Properties

Label 273.2.c.c.64.4
Level $273$
Weight $2$
Character 273.64
Analytic conductor $2.180$
Analytic rank $0$
Dimension $8$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [273,2,Mod(64,273)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(273, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 0, 1]))
 
N = Newforms(chi, 2, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("273.64");
 
S:= CuspForms(chi, 2);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 273 = 3 \cdot 7 \cdot 13 \)
Weight: \( k \) \(=\) \( 2 \)
Character orbit: \([\chi]\) \(=\) 273.c (of order \(2\), degree \(1\), minimal)

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: no
Analytic conductor: \(2.17991597518\)
Analytic rank: \(0\)
Dimension: \(8\)
Coefficient field: \(\mathbb{Q}[x]/(x^{8} + \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} + 15x^{6} + 67x^{4} + 77x^{2} + 4 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{7}]\)
Coefficient ring index: \( 2 \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 64.4
Root \(-0.233455i\) of defining polynomial
Character \(\chi\) \(=\) 273.64
Dual form 273.2.c.c.64.5

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-0.233455i q^{2} -1.00000 q^{3} +1.94550 q^{4} -2.94550i q^{5} +0.233455i q^{6} +1.00000i q^{7} -0.921097i q^{8} +1.00000 q^{9} +O(q^{10})\) \(q-0.233455i q^{2} -1.00000 q^{3} +1.94550 q^{4} -2.94550i q^{5} +0.233455i q^{6} +1.00000i q^{7} -0.921097i q^{8} +1.00000 q^{9} -0.687642 q^{10} -3.62146i q^{11} -1.94550 q^{12} +(-3.38801 + 1.23346i) q^{13} +0.233455 q^{14} +2.94550i q^{15} +3.67596 q^{16} +1.53309 q^{17} -0.233455i q^{18} -4.10005i q^{19} -5.73046i q^{20} -1.00000i q^{21} -0.845448 q^{22} +7.03387 q^{23} +0.921097i q^{24} -3.67596 q^{25} +(0.287956 + 0.790947i) q^{26} -1.00000 q^{27} +1.94550i q^{28} -3.79095 q^{29} +0.687642 q^{30} -1.79095i q^{31} -2.70037i q^{32} +3.62146i q^{33} -0.357908i q^{34} +2.94550 q^{35} +1.94550 q^{36} +7.24292i q^{37} -0.957177 q^{38} +(3.38801 - 1.23346i) q^{39} -2.71309 q^{40} +9.15455i q^{41} -0.233455 q^{42} +5.79095 q^{43} -7.04555i q^{44} -2.94550i q^{45} -1.64209i q^{46} +7.25460i q^{47} -3.67596 q^{48} -1.00000 q^{49} +0.858172i q^{50} -1.53309 q^{51} +(-6.59136 + 2.39969i) q^{52} -13.3430 q^{53} +0.233455i q^{54} -10.6670 q^{55} +0.921097 q^{56} +4.10005i q^{57} +0.885016i q^{58} -4.84545i q^{59} +5.73046i q^{60} +2.77601 q^{61} -0.418106 q^{62} +1.00000i q^{63} +6.72151 q^{64} +(3.63314 + 9.97937i) q^{65} +0.845448 q^{66} +14.8248i q^{67} +2.98262 q^{68} -7.03387 q^{69} -0.687642i q^{70} +3.62146i q^{71} -0.921097i q^{72} +14.5670i q^{73} +1.69090 q^{74} +3.67596 q^{75} -7.97664i q^{76} +3.62146 q^{77} +(-0.287956 - 0.790947i) q^{78} +6.56696 q^{79} -10.8275i q^{80} +1.00000 q^{81} +2.13718 q^{82} -7.25460i q^{83} -1.94550i q^{84} -4.51571i q^{85} -1.35193i q^{86} +3.79095 q^{87} -3.33572 q^{88} -0.636396i q^{89} -0.687642 q^{90} +(-1.23346 - 3.38801i) q^{91} +13.6844 q^{92} +1.79095i q^{93} +1.69362 q^{94} -12.0767 q^{95} +2.70037i q^{96} -11.3240i q^{97} +0.233455i q^{98} -3.62146i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q - 8 q^{3} - 14 q^{4} + 8 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q - 8 q^{3} - 14 q^{4} + 8 q^{9} + 4 q^{10} + 14 q^{12} - 6 q^{13} - 2 q^{14} + 34 q^{16} + 20 q^{17} - 24 q^{22} - 6 q^{23} - 34 q^{25} + 28 q^{26} - 8 q^{27} - 18 q^{29} - 4 q^{30} - 6 q^{35} - 14 q^{36} + 36 q^{38} + 6 q^{39} - 8 q^{40} + 2 q^{42} + 34 q^{43} - 34 q^{48} - 8 q^{49} - 20 q^{51} + 18 q^{52} - 10 q^{53} + 16 q^{55} - 6 q^{56} - 20 q^{61} - 28 q^{62} - 18 q^{64} - 10 q^{65} + 24 q^{66} - 24 q^{68} + 6 q^{69} + 48 q^{74} + 34 q^{75} + 4 q^{77} - 28 q^{78} - 2 q^{79} + 8 q^{81} - 48 q^{82} + 18 q^{87} - 8 q^{88} + 4 q^{90} - 6 q^{91} + 56 q^{92} - 72 q^{94} - 78 q^{95}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/273\mathbb{Z}\right)^\times\).

\(n\) \(92\) \(106\) \(157\)
\(\chi(n)\) \(1\) \(-1\) \(1\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 0.233455i 0.165078i −0.996588 0.0825388i \(-0.973697\pi\)
0.996588 0.0825388i \(-0.0263028\pi\)
\(3\) −1.00000 −0.577350
\(4\) 1.94550 0.972749
\(5\) 2.94550i 1.31727i −0.752464 0.658634i \(-0.771135\pi\)
0.752464 0.658634i \(-0.228865\pi\)
\(6\) 0.233455i 0.0953076i
\(7\) 1.00000i 0.377964i
\(8\) 0.921097i 0.325657i
\(9\) 1.00000 0.333333
\(10\) −0.687642 −0.217451
\(11\) 3.62146i 1.09191i −0.837814 0.545956i \(-0.816167\pi\)
0.837814 0.545956i \(-0.183833\pi\)
\(12\) −1.94550 −0.561617
\(13\) −3.38801 + 1.23346i −0.939664 + 0.342099i
\(14\) 0.233455 0.0623935
\(15\) 2.94550i 0.760525i
\(16\) 3.67596 0.918991
\(17\) 1.53309 0.371829 0.185914 0.982566i \(-0.440475\pi\)
0.185914 + 0.982566i \(0.440475\pi\)
\(18\) 0.233455i 0.0550259i
\(19\) 4.10005i 0.940616i −0.882502 0.470308i \(-0.844143\pi\)
0.882502 0.470308i \(-0.155857\pi\)
\(20\) 5.73046i 1.28137i
\(21\) 1.00000i 0.218218i
\(22\) −0.845448 −0.180250
\(23\) 7.03387 1.46666 0.733332 0.679871i \(-0.237964\pi\)
0.733332 + 0.679871i \(0.237964\pi\)
\(24\) 0.921097i 0.188018i
\(25\) −3.67596 −0.735193
\(26\) 0.287956 + 0.790947i 0.0564729 + 0.155118i
\(27\) −1.00000 −0.192450
\(28\) 1.94550i 0.367665i
\(29\) −3.79095 −0.703961 −0.351981 0.936007i \(-0.614492\pi\)
−0.351981 + 0.936007i \(0.614492\pi\)
\(30\) 0.687642 0.125546
\(31\) 1.79095i 0.321664i −0.986982 0.160832i \(-0.948582\pi\)
0.986982 0.160832i \(-0.0514177\pi\)
\(32\) 2.70037i 0.477362i
\(33\) 3.62146i 0.630416i
\(34\) 0.357908i 0.0613806i
\(35\) 2.94550 0.497880
\(36\) 1.94550 0.324250
\(37\) 7.24292i 1.19073i 0.803456 + 0.595365i \(0.202992\pi\)
−0.803456 + 0.595365i \(0.797008\pi\)
\(38\) −0.957177 −0.155275
\(39\) 3.38801 1.23346i 0.542515 0.197511i
\(40\) −2.71309 −0.428977
\(41\) 9.15455i 1.42970i 0.699277 + 0.714850i \(0.253505\pi\)
−0.699277 + 0.714850i \(0.746495\pi\)
\(42\) −0.233455 −0.0360229
\(43\) 5.79095 0.883111 0.441556 0.897234i \(-0.354427\pi\)
0.441556 + 0.897234i \(0.354427\pi\)
\(44\) 7.04555i 1.06216i
\(45\) 2.94550i 0.439089i
\(46\) 1.64209i 0.242113i
\(47\) 7.25460i 1.05819i 0.848562 + 0.529096i \(0.177469\pi\)
−0.848562 + 0.529096i \(0.822531\pi\)
\(48\) −3.67596 −0.530580
\(49\) −1.00000 −0.142857
\(50\) 0.858172i 0.121364i
\(51\) −1.53309 −0.214676
\(52\) −6.59136 + 2.39969i −0.914058 + 0.332776i
\(53\) −13.3430 −1.83280 −0.916399 0.400266i \(-0.868918\pi\)
−0.916399 + 0.400266i \(0.868918\pi\)
\(54\) 0.233455i 0.0317692i
\(55\) −10.6670 −1.43834
\(56\) 0.921097 0.123087
\(57\) 4.10005i 0.543065i
\(58\) 0.885016i 0.116208i
\(59\) 4.84545i 0.630824i −0.948955 0.315412i \(-0.897857\pi\)
0.948955 0.315412i \(-0.102143\pi\)
\(60\) 5.73046i 0.739800i
\(61\) 2.77601 0.355432 0.177716 0.984082i \(-0.443129\pi\)
0.177716 + 0.984082i \(0.443129\pi\)
\(62\) −0.418106 −0.0530995
\(63\) 1.00000i 0.125988i
\(64\) 6.72151 0.840189
\(65\) 3.63314 + 9.97937i 0.450636 + 1.23779i
\(66\) 0.845448 0.104068
\(67\) 14.8248i 1.81114i 0.424197 + 0.905570i \(0.360556\pi\)
−0.424197 + 0.905570i \(0.639444\pi\)
\(68\) 2.98262 0.361696
\(69\) −7.03387 −0.846778
\(70\) 0.687642i 0.0821889i
\(71\) 3.62146i 0.429788i 0.976637 + 0.214894i \(0.0689407\pi\)
−0.976637 + 0.214894i \(0.931059\pi\)
\(72\) 0.921097i 0.108552i
\(73\) 14.5670i 1.70493i 0.522781 + 0.852467i \(0.324894\pi\)
−0.522781 + 0.852467i \(0.675106\pi\)
\(74\) 1.69090 0.196563
\(75\) 3.67596 0.424464
\(76\) 7.97664i 0.914984i
\(77\) 3.62146 0.412704
\(78\) −0.287956 0.790947i −0.0326046 0.0895571i
\(79\) 6.56696 0.738841 0.369420 0.929262i \(-0.379556\pi\)
0.369420 + 0.929262i \(0.379556\pi\)
\(80\) 10.8275i 1.21056i
\(81\) 1.00000 0.111111
\(82\) 2.13718 0.236012
\(83\) 7.25460i 0.796296i −0.917321 0.398148i \(-0.869653\pi\)
0.917321 0.398148i \(-0.130347\pi\)
\(84\) 1.94550i 0.212271i
\(85\) 4.51571i 0.489798i
\(86\) 1.35193i 0.145782i
\(87\) 3.79095 0.406432
\(88\) −3.33572 −0.355588
\(89\) 0.636396i 0.0674578i −0.999431 0.0337289i \(-0.989262\pi\)
0.999431 0.0337289i \(-0.0107383\pi\)
\(90\) −0.687642 −0.0724838
\(91\) −1.23346 3.38801i −0.129301 0.355160i
\(92\) 13.6844 1.42670
\(93\) 1.79095i 0.185713i
\(94\) 1.69362 0.174684
\(95\) −12.0767 −1.23904
\(96\) 2.70037i 0.275605i
\(97\) 11.3240i 1.14978i −0.818230 0.574891i \(-0.805044\pi\)
0.818230 0.574891i \(-0.194956\pi\)
\(98\) 0.233455i 0.0235825i
\(99\) 3.62146i 0.363971i
\(100\) −7.15158 −0.715158
\(101\) −6.04880 −0.601879 −0.300939 0.953643i \(-0.597300\pi\)
−0.300939 + 0.953643i \(0.597300\pi\)
\(102\) 0.357908i 0.0354381i
\(103\) 18.6670 1.83932 0.919658 0.392721i \(-0.128466\pi\)
0.919658 + 0.392721i \(0.128466\pi\)
\(104\) 1.13613 + 3.12068i 0.111407 + 0.306008i
\(105\) −2.94550 −0.287451
\(106\) 3.11498i 0.302554i
\(107\) −4.82482 −0.466433 −0.233216 0.972425i \(-0.574925\pi\)
−0.233216 + 0.972425i \(0.574925\pi\)
\(108\) −1.94550 −0.187206
\(109\) 4.95718i 0.474811i 0.971411 + 0.237406i \(0.0762971\pi\)
−0.971411 + 0.237406i \(0.923703\pi\)
\(110\) 2.49027i 0.237438i
\(111\) 7.24292i 0.687468i
\(112\) 3.67596i 0.347346i
\(113\) 3.79095 0.356622 0.178311 0.983974i \(-0.442937\pi\)
0.178311 + 0.983974i \(0.442937\pi\)
\(114\) 0.957177 0.0896479
\(115\) 20.7183i 1.93199i
\(116\) −7.37528 −0.684778
\(117\) −3.38801 + 1.23346i −0.313221 + 0.114033i
\(118\) −1.13119 −0.104135
\(119\) 1.53309i 0.140538i
\(120\) 2.71309 0.247670
\(121\) −2.11498 −0.192271
\(122\) 0.648074i 0.0586739i
\(123\) 9.15455i 0.825438i
\(124\) 3.48429i 0.312898i
\(125\) 3.89995i 0.348822i
\(126\) 0.233455 0.0207978
\(127\) −10.4903 −0.930861 −0.465430 0.885085i \(-0.654100\pi\)
−0.465430 + 0.885085i \(0.654100\pi\)
\(128\) 6.96990i 0.616058i
\(129\) −5.79095 −0.509864
\(130\) 2.32973 0.848175i 0.204331 0.0743899i
\(131\) 5.35193 0.467600 0.233800 0.972285i \(-0.424884\pi\)
0.233800 + 0.972285i \(0.424884\pi\)
\(132\) 7.04555i 0.613236i
\(133\) 4.10005 0.355519
\(134\) 3.46093 0.298979
\(135\) 2.94550i 0.253508i
\(136\) 1.41212i 0.121089i
\(137\) 11.6936i 0.999054i −0.866298 0.499527i \(-0.833507\pi\)
0.866298 0.499527i \(-0.166493\pi\)
\(138\) 1.64209i 0.139784i
\(139\) −14.6670 −1.24404 −0.622020 0.783002i \(-0.713688\pi\)
−0.622020 + 0.783002i \(0.713688\pi\)
\(140\) 5.73046 0.484313
\(141\) 7.25460i 0.610948i
\(142\) 0.845448 0.0709485
\(143\) 4.46691 + 12.2695i 0.373542 + 1.02603i
\(144\) 3.67596 0.306330
\(145\) 11.1662i 0.927305i
\(146\) 3.40073 0.281446
\(147\) 1.00000 0.0824786
\(148\) 14.0911i 1.15828i
\(149\) 12.6274i 1.03448i 0.855840 + 0.517240i \(0.173041\pi\)
−0.855840 + 0.517240i \(0.826959\pi\)
\(150\) 0.858172i 0.0700695i
\(151\) 18.4858i 1.50436i −0.658959 0.752178i \(-0.729003\pi\)
0.658959 0.752178i \(-0.270997\pi\)
\(152\) −3.77654 −0.306318
\(153\) 1.53309 0.123943
\(154\) 0.845448i 0.0681282i
\(155\) −5.27523 −0.423717
\(156\) 6.59136 2.39969i 0.527731 0.192129i
\(157\) −1.06618 −0.0850904 −0.0425452 0.999095i \(-0.513547\pi\)
−0.0425452 + 0.999095i \(0.513547\pi\)
\(158\) 1.53309i 0.121966i
\(159\) 13.3430 1.05817
\(160\) −7.95392 −0.628813
\(161\) 7.03387i 0.554347i
\(162\) 0.233455i 0.0183420i
\(163\) 23.4430i 1.83620i −0.396350 0.918100i \(-0.629723\pi\)
0.396350 0.918100i \(-0.370277\pi\)
\(164\) 17.8102i 1.39074i
\(165\) 10.6670 0.830426
\(166\) −1.69362 −0.131451
\(167\) 7.67271i 0.593732i 0.954919 + 0.296866i \(0.0959415\pi\)
−0.954919 + 0.296866i \(0.904059\pi\)
\(168\) −0.921097 −0.0710641
\(169\) 9.95718 8.35791i 0.765937 0.642916i
\(170\) −1.05422 −0.0808547
\(171\) 4.10005i 0.313539i
\(172\) 11.2663 0.859046
\(173\) −2.66701 −0.202769 −0.101385 0.994847i \(-0.532327\pi\)
−0.101385 + 0.994847i \(0.532327\pi\)
\(174\) 0.885016i 0.0670929i
\(175\) 3.67596i 0.277877i
\(176\) 13.3124i 1.00346i
\(177\) 4.84545i 0.364206i
\(178\) −0.148570 −0.0111358
\(179\) −11.2340 −0.839666 −0.419833 0.907601i \(-0.637911\pi\)
−0.419833 + 0.907601i \(0.637911\pi\)
\(180\) 5.73046i 0.427124i
\(181\) 9.58189 0.712217 0.356108 0.934445i \(-0.384103\pi\)
0.356108 + 0.934445i \(0.384103\pi\)
\(182\) −0.790947 + 0.287956i −0.0586289 + 0.0213447i
\(183\) −2.77601 −0.205209
\(184\) 6.47887i 0.477629i
\(185\) 21.3340 1.56851
\(186\) 0.418106 0.0306570
\(187\) 5.55203i 0.406004i
\(188\) 14.1138i 1.02936i
\(189\) 1.00000i 0.0727393i
\(190\) 2.81936i 0.204538i
\(191\) −7.89100 −0.570973 −0.285486 0.958383i \(-0.592155\pi\)
−0.285486 + 0.958383i \(0.592155\pi\)
\(192\) −6.72151 −0.485083
\(193\) 5.89100i 0.424043i −0.977265 0.212022i \(-0.931995\pi\)
0.977265 0.212022i \(-0.0680047\pi\)
\(194\) −2.64365 −0.189803
\(195\) −3.63314 9.97937i −0.260175 0.714637i
\(196\) −1.94550 −0.138964
\(197\) 19.1546i 1.36471i 0.731023 + 0.682353i \(0.239043\pi\)
−0.731023 + 0.682353i \(0.760957\pi\)
\(198\) −0.845448 −0.0600834
\(199\) 8.20010 0.581290 0.290645 0.956831i \(-0.406130\pi\)
0.290645 + 0.956831i \(0.406130\pi\)
\(200\) 3.38592i 0.239420i
\(201\) 14.8248i 1.04566i
\(202\) 1.41212i 0.0993567i
\(203\) 3.79095i 0.266072i
\(204\) −2.98262 −0.208825
\(205\) 26.9647 1.88330
\(206\) 4.35791i 0.303630i
\(207\) 7.03387 0.488888
\(208\) −12.4542 + 4.53413i −0.863542 + 0.314386i
\(209\) −14.8482 −1.02707
\(210\) 0.687642i 0.0474518i
\(211\) −11.7009 −0.805522 −0.402761 0.915305i \(-0.631949\pi\)
−0.402761 + 0.915305i \(0.631949\pi\)
\(212\) −25.9587 −1.78285
\(213\) 3.62146i 0.248138i
\(214\) 1.12638i 0.0769976i
\(215\) 17.0572i 1.16329i
\(216\) 0.921097i 0.0626727i
\(217\) 1.79095 0.121577
\(218\) 1.15728 0.0783808
\(219\) 14.5670i 0.984344i
\(220\) −20.7527 −1.39914
\(221\) −5.19412 + 1.89100i −0.349394 + 0.127202i
\(222\) −1.69090 −0.113486
\(223\) 5.45198i 0.365091i −0.983197 0.182546i \(-0.941566\pi\)
0.983197 0.182546i \(-0.0584337\pi\)
\(224\) 2.70037 0.180426
\(225\) −3.67596 −0.245064
\(226\) 0.885016i 0.0588704i
\(227\) 27.1133i 1.79957i 0.436331 + 0.899786i \(0.356278\pi\)
−0.436331 + 0.899786i \(0.643722\pi\)
\(228\) 7.97664i 0.528266i
\(229\) 17.4918i 1.15589i 0.816075 + 0.577946i \(0.196146\pi\)
−0.816075 + 0.577946i \(0.803854\pi\)
\(230\) −4.83678 −0.318928
\(231\) −3.62146 −0.238275
\(232\) 3.49183i 0.229250i
\(233\) 13.3430 0.874127 0.437064 0.899431i \(-0.356018\pi\)
0.437064 + 0.899431i \(0.356018\pi\)
\(234\) 0.287956 + 0.790947i 0.0188243 + 0.0517058i
\(235\) 21.3684 1.39392
\(236\) 9.42681i 0.613633i
\(237\) −6.56696 −0.426570
\(238\) 0.357908 0.0231997
\(239\) 12.7554i 0.825077i 0.910940 + 0.412539i \(0.135358\pi\)
−0.910940 + 0.412539i \(0.864642\pi\)
\(240\) 10.8275i 0.698915i
\(241\) 9.94875i 0.640856i 0.947273 + 0.320428i \(0.103827\pi\)
−0.947273 + 0.320428i \(0.896173\pi\)
\(242\) 0.493754i 0.0317397i
\(243\) −1.00000 −0.0641500
\(244\) 5.40073 0.345746
\(245\) 2.94550i 0.188181i
\(246\) −2.13718 −0.136261
\(247\) 5.05723 + 13.8910i 0.321784 + 0.883863i
\(248\) −1.64964 −0.104752
\(249\) 7.25460i 0.459742i
\(250\) −0.910463 −0.0575827
\(251\) 24.4002 1.54013 0.770064 0.637967i \(-0.220224\pi\)
0.770064 + 0.637967i \(0.220224\pi\)
\(252\) 1.94550i 0.122555i
\(253\) 25.4729i 1.60147i
\(254\) 2.44901i 0.153664i
\(255\) 4.51571i 0.282785i
\(256\) 11.8159 0.738492
\(257\) −28.2190 −1.76026 −0.880128 0.474737i \(-0.842543\pi\)
−0.880128 + 0.474737i \(0.842543\pi\)
\(258\) 1.35193i 0.0841672i
\(259\) −7.24292 −0.450053
\(260\) 7.06827 + 19.4149i 0.438355 + 1.20406i
\(261\) −3.79095 −0.234654
\(262\) 1.24943i 0.0771903i
\(263\) −11.4520 −0.706159 −0.353080 0.935593i \(-0.614866\pi\)
−0.353080 + 0.935593i \(0.614866\pi\)
\(264\) 3.33572 0.205299
\(265\) 39.3017i 2.41428i
\(266\) 0.957177i 0.0586883i
\(267\) 0.636396i 0.0389468i
\(268\) 28.8417i 1.76179i
\(269\) 19.8009 1.20728 0.603642 0.797255i \(-0.293716\pi\)
0.603642 + 0.797255i \(0.293716\pi\)
\(270\) 0.687642 0.0418485
\(271\) 12.5391i 0.761694i −0.924638 0.380847i \(-0.875632\pi\)
0.924638 0.380847i \(-0.124368\pi\)
\(272\) 5.63558 0.341707
\(273\) 1.23346 + 3.38801i 0.0746521 + 0.205051i
\(274\) −2.72994 −0.164921
\(275\) 13.3124i 0.802765i
\(276\) −13.6844 −0.823703
\(277\) −2.43902 −0.146547 −0.0732733 0.997312i \(-0.523345\pi\)
−0.0732733 + 0.997312i \(0.523345\pi\)
\(278\) 3.42409i 0.205363i
\(279\) 1.79095i 0.107221i
\(280\) 2.71309i 0.162138i
\(281\) 25.9794i 1.54980i −0.632084 0.774900i \(-0.717800\pi\)
0.632084 0.774900i \(-0.282200\pi\)
\(282\) −1.69362 −0.100854
\(283\) −7.78199 −0.462592 −0.231296 0.972883i \(-0.574297\pi\)
−0.231296 + 0.972883i \(0.574297\pi\)
\(284\) 7.04555i 0.418076i
\(285\) 12.0767 0.715362
\(286\) 2.86438 1.04282i 0.169375 0.0616634i
\(287\) −9.15455 −0.540376
\(288\) 2.70037i 0.159121i
\(289\) −14.6496 −0.861743
\(290\) 2.60681 0.153077
\(291\) 11.3240i 0.663827i
\(292\) 28.3400i 1.65847i
\(293\) 7.14560i 0.417450i −0.977974 0.208725i \(-0.933069\pi\)
0.977974 0.208725i \(-0.0669314\pi\)
\(294\) 0.233455i 0.0136154i
\(295\) −14.2723 −0.830963
\(296\) 6.67143 0.387769
\(297\) 3.62146i 0.210139i
\(298\) 2.94794 0.170770
\(299\) −23.8308 + 8.67596i −1.37817 + 0.501744i
\(300\) 7.15158 0.412897
\(301\) 5.79095i 0.333785i
\(302\) −4.31561 −0.248336
\(303\) 6.04880 0.347495
\(304\) 15.0716i 0.864417i
\(305\) 8.17674i 0.468199i
\(306\) 0.357908i 0.0204602i
\(307\) 10.4092i 0.594082i −0.954865 0.297041i \(-0.904000\pi\)
0.954865 0.297041i \(-0.0959998\pi\)
\(308\) 7.04555 0.401457
\(309\) −18.6670 −1.06193
\(310\) 1.23153i 0.0699462i
\(311\) 4.51571 0.256063 0.128031 0.991770i \(-0.459134\pi\)
0.128031 + 0.991770i \(0.459134\pi\)
\(312\) −1.13613 3.12068i −0.0643208 0.176674i
\(313\) −21.6242 −1.22227 −0.611136 0.791526i \(-0.709287\pi\)
−0.611136 + 0.791526i \(0.709287\pi\)
\(314\) 0.248905i 0.0140465i
\(315\) 2.94550 0.165960
\(316\) 12.7760 0.718707
\(317\) 16.8275i 0.945129i −0.881296 0.472565i \(-0.843328\pi\)
0.881296 0.472565i \(-0.156672\pi\)
\(318\) 3.11498i 0.174680i
\(319\) 13.7288i 0.768664i
\(320\) 19.7982i 1.10675i
\(321\) 4.82482 0.269295
\(322\) 1.64209 0.0915102
\(323\) 6.28575i 0.349748i
\(324\) 1.94550 0.108083
\(325\) 12.4542 4.53413i 0.690834 0.251509i
\(326\) −5.47289 −0.303115
\(327\) 4.95718i 0.274133i
\(328\) 8.43223 0.465592
\(329\) −7.25460 −0.399959
\(330\) 2.49027i 0.137085i
\(331\) 36.1355i 1.98619i −0.117331 0.993093i \(-0.537434\pi\)
0.117331 0.993093i \(-0.462566\pi\)
\(332\) 14.1138i 0.774596i
\(333\) 7.24292i 0.396910i
\(334\) 1.79123 0.0980119
\(335\) 43.6665 2.38575
\(336\) 3.67596i 0.200540i
\(337\) −33.4595 −1.82266 −0.911328 0.411681i \(-0.864942\pi\)
−0.911328 + 0.411681i \(0.864942\pi\)
\(338\) −1.95120 2.32455i −0.106131 0.126439i
\(339\) −3.79095 −0.205896
\(340\) 8.78532i 0.476451i
\(341\) −6.48585 −0.351228
\(342\) −0.957177 −0.0517582
\(343\) 1.00000i 0.0539949i
\(344\) 5.33402i 0.287591i
\(345\) 20.7183i 1.11543i
\(346\) 0.622627i 0.0334726i
\(347\) −8.72721 −0.468501 −0.234251 0.972176i \(-0.575264\pi\)
−0.234251 + 0.972176i \(0.575264\pi\)
\(348\) 7.37528 0.395357
\(349\) 0.852706i 0.0456443i −0.999740 0.0228222i \(-0.992735\pi\)
0.999740 0.0228222i \(-0.00726515\pi\)
\(350\) −0.858172 −0.0458712
\(351\) 3.38801 1.23346i 0.180838 0.0658370i
\(352\) −9.77927 −0.521237
\(353\) 7.46365i 0.397250i −0.980076 0.198625i \(-0.936352\pi\)
0.980076 0.198625i \(-0.0636476\pi\)
\(354\) 1.13119 0.0601223
\(355\) 10.6670 0.566146
\(356\) 1.23811i 0.0656195i
\(357\) 1.53309i 0.0811397i
\(358\) 2.62263i 0.138610i
\(359\) 12.4019i 0.654547i −0.944930 0.327274i \(-0.893870\pi\)
0.944930 0.327274i \(-0.106130\pi\)
\(360\) −2.71309 −0.142992
\(361\) 2.18959 0.115241
\(362\) 2.23694i 0.117571i
\(363\) 2.11498 0.111008
\(364\) −2.39969 6.59136i −0.125778 0.345481i
\(365\) 42.9070 2.24585
\(366\) 0.648074i 0.0338754i
\(367\) −9.31508 −0.486243 −0.243122 0.969996i \(-0.578171\pi\)
−0.243122 + 0.969996i \(0.578171\pi\)
\(368\) 25.8562 1.34785
\(369\) 9.15455i 0.476567i
\(370\) 4.98053i 0.258926i
\(371\) 13.3430i 0.692733i
\(372\) 3.48429i 0.180652i
\(373\) −3.73319 −0.193297 −0.0966486 0.995319i \(-0.530812\pi\)
−0.0966486 + 0.995319i \(0.530812\pi\)
\(374\) −1.29615 −0.0670222
\(375\) 3.89995i 0.201393i
\(376\) 6.68219 0.344608
\(377\) 12.8438 4.67596i 0.661487 0.240824i
\(378\) −0.233455 −0.0120076
\(379\) 12.0000i 0.616399i 0.951322 + 0.308199i \(0.0997264\pi\)
−0.951322 + 0.308199i \(0.900274\pi\)
\(380\) −23.4952 −1.20528
\(381\) 10.4903 0.537433
\(382\) 1.84219i 0.0942548i
\(383\) 8.80419i 0.449873i −0.974373 0.224936i \(-0.927783\pi\)
0.974373 0.224936i \(-0.0722175\pi\)
\(384\) 6.96990i 0.355681i
\(385\) 10.6670i 0.543641i
\(386\) −1.37528 −0.0700001
\(387\) 5.79095 0.294370
\(388\) 22.0309i 1.11845i
\(389\) −26.4978 −1.34349 −0.671746 0.740781i \(-0.734455\pi\)
−0.671746 + 0.740781i \(0.734455\pi\)
\(390\) −2.32973 + 0.848175i −0.117971 + 0.0429490i
\(391\) 10.7836 0.545348
\(392\) 0.921097i 0.0465224i
\(393\) −5.35193 −0.269969
\(394\) 4.47173 0.225282
\(395\) 19.3430i 0.973251i
\(396\) 7.04555i 0.354052i
\(397\) 16.0399i 0.805017i 0.915416 + 0.402509i \(0.131862\pi\)
−0.915416 + 0.402509i \(0.868138\pi\)
\(398\) 1.91435i 0.0959579i
\(399\) −4.10005 −0.205259
\(400\) −13.5127 −0.675635
\(401\) 12.2885i 0.613657i −0.951765 0.306829i \(-0.900732\pi\)
0.951765 0.306829i \(-0.0992678\pi\)
\(402\) −3.46093 −0.172615
\(403\) 2.20905 + 6.06774i 0.110041 + 0.302256i
\(404\) −11.7679 −0.585477
\(405\) 2.94550i 0.146363i
\(406\) −0.885016 −0.0439226
\(407\) 26.2300 1.30017
\(408\) 1.41212i 0.0699105i
\(409\) 24.8114i 1.22685i 0.789754 + 0.613423i \(0.210208\pi\)
−0.789754 + 0.613423i \(0.789792\pi\)
\(410\) 6.29505i 0.310890i
\(411\) 11.6936i 0.576804i
\(412\) 36.3166 1.78919
\(413\) 4.84545 0.238429
\(414\) 1.64209i 0.0807044i
\(415\) −21.3684 −1.04893
\(416\) 3.33078 + 9.14885i 0.163305 + 0.448560i
\(417\) 14.6670 0.718247
\(418\) 3.46638i 0.169546i
\(419\) 21.6496 1.05765 0.528827 0.848730i \(-0.322632\pi\)
0.528827 + 0.848730i \(0.322632\pi\)
\(420\) −5.73046 −0.279618
\(421\) 22.4679i 1.09502i −0.836799 0.547510i \(-0.815576\pi\)
0.836799 0.547510i \(-0.184424\pi\)
\(422\) 2.73163i 0.132974i
\(423\) 7.25460i 0.352731i
\(424\) 12.2902i 0.596863i
\(425\) −5.63558 −0.273366
\(426\) −0.845448 −0.0409621
\(427\) 2.77601i 0.134341i
\(428\) −9.38668 −0.453722
\(429\) −4.46691 12.2695i −0.215664 0.592379i
\(430\) −3.98210 −0.192034
\(431\) 28.7787i 1.38622i 0.720830 + 0.693112i \(0.243761\pi\)
−0.720830 + 0.693112i \(0.756239\pi\)
\(432\) −3.67596 −0.176860
\(433\) −29.5217 −1.41872 −0.709361 0.704845i \(-0.751016\pi\)
−0.709361 + 0.704845i \(0.751016\pi\)
\(434\) 0.418106i 0.0200697i
\(435\) 11.1662i 0.535380i
\(436\) 9.64418i 0.461873i
\(437\) 28.8392i 1.37957i
\(438\) −3.40073 −0.162493
\(439\) 18.6670 0.890928 0.445464 0.895300i \(-0.353039\pi\)
0.445464 + 0.895300i \(0.353039\pi\)
\(440\) 9.82535i 0.468405i
\(441\) −1.00000 −0.0476190
\(442\) 0.441463 + 1.21259i 0.0209982 + 0.0576772i
\(443\) 15.2340 0.723788 0.361894 0.932219i \(-0.382130\pi\)
0.361894 + 0.932219i \(0.382130\pi\)
\(444\) 14.0911i 0.668734i
\(445\) −1.87450 −0.0888599
\(446\) −1.27279 −0.0602684
\(447\) 12.6274i 0.597258i
\(448\) 6.72151i 0.317562i
\(449\) 11.2755i 0.532125i 0.963956 + 0.266062i \(0.0857227\pi\)
−0.963956 + 0.266062i \(0.914277\pi\)
\(450\) 0.858172i 0.0404546i
\(451\) 33.1529 1.56111
\(452\) 7.37528 0.346904
\(453\) 18.4858i 0.868541i
\(454\) 6.32973 0.297069
\(455\) −9.97937 + 3.63314i −0.467840 + 0.170324i
\(456\) 3.77654 0.176853
\(457\) 24.0234i 1.12377i −0.827217 0.561883i \(-0.810077\pi\)
0.827217 0.561883i \(-0.189923\pi\)
\(458\) 4.08356 0.190812
\(459\) −1.53309 −0.0715585
\(460\) 40.3073i 1.87934i
\(461\) 1.91163i 0.0890334i 0.999009 + 0.0445167i \(0.0141748\pi\)
−0.999009 + 0.0445167i \(0.985825\pi\)
\(462\) 0.845448i 0.0393338i
\(463\) 15.2250i 0.707567i 0.935327 + 0.353783i \(0.115105\pi\)
−0.935327 + 0.353783i \(0.884895\pi\)
\(464\) −13.9354 −0.646934
\(465\) 5.27523 0.244633
\(466\) 3.11498i 0.144299i
\(467\) 31.0483 1.43674 0.718371 0.695660i \(-0.244888\pi\)
0.718371 + 0.695660i \(0.244888\pi\)
\(468\) −6.59136 + 2.39969i −0.304686 + 0.110925i
\(469\) −14.8248 −0.684546
\(470\) 4.98857i 0.230105i
\(471\) 1.06618 0.0491270
\(472\) −4.46313 −0.205432
\(473\) 20.9717i 0.964279i
\(474\) 1.53309i 0.0704172i
\(475\) 15.0716i 0.691534i
\(476\) 2.98262i 0.136708i
\(477\) −13.3430 −0.610933
\(478\) 2.97781 0.136202
\(479\) 39.6314i 1.81081i 0.424552 + 0.905403i \(0.360432\pi\)
−0.424552 + 0.905403i \(0.639568\pi\)
\(480\) 7.95392 0.363045
\(481\) −8.93382 24.5391i −0.407347 1.11889i
\(482\) 2.32259 0.105791
\(483\) 7.03387i 0.320052i
\(484\) −4.11470 −0.187032
\(485\) −33.3549 −1.51457
\(486\) 0.233455i 0.0105897i
\(487\) 5.91435i 0.268005i 0.990981 + 0.134002i \(0.0427830\pi\)
−0.990981 + 0.134002i \(0.957217\pi\)
\(488\) 2.55698i 0.115749i
\(489\) 23.4430i 1.06013i
\(490\) 0.687642 0.0310645
\(491\) −40.6068 −1.83256 −0.916280 0.400539i \(-0.868823\pi\)
−0.916280 + 0.400539i \(0.868823\pi\)
\(492\) 17.8102i 0.802944i
\(493\) −5.81186 −0.261753
\(494\) 3.24292 1.18064i 0.145906 0.0531193i
\(495\) −10.6670 −0.479446
\(496\) 6.58346i 0.295606i
\(497\) −3.62146 −0.162445
\(498\) 1.69362 0.0758931
\(499\) 27.9821i 1.25265i 0.779562 + 0.626325i \(0.215442\pi\)
−0.779562 + 0.626325i \(0.784558\pi\)
\(500\) 7.58735i 0.339316i
\(501\) 7.67271i 0.342791i
\(502\) 5.69635i 0.254241i
\(503\) −26.9458 −1.20145 −0.600727 0.799455i \(-0.705122\pi\)
−0.600727 + 0.799455i \(0.705122\pi\)
\(504\) 0.921097 0.0410289
\(505\) 17.8167i 0.792835i
\(506\) −5.94677 −0.264366
\(507\) −9.95718 + 8.35791i −0.442214 + 0.371188i
\(508\) −20.4088 −0.905494
\(509\) 0.836496i 0.0370770i 0.999828 + 0.0185385i \(0.00590133\pi\)
−0.999828 + 0.0185385i \(0.994099\pi\)
\(510\) 1.05422 0.0466815
\(511\) −14.5670 −0.644404
\(512\) 16.6983i 0.737966i
\(513\) 4.10005i 0.181022i
\(514\) 6.58788i 0.290579i
\(515\) 54.9837i 2.42287i
\(516\) −11.2663 −0.495970
\(517\) 26.2723 1.15545
\(518\) 1.69090i 0.0742937i
\(519\) 2.66701 0.117069
\(520\) 9.19196 3.34647i 0.403094 0.146753i
\(521\) 22.3047 0.977186 0.488593 0.872512i \(-0.337510\pi\)
0.488593 + 0.872512i \(0.337510\pi\)
\(522\) 0.885016i 0.0387361i
\(523\) 28.0010 1.22440 0.612200 0.790703i \(-0.290285\pi\)
0.612200 + 0.790703i \(0.290285\pi\)
\(524\) 10.4122 0.454858
\(525\) 3.67596i 0.160432i
\(526\) 2.67352i 0.116571i
\(527\) 2.74568i 0.119604i
\(528\) 13.3124i 0.579346i
\(529\) 26.4753 1.15110
\(530\) 9.17518 0.398544
\(531\) 4.84545i 0.210275i
\(532\) 7.97664 0.345831
\(533\) −11.2917 31.0157i −0.489099 1.34344i
\(534\) 0.148570 0.00642924
\(535\) 14.2115i 0.614416i
\(536\) 13.6551 0.589810
\(537\) 11.2340 0.484782
\(538\) 4.62263i 0.199296i
\(539\) 3.62146i 0.155987i
\(540\) 5.73046i 0.246600i
\(541\) 5.86764i 0.252270i 0.992013 + 0.126135i \(0.0402572\pi\)
−0.992013 + 0.126135i \(0.959743\pi\)
\(542\) −2.92731 −0.125739
\(543\) −9.58189 −0.411198
\(544\) 4.13990i 0.177497i
\(545\) 14.6014 0.625454
\(546\) 0.790947 0.287956i 0.0338494 0.0123234i
\(547\) 26.5068 1.13335 0.566674 0.823942i \(-0.308230\pi\)
0.566674 + 0.823942i \(0.308230\pi\)
\(548\) 22.7499i 0.971829i
\(549\) 2.77601 0.118477
\(550\) 3.10784 0.132519
\(551\) 15.5431i 0.662157i
\(552\) 6.47887i 0.275759i
\(553\) 6.56696i 0.279256i
\(554\) 0.569402i 0.0241916i
\(555\) −21.3340 −0.905579
\(556\) −28.5347 −1.21014
\(557\) 32.5862i 1.38072i 0.723466 + 0.690360i \(0.242548\pi\)
−0.723466 + 0.690360i \(0.757452\pi\)
\(558\) −0.418106 −0.0176998
\(559\) −19.6198 + 7.14287i −0.829828 + 0.302111i
\(560\) 10.8275 0.457547
\(561\) 5.55203i 0.234407i
\(562\) −6.06501 −0.255837
\(563\) −9.71425 −0.409407 −0.204703 0.978824i \(-0.565623\pi\)
−0.204703 + 0.978824i \(0.565623\pi\)
\(564\) 14.1138i 0.594299i
\(565\) 11.1662i 0.469767i
\(566\) 1.81675i 0.0763635i
\(567\) 1.00000i 0.0419961i
\(568\) 3.33572 0.139964
\(569\) 3.79095 0.158925 0.0794624 0.996838i \(-0.474680\pi\)
0.0794624 + 0.996838i \(0.474680\pi\)
\(570\) 2.81936i 0.118090i
\(571\) −3.76550 −0.157581 −0.0787906 0.996891i \(-0.525106\pi\)
−0.0787906 + 0.996891i \(0.525106\pi\)
\(572\) 8.69037 + 23.8704i 0.363363 + 0.998070i
\(573\) 7.89100 0.329651
\(574\) 2.13718i 0.0892040i
\(575\) −25.8562 −1.07828
\(576\) 6.72151 0.280063
\(577\) 10.7228i 0.446396i 0.974773 + 0.223198i \(0.0716496\pi\)
−0.974773 + 0.223198i \(0.928350\pi\)
\(578\) 3.42003i 0.142255i
\(579\) 5.89100i 0.244822i
\(580\) 21.7239i 0.902035i
\(581\) 7.25460 0.300972
\(582\) 2.64365 0.109583
\(583\) 48.3211i 2.00125i
\(584\) 13.4176 0.555223
\(585\) 3.63314 + 9.97937i 0.150212 + 0.412596i
\(586\) −1.66818 −0.0689117
\(587\) 34.0794i 1.40661i 0.710889 + 0.703304i \(0.248293\pi\)
−0.710889 + 0.703304i \(0.751707\pi\)
\(588\) 1.94550 0.0802310
\(589\) −7.34297 −0.302562
\(590\) 3.33193i 0.137173i
\(591\) 19.1546i 0.787913i
\(592\) 26.6247i 1.09427i
\(593\) 38.9600i 1.59990i −0.600069 0.799948i \(-0.704860\pi\)
0.600069 0.799948i \(-0.295140\pi\)
\(594\) 0.845448 0.0346892
\(595\) 4.51571 0.185126
\(596\) 24.5667i 1.00629i
\(597\) −8.20010 −0.335608
\(598\) 2.02545 + 5.56342i 0.0828267 + 0.227505i
\(599\) −4.90151 −0.200270 −0.100135 0.994974i \(-0.531928\pi\)
−0.100135 + 0.994974i \(0.531928\pi\)
\(600\) 3.38592i 0.138229i
\(601\) 9.73970 0.397291 0.198645 0.980071i \(-0.436346\pi\)
0.198645 + 0.980071i \(0.436346\pi\)
\(602\) 1.35193 0.0551004
\(603\) 14.8248i 0.603713i
\(604\) 35.9642i 1.46336i
\(605\) 6.22968i 0.253273i
\(606\) 1.41212i 0.0573636i
\(607\) −17.8308 −0.723730 −0.361865 0.932231i \(-0.617860\pi\)
−0.361865 + 0.932231i \(0.617860\pi\)
\(608\) −11.0716 −0.449014
\(609\) 3.79095i 0.153617i
\(610\) −1.90890 −0.0772892
\(611\) −8.94823 24.5786i −0.362006 0.994345i
\(612\) 2.98262 0.120565
\(613\) 7.83777i 0.316565i 0.987394 + 0.158282i \(0.0505956\pi\)
−0.987394 + 0.158282i \(0.949404\pi\)
\(614\) −2.43007 −0.0980696
\(615\) −26.9647 −1.08732
\(616\) 3.33572i 0.134400i
\(617\) 40.0471i 1.61224i 0.591755 + 0.806118i \(0.298435\pi\)
−0.591755 + 0.806118i \(0.701565\pi\)
\(618\) 4.35791i 0.175301i
\(619\) 9.07269i 0.364662i −0.983237 0.182331i \(-0.941636\pi\)
0.983237 0.182331i \(-0.0583643\pi\)
\(620\) −10.2630 −0.412170
\(621\) −7.03387 −0.282259
\(622\) 1.05422i 0.0422702i
\(623\) 0.636396 0.0254967
\(624\) 12.4542 4.53413i 0.498566 0.181511i
\(625\) −29.8671 −1.19468
\(626\) 5.04828i 0.201770i
\(627\) 14.8482 0.592979
\(628\) −2.07425 −0.0827717
\(629\) 11.1041i 0.442748i
\(630\) 0.687642i 0.0273963i
\(631\) 9.11056i 0.362686i 0.983420 + 0.181343i \(0.0580444\pi\)
−0.983420 + 0.181343i \(0.941956\pi\)
\(632\) 6.04880i 0.240609i
\(633\) 11.7009 0.465068
\(634\) −3.92847 −0.156020
\(635\) 30.8991i 1.22619i
\(636\) 25.9587 1.02933
\(637\) 3.38801 1.23346i 0.134238 0.0488713i
\(638\) 3.20505 0.126889
\(639\) 3.62146i 0.143263i
\(640\) −20.5298 −0.811513
\(641\) 22.8392 0.902095 0.451048 0.892500i \(-0.351050\pi\)
0.451048 + 0.892500i \(0.351050\pi\)
\(642\) 1.12638i 0.0444546i
\(643\) 15.6844i 0.618532i −0.950976 0.309266i \(-0.899917\pi\)
0.950976 0.309266i \(-0.100083\pi\)
\(644\) 13.6844i 0.539240i
\(645\) 17.0572i 0.671628i
\(646\) −1.46744 −0.0577356
\(647\) −47.6198 −1.87213 −0.936063 0.351832i \(-0.885559\pi\)
−0.936063 + 0.351832i \(0.885559\pi\)
\(648\) 0.921097i 0.0361841i
\(649\) −17.5476 −0.688804
\(650\) −1.05852 2.90749i −0.0415184 0.114041i
\(651\) −1.79095 −0.0701928
\(652\) 45.6084i 1.78616i
\(653\) 42.4002 1.65925 0.829624 0.558322i \(-0.188555\pi\)
0.829624 + 0.558322i \(0.188555\pi\)
\(654\) −1.15728 −0.0452532
\(655\) 15.7641i 0.615954i
\(656\) 33.6518i 1.31388i
\(657\) 14.5670i 0.568311i
\(658\) 1.69362i 0.0660243i
\(659\) 15.7497 0.613521 0.306760 0.951787i \(-0.400755\pi\)
0.306760 + 0.951787i \(0.400755\pi\)
\(660\) 20.7527 0.807796
\(661\) 17.3684i 0.675553i 0.941226 + 0.337777i \(0.109675\pi\)
−0.941226 + 0.337777i \(0.890325\pi\)
\(662\) −8.43601 −0.327875
\(663\) 5.19412 1.89100i 0.201723 0.0734403i
\(664\) −6.68219 −0.259319
\(665\) 12.0767i 0.468314i
\(666\) 1.69090 0.0655209
\(667\) −26.6650 −1.03247
\(668\) 14.9272i 0.577552i
\(669\) 5.45198i 0.210786i
\(670\) 10.1942i 0.393835i
\(671\) 10.0532i 0.388100i
\(672\) −2.70037 −0.104169
\(673\) −35.6754 −1.37519 −0.687593 0.726096i \(-0.741333\pi\)
−0.687593 + 0.726096i \(0.741333\pi\)
\(674\) 7.81129i 0.300880i
\(675\) 3.67596 0.141488
\(676\) 19.3717 16.2603i 0.745064 0.625396i
\(677\) −30.7228 −1.18077 −0.590386 0.807121i \(-0.701025\pi\)
−0.590386 + 0.807121i \(0.701025\pi\)
\(678\) 0.885016i 0.0339888i
\(679\) 11.3240 0.434577
\(680\) −4.15941 −0.159506
\(681\) 27.1133i 1.03898i
\(682\) 1.51415i 0.0579799i
\(683\) 12.2018i 0.466889i −0.972370 0.233444i \(-0.925000\pi\)
0.972370 0.233444i \(-0.0749997\pi\)
\(684\) 7.97664i 0.304995i
\(685\) −34.4436 −1.31602
\(686\) −0.233455 −0.00891335
\(687\) 17.4918i 0.667355i
\(688\) 21.2873 0.811571
\(689\) 45.2061 16.4580i 1.72221 0.626998i
\(690\) 4.83678 0.184133
\(691\) 19.7198i 0.750177i −0.926989 0.375089i \(-0.877612\pi\)
0.926989 0.375089i \(-0.122388\pi\)
\(692\) −5.18867 −0.197243
\(693\) 3.62146 0.137568
\(694\) 2.03741i 0.0773391i
\(695\) 43.2017i 1.63873i
\(696\) 3.49183i 0.132357i
\(697\) 14.0348i 0.531604i
\(698\) −0.199069 −0.00753486
\(699\) −13.3430 −0.504678
\(700\) 7.15158i 0.270304i
\(701\) −38.4211 −1.45115 −0.725573 0.688145i \(-0.758425\pi\)
−0.725573 + 0.688145i \(0.758425\pi\)
\(702\) −0.287956 0.790947i −0.0108682 0.0298524i
\(703\) 29.6963 1.12002
\(704\) 24.3417i 0.917412i
\(705\) −21.3684 −0.804781
\(706\) −1.74243 −0.0655771
\(707\) 6.04880i 0.227489i
\(708\) 9.42681i 0.354281i
\(709\) 29.1573i 1.09502i 0.836798 + 0.547512i \(0.184425\pi\)
−0.836798 + 0.547512i \(0.815575\pi\)
\(710\) 2.49027i 0.0934581i
\(711\) 6.56696 0.246280
\(712\) −0.586182 −0.0219681
\(713\) 12.5973i 0.471772i
\(714\) −0.357908 −0.0133944
\(715\) 36.1399 13.1573i 1.35156 0.492054i
\(716\) −21.8557 −0.816785
\(717\) 12.7554i 0.476358i
\(718\) −2.89528 −0.108051
\(719\) −32.5157 −1.21263 −0.606316 0.795224i \(-0.707353\pi\)
−0.606316 + 0.795224i \(0.707353\pi\)
\(720\) 10.8275i 0.403519i
\(721\) 18.6670i 0.695196i
\(722\) 0.511170i 0.0190238i
\(723\) 9.94875i 0.369998i
\(724\) 18.6416 0.692808
\(725\) 13.9354 0.517547
\(726\) 0.493754i 0.0183249i
\(727\) 19.9821 0.741095 0.370547 0.928814i \(-0.379170\pi\)
0.370547 + 0.928814i \(0.379170\pi\)
\(728\) −3.12068 + 1.13613i −0.115660 + 0.0421078i
\(729\) 1.00000 0.0370370
\(730\) 10.0168i 0.370740i
\(731\) 8.87804 0.328366
\(732\) −5.40073 −0.199617
\(733\) 26.1956i 0.967555i 0.875191 + 0.483778i \(0.160736\pi\)
−0.875191 + 0.483778i \(0.839264\pi\)
\(734\) 2.17465i 0.0802679i
\(735\) 2.94550i 0.108646i
\(736\) 18.9940i 0.700129i
\(737\) 53.6875 1.97760
\(738\) 2.13718 0.0786705
\(739\) 14.6247i 0.537979i −0.963143 0.268989i \(-0.913310\pi\)
0.963143 0.268989i \(-0.0866897\pi\)
\(740\) 41.5053 1.52577
\(741\) −5.05723 13.8910i −0.185782 0.510299i
\(742\) −3.11498 −0.114355
\(743\) 15.4268i 0.565955i −0.959127 0.282977i \(-0.908678\pi\)
0.959127 0.282977i \(-0.0913222\pi\)
\(744\) 1.64964 0.0604786
\(745\) 37.1941 1.36269
\(746\) 0.871532i 0.0319091i
\(747\) 7.25460i 0.265432i
\(748\) 10.8015i 0.394941i
\(749\) 4.82482i 0.176295i
\(750\) 0.910463 0.0332454
\(751\) 2.62716 0.0958664 0.0479332 0.998851i \(-0.484737\pi\)
0.0479332 + 0.998851i \(0.484737\pi\)
\(752\) 26.6676i 0.972469i
\(753\) −24.4002 −0.889193
\(754\) −1.09163 2.99844i −0.0397547 0.109197i
\(755\) −54.4500 −1.98164
\(756\) 1.94550i 0.0707571i
\(757\) 35.9454 1.30646 0.653228 0.757161i \(-0.273414\pi\)
0.653228 + 0.757161i \(0.273414\pi\)
\(758\) 2.80146 0.101754
\(759\) 25.4729i 0.924607i
\(760\) 11.1238i 0.403503i
\(761\) 24.1028i 0.873725i 0.899528 + 0.436862i \(0.143910\pi\)
−0.899528 + 0.436862i \(0.856090\pi\)
\(762\) 2.44901i 0.0887181i
\(763\) −4.95718 −0.179462
\(764\) −15.3519 −0.555413
\(765\) 4.51571i 0.163266i
\(766\) −2.05538 −0.0742640
\(767\) 5.97664 + 16.4164i 0.215804 + 0.592762i
\(768\) −11.8159 −0.426368
\(769\) 51.8831i 1.87095i −0.353391 0.935476i \(-0.614971\pi\)
0.353391 0.935476i \(-0.385029\pi\)
\(770\) −2.49027 −0.0897430
\(771\) 28.2190 1.01628
\(772\) 11.4609i 0.412488i
\(773\) 30.8833i 1.11080i −0.831585 0.555398i \(-0.812566\pi\)
0.831585 0.555398i \(-0.187434\pi\)
\(774\) 1.35193i 0.0485940i
\(775\) 6.58346i 0.236485i
\(776\) −10.4305 −0.374434
\(777\) 7.24292 0.259838
\(778\) 6.18605i 0.221781i
\(779\) 37.5341 1.34480
\(780\) −7.06827 19.4149i −0.253085 0.695163i
\(781\) 13.1150 0.469291
\(782\) 2.51748i 0.0900247i
\(783\) 3.79095 0.135477
\(784\) −3.67596 −0.131284
\(785\) 3.14043i 0.112087i
\(786\) 1.24943i 0.0445658i
\(787\) 53.9877i 1.92445i −0.272252 0.962226i \(-0.587768\pi\)
0.272252 0.962226i \(-0.412232\pi\)
\(788\) 37.2652i 1.32752i
\(789\) 11.4520 0.407701
\(790\) −4.51571 −0.160662
\(791\) 3.79095i 0.134791i
\(792\) −3.33572 −0.118529
\(793\) −9.40515 + 3.42409i −0.333987 + 0.121593i
\(794\) 3.74458 0.132890
\(795\) 39.3017i 1.39389i
\(796\) 15.9533 0.565449
\(797\) 4.69688 0.166372 0.0831860 0.996534i \(-0.473490\pi\)
0.0831860 + 0.996534i \(0.473490\pi\)
\(798\) 0.957177i 0.0338837i
\(799\) 11.1220i 0.393467i
\(800\) 9.92644i 0.350953i
\(801\) 0.636396i 0.0224859i
\(802\) −2.86881 −0.101301
\(803\) 52.7537 1.86164
\(804\) 28.8417i 1.01717i
\(805\) 20.7183 0.730223
\(806\) 1.41654 0.515714i 0.0498957 0.0181653i
\(807\) −19.8009 −0.697026
\(808\) 5.57153i 0.196006i
\(809\) −22.4390 −0.788914 −0.394457 0.918914i \(-0.629067\pi\)
−0.394457 + 0.918914i \(0.629067\pi\)
\(810\) −0.687642 −0.0241613
\(811\) 10.4858i 0.368208i −0.982907 0.184104i \(-0.941062\pi\)
0.982907 0.184104i \(-0.0589383\pi\)
\(812\) 7.37528i 0.258822i
\(813\) 12.5391i 0.439764i
\(814\) 6.12352i 0.214629i
\(815\) −69.0514 −2.41876
\(816\) −5.63558 −0.197285
\(817\) 23.7432i 0.830669i
\(818\) 5.79236 0.202525
\(819\) −1.23346 3.38801i −0.0431004 0.118387i
\(820\) 52.4598 1.83198
\(821\) 36.7808i 1.28366i 0.766847 + 0.641830i \(0.221824\pi\)
−0.766847 + 0.641830i \(0.778176\pi\)
\(822\) 2.72994 0.0952174
\(823\) −28.9717 −1.00989 −0.504945 0.863152i \(-0.668487\pi\)
−0.504945 + 0.863152i \(0.668487\pi\)
\(824\) 17.1941i 0.598986i
\(825\) 13.3124i 0.463477i
\(826\) 1.13119i 0.0393593i
\(827\) 1.73046i 0.0601741i 0.999547 + 0.0300871i \(0.00957846\pi\)
−0.999547 + 0.0300871i \(0.990422\pi\)
\(828\) 13.6844 0.475565
\(829\) 33.1972 1.15299 0.576494 0.817101i \(-0.304420\pi\)
0.576494 + 0.817101i \(0.304420\pi\)
\(830\) 4.98857i 0.173156i
\(831\) 2.43902 0.0846087
\(832\) −22.7725 + 8.29068i −0.789495 + 0.287428i
\(833\) −1.53309 −0.0531184
\(834\) 3.42409i 0.118566i
\(835\) 22.6000 0.782104
\(836\) −28.8871 −0.999081
\(837\) 1.79095i 0.0619042i
\(838\) 5.05422i 0.174595i
\(839\) 8.48312i 0.292870i −0.989220 0.146435i \(-0.953220\pi\)
0.989220 0.146435i \(-0.0467799\pi\)
\(840\) 2.71309i 0.0936105i
\(841\) −14.6287 −0.504439
\(842\) −5.24525 −0.180763
\(843\) 25.9794i 0.894777i
\(844\) −22.7640 −0.783571
\(845\) −24.6182 29.3289i −0.846892 1.00894i
\(846\) 1.69362 0.0582280
\(847\) 2.11498i 0.0726717i
\(848\) −49.0483 −1.68432
\(849\) 7.78199 0.267077
\(850\) 1.31565i 0.0451266i
\(851\) 50.9458i 1.74640i
\(852\) 7.04555i 0.241377i
\(853\) 14.9617i 0.512279i −0.966640 0.256140i \(-0.917549\pi\)
0.966640 0.256140i \(-0.0824507\pi\)
\(854\) 0.648074 0.0221766
\(855\) −12.0767 −0.413014
\(856\) 4.44412i 0.151897i
\(857\) −46.1334 −1.57589 −0.787943 0.615748i \(-0.788854\pi\)
−0.787943 + 0.615748i \(0.788854\pi\)
\(858\) −2.86438 + 1.04282i −0.0977885 + 0.0356014i
\(859\) 15.3042 0.522171 0.261085 0.965316i \(-0.415920\pi\)
0.261085 + 0.965316i \(0.415920\pi\)
\(860\) 33.1848i 1.13159i
\(861\) 9.15455 0.311986
\(862\) 6.71854 0.228834
\(863\) 19.8449i 0.675529i 0.941231 + 0.337764i \(0.109671\pi\)
−0.941231 + 0.337764i \(0.890329\pi\)
\(864\) 2.70037i 0.0918683i
\(865\) 7.85568i 0.267101i
\(866\) 6.89199i 0.234199i
\(867\) 14.6496 0.497528
\(868\) 3.48429 0.118264
\(869\) 23.7820i 0.806749i
\(870\) −2.60681 −0.0883792
\(871\) −18.2857 50.2266i −0.619589 1.70186i
\(872\) 4.56604 0.154626
\(873\) 11.3240i 0.383261i
\(874\) −6.73266 −0.227736
\(875\) 3.89995 0.131842
\(876\) 28.3400i 0.957520i
\(877\) 13.5699i 0.458224i −0.973400 0.229112i \(-0.926418\pi\)
0.973400 0.229112i \(-0.0735822\pi\)
\(878\) 4.35791i 0.147072i
\(879\) 7.14560i 0.241015i
\(880\) −39.2115 −1.32182
\(881\) 25.5331 0.860232 0.430116 0.902774i \(-0.358473\pi\)
0.430116 + 0.902774i \(0.358473\pi\)
\(882\) 0.233455i 0.00786084i
\(883\) −0.102030 −0.00343357 −0.00171679 0.999999i \(-0.500546\pi\)
−0.00171679 + 0.999999i \(0.500546\pi\)
\(884\) −10.1052 + 3.67893i −0.339873 + 0.123736i
\(885\) 14.2723 0.479757
\(886\) 3.55645i 0.119481i
\(887\) 25.1339 0.843914 0.421957 0.906616i \(-0.361343\pi\)
0.421957 + 0.906616i \(0.361343\pi\)
\(888\) −6.67143 −0.223879
\(889\) 10.4903i 0.351832i
\(890\) 0.437612i 0.0146688i
\(891\) 3.62146i 0.121324i
\(892\) 10.6068i 0.355142i
\(893\) 29.7442 0.995353
\(894\) −2.94794 −0.0985939
\(895\) 33.0896i 1.10606i
\(896\) 6.96990 0.232848
\(897\) 23.8308 8.67596i 0.795687 0.289682i
\(898\) 2.63233 0.0878419
\(899\) 6.78939i 0.226439i
\(900\) −7.15158 −0.238386
\(901\) −20.4560 −0.681487
\(902\) 7.73970i 0.257704i
\(903\) 5.79095i 0.192711i
\(904\) 3.49183i 0.116136i
\(905\) 28.2235i 0.938179i
\(906\) 4.31561 0.143377
\(907\) −20.5789 −0.683312 −0.341656 0.939825i \(-0.610988\pi\)
−0.341656 + 0.939825i \(0.610988\pi\)
\(908\) 52.7489i 1.75053i
\(909\) −6.04880 −0.200626
\(910\) 0.848175 + 2.32973i 0.0281167 + 0.0772299i
\(911\) 23.1782 0.767928 0.383964 0.923348i \(-0.374559\pi\)
0.383964 + 0.923348i \(0.374559\pi\)
\(912\) 15.0716i 0.499072i
\(913\) −26.2723 −0.869485
\(914\) −5.60837 −0.185509
\(915\) 8.17674i 0.270315i
\(916\) 34.0303i 1.12439i
\(917\) 5.35193i 0.176736i
\(918\) 0.357908i 0.0118127i
\(919\) 10.7083 0.353233 0.176617 0.984280i \(-0.443485\pi\)
0.176617 + 0.984280i \(0.443485\pi\)
\(920\) −19.0835 −0.629165
\(921\) 10.4092i 0.342993i
\(922\) 0.446279 0.0146974
\(923\) −4.46691 12.2695i −0.147030 0.403857i
\(924\) −7.04555 −0.231782
\(925\) 26.6247i 0.875415i
\(926\) 3.55436 0.116803
\(927\) 18.6670 0.613105
\(928\) 10.2369i 0.336044i
\(929\) 46.0083i 1.50948i −0.656022 0.754742i \(-0.727762\pi\)
0.656022 0.754742i \(-0.272238\pi\)
\(930\) 1.23153i 0.0403834i
\(931\) 4.10005i 0.134374i
\(932\) 25.9587 0.850307
\(933\) −4.51571 −0.147838
\(934\) 7.24838i 0.237174i
\(935\) −16.3535 −0.534816
\(936\) 1.13613 + 3.12068i 0.0371356 + 0.102003i
\(937\) −24.4256 −0.797951 −0.398976 0.916962i \(-0.630634\pi\)
−0.398976 + 0.916962i \(0.630634\pi\)
\(938\) 3.46093i 0.113003i
\(939\) 21.6242 0.705679
\(940\) 41.5722 1.35594
\(941\) 41.5757i 1.35533i 0.735372 + 0.677664i \(0.237008\pi\)
−0.735372 + 0.677664i \(0.762992\pi\)
\(942\) 0.248905i 0.00810976i
\(943\) 64.3919i 2.09689i
\(944\) 17.8117i 0.579721i
\(945\) −2.94550 −0.0958171
\(946\) −4.89595 −0.159181
\(947\) 14.6697i 0.476702i 0.971179 + 0.238351i \(0.0766069\pi\)
−0.971179 + 0.238351i \(0.923393\pi\)
\(948\) −12.7760 −0.414946
\(949\) −17.9677 49.3530i −0.583256 1.60206i
\(950\) 3.51855 0.114157
\(951\) 16.8275i 0.545671i
\(952\) 1.41212 0.0457672
\(953\) 47.5083 1.53895 0.769473 0.638680i \(-0.220519\pi\)
0.769473 + 0.638680i \(0.220519\pi\)
\(954\) 3.11498i 0.100851i
\(955\) 23.2429i 0.752123i
\(956\) 24.8156i 0.802593i
\(957\) 13.7288i 0.443788i
\(958\) 9.25216 0.298924
\(959\) 11.6936 0.377607
\(960\) 19.7982i 0.638984i
\(961\) 27.7925 0.896533
\(962\) −5.72877 + 2.08565i −0.184703 + 0.0672439i
\(963\) −4.82482 −0.155478
\(964\) 19.3553i 0.623392i
\(965\) −17.3519 −0.558578
\(966\) −1.64209 −0.0528335
\(967\) 11.0249i 0.354537i 0.984162 + 0.177269i \(0.0567262\pi\)
−0.984162 + 0.177269i \(0.943274\pi\)
\(968\) 1.94810i 0.0626145i
\(969\) 6.28575i 0.201927i
\(970\) 7.78688i 0.250022i
\(971\) 34.4858 1.10670 0.553352 0.832948i \(-0.313349\pi\)
0.553352 + 0.832948i \(0.313349\pi\)
\(972\) −1.94550 −0.0624019
\(973\) 14.6670i 0.470203i
\(974\) 1.38074 0.0442416
\(975\) −12.4542 + 4.53413i −0.398853 + 0.145209i
\(976\) 10.2045 0.326639
\(977\) 46.5797i 1.49022i −0.666944 0.745108i \(-0.732398\pi\)
0.666944 0.745108i \(-0.267602\pi\)
\(978\) 5.47289 0.175004
\(979\) −2.30468 −0.0736580
\(980\) 5.73046i 0.183053i
\(981\) 4.95718i 0.158270i
\(982\) 9.47986i 0.302515i
\(983\) 47.9704i 1.53002i −0.644019 0.765009i \(-0.722734\pi\)
0.644019 0.765009i \(-0.277266\pi\)
\(984\) −8.43223 −0.268810
\(985\) 56.4197 1.79768
\(986\) 1.35681i 0.0432096i
\(987\) 7.25460 0.230917
\(988\) 9.83883 + 27.0249i 0.313015 + 0.859777i
\(989\) 40.7328 1.29523
\(990\) 2.49027i 0.0791459i
\(991\) −53.1160 −1.68729 −0.843643 0.536905i \(-0.819593\pi\)
−0.843643 + 0.536905i \(0.819593\pi\)
\(992\) −4.83621 −0.153550
\(993\) 36.1355i 1.14672i
\(994\) 0.845448i 0.0268160i
\(995\) 24.1534i 0.765714i
\(996\) 14.1138i 0.447213i
\(997\) −56.7238 −1.79646 −0.898231 0.439524i \(-0.855147\pi\)
−0.898231 + 0.439524i \(0.855147\pi\)
\(998\) 6.53256 0.206785
\(999\) 7.24292i 0.229156i
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 273.2.c.c.64.4 8
3.2 odd 2 819.2.c.d.64.5 8
4.3 odd 2 4368.2.h.q.337.3 8
7.6 odd 2 1911.2.c.l.883.4 8
13.5 odd 4 3549.2.a.x.1.2 4
13.8 odd 4 3549.2.a.v.1.3 4
13.12 even 2 inner 273.2.c.c.64.5 yes 8
39.38 odd 2 819.2.c.d.64.4 8
52.51 odd 2 4368.2.h.q.337.6 8
91.90 odd 2 1911.2.c.l.883.5 8
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
273.2.c.c.64.4 8 1.1 even 1 trivial
273.2.c.c.64.5 yes 8 13.12 even 2 inner
819.2.c.d.64.4 8 39.38 odd 2
819.2.c.d.64.5 8 3.2 odd 2
1911.2.c.l.883.4 8 7.6 odd 2
1911.2.c.l.883.5 8 91.90 odd 2
3549.2.a.v.1.3 4 13.8 odd 4
3549.2.a.x.1.2 4 13.5 odd 4
4368.2.h.q.337.3 8 4.3 odd 2
4368.2.h.q.337.6 8 52.51 odd 2