Properties

Label 2001.2.a.l.1.5
Level $2001$
Weight $2$
Character 2001.1
Self dual yes
Analytic conductor $15.978$
Analytic rank $0$
Dimension $11$
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] = [2001,2,Mod(1,2001)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(2001, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 0, 0]))
 
N = Newforms(chi, 2, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("2001.1");
 
S:= CuspForms(chi, 2);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 2001 = 3 \cdot 23 \cdot 29 \)
Weight: \( k \) \(=\) \( 2 \)
Character orbit: \([\chi]\) \(=\) 2001.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: \(15.9780654445\)
Analytic rank: \(0\)
Dimension: \(11\)
Coefficient field: \(\mathbb{Q}[x]/(x^{11} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{11} - 2 x^{10} - 18 x^{9} + 30 x^{8} + 124 x^{7} - 152 x^{6} - 408 x^{5} + 285 x^{4} + 634 x^{3} + \cdots - 108 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{7}]\)
Coefficient ring index: \( 3 \)
Twist minimal: yes
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.5
Root \(-0.661934\) of defining polynomial
Character \(\chi\) \(=\) 2001.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-0.661934 q^{2} -1.00000 q^{3} -1.56184 q^{4} -1.16115 q^{5} +0.661934 q^{6} +4.80000 q^{7} +2.35770 q^{8} +1.00000 q^{9} +O(q^{10})\) \(q-0.661934 q^{2} -1.00000 q^{3} -1.56184 q^{4} -1.16115 q^{5} +0.661934 q^{6} +4.80000 q^{7} +2.35770 q^{8} +1.00000 q^{9} +0.768607 q^{10} -0.481747 q^{11} +1.56184 q^{12} -3.88315 q^{13} -3.17728 q^{14} +1.16115 q^{15} +1.56304 q^{16} +7.41544 q^{17} -0.661934 q^{18} +4.27098 q^{19} +1.81354 q^{20} -4.80000 q^{21} +0.318884 q^{22} +1.00000 q^{23} -2.35770 q^{24} -3.65172 q^{25} +2.57039 q^{26} -1.00000 q^{27} -7.49685 q^{28} -1.00000 q^{29} -0.768607 q^{30} -0.692651 q^{31} -5.75004 q^{32} +0.481747 q^{33} -4.90853 q^{34} -5.57354 q^{35} -1.56184 q^{36} -5.71364 q^{37} -2.82710 q^{38} +3.88315 q^{39} -2.73766 q^{40} +6.42272 q^{41} +3.17728 q^{42} -8.76031 q^{43} +0.752413 q^{44} -1.16115 q^{45} -0.661934 q^{46} +0.616265 q^{47} -1.56304 q^{48} +16.0400 q^{49} +2.41720 q^{50} -7.41544 q^{51} +6.06488 q^{52} +6.31136 q^{53} +0.661934 q^{54} +0.559383 q^{55} +11.3170 q^{56} -4.27098 q^{57} +0.661934 q^{58} +1.01528 q^{59} -1.81354 q^{60} -6.33953 q^{61} +0.458489 q^{62} +4.80000 q^{63} +0.680055 q^{64} +4.50894 q^{65} -0.318884 q^{66} -11.6618 q^{67} -11.5818 q^{68} -1.00000 q^{69} +3.68932 q^{70} +6.45040 q^{71} +2.35770 q^{72} +14.7390 q^{73} +3.78205 q^{74} +3.65172 q^{75} -6.67060 q^{76} -2.31238 q^{77} -2.57039 q^{78} -2.44072 q^{79} -1.81494 q^{80} +1.00000 q^{81} -4.25142 q^{82} +11.5245 q^{83} +7.49685 q^{84} -8.61047 q^{85} +5.79874 q^{86} +1.00000 q^{87} -1.13582 q^{88} +1.71946 q^{89} +0.768607 q^{90} -18.6391 q^{91} -1.56184 q^{92} +0.692651 q^{93} -0.407926 q^{94} -4.95926 q^{95} +5.75004 q^{96} +3.96175 q^{97} -10.6174 q^{98} -0.481747 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 11 q + 2 q^{2} - 11 q^{3} + 18 q^{4} + 2 q^{5} - 2 q^{6} + 3 q^{7} + 18 q^{8} + 11 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 11 q + 2 q^{2} - 11 q^{3} + 18 q^{4} + 2 q^{5} - 2 q^{6} + 3 q^{7} + 18 q^{8} + 11 q^{9} + 14 q^{10} + 11 q^{11} - 18 q^{12} - 5 q^{13} + 17 q^{14} - 2 q^{15} + 20 q^{16} + 15 q^{17} + 2 q^{18} - 6 q^{19} + 21 q^{20} - 3 q^{21} - 10 q^{22} + 11 q^{23} - 18 q^{24} + 3 q^{25} - 5 q^{26} - 11 q^{27} + 7 q^{28} - 11 q^{29} - 14 q^{30} + 35 q^{31} + 28 q^{32} - 11 q^{33} + 28 q^{34} + 15 q^{35} + 18 q^{36} - 28 q^{37} - 2 q^{38} + 5 q^{39} - q^{40} + 10 q^{41} - 17 q^{42} - 6 q^{43} + 18 q^{44} + 2 q^{45} + 2 q^{46} + 15 q^{47} - 20 q^{48} + 22 q^{49} + 15 q^{50} - 15 q^{51} - 36 q^{52} - 7 q^{53} - 2 q^{54} - 12 q^{55} + 56 q^{56} + 6 q^{57} - 2 q^{58} - 20 q^{59} - 21 q^{60} - 20 q^{61} - 11 q^{62} + 3 q^{63} + 36 q^{64} + 11 q^{65} + 10 q^{66} - 39 q^{67} + 35 q^{68} - 11 q^{69} + 38 q^{70} + 49 q^{71} + 18 q^{72} - 3 q^{73} + 37 q^{74} - 3 q^{75} - 18 q^{76} + 25 q^{77} + 5 q^{78} + 41 q^{79} + 51 q^{80} + 11 q^{81} - 19 q^{82} + 13 q^{83} - 7 q^{84} + 62 q^{86} + 11 q^{87} - 40 q^{88} + 34 q^{89} + 14 q^{90} + 2 q^{91} + 18 q^{92} - 35 q^{93} - 14 q^{94} + 25 q^{95} - 28 q^{96} - 11 q^{97} + 53 q^{98} + 11 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −0.661934 −0.468058 −0.234029 0.972230i \(-0.575191\pi\)
−0.234029 + 0.972230i \(0.575191\pi\)
\(3\) −1.00000 −0.577350
\(4\) −1.56184 −0.780922
\(5\) −1.16115 −0.519284 −0.259642 0.965705i \(-0.583605\pi\)
−0.259642 + 0.965705i \(0.583605\pi\)
\(6\) 0.661934 0.270233
\(7\) 4.80000 1.81423 0.907115 0.420884i \(-0.138280\pi\)
0.907115 + 0.420884i \(0.138280\pi\)
\(8\) 2.35770 0.833574
\(9\) 1.00000 0.333333
\(10\) 0.768607 0.243055
\(11\) −0.481747 −0.145252 −0.0726260 0.997359i \(-0.523138\pi\)
−0.0726260 + 0.997359i \(0.523138\pi\)
\(12\) 1.56184 0.450866
\(13\) −3.88315 −1.07699 −0.538497 0.842628i \(-0.681008\pi\)
−0.538497 + 0.842628i \(0.681008\pi\)
\(14\) −3.17728 −0.849164
\(15\) 1.16115 0.299809
\(16\) 1.56304 0.390761
\(17\) 7.41544 1.79851 0.899254 0.437427i \(-0.144110\pi\)
0.899254 + 0.437427i \(0.144110\pi\)
\(18\) −0.661934 −0.156019
\(19\) 4.27098 0.979829 0.489914 0.871771i \(-0.337028\pi\)
0.489914 + 0.871771i \(0.337028\pi\)
\(20\) 1.81354 0.405521
\(21\) −4.80000 −1.04745
\(22\) 0.318884 0.0679864
\(23\) 1.00000 0.208514
\(24\) −2.35770 −0.481264
\(25\) −3.65172 −0.730344
\(26\) 2.57039 0.504095
\(27\) −1.00000 −0.192450
\(28\) −7.49685 −1.41677
\(29\) −1.00000 −0.185695
\(30\) −0.768607 −0.140328
\(31\) −0.692651 −0.124404 −0.0622019 0.998064i \(-0.519812\pi\)
−0.0622019 + 0.998064i \(0.519812\pi\)
\(32\) −5.75004 −1.01647
\(33\) 0.481747 0.0838613
\(34\) −4.90853 −0.841805
\(35\) −5.57354 −0.942101
\(36\) −1.56184 −0.260307
\(37\) −5.71364 −0.939317 −0.469658 0.882848i \(-0.655623\pi\)
−0.469658 + 0.882848i \(0.655623\pi\)
\(38\) −2.82710 −0.458616
\(39\) 3.88315 0.621802
\(40\) −2.73766 −0.432862
\(41\) 6.42272 1.00306 0.501530 0.865140i \(-0.332771\pi\)
0.501530 + 0.865140i \(0.332771\pi\)
\(42\) 3.17728 0.490265
\(43\) −8.76031 −1.33593 −0.667967 0.744191i \(-0.732835\pi\)
−0.667967 + 0.744191i \(0.732835\pi\)
\(44\) 0.752413 0.113431
\(45\) −1.16115 −0.173095
\(46\) −0.661934 −0.0975968
\(47\) 0.616265 0.0898915 0.0449457 0.998989i \(-0.485689\pi\)
0.0449457 + 0.998989i \(0.485689\pi\)
\(48\) −1.56304 −0.225606
\(49\) 16.0400 2.29143
\(50\) 2.41720 0.341843
\(51\) −7.41544 −1.03837
\(52\) 6.06488 0.841048
\(53\) 6.31136 0.866932 0.433466 0.901170i \(-0.357290\pi\)
0.433466 + 0.901170i \(0.357290\pi\)
\(54\) 0.661934 0.0900777
\(55\) 0.559383 0.0754271
\(56\) 11.3170 1.51229
\(57\) −4.27098 −0.565705
\(58\) 0.661934 0.0869161
\(59\) 1.01528 0.132178 0.0660889 0.997814i \(-0.478948\pi\)
0.0660889 + 0.997814i \(0.478948\pi\)
\(60\) −1.81354 −0.234127
\(61\) −6.33953 −0.811693 −0.405847 0.913941i \(-0.633023\pi\)
−0.405847 + 0.913941i \(0.633023\pi\)
\(62\) 0.458489 0.0582282
\(63\) 4.80000 0.604743
\(64\) 0.680055 0.0850069
\(65\) 4.50894 0.559266
\(66\) −0.318884 −0.0392519
\(67\) −11.6618 −1.42472 −0.712360 0.701814i \(-0.752374\pi\)
−0.712360 + 0.701814i \(0.752374\pi\)
\(68\) −11.5818 −1.40449
\(69\) −1.00000 −0.120386
\(70\) 3.68932 0.440958
\(71\) 6.45040 0.765522 0.382761 0.923847i \(-0.374973\pi\)
0.382761 + 0.923847i \(0.374973\pi\)
\(72\) 2.35770 0.277858
\(73\) 14.7390 1.72507 0.862533 0.506000i \(-0.168876\pi\)
0.862533 + 0.506000i \(0.168876\pi\)
\(74\) 3.78205 0.439654
\(75\) 3.65172 0.421664
\(76\) −6.67060 −0.765170
\(77\) −2.31238 −0.263521
\(78\) −2.57039 −0.291039
\(79\) −2.44072 −0.274602 −0.137301 0.990529i \(-0.543843\pi\)
−0.137301 + 0.990529i \(0.543843\pi\)
\(80\) −1.81494 −0.202916
\(81\) 1.00000 0.111111
\(82\) −4.25142 −0.469490
\(83\) 11.5245 1.26498 0.632488 0.774570i \(-0.282034\pi\)
0.632488 + 0.774570i \(0.282034\pi\)
\(84\) 7.49685 0.817973
\(85\) −8.61047 −0.933937
\(86\) 5.79874 0.625294
\(87\) 1.00000 0.107211
\(88\) −1.13582 −0.121078
\(89\) 1.71946 0.182262 0.0911310 0.995839i \(-0.470952\pi\)
0.0911310 + 0.995839i \(0.470952\pi\)
\(90\) 0.768607 0.0810183
\(91\) −18.6391 −1.95391
\(92\) −1.56184 −0.162833
\(93\) 0.692651 0.0718246
\(94\) −0.407926 −0.0420744
\(95\) −4.95926 −0.508810
\(96\) 5.75004 0.586861
\(97\) 3.96175 0.402255 0.201127 0.979565i \(-0.435540\pi\)
0.201127 + 0.979565i \(0.435540\pi\)
\(98\) −10.6174 −1.07252
\(99\) −0.481747 −0.0484174
\(100\) 5.70342 0.570342
\(101\) −18.2587 −1.81681 −0.908407 0.418088i \(-0.862700\pi\)
−0.908407 + 0.418088i \(0.862700\pi\)
\(102\) 4.90853 0.486016
\(103\) 9.17157 0.903702 0.451851 0.892094i \(-0.350764\pi\)
0.451851 + 0.892094i \(0.350764\pi\)
\(104\) −9.15533 −0.897754
\(105\) 5.57354 0.543922
\(106\) −4.17770 −0.405774
\(107\) 9.32854 0.901824 0.450912 0.892569i \(-0.351099\pi\)
0.450912 + 0.892569i \(0.351099\pi\)
\(108\) 1.56184 0.150289
\(109\) 17.1548 1.64313 0.821566 0.570114i \(-0.193101\pi\)
0.821566 + 0.570114i \(0.193101\pi\)
\(110\) −0.370274 −0.0353042
\(111\) 5.71364 0.542315
\(112\) 7.50261 0.708930
\(113\) 8.38650 0.788936 0.394468 0.918910i \(-0.370929\pi\)
0.394468 + 0.918910i \(0.370929\pi\)
\(114\) 2.82710 0.264782
\(115\) −1.16115 −0.108278
\(116\) 1.56184 0.145014
\(117\) −3.88315 −0.358998
\(118\) −0.672045 −0.0618668
\(119\) 35.5941 3.26290
\(120\) 2.73766 0.249913
\(121\) −10.7679 −0.978902
\(122\) 4.19634 0.379919
\(123\) −6.42272 −0.579117
\(124\) 1.08181 0.0971497
\(125\) 10.0460 0.898540
\(126\) −3.17728 −0.283055
\(127\) 9.39321 0.833513 0.416757 0.909018i \(-0.363167\pi\)
0.416757 + 0.909018i \(0.363167\pi\)
\(128\) 11.0499 0.976685
\(129\) 8.76031 0.771302
\(130\) −2.98462 −0.261769
\(131\) −17.8413 −1.55881 −0.779403 0.626523i \(-0.784477\pi\)
−0.779403 + 0.626523i \(0.784477\pi\)
\(132\) −0.752413 −0.0654892
\(133\) 20.5007 1.77763
\(134\) 7.71936 0.666851
\(135\) 1.16115 0.0999363
\(136\) 17.4834 1.49919
\(137\) 6.50179 0.555485 0.277743 0.960656i \(-0.410414\pi\)
0.277743 + 0.960656i \(0.410414\pi\)
\(138\) 0.661934 0.0563475
\(139\) 8.92280 0.756822 0.378411 0.925638i \(-0.376471\pi\)
0.378411 + 0.925638i \(0.376471\pi\)
\(140\) 8.70500 0.735707
\(141\) −0.616265 −0.0518989
\(142\) −4.26974 −0.358308
\(143\) 1.87070 0.156436
\(144\) 1.56304 0.130254
\(145\) 1.16115 0.0964287
\(146\) −9.75622 −0.807431
\(147\) −16.0400 −1.32296
\(148\) 8.92382 0.733533
\(149\) 12.3725 1.01359 0.506797 0.862065i \(-0.330829\pi\)
0.506797 + 0.862065i \(0.330829\pi\)
\(150\) −2.41720 −0.197363
\(151\) −2.18528 −0.177836 −0.0889180 0.996039i \(-0.528341\pi\)
−0.0889180 + 0.996039i \(0.528341\pi\)
\(152\) 10.0697 0.816760
\(153\) 7.41544 0.599502
\(154\) 1.53064 0.123343
\(155\) 0.804275 0.0646009
\(156\) −6.06488 −0.485579
\(157\) 14.9914 1.19645 0.598224 0.801329i \(-0.295873\pi\)
0.598224 + 0.801329i \(0.295873\pi\)
\(158\) 1.61559 0.128530
\(159\) −6.31136 −0.500524
\(160\) 6.67669 0.527838
\(161\) 4.80000 0.378293
\(162\) −0.661934 −0.0520064
\(163\) −8.88481 −0.695912 −0.347956 0.937511i \(-0.613124\pi\)
−0.347956 + 0.937511i \(0.613124\pi\)
\(164\) −10.0313 −0.783312
\(165\) −0.559383 −0.0435479
\(166\) −7.62844 −0.592081
\(167\) 2.40802 0.186338 0.0931692 0.995650i \(-0.470300\pi\)
0.0931692 + 0.995650i \(0.470300\pi\)
\(168\) −11.3170 −0.873124
\(169\) 2.07889 0.159915
\(170\) 5.69956 0.437136
\(171\) 4.27098 0.326610
\(172\) 13.6822 1.04326
\(173\) 18.9340 1.43952 0.719762 0.694221i \(-0.244251\pi\)
0.719762 + 0.694221i \(0.244251\pi\)
\(174\) −0.661934 −0.0501811
\(175\) −17.5283 −1.32501
\(176\) −0.752991 −0.0567589
\(177\) −1.01528 −0.0763128
\(178\) −1.13817 −0.0853091
\(179\) −3.18736 −0.238235 −0.119117 0.992880i \(-0.538006\pi\)
−0.119117 + 0.992880i \(0.538006\pi\)
\(180\) 1.81354 0.135174
\(181\) 13.2936 0.988109 0.494054 0.869431i \(-0.335514\pi\)
0.494054 + 0.869431i \(0.335514\pi\)
\(182\) 12.3379 0.914544
\(183\) 6.33953 0.468631
\(184\) 2.35770 0.173812
\(185\) 6.63442 0.487772
\(186\) −0.458489 −0.0336180
\(187\) −3.57236 −0.261237
\(188\) −0.962510 −0.0701982
\(189\) −4.80000 −0.349149
\(190\) 3.28270 0.238152
\(191\) 21.5092 1.55635 0.778177 0.628045i \(-0.216145\pi\)
0.778177 + 0.628045i \(0.216145\pi\)
\(192\) −0.680055 −0.0490787
\(193\) −2.35343 −0.169403 −0.0847017 0.996406i \(-0.526994\pi\)
−0.0847017 + 0.996406i \(0.526994\pi\)
\(194\) −2.62241 −0.188278
\(195\) −4.50894 −0.322892
\(196\) −25.0520 −1.78943
\(197\) 0.766029 0.0545773 0.0272886 0.999628i \(-0.491313\pi\)
0.0272886 + 0.999628i \(0.491313\pi\)
\(198\) 0.318884 0.0226621
\(199\) 9.77290 0.692783 0.346391 0.938090i \(-0.387407\pi\)
0.346391 + 0.938090i \(0.387407\pi\)
\(200\) −8.60967 −0.608796
\(201\) 11.6618 0.822562
\(202\) 12.0861 0.850373
\(203\) −4.80000 −0.336894
\(204\) 11.5818 0.810885
\(205\) −7.45778 −0.520874
\(206\) −6.07097 −0.422984
\(207\) 1.00000 0.0695048
\(208\) −6.06954 −0.420847
\(209\) −2.05753 −0.142322
\(210\) −3.68932 −0.254587
\(211\) −21.5678 −1.48479 −0.742395 0.669963i \(-0.766310\pi\)
−0.742395 + 0.669963i \(0.766310\pi\)
\(212\) −9.85736 −0.677007
\(213\) −6.45040 −0.441974
\(214\) −6.17487 −0.422105
\(215\) 10.1721 0.693730
\(216\) −2.35770 −0.160421
\(217\) −3.32472 −0.225697
\(218\) −11.3553 −0.769080
\(219\) −14.7390 −0.995968
\(220\) −0.873668 −0.0589027
\(221\) −28.7953 −1.93698
\(222\) −3.78205 −0.253835
\(223\) −0.944373 −0.0632399 −0.0316199 0.999500i \(-0.510067\pi\)
−0.0316199 + 0.999500i \(0.510067\pi\)
\(224\) −27.6002 −1.84412
\(225\) −3.65172 −0.243448
\(226\) −5.55131 −0.369268
\(227\) 20.2556 1.34441 0.672204 0.740366i \(-0.265348\pi\)
0.672204 + 0.740366i \(0.265348\pi\)
\(228\) 6.67060 0.441771
\(229\) 4.15599 0.274635 0.137318 0.990527i \(-0.456152\pi\)
0.137318 + 0.990527i \(0.456152\pi\)
\(230\) 0.768607 0.0506805
\(231\) 2.31238 0.152144
\(232\) −2.35770 −0.154791
\(233\) −13.3848 −0.876866 −0.438433 0.898764i \(-0.644466\pi\)
−0.438433 + 0.898764i \(0.644466\pi\)
\(234\) 2.57039 0.168032
\(235\) −0.715579 −0.0466792
\(236\) −1.58570 −0.103220
\(237\) 2.44072 0.158542
\(238\) −23.5609 −1.52723
\(239\) −22.7219 −1.46976 −0.734878 0.678199i \(-0.762761\pi\)
−0.734878 + 0.678199i \(0.762761\pi\)
\(240\) 1.81494 0.117154
\(241\) 4.27597 0.275440 0.137720 0.990471i \(-0.456023\pi\)
0.137720 + 0.990471i \(0.456023\pi\)
\(242\) 7.12765 0.458183
\(243\) −1.00000 −0.0641500
\(244\) 9.90135 0.633869
\(245\) −18.6249 −1.18990
\(246\) 4.25142 0.271060
\(247\) −16.5849 −1.05527
\(248\) −1.63307 −0.103700
\(249\) −11.5245 −0.730334
\(250\) −6.64978 −0.420569
\(251\) 18.8353 1.18887 0.594437 0.804142i \(-0.297375\pi\)
0.594437 + 0.804142i \(0.297375\pi\)
\(252\) −7.49685 −0.472257
\(253\) −0.481747 −0.0302872
\(254\) −6.21768 −0.390132
\(255\) 8.61047 0.539209
\(256\) −8.67443 −0.542152
\(257\) −9.25845 −0.577526 −0.288763 0.957401i \(-0.593244\pi\)
−0.288763 + 0.957401i \(0.593244\pi\)
\(258\) −5.79874 −0.361014
\(259\) −27.4255 −1.70414
\(260\) −7.04227 −0.436743
\(261\) −1.00000 −0.0618984
\(262\) 11.8098 0.729611
\(263\) 19.7994 1.22089 0.610443 0.792060i \(-0.290992\pi\)
0.610443 + 0.792060i \(0.290992\pi\)
\(264\) 1.13582 0.0699046
\(265\) −7.32847 −0.450184
\(266\) −13.5701 −0.832035
\(267\) −1.71946 −0.105229
\(268\) 18.2140 1.11259
\(269\) −6.41447 −0.391097 −0.195548 0.980694i \(-0.562649\pi\)
−0.195548 + 0.980694i \(0.562649\pi\)
\(270\) −0.768607 −0.0467760
\(271\) 0.0813137 0.00493946 0.00246973 0.999997i \(-0.499214\pi\)
0.00246973 + 0.999997i \(0.499214\pi\)
\(272\) 11.5907 0.702787
\(273\) 18.6391 1.12809
\(274\) −4.30375 −0.259999
\(275\) 1.75920 0.106084
\(276\) 1.56184 0.0940120
\(277\) −32.2170 −1.93573 −0.967866 0.251465i \(-0.919088\pi\)
−0.967866 + 0.251465i \(0.919088\pi\)
\(278\) −5.90630 −0.354236
\(279\) −0.692651 −0.0414679
\(280\) −13.1408 −0.785311
\(281\) −20.6489 −1.23181 −0.615906 0.787820i \(-0.711210\pi\)
−0.615906 + 0.787820i \(0.711210\pi\)
\(282\) 0.407926 0.0242917
\(283\) −21.0893 −1.25363 −0.626813 0.779170i \(-0.715641\pi\)
−0.626813 + 0.779170i \(0.715641\pi\)
\(284\) −10.0745 −0.597813
\(285\) 4.95926 0.293761
\(286\) −1.23828 −0.0732208
\(287\) 30.8291 1.81978
\(288\) −5.75004 −0.338824
\(289\) 37.9887 2.23463
\(290\) −0.768607 −0.0451342
\(291\) −3.96175 −0.232242
\(292\) −23.0200 −1.34714
\(293\) 19.7744 1.15523 0.577615 0.816309i \(-0.303983\pi\)
0.577615 + 0.816309i \(0.303983\pi\)
\(294\) 10.6174 0.619220
\(295\) −1.17889 −0.0686378
\(296\) −13.4711 −0.782990
\(297\) 0.481747 0.0279538
\(298\) −8.18977 −0.474420
\(299\) −3.88315 −0.224569
\(300\) −5.70342 −0.329287
\(301\) −42.0495 −2.42369
\(302\) 1.44651 0.0832375
\(303\) 18.2587 1.04894
\(304\) 6.67572 0.382879
\(305\) 7.36117 0.421499
\(306\) −4.90853 −0.280602
\(307\) 15.8499 0.904601 0.452300 0.891866i \(-0.350603\pi\)
0.452300 + 0.891866i \(0.350603\pi\)
\(308\) 3.61158 0.205789
\(309\) −9.17157 −0.521752
\(310\) −0.532377 −0.0302370
\(311\) 6.50938 0.369113 0.184557 0.982822i \(-0.440915\pi\)
0.184557 + 0.982822i \(0.440915\pi\)
\(312\) 9.15533 0.518318
\(313\) −29.9378 −1.69218 −0.846092 0.533038i \(-0.821050\pi\)
−0.846092 + 0.533038i \(0.821050\pi\)
\(314\) −9.92334 −0.560007
\(315\) −5.57354 −0.314034
\(316\) 3.81202 0.214443
\(317\) 17.5373 0.984993 0.492497 0.870314i \(-0.336084\pi\)
0.492497 + 0.870314i \(0.336084\pi\)
\(318\) 4.17770 0.234274
\(319\) 0.481747 0.0269726
\(320\) −0.789649 −0.0441427
\(321\) −9.32854 −0.520668
\(322\) −3.17728 −0.177063
\(323\) 31.6711 1.76223
\(324\) −1.56184 −0.0867691
\(325\) 14.1802 0.786575
\(326\) 5.88116 0.325727
\(327\) −17.1548 −0.948662
\(328\) 15.1429 0.836126
\(329\) 2.95807 0.163084
\(330\) 0.370274 0.0203829
\(331\) 4.82327 0.265111 0.132556 0.991176i \(-0.457682\pi\)
0.132556 + 0.991176i \(0.457682\pi\)
\(332\) −17.9994 −0.987847
\(333\) −5.71364 −0.313106
\(334\) −1.59395 −0.0872171
\(335\) 13.5412 0.739835
\(336\) −7.50261 −0.409301
\(337\) 5.34820 0.291335 0.145667 0.989334i \(-0.453467\pi\)
0.145667 + 0.989334i \(0.453467\pi\)
\(338\) −1.37609 −0.0748492
\(339\) −8.38650 −0.455492
\(340\) 13.4482 0.729332
\(341\) 0.333682 0.0180699
\(342\) −2.82710 −0.152872
\(343\) 43.3920 2.34295
\(344\) −20.6542 −1.11360
\(345\) 1.16115 0.0625145
\(346\) −12.5330 −0.673780
\(347\) 12.8945 0.692211 0.346106 0.938196i \(-0.387504\pi\)
0.346106 + 0.938196i \(0.387504\pi\)
\(348\) −1.56184 −0.0837236
\(349\) 14.2259 0.761496 0.380748 0.924679i \(-0.375667\pi\)
0.380748 + 0.924679i \(0.375667\pi\)
\(350\) 11.6025 0.620182
\(351\) 3.88315 0.207267
\(352\) 2.77006 0.147645
\(353\) −27.1279 −1.44387 −0.721936 0.691960i \(-0.756748\pi\)
−0.721936 + 0.691960i \(0.756748\pi\)
\(354\) 0.672045 0.0357188
\(355\) −7.48991 −0.397523
\(356\) −2.68552 −0.142332
\(357\) −35.5941 −1.88384
\(358\) 2.10982 0.111508
\(359\) 33.1581 1.75002 0.875010 0.484105i \(-0.160855\pi\)
0.875010 + 0.484105i \(0.160855\pi\)
\(360\) −2.73766 −0.144287
\(361\) −0.758770 −0.0399352
\(362\) −8.79951 −0.462492
\(363\) 10.7679 0.565169
\(364\) 29.1114 1.52585
\(365\) −17.1142 −0.895800
\(366\) −4.19634 −0.219346
\(367\) −27.4982 −1.43539 −0.717697 0.696355i \(-0.754804\pi\)
−0.717697 + 0.696355i \(0.754804\pi\)
\(368\) 1.56304 0.0814793
\(369\) 6.42272 0.334354
\(370\) −4.39155 −0.228306
\(371\) 30.2945 1.57281
\(372\) −1.08181 −0.0560894
\(373\) 16.8037 0.870062 0.435031 0.900416i \(-0.356737\pi\)
0.435031 + 0.900416i \(0.356737\pi\)
\(374\) 2.36467 0.122274
\(375\) −10.0460 −0.518773
\(376\) 1.45297 0.0749312
\(377\) 3.88315 0.199993
\(378\) 3.17728 0.163422
\(379\) 27.0834 1.39118 0.695591 0.718438i \(-0.255143\pi\)
0.695591 + 0.718438i \(0.255143\pi\)
\(380\) 7.74560 0.397341
\(381\) −9.39321 −0.481229
\(382\) −14.2377 −0.728463
\(383\) −17.5873 −0.898667 −0.449334 0.893364i \(-0.648339\pi\)
−0.449334 + 0.893364i \(0.648339\pi\)
\(384\) −11.0499 −0.563889
\(385\) 2.68504 0.136842
\(386\) 1.55781 0.0792906
\(387\) −8.76031 −0.445311
\(388\) −6.18763 −0.314129
\(389\) 6.36584 0.322761 0.161380 0.986892i \(-0.448405\pi\)
0.161380 + 0.986892i \(0.448405\pi\)
\(390\) 2.98462 0.151132
\(391\) 7.41544 0.375015
\(392\) 37.8176 1.91008
\(393\) 17.8413 0.899977
\(394\) −0.507060 −0.0255453
\(395\) 2.83405 0.142597
\(396\) 0.752413 0.0378102
\(397\) −14.1969 −0.712520 −0.356260 0.934387i \(-0.615948\pi\)
−0.356260 + 0.934387i \(0.615948\pi\)
\(398\) −6.46901 −0.324262
\(399\) −20.5007 −1.02632
\(400\) −5.70780 −0.285390
\(401\) 4.07996 0.203743 0.101872 0.994798i \(-0.467517\pi\)
0.101872 + 0.994798i \(0.467517\pi\)
\(402\) −7.71936 −0.385007
\(403\) 2.68967 0.133982
\(404\) 28.5173 1.41879
\(405\) −1.16115 −0.0576983
\(406\) 3.17728 0.157686
\(407\) 2.75253 0.136438
\(408\) −17.4834 −0.865557
\(409\) −1.77817 −0.0879247 −0.0439624 0.999033i \(-0.513998\pi\)
−0.0439624 + 0.999033i \(0.513998\pi\)
\(410\) 4.93655 0.243799
\(411\) −6.50179 −0.320710
\(412\) −14.3246 −0.705720
\(413\) 4.87333 0.239801
\(414\) −0.661934 −0.0325323
\(415\) −13.3817 −0.656882
\(416\) 22.3283 1.09473
\(417\) −8.92280 −0.436951
\(418\) 1.36195 0.0666150
\(419\) −12.4164 −0.606578 −0.303289 0.952899i \(-0.598085\pi\)
−0.303289 + 0.952899i \(0.598085\pi\)
\(420\) −8.70500 −0.424761
\(421\) 39.1062 1.90592 0.952960 0.303096i \(-0.0980202\pi\)
0.952960 + 0.303096i \(0.0980202\pi\)
\(422\) 14.2765 0.694967
\(423\) 0.616265 0.0299638
\(424\) 14.8803 0.722653
\(425\) −27.0791 −1.31353
\(426\) 4.26974 0.206869
\(427\) −30.4297 −1.47260
\(428\) −14.5697 −0.704254
\(429\) −1.87070 −0.0903181
\(430\) −6.73324 −0.324706
\(431\) −25.8815 −1.24667 −0.623333 0.781957i \(-0.714222\pi\)
−0.623333 + 0.781957i \(0.714222\pi\)
\(432\) −1.56304 −0.0752020
\(433\) −25.2711 −1.21445 −0.607226 0.794529i \(-0.707718\pi\)
−0.607226 + 0.794529i \(0.707718\pi\)
\(434\) 2.20075 0.105639
\(435\) −1.16115 −0.0556731
\(436\) −26.7931 −1.28316
\(437\) 4.27098 0.204308
\(438\) 9.75622 0.466170
\(439\) −40.3513 −1.92586 −0.962931 0.269749i \(-0.913059\pi\)
−0.962931 + 0.269749i \(0.913059\pi\)
\(440\) 1.31886 0.0628741
\(441\) 16.0400 0.763809
\(442\) 19.0606 0.906619
\(443\) 12.7973 0.608018 0.304009 0.952669i \(-0.401675\pi\)
0.304009 + 0.952669i \(0.401675\pi\)
\(444\) −8.92382 −0.423506
\(445\) −1.99656 −0.0946458
\(446\) 0.625112 0.0295999
\(447\) −12.3725 −0.585199
\(448\) 3.26426 0.154222
\(449\) 6.34149 0.299274 0.149637 0.988741i \(-0.452190\pi\)
0.149637 + 0.988741i \(0.452190\pi\)
\(450\) 2.41720 0.113948
\(451\) −3.09413 −0.145697
\(452\) −13.0984 −0.616097
\(453\) 2.18528 0.102674
\(454\) −13.4078 −0.629261
\(455\) 21.6429 1.01464
\(456\) −10.0697 −0.471557
\(457\) −33.4505 −1.56475 −0.782375 0.622808i \(-0.785992\pi\)
−0.782375 + 0.622808i \(0.785992\pi\)
\(458\) −2.75099 −0.128545
\(459\) −7.41544 −0.346123
\(460\) 1.81354 0.0845569
\(461\) 5.42683 0.252753 0.126376 0.991982i \(-0.459665\pi\)
0.126376 + 0.991982i \(0.459665\pi\)
\(462\) −1.53064 −0.0712120
\(463\) 10.6646 0.495624 0.247812 0.968808i \(-0.420289\pi\)
0.247812 + 0.968808i \(0.420289\pi\)
\(464\) −1.56304 −0.0725625
\(465\) −0.804275 −0.0372974
\(466\) 8.85984 0.410424
\(467\) 10.6209 0.491479 0.245739 0.969336i \(-0.420969\pi\)
0.245739 + 0.969336i \(0.420969\pi\)
\(468\) 6.06488 0.280349
\(469\) −55.9768 −2.58477
\(470\) 0.473666 0.0218486
\(471\) −14.9914 −0.690770
\(472\) 2.39372 0.110180
\(473\) 4.22025 0.194047
\(474\) −1.61559 −0.0742066
\(475\) −15.5964 −0.715612
\(476\) −55.5924 −2.54807
\(477\) 6.31136 0.288977
\(478\) 15.0404 0.687931
\(479\) 17.4622 0.797867 0.398934 0.916980i \(-0.369380\pi\)
0.398934 + 0.916980i \(0.369380\pi\)
\(480\) −6.67669 −0.304748
\(481\) 22.1870 1.01164
\(482\) −2.83041 −0.128922
\(483\) −4.80000 −0.218408
\(484\) 16.8178 0.764446
\(485\) −4.60020 −0.208884
\(486\) 0.661934 0.0300259
\(487\) 3.98493 0.180575 0.0902873 0.995916i \(-0.471221\pi\)
0.0902873 + 0.995916i \(0.471221\pi\)
\(488\) −14.9467 −0.676606
\(489\) 8.88481 0.401785
\(490\) 12.3285 0.556943
\(491\) 14.1616 0.639103 0.319552 0.947569i \(-0.396468\pi\)
0.319552 + 0.947569i \(0.396468\pi\)
\(492\) 10.0313 0.452246
\(493\) −7.41544 −0.333974
\(494\) 10.9781 0.493927
\(495\) 0.559383 0.0251424
\(496\) −1.08264 −0.0486122
\(497\) 30.9619 1.38883
\(498\) 7.62844 0.341838
\(499\) −3.75546 −0.168117 −0.0840587 0.996461i \(-0.526788\pi\)
−0.0840587 + 0.996461i \(0.526788\pi\)
\(500\) −15.6903 −0.701690
\(501\) −2.40802 −0.107583
\(502\) −12.4677 −0.556462
\(503\) −21.1293 −0.942110 −0.471055 0.882104i \(-0.656127\pi\)
−0.471055 + 0.882104i \(0.656127\pi\)
\(504\) 11.3170 0.504098
\(505\) 21.2012 0.943442
\(506\) 0.318884 0.0141761
\(507\) −2.07889 −0.0923267
\(508\) −14.6707 −0.650909
\(509\) −3.59910 −0.159527 −0.0797637 0.996814i \(-0.525417\pi\)
−0.0797637 + 0.996814i \(0.525417\pi\)
\(510\) −5.69956 −0.252381
\(511\) 70.7471 3.12967
\(512\) −16.3580 −0.722927
\(513\) −4.27098 −0.188568
\(514\) 6.12848 0.270316
\(515\) −10.6496 −0.469278
\(516\) −13.6822 −0.602327
\(517\) −0.296884 −0.0130569
\(518\) 18.1538 0.797634
\(519\) −18.9340 −0.831110
\(520\) 10.6308 0.466189
\(521\) −3.83170 −0.167870 −0.0839349 0.996471i \(-0.526749\pi\)
−0.0839349 + 0.996471i \(0.526749\pi\)
\(522\) 0.661934 0.0289720
\(523\) 42.0646 1.83936 0.919678 0.392674i \(-0.128450\pi\)
0.919678 + 0.392674i \(0.128450\pi\)
\(524\) 27.8654 1.21731
\(525\) 17.5283 0.764996
\(526\) −13.1059 −0.571445
\(527\) −5.13631 −0.223741
\(528\) 0.752991 0.0327697
\(529\) 1.00000 0.0434783
\(530\) 4.85096 0.210712
\(531\) 1.01528 0.0440592
\(532\) −32.0189 −1.38819
\(533\) −24.9404 −1.08029
\(534\) 1.13817 0.0492533
\(535\) −10.8319 −0.468303
\(536\) −27.4952 −1.18761
\(537\) 3.18736 0.137545
\(538\) 4.24595 0.183056
\(539\) −7.72721 −0.332835
\(540\) −1.81354 −0.0780425
\(541\) 32.9360 1.41603 0.708015 0.706197i \(-0.249591\pi\)
0.708015 + 0.706197i \(0.249591\pi\)
\(542\) −0.0538243 −0.00231195
\(543\) −13.2936 −0.570485
\(544\) −42.6391 −1.82813
\(545\) −19.9194 −0.853252
\(546\) −12.3379 −0.528012
\(547\) −1.89683 −0.0811024 −0.0405512 0.999177i \(-0.512911\pi\)
−0.0405512 + 0.999177i \(0.512911\pi\)
\(548\) −10.1548 −0.433791
\(549\) −6.33953 −0.270564
\(550\) −1.16448 −0.0496534
\(551\) −4.27098 −0.181950
\(552\) −2.35770 −0.100351
\(553\) −11.7154 −0.498191
\(554\) 21.3255 0.906035
\(555\) −6.63442 −0.281616
\(556\) −13.9360 −0.591019
\(557\) 6.32207 0.267875 0.133937 0.990990i \(-0.457238\pi\)
0.133937 + 0.990990i \(0.457238\pi\)
\(558\) 0.458489 0.0194094
\(559\) 34.0176 1.43879
\(560\) −8.71170 −0.368136
\(561\) 3.57236 0.150825
\(562\) 13.6682 0.576559
\(563\) 35.8000 1.50879 0.754395 0.656420i \(-0.227930\pi\)
0.754395 + 0.656420i \(0.227930\pi\)
\(564\) 0.962510 0.0405290
\(565\) −9.73803 −0.409682
\(566\) 13.9597 0.586769
\(567\) 4.80000 0.201581
\(568\) 15.2081 0.638119
\(569\) 6.27427 0.263031 0.131515 0.991314i \(-0.458016\pi\)
0.131515 + 0.991314i \(0.458016\pi\)
\(570\) −3.28270 −0.137497
\(571\) 17.0402 0.713109 0.356555 0.934274i \(-0.383951\pi\)
0.356555 + 0.934274i \(0.383951\pi\)
\(572\) −2.92174 −0.122164
\(573\) −21.5092 −0.898561
\(574\) −20.4068 −0.851763
\(575\) −3.65172 −0.152287
\(576\) 0.680055 0.0283356
\(577\) −37.1392 −1.54613 −0.773063 0.634329i \(-0.781277\pi\)
−0.773063 + 0.634329i \(0.781277\pi\)
\(578\) −25.1460 −1.04594
\(579\) 2.35343 0.0978051
\(580\) −1.81354 −0.0753033
\(581\) 55.3175 2.29496
\(582\) 2.62241 0.108703
\(583\) −3.04048 −0.125924
\(584\) 34.7501 1.43797
\(585\) 4.50894 0.186422
\(586\) −13.0893 −0.540714
\(587\) 5.01609 0.207036 0.103518 0.994628i \(-0.466990\pi\)
0.103518 + 0.994628i \(0.466990\pi\)
\(588\) 25.0520 1.03313
\(589\) −2.95830 −0.121894
\(590\) 0.780349 0.0321265
\(591\) −0.766029 −0.0315102
\(592\) −8.93068 −0.367049
\(593\) 0.761753 0.0312815 0.0156407 0.999878i \(-0.495021\pi\)
0.0156407 + 0.999878i \(0.495021\pi\)
\(594\) −0.318884 −0.0130840
\(595\) −41.3303 −1.69438
\(596\) −19.3239 −0.791538
\(597\) −9.77290 −0.399978
\(598\) 2.57039 0.105111
\(599\) 14.8728 0.607688 0.303844 0.952722i \(-0.401730\pi\)
0.303844 + 0.952722i \(0.401730\pi\)
\(600\) 8.60967 0.351488
\(601\) 0.810605 0.0330653 0.0165326 0.999863i \(-0.494737\pi\)
0.0165326 + 0.999863i \(0.494737\pi\)
\(602\) 27.8340 1.13443
\(603\) −11.6618 −0.474907
\(604\) 3.41307 0.138876
\(605\) 12.5032 0.508328
\(606\) −12.0861 −0.490963
\(607\) 13.0304 0.528888 0.264444 0.964401i \(-0.414812\pi\)
0.264444 + 0.964401i \(0.414812\pi\)
\(608\) −24.5583 −0.995970
\(609\) 4.80000 0.194506
\(610\) −4.87261 −0.197286
\(611\) −2.39305 −0.0968125
\(612\) −11.5818 −0.468165
\(613\) −45.4250 −1.83470 −0.917350 0.398082i \(-0.869676\pi\)
−0.917350 + 0.398082i \(0.869676\pi\)
\(614\) −10.4916 −0.423405
\(615\) 7.45778 0.300727
\(616\) −5.45192 −0.219664
\(617\) −18.6626 −0.751326 −0.375663 0.926756i \(-0.622585\pi\)
−0.375663 + 0.926756i \(0.622585\pi\)
\(618\) 6.07097 0.244210
\(619\) 25.2424 1.01458 0.507289 0.861776i \(-0.330648\pi\)
0.507289 + 0.861776i \(0.330648\pi\)
\(620\) −1.25615 −0.0504483
\(621\) −1.00000 −0.0401286
\(622\) −4.30878 −0.172766
\(623\) 8.25339 0.330665
\(624\) 6.06954 0.242976
\(625\) 6.59365 0.263746
\(626\) 19.8168 0.792039
\(627\) 2.05753 0.0821698
\(628\) −23.4143 −0.934332
\(629\) −42.3691 −1.68937
\(630\) 3.68932 0.146986
\(631\) 7.64426 0.304313 0.152157 0.988356i \(-0.451378\pi\)
0.152157 + 0.988356i \(0.451378\pi\)
\(632\) −5.75449 −0.228901
\(633\) 21.5678 0.857243
\(634\) −11.6085 −0.461034
\(635\) −10.9070 −0.432830
\(636\) 9.85736 0.390870
\(637\) −62.2858 −2.46785
\(638\) −0.318884 −0.0126247
\(639\) 6.45040 0.255174
\(640\) −12.8307 −0.507177
\(641\) 27.0958 1.07022 0.535110 0.844783i \(-0.320270\pi\)
0.535110 + 0.844783i \(0.320270\pi\)
\(642\) 6.17487 0.243703
\(643\) 15.6696 0.617949 0.308974 0.951070i \(-0.400014\pi\)
0.308974 + 0.951070i \(0.400014\pi\)
\(644\) −7.49685 −0.295417
\(645\) −10.1721 −0.400525
\(646\) −20.9642 −0.824825
\(647\) −28.0698 −1.10354 −0.551769 0.833997i \(-0.686047\pi\)
−0.551769 + 0.833997i \(0.686047\pi\)
\(648\) 2.35770 0.0926194
\(649\) −0.489106 −0.0191991
\(650\) −9.38634 −0.368163
\(651\) 3.32472 0.130306
\(652\) 13.8767 0.543453
\(653\) −4.85411 −0.189956 −0.0949780 0.995479i \(-0.530278\pi\)
−0.0949780 + 0.995479i \(0.530278\pi\)
\(654\) 11.3553 0.444029
\(655\) 20.7166 0.809463
\(656\) 10.0390 0.391957
\(657\) 14.7390 0.575022
\(658\) −1.95805 −0.0763326
\(659\) −2.91789 −0.113665 −0.0568324 0.998384i \(-0.518100\pi\)
−0.0568324 + 0.998384i \(0.518100\pi\)
\(660\) 0.873668 0.0340075
\(661\) 5.93405 0.230808 0.115404 0.993319i \(-0.463184\pi\)
0.115404 + 0.993319i \(0.463184\pi\)
\(662\) −3.19269 −0.124087
\(663\) 28.7953 1.11832
\(664\) 27.1713 1.05445
\(665\) −23.8045 −0.923098
\(666\) 3.78205 0.146551
\(667\) −1.00000 −0.0387202
\(668\) −3.76096 −0.145516
\(669\) 0.944373 0.0365116
\(670\) −8.96337 −0.346285
\(671\) 3.05405 0.117900
\(672\) 27.6002 1.06470
\(673\) 26.3141 1.01434 0.507168 0.861847i \(-0.330693\pi\)
0.507168 + 0.861847i \(0.330693\pi\)
\(674\) −3.54015 −0.136362
\(675\) 3.65172 0.140555
\(676\) −3.24690 −0.124881
\(677\) 5.30262 0.203796 0.101898 0.994795i \(-0.467508\pi\)
0.101898 + 0.994795i \(0.467508\pi\)
\(678\) 5.55131 0.213197
\(679\) 19.0164 0.729782
\(680\) −20.3009 −0.778506
\(681\) −20.2556 −0.776195
\(682\) −0.220875 −0.00845776
\(683\) −45.1373 −1.72713 −0.863566 0.504236i \(-0.831774\pi\)
−0.863566 + 0.504236i \(0.831774\pi\)
\(684\) −6.67060 −0.255057
\(685\) −7.54958 −0.288455
\(686\) −28.7226 −1.09663
\(687\) −4.15599 −0.158561
\(688\) −13.6928 −0.522031
\(689\) −24.5080 −0.933680
\(690\) −0.768607 −0.0292604
\(691\) −4.14576 −0.157712 −0.0788561 0.996886i \(-0.525127\pi\)
−0.0788561 + 0.996886i \(0.525127\pi\)
\(692\) −29.5719 −1.12416
\(693\) −2.31238 −0.0878402
\(694\) −8.53528 −0.323995
\(695\) −10.3608 −0.393006
\(696\) 2.35770 0.0893685
\(697\) 47.6273 1.80401
\(698\) −9.41661 −0.356424
\(699\) 13.3848 0.506259
\(700\) 27.3764 1.03473
\(701\) 2.99761 0.113218 0.0566091 0.998396i \(-0.481971\pi\)
0.0566091 + 0.998396i \(0.481971\pi\)
\(702\) −2.57039 −0.0970131
\(703\) −24.4028 −0.920370
\(704\) −0.327614 −0.0123474
\(705\) 0.715579 0.0269503
\(706\) 17.9569 0.675816
\(707\) −87.6420 −3.29612
\(708\) 1.58570 0.0595944
\(709\) 50.3931 1.89255 0.946277 0.323357i \(-0.104811\pi\)
0.946277 + 0.323357i \(0.104811\pi\)
\(710\) 4.95783 0.186064
\(711\) −2.44072 −0.0915340
\(712\) 4.05397 0.151929
\(713\) −0.692651 −0.0259400
\(714\) 23.5609 0.881745
\(715\) −2.17217 −0.0812345
\(716\) 4.97816 0.186043
\(717\) 22.7219 0.848564
\(718\) −21.9485 −0.819110
\(719\) 1.37707 0.0513561 0.0256781 0.999670i \(-0.491826\pi\)
0.0256781 + 0.999670i \(0.491826\pi\)
\(720\) −1.81494 −0.0676387
\(721\) 44.0235 1.63952
\(722\) 0.502255 0.0186920
\(723\) −4.27597 −0.159025
\(724\) −20.7626 −0.771636
\(725\) 3.65172 0.135621
\(726\) −7.12765 −0.264532
\(727\) 2.89494 0.107367 0.0536836 0.998558i \(-0.482904\pi\)
0.0536836 + 0.998558i \(0.482904\pi\)
\(728\) −43.9456 −1.62873
\(729\) 1.00000 0.0370370
\(730\) 11.3285 0.419286
\(731\) −64.9615 −2.40269
\(732\) −9.90135 −0.365964
\(733\) 25.9159 0.957227 0.478613 0.878026i \(-0.341140\pi\)
0.478613 + 0.878026i \(0.341140\pi\)
\(734\) 18.2020 0.671848
\(735\) 18.6249 0.686991
\(736\) −5.75004 −0.211949
\(737\) 5.61805 0.206944
\(738\) −4.25142 −0.156497
\(739\) 2.34877 0.0864010 0.0432005 0.999066i \(-0.486245\pi\)
0.0432005 + 0.999066i \(0.486245\pi\)
\(740\) −10.3619 −0.380912
\(741\) 16.5849 0.609260
\(742\) −20.0530 −0.736168
\(743\) 19.1323 0.701895 0.350947 0.936395i \(-0.385860\pi\)
0.350947 + 0.936395i \(0.385860\pi\)
\(744\) 1.63307 0.0598711
\(745\) −14.3664 −0.526343
\(746\) −11.1229 −0.407239
\(747\) 11.5245 0.421658
\(748\) 5.57947 0.204006
\(749\) 44.7770 1.63611
\(750\) 6.64978 0.242815
\(751\) 51.4428 1.87717 0.938587 0.345043i \(-0.112136\pi\)
0.938587 + 0.345043i \(0.112136\pi\)
\(752\) 0.963250 0.0351261
\(753\) −18.8353 −0.686397
\(754\) −2.57039 −0.0936081
\(755\) 2.53745 0.0923474
\(756\) 7.49685 0.272658
\(757\) −42.1639 −1.53247 −0.766236 0.642560i \(-0.777872\pi\)
−0.766236 + 0.642560i \(0.777872\pi\)
\(758\) −17.9274 −0.651153
\(759\) 0.481747 0.0174863
\(760\) −11.6925 −0.424131
\(761\) −11.1416 −0.403884 −0.201942 0.979397i \(-0.564725\pi\)
−0.201942 + 0.979397i \(0.564725\pi\)
\(762\) 6.21768 0.225243
\(763\) 82.3430 2.98102
\(764\) −33.5941 −1.21539
\(765\) −8.61047 −0.311312
\(766\) 11.6416 0.420628
\(767\) −3.94247 −0.142355
\(768\) 8.67443 0.313011
\(769\) −26.0823 −0.940551 −0.470275 0.882520i \(-0.655845\pi\)
−0.470275 + 0.882520i \(0.655845\pi\)
\(770\) −1.77732 −0.0640500
\(771\) 9.25845 0.333435
\(772\) 3.67569 0.132291
\(773\) −29.4575 −1.05951 −0.529756 0.848150i \(-0.677716\pi\)
−0.529756 + 0.848150i \(0.677716\pi\)
\(774\) 5.79874 0.208431
\(775\) 2.52937 0.0908575
\(776\) 9.34063 0.335309
\(777\) 27.4255 0.983883
\(778\) −4.21376 −0.151071
\(779\) 27.4313 0.982828
\(780\) 7.04227 0.252154
\(781\) −3.10746 −0.111194
\(782\) −4.90853 −0.175529
\(783\) 1.00000 0.0357371
\(784\) 25.0712 0.895401
\(785\) −17.4074 −0.621297
\(786\) −11.8098 −0.421241
\(787\) 7.08437 0.252530 0.126265 0.991997i \(-0.459701\pi\)
0.126265 + 0.991997i \(0.459701\pi\)
\(788\) −1.19642 −0.0426206
\(789\) −19.7994 −0.704879
\(790\) −1.87595 −0.0667434
\(791\) 40.2552 1.43131
\(792\) −1.13582 −0.0403595
\(793\) 24.6174 0.874188
\(794\) 9.39738 0.333501
\(795\) 7.32847 0.259914
\(796\) −15.2638 −0.541009
\(797\) 37.8352 1.34019 0.670096 0.742275i \(-0.266253\pi\)
0.670096 + 0.742275i \(0.266253\pi\)
\(798\) 13.5701 0.480376
\(799\) 4.56987 0.161671
\(800\) 20.9975 0.742375
\(801\) 1.71946 0.0607540
\(802\) −2.70066 −0.0953637
\(803\) −7.10045 −0.250570
\(804\) −18.2140 −0.642357
\(805\) −5.57354 −0.196442
\(806\) −1.78038 −0.0627113
\(807\) 6.41447 0.225800
\(808\) −43.0487 −1.51445
\(809\) −45.3863 −1.59570 −0.797849 0.602858i \(-0.794029\pi\)
−0.797849 + 0.602858i \(0.794029\pi\)
\(810\) 0.768607 0.0270061
\(811\) −43.1196 −1.51413 −0.757067 0.653337i \(-0.773368\pi\)
−0.757067 + 0.653337i \(0.773368\pi\)
\(812\) 7.49685 0.263088
\(813\) −0.0813137 −0.00285180
\(814\) −1.82199 −0.0638607
\(815\) 10.3166 0.361376
\(816\) −11.5907 −0.405754
\(817\) −37.4151 −1.30899
\(818\) 1.17703 0.0411538
\(819\) −18.6391 −0.651304
\(820\) 11.6479 0.406762
\(821\) −41.4654 −1.44715 −0.723576 0.690245i \(-0.757503\pi\)
−0.723576 + 0.690245i \(0.757503\pi\)
\(822\) 4.30375 0.150111
\(823\) 30.5317 1.06427 0.532134 0.846660i \(-0.321390\pi\)
0.532134 + 0.846660i \(0.321390\pi\)
\(824\) 21.6238 0.753302
\(825\) −1.75920 −0.0612476
\(826\) −3.22582 −0.112241
\(827\) 53.7558 1.86927 0.934637 0.355604i \(-0.115725\pi\)
0.934637 + 0.355604i \(0.115725\pi\)
\(828\) −1.56184 −0.0542778
\(829\) −26.5801 −0.923164 −0.461582 0.887098i \(-0.652718\pi\)
−0.461582 + 0.887098i \(0.652718\pi\)
\(830\) 8.85780 0.307459
\(831\) 32.2170 1.11760
\(832\) −2.64076 −0.0915518
\(833\) 118.944 4.12115
\(834\) 5.90630 0.204518
\(835\) −2.79609 −0.0967626
\(836\) 3.21354 0.111143
\(837\) 0.692651 0.0239415
\(838\) 8.21880 0.283914
\(839\) −24.9153 −0.860172 −0.430086 0.902788i \(-0.641517\pi\)
−0.430086 + 0.902788i \(0.641517\pi\)
\(840\) 13.1408 0.453399
\(841\) 1.00000 0.0344828
\(842\) −25.8857 −0.892081
\(843\) 20.6489 0.711187
\(844\) 33.6856 1.15950
\(845\) −2.41391 −0.0830411
\(846\) −0.407926 −0.0140248
\(847\) −51.6860 −1.77595
\(848\) 9.86494 0.338763
\(849\) 21.0893 0.723782
\(850\) 17.9246 0.614807
\(851\) −5.71364 −0.195861
\(852\) 10.0745 0.345147
\(853\) 37.6402 1.28878 0.644388 0.764699i \(-0.277112\pi\)
0.644388 + 0.764699i \(0.277112\pi\)
\(854\) 20.1425 0.689260
\(855\) −4.95926 −0.169603
\(856\) 21.9939 0.751737
\(857\) −34.1351 −1.16603 −0.583017 0.812460i \(-0.698128\pi\)
−0.583017 + 0.812460i \(0.698128\pi\)
\(858\) 1.23828 0.0422741
\(859\) −7.59289 −0.259066 −0.129533 0.991575i \(-0.541348\pi\)
−0.129533 + 0.991575i \(0.541348\pi\)
\(860\) −15.8872 −0.541749
\(861\) −30.8291 −1.05065
\(862\) 17.1318 0.583512
\(863\) 12.6678 0.431218 0.215609 0.976480i \(-0.430826\pi\)
0.215609 + 0.976480i \(0.430826\pi\)
\(864\) 5.75004 0.195620
\(865\) −21.9853 −0.747522
\(866\) 16.7278 0.568434
\(867\) −37.9887 −1.29016
\(868\) 5.19270 0.176252
\(869\) 1.17581 0.0398865
\(870\) 0.768607 0.0260582
\(871\) 45.2847 1.53441
\(872\) 40.4459 1.36967
\(873\) 3.96175 0.134085
\(874\) −2.82710 −0.0956281
\(875\) 48.2207 1.63016
\(876\) 23.0200 0.777773
\(877\) 49.7555 1.68012 0.840061 0.542492i \(-0.182519\pi\)
0.840061 + 0.542492i \(0.182519\pi\)
\(878\) 26.7099 0.901414
\(879\) −19.7744 −0.666973
\(880\) 0.874340 0.0294740
\(881\) −18.2360 −0.614386 −0.307193 0.951647i \(-0.599390\pi\)
−0.307193 + 0.951647i \(0.599390\pi\)
\(882\) −10.6174 −0.357507
\(883\) 22.6184 0.761170 0.380585 0.924746i \(-0.375723\pi\)
0.380585 + 0.924746i \(0.375723\pi\)
\(884\) 44.9737 1.51263
\(885\) 1.17889 0.0396281
\(886\) −8.47096 −0.284587
\(887\) −18.8293 −0.632227 −0.316113 0.948721i \(-0.602378\pi\)
−0.316113 + 0.948721i \(0.602378\pi\)
\(888\) 13.4711 0.452060
\(889\) 45.0874 1.51218
\(890\) 1.32159 0.0442997
\(891\) −0.481747 −0.0161391
\(892\) 1.47496 0.0493854
\(893\) 2.63205 0.0880783
\(894\) 8.18977 0.273907
\(895\) 3.70102 0.123712
\(896\) 53.0396 1.77193
\(897\) 3.88315 0.129655
\(898\) −4.19765 −0.140077
\(899\) 0.692651 0.0231012
\(900\) 5.70342 0.190114
\(901\) 46.8015 1.55918
\(902\) 2.04811 0.0681944
\(903\) 42.0495 1.39932
\(904\) 19.7729 0.657637
\(905\) −15.4360 −0.513109
\(906\) −1.44651 −0.0480572
\(907\) −44.9004 −1.49089 −0.745446 0.666566i \(-0.767764\pi\)
−0.745446 + 0.666566i \(0.767764\pi\)
\(908\) −31.6360 −1.04988
\(909\) −18.2587 −0.605604
\(910\) −14.3262 −0.474908
\(911\) 16.6245 0.550795 0.275398 0.961330i \(-0.411191\pi\)
0.275398 + 0.961330i \(0.411191\pi\)
\(912\) −6.67572 −0.221055
\(913\) −5.55188 −0.183740
\(914\) 22.1420 0.732393
\(915\) −7.36117 −0.243353
\(916\) −6.49100 −0.214469
\(917\) −85.6385 −2.82803
\(918\) 4.90853 0.162005
\(919\) 54.1293 1.78556 0.892781 0.450492i \(-0.148751\pi\)
0.892781 + 0.450492i \(0.148751\pi\)
\(920\) −2.73766 −0.0902580
\(921\) −15.8499 −0.522272
\(922\) −3.59220 −0.118303
\(923\) −25.0479 −0.824462
\(924\) −3.61158 −0.118812
\(925\) 20.8646 0.686024
\(926\) −7.05923 −0.231981
\(927\) 9.17157 0.301234
\(928\) 5.75004 0.188754
\(929\) 56.9814 1.86950 0.934749 0.355309i \(-0.115624\pi\)
0.934749 + 0.355309i \(0.115624\pi\)
\(930\) 0.532377 0.0174573
\(931\) 68.5064 2.24521
\(932\) 20.9049 0.684764
\(933\) −6.50938 −0.213108
\(934\) −7.03036 −0.230040
\(935\) 4.14807 0.135656
\(936\) −9.15533 −0.299251
\(937\) 2.24635 0.0733850 0.0366925 0.999327i \(-0.488318\pi\)
0.0366925 + 0.999327i \(0.488318\pi\)
\(938\) 37.0529 1.20982
\(939\) 29.9378 0.976982
\(940\) 1.11762 0.0364528
\(941\) 3.37208 0.109927 0.0549634 0.998488i \(-0.482496\pi\)
0.0549634 + 0.998488i \(0.482496\pi\)
\(942\) 9.92334 0.323320
\(943\) 6.42272 0.209153
\(944\) 1.58692 0.0516499
\(945\) 5.57354 0.181307
\(946\) −2.79352 −0.0908253
\(947\) −54.2976 −1.76444 −0.882218 0.470842i \(-0.843950\pi\)
−0.882218 + 0.470842i \(0.843950\pi\)
\(948\) −3.81202 −0.123809
\(949\) −57.2337 −1.85789
\(950\) 10.3238 0.334948
\(951\) −17.5373 −0.568686
\(952\) 83.9203 2.71987
\(953\) −46.6397 −1.51081 −0.755405 0.655258i \(-0.772560\pi\)
−0.755405 + 0.655258i \(0.772560\pi\)
\(954\) −4.17770 −0.135258
\(955\) −24.9756 −0.808190
\(956\) 35.4880 1.14777
\(957\) −0.481747 −0.0155727
\(958\) −11.5588 −0.373448
\(959\) 31.2086 1.00778
\(960\) 0.789649 0.0254858
\(961\) −30.5202 −0.984524
\(962\) −14.6863 −0.473505
\(963\) 9.32854 0.300608
\(964\) −6.67840 −0.215097
\(965\) 2.73269 0.0879685
\(966\) 3.17728 0.102227
\(967\) −34.1471 −1.09810 −0.549048 0.835791i \(-0.685010\pi\)
−0.549048 + 0.835791i \(0.685010\pi\)
\(968\) −25.3876 −0.815987
\(969\) −31.6711 −1.01742
\(970\) 3.04503 0.0977700
\(971\) −24.8313 −0.796873 −0.398437 0.917196i \(-0.630447\pi\)
−0.398437 + 0.917196i \(0.630447\pi\)
\(972\) 1.56184 0.0500962
\(973\) 42.8294 1.37305
\(974\) −2.63776 −0.0845193
\(975\) −14.1802 −0.454130
\(976\) −9.90896 −0.317178
\(977\) −60.2384 −1.92720 −0.963598 0.267355i \(-0.913851\pi\)
−0.963598 + 0.267355i \(0.913851\pi\)
\(978\) −5.88116 −0.188059
\(979\) −0.828342 −0.0264739
\(980\) 29.0892 0.929221
\(981\) 17.1548 0.547710
\(982\) −9.37403 −0.299137
\(983\) −53.8499 −1.71754 −0.858772 0.512357i \(-0.828772\pi\)
−0.858772 + 0.512357i \(0.828772\pi\)
\(984\) −15.1429 −0.482737
\(985\) −0.889478 −0.0283411
\(986\) 4.90853 0.156319
\(987\) −2.95807 −0.0941565
\(988\) 25.9030 0.824083
\(989\) −8.76031 −0.278562
\(990\) −0.370274 −0.0117681
\(991\) 9.34232 0.296769 0.148384 0.988930i \(-0.452593\pi\)
0.148384 + 0.988930i \(0.452593\pi\)
\(992\) 3.98277 0.126453
\(993\) −4.82327 −0.153062
\(994\) −20.4947 −0.650053
\(995\) −11.3479 −0.359751
\(996\) 17.9994 0.570334
\(997\) −49.9157 −1.58085 −0.790423 0.612562i \(-0.790139\pi\)
−0.790423 + 0.612562i \(0.790139\pi\)
\(998\) 2.48586 0.0786886
\(999\) 5.71364 0.180772
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 2001.2.a.l.1.5 11
3.2 odd 2 6003.2.a.m.1.7 11
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
2001.2.a.l.1.5 11 1.1 even 1 trivial
6003.2.a.m.1.7 11 3.2 odd 2