Properties

Label 280.2.h.a.251.7
Level $280$
Weight $2$
Character 280.251
Analytic conductor $2.236$
Analytic rank $0$
Dimension $16$
CM no
Inner twists $2$

Related objects

Downloads

Learn more

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [280,2,Mod(251,280)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(280, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([1, 1, 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("280.251");
 
S:= CuspForms(chi, 2);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 280 = 2^{3} \cdot 5 \cdot 7 \)
Weight: \( k \) \(=\) \( 2 \)
Character orbit: \([\chi]\) \(=\) 280.h (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: \(2.23581125660\)
Analytic rank: \(0\)
Dimension: \(16\)
Coefficient field: \(\mathbb{Q}[x]/(x^{16} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{16} - x^{15} - 2x^{12} + 6x^{11} - 12x^{9} + 8x^{8} - 24x^{7} + 48x^{5} - 32x^{4} - 128x + 256 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{7}]\)
Coefficient ring index: \( 2^{4} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 251.7
Root \(-0.275585 + 1.38710i\) of defining polynomial
Character \(\chi\) \(=\) 280.251
Dual form 280.2.h.a.251.8

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-0.275585 - 1.38710i) q^{2} +3.19977i q^{3} +(-1.84811 + 0.764529i) q^{4} -1.00000 q^{5} +(4.43840 - 0.881807i) q^{6} +(2.59303 + 0.525543i) q^{7} +(1.56979 + 2.35282i) q^{8} -7.23851 q^{9} +O(q^{10})\) \(q+(-0.275585 - 1.38710i) q^{2} +3.19977i q^{3} +(-1.84811 + 0.764529i) q^{4} -1.00000 q^{5} +(4.43840 - 0.881807i) q^{6} +(2.59303 + 0.525543i) q^{7} +(1.56979 + 2.35282i) q^{8} -7.23851 q^{9} +(0.275585 + 1.38710i) q^{10} -3.34588 q^{11} +(-2.44631 - 5.91351i) q^{12} -3.90251 q^{13} +(0.0143823 - 3.74163i) q^{14} -3.19977i q^{15} +(2.83099 - 2.82586i) q^{16} +2.92992i q^{17} +(1.99482 + 10.0406i) q^{18} +6.33672i q^{19} +(1.84811 - 0.764529i) q^{20} +(-1.68161 + 8.29709i) q^{21} +(0.922074 + 4.64108i) q^{22} -3.44642i q^{23} +(-7.52847 + 5.02296i) q^{24} +1.00000 q^{25} +(1.07547 + 5.41319i) q^{26} -13.5622i q^{27} +(-5.19399 + 1.01119i) q^{28} +2.68130i q^{29} +(-4.43840 + 0.881807i) q^{30} +2.52241 q^{31} +(-4.69994 - 3.14811i) q^{32} -10.7060i q^{33} +(4.06411 - 0.807443i) q^{34} +(-2.59303 - 0.525543i) q^{35} +(13.3775 - 5.53405i) q^{36} +4.70905i q^{37} +(8.78968 - 1.74630i) q^{38} -12.4871i q^{39} +(-1.56979 - 2.35282i) q^{40} +5.59232i q^{41} +(11.9723 + 0.0460200i) q^{42} +8.62439 q^{43} +(6.18354 - 2.55802i) q^{44} +7.23851 q^{45} +(-4.78054 + 0.949782i) q^{46} +0.506742 q^{47} +(9.04209 + 9.05851i) q^{48} +(6.44761 + 2.72550i) q^{49} +(-0.275585 - 1.38710i) q^{50} -9.37508 q^{51} +(7.21226 - 2.98358i) q^{52} -11.4136i q^{53} +(-18.8122 + 3.73755i) q^{54} +3.34588 q^{55} +(2.83400 + 6.92592i) q^{56} -20.2760 q^{57} +(3.71924 - 0.738926i) q^{58} -0.802275i q^{59} +(2.44631 + 5.91351i) q^{60} +7.97236 q^{61} +(-0.695136 - 3.49883i) q^{62} +(-18.7697 - 3.80415i) q^{63} +(-3.07152 + 7.38686i) q^{64} +3.90251 q^{65} +(-14.8504 + 2.95042i) q^{66} +6.37503 q^{67} +(-2.24001 - 5.41481i) q^{68} +11.0278 q^{69} +(-0.0143823 + 3.74163i) q^{70} -1.11901i q^{71} +(-11.3629 - 17.0309i) q^{72} +5.91619i q^{73} +(6.53194 - 1.29774i) q^{74} +3.19977i q^{75} +(-4.84460 - 11.7109i) q^{76} +(-8.67597 - 1.75840i) q^{77} +(-17.3209 + 3.44126i) q^{78} +10.5412i q^{79} +(-2.83099 + 2.82586i) q^{80} +21.6805 q^{81} +(7.75712 - 1.54116i) q^{82} +4.29261i q^{83} +(-3.23556 - 16.6195i) q^{84} -2.92992i q^{85} +(-2.37675 - 11.9629i) q^{86} -8.57954 q^{87} +(-5.25233 - 7.87226i) q^{88} +2.00722i q^{89} +(-1.99482 - 10.0406i) q^{90} +(-10.1193 - 2.05094i) q^{91} +(2.63489 + 6.36936i) q^{92} +8.07111i q^{93} +(-0.139650 - 0.702903i) q^{94} -6.33672i q^{95} +(10.0732 - 15.0387i) q^{96} -6.06903i q^{97} +(2.00368 - 9.69460i) q^{98} +24.2192 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 16 q + q^{2} + q^{4} - 16 q^{5} + q^{8} - 16 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 16 q + q^{2} + q^{4} - 16 q^{5} + q^{8} - 16 q^{9} - q^{10} - 4 q^{11} - 14 q^{12} + 7 q^{14} + 9 q^{16} - 15 q^{18} - q^{20} + 4 q^{21} + 6 q^{22} - 22 q^{24} + 16 q^{25} + 20 q^{26} - 3 q^{28} + 16 q^{31} - 19 q^{32} + 14 q^{34} + 15 q^{36} + 30 q^{38} - q^{40} + 20 q^{42} - 4 q^{43} - 20 q^{44} + 16 q^{45} + 6 q^{46} + 34 q^{48} - 8 q^{49} + q^{50} - 40 q^{51} + 38 q^{52} - 26 q^{54} + 4 q^{55} + q^{56} - 16 q^{57} + 18 q^{58} + 14 q^{60} + 8 q^{61} - 28 q^{62} - 28 q^{63} - 23 q^{64} - 46 q^{66} + 20 q^{67} - 12 q^{68} + 40 q^{69} - 7 q^{70} - 13 q^{72} - 28 q^{74} - 34 q^{76} + 4 q^{77} - 6 q^{78} - 9 q^{80} + 24 q^{81} + 16 q^{82} + 10 q^{84} - 24 q^{86} - 72 q^{87} - 44 q^{88} + 15 q^{90} - 32 q^{91} - 30 q^{92} + 58 q^{94} + 30 q^{96} - 39 q^{98} + 20 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/280\mathbb{Z}\right)^\times\).

\(n\) \(57\) \(71\) \(141\) \(241\)
\(\chi(n)\) \(1\) \(-1\) \(-1\) \(-1\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −0.275585 1.38710i −0.194868 0.980830i
\(3\) 3.19977i 1.84739i 0.383133 + 0.923693i \(0.374845\pi\)
−0.383133 + 0.923693i \(0.625155\pi\)
\(4\) −1.84811 + 0.764529i −0.924053 + 0.382264i
\(5\) −1.00000 −0.447214
\(6\) 4.43840 0.881807i 1.81197 0.359996i
\(7\) 2.59303 + 0.525543i 0.980073 + 0.198637i
\(8\) 1.56979 + 2.35282i 0.555004 + 0.831847i
\(9\) −7.23851 −2.41284
\(10\) 0.275585 + 1.38710i 0.0871476 + 0.438640i
\(11\) −3.34588 −1.00882 −0.504411 0.863464i \(-0.668290\pi\)
−0.504411 + 0.863464i \(0.668290\pi\)
\(12\) −2.44631 5.91351i −0.706190 1.70708i
\(13\) −3.90251 −1.08236 −0.541181 0.840906i \(-0.682023\pi\)
−0.541181 + 0.840906i \(0.682023\pi\)
\(14\) 0.0143823 3.74163i 0.00384383 0.999993i
\(15\) 3.19977i 0.826176i
\(16\) 2.83099 2.82586i 0.707748 0.706465i
\(17\) 2.92992i 0.710611i 0.934750 + 0.355306i \(0.115623\pi\)
−0.934750 + 0.355306i \(0.884377\pi\)
\(18\) 1.99482 + 10.0406i 0.470184 + 2.36658i
\(19\) 6.33672i 1.45374i 0.686774 + 0.726871i \(0.259026\pi\)
−0.686774 + 0.726871i \(0.740974\pi\)
\(20\) 1.84811 0.764529i 0.413249 0.170954i
\(21\) −1.68161 + 8.29709i −0.366958 + 1.81057i
\(22\) 0.922074 + 4.64108i 0.196587 + 0.989481i
\(23\) 3.44642i 0.718629i −0.933216 0.359315i \(-0.883010\pi\)
0.933216 0.359315i \(-0.116990\pi\)
\(24\) −7.52847 + 5.02296i −1.53674 + 1.02531i
\(25\) 1.00000 0.200000
\(26\) 1.07547 + 5.41319i 0.210918 + 1.06161i
\(27\) 13.5622i 2.61005i
\(28\) −5.19399 + 1.01119i −0.981571 + 0.191096i
\(29\) 2.68130i 0.497905i 0.968516 + 0.248952i \(0.0800863\pi\)
−0.968516 + 0.248952i \(0.919914\pi\)
\(30\) −4.43840 + 0.881807i −0.810338 + 0.160995i
\(31\) 2.52241 0.453037 0.226519 0.974007i \(-0.427266\pi\)
0.226519 + 0.974007i \(0.427266\pi\)
\(32\) −4.69994 3.14811i −0.830839 0.556513i
\(33\) 10.7060i 1.86368i
\(34\) 4.06411 0.807443i 0.696988 0.138475i
\(35\) −2.59303 0.525543i −0.438302 0.0888330i
\(36\) 13.3775 5.53405i 2.22959 0.922341i
\(37\) 4.70905i 0.774164i 0.922045 + 0.387082i \(0.126517\pi\)
−0.922045 + 0.387082i \(0.873483\pi\)
\(38\) 8.78968 1.74630i 1.42587 0.283288i
\(39\) 12.4871i 1.99954i
\(40\) −1.56979 2.35282i −0.248206 0.372013i
\(41\) 5.59232i 0.873374i 0.899614 + 0.436687i \(0.143848\pi\)
−0.899614 + 0.436687i \(0.856152\pi\)
\(42\) 11.9723 + 0.0460200i 1.84737 + 0.00710104i
\(43\) 8.62439 1.31521 0.657604 0.753364i \(-0.271570\pi\)
0.657604 + 0.753364i \(0.271570\pi\)
\(44\) 6.18354 2.55802i 0.932204 0.385636i
\(45\) 7.23851 1.07905
\(46\) −4.78054 + 0.949782i −0.704853 + 0.140038i
\(47\) 0.506742 0.0739159 0.0369580 0.999317i \(-0.488233\pi\)
0.0369580 + 0.999317i \(0.488233\pi\)
\(48\) 9.04209 + 9.05851i 1.30511 + 1.30748i
\(49\) 6.44761 + 2.72550i 0.921087 + 0.389357i
\(50\) −0.275585 1.38710i −0.0389736 0.196166i
\(51\) −9.37508 −1.31277
\(52\) 7.21226 2.98358i 1.00016 0.413749i
\(53\) 11.4136i 1.56777i −0.620904 0.783886i \(-0.713235\pi\)
0.620904 0.783886i \(-0.286765\pi\)
\(54\) −18.8122 + 3.73755i −2.56002 + 0.508616i
\(55\) 3.34588 0.451159
\(56\) 2.83400 + 6.92592i 0.378710 + 0.925516i
\(57\) −20.2760 −2.68562
\(58\) 3.71924 0.738926i 0.488360 0.0970257i
\(59\) 0.802275i 0.104447i −0.998635 0.0522236i \(-0.983369\pi\)
0.998635 0.0522236i \(-0.0166309\pi\)
\(60\) 2.44631 + 5.91351i 0.315818 + 0.763431i
\(61\) 7.97236 1.02076 0.510378 0.859950i \(-0.329506\pi\)
0.510378 + 0.859950i \(0.329506\pi\)
\(62\) −0.695136 3.49883i −0.0882824 0.444352i
\(63\) −18.7697 3.80415i −2.36476 0.479277i
\(64\) −3.07152 + 7.38686i −0.383940 + 0.923358i
\(65\) 3.90251 0.484047
\(66\) −14.8504 + 2.95042i −1.82795 + 0.363172i
\(67\) 6.37503 0.778834 0.389417 0.921062i \(-0.372677\pi\)
0.389417 + 0.921062i \(0.372677\pi\)
\(68\) −2.24001 5.41481i −0.271641 0.656642i
\(69\) 11.0278 1.32759
\(70\) −0.0143823 + 3.74163i −0.00171901 + 0.447210i
\(71\) 1.11901i 0.132802i −0.997793 0.0664011i \(-0.978848\pi\)
0.997793 0.0664011i \(-0.0211517\pi\)
\(72\) −11.3629 17.0309i −1.33913 2.00711i
\(73\) 5.91619i 0.692438i 0.938154 + 0.346219i \(0.112535\pi\)
−0.938154 + 0.346219i \(0.887465\pi\)
\(74\) 6.53194 1.29774i 0.759323 0.150860i
\(75\) 3.19977i 0.369477i
\(76\) −4.84460 11.7109i −0.555714 1.34334i
\(77\) −8.67597 1.75840i −0.988719 0.200389i
\(78\) −17.3209 + 3.44126i −1.96121 + 0.389646i
\(79\) 10.5412i 1.18598i 0.805211 + 0.592989i \(0.202052\pi\)
−0.805211 + 0.592989i \(0.797948\pi\)
\(80\) −2.83099 + 2.82586i −0.316515 + 0.315941i
\(81\) 21.6805 2.40894
\(82\) 7.75712 1.54116i 0.856631 0.170192i
\(83\) 4.29261i 0.471175i 0.971853 + 0.235588i \(0.0757014\pi\)
−0.971853 + 0.235588i \(0.924299\pi\)
\(84\) −3.23556 16.6195i −0.353029 1.81334i
\(85\) 2.92992i 0.317795i
\(86\) −2.37675 11.9629i −0.256292 1.28999i
\(87\) −8.57954 −0.919823
\(88\) −5.25233 7.87226i −0.559900 0.839185i
\(89\) 2.00722i 0.212764i 0.994325 + 0.106382i \(0.0339267\pi\)
−0.994325 + 0.106382i \(0.966073\pi\)
\(90\) −1.99482 10.0406i −0.210273 1.05837i
\(91\) −10.1193 2.05094i −1.06079 0.214997i
\(92\) 2.63489 + 6.36936i 0.274706 + 0.664052i
\(93\) 8.07111i 0.836935i
\(94\) −0.139650 0.702903i −0.0144038 0.0724989i
\(95\) 6.33672i 0.650134i
\(96\) 10.0732 15.0387i 1.02809 1.53488i
\(97\) 6.06903i 0.616217i −0.951351 0.308108i \(-0.900304\pi\)
0.951351 0.308108i \(-0.0996959\pi\)
\(98\) 2.00368 9.69460i 0.202402 0.979302i
\(99\) 24.2192 2.43412
\(100\) −1.84811 + 0.764529i −0.184811 + 0.0764529i
\(101\) −11.2324 −1.11767 −0.558834 0.829279i \(-0.688751\pi\)
−0.558834 + 0.829279i \(0.688751\pi\)
\(102\) 2.58363 + 13.0042i 0.255817 + 1.28761i
\(103\) −0.403587 −0.0397667 −0.0198833 0.999802i \(-0.506329\pi\)
−0.0198833 + 0.999802i \(0.506329\pi\)
\(104\) −6.12613 9.18191i −0.600716 0.900361i
\(105\) 1.68161 8.29709i 0.164109 0.809713i
\(106\) −15.8318 + 3.14540i −1.53772 + 0.305508i
\(107\) 17.9070 1.73114 0.865568 0.500791i \(-0.166957\pi\)
0.865568 + 0.500791i \(0.166957\pi\)
\(108\) 10.3687 + 25.0645i 0.997730 + 2.41183i
\(109\) 14.4062i 1.37986i 0.723874 + 0.689932i \(0.242359\pi\)
−0.723874 + 0.689932i \(0.757641\pi\)
\(110\) −0.922074 4.64108i −0.0879163 0.442510i
\(111\) −15.0679 −1.43018
\(112\) 8.82596 5.83973i 0.833975 0.551803i
\(113\) −6.85909 −0.645249 −0.322625 0.946527i \(-0.604565\pi\)
−0.322625 + 0.946527i \(0.604565\pi\)
\(114\) 5.58776 + 28.1249i 0.523342 + 2.63414i
\(115\) 3.44642i 0.321381i
\(116\) −2.04993 4.95533i −0.190331 0.460091i
\(117\) 28.2484 2.61156
\(118\) −1.11284 + 0.221095i −0.102445 + 0.0203534i
\(119\) −1.53980 + 7.59738i −0.141153 + 0.696451i
\(120\) 7.52847 5.02296i 0.687253 0.458531i
\(121\) 0.194920 0.0177200
\(122\) −2.19706 11.0585i −0.198913 1.00119i
\(123\) −17.8941 −1.61346
\(124\) −4.66167 + 1.92845i −0.418630 + 0.173180i
\(125\) −1.00000 −0.0894427
\(126\) −0.104106 + 27.0838i −0.00927453 + 2.41282i
\(127\) 5.87400i 0.521233i −0.965442 0.260617i \(-0.916074\pi\)
0.965442 0.260617i \(-0.0839259\pi\)
\(128\) 11.0928 + 2.22481i 0.980474 + 0.196647i
\(129\) 27.5960i 2.42970i
\(130\) −1.07547 5.41319i −0.0943253 0.474768i
\(131\) 4.47680i 0.391139i 0.980690 + 0.195570i \(0.0626556\pi\)
−0.980690 + 0.195570i \(0.937344\pi\)
\(132\) 8.18507 + 19.7859i 0.712419 + 1.72214i
\(133\) −3.33022 + 16.4313i −0.288767 + 1.42477i
\(134\) −1.75686 8.84282i −0.151770 0.763903i
\(135\) 13.5622i 1.16725i
\(136\) −6.89358 + 4.59936i −0.591120 + 0.394392i
\(137\) 7.90390 0.675276 0.337638 0.941276i \(-0.390372\pi\)
0.337638 + 0.941276i \(0.390372\pi\)
\(138\) −3.03908 15.2966i −0.258704 1.30214i
\(139\) 9.80123i 0.831329i −0.909518 0.415665i \(-0.863549\pi\)
0.909518 0.415665i \(-0.136451\pi\)
\(140\) 5.19399 1.01119i 0.438972 0.0854609i
\(141\) 1.62146i 0.136551i
\(142\) −1.55218 + 0.308382i −0.130256 + 0.0258789i
\(143\) 13.0573 1.09191
\(144\) −20.4922 + 20.4550i −1.70768 + 1.70458i
\(145\) 2.68130i 0.222670i
\(146\) 8.20636 1.63041i 0.679164 0.134934i
\(147\) −8.72096 + 20.6308i −0.719292 + 1.70160i
\(148\) −3.60021 8.70283i −0.295935 0.715368i
\(149\) 11.5613i 0.947135i −0.880758 0.473567i \(-0.842966\pi\)
0.880758 0.473567i \(-0.157034\pi\)
\(150\) 4.43840 0.881807i 0.362394 0.0719992i
\(151\) 0.509248i 0.0414420i −0.999785 0.0207210i \(-0.993404\pi\)
0.999785 0.0207210i \(-0.00659617\pi\)
\(152\) −14.9092 + 9.94731i −1.20929 + 0.806834i
\(153\) 21.2083i 1.71459i
\(154\) −0.0481214 + 12.5190i −0.00387774 + 1.00881i
\(155\) −2.52241 −0.202604
\(156\) 9.54677 + 23.0776i 0.764354 + 1.84768i
\(157\) −9.98993 −0.797283 −0.398642 0.917107i \(-0.630518\pi\)
−0.398642 + 0.917107i \(0.630518\pi\)
\(158\) 14.6217 2.90500i 1.16324 0.231109i
\(159\) 36.5207 2.89628
\(160\) 4.69994 + 3.14811i 0.371563 + 0.248880i
\(161\) 1.81124 8.93668i 0.142746 0.704309i
\(162\) −5.97481 30.0730i −0.469425 2.36276i
\(163\) 19.7736 1.54879 0.774393 0.632705i \(-0.218056\pi\)
0.774393 + 0.632705i \(0.218056\pi\)
\(164\) −4.27549 10.3352i −0.333860 0.807044i
\(165\) 10.7060i 0.833464i
\(166\) 5.95429 1.18298i 0.462142 0.0918169i
\(167\) 20.6423 1.59735 0.798673 0.601765i \(-0.205536\pi\)
0.798673 + 0.601765i \(0.205536\pi\)
\(168\) −22.1613 + 9.06815i −1.70978 + 0.699623i
\(169\) 2.22962 0.171509
\(170\) −4.06411 + 0.807443i −0.311703 + 0.0619280i
\(171\) 45.8684i 3.50764i
\(172\) −15.9388 + 6.59360i −1.21532 + 0.502757i
\(173\) −12.1166 −0.921205 −0.460602 0.887607i \(-0.652367\pi\)
−0.460602 + 0.887607i \(0.652367\pi\)
\(174\) 2.36439 + 11.9007i 0.179244 + 0.902189i
\(175\) 2.59303 + 0.525543i 0.196015 + 0.0397273i
\(176\) −9.47216 + 9.45499i −0.713991 + 0.712697i
\(177\) 2.56709 0.192954
\(178\) 2.78421 0.553158i 0.208686 0.0414610i
\(179\) −14.6327 −1.09370 −0.546851 0.837230i \(-0.684173\pi\)
−0.546851 + 0.837230i \(0.684173\pi\)
\(180\) −13.3775 + 5.53405i −0.997102 + 0.412483i
\(181\) −23.1384 −1.71986 −0.859932 0.510408i \(-0.829494\pi\)
−0.859932 + 0.510408i \(0.829494\pi\)
\(182\) −0.0561271 + 14.6018i −0.00416042 + 1.08235i
\(183\) 25.5097i 1.88573i
\(184\) 8.10882 5.41016i 0.597790 0.398842i
\(185\) 4.70905i 0.346217i
\(186\) 11.1955 2.22427i 0.820890 0.163092i
\(187\) 9.80318i 0.716879i
\(188\) −0.936513 + 0.387419i −0.0683022 + 0.0282554i
\(189\) 7.12754 35.1673i 0.518452 2.55804i
\(190\) −8.78968 + 1.74630i −0.637670 + 0.126690i
\(191\) 2.41554i 0.174782i 0.996174 + 0.0873911i \(0.0278530\pi\)
−0.996174 + 0.0873911i \(0.972147\pi\)
\(192\) −23.6362 9.82816i −1.70580 0.709286i
\(193\) −7.38549 −0.531619 −0.265810 0.964026i \(-0.585639\pi\)
−0.265810 + 0.964026i \(0.585639\pi\)
\(194\) −8.41837 + 1.67253i −0.604403 + 0.120081i
\(195\) 12.4871i 0.894222i
\(196\) −13.9996 0.107626i −0.999970 0.00768760i
\(197\) 20.9305i 1.49124i −0.666372 0.745619i \(-0.732154\pi\)
0.666372 0.745619i \(-0.267846\pi\)
\(198\) −6.67444 33.5945i −0.474332 2.38746i
\(199\) 4.89644 0.347099 0.173550 0.984825i \(-0.444476\pi\)
0.173550 + 0.984825i \(0.444476\pi\)
\(200\) 1.56979 + 2.35282i 0.111001 + 0.166369i
\(201\) 20.3986i 1.43881i
\(202\) 3.09549 + 15.5805i 0.217798 + 1.09624i
\(203\) −1.40914 + 6.95269i −0.0989021 + 0.487983i
\(204\) 17.3261 7.16751i 1.21307 0.501826i
\(205\) 5.59232i 0.390585i
\(206\) 0.111223 + 0.559817i 0.00774924 + 0.0390043i
\(207\) 24.9470i 1.73393i
\(208\) −11.0480 + 11.0280i −0.766040 + 0.764651i
\(209\) 21.2019i 1.46657i
\(210\) −11.9723 0.0460200i −0.826170 0.00317568i
\(211\) 2.25447 0.155204 0.0776020 0.996984i \(-0.475274\pi\)
0.0776020 + 0.996984i \(0.475274\pi\)
\(212\) 8.72599 + 21.0935i 0.599303 + 1.44870i
\(213\) 3.58058 0.245337
\(214\) −4.93490 24.8389i −0.337343 1.69795i
\(215\) −8.62439 −0.588179
\(216\) 31.9095 21.2899i 2.17117 1.44859i
\(217\) 6.54067 + 1.32563i 0.444010 + 0.0899898i
\(218\) 19.9829 3.97013i 1.35341 0.268891i
\(219\) −18.9304 −1.27920
\(220\) −6.18354 + 2.55802i −0.416894 + 0.172462i
\(221\) 11.4341i 0.769139i
\(222\) 4.15248 + 20.9007i 0.278696 + 1.40276i
\(223\) −24.4820 −1.63944 −0.819718 0.572768i \(-0.805870\pi\)
−0.819718 + 0.572768i \(0.805870\pi\)
\(224\) −10.5326 10.6332i −0.703739 0.710458i
\(225\) −7.23851 −0.482567
\(226\) 1.89026 + 9.51426i 0.125738 + 0.632879i
\(227\) 5.16178i 0.342599i −0.985219 0.171300i \(-0.945203\pi\)
0.985219 0.171300i \(-0.0547966\pi\)
\(228\) 37.4722 15.5016i 2.48166 1.02662i
\(229\) −9.48995 −0.627114 −0.313557 0.949569i \(-0.601521\pi\)
−0.313557 + 0.949569i \(0.601521\pi\)
\(230\) 4.78054 0.949782i 0.315220 0.0626268i
\(231\) 5.62648 27.7611i 0.370195 1.82655i
\(232\) −6.30862 + 4.20908i −0.414181 + 0.276339i
\(233\) −2.55217 −0.167198 −0.0835991 0.996499i \(-0.526642\pi\)
−0.0835991 + 0.996499i \(0.526642\pi\)
\(234\) −7.78482 39.1834i −0.508910 2.56150i
\(235\) −0.506742 −0.0330562
\(236\) 0.613362 + 1.48269i 0.0399265 + 0.0965148i
\(237\) −33.7294 −2.19096
\(238\) 10.9627 + 0.0421390i 0.710606 + 0.00273147i
\(239\) 8.15573i 0.527550i −0.964584 0.263775i \(-0.915032\pi\)
0.964584 0.263775i \(-0.0849677\pi\)
\(240\) −9.04209 9.05851i −0.583665 0.584725i
\(241\) 2.66753i 0.171831i −0.996302 0.0859155i \(-0.972619\pi\)
0.996302 0.0859155i \(-0.0273815\pi\)
\(242\) −0.0537170 0.270374i −0.00345306 0.0173803i
\(243\) 28.6857i 1.84019i
\(244\) −14.7338 + 6.09510i −0.943233 + 0.390199i
\(245\) −6.44761 2.72550i −0.411923 0.174126i
\(246\) 4.93135 + 24.8210i 0.314411 + 1.58253i
\(247\) 24.7291i 1.57348i
\(248\) 3.95964 + 5.93476i 0.251438 + 0.376858i
\(249\) −13.7353 −0.870442
\(250\) 0.275585 + 1.38710i 0.0174295 + 0.0877281i
\(251\) 8.52244i 0.537932i 0.963150 + 0.268966i \(0.0866819\pi\)
−0.963150 + 0.268966i \(0.913318\pi\)
\(252\) 37.5967 7.31948i 2.36837 0.461084i
\(253\) 11.5313i 0.724968i
\(254\) −8.14784 + 1.61879i −0.511241 + 0.101572i
\(255\) 9.37508 0.587090
\(256\) 0.0290305 16.0000i 0.00181440 0.999998i
\(257\) 14.1473i 0.882487i 0.897387 + 0.441244i \(0.145462\pi\)
−0.897387 + 0.441244i \(0.854538\pi\)
\(258\) 38.2785 7.60505i 2.38312 0.473470i
\(259\) −2.47481 + 12.2107i −0.153777 + 0.758737i
\(260\) −7.21226 + 2.98358i −0.447285 + 0.185034i
\(261\) 19.4086i 1.20136i
\(262\) 6.20977 1.23374i 0.383641 0.0762205i
\(263\) 31.1418i 1.92029i 0.279510 + 0.960143i \(0.409828\pi\)
−0.279510 + 0.960143i \(0.590172\pi\)
\(264\) 25.1894 16.8062i 1.55030 1.03435i
\(265\) 11.4136i 0.701129i
\(266\) 23.7097 + 0.0911365i 1.45373 + 0.00558794i
\(267\) −6.42262 −0.393058
\(268\) −11.7817 + 4.87389i −0.719684 + 0.297720i
\(269\) 1.39567 0.0850956 0.0425478 0.999094i \(-0.486453\pi\)
0.0425478 + 0.999094i \(0.486453\pi\)
\(270\) 18.8122 3.73755i 1.14487 0.227460i
\(271\) 22.4663 1.36473 0.682366 0.731011i \(-0.260951\pi\)
0.682366 + 0.731011i \(0.260951\pi\)
\(272\) 8.27956 + 8.29459i 0.502022 + 0.502934i
\(273\) 6.56253 32.3795i 0.397182 1.95970i
\(274\) −2.17820 10.9635i −0.131590 0.662331i
\(275\) −3.34588 −0.201764
\(276\) −20.3805 + 8.43103i −1.22676 + 0.507489i
\(277\) 12.0828i 0.725985i 0.931792 + 0.362993i \(0.118245\pi\)
−0.931792 + 0.362993i \(0.881755\pi\)
\(278\) −13.5953 + 2.70107i −0.815392 + 0.161999i
\(279\) −18.2584 −1.09310
\(280\) −2.83400 6.92592i −0.169364 0.413903i
\(281\) −5.84893 −0.348918 −0.174459 0.984664i \(-0.555818\pi\)
−0.174459 + 0.984664i \(0.555818\pi\)
\(282\) 2.24913 0.446849i 0.133933 0.0266094i
\(283\) 10.1804i 0.605164i 0.953123 + 0.302582i \(0.0978486\pi\)
−0.953123 + 0.302582i \(0.902151\pi\)
\(284\) 0.855516 + 2.06805i 0.0507655 + 0.122716i
\(285\) 20.2760 1.20105
\(286\) −3.59841 18.1119i −0.212778 1.07098i
\(287\) −2.93900 + 14.5011i −0.173484 + 0.855970i
\(288\) 34.0205 + 22.7876i 2.00468 + 1.34277i
\(289\) 8.41554 0.495032
\(290\) −3.71924 + 0.738926i −0.218401 + 0.0433912i
\(291\) 19.4195 1.13839
\(292\) −4.52310 10.9338i −0.264694 0.639849i
\(293\) 30.6832 1.79253 0.896266 0.443518i \(-0.146270\pi\)
0.896266 + 0.443518i \(0.146270\pi\)
\(294\) 31.0205 + 6.41131i 1.80915 + 0.373915i
\(295\) 0.802275i 0.0467102i
\(296\) −11.0796 + 7.39222i −0.643986 + 0.429664i
\(297\) 45.3776i 2.63308i
\(298\) −16.0366 + 3.18611i −0.928978 + 0.184566i
\(299\) 13.4497i 0.777817i
\(300\) −2.44631 5.91351i −0.141238 0.341417i
\(301\) 22.3633 + 4.53249i 1.28900 + 0.261248i
\(302\) −0.706379 + 0.140341i −0.0406475 + 0.00807571i
\(303\) 35.9412i 2.06477i
\(304\) 17.9067 + 17.9392i 1.02702 + 1.02888i
\(305\) −7.97236 −0.456496
\(306\) −29.4181 + 5.84468i −1.68172 + 0.334118i
\(307\) 25.8632i 1.47609i −0.674750 0.738046i \(-0.735749\pi\)
0.674750 0.738046i \(-0.264251\pi\)
\(308\) 17.3785 3.38331i 0.990230 0.192782i
\(309\) 1.29139i 0.0734644i
\(310\) 0.695136 + 3.49883i 0.0394811 + 0.198720i
\(311\) −10.8246 −0.613806 −0.306903 0.951741i \(-0.599293\pi\)
−0.306903 + 0.951741i \(0.599293\pi\)
\(312\) 29.3800 19.6022i 1.66331 1.10975i
\(313\) 27.8999i 1.57699i −0.615038 0.788497i \(-0.710859\pi\)
0.615038 0.788497i \(-0.289141\pi\)
\(314\) 2.75307 + 13.8571i 0.155365 + 0.781999i
\(315\) 18.7697 + 3.80415i 1.05755 + 0.214339i
\(316\) −8.05905 19.4813i −0.453357 1.09591i
\(317\) 7.49682i 0.421064i −0.977587 0.210532i \(-0.932480\pi\)
0.977587 0.210532i \(-0.0675195\pi\)
\(318\) −10.0646 50.6580i −0.564392 2.84076i
\(319\) 8.97131i 0.502297i
\(320\) 3.07152 7.38686i 0.171703 0.412938i
\(321\) 57.2983i 3.19808i
\(322\) −12.8952 0.0495675i −0.718624 0.00276229i
\(323\) −18.5661 −1.03305
\(324\) −40.0678 + 16.5753i −2.22599 + 0.920852i
\(325\) −3.90251 −0.216473
\(326\) −5.44930 27.4280i −0.301809 1.51909i
\(327\) −46.0965 −2.54914
\(328\) −13.1577 + 8.77876i −0.726514 + 0.484726i
\(329\) 1.31400 + 0.266315i 0.0724430 + 0.0146824i
\(330\) 14.8504 2.95042i 0.817486 0.162415i
\(331\) 12.3429 0.678429 0.339214 0.940709i \(-0.389839\pi\)
0.339214 + 0.940709i \(0.389839\pi\)
\(332\) −3.28182 7.93320i −0.180113 0.435391i
\(333\) 34.0865i 1.86793i
\(334\) −5.68869 28.6329i −0.311271 1.56672i
\(335\) −6.37503 −0.348305
\(336\) 18.6858 + 28.2410i 1.01939 + 1.54067i
\(337\) 30.1764 1.64382 0.821908 0.569620i \(-0.192910\pi\)
0.821908 + 0.569620i \(0.192910\pi\)
\(338\) −0.614449 3.09271i −0.0334216 0.168221i
\(339\) 21.9475i 1.19202i
\(340\) 2.24001 + 5.41481i 0.121482 + 0.293659i
\(341\) −8.43967 −0.457034
\(342\) −63.6241 + 12.6406i −3.44040 + 0.683527i
\(343\) 15.2865 + 10.4558i 0.825392 + 0.564560i
\(344\) 13.5385 + 20.2916i 0.729946 + 1.09405i
\(345\) −11.0278 −0.593714
\(346\) 3.33914 + 16.8069i 0.179513 + 0.903545i
\(347\) −21.3398 −1.14558 −0.572789 0.819703i \(-0.694139\pi\)
−0.572789 + 0.819703i \(0.694139\pi\)
\(348\) 15.8559 6.55930i 0.849965 0.351615i
\(349\) 16.3885 0.877255 0.438627 0.898669i \(-0.355465\pi\)
0.438627 + 0.898669i \(0.355465\pi\)
\(350\) 0.0143823 3.74163i 0.000768766 0.199999i
\(351\) 52.9268i 2.82502i
\(352\) 15.7254 + 10.5332i 0.838168 + 0.561422i
\(353\) 3.84670i 0.204739i −0.994746 0.102370i \(-0.967358\pi\)
0.994746 0.102370i \(-0.0326425\pi\)
\(354\) −0.707451 3.56082i −0.0376006 0.189255i
\(355\) 1.11901i 0.0593910i
\(356\) −1.53457 3.70955i −0.0813323 0.196606i
\(357\) −24.3099 4.92700i −1.28661 0.260765i
\(358\) 4.03256 + 20.2971i 0.213127 + 1.07273i
\(359\) 27.6613i 1.45991i 0.683495 + 0.729955i \(0.260459\pi\)
−0.683495 + 0.729955i \(0.739541\pi\)
\(360\) 11.3629 + 17.0309i 0.598879 + 0.897607i
\(361\) −21.1540 −1.11337
\(362\) 6.37660 + 32.0954i 0.335146 + 1.68689i
\(363\) 0.623698i 0.0327357i
\(364\) 20.2696 3.94617i 1.06242 0.206836i
\(365\) 5.91619i 0.309668i
\(366\) 35.3845 7.03008i 1.84958 0.367468i
\(367\) −2.94732 −0.153849 −0.0769244 0.997037i \(-0.524510\pi\)
−0.0769244 + 0.997037i \(0.524510\pi\)
\(368\) −9.73911 9.75680i −0.507686 0.508608i
\(369\) 40.4801i 2.10731i
\(370\) −6.53194 + 1.29774i −0.339579 + 0.0674665i
\(371\) 5.99831 29.5957i 0.311417 1.53653i
\(372\) −6.17059 14.9163i −0.319930 0.773372i
\(373\) 12.6247i 0.653683i −0.945079 0.326841i \(-0.894016\pi\)
0.945079 0.326841i \(-0.105984\pi\)
\(374\) −13.5980 + 2.70161i −0.703136 + 0.139697i
\(375\) 3.19977i 0.165235i
\(376\) 0.795478 + 1.19227i 0.0410236 + 0.0614868i
\(377\) 10.4638i 0.538914i
\(378\) −50.7449 0.195056i −2.61003 0.0100326i
\(379\) −20.9882 −1.07809 −0.539045 0.842277i \(-0.681215\pi\)
−0.539045 + 0.842277i \(0.681215\pi\)
\(380\) 4.84460 + 11.7109i 0.248523 + 0.600758i
\(381\) 18.7954 0.962919
\(382\) 3.35060 0.665686i 0.171432 0.0340595i
\(383\) 11.4237 0.583724 0.291862 0.956460i \(-0.405725\pi\)
0.291862 + 0.956460i \(0.405725\pi\)
\(384\) −7.11887 + 35.4944i −0.363283 + 1.81131i
\(385\) 8.67597 + 1.75840i 0.442168 + 0.0896166i
\(386\) 2.03533 + 10.2444i 0.103596 + 0.521428i
\(387\) −62.4277 −3.17338
\(388\) 4.63995 + 11.2162i 0.235558 + 0.569417i
\(389\) 22.7966i 1.15583i 0.816096 + 0.577917i \(0.196134\pi\)
−0.816096 + 0.577917i \(0.803866\pi\)
\(390\) 17.3209 3.44126i 0.877080 0.174255i
\(391\) 10.0978 0.510666
\(392\) 3.70878 + 19.4485i 0.187322 + 0.982299i
\(393\) −14.3247 −0.722586
\(394\) −29.0328 + 5.76814i −1.46265 + 0.290595i
\(395\) 10.5412i 0.530385i
\(396\) −44.7596 + 18.5163i −2.24926 + 0.930477i
\(397\) 29.8779 1.49953 0.749763 0.661706i \(-0.230167\pi\)
0.749763 + 0.661706i \(0.230167\pi\)
\(398\) −1.34938 6.79186i −0.0676385 0.340445i
\(399\) −52.5763 10.6559i −2.63211 0.533463i
\(400\) 2.83099 2.82586i 0.141550 0.141293i
\(401\) −16.8397 −0.840933 −0.420467 0.907308i \(-0.638134\pi\)
−0.420467 + 0.907308i \(0.638134\pi\)
\(402\) 28.2950 5.62154i 1.41122 0.280377i
\(403\) −9.84372 −0.490351
\(404\) 20.7587 8.58752i 1.03279 0.427245i
\(405\) −21.6805 −1.07731
\(406\) 10.0324 + 0.0385632i 0.497901 + 0.00191386i
\(407\) 15.7559i 0.780993i
\(408\) −14.7169 22.0579i −0.728595 1.09203i
\(409\) 26.9755i 1.33385i −0.745123 0.666927i \(-0.767609\pi\)
0.745123 0.666927i \(-0.232391\pi\)
\(410\) −7.75712 + 1.54116i −0.383097 + 0.0761124i
\(411\) 25.2906i 1.24750i
\(412\) 0.745872 0.308554i 0.0367465 0.0152014i
\(413\) 0.421630 2.08032i 0.0207470 0.102366i
\(414\) 34.6040 6.87501i 1.70069 0.337888i
\(415\) 4.29261i 0.210716i
\(416\) 18.3416 + 12.2856i 0.899269 + 0.602349i
\(417\) 31.3616 1.53579
\(418\) −29.4092 + 5.84292i −1.43845 + 0.285787i
\(419\) 15.0474i 0.735114i −0.930001 0.367557i \(-0.880194\pi\)
0.930001 0.367557i \(-0.119806\pi\)
\(420\) 3.23556 + 16.6195i 0.157879 + 0.810951i
\(421\) 27.5257i 1.34152i −0.741674 0.670761i \(-0.765968\pi\)
0.741674 0.670761i \(-0.234032\pi\)
\(422\) −0.621297 3.12718i −0.0302443 0.152229i
\(423\) −3.66806 −0.178347
\(424\) 26.8540 17.9169i 1.30415 0.870121i
\(425\) 2.92992i 0.142122i
\(426\) −0.986752 4.96662i −0.0478083 0.240634i
\(427\) 20.6726 + 4.18982i 1.00042 + 0.202759i
\(428\) −33.0941 + 13.6904i −1.59966 + 0.661752i
\(429\) 41.7805i 2.01718i
\(430\) 2.37675 + 11.9629i 0.114617 + 0.576903i
\(431\) 22.5778i 1.08753i 0.839236 + 0.543767i \(0.183002\pi\)
−0.839236 + 0.543767i \(0.816998\pi\)
\(432\) −38.3250 38.3946i −1.84391 1.84726i
\(433\) 23.4737i 1.12808i 0.825749 + 0.564038i \(0.190753\pi\)
−0.825749 + 0.564038i \(0.809247\pi\)
\(434\) 0.0362780 9.43791i 0.00174140 0.453034i
\(435\) 8.57954 0.411357
\(436\) −11.0140 26.6242i −0.527473 1.27507i
\(437\) 21.8390 1.04470
\(438\) 5.21694 + 26.2585i 0.249275 + 1.25468i
\(439\) 12.3485 0.589363 0.294681 0.955596i \(-0.404786\pi\)
0.294681 + 0.955596i \(0.404786\pi\)
\(440\) 5.25233 + 7.87226i 0.250395 + 0.375295i
\(441\) −46.6711 19.7285i −2.22243 0.939454i
\(442\) −15.8602 + 3.15106i −0.754394 + 0.149880i
\(443\) 24.9234 1.18415 0.592074 0.805883i \(-0.298309\pi\)
0.592074 + 0.805883i \(0.298309\pi\)
\(444\) 27.8470 11.5198i 1.32156 0.546707i
\(445\) 2.00722i 0.0951512i
\(446\) 6.74686 + 33.9590i 0.319473 + 1.60801i
\(447\) 36.9933 1.74972
\(448\) −11.8467 + 17.5401i −0.559702 + 0.828694i
\(449\) 33.7360 1.59210 0.796051 0.605230i \(-0.206919\pi\)
0.796051 + 0.605230i \(0.206919\pi\)
\(450\) 1.99482 + 10.0406i 0.0940368 + 0.473316i
\(451\) 18.7112i 0.881078i
\(452\) 12.6763 5.24397i 0.596244 0.246656i
\(453\) 1.62947 0.0765594
\(454\) −7.15992 + 1.42251i −0.336032 + 0.0667616i
\(455\) 10.1193 + 2.05094i 0.474402 + 0.0961495i
\(456\) −31.8291 47.7058i −1.49053 2.23403i
\(457\) −23.0696 −1.07915 −0.539576 0.841937i \(-0.681416\pi\)
−0.539576 + 0.841937i \(0.681416\pi\)
\(458\) 2.61529 + 13.1635i 0.122204 + 0.615092i
\(459\) 39.7363 1.85473
\(460\) −2.63489 6.36936i −0.122852 0.296973i
\(461\) −4.90911 −0.228640 −0.114320 0.993444i \(-0.536469\pi\)
−0.114320 + 0.993444i \(0.536469\pi\)
\(462\) −40.0580 0.153977i −1.86367 0.00716367i
\(463\) 30.9829i 1.43990i −0.694027 0.719949i \(-0.744165\pi\)
0.694027 0.719949i \(-0.255835\pi\)
\(464\) 7.57698 + 7.59074i 0.351752 + 0.352391i
\(465\) 8.07111i 0.374289i
\(466\) 0.703339 + 3.54012i 0.0325815 + 0.163993i
\(467\) 20.4881i 0.948078i 0.880504 + 0.474039i \(0.157204\pi\)
−0.880504 + 0.474039i \(0.842796\pi\)
\(468\) −52.2060 + 21.5967i −2.41322 + 0.998308i
\(469\) 16.5306 + 3.35035i 0.763314 + 0.154705i
\(470\) 0.139650 + 0.702903i 0.00644159 + 0.0324225i
\(471\) 31.9655i 1.47289i
\(472\) 1.88761 1.25940i 0.0868842 0.0579687i
\(473\) −28.8562 −1.32681
\(474\) 9.29531 + 46.7861i 0.426948 + 2.14896i
\(475\) 6.33672i 0.290749i
\(476\) −2.96270 15.2180i −0.135795 0.697515i
\(477\) 82.6171i 3.78278i
\(478\) −11.3128 + 2.24759i −0.517437 + 0.102803i
\(479\) 35.1704 1.60698 0.803489 0.595319i \(-0.202974\pi\)
0.803489 + 0.595319i \(0.202974\pi\)
\(480\) −10.0732 + 15.0387i −0.459778 + 0.686419i
\(481\) 18.3772i 0.837926i
\(482\) −3.70014 + 0.735132i −0.168537 + 0.0334843i
\(483\) 28.5953 + 5.79556i 1.30113 + 0.263707i
\(484\) −0.360233 + 0.149022i −0.0163742 + 0.00677372i
\(485\) 6.06903i 0.275580i
\(486\) 39.7901 7.90535i 1.80491 0.358594i
\(487\) 7.86977i 0.356614i −0.983975 0.178307i \(-0.942938\pi\)
0.983975 0.178307i \(-0.0570619\pi\)
\(488\) 12.5149 + 18.7575i 0.566524 + 0.849113i
\(489\) 63.2708i 2.86121i
\(490\) −2.00368 + 9.69460i −0.0905171 + 0.437957i
\(491\) 2.88992 0.130420 0.0652102 0.997872i \(-0.479228\pi\)
0.0652102 + 0.997872i \(0.479228\pi\)
\(492\) 33.0702 13.6806i 1.49092 0.616768i
\(493\) −7.85601 −0.353817
\(494\) −34.3018 + 6.81497i −1.54331 + 0.306620i
\(495\) −24.2192 −1.08857
\(496\) 7.14091 7.12796i 0.320636 0.320055i
\(497\) 0.588089 2.90163i 0.0263794 0.130156i
\(498\) 3.78525 + 19.0523i 0.169621 + 0.853756i
\(499\) 16.5134 0.739240 0.369620 0.929183i \(-0.379488\pi\)
0.369620 + 0.929183i \(0.379488\pi\)
\(500\) 1.84811 0.764529i 0.0826498 0.0341908i
\(501\) 66.0504i 2.95092i
\(502\) 11.8215 2.34866i 0.527619 0.104826i
\(503\) 7.23320 0.322513 0.161256 0.986913i \(-0.448445\pi\)
0.161256 + 0.986913i \(0.448445\pi\)
\(504\) −20.5140 50.1334i −0.913764 2.23312i
\(505\) 11.2324 0.499837
\(506\) 15.9951 3.17786i 0.711070 0.141273i
\(507\) 7.13426i 0.316843i
\(508\) 4.49084 + 10.8558i 0.199249 + 0.481647i
\(509\) −26.3986 −1.17010 −0.585048 0.810999i \(-0.698924\pi\)
−0.585048 + 0.810999i \(0.698924\pi\)
\(510\) −2.58363 13.0042i −0.114405 0.575835i
\(511\) −3.10921 + 15.3409i −0.137543 + 0.678640i
\(512\) −22.2016 + 4.36908i −0.981181 + 0.193088i
\(513\) 85.9401 3.79435
\(514\) 19.6238 3.89879i 0.865569 0.171968i
\(515\) 0.403587 0.0177842
\(516\) −21.0980 51.0004i −0.928786 2.24517i
\(517\) −1.69550 −0.0745679
\(518\) 17.6195 + 0.0677270i 0.774158 + 0.00297575i
\(519\) 38.7702i 1.70182i
\(520\) 6.12613 + 9.18191i 0.268648 + 0.402654i
\(521\) 29.5635i 1.29520i 0.761981 + 0.647599i \(0.224227\pi\)
−0.761981 + 0.647599i \(0.775773\pi\)
\(522\) −26.9217 + 5.34872i −1.17833 + 0.234107i
\(523\) 21.6311i 0.945862i 0.881100 + 0.472931i \(0.156804\pi\)
−0.881100 + 0.472931i \(0.843196\pi\)
\(524\) −3.42264 8.27359i −0.149519 0.361434i
\(525\) −1.68161 + 8.29709i −0.0733917 + 0.362115i
\(526\) 43.1969 8.58221i 1.88347 0.374202i
\(527\) 7.39046i 0.321933i
\(528\) −30.2538 30.3087i −1.31663 1.31902i
\(529\) 11.1222 0.483572
\(530\) 15.8318 3.14540i 0.687688 0.136628i
\(531\) 5.80727i 0.252014i
\(532\) −6.40760 32.9128i −0.277805 1.42695i
\(533\) 21.8241i 0.945307i
\(534\) 1.76998 + 8.90883i 0.0765944 + 0.385523i
\(535\) −17.9070 −0.774188
\(536\) 10.0075 + 14.9993i 0.432256 + 0.647871i
\(537\) 46.8213i 2.02049i
\(538\) −0.384626 1.93594i −0.0165824 0.0834643i
\(539\) −21.5729 9.11919i −0.929212 0.392791i
\(540\) −10.3687 25.0645i −0.446199 1.07860i
\(541\) 3.88138i 0.166874i 0.996513 + 0.0834368i \(0.0265897\pi\)
−0.996513 + 0.0834368i \(0.973410\pi\)
\(542\) −6.19138 31.1631i −0.265942 1.33857i
\(543\) 74.0375i 3.17725i
\(544\) 9.22373 13.7705i 0.395464 0.590403i
\(545\) 14.4062i 0.617094i
\(546\) −46.7222 0.179594i −1.99953 0.00768590i
\(547\) −4.88320 −0.208791 −0.104395 0.994536i \(-0.533291\pi\)
−0.104395 + 0.994536i \(0.533291\pi\)
\(548\) −14.6072 + 6.04276i −0.623991 + 0.258134i
\(549\) −57.7080 −2.46292
\(550\) 0.922074 + 4.64108i 0.0393174 + 0.197896i
\(551\) −16.9906 −0.723826
\(552\) 17.3113 + 25.9463i 0.736816 + 1.10435i
\(553\) −5.53985 + 27.3337i −0.235579 + 1.16235i
\(554\) 16.7601 3.32984i 0.712068 0.141471i
\(555\) 15.0679 0.639596
\(556\) 7.49332 + 18.1137i 0.317788 + 0.768192i
\(557\) 44.6377i 1.89136i −0.325099 0.945680i \(-0.605398\pi\)
0.325099 0.945680i \(-0.394602\pi\)
\(558\) 5.03175 + 25.3263i 0.213011 + 1.07215i
\(559\) −33.6568 −1.42353
\(560\) −8.82596 + 5.83973i −0.372965 + 0.246774i
\(561\) 31.3679 1.32435
\(562\) 1.61188 + 8.11306i 0.0679928 + 0.342229i
\(563\) 28.5884i 1.20486i −0.798172 0.602429i \(-0.794200\pi\)
0.798172 0.602429i \(-0.205800\pi\)
\(564\) −1.23965 2.99662i −0.0521987 0.126181i
\(565\) 6.85909 0.288564
\(566\) 14.1213 2.80557i 0.593563 0.117927i
\(567\) 56.2181 + 11.3940i 2.36094 + 0.478504i
\(568\) 2.63283 1.75661i 0.110471 0.0737058i
\(569\) −5.12489 −0.214846 −0.107423 0.994213i \(-0.534260\pi\)
−0.107423 + 0.994213i \(0.534260\pi\)
\(570\) −5.58776 28.1249i −0.234046 1.17802i
\(571\) 36.7465 1.53779 0.768897 0.639373i \(-0.220806\pi\)
0.768897 + 0.639373i \(0.220806\pi\)
\(572\) −24.1314 + 9.98272i −1.00898 + 0.417398i
\(573\) −7.72916 −0.322890
\(574\) 20.9244 + 0.0804304i 0.873367 + 0.00335710i
\(575\) 3.44642i 0.143726i
\(576\) 22.2332 53.4699i 0.926385 2.22791i
\(577\) 2.55301i 0.106283i 0.998587 + 0.0531417i \(0.0169235\pi\)
−0.998587 + 0.0531417i \(0.983076\pi\)
\(578\) −2.31920 11.6732i −0.0964658 0.485542i
\(579\) 23.6319i 0.982106i
\(580\) 2.04993 + 4.95533i 0.0851187 + 0.205759i
\(581\) −2.25595 + 11.1309i −0.0935926 + 0.461786i
\(582\) −5.35171 26.9368i −0.221836 1.11657i
\(583\) 38.1884i 1.58160i
\(584\) −13.9197 + 9.28718i −0.576003 + 0.384306i
\(585\) −28.2484 −1.16793
\(586\) −8.45582 42.5607i −0.349307 1.75817i
\(587\) 33.3508i 1.37653i 0.725457 + 0.688267i \(0.241628\pi\)
−0.725457 + 0.688267i \(0.758372\pi\)
\(588\) 0.344379 44.7954i 0.0142020 1.84733i
\(589\) 15.9838i 0.658600i
\(590\) 1.11284 0.221095i 0.0458148 0.00910232i
\(591\) 66.9728 2.75489
\(592\) 13.3071 + 13.3313i 0.546920 + 0.547913i
\(593\) 10.9350i 0.449048i 0.974469 + 0.224524i \(0.0720827\pi\)
−0.974469 + 0.224524i \(0.927917\pi\)
\(594\) 62.9434 12.5054i 2.58260 0.513102i
\(595\) 1.53980 7.59738i 0.0631257 0.311462i
\(596\) 8.83891 + 21.3664i 0.362056 + 0.875203i
\(597\) 15.6675i 0.641227i
\(598\) 18.6561 3.70654i 0.762906 0.151572i
\(599\) 25.8459i 1.05603i 0.849234 + 0.528017i \(0.177064\pi\)
−0.849234 + 0.528017i \(0.822936\pi\)
\(600\) −7.52847 + 5.02296i −0.307349 + 0.205061i
\(601\) 6.70199i 0.273380i −0.990614 0.136690i \(-0.956354\pi\)
0.990614 0.136690i \(-0.0436464\pi\)
\(602\) 0.124039 32.2693i 0.00505543 1.31520i
\(603\) −46.1457 −1.87920
\(604\) 0.389334 + 0.941144i 0.0158418 + 0.0382946i
\(605\) −0.194920 −0.00792462
\(606\) −49.8541 + 9.90484i −2.02518 + 0.402357i
\(607\) −37.4686 −1.52080 −0.760402 0.649453i \(-0.774998\pi\)
−0.760402 + 0.649453i \(0.774998\pi\)
\(608\) 19.9487 29.7822i 0.809026 1.20783i
\(609\) −22.2470 4.50891i −0.901494 0.182710i
\(610\) 2.19706 + 11.0585i 0.0889564 + 0.447745i
\(611\) −1.97757 −0.0800038
\(612\) 16.2143 + 39.1952i 0.655426 + 1.58437i
\(613\) 20.0776i 0.810928i 0.914111 + 0.405464i \(0.132890\pi\)
−0.914111 + 0.405464i \(0.867110\pi\)
\(614\) −35.8750 + 7.12751i −1.44780 + 0.287643i
\(615\) 17.8941 0.721561
\(616\) −9.48224 23.1733i −0.382050 0.933680i
\(617\) 27.8737 1.12215 0.561077 0.827764i \(-0.310387\pi\)
0.561077 + 0.827764i \(0.310387\pi\)
\(618\) −1.79128 + 0.355886i −0.0720560 + 0.0143158i
\(619\) 25.0328i 1.00615i 0.864242 + 0.503076i \(0.167798\pi\)
−0.864242 + 0.503076i \(0.832202\pi\)
\(620\) 4.66167 1.92845i 0.187217 0.0774485i
\(621\) −46.7412 −1.87566
\(622\) 2.98309 + 15.0148i 0.119611 + 0.602039i
\(623\) −1.05488 + 5.20477i −0.0422628 + 0.208525i
\(624\) −35.2869 35.3510i −1.41261 1.41517i
\(625\) 1.00000 0.0400000
\(626\) −38.7000 + 7.68879i −1.54676 + 0.307306i
\(627\) 67.8412 2.70931
\(628\) 18.4625 7.63759i 0.736732 0.304773i
\(629\) −13.7972 −0.550129
\(630\) 0.104106 27.0838i 0.00414769 1.07905i
\(631\) 17.2836i 0.688048i −0.938961 0.344024i \(-0.888210\pi\)
0.938961 0.344024i \(-0.111790\pi\)
\(632\) −24.8016 + 16.5475i −0.986553 + 0.658223i
\(633\) 7.21378i 0.286722i
\(634\) −10.3989 + 2.06601i −0.412992 + 0.0820518i
\(635\) 5.87400i 0.233103i
\(636\) −67.4942 + 27.9211i −2.67632 + 1.10714i
\(637\) −25.1619 10.6363i −0.996950 0.421425i
\(638\) −12.4441 + 2.47236i −0.492668 + 0.0978815i
\(639\) 8.09997i 0.320430i
\(640\) −11.0928 2.22481i −0.438481 0.0879433i
\(641\) −5.40646 −0.213542 −0.106771 0.994284i \(-0.534051\pi\)
−0.106771 + 0.994284i \(0.534051\pi\)
\(642\) 79.4786 15.7905i 3.13677 0.623203i
\(643\) 8.51562i 0.335823i −0.985802 0.167912i \(-0.946298\pi\)
0.985802 0.167912i \(-0.0537024\pi\)
\(644\) 3.48498 + 17.9007i 0.137327 + 0.705386i
\(645\) 27.5960i 1.08659i
\(646\) 5.11654 + 25.7531i 0.201307 + 1.01324i
\(647\) −9.29106 −0.365269 −0.182635 0.983181i \(-0.558463\pi\)
−0.182635 + 0.983181i \(0.558463\pi\)
\(648\) 34.0338 + 51.0102i 1.33697 + 2.00387i
\(649\) 2.68432i 0.105369i
\(650\) 1.07547 + 5.41319i 0.0421835 + 0.212323i
\(651\) −4.24171 + 20.9286i −0.166246 + 0.820257i
\(652\) −36.5437 + 15.1175i −1.43116 + 0.592045i
\(653\) 13.4994i 0.528272i 0.964486 + 0.264136i \(0.0850867\pi\)
−0.964486 + 0.264136i \(0.914913\pi\)
\(654\) 12.7035 + 63.9405i 0.496746 + 2.50027i
\(655\) 4.47680i 0.174923i
\(656\) 15.8031 + 15.8318i 0.617008 + 0.618128i
\(657\) 42.8244i 1.67074i
\(658\) 0.00728811 1.89604i 0.000284120 0.0739154i
\(659\) −32.9215 −1.28244 −0.641219 0.767358i \(-0.721571\pi\)
−0.641219 + 0.767358i \(0.721571\pi\)
\(660\) −8.18507 19.7859i −0.318604 0.770165i
\(661\) 28.6462 1.11421 0.557104 0.830443i \(-0.311912\pi\)
0.557104 + 0.830443i \(0.311912\pi\)
\(662\) −3.40152 17.1209i −0.132204 0.665423i
\(663\) 36.5864 1.42090
\(664\) −10.0997 + 6.73849i −0.391946 + 0.261504i
\(665\) 3.33022 16.4313i 0.129140 0.637179i
\(666\) −47.2815 + 9.39373i −1.83212 + 0.364000i
\(667\) 9.24090 0.357809
\(668\) −38.1491 + 15.7816i −1.47603 + 0.610608i
\(669\) 78.3367i 3.02867i
\(670\) 1.75686 + 8.84282i 0.0678735 + 0.341628i
\(671\) −26.6746 −1.02976
\(672\) 34.0237 33.7019i 1.31249 1.30008i
\(673\) 4.30988 0.166134 0.0830669 0.996544i \(-0.473528\pi\)
0.0830669 + 0.996544i \(0.473528\pi\)
\(674\) −8.31617 41.8578i −0.320327 1.61230i
\(675\) 13.5622i 0.522011i
\(676\) −4.12057 + 1.70461i −0.158483 + 0.0655618i
\(677\) 23.3619 0.897870 0.448935 0.893564i \(-0.351803\pi\)
0.448935 + 0.893564i \(0.351803\pi\)
\(678\) −30.4434 + 6.04840i −1.16917 + 0.232287i
\(679\) 3.18954 15.7372i 0.122403 0.603937i
\(680\) 6.89358 4.59936i 0.264357 0.176378i
\(681\) 16.5165 0.632913
\(682\) 2.32584 + 11.7067i 0.0890612 + 0.448272i
\(683\) 40.0020 1.53063 0.765317 0.643653i \(-0.222582\pi\)
0.765317 + 0.643653i \(0.222582\pi\)
\(684\) 35.0677 + 84.7696i 1.34085 + 3.24125i
\(685\) −7.90390 −0.301993
\(686\) 10.2905 24.0854i 0.392894 0.919584i
\(687\) 30.3656i 1.15852i
\(688\) 24.4156 24.3713i 0.930835 0.929148i
\(689\) 44.5416i 1.69690i
\(690\) 3.03908 + 15.2966i 0.115696 + 0.582333i
\(691\) 38.8983i 1.47976i −0.672738 0.739881i \(-0.734882\pi\)
0.672738 0.739881i \(-0.265118\pi\)
\(692\) 22.3927 9.26346i 0.851242 0.352144i
\(693\) 62.8011 + 12.7282i 2.38562 + 0.483505i
\(694\) 5.88091 + 29.6004i 0.223236 + 1.12362i
\(695\) 9.80123i 0.371782i
\(696\) −13.4681 20.1861i −0.510506 0.765152i
\(697\) −16.3851 −0.620629
\(698\) −4.51641 22.7325i −0.170949 0.860437i
\(699\) 8.16634i 0.308880i
\(700\) −5.19399 + 1.01119i −0.196314 + 0.0382193i
\(701\) 3.06613i 0.115806i 0.998322 + 0.0579031i \(0.0184415\pi\)
−0.998322 + 0.0579031i \(0.981559\pi\)
\(702\) 73.4149 14.5858i 2.77087 0.550507i
\(703\) −29.8400 −1.12544
\(704\) 10.2769 24.7156i 0.387327 0.931503i
\(705\) 1.62146i 0.0610676i
\(706\) −5.33577 + 1.06009i −0.200814 + 0.0398971i
\(707\) −29.1260 5.90313i −1.09540 0.222010i
\(708\) −4.74426 + 1.96261i −0.178300 + 0.0737596i
\(709\) 38.5857i 1.44912i 0.689214 + 0.724558i \(0.257956\pi\)
−0.689214 + 0.724558i \(0.742044\pi\)
\(710\) 1.55218 0.308382i 0.0582524 0.0115734i
\(711\) 76.3026i 2.86157i
\(712\) −4.72262 + 3.15091i −0.176988 + 0.118085i
\(713\) 8.69328i 0.325566i
\(714\) −0.134835 + 35.0781i −0.00504607 + 1.31276i
\(715\) −13.0573 −0.488317
\(716\) 27.0428 11.1871i 1.01064 0.418083i
\(717\) 26.0964 0.974589
\(718\) 38.3691 7.62305i 1.43192 0.284490i
\(719\) −31.4806 −1.17403 −0.587014 0.809577i \(-0.699697\pi\)
−0.587014 + 0.809577i \(0.699697\pi\)
\(720\) 20.4922 20.4550i 0.763698 0.762313i
\(721\) −1.04651 0.212103i −0.0389742 0.00789911i
\(722\) 5.82972 + 29.3428i 0.216960 + 1.09202i
\(723\) 8.53548 0.317438
\(724\) 42.7622 17.6900i 1.58925 0.657443i
\(725\) 2.68130i 0.0995810i
\(726\) 0.865133 0.171882i 0.0321081 0.00637913i
\(727\) 1.97285 0.0731689 0.0365844 0.999331i \(-0.488352\pi\)
0.0365844 + 0.999331i \(0.488352\pi\)
\(728\) −11.0597 27.0285i −0.409901 1.00174i
\(729\) −26.7463 −0.990603
\(730\) −8.20636 + 1.63041i −0.303731 + 0.0603443i
\(731\) 25.2688i 0.934601i
\(732\) −19.5029 47.1446i −0.720847 1.74251i
\(733\) −1.04466 −0.0385855 −0.0192928 0.999814i \(-0.506141\pi\)
−0.0192928 + 0.999814i \(0.506141\pi\)
\(734\) 0.812236 + 4.08823i 0.0299802 + 0.150899i
\(735\) 8.72096 20.6308i 0.321677 0.760980i
\(736\) −10.8497 + 16.1980i −0.399926 + 0.597065i
\(737\) −21.3301 −0.785704
\(738\) −56.1500 + 11.1557i −2.06691 + 0.410646i
\(739\) −33.3529 −1.22691 −0.613454 0.789730i \(-0.710220\pi\)
−0.613454 + 0.789730i \(0.710220\pi\)
\(740\) 3.60021 + 8.70283i 0.132346 + 0.319922i
\(741\) 79.1275 2.90682
\(742\) −42.7053 0.164153i −1.56776 0.00602625i
\(743\) 2.33616i 0.0857054i 0.999081 + 0.0428527i \(0.0136446\pi\)
−0.999081 + 0.0428527i \(0.986355\pi\)
\(744\) −18.9899 + 12.6699i −0.696202 + 0.464503i
\(745\) 11.5613i 0.423572i
\(746\) −17.5118 + 3.47918i −0.641151 + 0.127382i
\(747\) 31.0721i 1.13687i
\(748\) 7.49481 + 18.1173i 0.274037 + 0.662435i
\(749\) 46.4334 + 9.41091i 1.69664 + 0.343867i
\(750\) −4.43840 + 0.881807i −0.162068 + 0.0321990i
\(751\) 22.6980i 0.828261i 0.910218 + 0.414130i \(0.135914\pi\)
−0.910218 + 0.414130i \(0.864086\pi\)
\(752\) 1.43458 1.43198i 0.0523138 0.0522190i
\(753\) −27.2698 −0.993768
\(754\) −14.5144 + 2.88367i −0.528583 + 0.105017i
\(755\) 0.509248i 0.0185334i
\(756\) 13.7140 + 70.4421i 0.498772 + 2.56195i
\(757\) 0.859830i 0.0312510i 0.999878 + 0.0156255i \(0.00497396\pi\)
−0.999878 + 0.0156255i \(0.995026\pi\)
\(758\) 5.78402 + 29.1128i 0.210085 + 1.05742i
\(759\) −36.8976 −1.33930
\(760\) 14.9092 9.94731i 0.540812 0.360827i
\(761\) 9.59745i 0.347907i −0.984754 0.173954i \(-0.944346\pi\)
0.984754 0.173954i \(-0.0556543\pi\)
\(762\) −5.17974 26.0712i −0.187642 0.944460i
\(763\) −7.57108 + 37.3557i −0.274091 + 1.35237i
\(764\) −1.84675 4.46417i −0.0668130 0.161508i
\(765\) 21.2083i 0.766787i
\(766\) −3.14820 15.8458i −0.113749 0.572533i
\(767\) 3.13089i 0.113050i
\(768\) 51.1962 + 0.0928907i 1.84738 + 0.00335191i
\(769\) 46.0671i 1.66122i −0.556854 0.830610i \(-0.687992\pi\)
0.556854 0.830610i \(-0.312008\pi\)
\(770\) 0.0481214 12.5190i 0.00173418 0.451155i
\(771\) −45.2682 −1.63029
\(772\) 13.6492 5.64642i 0.491244 0.203219i
\(773\) 7.98484 0.287195 0.143597 0.989636i \(-0.454133\pi\)
0.143597 + 0.989636i \(0.454133\pi\)
\(774\) 17.2041 + 86.5937i 0.618390 + 3.11254i
\(775\) 2.52241 0.0906075
\(776\) 14.2793 9.52710i 0.512598 0.342003i
\(777\) −39.0715 7.91882i −1.40168 0.284086i
\(778\) 31.6212 6.28240i 1.13368 0.225235i
\(779\) −35.4370 −1.26966
\(780\) −9.54677 23.0776i −0.341829 0.826309i
\(781\) 3.74408i 0.133974i
\(782\) −2.78279 14.0066i −0.0995124 0.500876i
\(783\) 36.3644 1.29956
\(784\) 25.9550 10.5042i 0.926964 0.375149i
\(785\) 9.98993 0.356556
\(786\) 3.94767 + 19.8698i 0.140809 + 0.708733i
\(787\) 56.0482i 1.99790i −0.0457828 0.998951i \(-0.514578\pi\)
0.0457828 0.998951i \(-0.485422\pi\)
\(788\) 16.0020 + 38.6818i 0.570047 + 1.37798i
\(789\) −99.6465 −3.54751
\(790\) −14.6217 + 2.90500i −0.520218 + 0.103355i
\(791\) −17.7858 3.60475i −0.632391 0.128170i
\(792\) 38.0190 + 56.9834i 1.35095 + 2.02482i
\(793\) −31.1122 −1.10483
\(794\) −8.23388 41.4436i −0.292210 1.47078i
\(795\) −36.5207 −1.29526
\(796\) −9.04914 + 3.74347i −0.320738 + 0.132684i
\(797\) 23.7352 0.840744 0.420372 0.907352i \(-0.361900\pi\)
0.420372 + 0.907352i \(0.361900\pi\)
\(798\) −0.291616 + 75.8654i −0.0103231 + 2.68560i
\(799\) 1.48472i 0.0525255i
\(800\) −4.69994 3.14811i −0.166168 0.111303i
\(801\) 14.5292i 0.513366i
\(802\) 4.64076 + 23.3584i 0.163871 + 0.824812i
\(803\) 19.7949i 0.698546i
\(804\) −15.5953 37.6988i −0.550004 1.32953i
\(805\) −1.81124 + 8.93668i −0.0638380 + 0.314977i
\(806\) 2.71278 + 13.6542i 0.0955536 + 0.480950i
\(807\) 4.46582i 0.157204i
\(808\) −17.6326 26.4279i −0.620311 0.929730i
\(809\) 22.4179 0.788172 0.394086 0.919074i \(-0.371061\pi\)
0.394086 + 0.919074i \(0.371061\pi\)
\(810\) 5.97481 + 30.0730i 0.209933 + 1.05666i
\(811\) 17.3731i 0.610054i 0.952344 + 0.305027i \(0.0986655\pi\)
−0.952344 + 0.305027i \(0.901335\pi\)
\(812\) −2.71129 13.9266i −0.0951478 0.488729i
\(813\) 71.8870i 2.52119i
\(814\) −21.8551 + 4.34210i −0.766021 + 0.152190i
\(815\) −19.7736 −0.692638
\(816\) −26.5408 + 26.4927i −0.929113 + 0.927428i
\(817\) 54.6503i 1.91197i
\(818\) −37.4178 + 7.43405i −1.30828 + 0.259925i
\(819\) 73.2489 + 14.8457i 2.55952 + 0.518752i
\(820\) 4.27549 + 10.3352i 0.149307 + 0.360921i
\(821\) 32.6279i 1.13872i −0.822088 0.569361i \(-0.807191\pi\)
0.822088 0.569361i \(-0.192809\pi\)
\(822\) 35.0807 6.96972i 1.22358 0.243097i
\(823\) 6.06037i 0.211251i −0.994406 0.105626i \(-0.966315\pi\)
0.994406 0.105626i \(-0.0336845\pi\)
\(824\) −0.633547 0.949569i −0.0220707 0.0330798i
\(825\) 10.7060i 0.372736i
\(826\) −3.00181 0.0115385i −0.104446 0.000401477i
\(827\) 21.7214 0.755328 0.377664 0.925943i \(-0.376727\pi\)
0.377664 + 0.925943i \(0.376727\pi\)
\(828\) −19.0727 46.1047i −0.662821 1.60225i
\(829\) 4.44507 0.154384 0.0771919 0.997016i \(-0.475405\pi\)
0.0771919 + 0.997016i \(0.475405\pi\)
\(830\) −5.95429 + 1.18298i −0.206676 + 0.0410618i
\(831\) −38.6622 −1.34118
\(832\) 11.9867 28.8273i 0.415563 0.999408i
\(833\) −7.98550 + 18.8910i −0.276681 + 0.654535i
\(834\) −8.64279 43.5018i −0.299275 1.50634i
\(835\) −20.6423 −0.714355
\(836\) 16.2095 + 39.1834i 0.560616 + 1.35519i
\(837\) 34.2095i 1.18245i
\(838\) −20.8723 + 4.14684i −0.721022 + 0.143250i
\(839\) −9.23265 −0.318746 −0.159373 0.987218i \(-0.550947\pi\)
−0.159373 + 0.987218i \(0.550947\pi\)
\(840\) 22.1613 9.06815i 0.764639 0.312881i
\(841\) 21.8106 0.752091
\(842\) −38.1810 + 7.58567i −1.31580 + 0.261419i
\(843\) 18.7152i 0.644586i
\(844\) −4.16650 + 1.72361i −0.143417 + 0.0593290i
\(845\) −2.22962 −0.0767012
\(846\) 1.01086 + 5.08797i 0.0347541 + 0.174928i
\(847\) 0.505433 + 0.102439i 0.0173669 + 0.00351984i
\(848\) −32.2531 32.3117i −1.10758 1.10959i
\(849\) −32.5750 −1.11797
\(850\) 4.06411 0.807443i 0.139398 0.0276951i
\(851\) 16.2294 0.556337
\(852\) −6.61728 + 2.73745i −0.226704 + 0.0937836i
\(853\) −5.33487 −0.182662 −0.0913312 0.995821i \(-0.529112\pi\)
−0.0913312 + 0.995821i \(0.529112\pi\)
\(854\) 0.114661 29.8296i 0.00392361 1.02075i
\(855\) 45.8684i 1.56867i
\(856\) 28.1102 + 42.1320i 0.960788 + 1.44004i
\(857\) 3.81449i 0.130301i 0.997875 + 0.0651503i \(0.0207527\pi\)
−0.997875 + 0.0651503i \(0.979247\pi\)
\(858\) 57.9538 11.5141i 1.97851 0.393084i
\(859\) 40.9650i 1.39771i 0.715264 + 0.698854i \(0.246306\pi\)
−0.715264 + 0.698854i \(0.753694\pi\)
\(860\) 15.9388 6.59360i 0.543508 0.224840i
\(861\) −46.4000 9.40413i −1.58131 0.320492i
\(862\) 31.3177 6.22209i 1.06668 0.211925i
\(863\) 20.2817i 0.690399i 0.938529 + 0.345199i \(0.112189\pi\)
−0.938529 + 0.345199i \(0.887811\pi\)
\(864\) −42.6954 + 63.7416i −1.45253 + 2.16853i
\(865\) 12.1166 0.411975
\(866\) 32.5605 6.46900i 1.10645 0.219826i
\(867\) 26.9278i 0.914515i
\(868\) −13.1013 + 2.55062i −0.444688 + 0.0865738i
\(869\) 35.2696i 1.19644i
\(870\) −2.36439 11.9007i −0.0801603 0.403471i
\(871\) −24.8786 −0.842980
\(872\) −33.8952 + 22.6147i −1.14784 + 0.765830i
\(873\) 43.9307i 1.48683i
\(874\) −6.01850 30.2930i −0.203579 1.02467i
\(875\) −2.59303 0.525543i −0.0876604 0.0177666i
\(876\) 34.9855 14.4729i 1.18205 0.488993i
\(877\) 42.3958i 1.43160i −0.698304 0.715802i \(-0.746062\pi\)
0.698304 0.715802i \(-0.253938\pi\)
\(878\) −3.40307 17.1287i −0.114848 0.578065i
\(879\) 98.1791i 3.31150i
\(880\) 9.47216 9.45499i 0.319307 0.318728i
\(881\) 18.8445i 0.634887i −0.948277 0.317443i \(-0.897176\pi\)
0.948277 0.317443i \(-0.102824\pi\)
\(882\) −14.5037 + 70.1744i −0.488364 + 2.36290i
\(883\) 36.2096 1.21855 0.609274 0.792959i \(-0.291461\pi\)
0.609274 + 0.792959i \(0.291461\pi\)
\(884\) 8.74168 + 21.1314i 0.294014 + 0.710725i
\(885\) −2.56709 −0.0862918
\(886\) −6.86852 34.5714i −0.230753 1.16145i
\(887\) −21.5740 −0.724385 −0.362193 0.932103i \(-0.617972\pi\)
−0.362193 + 0.932103i \(0.617972\pi\)
\(888\) −23.6534 35.4520i −0.793756 1.18969i
\(889\) 3.08704 15.2315i 0.103536 0.510847i
\(890\) −2.78421 + 0.553158i −0.0933271 + 0.0185419i
\(891\) −72.5403 −2.43019
\(892\) 45.2453 18.7172i 1.51492 0.626698i
\(893\) 3.21108i 0.107455i
\(894\) −10.1948 51.3135i −0.340965 1.71618i
\(895\) 14.6327 0.489118
\(896\) 27.5947 + 11.5987i 0.921875 + 0.387487i
\(897\) −43.0360 −1.43693
\(898\) −9.29714 46.7953i −0.310250 1.56158i
\(899\) 6.76332i 0.225570i
\(900\) 13.3775 5.53405i 0.445918 0.184468i
\(901\) 33.4409 1.11408
\(902\) −25.9544 + 5.15653i −0.864187 + 0.171694i
\(903\) −14.5029 + 71.5574i −0.482627 + 2.38128i
\(904\) −10.7673 16.1382i −0.358116 0.536749i
\(905\) 23.1384 0.769147
\(906\) −0.449058 2.26025i −0.0149190 0.0750917i
\(907\) −35.3694 −1.17442 −0.587210 0.809435i \(-0.699774\pi\)
−0.587210 + 0.809435i \(0.699774\pi\)
\(908\) 3.94633 + 9.53952i 0.130964 + 0.316580i
\(909\) 81.3061 2.69675
\(910\) 0.0561271 14.6018i 0.00186059 0.484044i
\(911\) 59.3513i 1.96640i 0.182540 + 0.983199i \(0.441568\pi\)
−0.182540 + 0.983199i \(0.558432\pi\)
\(912\) −57.4013 + 57.2972i −1.90075 + 1.89730i
\(913\) 14.3626i 0.475331i
\(914\) 6.35764 + 32.0000i 0.210292 + 1.05846i
\(915\) 25.5097i 0.843324i
\(916\) 17.5384 7.25534i 0.579486 0.239723i
\(917\) −2.35275 + 11.6085i −0.0776946 + 0.383345i
\(918\) −10.9507 55.1184i −0.361428 1.81918i
\(919\) 54.6687i 1.80335i −0.432411 0.901677i \(-0.642337\pi\)
0.432411 0.901677i \(-0.357663\pi\)
\(920\) −8.10882 + 5.41016i −0.267340 + 0.178368i
\(921\) 82.7563 2.72691
\(922\) 1.35288 + 6.80943i 0.0445546 + 0.224257i
\(923\) 4.36696i 0.143740i
\(924\) 10.8258 + 55.6070i 0.356143 + 1.82934i
\(925\) 4.70905i 0.154833i
\(926\) −42.9765 + 8.53842i −1.41229 + 0.280590i
\(927\) 2.92137 0.0959504
\(928\) 8.44103 12.6019i 0.277090 0.413679i
\(929\) 37.8759i 1.24267i 0.783546 + 0.621334i \(0.213409\pi\)
−0.783546 + 0.621334i \(0.786591\pi\)
\(930\) −11.1955 + 2.22427i −0.367113 + 0.0729368i
\(931\) −17.2707 + 40.8567i −0.566025 + 1.33902i
\(932\) 4.71668 1.95121i 0.154500 0.0639139i
\(933\) 34.6361i 1.13394i
\(934\) 28.4192 5.64622i 0.929903 0.184750i
\(935\) 9.80318i 0.320598i
\(936\) 44.3440 + 66.4633i 1.44943 + 2.17242i
\(937\) 55.9352i 1.82732i 0.406476 + 0.913661i \(0.366757\pi\)
−0.406476 + 0.913661i \(0.633243\pi\)
\(938\) 0.0916875 23.8530i 0.00299370 0.778828i
\(939\) 89.2731 2.91332
\(940\) 0.936513 0.387419i 0.0305457 0.0126362i
\(941\) −60.3400 −1.96703 −0.983514 0.180831i \(-0.942121\pi\)
−0.983514 + 0.180831i \(0.942121\pi\)
\(942\) −44.3394 + 8.80919i −1.44465 + 0.287019i
\(943\) 19.2735 0.627632
\(944\) −2.26712 2.27123i −0.0737883 0.0739223i
\(945\) −7.12754 + 35.1673i −0.231859 + 1.14399i
\(946\) 7.95233 + 40.0265i 0.258552 + 1.30137i
\(947\) 22.0376 0.716126 0.358063 0.933697i \(-0.383437\pi\)
0.358063 + 0.933697i \(0.383437\pi\)
\(948\) 62.3355 25.7871i 2.02456 0.837526i
\(949\) 23.0880i 0.749469i
\(950\) 8.78968 1.74630i 0.285175 0.0566576i
\(951\) 23.9881 0.777867
\(952\) −20.2924 + 8.30342i −0.657682 + 0.269115i
\(953\) 21.2857 0.689511 0.344756 0.938693i \(-0.387962\pi\)
0.344756 + 0.938693i \(0.387962\pi\)
\(954\) 114.598 22.7680i 3.71026 0.737142i
\(955\) 2.41554i 0.0781650i
\(956\) 6.23529 + 15.0726i 0.201664 + 0.487484i
\(957\) 28.7061 0.927937
\(958\) −9.69244 48.7850i −0.313148 1.57617i
\(959\) 20.4951 + 4.15384i 0.661820 + 0.134134i
\(960\) 23.6362 + 9.82816i 0.762856 + 0.317202i
\(961\) −24.6375 −0.794757
\(962\) −25.4910 + 5.06446i −0.821863 + 0.163285i
\(963\) −129.620 −4.17695
\(964\) 2.03941 + 4.92988i 0.0656848 + 0.158781i
\(965\) 7.38549 0.237747
\(966\) 0.158604 41.2618i 0.00510301 1.32758i
\(967\) 29.9897i 0.964405i −0.876060 0.482203i \(-0.839837\pi\)
0.876060 0.482203i \(-0.160163\pi\)
\(968\) 0.305983 + 0.458611i 0.00983467 + 0.0147403i
\(969\) 59.4072i 1.90843i
\(970\) 8.41837 1.67253i 0.270297 0.0537018i
\(971\) 9.10304i 0.292130i −0.989275 0.146065i \(-0.953339\pi\)
0.989275 0.146065i \(-0.0466609\pi\)
\(972\) −21.9311 53.0143i −0.703440 1.70043i
\(973\) 5.15097 25.4149i 0.165132 0.814764i
\(974\) −10.9162 + 2.16879i −0.349777 + 0.0694925i
\(975\) 12.4871i 0.399908i
\(976\) 22.5697 22.5288i 0.722438 0.721128i
\(977\) −38.3437 −1.22672 −0.613362 0.789802i \(-0.710183\pi\)
−0.613362 + 0.789802i \(0.710183\pi\)
\(978\) 87.7631 17.4365i 2.80635 0.557557i
\(979\) 6.71591i 0.214641i
\(980\) 13.9996 + 0.107626i 0.447200 + 0.00343800i
\(981\) 104.279i 3.32938i
\(982\) −0.796419 4.00862i −0.0254147 0.127920i
\(983\) −11.4686 −0.365792 −0.182896 0.983132i \(-0.558547\pi\)
−0.182896 + 0.983132i \(0.558547\pi\)
\(984\) −28.0900 42.1016i −0.895476 1.34215i
\(985\) 20.9305i 0.666902i
\(986\) 2.16500 + 10.8971i 0.0689475 + 0.347034i
\(987\) −0.852145 + 4.20448i −0.0271241 + 0.133830i
\(988\) 18.9061 + 45.7021i 0.601484 + 1.45398i
\(989\) 29.7233i 0.945147i
\(990\) 6.67444 + 33.5945i 0.212128 + 1.06770i
\(991\) 27.8094i 0.883395i −0.897164 0.441697i \(-0.854376\pi\)
0.897164 0.441697i \(-0.145624\pi\)
\(992\) −11.8551 7.94081i −0.376401 0.252121i
\(993\) 39.4945i 1.25332i
\(994\) −4.18693 0.0160939i −0.132801 0.000510469i
\(995\) −4.89644 −0.155228
\(996\) 25.3844 10.5011i 0.804335 0.332739i
\(997\) −51.3033 −1.62479 −0.812395 0.583107i \(-0.801837\pi\)
−0.812395 + 0.583107i \(0.801837\pi\)
\(998\) −4.55083 22.9057i −0.144054 0.725068i
\(999\) 63.8653 2.02061
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 280.2.h.a.251.7 16
4.3 odd 2 1120.2.h.a.111.1 16
7.6 odd 2 280.2.h.b.251.7 yes 16
8.3 odd 2 280.2.h.b.251.8 yes 16
8.5 even 2 1120.2.h.b.111.1 16
28.27 even 2 1120.2.h.b.111.16 16
56.13 odd 2 1120.2.h.a.111.16 16
56.27 even 2 inner 280.2.h.a.251.8 yes 16
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
280.2.h.a.251.7 16 1.1 even 1 trivial
280.2.h.a.251.8 yes 16 56.27 even 2 inner
280.2.h.b.251.7 yes 16 7.6 odd 2
280.2.h.b.251.8 yes 16 8.3 odd 2
1120.2.h.a.111.1 16 4.3 odd 2
1120.2.h.a.111.16 16 56.13 odd 2
1120.2.h.b.111.1 16 8.5 even 2
1120.2.h.b.111.16 16 28.27 even 2