0.850638
\(113\) −851.829 −0.709144 −0.354572 0.935029i \(-0.615373\pi\)
−0.354572 + 0.935029i \(0.615373\pi\)
\(114\) 5438.65 4.46821
\(115\) 663.394 0.537929
\(116\) 808.275 0.646952
\(117\) 467.600 0.369484
\(118\) −1192.50 −0.930326
\(119\) 1805.46 1.39081
\(120\) −432.518 −0.329028
\(121\) 790.111 0.593622
\(122\) 2961.12 2.19744
\(123\) −1654.15 −1.21260
\(124\) −2433.25 −1.76219
\(125\) 1278.99 0.915172
\(126\) −4905.76 −3.46857
\(127\) 887.141 0.619850 0.309925 0.950761i \(-0.399696\pi\)
0.309925 + 0.950761i \(0.399696\pi\)
\(128\) −1017.15 −0.702374
\(129\) 0 0
\(130\) −229.462 −0.154809
\(131\) −192.747 −0.128553 −0.0642764 0.997932i \(-0.520474\pi\)
−0.0642764 + 0.997932i \(0.520474\pi\)
\(132\) −4052.50 −2.67216
\(133\) −3262.80 −2.12722
\(134\) 129.737 0.0836384
\(135\) −1293.24 −0.824477
\(136\) −656.657 −0.414028
\(137\) −489.758 −0.305423 −0.152711 0.988271i \(-0.548800\pi\)
−0.152711 + 0.988271i \(0.548800\pi\)
\(138\) −4172.14 −2.57360
\(139\) 2898.23 1.76852 0.884261 0.466993i \(-0.154663\pi\)
0.884261 + 0.466993i \(0.154663\pi\)
\(140\) 1333.42 0.804963
\(141\) 258.326 0.154291
\(142\) −1458.28 −0.861804
\(143\) −418.374 −0.244659
\(144\) −2306.08 −1.33454
\(145\) −485.383 −0.277992
\(146\) 2749.91 1.55879
\(147\) 1448.36 0.812645
\(148\) 1748.46 0.971098
\(149\) −960.239 −0.527959 −0.263979 0.964528i \(-0.585035\pi\)
−0.263979 + 0.964528i \(0.585035\pi\)
\(150\) −3354.48 −1.82595
\(151\) 819.300 0.441548 0.220774 0.975325i \(-0.429142\pi\)
0.220774 + 0.975325i \(0.429142\pi\)
\(152\) 1186.70 0.633249
\(153\) −4129.44 −2.18200
\(154\) 4389.31 2.29676
\(155\) 1461.21 0.757206
\(156\) 799.326 0.410239
\(157\) 134.800 0.0685235 0.0342618 0.999413i \(-0.489092\pi\)
0.0342618 + 0.999413i \(0.489092\pi\)
\(158\) −527.296 −0.265502
\(159\) −4853.01 −2.42056
\(160\) 1522.24 0.752150
\(161\) 2502.99 1.22524
\(162\) 2247.83 1.09016
\(163\) 3326.69 1.59857 0.799283 0.600955i \(-0.205213\pi\)
0.799283 + 0.600955i \(0.205213\pi\)
\(164\) −1854.76 −0.883125
\(165\) 2433.59 1.14821
\(166\) 3187.69 1.49044
\(167\) −1180.06 −0.546803 −0.273401 0.961900i \(-0.588149\pi\)
−0.273401 + 0.961900i \(0.588149\pi\)
\(168\) −1631.89 −0.749424
\(169\) −2114.48 −0.962439
\(170\) 2026.41 0.914227
\(171\) 7462.65 3.33733
\(172\) 0 0
\(173\) −1091.38 −0.479631 −0.239816 0.970818i \(-0.577087\pi\)
−0.239816 + 0.970818i \(0.577087\pi\)
\(174\) 3052.62 1.32999
\(175\) 2012.45 0.869295
\(176\) 2063.31 0.883681
\(177\) −2494.58 −1.05934
\(178\) 187.854 0.0791024
\(179\) −3759.15 −1.56968 −0.784838 0.619701i \(-0.787254\pi\)
−0.784838 + 0.619701i \(0.787254\pi\)
\(180\) −3049.79 −1.26288
\(181\) −425.296 −0.174652 −0.0873259 0.996180i \(-0.527832\pi\)
−0.0873259 + 0.996180i \(0.527832\pi\)
\(182\) −865.760 −0.352607
\(183\) 6194.34 2.50218
\(184\) −910.349 −0.364738
\(185\) −1049.98 −0.417276
\(186\) −9189.66 −3.62268
\(187\) 3694.72 1.44484
\(188\) 289.655 0.112369
\(189\) −4879.39 −1.87790
\(190\) −3662.09 −1.39829
\(191\) −3327.75 −1.26067 −0.630335 0.776324i \(-0.717082\pi\)
−0.630335 + 0.776324i \(0.717082\pi\)
\(192\) −6398.57 −2.40509
\(193\) 2513.07 0.937278 0.468639 0.883390i \(-0.344744\pi\)
0.468639 + 0.883390i \(0.344744\pi\)
\(194\) −4800.27 −1.77649
\(195\) −480.009 −0.176278
\(196\) 1624.01 0.591842
\(197\) −2433.41 −0.880066 −0.440033 0.897982i \(-0.645033\pi\)
−0.440033 + 0.897982i \(0.645033\pi\)
\(198\) −10039.2 −3.60330
\(199\) −2829.37 −1.00788 −0.503942 0.863737i \(-0.668118\pi\)
−0.503942 + 0.863737i \(0.668118\pi\)
\(200\) −731.937 −0.258779
\(201\) 271.395 0.0952374
\(202\) 3986.52 1.38857
\(203\) −1831.35 −0.633180
\(204\) −7058.96 −2.42268
\(205\) 1113.82 0.379474
\(206\) 394.402 0.133395
\(207\) −5724.81 −1.92223
\(208\) −406.974 −0.135666
\(209\) −6677.02 −2.20985
\(210\) 5035.94 1.65482
\(211\) 892.853 0.291311 0.145655 0.989335i \(-0.453471\pi\)
0.145655 + 0.989335i \(0.453471\pi\)
\(212\) −5441.57 −1.76287
\(213\) −3050.56 −0.981319
\(214\) 2090.72 0.667845
\(215\) 0 0
\(216\) 1774.66 0.559029
\(217\) 5513.14 1.72468
\(218\) −5698.24 −1.77034
\(219\) 5752.50 1.77497
\(220\) 2728.73 0.836231
\(221\) −728.758 −0.221817
\(222\) 6603.41 1.99636
\(223\) −4867.53 −1.46168 −0.730838 0.682551i \(-0.760871\pi\)
−0.730838 + 0.682551i \(0.760871\pi\)
\(224\) 5743.43 1.71316
\(225\) −4602.85 −1.36381
\(226\) −3607.26 −1.06173
\(227\) 4376.31 1.27958 0.639792 0.768548i \(-0.279020\pi\)
0.639792 + 0.768548i \(0.279020\pi\)
\(228\) 12756.8 3.70544
\(229\) 2818.42 0.813304 0.406652 0.913583i \(-0.366696\pi\)
0.406652 + 0.913583i \(0.366696\pi\)
\(230\) 2809.29 0.805388
\(231\) 9181.95 2.61527
\(232\) 666.072 0.188490
\(233\) 2809.91 0.790058 0.395029 0.918669i \(-0.370735\pi\)
0.395029 + 0.918669i \(0.370735\pi\)
\(234\) 1980.16 0.553193
\(235\) −173.943 −0.0482842
\(236\) −2797.11 −0.771510
\(237\) −1103.04 −0.302322
\(238\) 7645.65 2.08233
\(239\) 496.604 0.134404 0.0672021 0.997739i \(-0.478593\pi\)
0.0672021 + 0.997739i \(0.478593\pi\)
\(240\) 2367.28 0.636696
\(241\) 1348.00 0.360300 0.180150 0.983639i \(-0.442342\pi\)
0.180150 + 0.983639i \(0.442342\pi\)
\(242\) 3345.90 0.888772
\(243\) −1151.63 −0.304021
\(244\) 6945.56 1.82231
\(245\) −975.248 −0.254311
\(246\) −7004.88 −1.81551
\(247\) 1317.00 0.339265
\(248\) −2005.16 −0.513417
\(249\) 6668.30 1.69713
\(250\) 5416.18 1.37020
\(251\) −2677.99 −0.673439 −0.336719 0.941605i \(-0.609317\pi\)
−0.336719 + 0.941605i \(0.609317\pi\)
\(252\) −11506.9 −2.87645
\(253\) 5122.14 1.27283
\(254\) 3756.80 0.928042
\(255\) 4239.03 1.04101
\(256\) 1471.08 0.359151
\(257\) −3557.37 −0.863434 −0.431717 0.902009i \(-0.642092\pi\)
−0.431717 + 0.902009i \(0.642092\pi\)
\(258\) 0 0
\(259\) −3961.57 −0.950425
\(260\) −538.223 −0.128381
\(261\) 4188.65 0.993376
\(262\) −816.233 −0.192470
\(263\) 154.432 0.0362080 0.0181040 0.999836i \(-0.494237\pi\)
0.0181040 + 0.999836i \(0.494237\pi\)
\(264\) −3339.52 −0.778535
\(265\) 3267.75 0.757496
\(266\) −13817.1 −3.18488
\(267\) 392.969 0.0900723
\(268\) 304.309 0.0693605
\(269\) 83.4892 0.0189235 0.00946176 0.999955i \(-0.496988\pi\)
0.00946176 + 0.999955i \(0.496988\pi\)
\(270\) −5476.52 −1.23441
\(271\) 3239.98 0.726254 0.363127 0.931740i \(-0.381709\pi\)
0.363127 + 0.931740i \(0.381709\pi\)
\(272\) 3594.04 0.801179
\(273\) −1811.07 −0.401506
\(274\) −2073.99 −0.457279
\(275\) 4118.29 0.903063
\(276\) −9786.11 −2.13426
\(277\) 5068.83 1.09948 0.549741 0.835335i \(-0.314726\pi\)
0.549741 + 0.835335i \(0.314726\pi\)
\(278\) 12273.2 2.64784
\(279\) −12609.6 −2.70580
\(280\) 1098.83 0.234527
\(281\) 4572.70 0.970762 0.485381 0.874303i \(-0.338681\pi\)
0.485381 + 0.874303i \(0.338681\pi\)
\(282\) 1093.94 0.231005
\(283\) −3634.42 −0.763406 −0.381703 0.924285i \(-0.624662\pi\)
−0.381703 + 0.924285i \(0.624662\pi\)
\(284\) −3420.52 −0.714685
\(285\) −7660.68 −1.59221
\(286\) −1771.70 −0.366304
\(287\) 4202.43 0.864325
\(288\) −13136.3 −2.68773
\(289\) 1522.76 0.309945
\(290\) −2055.47 −0.416211
\(291\) −10041.6 −2.02286
\(292\) 6450.15 1.29269
\(293\) 5587.49 1.11408 0.557039 0.830486i \(-0.311937\pi\)
0.557039 + 0.830486i \(0.311937\pi\)
\(294\) 6133.42 1.21669
\(295\) 1679.71 0.331514
\(296\) 1440.84 0.282930
\(297\) −9985.24 −1.95085
\(298\) −4066.35 −0.790461
\(299\) −1010.31 −0.195410
\(300\) −7868.22 −1.51424
\(301\) 0 0
\(302\) 3469.51 0.661086
\(303\) 8339.36 1.58114
\(304\) −6495.08 −1.22539
\(305\) −4170.93 −0.783038
\(306\) −17487.1 −3.26689
\(307\) 640.632 0.119097 0.0595486 0.998225i \(-0.481034\pi\)
0.0595486 + 0.998225i \(0.481034\pi\)
\(308\) 10295.5 1.90468
\(309\) 825.045 0.151894
\(310\) 6187.81 1.13369
\(311\) 8471.76 1.54466 0.772330 0.635221i \(-0.219091\pi\)
0.772330 + 0.635221i \(0.219091\pi\)
\(312\) 658.697 0.119524
\(313\) 7812.40 1.41081 0.705404 0.708805i \(-0.250766\pi\)
0.705404 + 0.708805i \(0.250766\pi\)
\(314\) 570.840 0.102594
\(315\) 6910.07 1.23600
\(316\) −1236.82 −0.220178
\(317\) −11274.6 −1.99761 −0.998805 0.0488747i \(-0.984437\pi\)
−0.998805 + 0.0488747i \(0.984437\pi\)
\(318\) −20551.2 −3.62407
\(319\) −3747.70 −0.657776
\(320\) 4308.45 0.752655
\(321\) 4373.56 0.760462
\(322\) 10599.5 1.83443
\(323\) −11630.6 −2.00354
\(324\) 5272.47 0.904059
\(325\) −812.304 −0.138642
\(326\) 14087.6 2.39338
\(327\) −11920.1 −2.01585
\(328\) −1528.44 −0.257299
\(329\) −656.287 −0.109976
\(330\) 10305.6 1.71911
\(331\) 1041.60 0.172966 0.0864830 0.996253i \(-0.472437\pi\)
0.0864830 + 0.996253i \(0.472437\pi\)
\(332\) 7477.00 1.23601
\(333\) 9060.88 1.49109
\(334\) −4997.25 −0.818675
\(335\) −182.742 −0.0298038
\(336\) 8931.74 1.45020
\(337\) −5173.02 −0.836180 −0.418090 0.908406i \(-0.637300\pi\)
−0.418090 + 0.908406i \(0.637300\pi\)
\(338\) −8954.24 −1.44097
\(339\) −7545.99 −1.20897
\(340\) 4753.12 0.758159
\(341\) 11282.1 1.79168
\(342\) 31602.3 4.99665
\(343\) 4039.78 0.635941
\(344\) 0 0
\(345\) 5876.73 0.917079
\(346\) −4621.71 −0.718105
\(347\) 3932.41 0.608366 0.304183 0.952614i \(-0.401617\pi\)
0.304183 + 0.952614i \(0.401617\pi\)
\(348\) 7160.17 1.10295
\(349\) 2167.01 0.332371 0.166186 0.986094i \(-0.446855\pi\)
0.166186 + 0.986094i \(0.446855\pi\)
\(350\) 8522.16 1.30151
\(351\) 1969.52 0.299502
\(352\) 11753.4 1.77971
\(353\) 3792.49 0.571824 0.285912 0.958256i \(-0.407703\pi\)
0.285912 + 0.958256i \(0.407703\pi\)
\(354\) −10563.9 −1.58605
\(355\) 2054.08 0.307097
\(356\) 440.627 0.0655988
\(357\) 15993.8 2.37110
\(358\) −15919.0 −2.35012
\(359\) −6333.06 −0.931047 −0.465524 0.885035i \(-0.654134\pi\)
−0.465524 + 0.885035i \(0.654134\pi\)
\(360\) −2513.23 −0.367941
\(361\) 14159.5 2.06437
\(362\) −1801.01 −0.261489
\(363\) 6999.26 1.01203
\(364\) −2030.71 −0.292413
\(365\) −3873.42 −0.555464
\(366\) 26231.3 3.74627
\(367\) −8820.87 −1.25462 −0.627310 0.778770i \(-0.715844\pi\)
−0.627310 + 0.778770i \(0.715844\pi\)
\(368\) 4982.56 0.705798
\(369\) −9611.76 −1.35601
\(370\) −4446.38 −0.624746
\(371\) 12329.2 1.72534
\(372\) −21555.1 −3.00425
\(373\) −5560.79 −0.771921 −0.385961 0.922515i \(-0.626130\pi\)
−0.385961 + 0.922515i \(0.626130\pi\)
\(374\) 15646.1 2.16321
\(375\) 11330.0 1.56022
\(376\) 238.695 0.0327387
\(377\) 739.207 0.100984
\(378\) −20662.9 −2.81160
\(379\) −8674.03 −1.17561 −0.587804 0.809004i \(-0.700007\pi\)
−0.587804 + 0.809004i \(0.700007\pi\)
\(380\) −8589.74 −1.15959
\(381\) 7858.81 1.05674
\(382\) −14092.1 −1.88748
\(383\) −14344.6 −1.91377 −0.956885 0.290467i \(-0.906189\pi\)
−0.956885 + 0.290467i \(0.906189\pi\)
\(384\) −9010.47 −1.19743
\(385\) −6182.62 −0.818430
\(386\) 10642.2 1.40330
\(387\) 0 0
\(388\) −11259.5 −1.47323
\(389\) −6725.93 −0.876654 −0.438327 0.898816i \(-0.644429\pi\)
−0.438327 + 0.898816i \(0.644429\pi\)
\(390\) −2032.71 −0.263923
\(391\) 8922.15 1.15400
\(392\) 1338.29 0.172434
\(393\) −1707.47 −0.219161
\(394\) −10304.8 −1.31764
\(395\) 742.730 0.0946096
\(396\) −23547.8 −2.98818
\(397\) 8910.23 1.12643 0.563214 0.826311i \(-0.309565\pi\)
0.563214 + 0.826311i \(0.309565\pi\)
\(398\) −11981.6 −1.50901
\(399\) −28903.8 −3.62656
\(400\) 4006.07 0.500759
\(401\) −8835.43 −1.10030 −0.550150 0.835066i \(-0.685430\pi\)
−0.550150 + 0.835066i \(0.685430\pi\)
\(402\) 1149.28 0.142590
\(403\) −2225.32 −0.275065
\(404\) 9350.73 1.15153
\(405\) −3166.21 −0.388470
\(406\) −7755.27 −0.947999
\(407\) −8107.00 −0.987345
\(408\) −5817.04 −0.705850
\(409\) 5924.70 0.716277 0.358139 0.933668i \(-0.383412\pi\)
0.358139 + 0.933668i \(0.383412\pi\)
\(410\) 4716.70 0.568150
\(411\) −4338.56 −0.520695
\(412\) 925.103 0.110623
\(413\) 6337.55 0.755086
\(414\) −24243.0 −2.87797
\(415\) −4490.07 −0.531105
\(416\) −2318.28 −0.273228
\(417\) 25674.2 3.01504
\(418\) −28275.4 −3.30860
\(419\) 8197.03 0.955730 0.477865 0.878433i \(-0.341411\pi\)
0.477865 + 0.878433i \(0.341411\pi\)
\(420\) 11812.2 1.37233
\(421\) 7101.61 0.822117 0.411059 0.911609i \(-0.365159\pi\)
0.411059 + 0.911609i \(0.365159\pi\)
\(422\) 3780.99 0.436151
\(423\) 1501.05 0.172538
\(424\) −4484.21 −0.513614
\(425\) 7173.57 0.818751
\(426\) −12918.3 −1.46923
\(427\) −15736.9 −1.78352
\(428\) 4903.97 0.553837
\(429\) −3706.20 −0.417103
\(430\) 0 0
\(431\) 3042.03 0.339975 0.169987 0.985446i \(-0.445627\pi\)
0.169987 + 0.985446i \(0.445627\pi\)
\(432\) −9713.15 −1.08177
\(433\) −2767.54 −0.307158 −0.153579 0.988136i \(-0.549080\pi\)
−0.153579 + 0.988136i \(0.549080\pi\)
\(434\) 23346.6 2.58220
\(435\) −4299.81 −0.473931
\(436\) −13365.7 −1.46812
\(437\) −16123.9 −1.76502
\(438\) 24360.3 2.65749
\(439\) 7776.24 0.845421 0.422711 0.906265i \(-0.361079\pi\)
0.422711 + 0.906265i \(0.361079\pi\)
\(440\) 2248.65 0.243637
\(441\) 8415.98 0.908755
\(442\) −3086.09 −0.332105
\(443\) −6881.29 −0.738013 −0.369007 0.929427i \(-0.620302\pi\)
−0.369007 + 0.929427i \(0.620302\pi\)
\(444\) 15488.9 1.65556
\(445\) −264.604 −0.0281875
\(446\) −20612.7 −2.18843
\(447\) −8506.36 −0.900083
\(448\) 16255.8 1.71432
\(449\) 3267.04 0.343388 0.171694 0.985150i \(-0.445076\pi\)
0.171694 + 0.985150i \(0.445076\pi\)
\(450\) −19491.8 −2.04190
\(451\) 8599.89 0.897900
\(452\) −8461.14 −0.880484
\(453\) 7257.84 0.752766
\(454\) 18532.5 1.91580
\(455\) 1219.48 0.125648
\(456\) 10512.4 1.07958
\(457\) −15041.8 −1.53966 −0.769832 0.638246i \(-0.779660\pi\)
−0.769832 + 0.638246i \(0.779660\pi\)
\(458\) 11935.2 1.21768
\(459\) −17393.1 −1.76871
\(460\) 6589.44 0.667900
\(461\) 6945.59 0.701710 0.350855 0.936430i \(-0.385891\pi\)
0.350855 + 0.936430i \(0.385891\pi\)
\(462\) 38883.0 3.91559
\(463\) −16606.8 −1.66692 −0.833460 0.552580i \(-0.813644\pi\)
−0.833460 + 0.552580i \(0.813644\pi\)
\(464\) −3645.57 −0.364744
\(465\) 12944.2 1.29091
\(466\) 11899.2 1.18288
\(467\) 12959.8 1.28418 0.642088 0.766631i \(-0.278069\pi\)
0.642088 + 0.766631i \(0.278069\pi\)
\(468\) 4644.64 0.458757
\(469\) −689.487 −0.0678839
\(470\) −736.601 −0.0722912
\(471\) 1194.13 0.116821
\(472\) −2305.00 −0.224780
\(473\) 0 0
\(474\) −4671.09 −0.452638
\(475\) −12963.9 −1.25226
\(476\) 17933.5 1.72685
\(477\) −28199.3 −2.70683
\(478\) 2102.98 0.201230
\(479\) −18846.7 −1.79777 −0.898883 0.438189i \(-0.855620\pi\)
−0.898883 + 0.438189i \(0.855620\pi\)
\(480\) 13484.9 1.28229
\(481\) 1599.05 0.151581
\(482\) 5708.42 0.539443
\(483\) 22172.9 2.08882
\(484\) 7848.10 0.737050
\(485\) 6761.49 0.633038
\(486\) −4876.84 −0.455181
\(487\) −2.43644 −0.000226706 0 −0.000113353 1.00000i \(-0.500036\pi\)
−0.000113353 1.00000i \(0.500036\pi\)
\(488\) 5723.60 0.530933
\(489\) 29469.7 2.72529
\(490\) −4129.91 −0.380756
\(491\) −17349.9 −1.59469 −0.797344 0.603525i \(-0.793762\pi\)
−0.797344 + 0.603525i \(0.793762\pi\)
\(492\) −16430.5 −1.50558
\(493\) −6528.04 −0.596365
\(494\) 5577.12 0.507948
\(495\) 14140.8 1.28401
\(496\) 10974.7 0.993505
\(497\) 7750.05 0.699471
\(498\) 28238.4 2.54095
\(499\) 3385.64 0.303731 0.151866 0.988401i \(-0.451472\pi\)
0.151866 + 0.988401i \(0.451472\pi\)
\(500\) 12704.1 1.13629
\(501\) −10453.7 −0.932209
\(502\) −11340.6 −1.00827
\(503\) 4310.15 0.382068 0.191034 0.981583i \(-0.438816\pi\)
0.191034 + 0.981583i \(0.438816\pi\)
\(504\) −9482.41 −0.838056
\(505\) −5615.27 −0.494805
\(506\) 21690.8 1.90568
\(507\) −18731.3 −1.64080
\(508\) 8811.89 0.769615
\(509\) −3107.28 −0.270585 −0.135292 0.990806i \(-0.543197\pi\)
−0.135292 + 0.990806i \(0.543197\pi\)
\(510\) 17951.1 1.55861
\(511\) −14614.4 −1.26517
\(512\) 14366.8 1.24010
\(513\) 31432.4 2.70522
\(514\) −15064.5 −1.29274
\(515\) −555.540 −0.0475340
\(516\) 0 0
\(517\) −1343.03 −0.114249
\(518\) −16776.2 −1.42298
\(519\) −9668.10 −0.817692
\(520\) −443.531 −0.0374040
\(521\) 6726.12 0.565598 0.282799 0.959179i \(-0.408737\pi\)
0.282799 + 0.959179i \(0.408737\pi\)
\(522\) 17737.8 1.48728
\(523\) 10484.3 0.876569 0.438285 0.898836i \(-0.355586\pi\)
0.438285 + 0.898836i \(0.355586\pi\)
\(524\) −1914.54 −0.159613
\(525\) 17827.4 1.48200
\(526\) 653.979 0.0542107
\(527\) 19652.1 1.62440
\(528\) 18278.0 1.50653
\(529\) 202.121 0.0166123
\(530\) 13838.0 1.13413
\(531\) −14495.2 −1.18463
\(532\) −32409.1 −2.64119
\(533\) −1696.27 −0.137849
\(534\) 1664.12 0.134856
\(535\) −2944.92 −0.237981
\(536\) 250.770 0.0202082
\(537\) −33300.7 −2.67604
\(538\) 353.554 0.0283323
\(539\) −7529.99 −0.601743
\(540\) −12845.6 −1.02368
\(541\) −8277.14 −0.657786 −0.328893 0.944367i \(-0.606675\pi\)
−0.328893 + 0.944367i \(0.606675\pi\)
\(542\) 13720.4 1.08735
\(543\) −3767.51 −0.297752
\(544\) 20473.0 1.61356
\(545\) 8026.34 0.630845
\(546\) −7669.41 −0.601136
\(547\) 3179.07 0.248496 0.124248 0.992251i \(-0.460348\pi\)
0.124248 + 0.992251i \(0.460348\pi\)
\(548\) −4864.73 −0.379217
\(549\) 35993.4 2.79810
\(550\) 17439.8 1.35207
\(551\) 11797.3 0.912129
\(552\) −8064.40 −0.621818
\(553\) 2802.32 0.215491
\(554\) 21465.1 1.64615
\(555\) −9301.33 −0.711386
\(556\) 28787.9 2.19582
\(557\) −19197.2 −1.46034 −0.730172 0.683263i \(-0.760560\pi\)
−0.730172 + 0.683263i \(0.760560\pi\)
\(558\) −53398.2 −4.05112
\(559\) 0 0
\(560\) −6014.15 −0.453829
\(561\) 32730.0 2.46321
\(562\) 19364.1 1.45343
\(563\) −21982.0 −1.64552 −0.822762 0.568386i \(-0.807568\pi\)
−0.822762 + 0.568386i \(0.807568\pi\)
\(564\) 2565.93 0.191570
\(565\) 5081.06 0.378339
\(566\) −15390.8 −1.14297
\(567\) −11946.1 −0.884814
\(568\) −2818.73 −0.208224
\(569\) 8889.61 0.654959 0.327480 0.944858i \(-0.393801\pi\)
0.327480 + 0.944858i \(0.393801\pi\)
\(570\) −32440.9 −2.38386
\(571\) −10927.5 −0.800877 −0.400439 0.916324i \(-0.631142\pi\)
−0.400439 + 0.916324i \(0.631142\pi\)
\(572\) −4155.68 −0.303772
\(573\) −29479.2 −2.14923
\(574\) 17796.1 1.29407
\(575\) 9945.00 0.721279
\(576\) −37180.1 −2.68953
\(577\) 15347.8 1.10734 0.553671 0.832736i \(-0.313227\pi\)
0.553671 + 0.832736i \(0.313227\pi\)
\(578\) 6448.48 0.464051
\(579\) 22262.2 1.59790
\(580\) −4821.27 −0.345159
\(581\) −16941.0 −1.20969
\(582\) −42523.6 −3.02863
\(583\) 25230.7 1.79236
\(584\) 5315.34 0.376627
\(585\) −2789.18 −0.197126
\(586\) 23661.5 1.66800
\(587\) −10600.8 −0.745388 −0.372694 0.927954i \(-0.621566\pi\)
−0.372694 + 0.927954i \(0.621566\pi\)
\(588\) 14386.5 1.00899
\(589\) −35514.9 −2.48449
\(590\) 7113.12 0.496343
\(591\) −21556.5 −1.50037
\(592\) −7886.09 −0.547494
\(593\) −20036.7 −1.38754 −0.693768 0.720198i \(-0.744051\pi\)
−0.693768 + 0.720198i \(0.744051\pi\)
\(594\) −42284.8 −2.92082
\(595\) −10769.4 −0.742020
\(596\) −9537.98 −0.655521
\(597\) −25064.2 −1.71828
\(598\) −4278.37 −0.292568
\(599\) −13670.5 −0.932490 −0.466245 0.884656i \(-0.654393\pi\)
−0.466245 + 0.884656i \(0.654393\pi\)
\(600\) −6483.92 −0.441175
\(601\) −5710.81 −0.387602 −0.193801 0.981041i \(-0.562082\pi\)
−0.193801 + 0.981041i \(0.562082\pi\)
\(602\) 0 0
\(603\) 1576.99 0.106501
\(604\) 8138.04 0.548232
\(605\) −4712.92 −0.316707
\(606\) 35314.9 2.36728
\(607\) −1687.69 −0.112852 −0.0564259 0.998407i \(-0.517970\pi\)
−0.0564259 + 0.998407i \(0.517970\pi\)
\(608\) −36998.4 −2.46790
\(609\) −16223.2 −1.07947
\(610\) −17662.7 −1.17237
\(611\) 264.904 0.0175399
\(612\) −41017.4 −2.70920
\(613\) −28929.9 −1.90614 −0.953072 0.302743i \(-0.902098\pi\)
−0.953072 + 0.302743i \(0.902098\pi\)
\(614\) 2712.90 0.178312
\(615\) 9866.82 0.646941
\(616\) 8484.16 0.554930
\(617\) −11347.4 −0.740403 −0.370202 0.928951i \(-0.620711\pi\)
−0.370202 + 0.928951i \(0.620711\pi\)
\(618\) 3493.84 0.227416
\(619\) −11004.0 −0.714520 −0.357260 0.934005i \(-0.616289\pi\)
−0.357260 + 0.934005i \(0.616289\pi\)
\(620\) 14514.0 0.940158
\(621\) −24112.7 −1.55815
\(622\) 35875.6 2.31267
\(623\) −998.350 −0.0642024
\(624\) −3605.21 −0.231288
\(625\) 3548.48 0.227103
\(626\) 33083.4 2.11227
\(627\) −59149.0 −3.76743
\(628\) 1338.95 0.0850798
\(629\) −14121.4 −0.895164
\(630\) 29262.3 1.85053
\(631\) 8104.30 0.511295 0.255647 0.966770i \(-0.417711\pi\)
0.255647 + 0.966770i \(0.417711\pi\)
\(632\) −1019.22 −0.0641492
\(633\) 7909.41 0.496637
\(634\) −47744.7 −2.99083
\(635\) −5291.69 −0.330700
\(636\) −48204.6 −3.00540
\(637\) 1485.24 0.0923819
\(638\) −15870.5 −0.984824
\(639\) −17725.9 −1.09738
\(640\) 6067.16 0.374727
\(641\) −1914.29 −0.117956 −0.0589781 0.998259i \(-0.518784\pi\)
−0.0589781 + 0.998259i \(0.518784\pi\)
\(642\) 18520.8 1.13856
\(643\) −24289.5 −1.48971 −0.744857 0.667224i \(-0.767482\pi\)
−0.744857 + 0.667224i \(0.767482\pi\)
\(644\) 24861.9 1.52127
\(645\) 0 0
\(646\) −49252.3 −2.99970
\(647\) −16984.1 −1.03202 −0.516008 0.856584i \(-0.672583\pi\)
−0.516008 + 0.856584i \(0.672583\pi\)
\(648\) 4344.86 0.263399
\(649\) 12969.2 0.784418
\(650\) −3439.89 −0.207574
\(651\) 48838.5 2.94030
\(652\) 33043.7 1.98480
\(653\) 1182.53 0.0708666 0.0354333 0.999372i \(-0.488719\pi\)
0.0354333 + 0.999372i \(0.488719\pi\)
\(654\) −50478.3 −3.01813
\(655\) 1149.72 0.0685849
\(656\) 8365.54 0.497896
\(657\) 33426.0 1.98489
\(658\) −2779.20 −0.164657
\(659\) 21972.6 1.29883 0.649417 0.760432i \(-0.275013\pi\)
0.649417 + 0.760432i \(0.275013\pi\)
\(660\) 24172.7 1.42564
\(661\) −913.201 −0.0537358 −0.0268679 0.999639i \(-0.508553\pi\)
−0.0268679 + 0.999639i \(0.508553\pi\)
\(662\) 4410.91 0.258965
\(663\) −6455.76 −0.378161
\(664\) 6161.54 0.360112
\(665\) 19462.2 1.13491
\(666\) 38370.4 2.23246
\(667\) −9050.07 −0.525368
\(668\) −11721.5 −0.678918
\(669\) −43119.4 −2.49192
\(670\) −773.864 −0.0446224
\(671\) −32204.2 −1.85280
\(672\) 50878.6 2.92066
\(673\) 18798.4 1.07671 0.538355 0.842718i \(-0.319046\pi\)
0.538355 + 0.842718i \(0.319046\pi\)
\(674\) −21906.3 −1.25193
\(675\) −19387.1 −1.10549
\(676\) −21002.9 −1.19498
\(677\) −10811.5 −0.613768 −0.306884 0.951747i \(-0.599286\pi\)
−0.306884 + 0.951747i \(0.599286\pi\)
\(678\) −31955.2 −1.81008
\(679\) 25511.1 1.44187
\(680\) 3916.88 0.220890
\(681\) 38767.9 2.18148
\(682\) 47776.8 2.68250
\(683\) 16685.1 0.934754 0.467377 0.884058i \(-0.345199\pi\)
0.467377 + 0.884058i \(0.345199\pi\)
\(684\) 74125.8 4.14367
\(685\) 2921.35 0.162948
\(686\) 17107.4 0.952132
\(687\) 24967.2 1.38655
\(688\) 0 0
\(689\) −4976.57 −0.275170
\(690\) 24886.3 1.37305
\(691\) 2810.44 0.154724 0.0773619 0.997003i \(-0.475350\pi\)
0.0773619 + 0.997003i \(0.475350\pi\)
\(692\) −10840.6 −0.595517
\(693\) 53353.4 2.92457
\(694\) 16652.7 0.910847
\(695\) −17287.6 −0.943534
\(696\) 5900.45 0.321345
\(697\) 14980.0 0.814070
\(698\) 9176.71 0.497627
\(699\) 24891.8 1.34692
\(700\) 19989.5 1.07933
\(701\) −25250.1 −1.36046 −0.680231 0.732998i \(-0.738121\pi\)
−0.680231 + 0.732998i \(0.738121\pi\)
\(702\) 8340.38 0.448415
\(703\) 25520.0 1.36914
\(704\) 33266.0 1.78091
\(705\) −1540.89 −0.0823166
\(706\) 16060.2 0.856136
\(707\) −21186.4 −1.12701
\(708\) −24778.4 −1.31530
\(709\) −21224.1 −1.12424 −0.562121 0.827055i \(-0.690014\pi\)
−0.562121 + 0.827055i \(0.690014\pi\)
\(710\) 8698.47 0.459786
\(711\) −6409.44 −0.338077
\(712\) 363.105 0.0191123
\(713\) 27244.5 1.43102
\(714\) 67729.6 3.55002
\(715\) 2495.55 0.130529
\(716\) −37339.3 −1.94893
\(717\) 4399.20 0.229137
\(718\) −26818.8 −1.39397
\(719\) 3199.39 0.165949 0.0829744 0.996552i \(-0.473558\pi\)
0.0829744 + 0.996552i \(0.473558\pi\)
\(720\) 13755.5 0.711997
\(721\) −2096.05 −0.108268
\(722\) 59961.8 3.09079
\(723\) 11941.4 0.614253
\(724\) −4224.43 −0.216850
\(725\) −7276.42 −0.372744
\(726\) 29640.0 1.51521
\(727\) 8946.03 0.456382 0.228191 0.973616i \(-0.426719\pi\)
0.228191 + 0.973616i \(0.426719\pi\)
\(728\) −1673.44 −0.0851949
\(729\) −24533.6 −1.24644
\(730\) −16402.9 −0.831641
\(731\) 0 0
\(732\) 61527.8 3.10674
\(733\) −769.362 −0.0387681 −0.0193841 0.999812i \(-0.506171\pi\)
−0.0193841 + 0.999812i \(0.506171\pi\)
\(734\) −37354.0 −1.87842
\(735\) −8639.31 −0.433559
\(736\) 28382.6 1.42146
\(737\) −1410.97 −0.0705209
\(738\) −40703.2 −2.03022
\(739\) −11278.3 −0.561405 −0.280703 0.959795i \(-0.590567\pi\)
−0.280703 + 0.959795i \(0.590567\pi\)
\(740\) −10429.4 −0.518096
\(741\) 11666.7 0.578391
\(742\) 52211.0 2.58319
\(743\) 11316.7 0.558775 0.279387 0.960178i \(-0.409869\pi\)
0.279387 + 0.960178i \(0.409869\pi\)
\(744\) −17762.8 −0.875292
\(745\) 5727.72 0.281674
\(746\) −23548.4 −1.15572
\(747\) 38747.4 1.89785
\(748\) 36699.3 1.79393
\(749\) −11111.2 −0.542047
\(750\) 47979.7 2.33596
\(751\) −15324.5 −0.744606 −0.372303 0.928111i \(-0.621432\pi\)
−0.372303 + 0.928111i \(0.621432\pi\)
\(752\) −1306.43 −0.0633521
\(753\) −23723.2 −1.14810
\(754\) 3130.34 0.151194
\(755\) −4887.03 −0.235573
\(756\) −48466.6 −2.33163
\(757\) −35157.0 −1.68798 −0.843992 0.536356i \(-0.819800\pi\)
−0.843992 + 0.536356i \(0.819800\pi\)
\(758\) −36732.2 −1.76012
\(759\) 45374.9 2.16996
\(760\) −7078.51 −0.337848
\(761\) 31368.0 1.49421 0.747103 0.664708i \(-0.231444\pi\)
0.747103 + 0.664708i \(0.231444\pi\)
\(762\) 33279.9 1.58216
\(763\) 30283.4 1.43687
\(764\) −33054.3 −1.56527
\(765\) 24631.7 1.16413
\(766\) −60745.4 −2.86530
\(767\) −2558.09 −0.120427
\(768\) 13031.7 0.612293
\(769\) 5835.79 0.273659 0.136830 0.990595i \(-0.456309\pi\)
0.136830 + 0.990595i \(0.456309\pi\)
\(770\) −26181.7 −1.22536
\(771\) −31513.2 −1.47201
\(772\) 24962.1 1.16374
\(773\) 1446.63 0.0673114 0.0336557 0.999433i \(-0.489285\pi\)
0.0336557 + 0.999433i \(0.489285\pi\)
\(774\) 0 0
\(775\) 21905.1 1.01530
\(776\) −9278.53 −0.429226
\(777\) −35093.9 −1.62032
\(778\) −28482.5 −1.31253
\(779\) −27071.5 −1.24511
\(780\) −4767.89 −0.218869
\(781\) 15859.8 0.726642
\(782\) 37782.9 1.72777
\(783\) 17642.5 0.805224
\(784\) −7324.80 −0.333674
\(785\) −804.065 −0.0365584
\(786\) −7230.66 −0.328129
\(787\) −39451.7 −1.78691 −0.893457 0.449149i \(-0.851727\pi\)
−0.893457 + 0.449149i \(0.851727\pi\)
\(788\) −24170.8 −1.09270
\(789\) 1368.05 0.0617287
\(790\) 3145.26 0.141650
\(791\) 19170.8 0.861740
\(792\) −19404.9 −0.870611
\(793\) 6352.05 0.284449
\(794\) 37732.4 1.68649
\(795\) 28947.7 1.29141
\(796\) −28103.9 −1.25140
\(797\) 34014.5 1.51174 0.755868 0.654723i \(-0.227215\pi\)
0.755868 + 0.654723i \(0.227215\pi\)
\(798\) −122400. −5.42970
\(799\) −2339.40 −0.103582
\(800\) 22820.1 1.00852
\(801\) 2283.42 0.100725
\(802\) −37415.6 −1.64737
\(803\) −29907.1 −1.31432
\(804\) 2695.74 0.118248
\(805\) −14930.0 −0.653682
\(806\) −9423.63 −0.411828
\(807\) 739.596 0.0322615
\(808\) 7705.61 0.335498
\(809\) 1131.67 0.0491811 0.0245905 0.999698i \(-0.492172\pi\)
0.0245905 + 0.999698i \(0.492172\pi\)
\(810\) −13408.0 −0.581618
\(811\) 6246.47 0.270460 0.135230 0.990814i \(-0.456823\pi\)
0.135230 + 0.990814i \(0.456823\pi\)
\(812\) −18190.7 −0.786166
\(813\) 28701.6 1.23814
\(814\) −34331.0 −1.47825
\(815\) −19843.3 −0.852860
\(816\) 31838.1 1.36588
\(817\) 0 0
\(818\) 25089.5 1.07241
\(819\) −10523.6 −0.448991
\(820\) 11063.4 0.471161
\(821\) 12261.7 0.521238 0.260619 0.965442i \(-0.416073\pi\)
0.260619 + 0.965442i \(0.416073\pi\)
\(822\) −18372.6 −0.779586
\(823\) 5771.00 0.244428 0.122214 0.992504i \(-0.461001\pi\)
0.122214 + 0.992504i \(0.461001\pi\)
\(824\) 762.345 0.0322300
\(825\) 36482.2 1.53957
\(826\) 26837.8 1.13052
\(827\) −36608.4 −1.53930 −0.769650 0.638466i \(-0.779569\pi\)
−0.769650 + 0.638466i \(0.779569\pi\)
\(828\) −56864.1 −2.38667
\(829\) −26614.0 −1.11501 −0.557505 0.830173i \(-0.688241\pi\)
−0.557505 + 0.830173i \(0.688241\pi\)
\(830\) −19014.2 −0.795172
\(831\) 44902.6 1.87443
\(832\) −6561.48 −0.273412
\(833\) −13116.3 −0.545563
\(834\) 108723. 4.51412
\(835\) 7038.95 0.291728
\(836\) −66322.3 −2.74379
\(837\) −53111.3 −2.19330
\(838\) 34712.2 1.43092
\(839\) −2825.56 −0.116268 −0.0581342 0.998309i \(-0.518515\pi\)
−0.0581342 + 0.998309i \(0.518515\pi\)
\(840\) 9734.05 0.399829
\(841\) −17767.4 −0.728499
\(842\) 30073.4 1.23088
\(843\) 40507.6 1.65499
\(844\) 8868.64 0.361696
\(845\) 12612.6 0.513476
\(846\) 6356.56 0.258325
\(847\) −17781.9 −0.721360
\(848\) 24543.2 0.993886
\(849\) −32195.8 −1.30148
\(850\) 30378.1 1.22584
\(851\) −19577.1 −0.788595
\(852\) −30301.0 −1.21842
\(853\) −13804.1 −0.554094 −0.277047 0.960856i \(-0.589356\pi\)
−0.277047 + 0.960856i \(0.589356\pi\)
\(854\) −66641.6 −2.67029
\(855\) −44513.8 −1.78052
\(856\) 4041.19 0.161361
\(857\) 18861.4 0.751799 0.375899 0.926660i \(-0.377334\pi\)
0.375899 + 0.926660i \(0.377334\pi\)
\(858\) −15694.8 −0.624487
\(859\) 41726.1 1.65737 0.828683 0.559718i \(-0.189091\pi\)
0.828683 + 0.559718i \(0.189091\pi\)
\(860\) 0 0
\(861\) 37227.5 1.47353
\(862\) 12882.1 0.509011
\(863\) 39816.9 1.57055 0.785274 0.619149i \(-0.212522\pi\)
0.785274 + 0.619149i \(0.212522\pi\)
\(864\) −55329.8 −2.17866
\(865\) 6509.97 0.255891
\(866\) −11719.8 −0.459877
\(867\) 13489.5 0.528405
\(868\) 54761.5 2.14139
\(869\) 5734.69 0.223862
\(870\) −18208.5 −0.709570
\(871\) 278.305 0.0108266
\(872\) −11014.2 −0.427739
\(873\) −58348.8 −2.26210
\(874\) −68280.4 −2.64259
\(875\) −28784.4 −1.11210
\(876\) 57139.1 2.20383
\(877\) 6115.27 0.235459 0.117730 0.993046i \(-0.462438\pi\)
0.117730 + 0.993046i \(0.462438\pi\)
\(878\) 32930.3 1.26577
\(879\) 49497.3 1.89932
\(880\) −12307.4 −0.471458
\(881\) 38448.0 1.47031 0.735156 0.677898i \(-0.237109\pi\)
0.735156 + 0.677898i \(0.237109\pi\)
\(882\) 35639.4 1.36059
\(883\) 37344.5 1.42326 0.711631 0.702553i \(-0.247957\pi\)
0.711631 + 0.702553i \(0.247957\pi\)
\(884\) −7238.69 −0.275411
\(885\) 14879.9 0.565176
\(886\) −29140.4 −1.10495
\(887\) 38270.3 1.44869 0.724347 0.689436i \(-0.242141\pi\)
0.724347 + 0.689436i \(0.242141\pi\)
\(888\) 12763.8 0.482349
\(889\) −19965.6 −0.753232
\(890\) −1120.53 −0.0422023
\(891\) −24446.7 −0.919185
\(892\) −48348.8 −1.81484
\(893\) 4227.72 0.158427
\(894\) −36022.1 −1.34761
\(895\) 22422.9 0.837447
\(896\) 22891.4 0.853513
\(897\) −8949.87 −0.333141
\(898\) 13835.0 0.514121
\(899\) −19933.9 −0.739525
\(900\) −45719.7 −1.69332
\(901\) 43948.8 1.62503
\(902\) 36418.2 1.34434
\(903\) 0 0
\(904\) −6972.53 −0.256530
\(905\) 2536.84 0.0931794
\(906\) 30735.0 1.12704
\(907\) −26916.5 −0.985390 −0.492695 0.870202i \(-0.663988\pi\)
−0.492695 + 0.870202i \(0.663988\pi\)
\(908\) 43469.5 1.58875
\(909\) 48457.4 1.76813
\(910\) 5164.16 0.188121
\(911\) −39639.9 −1.44163 −0.720816 0.693126i \(-0.756233\pi\)
−0.720816 + 0.693126i \(0.756233\pi\)
\(912\) −57537.2 −2.08909
\(913\) −34668.3 −1.25668
\(914\) −63698.0 −2.30519
\(915\) −36948.5 −1.33495
\(916\) 27995.1 1.00981
\(917\) 4337.88 0.156215
\(918\) −73655.0 −2.64812
\(919\) −32819.6 −1.17804 −0.589020 0.808119i \(-0.700486\pi\)
−0.589020 + 0.808119i \(0.700486\pi\)
\(920\) 5430.13 0.194593
\(921\) 5675.09 0.203041
\(922\) 29412.7 1.05060
\(923\) −3128.23 −0.111557
\(924\) 91203.5 3.24716
\(925\) −15740.3 −0.559502
\(926\) −70325.3 −2.49572
\(927\) 4794.08 0.169858
\(928\) −20766.6 −0.734586
\(929\) 27270.5 0.963095 0.481547 0.876420i \(-0.340075\pi\)
0.481547 + 0.876420i \(0.340075\pi\)
\(930\) 54815.2 1.93276
\(931\) 23703.6 0.834429
\(932\) 27910.6 0.980947
\(933\) 75047.8 2.63339
\(934\) 54881.4 1.92267
\(935\) −22038.6 −0.770844
\(936\) 3827.48 0.133659
\(937\) −12201.1 −0.425393 −0.212696 0.977118i \(-0.568225\pi\)
−0.212696 + 0.977118i \(0.568225\pi\)
\(938\) −2919.79 −0.101636
\(939\) 69206.8 2.40519
\(940\) −1727.76 −0.0599504
\(941\) −10590.9 −0.366902 −0.183451 0.983029i \(-0.558727\pi\)
−0.183451 + 0.983029i \(0.558727\pi\)
\(942\) 5056.83 0.174905
\(943\) 20767.3 0.717155
\(944\) 12615.8 0.434968
\(945\) 29105.0 1.00189
\(946\) 0 0
\(947\) −8630.28 −0.296142 −0.148071 0.988977i \(-0.547306\pi\)
−0.148071 + 0.988977i \(0.547306\pi\)
\(948\) −10956.4 −0.375368
\(949\) 5898.97 0.201779
\(950\) −54898.7 −1.87489
\(951\) −99876.6 −3.40559
\(952\) 14778.4 0.503120
\(953\) 10184.4 0.346176 0.173088 0.984906i \(-0.444626\pi\)
0.173088 + 0.984906i \(0.444626\pi\)
\(954\) −119417. −4.05268
\(955\) 19849.7 0.672587
\(956\) 4932.72 0.166878
\(957\) −33199.3 −1.12140
\(958\) −79810.8 −2.69162
\(959\) 11022.3 0.371144
\(960\) 38166.7 1.28315
\(961\) 30218.4 1.01435
\(962\) 6771.54 0.226947
\(963\) 25413.4 0.850399
\(964\) 13389.6 0.447354
\(965\) −14990.2 −0.500053
\(966\) 93896.2 3.12739
\(967\) 32879.0 1.09340 0.546700 0.837329i \(-0.315884\pi\)
0.546700 + 0.837329i \(0.315884\pi\)
\(968\) 6467.35 0.214740
\(969\) −103030. −3.41570
\(970\) 28633.1 0.947787
\(971\) 29420.4 0.972345 0.486172 0.873863i \(-0.338393\pi\)
0.486172 + 0.873863i \(0.338393\pi\)
\(972\) −11439.0 −0.377477
\(973\) −65226.1 −2.14908
\(974\) −10.3177 −0.000339424 0
\(975\) −7195.86 −0.236361
\(976\) −31326.6 −1.02740
\(977\) 31685.1 1.03756 0.518780 0.854908i \(-0.326387\pi\)
0.518780 + 0.854908i \(0.326387\pi\)
\(978\) 124796. 4.08031
\(979\) −2043.03 −0.0666963
\(980\) −9687.05 −0.315757
\(981\) −69263.9 −2.25426
\(982\) −73472.3 −2.38757
\(983\) −20915.3 −0.678631 −0.339315 0.940673i \(-0.610195\pi\)
−0.339315 + 0.940673i \(0.610195\pi\)
\(984\) −13539.8 −0.438653
\(985\) 14515.0 0.469529
\(986\) −27644.5 −0.892879
\(987\) −5813.77 −0.187492
\(988\) 13081.6 0.421236
\(989\) 0 0
\(990\) 59882.6 1.92242
\(991\) 34852.4 1.11718 0.558589 0.829445i \(-0.311343\pi\)
0.558589 + 0.829445i \(0.311343\pi\)
\(992\) 62516.1 2.00090
\(993\) 9227.14 0.294878
\(994\) 32819.3 1.04725
\(995\) 16876.9 0.537722
\(996\) 66235.6 2.10718
\(997\) −3913.94 −0.124329 −0.0621644 0.998066i \(-0.519800\pi\)
−0.0621644 + 0.998066i \(0.519800\pi\)
\(998\) 14337.3 0.454747
\(999\) 38164.2 1.20867
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 1849.4.a.f.1.9 10
43.7 odd 6 43.4.c.a.6.2 20
43.37 odd 6 43.4.c.a.36.2 yes 20
43.42 odd 2 1849.4.a.d.1.2 10
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
43.4.c.a.6.2 20 43.7 odd 6
43.4.c.a.36.2 yes 20 43.37 odd 6
1849.4.a.d.1.2 10 43.42 odd 2
1849.4.a.f.1.9 10 1.1 even 1 trivial