Properties

Label 11.4.a.a.1.2
Level $11$
Weight $4$
Character 11.1
Self dual yes
Analytic conductor $0.649$
Analytic rank $0$
Dimension $2$
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] = [11,4,Mod(1,11)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(11, 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("11.1");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 11 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 11.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: \(0.649021010063\)
Analytic rank: \(0\)
Dimension: \(2\)
Coefficient field: \(\Q(\zeta_{12})^+\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{2} - 3 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Fricke sign: \(1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.2
Root \(1.73205\) of defining polynomial
Character \(\chi\) \(=\) 11.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+2.73205 q^{2} -7.92820 q^{3} -0.535898 q^{4} +14.8564 q^{5} -21.6603 q^{6} +3.07180 q^{7} -23.3205 q^{8} +35.8564 q^{9} +O(q^{10})\) \(q+2.73205 q^{2} -7.92820 q^{3} -0.535898 q^{4} +14.8564 q^{5} -21.6603 q^{6} +3.07180 q^{7} -23.3205 q^{8} +35.8564 q^{9} +40.5885 q^{10} -11.0000 q^{11} +4.24871 q^{12} +5.35898 q^{13} +8.39230 q^{14} -117.785 q^{15} -59.4256 q^{16} -41.2154 q^{17} +97.9615 q^{18} +139.923 q^{19} -7.96152 q^{20} -24.3538 q^{21} -30.0526 q^{22} -111.354 q^{23} +184.890 q^{24} +95.7128 q^{25} +14.6410 q^{26} -70.2154 q^{27} -1.64617 q^{28} -24.9948 q^{29} -321.794 q^{30} +31.4974 q^{31} +24.2102 q^{32} +87.2102 q^{33} -112.603 q^{34} +45.6359 q^{35} -19.2154 q^{36} +13.1436 q^{37} +382.277 q^{38} -42.4871 q^{39} -346.459 q^{40} +261.072 q^{41} -66.5359 q^{42} -57.7128 q^{43} +5.89488 q^{44} +532.697 q^{45} -304.224 q^{46} -343.846 q^{47} +471.138 q^{48} -333.564 q^{49} +261.492 q^{50} +326.764 q^{51} -2.87187 q^{52} -342.995 q^{53} -191.832 q^{54} -163.420 q^{55} -71.6359 q^{56} -1109.34 q^{57} -68.2872 q^{58} +88.3693 q^{59} +63.1206 q^{60} +738.697 q^{61} +86.0526 q^{62} +110.144 q^{63} +541.549 q^{64} +79.6152 q^{65} +238.263 q^{66} +342.359 q^{67} +22.0873 q^{68} +882.836 q^{69} +124.679 q^{70} -207.364 q^{71} -836.190 q^{72} -1010.60 q^{73} +35.9090 q^{74} -758.831 q^{75} -74.9845 q^{76} -33.7898 q^{77} -116.077 q^{78} +1294.23 q^{79} -882.851 q^{80} -411.441 q^{81} +713.261 q^{82} +441.846 q^{83} +13.0512 q^{84} -612.313 q^{85} -157.674 q^{86} +198.164 q^{87} +256.526 q^{88} -1489.11 q^{89} +1455.36 q^{90} +16.4617 q^{91} +59.6743 q^{92} -249.718 q^{93} -939.405 q^{94} +2078.75 q^{95} -191.944 q^{96} +1346.42 q^{97} -911.314 q^{98} -394.420 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 2 q + 2 q^{2} - 2 q^{3} - 8 q^{4} + 2 q^{5} - 26 q^{6} + 20 q^{7} - 12 q^{8} + 44 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 2 q + 2 q^{2} - 2 q^{3} - 8 q^{4} + 2 q^{5} - 26 q^{6} + 20 q^{7} - 12 q^{8} + 44 q^{9} + 50 q^{10} - 22 q^{11} - 40 q^{12} + 80 q^{13} - 4 q^{14} - 194 q^{15} - 8 q^{16} - 124 q^{17} + 92 q^{18} + 72 q^{19} + 88 q^{20} + 76 q^{21} - 22 q^{22} - 98 q^{23} + 252 q^{24} + 136 q^{25} - 40 q^{26} - 182 q^{27} - 128 q^{28} + 144 q^{29} - 266 q^{30} - 34 q^{31} - 104 q^{32} + 22 q^{33} - 52 q^{34} - 172 q^{35} - 80 q^{36} + 54 q^{37} + 432 q^{38} + 400 q^{39} - 492 q^{40} + 536 q^{41} - 140 q^{42} - 60 q^{43} + 88 q^{44} + 428 q^{45} - 314 q^{46} - 272 q^{47} + 776 q^{48} - 390 q^{49} + 232 q^{50} - 164 q^{51} - 560 q^{52} - 492 q^{53} - 110 q^{54} - 22 q^{55} + 120 q^{56} - 1512 q^{57} - 192 q^{58} + 634 q^{59} + 632 q^{60} + 840 q^{61} + 134 q^{62} + 248 q^{63} + 224 q^{64} - 880 q^{65} + 286 q^{66} + 754 q^{67} + 640 q^{68} + 962 q^{69} + 284 q^{70} - 678 q^{71} - 744 q^{72} - 400 q^{73} + 6 q^{74} - 520 q^{75} + 432 q^{76} - 220 q^{77} - 440 q^{78} + 316 q^{79} - 1544 q^{80} - 1294 q^{81} + 512 q^{82} + 468 q^{83} - 736 q^{84} + 452 q^{85} - 156 q^{86} + 1200 q^{87} + 132 q^{88} - 1842 q^{89} + 1532 q^{90} + 1280 q^{91} - 40 q^{92} - 638 q^{93} - 992 q^{94} + 2952 q^{95} - 952 q^{96} + 2194 q^{97} - 870 q^{98} - 484 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 2.73205 0.965926 0.482963 0.875641i \(-0.339561\pi\)
0.482963 + 0.875641i \(0.339561\pi\)
\(3\) −7.92820 −1.52578 −0.762892 0.646526i \(-0.776221\pi\)
−0.762892 + 0.646526i \(0.776221\pi\)
\(4\) −0.535898 −0.0669873
\(5\) 14.8564 1.32880 0.664399 0.747378i \(-0.268688\pi\)
0.664399 + 0.747378i \(0.268688\pi\)
\(6\) −21.6603 −1.47379
\(7\) 3.07180 0.165861 0.0829307 0.996555i \(-0.473572\pi\)
0.0829307 + 0.996555i \(0.473572\pi\)
\(8\) −23.3205 −1.03063
\(9\) 35.8564 1.32802
\(10\) 40.5885 1.28352
\(11\) −11.0000 −0.301511
\(12\) 4.24871 0.102208
\(13\) 5.35898 0.114332 0.0571659 0.998365i \(-0.481794\pi\)
0.0571659 + 0.998365i \(0.481794\pi\)
\(14\) 8.39230 0.160210
\(15\) −117.785 −2.02746
\(16\) −59.4256 −0.928525
\(17\) −41.2154 −0.588012 −0.294006 0.955804i \(-0.594989\pi\)
−0.294006 + 0.955804i \(0.594989\pi\)
\(18\) 97.9615 1.28276
\(19\) 139.923 1.68950 0.844751 0.535159i \(-0.179748\pi\)
0.844751 + 0.535159i \(0.179748\pi\)
\(20\) −7.96152 −0.0890125
\(21\) −24.3538 −0.253069
\(22\) −30.0526 −0.291238
\(23\) −111.354 −1.00952 −0.504758 0.863261i \(-0.668418\pi\)
−0.504758 + 0.863261i \(0.668418\pi\)
\(24\) 184.890 1.57252
\(25\) 95.7128 0.765703
\(26\) 14.6410 0.110436
\(27\) −70.2154 −0.500480
\(28\) −1.64617 −0.0111106
\(29\) −24.9948 −0.160049 −0.0800246 0.996793i \(-0.525500\pi\)
−0.0800246 + 0.996793i \(0.525500\pi\)
\(30\) −321.794 −1.95837
\(31\) 31.4974 0.182487 0.0912436 0.995829i \(-0.470916\pi\)
0.0912436 + 0.995829i \(0.470916\pi\)
\(32\) 24.2102 0.133744
\(33\) 87.2102 0.460041
\(34\) −112.603 −0.567976
\(35\) 45.6359 0.220396
\(36\) −19.2154 −0.0889601
\(37\) 13.1436 0.0583998 0.0291999 0.999574i \(-0.490704\pi\)
0.0291999 + 0.999574i \(0.490704\pi\)
\(38\) 382.277 1.63193
\(39\) −42.4871 −0.174446
\(40\) −346.459 −1.36950
\(41\) 261.072 0.994453 0.497226 0.867621i \(-0.334352\pi\)
0.497226 + 0.867621i \(0.334352\pi\)
\(42\) −66.5359 −0.244446
\(43\) −57.7128 −0.204677 −0.102339 0.994750i \(-0.532633\pi\)
−0.102339 + 0.994750i \(0.532633\pi\)
\(44\) 5.89488 0.0201974
\(45\) 532.697 1.76466
\(46\) −304.224 −0.975118
\(47\) −343.846 −1.06713 −0.533565 0.845759i \(-0.679148\pi\)
−0.533565 + 0.845759i \(0.679148\pi\)
\(48\) 471.138 1.41673
\(49\) −333.564 −0.972490
\(50\) 261.492 0.739612
\(51\) 326.764 0.897179
\(52\) −2.87187 −0.00765879
\(53\) −342.995 −0.888943 −0.444471 0.895793i \(-0.646608\pi\)
−0.444471 + 0.895793i \(0.646608\pi\)
\(54\) −191.832 −0.483426
\(55\) −163.420 −0.400647
\(56\) −71.6359 −0.170942
\(57\) −1109.34 −2.57782
\(58\) −68.2872 −0.154596
\(59\) 88.3693 0.194995 0.0974975 0.995236i \(-0.468916\pi\)
0.0974975 + 0.995236i \(0.468916\pi\)
\(60\) 63.1206 0.135814
\(61\) 738.697 1.55050 0.775250 0.631654i \(-0.217624\pi\)
0.775250 + 0.631654i \(0.217624\pi\)
\(62\) 86.0526 0.176269
\(63\) 110.144 0.220266
\(64\) 541.549 1.05771
\(65\) 79.6152 0.151924
\(66\) 238.263 0.444365
\(67\) 342.359 0.624266 0.312133 0.950038i \(-0.398957\pi\)
0.312133 + 0.950038i \(0.398957\pi\)
\(68\) 22.0873 0.0393893
\(69\) 882.836 1.54030
\(70\) 124.679 0.212886
\(71\) −207.364 −0.346614 −0.173307 0.984868i \(-0.555445\pi\)
−0.173307 + 0.984868i \(0.555445\pi\)
\(72\) −836.190 −1.36869
\(73\) −1010.60 −1.62030 −0.810149 0.586224i \(-0.800614\pi\)
−0.810149 + 0.586224i \(0.800614\pi\)
\(74\) 35.9090 0.0564099
\(75\) −758.831 −1.16830
\(76\) −74.9845 −0.113175
\(77\) −33.7898 −0.0500091
\(78\) −116.077 −0.168502
\(79\) 1294.23 1.84319 0.921593 0.388157i \(-0.126888\pi\)
0.921593 + 0.388157i \(0.126888\pi\)
\(80\) −882.851 −1.23382
\(81\) −411.441 −0.564391
\(82\) 713.261 0.960568
\(83\) 441.846 0.584324 0.292162 0.956369i \(-0.405625\pi\)
0.292162 + 0.956369i \(0.405625\pi\)
\(84\) 13.0512 0.0169524
\(85\) −612.313 −0.781349
\(86\) −157.674 −0.197703
\(87\) 198.164 0.244200
\(88\) 256.526 0.310747
\(89\) −1489.11 −1.77355 −0.886773 0.462205i \(-0.847058\pi\)
−0.886773 + 0.462205i \(0.847058\pi\)
\(90\) 1455.36 1.70453
\(91\) 16.4617 0.0189633
\(92\) 59.6743 0.0676248
\(93\) −249.718 −0.278436
\(94\) −939.405 −1.03077
\(95\) 2078.75 2.24501
\(96\) −191.944 −0.204064
\(97\) 1346.42 1.40936 0.704679 0.709526i \(-0.251091\pi\)
0.704679 + 0.709526i \(0.251091\pi\)
\(98\) −911.314 −0.939353
\(99\) −394.420 −0.400412
\(100\) −51.2923 −0.0512923
\(101\) −161.461 −0.159069 −0.0795347 0.996832i \(-0.525343\pi\)
−0.0795347 + 0.996832i \(0.525343\pi\)
\(102\) 892.736 0.866608
\(103\) −34.7592 −0.0332517 −0.0166259 0.999862i \(-0.505292\pi\)
−0.0166259 + 0.999862i \(0.505292\pi\)
\(104\) −124.974 −0.117834
\(105\) −361.810 −0.336277
\(106\) −937.079 −0.858653
\(107\) 832.179 0.751867 0.375934 0.926647i \(-0.377322\pi\)
0.375934 + 0.926647i \(0.377322\pi\)
\(108\) 37.6283 0.0335258
\(109\) 1044.26 0.917629 0.458815 0.888532i \(-0.348274\pi\)
0.458815 + 0.888532i \(0.348274\pi\)
\(110\) −446.473 −0.386996
\(111\) −104.205 −0.0891055
\(112\) −182.543 −0.154007
\(113\) 295.082 0.245654 0.122827 0.992428i \(-0.460804\pi\)
0.122827 + 0.992428i \(0.460804\pi\)
\(114\) −3030.77 −2.48998
\(115\) −1654.32 −1.34144
\(116\) 13.3947 0.0107213
\(117\) 192.154 0.151834
\(118\) 241.429 0.188351
\(119\) −126.605 −0.0975285
\(120\) 2746.80 2.08956
\(121\) 121.000 0.0909091
\(122\) 2018.16 1.49767
\(123\) −2069.83 −1.51732
\(124\) −16.8794 −0.0122243
\(125\) −435.102 −0.311334
\(126\) 300.918 0.212761
\(127\) −1317.60 −0.920618 −0.460309 0.887759i \(-0.652261\pi\)
−0.460309 + 0.887759i \(0.652261\pi\)
\(128\) 1285.86 0.887928
\(129\) 457.559 0.312293
\(130\) 217.513 0.146747
\(131\) −1600.71 −1.06759 −0.533797 0.845612i \(-0.679235\pi\)
−0.533797 + 0.845612i \(0.679235\pi\)
\(132\) −46.7358 −0.0308169
\(133\) 429.815 0.280223
\(134\) 935.342 0.602994
\(135\) −1043.15 −0.665036
\(136\) 961.164 0.606023
\(137\) 1611.68 1.00507 0.502536 0.864556i \(-0.332400\pi\)
0.502536 + 0.864556i \(0.332400\pi\)
\(138\) 2411.95 1.48782
\(139\) −31.8619 −0.0194424 −0.00972120 0.999953i \(-0.503094\pi\)
−0.00972120 + 0.999953i \(0.503094\pi\)
\(140\) −24.4562 −0.0147637
\(141\) 2726.08 1.62821
\(142\) −566.529 −0.334803
\(143\) −58.9488 −0.0344724
\(144\) −2130.79 −1.23310
\(145\) −371.334 −0.212673
\(146\) −2761.01 −1.56509
\(147\) 2644.56 1.48381
\(148\) −7.04363 −0.00391205
\(149\) −2428.34 −1.33515 −0.667576 0.744542i \(-0.732668\pi\)
−0.667576 + 0.744542i \(0.732668\pi\)
\(150\) −2073.16 −1.12849
\(151\) −2576.68 −1.38866 −0.694328 0.719659i \(-0.744298\pi\)
−0.694328 + 0.719659i \(0.744298\pi\)
\(152\) −3263.08 −1.74125
\(153\) −1477.84 −0.780889
\(154\) −92.3154 −0.0483051
\(155\) 467.939 0.242489
\(156\) 22.7688 0.0116856
\(157\) 2475.94 1.25861 0.629305 0.777158i \(-0.283340\pi\)
0.629305 + 0.777158i \(0.283340\pi\)
\(158\) 3535.89 1.78038
\(159\) 2719.33 1.35633
\(160\) 359.677 0.177719
\(161\) −342.056 −0.167440
\(162\) −1124.08 −0.545160
\(163\) −2725.11 −1.30949 −0.654745 0.755850i \(-0.727224\pi\)
−0.654745 + 0.755850i \(0.727224\pi\)
\(164\) −139.908 −0.0666157
\(165\) 1295.63 0.611301
\(166\) 1207.15 0.564414
\(167\) 2737.30 1.26837 0.634187 0.773180i \(-0.281335\pi\)
0.634187 + 0.773180i \(0.281335\pi\)
\(168\) 567.944 0.260820
\(169\) −2168.28 −0.986928
\(170\) −1672.87 −0.754725
\(171\) 5017.14 2.24368
\(172\) 30.9282 0.0137108
\(173\) 2307.42 1.01404 0.507022 0.861933i \(-0.330746\pi\)
0.507022 + 0.861933i \(0.330746\pi\)
\(174\) 541.395 0.235879
\(175\) 294.010 0.127001
\(176\) 653.682 0.279961
\(177\) −700.610 −0.297520
\(178\) −4068.33 −1.71311
\(179\) −1312.15 −0.547905 −0.273953 0.961743i \(-0.588331\pi\)
−0.273953 + 0.961743i \(0.588331\pi\)
\(180\) −285.472 −0.118210
\(181\) −803.174 −0.329831 −0.164916 0.986308i \(-0.552735\pi\)
−0.164916 + 0.986308i \(0.552735\pi\)
\(182\) 44.9742 0.0183171
\(183\) −5856.54 −2.36573
\(184\) 2596.83 1.04044
\(185\) 195.267 0.0776015
\(186\) −682.242 −0.268949
\(187\) 453.369 0.177292
\(188\) 184.267 0.0714842
\(189\) −215.687 −0.0830103
\(190\) 5679.26 2.16851
\(191\) 1718.25 0.650932 0.325466 0.945554i \(-0.394479\pi\)
0.325466 + 0.945554i \(0.394479\pi\)
\(192\) −4293.51 −1.61384
\(193\) 1340.18 0.499837 0.249919 0.968267i \(-0.419596\pi\)
0.249919 + 0.968267i \(0.419596\pi\)
\(194\) 3678.48 1.36134
\(195\) −631.206 −0.231803
\(196\) 178.756 0.0651445
\(197\) −3518.33 −1.27244 −0.636220 0.771508i \(-0.719503\pi\)
−0.636220 + 0.771508i \(0.719503\pi\)
\(198\) −1077.58 −0.386768
\(199\) 823.692 0.293417 0.146709 0.989180i \(-0.453132\pi\)
0.146709 + 0.989180i \(0.453132\pi\)
\(200\) −2232.07 −0.789156
\(201\) −2714.29 −0.952494
\(202\) −441.121 −0.153649
\(203\) −76.7791 −0.0265460
\(204\) −175.112 −0.0600996
\(205\) 3878.59 1.32143
\(206\) −94.9639 −0.0321187
\(207\) −3992.75 −1.34065
\(208\) −318.461 −0.106160
\(209\) −1539.15 −0.509404
\(210\) −988.484 −0.324819
\(211\) −107.343 −0.0350228 −0.0175114 0.999847i \(-0.505574\pi\)
−0.0175114 + 0.999847i \(0.505574\pi\)
\(212\) 183.810 0.0595479
\(213\) 1644.03 0.528858
\(214\) 2273.56 0.726248
\(215\) −857.405 −0.271975
\(216\) 1637.46 0.515810
\(217\) 96.7537 0.0302676
\(218\) 2852.96 0.886362
\(219\) 8012.24 2.47222
\(220\) 87.5768 0.0268383
\(221\) −220.873 −0.0672285
\(222\) −284.694 −0.0860693
\(223\) −3933.68 −1.18125 −0.590625 0.806946i \(-0.701119\pi\)
−0.590625 + 0.806946i \(0.701119\pi\)
\(224\) 74.3689 0.0221830
\(225\) 3431.92 1.01686
\(226\) 806.178 0.237284
\(227\) −1771.90 −0.518085 −0.259042 0.965866i \(-0.583407\pi\)
−0.259042 + 0.965866i \(0.583407\pi\)
\(228\) 594.493 0.172681
\(229\) 1915.37 0.552713 0.276356 0.961055i \(-0.410873\pi\)
0.276356 + 0.961055i \(0.410873\pi\)
\(230\) −4519.68 −1.29573
\(231\) 267.892 0.0763031
\(232\) 582.892 0.164952
\(233\) 4396.32 1.23610 0.618052 0.786137i \(-0.287922\pi\)
0.618052 + 0.786137i \(0.287922\pi\)
\(234\) 524.974 0.146661
\(235\) −5108.32 −1.41800
\(236\) −47.3570 −0.0130622
\(237\) −10260.9 −2.81230
\(238\) −345.892 −0.0942053
\(239\) −4084.49 −1.10546 −0.552728 0.833362i \(-0.686413\pi\)
−0.552728 + 0.833362i \(0.686413\pi\)
\(240\) 6999.42 1.88255
\(241\) 3908.58 1.04471 0.522353 0.852730i \(-0.325054\pi\)
0.522353 + 0.852730i \(0.325054\pi\)
\(242\) 330.578 0.0878114
\(243\) 5157.80 1.36162
\(244\) −395.867 −0.103864
\(245\) −4955.56 −1.29224
\(246\) −5654.88 −1.46562
\(247\) 749.845 0.193164
\(248\) −734.536 −0.188077
\(249\) −3503.05 −0.891552
\(250\) −1188.72 −0.300725
\(251\) 1094.89 0.275335 0.137667 0.990479i \(-0.456040\pi\)
0.137667 + 0.990479i \(0.456040\pi\)
\(252\) −59.0258 −0.0147551
\(253\) 1224.89 0.304381
\(254\) −3599.76 −0.889249
\(255\) 4854.54 1.19217
\(256\) −819.364 −0.200040
\(257\) 783.179 0.190091 0.0950454 0.995473i \(-0.469700\pi\)
0.0950454 + 0.995473i \(0.469700\pi\)
\(258\) 1250.07 0.301652
\(259\) 40.3744 0.00968628
\(260\) −42.6657 −0.0101770
\(261\) −896.225 −0.212548
\(262\) −4373.23 −1.03122
\(263\) 6180.06 1.44897 0.724484 0.689292i \(-0.242078\pi\)
0.724484 + 0.689292i \(0.242078\pi\)
\(264\) −2033.79 −0.474132
\(265\) −5095.67 −1.18122
\(266\) 1174.28 0.270675
\(267\) 11806.0 2.70605
\(268\) −183.470 −0.0418179
\(269\) 986.965 0.223704 0.111852 0.993725i \(-0.464322\pi\)
0.111852 + 0.993725i \(0.464322\pi\)
\(270\) −2849.93 −0.642376
\(271\) 4576.99 1.02595 0.512975 0.858404i \(-0.328543\pi\)
0.512975 + 0.858404i \(0.328543\pi\)
\(272\) 2449.25 0.545984
\(273\) −130.512 −0.0289338
\(274\) 4403.18 0.970825
\(275\) −1052.84 −0.230868
\(276\) −473.110 −0.103181
\(277\) 567.836 0.123169 0.0615847 0.998102i \(-0.480385\pi\)
0.0615847 + 0.998102i \(0.480385\pi\)
\(278\) −87.0484 −0.0187799
\(279\) 1129.38 0.242346
\(280\) −1064.25 −0.227147
\(281\) 5311.01 1.12750 0.563752 0.825944i \(-0.309357\pi\)
0.563752 + 0.825944i \(0.309357\pi\)
\(282\) 7447.79 1.57273
\(283\) −4728.44 −0.993204 −0.496602 0.867978i \(-0.665419\pi\)
−0.496602 + 0.867978i \(0.665419\pi\)
\(284\) 111.126 0.0232187
\(285\) −16480.8 −3.42539
\(286\) −161.051 −0.0332977
\(287\) 801.960 0.164941
\(288\) 868.092 0.177614
\(289\) −3214.29 −0.654242
\(290\) −1014.50 −0.205426
\(291\) −10674.7 −2.15038
\(292\) 541.579 0.108539
\(293\) 2328.92 0.464358 0.232179 0.972673i \(-0.425415\pi\)
0.232179 + 0.972673i \(0.425415\pi\)
\(294\) 7225.08 1.43325
\(295\) 1312.85 0.259109
\(296\) −306.515 −0.0601886
\(297\) 772.369 0.150900
\(298\) −6634.36 −1.28966
\(299\) −596.743 −0.115420
\(300\) 406.656 0.0782610
\(301\) −177.282 −0.0339481
\(302\) −7039.61 −1.34134
\(303\) 1280.10 0.242705
\(304\) −8315.01 −1.56875
\(305\) 10974.4 2.06030
\(306\) −4037.52 −0.754280
\(307\) −1678.07 −0.311962 −0.155981 0.987760i \(-0.549854\pi\)
−0.155981 + 0.987760i \(0.549854\pi\)
\(308\) 18.1079 0.00334997
\(309\) 275.578 0.0507349
\(310\) 1278.43 0.234226
\(311\) 3572.71 0.651413 0.325707 0.945471i \(-0.394398\pi\)
0.325707 + 0.945471i \(0.394398\pi\)
\(312\) 990.821 0.179789
\(313\) 7184.36 1.29739 0.648697 0.761047i \(-0.275314\pi\)
0.648697 + 0.761047i \(0.275314\pi\)
\(314\) 6764.40 1.21572
\(315\) 1636.34 0.292690
\(316\) −693.573 −0.123470
\(317\) −15.7077 −0.00278306 −0.00139153 0.999999i \(-0.500443\pi\)
−0.00139153 + 0.999999i \(0.500443\pi\)
\(318\) 7429.36 1.31012
\(319\) 274.943 0.0482566
\(320\) 8045.47 1.40549
\(321\) −6597.69 −1.14719
\(322\) −934.515 −0.161734
\(323\) −5766.98 −0.993447
\(324\) 220.491 0.0378070
\(325\) 512.923 0.0875442
\(326\) −7445.13 −1.26487
\(327\) −8279.08 −1.40010
\(328\) −6088.33 −1.02491
\(329\) −1056.23 −0.176996
\(330\) 3539.73 0.590472
\(331\) −1318.95 −0.219022 −0.109511 0.993986i \(-0.534928\pi\)
−0.109511 + 0.993986i \(0.534928\pi\)
\(332\) −236.785 −0.0391423
\(333\) 471.282 0.0775558
\(334\) 7478.43 1.22515
\(335\) 5086.22 0.829523
\(336\) 1447.24 0.234981
\(337\) −239.183 −0.0386621 −0.0193310 0.999813i \(-0.506154\pi\)
−0.0193310 + 0.999813i \(0.506154\pi\)
\(338\) −5923.85 −0.953299
\(339\) −2339.47 −0.374816
\(340\) 328.137 0.0523404
\(341\) −346.472 −0.0550220
\(342\) 13707.1 2.16723
\(343\) −2078.27 −0.327160
\(344\) 1345.89 0.210947
\(345\) 13115.8 2.04675
\(346\) 6303.98 0.979491
\(347\) −5862.79 −0.907006 −0.453503 0.891255i \(-0.649826\pi\)
−0.453503 + 0.891255i \(0.649826\pi\)
\(348\) −106.196 −0.0163583
\(349\) 3491.73 0.535553 0.267776 0.963481i \(-0.413711\pi\)
0.267776 + 0.963481i \(0.413711\pi\)
\(350\) 803.251 0.122673
\(351\) −376.283 −0.0572208
\(352\) −266.313 −0.0403253
\(353\) −10916.7 −1.64600 −0.822999 0.568043i \(-0.807701\pi\)
−0.822999 + 0.568043i \(0.807701\pi\)
\(354\) −1914.10 −0.287382
\(355\) −3080.69 −0.460580
\(356\) 798.013 0.118805
\(357\) 1003.75 0.148807
\(358\) −3584.87 −0.529236
\(359\) −11500.7 −1.69077 −0.845384 0.534160i \(-0.820628\pi\)
−0.845384 + 0.534160i \(0.820628\pi\)
\(360\) −12422.8 −1.81872
\(361\) 12719.5 1.85442
\(362\) −2194.31 −0.318592
\(363\) −959.313 −0.138708
\(364\) −8.82180 −0.00127030
\(365\) −15013.9 −2.15305
\(366\) −16000.4 −2.28512
\(367\) 6767.01 0.962493 0.481246 0.876585i \(-0.340184\pi\)
0.481246 + 0.876585i \(0.340184\pi\)
\(368\) 6617.27 0.937362
\(369\) 9361.10 1.32065
\(370\) 533.478 0.0749573
\(371\) −1053.61 −0.147441
\(372\) 133.823 0.0186517
\(373\) −5310.22 −0.737139 −0.368569 0.929600i \(-0.620152\pi\)
−0.368569 + 0.929600i \(0.620152\pi\)
\(374\) 1238.63 0.171251
\(375\) 3449.58 0.475028
\(376\) 8018.67 1.09982
\(377\) −133.947 −0.0182987
\(378\) −589.269 −0.0801818
\(379\) −838.267 −0.113612 −0.0568059 0.998385i \(-0.518092\pi\)
−0.0568059 + 0.998385i \(0.518092\pi\)
\(380\) −1114.00 −0.150387
\(381\) 10446.2 1.40466
\(382\) 4694.34 0.628752
\(383\) −2832.16 −0.377851 −0.188925 0.981991i \(-0.560500\pi\)
−0.188925 + 0.981991i \(0.560500\pi\)
\(384\) −10194.5 −1.35479
\(385\) −501.994 −0.0664520
\(386\) 3661.45 0.482806
\(387\) −2069.37 −0.271814
\(388\) −721.542 −0.0944091
\(389\) 3111.25 0.405519 0.202759 0.979229i \(-0.435009\pi\)
0.202759 + 0.979229i \(0.435009\pi\)
\(390\) −1724.49 −0.223905
\(391\) 4589.49 0.593608
\(392\) 7778.88 1.00228
\(393\) 12690.8 1.62892
\(394\) −9612.25 −1.22908
\(395\) 19227.5 2.44922
\(396\) 211.369 0.0268225
\(397\) 14208.7 1.79626 0.898131 0.439728i \(-0.144925\pi\)
0.898131 + 0.439728i \(0.144925\pi\)
\(398\) 2250.37 0.283419
\(399\) −3407.66 −0.427560
\(400\) −5687.79 −0.710974
\(401\) −6261.68 −0.779784 −0.389892 0.920861i \(-0.627488\pi\)
−0.389892 + 0.920861i \(0.627488\pi\)
\(402\) −7415.58 −0.920039
\(403\) 168.794 0.0208641
\(404\) 86.5269 0.0106556
\(405\) −6112.54 −0.749961
\(406\) −209.764 −0.0256415
\(407\) −144.580 −0.0176082
\(408\) −7620.30 −0.924660
\(409\) −4192.50 −0.506860 −0.253430 0.967354i \(-0.581559\pi\)
−0.253430 + 0.967354i \(0.581559\pi\)
\(410\) 10596.5 1.27640
\(411\) −12777.7 −1.53352
\(412\) 18.6274 0.00222744
\(413\) 271.453 0.0323421
\(414\) −10908.4 −1.29497
\(415\) 6564.25 0.776448
\(416\) 129.742 0.0152912
\(417\) 252.608 0.0296649
\(418\) −4205.05 −0.492047
\(419\) −9287.15 −1.08283 −0.541416 0.840755i \(-0.682112\pi\)
−0.541416 + 0.840755i \(0.682112\pi\)
\(420\) 193.894 0.0225263
\(421\) 13146.0 1.52185 0.760923 0.648842i \(-0.224746\pi\)
0.760923 + 0.648842i \(0.224746\pi\)
\(422\) −293.267 −0.0338294
\(423\) −12329.1 −1.41716
\(424\) 7998.81 0.916172
\(425\) −3944.84 −0.450242
\(426\) 4491.56 0.510838
\(427\) 2269.13 0.257168
\(428\) −445.964 −0.0503656
\(429\) 467.358 0.0525974
\(430\) −2342.47 −0.262707
\(431\) 4909.67 0.548701 0.274351 0.961630i \(-0.411537\pi\)
0.274351 + 0.961630i \(0.411537\pi\)
\(432\) 4172.59 0.464708
\(433\) −11743.3 −1.30334 −0.651671 0.758502i \(-0.725932\pi\)
−0.651671 + 0.758502i \(0.725932\pi\)
\(434\) 264.336 0.0292363
\(435\) 2944.01 0.324493
\(436\) −559.615 −0.0614695
\(437\) −15581.0 −1.70558
\(438\) 21889.8 2.38798
\(439\) −11824.2 −1.28551 −0.642754 0.766073i \(-0.722208\pi\)
−0.642754 + 0.766073i \(0.722208\pi\)
\(440\) 3811.05 0.412920
\(441\) −11960.4 −1.29148
\(442\) −603.435 −0.0649377
\(443\) 10102.1 1.08344 0.541722 0.840558i \(-0.317772\pi\)
0.541722 + 0.840558i \(0.317772\pi\)
\(444\) 55.8433 0.00596894
\(445\) −22122.9 −2.35668
\(446\) −10747.0 −1.14100
\(447\) 19252.4 2.03715
\(448\) 1663.53 0.175434
\(449\) −345.254 −0.0362885 −0.0181443 0.999835i \(-0.505776\pi\)
−0.0181443 + 0.999835i \(0.505776\pi\)
\(450\) 9376.17 0.982216
\(451\) −2871.79 −0.299839
\(452\) −158.134 −0.0164557
\(453\) 20428.4 2.11879
\(454\) −4840.93 −0.500431
\(455\) 244.562 0.0251983
\(456\) 25870.3 2.65678
\(457\) −10567.1 −1.08164 −0.540821 0.841138i \(-0.681886\pi\)
−0.540821 + 0.841138i \(0.681886\pi\)
\(458\) 5232.89 0.533879
\(459\) 2893.95 0.294288
\(460\) 886.546 0.0898596
\(461\) 4733.96 0.478270 0.239135 0.970986i \(-0.423136\pi\)
0.239135 + 0.970986i \(0.423136\pi\)
\(462\) 731.895 0.0737031
\(463\) 3431.20 0.344409 0.172204 0.985061i \(-0.444911\pi\)
0.172204 + 0.985061i \(0.444911\pi\)
\(464\) 1485.33 0.148610
\(465\) −3709.91 −0.369985
\(466\) 12011.0 1.19399
\(467\) 5116.96 0.507034 0.253517 0.967331i \(-0.418413\pi\)
0.253517 + 0.967331i \(0.418413\pi\)
\(468\) −102.975 −0.0101710
\(469\) 1051.66 0.103542
\(470\) −13956.2 −1.36968
\(471\) −19629.8 −1.92037
\(472\) −2060.82 −0.200968
\(473\) 634.841 0.0617125
\(474\) −28033.2 −2.71648
\(475\) 13392.4 1.29366
\(476\) 67.8476 0.00653317
\(477\) −12298.6 −1.18053
\(478\) −11159.0 −1.06779
\(479\) 11566.9 1.10335 0.551675 0.834059i \(-0.313989\pi\)
0.551675 + 0.834059i \(0.313989\pi\)
\(480\) −2851.59 −0.271160
\(481\) 70.4363 0.00667696
\(482\) 10678.4 1.00911
\(483\) 2711.89 0.255477
\(484\) −64.8437 −0.00608975
\(485\) 20002.9 1.87275
\(486\) 14091.4 1.31522
\(487\) −18326.5 −1.70525 −0.852623 0.522527i \(-0.824990\pi\)
−0.852623 + 0.522527i \(0.824990\pi\)
\(488\) −17226.8 −1.59799
\(489\) 21605.2 1.99800
\(490\) −13538.9 −1.24821
\(491\) −7617.58 −0.700156 −0.350078 0.936721i \(-0.613845\pi\)
−0.350078 + 0.936721i \(0.613845\pi\)
\(492\) 1109.22 0.101641
\(493\) 1030.17 0.0941108
\(494\) 2048.62 0.186582
\(495\) −5859.67 −0.532066
\(496\) −1871.75 −0.169444
\(497\) −636.980 −0.0574899
\(498\) −9570.50 −0.861173
\(499\) 12909.1 1.15810 0.579050 0.815292i \(-0.303424\pi\)
0.579050 + 0.815292i \(0.303424\pi\)
\(500\) 233.171 0.0208554
\(501\) −21701.8 −1.93526
\(502\) 2991.30 0.265953
\(503\) 10165.7 0.901121 0.450561 0.892746i \(-0.351224\pi\)
0.450561 + 0.892746i \(0.351224\pi\)
\(504\) −2568.60 −0.227013
\(505\) −2398.74 −0.211371
\(506\) 3346.47 0.294009
\(507\) 17190.6 1.50584
\(508\) 706.102 0.0616697
\(509\) 6449.93 0.561666 0.280833 0.959757i \(-0.409389\pi\)
0.280833 + 0.959757i \(0.409389\pi\)
\(510\) 13262.8 1.15155
\(511\) −3104.36 −0.268745
\(512\) −12525.4 −1.08115
\(513\) −9824.75 −0.845562
\(514\) 2139.68 0.183614
\(515\) −516.397 −0.0441848
\(516\) −245.205 −0.0209197
\(517\) 3782.31 0.321752
\(518\) 110.305 0.00935623
\(519\) −18293.7 −1.54721
\(520\) −1856.67 −0.156577
\(521\) −19327.4 −1.62524 −0.812620 0.582794i \(-0.801959\pi\)
−0.812620 + 0.582794i \(0.801959\pi\)
\(522\) −2448.53 −0.205305
\(523\) 6259.09 0.523310 0.261655 0.965161i \(-0.415732\pi\)
0.261655 + 0.965161i \(0.415732\pi\)
\(524\) 857.819 0.0715153
\(525\) −2330.97 −0.193775
\(526\) 16884.2 1.39960
\(527\) −1298.18 −0.107305
\(528\) −5182.52 −0.427160
\(529\) 232.675 0.0191235
\(530\) −13921.6 −1.14098
\(531\) 3168.61 0.258956
\(532\) −230.337 −0.0187714
\(533\) 1399.08 0.113698
\(534\) 32254.6 2.61384
\(535\) 12363.2 0.999079
\(536\) −7983.99 −0.643387
\(537\) 10403.0 0.835985
\(538\) 2696.44 0.216081
\(539\) 3669.20 0.293217
\(540\) 559.022 0.0445490
\(541\) −14008.2 −1.11323 −0.556616 0.830770i \(-0.687900\pi\)
−0.556616 + 0.830770i \(0.687900\pi\)
\(542\) 12504.6 0.990991
\(543\) 6367.72 0.503251
\(544\) −997.834 −0.0786430
\(545\) 15513.9 1.21934
\(546\) −356.565 −0.0279479
\(547\) −4949.45 −0.386879 −0.193440 0.981112i \(-0.561964\pi\)
−0.193440 + 0.981112i \(0.561964\pi\)
\(548\) −863.695 −0.0673270
\(549\) 26487.0 2.05909
\(550\) −2876.41 −0.223001
\(551\) −3497.35 −0.270404
\(552\) −20588.2 −1.58748
\(553\) 3975.60 0.305714
\(554\) 1551.36 0.118973
\(555\) −1548.11 −0.118403
\(556\) 17.0748 0.00130239
\(557\) −3801.58 −0.289188 −0.144594 0.989491i \(-0.546188\pi\)
−0.144594 + 0.989491i \(0.546188\pi\)
\(558\) 3085.54 0.234088
\(559\) −309.282 −0.0234011
\(560\) −2711.94 −0.204644
\(561\) −3594.40 −0.270510
\(562\) 14510.0 1.08908
\(563\) −9900.11 −0.741101 −0.370551 0.928812i \(-0.620831\pi\)
−0.370551 + 0.928812i \(0.620831\pi\)
\(564\) −1460.90 −0.109069
\(565\) 4383.85 0.326425
\(566\) −12918.3 −0.959361
\(567\) −1263.86 −0.0936107
\(568\) 4835.84 0.357231
\(569\) 5329.16 0.392636 0.196318 0.980540i \(-0.437102\pi\)
0.196318 + 0.980540i \(0.437102\pi\)
\(570\) −45026.3 −3.30868
\(571\) −16962.6 −1.24319 −0.621597 0.783337i \(-0.713516\pi\)
−0.621597 + 0.783337i \(0.713516\pi\)
\(572\) 31.5906 0.00230921
\(573\) −13622.6 −0.993181
\(574\) 2190.99 0.159321
\(575\) −10658.0 −0.772989
\(576\) 19418.0 1.40466
\(577\) −15487.0 −1.11738 −0.558692 0.829375i \(-0.688697\pi\)
−0.558692 + 0.829375i \(0.688697\pi\)
\(578\) −8781.61 −0.631949
\(579\) −10625.3 −0.762643
\(580\) 198.997 0.0142464
\(581\) 1357.26 0.0969169
\(582\) −29163.7 −2.07710
\(583\) 3772.94 0.268026
\(584\) 23567.7 1.66993
\(585\) 2854.72 0.201757
\(586\) 6362.72 0.448535
\(587\) 11084.2 0.779373 0.389686 0.920948i \(-0.372583\pi\)
0.389686 + 0.920948i \(0.372583\pi\)
\(588\) −1417.22 −0.0993964
\(589\) 4407.22 0.308313
\(590\) 3586.77 0.250280
\(591\) 27894.0 1.94147
\(592\) −781.066 −0.0542257
\(593\) 4349.68 0.301214 0.150607 0.988594i \(-0.451877\pi\)
0.150607 + 0.988594i \(0.451877\pi\)
\(594\) 2110.15 0.145759
\(595\) −1880.90 −0.129596
\(596\) 1301.34 0.0894382
\(597\) −6530.40 −0.447691
\(598\) −1630.33 −0.111487
\(599\) 13183.9 0.899299 0.449650 0.893205i \(-0.351549\pi\)
0.449650 + 0.893205i \(0.351549\pi\)
\(600\) 17696.3 1.20408
\(601\) −18765.0 −1.27361 −0.636806 0.771024i \(-0.719745\pi\)
−0.636806 + 0.771024i \(0.719745\pi\)
\(602\) −484.344 −0.0327913
\(603\) 12275.8 0.829034
\(604\) 1380.84 0.0930223
\(605\) 1797.63 0.120800
\(606\) 3497.29 0.234435
\(607\) 21871.4 1.46249 0.731244 0.682116i \(-0.238940\pi\)
0.731244 + 0.682116i \(0.238940\pi\)
\(608\) 3387.57 0.225961
\(609\) 608.720 0.0405034
\(610\) 29982.6 1.99010
\(611\) −1842.67 −0.122007
\(612\) 791.970 0.0523096
\(613\) −3527.85 −0.232445 −0.116222 0.993223i \(-0.537079\pi\)
−0.116222 + 0.993223i \(0.537079\pi\)
\(614\) −4584.56 −0.301332
\(615\) −30750.2 −2.01621
\(616\) 787.994 0.0515409
\(617\) −22728.1 −1.48298 −0.741490 0.670963i \(-0.765881\pi\)
−0.741490 + 0.670963i \(0.765881\pi\)
\(618\) 752.893 0.0490062
\(619\) −21443.3 −1.39237 −0.696187 0.717861i \(-0.745121\pi\)
−0.696187 + 0.717861i \(0.745121\pi\)
\(620\) −250.767 −0.0162437
\(621\) 7818.75 0.505243
\(622\) 9760.81 0.629217
\(623\) −4574.25 −0.294163
\(624\) 2524.82 0.161977
\(625\) −18428.2 −1.17940
\(626\) 19628.0 1.25319
\(627\) 12202.7 0.777240
\(628\) −1326.85 −0.0843109
\(629\) −541.718 −0.0343398
\(630\) 4470.56 0.282716
\(631\) 21532.0 1.35844 0.679219 0.733936i \(-0.262319\pi\)
0.679219 + 0.733936i \(0.262319\pi\)
\(632\) −30182.0 −1.89964
\(633\) 851.038 0.0534372
\(634\) −42.9141 −0.00268823
\(635\) −19574.9 −1.22332
\(636\) −1457.29 −0.0908572
\(637\) −1787.56 −0.111187
\(638\) 751.159 0.0466123
\(639\) −7435.33 −0.460309
\(640\) 19103.2 1.17988
\(641\) 20148.3 1.24151 0.620756 0.784004i \(-0.286826\pi\)
0.620756 + 0.784004i \(0.286826\pi\)
\(642\) −18025.2 −1.10810
\(643\) 28869.7 1.77062 0.885310 0.465000i \(-0.153946\pi\)
0.885310 + 0.465000i \(0.153946\pi\)
\(644\) 183.307 0.0112163
\(645\) 6797.68 0.414974
\(646\) −15755.7 −0.959597
\(647\) −1590.02 −0.0966155 −0.0483077 0.998833i \(-0.515383\pi\)
−0.0483077 + 0.998833i \(0.515383\pi\)
\(648\) 9595.02 0.581679
\(649\) −972.062 −0.0587932
\(650\) 1401.33 0.0845612
\(651\) −767.083 −0.0461818
\(652\) 1460.38 0.0877192
\(653\) 20028.1 1.20024 0.600122 0.799909i \(-0.295119\pi\)
0.600122 + 0.799909i \(0.295119\pi\)
\(654\) −22618.9 −1.35240
\(655\) −23780.8 −1.41862
\(656\) −15514.4 −0.923375
\(657\) −36236.5 −2.15178
\(658\) −2885.66 −0.170965
\(659\) −10520.7 −0.621897 −0.310948 0.950427i \(-0.600647\pi\)
−0.310948 + 0.950427i \(0.600647\pi\)
\(660\) −694.326 −0.0409494
\(661\) 3295.83 0.193938 0.0969690 0.995287i \(-0.469085\pi\)
0.0969690 + 0.995287i \(0.469085\pi\)
\(662\) −3603.45 −0.211559
\(663\) 1751.12 0.102576
\(664\) −10304.1 −0.602222
\(665\) 6385.51 0.372360
\(666\) 1287.57 0.0749132
\(667\) 2783.27 0.161572
\(668\) −1466.91 −0.0849649
\(669\) 31187.0 1.80233
\(670\) 13895.8 0.801257
\(671\) −8125.67 −0.467493
\(672\) −589.612 −0.0338464
\(673\) −1187.64 −0.0680239 −0.0340119 0.999421i \(-0.510828\pi\)
−0.0340119 + 0.999421i \(0.510828\pi\)
\(674\) −653.460 −0.0373447
\(675\) −6720.51 −0.383219
\(676\) 1161.98 0.0661117
\(677\) 13221.4 0.750574 0.375287 0.926909i \(-0.377544\pi\)
0.375287 + 0.926909i \(0.377544\pi\)
\(678\) −6391.55 −0.362044
\(679\) 4135.91 0.233758
\(680\) 14279.4 0.805282
\(681\) 14048.0 0.790485
\(682\) −946.578 −0.0531471
\(683\) −13831.4 −0.774882 −0.387441 0.921894i \(-0.626641\pi\)
−0.387441 + 0.921894i \(0.626641\pi\)
\(684\) −2688.68 −0.150298
\(685\) 23943.7 1.33554
\(686\) −5677.93 −0.316012
\(687\) −15185.4 −0.843320
\(688\) 3429.62 0.190048
\(689\) −1838.10 −0.101635
\(690\) 35832.9 1.97701
\(691\) −9817.07 −0.540462 −0.270231 0.962796i \(-0.587100\pi\)
−0.270231 + 0.962796i \(0.587100\pi\)
\(692\) −1236.54 −0.0679280
\(693\) −1211.58 −0.0664128
\(694\) −16017.4 −0.876101
\(695\) −473.354 −0.0258350
\(696\) −4621.29 −0.251680
\(697\) −10760.2 −0.584750
\(698\) 9539.58 0.517304
\(699\) −34854.9 −1.88603
\(700\) −157.560 −0.00850742
\(701\) 29949.8 1.61368 0.806838 0.590773i \(-0.201177\pi\)
0.806838 + 0.590773i \(0.201177\pi\)
\(702\) −1028.02 −0.0552711
\(703\) 1839.09 0.0986667
\(704\) −5957.03 −0.318912
\(705\) 40499.8 2.16356
\(706\) −29825.0 −1.58991
\(707\) −495.976 −0.0263835
\(708\) 375.456 0.0199301
\(709\) 11307.5 0.598959 0.299479 0.954103i \(-0.403187\pi\)
0.299479 + 0.954103i \(0.403187\pi\)
\(710\) −8416.59 −0.444886
\(711\) 46406.3 2.44778
\(712\) 34726.9 1.82787
\(713\) −3507.36 −0.184224
\(714\) 2742.30 0.143737
\(715\) −875.768 −0.0458068
\(716\) 703.181 0.0367027
\(717\) 32382.7 1.68669
\(718\) −31420.6 −1.63316
\(719\) −32623.4 −1.69214 −0.846070 0.533071i \(-0.821038\pi\)
−0.846070 + 0.533071i \(0.821038\pi\)
\(720\) −31655.9 −1.63853
\(721\) −106.773 −0.00551518
\(722\) 34750.2 1.79123
\(723\) −30988.0 −1.59399
\(724\) 430.420 0.0220945
\(725\) −2392.33 −0.122550
\(726\) −2620.89 −0.133981
\(727\) −502.545 −0.0256373 −0.0128187 0.999918i \(-0.504080\pi\)
−0.0128187 + 0.999918i \(0.504080\pi\)
\(728\) −383.895 −0.0195441
\(729\) −29783.2 −1.51314
\(730\) −41018.7 −2.07968
\(731\) 2378.66 0.120353
\(732\) 3138.51 0.158474
\(733\) 8631.37 0.434935 0.217467 0.976068i \(-0.430220\pi\)
0.217467 + 0.976068i \(0.430220\pi\)
\(734\) 18487.8 0.929697
\(735\) 39288.7 1.97168
\(736\) −2695.90 −0.135017
\(737\) −3765.95 −0.188223
\(738\) 25575.0 1.27565
\(739\) −18357.5 −0.913792 −0.456896 0.889520i \(-0.651039\pi\)
−0.456896 + 0.889520i \(0.651039\pi\)
\(740\) −104.643 −0.00519832
\(741\) −5944.93 −0.294726
\(742\) −2878.52 −0.142417
\(743\) 11182.6 0.552155 0.276078 0.961135i \(-0.410965\pi\)
0.276078 + 0.961135i \(0.410965\pi\)
\(744\) 5823.55 0.286965
\(745\) −36076.4 −1.77415
\(746\) −14507.8 −0.712021
\(747\) 15843.0 0.775991
\(748\) −242.960 −0.0118763
\(749\) 2556.29 0.124706
\(750\) 9424.43 0.458842
\(751\) 16733.4 0.813063 0.406531 0.913637i \(-0.366738\pi\)
0.406531 + 0.913637i \(0.366738\pi\)
\(752\) 20433.3 0.990857
\(753\) −8680.53 −0.420101
\(754\) −365.950 −0.0176752
\(755\) −38280.2 −1.84524
\(756\) 115.587 0.00556064
\(757\) −24402.4 −1.17163 −0.585813 0.810446i \(-0.699225\pi\)
−0.585813 + 0.810446i \(0.699225\pi\)
\(758\) −2290.19 −0.109741
\(759\) −9711.19 −0.464419
\(760\) −48477.6 −2.31377
\(761\) 8469.33 0.403434 0.201717 0.979444i \(-0.435348\pi\)
0.201717 + 0.979444i \(0.435348\pi\)
\(762\) 28539.7 1.35680
\(763\) 3207.74 0.152199
\(764\) −920.805 −0.0436042
\(765\) −21955.3 −1.03764
\(766\) −7737.62 −0.364976
\(767\) 473.570 0.0222941
\(768\) 6496.08 0.305218
\(769\) 32834.7 1.53973 0.769864 0.638208i \(-0.220324\pi\)
0.769864 + 0.638208i \(0.220324\pi\)
\(770\) −1371.47 −0.0641877
\(771\) −6209.20 −0.290038
\(772\) −718.202 −0.0334827
\(773\) −35571.4 −1.65513 −0.827564 0.561371i \(-0.810274\pi\)
−0.827564 + 0.561371i \(0.810274\pi\)
\(774\) −5653.64 −0.262553
\(775\) 3014.71 0.139731
\(776\) −31399.1 −1.45253
\(777\) −320.097 −0.0147792
\(778\) 8500.11 0.391701
\(779\) 36530.0 1.68013
\(780\) 338.262 0.0155279
\(781\) 2281.01 0.104508
\(782\) 12538.7 0.573381
\(783\) 1755.02 0.0801014
\(784\) 19822.3 0.902982
\(785\) 36783.6 1.67244
\(786\) 34671.8 1.57341
\(787\) 15729.6 0.712452 0.356226 0.934400i \(-0.384063\pi\)
0.356226 + 0.934400i \(0.384063\pi\)
\(788\) 1885.47 0.0852373
\(789\) −48996.7 −2.21081
\(790\) 52530.6 2.36577
\(791\) 906.431 0.0407446
\(792\) 9198.09 0.412676
\(793\) 3958.67 0.177272
\(794\) 38819.0 1.73506
\(795\) 40399.5 1.80229
\(796\) −441.415 −0.0196552
\(797\) 7888.07 0.350577 0.175288 0.984517i \(-0.443914\pi\)
0.175288 + 0.984517i \(0.443914\pi\)
\(798\) −9309.91 −0.412991
\(799\) 14171.8 0.627485
\(800\) 2317.23 0.102408
\(801\) −53394.2 −2.35530
\(802\) −17107.2 −0.753214
\(803\) 11116.6 0.488538
\(804\) 1454.58 0.0638050
\(805\) −5081.73 −0.222494
\(806\) 461.154 0.0201532
\(807\) −7824.86 −0.341323
\(808\) 3765.36 0.163942
\(809\) 5896.97 0.256275 0.128138 0.991756i \(-0.459100\pi\)
0.128138 + 0.991756i \(0.459100\pi\)
\(810\) −16699.8 −0.724407
\(811\) 14197.9 0.614744 0.307372 0.951589i \(-0.400550\pi\)
0.307372 + 0.951589i \(0.400550\pi\)
\(812\) 41.1458 0.00177824
\(813\) −36287.3 −1.56538
\(814\) −394.999 −0.0170082
\(815\) −40485.3 −1.74005
\(816\) −19418.2 −0.833053
\(817\) −8075.35 −0.345803
\(818\) −11454.1 −0.489589
\(819\) 590.258 0.0251835
\(820\) −2078.53 −0.0885188
\(821\) −19841.7 −0.843459 −0.421729 0.906722i \(-0.638577\pi\)
−0.421729 + 0.906722i \(0.638577\pi\)
\(822\) −34909.3 −1.48127
\(823\) −28202.2 −1.19449 −0.597246 0.802058i \(-0.703738\pi\)
−0.597246 + 0.802058i \(0.703738\pi\)
\(824\) 810.602 0.0342702
\(825\) 8347.14 0.352255
\(826\) 741.622 0.0312401
\(827\) 34031.0 1.43092 0.715462 0.698651i \(-0.246216\pi\)
0.715462 + 0.698651i \(0.246216\pi\)
\(828\) 2139.71 0.0898067
\(829\) 4931.55 0.206610 0.103305 0.994650i \(-0.467058\pi\)
0.103305 + 0.994650i \(0.467058\pi\)
\(830\) 17933.9 0.749992
\(831\) −4501.92 −0.187930
\(832\) 2902.15 0.120930
\(833\) 13748.0 0.571836
\(834\) 690.138 0.0286541
\(835\) 40666.4 1.68541
\(836\) 824.830 0.0341236
\(837\) −2211.60 −0.0913312
\(838\) −25373.0 −1.04594
\(839\) −38189.8 −1.57146 −0.785731 0.618568i \(-0.787713\pi\)
−0.785731 + 0.618568i \(0.787713\pi\)
\(840\) 8437.60 0.346577
\(841\) −23764.3 −0.974384
\(842\) 35915.6 1.46999
\(843\) −42106.8 −1.72033
\(844\) 57.5250 0.00234608
\(845\) −32212.9 −1.31143
\(846\) −33683.7 −1.36888
\(847\) 371.687 0.0150783
\(848\) 20382.7 0.825406
\(849\) 37488.0 1.51541
\(850\) −10777.5 −0.434900
\(851\) −1463.59 −0.0589556
\(852\) −881.030 −0.0354268
\(853\) 42966.8 1.72469 0.862343 0.506325i \(-0.168997\pi\)
0.862343 + 0.506325i \(0.168997\pi\)
\(854\) 6199.37 0.248405
\(855\) 74536.6 2.98140
\(856\) −19406.8 −0.774898
\(857\) −17281.5 −0.688828 −0.344414 0.938818i \(-0.611922\pi\)
−0.344414 + 0.938818i \(0.611922\pi\)
\(858\) 1276.85 0.0508052
\(859\) 9316.75 0.370062 0.185031 0.982733i \(-0.440761\pi\)
0.185031 + 0.982733i \(0.440761\pi\)
\(860\) 459.482 0.0182188
\(861\) −6358.10 −0.251665
\(862\) 13413.5 0.530005
\(863\) −9647.65 −0.380544 −0.190272 0.981731i \(-0.560937\pi\)
−0.190272 + 0.981731i \(0.560937\pi\)
\(864\) −1699.93 −0.0669361
\(865\) 34279.9 1.34746
\(866\) −32083.3 −1.25893
\(867\) 25483.6 0.998232
\(868\) −51.8501 −0.00202754
\(869\) −14236.5 −0.555742
\(870\) 8043.18 0.313436
\(871\) 1834.70 0.0713735
\(872\) −24352.6 −0.945737
\(873\) 48277.6 1.87165
\(874\) −42568.0 −1.64746
\(875\) −1336.55 −0.0516383
\(876\) −4293.75 −0.165608
\(877\) 19728.7 0.759624 0.379812 0.925064i \(-0.375989\pi\)
0.379812 + 0.925064i \(0.375989\pi\)
\(878\) −32304.3 −1.24171
\(879\) −18464.1 −0.708509
\(880\) 9711.36 0.372011
\(881\) 19473.9 0.744712 0.372356 0.928090i \(-0.378550\pi\)
0.372356 + 0.928090i \(0.378550\pi\)
\(882\) −32676.4 −1.24748
\(883\) 49092.4 1.87100 0.935499 0.353329i \(-0.114950\pi\)
0.935499 + 0.353329i \(0.114950\pi\)
\(884\) 118.365 0.00450346
\(885\) −10408.5 −0.395344
\(886\) 27599.5 1.04653
\(887\) 9292.86 0.351774 0.175887 0.984410i \(-0.443721\pi\)
0.175887 + 0.984410i \(0.443721\pi\)
\(888\) 2430.12 0.0918348
\(889\) −4047.41 −0.152695
\(890\) −60440.8 −2.27638
\(891\) 4525.85 0.170170
\(892\) 2108.05 0.0791288
\(893\) −48112.0 −1.80292
\(894\) 52598.5 1.96774
\(895\) −19493.9 −0.728055
\(896\) 3949.89 0.147273
\(897\) 4731.10 0.176106
\(898\) −943.252 −0.0350520
\(899\) −787.273 −0.0292069
\(900\) −1839.16 −0.0681170
\(901\) 14136.7 0.522709
\(902\) −7845.88 −0.289622
\(903\) 1405.53 0.0517974
\(904\) −6881.46 −0.253179
\(905\) −11932.3 −0.438279
\(906\) 55811.5 2.04659
\(907\) 37688.7 1.37975 0.689875 0.723928i \(-0.257665\pi\)
0.689875 + 0.723928i \(0.257665\pi\)
\(908\) 949.559 0.0347051
\(909\) −5789.42 −0.211246
\(910\) 668.155 0.0243397
\(911\) 33049.6 1.20196 0.600979 0.799265i \(-0.294778\pi\)
0.600979 + 0.799265i \(0.294778\pi\)
\(912\) 65923.1 2.39357
\(913\) −4860.31 −0.176180
\(914\) −28870.0 −1.04479
\(915\) −87007.2 −3.14357
\(916\) −1026.44 −0.0370247
\(917\) −4917.06 −0.177073
\(918\) 7906.43 0.284260
\(919\) −23148.0 −0.830883 −0.415442 0.909620i \(-0.636373\pi\)
−0.415442 + 0.909620i \(0.636373\pi\)
\(920\) 38579.5 1.38253
\(921\) 13304.1 0.475986
\(922\) 12933.4 0.461973
\(923\) −1111.26 −0.0396290
\(924\) −143.563 −0.00511134
\(925\) 1258.01 0.0447169
\(926\) 9374.21 0.332673
\(927\) −1246.34 −0.0441588
\(928\) −605.131 −0.0214056
\(929\) −23177.9 −0.818561 −0.409280 0.912409i \(-0.634220\pi\)
−0.409280 + 0.912409i \(0.634220\pi\)
\(930\) −10135.7 −0.357378
\(931\) −46673.3 −1.64302
\(932\) −2355.98 −0.0828033
\(933\) −28325.1 −0.993916
\(934\) 13979.8 0.489757
\(935\) 6735.44 0.235585
\(936\) −4481.13 −0.156485
\(937\) −34574.7 −1.20545 −0.602724 0.797950i \(-0.705918\pi\)
−0.602724 + 0.797950i \(0.705918\pi\)
\(938\) 2873.18 0.100014
\(939\) −56959.1 −1.97954
\(940\) 2737.54 0.0949880
\(941\) 41831.2 1.44916 0.724578 0.689192i \(-0.242034\pi\)
0.724578 + 0.689192i \(0.242034\pi\)
\(942\) −53629.6 −1.85493
\(943\) −29071.3 −1.00392
\(944\) −5251.40 −0.181058
\(945\) −3204.34 −0.110304
\(946\) 1734.42 0.0596097
\(947\) 27231.2 0.934419 0.467209 0.884147i \(-0.345259\pi\)
0.467209 + 0.884147i \(0.345259\pi\)
\(948\) 5498.79 0.188389
\(949\) −5415.79 −0.185252
\(950\) 36588.8 1.24958
\(951\) 124.534 0.00424635
\(952\) 2952.50 0.100516
\(953\) 40939.4 1.39156 0.695781 0.718254i \(-0.255058\pi\)
0.695781 + 0.718254i \(0.255058\pi\)
\(954\) −33600.3 −1.14030
\(955\) 25527.0 0.864956
\(956\) 2188.87 0.0740515
\(957\) −2179.81 −0.0736292
\(958\) 31601.3 1.06575
\(959\) 4950.74 0.166703
\(960\) −63786.1 −2.14447
\(961\) −28798.9 −0.966698
\(962\) 192.436 0.00644945
\(963\) 29839.0 0.998491
\(964\) −2094.60 −0.0699820
\(965\) 19910.3 0.664182
\(966\) 7409.03 0.246772
\(967\) −46173.1 −1.53550 −0.767750 0.640750i \(-0.778624\pi\)
−0.767750 + 0.640750i \(0.778624\pi\)
\(968\) −2821.78 −0.0936937
\(969\) 45721.8 1.51579
\(970\) 54648.9 1.80894
\(971\) −5153.91 −0.170337 −0.0851683 0.996367i \(-0.527143\pi\)
−0.0851683 + 0.996367i \(0.527143\pi\)
\(972\) −2764.06 −0.0912111
\(973\) −97.8734 −0.00322474
\(974\) −50069.0 −1.64714
\(975\) −4066.56 −0.133574
\(976\) −43897.6 −1.43968
\(977\) 9692.13 0.317378 0.158689 0.987329i \(-0.449273\pi\)
0.158689 + 0.987329i \(0.449273\pi\)
\(978\) 59026.5 1.92992
\(979\) 16380.2 0.534744
\(980\) 2655.68 0.0865638
\(981\) 37443.3 1.21863
\(982\) −20811.6 −0.676299
\(983\) 32915.7 1.06800 0.534002 0.845483i \(-0.320687\pi\)
0.534002 + 0.845483i \(0.320687\pi\)
\(984\) 48269.5 1.56380
\(985\) −52269.7 −1.69081
\(986\) 2814.48 0.0909041
\(987\) 8373.97 0.270057
\(988\) −401.841 −0.0129395
\(989\) 6426.54 0.206625
\(990\) −16008.9 −0.513936
\(991\) 29477.9 0.944901 0.472451 0.881357i \(-0.343370\pi\)
0.472451 + 0.881357i \(0.343370\pi\)
\(992\) 762.560 0.0244066
\(993\) 10456.9 0.334180
\(994\) −1740.26 −0.0555310
\(995\) 12237.1 0.389892
\(996\) 1877.28 0.0597227
\(997\) −31944.4 −1.01473 −0.507366 0.861731i \(-0.669381\pi\)
−0.507366 + 0.861731i \(0.669381\pi\)
\(998\) 35268.4 1.11864
\(999\) −922.883 −0.0292279
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 11.4.a.a.1.2 2
3.2 odd 2 99.4.a.c.1.1 2
4.3 odd 2 176.4.a.i.1.2 2
5.2 odd 4 275.4.b.c.199.4 4
5.3 odd 4 275.4.b.c.199.1 4
5.4 even 2 275.4.a.b.1.1 2
7.6 odd 2 539.4.a.e.1.2 2
8.3 odd 2 704.4.a.n.1.1 2
8.5 even 2 704.4.a.p.1.2 2
11.2 odd 10 121.4.c.f.81.2 8
11.3 even 5 121.4.c.c.9.2 8
11.4 even 5 121.4.c.c.27.2 8
11.5 even 5 121.4.c.c.3.1 8
11.6 odd 10 121.4.c.f.3.2 8
11.7 odd 10 121.4.c.f.27.1 8
11.8 odd 10 121.4.c.f.9.1 8
11.9 even 5 121.4.c.c.81.1 8
11.10 odd 2 121.4.a.c.1.1 2
12.11 even 2 1584.4.a.bc.1.1 2
13.12 even 2 1859.4.a.a.1.1 2
15.14 odd 2 2475.4.a.q.1.2 2
33.32 even 2 1089.4.a.v.1.2 2
44.43 even 2 1936.4.a.w.1.2 2
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
11.4.a.a.1.2 2 1.1 even 1 trivial
99.4.a.c.1.1 2 3.2 odd 2
121.4.a.c.1.1 2 11.10 odd 2
121.4.c.c.3.1 8 11.5 even 5
121.4.c.c.9.2 8 11.3 even 5
121.4.c.c.27.2 8 11.4 even 5
121.4.c.c.81.1 8 11.9 even 5
121.4.c.f.3.2 8 11.6 odd 10
121.4.c.f.9.1 8 11.8 odd 10
121.4.c.f.27.1 8 11.7 odd 10
121.4.c.f.81.2 8 11.2 odd 10
176.4.a.i.1.2 2 4.3 odd 2
275.4.a.b.1.1 2 5.4 even 2
275.4.b.c.199.1 4 5.3 odd 4
275.4.b.c.199.4 4 5.2 odd 4
539.4.a.e.1.2 2 7.6 odd 2
704.4.a.n.1.1 2 8.3 odd 2
704.4.a.p.1.2 2 8.5 even 2
1089.4.a.v.1.2 2 33.32 even 2
1584.4.a.bc.1.1 2 12.11 even 2
1859.4.a.a.1.1 2 13.12 even 2
1936.4.a.w.1.2 2 44.43 even 2
2475.4.a.q.1.2 2 15.14 odd 2