Properties

Label 102.3.e.b.47.9
Level $102$
Weight $3$
Character 102.47
Analytic conductor $2.779$
Analytic rank $0$
Dimension $20$
Inner twists $4$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [102,3,Mod(47,102)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(102, base_ring=CyclotomicField(4))
 
chi = DirichletCharacter(H, H._module([2, 1]))
 
N = Newforms(chi, 3, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("102.47");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 102 = 2 \cdot 3 \cdot 17 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 102.e (of order \(4\), degree \(2\), 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: \(2.77929869648\)
Analytic rank: \(0\)
Dimension: \(20\)
Relative dimension: \(10\) over \(\Q(i)\)
Coefficient field: \(\mathbb{Q}[x]/(x^{20} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{20} - 10 x^{18} + 149 x^{16} - 800 x^{14} - 1986 x^{12} + 2844 x^{10} - 160866 x^{8} + \cdots + 3486784401 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 2^{8}\cdot 3^{2} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{4}]$

Embedding invariants

Embedding label 47.9
Root \(2.98496 - 0.299984i\) of defining polynomial
Character \(\chi\) \(=\) 102.47
Dual form 102.3.e.b.89.9

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+1.41421 q^{2} +(2.32281 + 1.89857i) q^{3} +2.00000 q^{4} +(-3.05768 + 3.05768i) q^{5} +(3.28495 + 2.68498i) q^{6} +(3.50287 - 3.50287i) q^{7} +2.82843 q^{8} +(1.79088 + 8.82002i) q^{9} +O(q^{10})\) \(q+1.41421 q^{2} +(2.32281 + 1.89857i) q^{3} +2.00000 q^{4} +(-3.05768 + 3.05768i) q^{5} +(3.28495 + 2.68498i) q^{6} +(3.50287 - 3.50287i) q^{7} +2.82843 q^{8} +(1.79088 + 8.82002i) q^{9} +(-4.32421 + 4.32421i) q^{10} +(-6.44580 - 6.44580i) q^{11} +(4.64562 + 3.79713i) q^{12} +2.26456 q^{13} +(4.95380 - 4.95380i) q^{14} +(-12.9076 + 1.29720i) q^{15} +4.00000 q^{16} +(-6.83994 - 15.5633i) q^{17} +(2.53269 + 12.4734i) q^{18} -16.3812i q^{19} +(-6.11536 + 6.11536i) q^{20} +(14.7869 - 1.48606i) q^{21} +(-9.11573 - 9.11573i) q^{22} +(7.15696 + 7.15696i) q^{23} +(6.56990 + 5.36996i) q^{24} +6.30119i q^{25} +3.20257 q^{26} +(-12.5855 + 23.8873i) q^{27} +(7.00573 - 7.00573i) q^{28} +(6.56388 - 6.56388i) q^{29} +(-18.2541 + 1.83451i) q^{30} +(-22.2472 - 22.2472i) q^{31} +5.65685 q^{32} +(-2.73458 - 27.2101i) q^{33} +(-9.67314 - 22.0098i) q^{34} +21.4213i q^{35} +(3.58177 + 17.6400i) q^{36} +(-49.6392 - 49.6392i) q^{37} -23.1665i q^{38} +(5.26014 + 4.29942i) q^{39} +(-8.64842 + 8.64842i) q^{40} +(16.9856 + 16.9856i) q^{41} +(20.9119 - 2.10161i) q^{42} +18.0836i q^{43} +(-12.8916 - 12.8916i) q^{44} +(-32.4447 - 21.4928i) q^{45} +(10.1215 + 10.1215i) q^{46} +79.1555i q^{47} +(9.29124 + 7.59427i) q^{48} +24.4598i q^{49} +8.91123i q^{50} +(13.6600 - 49.1366i) q^{51} +4.52912 q^{52} -68.2420 q^{53} +(-17.7986 + 33.7818i) q^{54} +39.4184 q^{55} +(9.90760 - 9.90760i) q^{56} +(31.1008 - 38.0504i) q^{57} +(9.28273 - 9.28273i) q^{58} +108.015 q^{59} +(-25.8152 + 2.59439i) q^{60} +(9.60289 - 9.60289i) q^{61} +(-31.4622 - 31.4622i) q^{62} +(37.1686 + 24.6221i) q^{63} +8.00000 q^{64} +(-6.92430 + 6.92430i) q^{65} +(-3.86727 - 38.4809i) q^{66} +60.5593 q^{67} +(-13.6799 - 31.1265i) q^{68} +(3.03628 + 30.2122i) q^{69} +30.2943i q^{70} +(-9.60666 + 9.60666i) q^{71} +(5.06539 + 24.9468i) q^{72} +(70.3897 + 70.3897i) q^{73} +(-70.2005 - 70.2005i) q^{74} +(-11.9632 + 14.6365i) q^{75} -32.7624i q^{76} -45.1575 q^{77} +(7.43896 + 6.08030i) q^{78} +(-81.2199 + 81.2199i) q^{79} +(-12.2307 + 12.2307i) q^{80} +(-74.5855 + 31.5913i) q^{81} +(24.0212 + 24.0212i) q^{82} +165.328 q^{83} +(29.5738 - 2.97213i) q^{84} +(68.5018 + 26.6731i) q^{85} +25.5740i q^{86} +(27.7086 - 2.78467i) q^{87} +(-18.2315 - 18.2315i) q^{88} +40.2790i q^{89} +(-45.8838 - 30.3955i) q^{90} +(7.93245 - 7.93245i) q^{91} +(14.3139 + 14.3139i) q^{92} +(-9.43818 - 93.9137i) q^{93} +111.943i q^{94} +(50.0885 + 50.0885i) q^{95} +(13.1398 + 10.7399i) q^{96} +(-28.5480 - 28.5480i) q^{97} +34.5914i q^{98} +(45.3084 - 68.3957i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 20 q + 4 q^{3} + 40 q^{4} + 4 q^{6} + 20 q^{7}+O(q^{10}) \) Copy content Toggle raw display \( 20 q + 4 q^{3} + 40 q^{4} + 4 q^{6} + 20 q^{7} + 44 q^{10} + 8 q^{12} - 52 q^{13} + 80 q^{16} - 16 q^{18} - 152 q^{21} + 12 q^{22} + 8 q^{24} - 68 q^{27} + 40 q^{28} - 88 q^{31} - 212 q^{33} - 172 q^{34} + 36 q^{37} - 80 q^{39} + 88 q^{40} - 232 q^{45} - 92 q^{46} + 16 q^{48} + 392 q^{51} - 104 q^{52} - 124 q^{54} + 436 q^{55} + 8 q^{57} - 288 q^{58} - 84 q^{61} + 228 q^{63} + 160 q^{64} + 768 q^{67} + 84 q^{69} - 32 q^{72} + 32 q^{73} + 628 q^{75} + 28 q^{78} + 236 q^{79} + 396 q^{81} - 148 q^{82} - 304 q^{84} - 420 q^{85} + 24 q^{88} - 92 q^{90} + 4 q^{91} + 16 q^{96} - 304 q^{97} + 568 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/102\mathbb{Z}\right)^\times\).

\(n\) \(35\) \(37\)
\(\chi(n)\) \(-1\) \(e\left(\frac{1}{4}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 1.41421 0.707107
\(3\) 2.32281 + 1.89857i 0.774270 + 0.632856i
\(4\) 2.00000 0.500000
\(5\) −3.05768 + 3.05768i −0.611536 + 0.611536i −0.943346 0.331810i \(-0.892341\pi\)
0.331810 + 0.943346i \(0.392341\pi\)
\(6\) 3.28495 + 2.68498i 0.547491 + 0.447497i
\(7\) 3.50287 3.50287i 0.500410 0.500410i −0.411156 0.911565i \(-0.634875\pi\)
0.911565 + 0.411156i \(0.134875\pi\)
\(8\) 2.82843 0.353553
\(9\) 1.79088 + 8.82002i 0.198987 + 0.980002i
\(10\) −4.32421 + 4.32421i −0.432421 + 0.432421i
\(11\) −6.44580 6.44580i −0.585981 0.585981i 0.350559 0.936541i \(-0.385992\pi\)
−0.936541 + 0.350559i \(0.885992\pi\)
\(12\) 4.64562 + 3.79713i 0.387135 + 0.316428i
\(13\) 2.26456 0.174197 0.0870985 0.996200i \(-0.472241\pi\)
0.0870985 + 0.996200i \(0.472241\pi\)
\(14\) 4.95380 4.95380i 0.353843 0.353843i
\(15\) −12.9076 + 1.29720i −0.860508 + 0.0864797i
\(16\) 4.00000 0.250000
\(17\) −6.83994 15.5633i −0.402349 0.915486i
\(18\) 2.53269 + 12.4734i 0.140705 + 0.692966i
\(19\) 16.3812i 0.862169i −0.902312 0.431085i \(-0.858131\pi\)
0.902312 0.431085i \(-0.141869\pi\)
\(20\) −6.11536 + 6.11536i −0.305768 + 0.305768i
\(21\) 14.7869 1.48606i 0.704139 0.0707649i
\(22\) −9.11573 9.11573i −0.414351 0.414351i
\(23\) 7.15696 + 7.15696i 0.311172 + 0.311172i 0.845364 0.534191i \(-0.179384\pi\)
−0.534191 + 0.845364i \(0.679384\pi\)
\(24\) 6.56990 + 5.36996i 0.273746 + 0.223748i
\(25\) 6.30119i 0.252048i
\(26\) 3.20257 0.123176
\(27\) −12.5855 + 23.8873i −0.466130 + 0.884716i
\(28\) 7.00573 7.00573i 0.250205 0.250205i
\(29\) 6.56388 6.56388i 0.226341 0.226341i −0.584821 0.811162i \(-0.698835\pi\)
0.811162 + 0.584821i \(0.198835\pi\)
\(30\) −18.2541 + 1.83451i −0.608471 + 0.0611504i
\(31\) −22.2472 22.2472i −0.717651 0.717651i 0.250473 0.968124i \(-0.419414\pi\)
−0.968124 + 0.250473i \(0.919414\pi\)
\(32\) 5.65685 0.176777
\(33\) −2.73458 27.2101i −0.0828659 0.824549i
\(34\) −9.67314 22.0098i −0.284504 0.647346i
\(35\) 21.4213i 0.612037i
\(36\) 3.58177 + 17.6400i 0.0994936 + 0.490001i
\(37\) −49.6392 49.6392i −1.34160 1.34160i −0.894467 0.447134i \(-0.852445\pi\)
−0.447134 0.894467i \(-0.647555\pi\)
\(38\) 23.1665i 0.609646i
\(39\) 5.26014 + 4.29942i 0.134875 + 0.110242i
\(40\) −8.64842 + 8.64842i −0.216211 + 0.216211i
\(41\) 16.9856 + 16.9856i 0.414283 + 0.414283i 0.883227 0.468945i \(-0.155366\pi\)
−0.468945 + 0.883227i \(0.655366\pi\)
\(42\) 20.9119 2.10161i 0.497902 0.0500383i
\(43\) 18.0836i 0.420548i 0.977643 + 0.210274i \(0.0674356\pi\)
−0.977643 + 0.210274i \(0.932564\pi\)
\(44\) −12.8916 12.8916i −0.292991 0.292991i
\(45\) −32.4447 21.4928i −0.720994 0.477619i
\(46\) 10.1215 + 10.1215i 0.220032 + 0.220032i
\(47\) 79.1555i 1.68416i 0.539353 + 0.842080i \(0.318669\pi\)
−0.539353 + 0.842080i \(0.681331\pi\)
\(48\) 9.29124 + 7.59427i 0.193567 + 0.158214i
\(49\) 24.4598i 0.499180i
\(50\) 8.91123i 0.178225i
\(51\) 13.6600 49.1366i 0.267844 0.963462i
\(52\) 4.52912 0.0870985
\(53\) −68.2420 −1.28759 −0.643793 0.765200i \(-0.722640\pi\)
−0.643793 + 0.765200i \(0.722640\pi\)
\(54\) −17.7986 + 33.7818i −0.329604 + 0.625589i
\(55\) 39.4184 0.716697
\(56\) 9.90760 9.90760i 0.176922 0.176922i
\(57\) 31.1008 38.0504i 0.545629 0.667551i
\(58\) 9.28273 9.28273i 0.160047 0.160047i
\(59\) 108.015 1.83075 0.915377 0.402597i \(-0.131892\pi\)
0.915377 + 0.402597i \(0.131892\pi\)
\(60\) −25.8152 + 2.59439i −0.430254 + 0.0432399i
\(61\) 9.60289 9.60289i 0.157424 0.157424i −0.624000 0.781424i \(-0.714493\pi\)
0.781424 + 0.624000i \(0.214493\pi\)
\(62\) −31.4622 31.4622i −0.507456 0.507456i
\(63\) 37.1686 + 24.6221i 0.589978 + 0.390827i
\(64\) 8.00000 0.125000
\(65\) −6.92430 + 6.92430i −0.106528 + 0.106528i
\(66\) −3.86727 38.4809i −0.0585951 0.583044i
\(67\) 60.5593 0.903870 0.451935 0.892051i \(-0.350734\pi\)
0.451935 + 0.892051i \(0.350734\pi\)
\(68\) −13.6799 31.1265i −0.201175 0.457743i
\(69\) 3.03628 + 30.2122i 0.0440041 + 0.437858i
\(70\) 30.2943i 0.432775i
\(71\) −9.60666 + 9.60666i −0.135305 + 0.135305i −0.771516 0.636210i \(-0.780501\pi\)
0.636210 + 0.771516i \(0.280501\pi\)
\(72\) 5.06539 + 24.9468i 0.0703526 + 0.346483i
\(73\) 70.3897 + 70.3897i 0.964243 + 0.964243i 0.999382 0.0351395i \(-0.0111875\pi\)
−0.0351395 + 0.999382i \(0.511188\pi\)
\(74\) −70.2005 70.2005i −0.948655 0.948655i
\(75\) −11.9632 + 14.6365i −0.159510 + 0.195153i
\(76\) 32.7624i 0.431085i
\(77\) −45.1575 −0.586461
\(78\) 7.43896 + 6.08030i 0.0953713 + 0.0779525i
\(79\) −81.2199 + 81.2199i −1.02810 + 1.02810i −0.0285069 + 0.999594i \(0.509075\pi\)
−0.999594 + 0.0285069i \(0.990925\pi\)
\(80\) −12.2307 + 12.2307i −0.152884 + 0.152884i
\(81\) −74.5855 + 31.5913i −0.920808 + 0.390016i
\(82\) 24.0212 + 24.0212i 0.292942 + 0.292942i
\(83\) 165.328 1.99190 0.995951 0.0899016i \(-0.0286552\pi\)
0.995951 + 0.0899016i \(0.0286552\pi\)
\(84\) 29.5738 2.97213i 0.352070 0.0353824i
\(85\) 68.5018 + 26.6731i 0.805904 + 0.313802i
\(86\) 25.5740i 0.297372i
\(87\) 27.7086 2.78467i 0.318490 0.0320077i
\(88\) −18.2315 18.2315i −0.207176 0.207176i
\(89\) 40.2790i 0.452573i 0.974061 + 0.226287i \(0.0726586\pi\)
−0.974061 + 0.226287i \(0.927341\pi\)
\(90\) −45.8838 30.3955i −0.509820 0.337727i
\(91\) 7.93245 7.93245i 0.0871698 0.0871698i
\(92\) 14.3139 + 14.3139i 0.155586 + 0.155586i
\(93\) −9.43818 93.9137i −0.101486 1.00982i
\(94\) 111.943i 1.19088i
\(95\) 50.0885 + 50.0885i 0.527247 + 0.527247i
\(96\) 13.1398 + 10.7399i 0.136873 + 0.111874i
\(97\) −28.5480 28.5480i −0.294309 0.294309i 0.544471 0.838780i \(-0.316731\pi\)
−0.838780 + 0.544471i \(0.816731\pi\)
\(98\) 34.5914i 0.352974i
\(99\) 45.3084 68.3957i 0.457660 0.690866i
\(100\) 12.6024i 0.126024i
\(101\) 167.151i 1.65496i −0.561492 0.827482i \(-0.689773\pi\)
0.561492 0.827482i \(-0.310227\pi\)
\(102\) 19.3182 69.4896i 0.189394 0.681271i
\(103\) −22.3187 −0.216686 −0.108343 0.994114i \(-0.534555\pi\)
−0.108343 + 0.994114i \(0.534555\pi\)
\(104\) 6.40514 0.0615879
\(105\) −40.6698 + 49.7576i −0.387331 + 0.473882i
\(106\) −96.5088 −0.910460
\(107\) −104.198 + 104.198i −0.973816 + 0.973816i −0.999666 0.0258498i \(-0.991771\pi\)
0.0258498 + 0.999666i \(0.491771\pi\)
\(108\) −25.1710 + 47.7747i −0.233065 + 0.442358i
\(109\) −60.2159 + 60.2159i −0.552440 + 0.552440i −0.927144 0.374704i \(-0.877744\pi\)
0.374704 + 0.927144i \(0.377744\pi\)
\(110\) 55.7460 0.506782
\(111\) −21.0590 209.546i −0.189721 1.88780i
\(112\) 14.0115 14.0115i 0.125102 0.125102i
\(113\) −92.3651 92.3651i −0.817391 0.817391i 0.168339 0.985729i \(-0.446160\pi\)
−0.985729 + 0.168339i \(0.946160\pi\)
\(114\) 43.9832 53.8114i 0.385818 0.472030i
\(115\) −43.7674 −0.380586
\(116\) 13.1278 13.1278i 0.113170 0.113170i
\(117\) 4.05557 + 19.9735i 0.0346630 + 0.170713i
\(118\) 152.756 1.29454
\(119\) −78.4755 30.5567i −0.659458 0.256779i
\(120\) −36.5083 + 3.66902i −0.304235 + 0.0305752i
\(121\) 37.9034i 0.313252i
\(122\) 13.5805 13.5805i 0.111316 0.111316i
\(123\) 7.20600 + 71.7026i 0.0585853 + 0.582948i
\(124\) −44.4943 44.4943i −0.358825 0.358825i
\(125\) −95.7090 95.7090i −0.765672 0.765672i
\(126\) 52.5643 + 34.8209i 0.417177 + 0.276357i
\(127\) 42.9662i 0.338317i −0.985589 0.169158i \(-0.945895\pi\)
0.985589 0.169158i \(-0.0541049\pi\)
\(128\) 11.3137 0.0883883
\(129\) −34.3328 + 42.0046i −0.266146 + 0.325617i
\(130\) −9.79244 + 9.79244i −0.0753265 + 0.0753265i
\(131\) −10.1739 + 10.1739i −0.0776631 + 0.0776631i −0.744871 0.667208i \(-0.767489\pi\)
0.667208 + 0.744871i \(0.267489\pi\)
\(132\) −5.46915 54.4203i −0.0414330 0.412275i
\(133\) −57.3812 57.3812i −0.431438 0.431438i
\(134\) 85.6438 0.639133
\(135\) −34.5573 111.522i −0.255980 0.826091i
\(136\) −19.3463 44.0196i −0.142252 0.323673i
\(137\) 105.475i 0.769892i 0.922939 + 0.384946i \(0.125780\pi\)
−0.922939 + 0.384946i \(0.874220\pi\)
\(138\) 4.29395 + 42.7265i 0.0311156 + 0.309612i
\(139\) 3.58670 + 3.58670i 0.0258036 + 0.0258036i 0.719891 0.694087i \(-0.244192\pi\)
−0.694087 + 0.719891i \(0.744192\pi\)
\(140\) 42.8426i 0.306018i
\(141\) −150.282 + 183.863i −1.06583 + 1.30399i
\(142\) −13.5859 + 13.5859i −0.0956751 + 0.0956751i
\(143\) −14.5969 14.5969i −0.102076 0.102076i
\(144\) 7.16354 + 35.2801i 0.0497468 + 0.245001i
\(145\) 40.1405i 0.276831i
\(146\) 99.5461 + 99.5461i 0.681823 + 0.681823i
\(147\) −46.4387 + 56.8155i −0.315909 + 0.386500i
\(148\) −99.2785 99.2785i −0.670800 0.670800i
\(149\) 243.101i 1.63155i −0.578368 0.815776i \(-0.696310\pi\)
0.578368 0.815776i \(-0.303690\pi\)
\(150\) −16.9186 + 20.6991i −0.112790 + 0.137994i
\(151\) 135.072i 0.894520i 0.894404 + 0.447260i \(0.147600\pi\)
−0.894404 + 0.447260i \(0.852400\pi\)
\(152\) 46.3331i 0.304823i
\(153\) 125.019 88.2004i 0.817116 0.576473i
\(154\) −63.8624 −0.414691
\(155\) 136.049 0.877738
\(156\) 10.5203 + 8.59884i 0.0674377 + 0.0551208i
\(157\) 102.595 0.653469 0.326734 0.945116i \(-0.394052\pi\)
0.326734 + 0.945116i \(0.394052\pi\)
\(158\) −114.862 + 114.862i −0.726977 + 0.726977i
\(159\) −158.513 129.562i −0.996938 0.814856i
\(160\) −17.2968 + 17.2968i −0.108105 + 0.108105i
\(161\) 50.1397 0.311427
\(162\) −105.480 + 44.6768i −0.651110 + 0.275783i
\(163\) 90.8715 90.8715i 0.557494 0.557494i −0.371099 0.928593i \(-0.621019\pi\)
0.928593 + 0.371099i \(0.121019\pi\)
\(164\) 33.9712 + 33.9712i 0.207141 + 0.207141i
\(165\) 91.5613 + 74.8384i 0.554917 + 0.453566i
\(166\) 233.809 1.40849
\(167\) −90.3104 + 90.3104i −0.540781 + 0.540781i −0.923758 0.382977i \(-0.874899\pi\)
0.382977 + 0.923758i \(0.374899\pi\)
\(168\) 41.8237 4.20322i 0.248951 0.0250192i
\(169\) −163.872 −0.969655
\(170\) 96.8762 + 37.7215i 0.569860 + 0.221891i
\(171\) 144.483 29.3369i 0.844927 0.171561i
\(172\) 36.1671i 0.210274i
\(173\) −19.5661 + 19.5661i −0.113099 + 0.113099i −0.761391 0.648292i \(-0.775483\pi\)
0.648292 + 0.761391i \(0.275483\pi\)
\(174\) 39.1859 3.93812i 0.225206 0.0226329i
\(175\) 22.0722 + 22.0722i 0.126127 + 0.126127i
\(176\) −25.7832 25.7832i −0.146495 0.146495i
\(177\) 250.897 + 205.073i 1.41750 + 1.15860i
\(178\) 56.9632i 0.320018i
\(179\) −163.486 −0.913328 −0.456664 0.889639i \(-0.650956\pi\)
−0.456664 + 0.889639i \(0.650956\pi\)
\(180\) −64.8895 42.9857i −0.360497 0.238809i
\(181\) 122.461 122.461i 0.676579 0.676579i −0.282645 0.959224i \(-0.591212\pi\)
0.959224 + 0.282645i \(0.0912120\pi\)
\(182\) 11.2182 11.2182i 0.0616384 0.0616384i
\(183\) 40.5374 4.07395i 0.221516 0.0222620i
\(184\) 20.2429 + 20.2429i 0.110016 + 0.110016i
\(185\) 303.562 1.64087
\(186\) −13.3476 132.814i −0.0717613 0.714054i
\(187\) −56.2288 + 144.406i −0.300689 + 0.772227i
\(188\) 158.311i 0.842080i
\(189\) 39.5888 + 127.760i 0.209464 + 0.675976i
\(190\) 70.8358 + 70.8358i 0.372820 + 0.372820i
\(191\) 92.3252i 0.483378i 0.970354 + 0.241689i \(0.0777013\pi\)
−0.970354 + 0.241689i \(0.922299\pi\)
\(192\) 18.5825 + 15.1885i 0.0967837 + 0.0791070i
\(193\) 218.951 218.951i 1.13446 1.13446i 0.145033 0.989427i \(-0.453671\pi\)
0.989427 0.145033i \(-0.0463289\pi\)
\(194\) −40.3730 40.3730i −0.208108 0.208108i
\(195\) −29.2301 + 2.93758i −0.149898 + 0.0150645i
\(196\) 48.9197i 0.249590i
\(197\) 71.3747 + 71.3747i 0.362308 + 0.362308i 0.864662 0.502354i \(-0.167533\pi\)
−0.502354 + 0.864662i \(0.667533\pi\)
\(198\) 64.0757 96.7261i 0.323615 0.488516i
\(199\) 110.195 + 110.195i 0.553744 + 0.553744i 0.927519 0.373775i \(-0.121937\pi\)
−0.373775 + 0.927519i \(0.621937\pi\)
\(200\) 17.8225i 0.0891123i
\(201\) 140.668 + 114.976i 0.699839 + 0.572019i
\(202\) 236.388i 1.17024i
\(203\) 45.9848i 0.226526i
\(204\) 27.3201 98.2732i 0.133922 0.481731i
\(205\) −103.873 −0.506697
\(206\) −31.5634 −0.153220
\(207\) −50.3072 + 75.9418i −0.243030 + 0.366868i
\(208\) 9.05824 0.0435492
\(209\) −105.590 + 105.590i −0.505215 + 0.505215i
\(210\) −57.5157 + 70.3678i −0.273884 + 0.335085i
\(211\) 48.0391 48.0391i 0.227674 0.227674i −0.584047 0.811720i \(-0.698531\pi\)
0.811720 + 0.584047i \(0.198531\pi\)
\(212\) −136.484 −0.643793
\(213\) −40.5533 + 4.07555i −0.190391 + 0.0191340i
\(214\) −147.359 + 147.359i −0.688592 + 0.688592i
\(215\) −55.2937 55.2937i −0.257180 0.257180i
\(216\) −35.5972 + 67.5636i −0.164802 + 0.312794i
\(217\) −155.858 −0.718238
\(218\) −85.1582 + 85.1582i −0.390634 + 0.390634i
\(219\) 29.8623 + 297.142i 0.136357 + 1.35681i
\(220\) 78.8367 0.358349
\(221\) −15.4895 35.2440i −0.0700880 0.159475i
\(222\) −29.7820 296.343i −0.134153 1.33488i
\(223\) 343.681i 1.54117i −0.637337 0.770585i \(-0.719964\pi\)
0.637337 0.770585i \(-0.280036\pi\)
\(224\) 19.8152 19.8152i 0.0884608 0.0884608i
\(225\) −55.5766 + 11.2847i −0.247007 + 0.0501542i
\(226\) −130.624 130.624i −0.577982 0.577982i
\(227\) −266.074 266.074i −1.17213 1.17213i −0.981700 0.190433i \(-0.939011\pi\)
−0.190433 0.981700i \(-0.560989\pi\)
\(228\) 62.2017 76.1009i 0.272814 0.333776i
\(229\) 276.854i 1.20897i 0.796617 + 0.604484i \(0.206621\pi\)
−0.796617 + 0.604484i \(0.793379\pi\)
\(230\) −61.8964 −0.269115
\(231\) −104.892 85.7346i −0.454079 0.371145i
\(232\) 18.5655 18.5655i 0.0800235 0.0800235i
\(233\) 212.257 212.257i 0.910974 0.910974i −0.0853750 0.996349i \(-0.527209\pi\)
0.996349 + 0.0853750i \(0.0272088\pi\)
\(234\) 5.73544 + 28.2467i 0.0245104 + 0.120713i
\(235\) −242.032 242.032i −1.02992 1.02992i
\(236\) 216.029 0.915377
\(237\) −342.860 + 34.4569i −1.44667 + 0.145388i
\(238\) −110.981 43.2136i −0.466307 0.181570i
\(239\) 164.670i 0.688995i 0.938787 + 0.344497i \(0.111951\pi\)
−0.938787 + 0.344497i \(0.888049\pi\)
\(240\) −51.6305 + 5.18878i −0.215127 + 0.0216199i
\(241\) −102.383 102.383i −0.424826 0.424826i 0.462035 0.886862i \(-0.347119\pi\)
−0.886862 + 0.462035i \(0.847119\pi\)
\(242\) 53.6036i 0.221502i
\(243\) −233.226 68.2250i −0.959778 0.280761i
\(244\) 19.2058 19.2058i 0.0787122 0.0787122i
\(245\) −74.7904 74.7904i −0.305267 0.305267i
\(246\) 10.1908 + 101.403i 0.0414261 + 0.412206i
\(247\) 37.0962i 0.150187i
\(248\) −62.9245 62.9245i −0.253728 0.253728i
\(249\) 384.025 + 313.886i 1.54227 + 1.26059i
\(250\) −135.353 135.353i −0.541412 0.541412i
\(251\) 14.5020i 0.0577769i 0.999583 + 0.0288885i \(0.00919677\pi\)
−0.999583 + 0.0288885i \(0.990803\pi\)
\(252\) 74.3372 + 49.2442i 0.294989 + 0.195414i
\(253\) 92.2646i 0.364682i
\(254\) 60.7634i 0.239226i
\(255\) 108.476 + 192.012i 0.425396 + 0.752988i
\(256\) 16.0000 0.0625000
\(257\) 268.938 1.04645 0.523225 0.852194i \(-0.324729\pi\)
0.523225 + 0.852194i \(0.324729\pi\)
\(258\) −48.5540 + 59.4035i −0.188194 + 0.230246i
\(259\) −347.759 −1.34270
\(260\) −13.8486 + 13.8486i −0.0532638 + 0.0532638i
\(261\) 69.6487 + 46.1384i 0.266853 + 0.176775i
\(262\) −14.3880 + 14.3880i −0.0549161 + 0.0549161i
\(263\) 291.070 1.10673 0.553365 0.832939i \(-0.313343\pi\)
0.553365 + 0.832939i \(0.313343\pi\)
\(264\) −7.73455 76.9619i −0.0292975 0.291522i
\(265\) 208.662 208.662i 0.787405 0.787405i
\(266\) −81.1493 81.1493i −0.305072 0.305072i
\(267\) −76.4725 + 93.5605i −0.286414 + 0.350414i
\(268\) 121.119 0.451935
\(269\) −207.923 + 207.923i −0.772947 + 0.772947i −0.978621 0.205673i \(-0.934062\pi\)
0.205673 + 0.978621i \(0.434062\pi\)
\(270\) −48.8715 157.716i −0.181005 0.584135i
\(271\) 30.6638 0.113151 0.0565754 0.998398i \(-0.481982\pi\)
0.0565754 + 0.998398i \(0.481982\pi\)
\(272\) −27.3598 62.2531i −0.100587 0.228872i
\(273\) 33.4859 3.36528i 0.122659 0.0123270i
\(274\) 149.165i 0.544396i
\(275\) 40.6162 40.6162i 0.147695 0.147695i
\(276\) 6.07256 + 60.4244i 0.0220020 + 0.218929i
\(277\) 48.6256 + 48.6256i 0.175544 + 0.175544i 0.789410 0.613866i \(-0.210387\pi\)
−0.613866 + 0.789410i \(0.710387\pi\)
\(278\) 5.07235 + 5.07235i 0.0182459 + 0.0182459i
\(279\) 156.378 236.063i 0.560496 0.846102i
\(280\) 60.5886i 0.216388i
\(281\) 69.2460 0.246427 0.123214 0.992380i \(-0.460680\pi\)
0.123214 + 0.992380i \(0.460680\pi\)
\(282\) −212.531 + 260.022i −0.753656 + 0.922063i
\(283\) 212.579 212.579i 0.751164 0.751164i −0.223532 0.974697i \(-0.571759\pi\)
0.974697 + 0.223532i \(0.0717588\pi\)
\(284\) −19.2133 + 19.2133i −0.0676525 + 0.0676525i
\(285\) 21.2496 + 211.442i 0.0745601 + 0.741903i
\(286\) −20.6431 20.6431i −0.0721788 0.0721788i
\(287\) 118.997 0.414622
\(288\) 10.1308 + 49.8936i 0.0351763 + 0.173242i
\(289\) −195.430 + 212.904i −0.676230 + 0.736691i
\(290\) 56.7672i 0.195749i
\(291\) −12.1113 120.512i −0.0416195 0.414130i
\(292\) 140.779 + 140.779i 0.482121 + 0.482121i
\(293\) 175.749i 0.599825i −0.953967 0.299913i \(-0.903042\pi\)
0.953967 0.299913i \(-0.0969576\pi\)
\(294\) −65.6742 + 80.3493i −0.223382 + 0.273297i
\(295\) −330.274 + 330.274i −1.11957 + 1.11957i
\(296\) −140.401 140.401i −0.474327 0.474327i
\(297\) 235.097 72.8492i 0.791571 0.245284i
\(298\) 343.797i 1.15368i
\(299\) 16.2074 + 16.2074i 0.0542052 + 0.0542052i
\(300\) −23.9265 + 29.2729i −0.0797549 + 0.0975764i
\(301\) 63.3443 + 63.3443i 0.210446 + 0.210446i
\(302\) 191.021i 0.632521i
\(303\) 317.348 388.261i 1.04735 1.28139i
\(304\) 65.5248i 0.215542i
\(305\) 58.7251i 0.192541i
\(306\) 176.803 124.734i 0.577788 0.407628i
\(307\) 526.455 1.71484 0.857419 0.514619i \(-0.172067\pi\)
0.857419 + 0.514619i \(0.172067\pi\)
\(308\) −90.3151 −0.293231
\(309\) −51.8421 42.3735i −0.167774 0.137131i
\(310\) 192.403 0.620655
\(311\) 168.301 168.301i 0.541160 0.541160i −0.382709 0.923869i \(-0.625009\pi\)
0.923869 + 0.382709i \(0.125009\pi\)
\(312\) 14.8779 + 12.1606i 0.0476857 + 0.0389763i
\(313\) −313.933 + 313.933i −1.00298 + 1.00298i −0.00298652 + 0.999996i \(0.500951\pi\)
−0.999996 + 0.00298652i \(0.999049\pi\)
\(314\) 145.091 0.462072
\(315\) −188.936 + 38.3631i −0.599797 + 0.121787i
\(316\) −162.440 + 162.440i −0.514050 + 0.514050i
\(317\) −412.404 412.404i −1.30096 1.30096i −0.927745 0.373216i \(-0.878255\pi\)
−0.373216 0.927745i \(-0.621745\pi\)
\(318\) −224.172 183.228i −0.704942 0.576190i
\(319\) −84.6189 −0.265263
\(320\) −24.4614 + 24.4614i −0.0764420 + 0.0764420i
\(321\) −439.860 + 44.2053i −1.37028 + 0.137711i
\(322\) 70.9083 0.220212
\(323\) −254.945 + 112.047i −0.789304 + 0.346893i
\(324\) −149.171 + 63.1825i −0.460404 + 0.195008i
\(325\) 14.2694i 0.0439059i
\(326\) 128.512 128.512i 0.394208 0.394208i
\(327\) −254.194 + 25.5461i −0.777352 + 0.0781227i
\(328\) 48.0425 + 48.0425i 0.146471 + 0.146471i
\(329\) 277.271 + 277.271i 0.842769 + 0.842769i
\(330\) 129.487 + 105.837i 0.392386 + 0.320720i
\(331\) 195.845i 0.591676i 0.955238 + 0.295838i \(0.0955989\pi\)
−0.955238 + 0.295838i \(0.904401\pi\)
\(332\) 330.656 0.995951
\(333\) 348.921 526.717i 1.04781 1.58173i
\(334\) −127.718 + 127.718i −0.382390 + 0.382390i
\(335\) −185.171 + 185.171i −0.552749 + 0.552749i
\(336\) 59.1477 5.94425i 0.176035 0.0176912i
\(337\) 358.030 + 358.030i 1.06240 + 1.06240i 0.997919 + 0.0644838i \(0.0205401\pi\)
0.0644838 + 0.997919i \(0.479460\pi\)
\(338\) −231.750 −0.685650
\(339\) −39.1852 389.908i −0.115590 1.15017i
\(340\) 137.004 + 53.3463i 0.402952 + 0.156901i
\(341\) 286.801i 0.841060i
\(342\) 204.329 41.4886i 0.597454 0.121312i
\(343\) 257.320 + 257.320i 0.750204 + 0.750204i
\(344\) 51.1480i 0.148686i
\(345\) −101.663 83.0953i −0.294676 0.240856i
\(346\) −27.6707 + 27.6707i −0.0799731 + 0.0799731i
\(347\) −61.9535 61.9535i −0.178540 0.178540i 0.612179 0.790719i \(-0.290293\pi\)
−0.790719 + 0.612179i \(0.790293\pi\)
\(348\) 55.4172 5.56934i 0.159245 0.0160039i
\(349\) 165.579i 0.474439i 0.971456 + 0.237220i \(0.0762361\pi\)
−0.971456 + 0.237220i \(0.923764\pi\)
\(350\) 31.2148 + 31.2148i 0.0891853 + 0.0891853i
\(351\) −28.5007 + 54.0943i −0.0811985 + 0.154115i
\(352\) −36.4629 36.4629i −0.103588 0.103588i
\(353\) 41.8884i 0.118664i 0.998238 + 0.0593319i \(0.0188970\pi\)
−0.998238 + 0.0593319i \(0.981103\pi\)
\(354\) 354.822 + 290.017i 1.00232 + 0.819256i
\(355\) 58.7482i 0.165488i
\(356\) 80.5581i 0.226287i
\(357\) −124.270 219.968i −0.348094 0.616157i
\(358\) −231.204 −0.645821
\(359\) −404.427 −1.12654 −0.563269 0.826274i \(-0.690456\pi\)
−0.563269 + 0.826274i \(0.690456\pi\)
\(360\) −91.7676 60.7909i −0.254910 0.168864i
\(361\) 92.6559 0.256665
\(362\) 173.186 173.186i 0.478414 0.478414i
\(363\) 71.9622 88.0425i 0.198243 0.242541i
\(364\) 15.8649 15.8649i 0.0435849 0.0435849i
\(365\) −430.459 −1.17934
\(366\) 57.3286 5.76143i 0.156635 0.0157416i
\(367\) 248.887 248.887i 0.678167 0.678167i −0.281418 0.959585i \(-0.590805\pi\)
0.959585 + 0.281418i \(0.0908048\pi\)
\(368\) 28.6278 + 28.6278i 0.0777930 + 0.0777930i
\(369\) −119.394 + 180.232i −0.323561 + 0.488435i
\(370\) 429.301 1.16027
\(371\) −239.043 + 239.043i −0.644320 + 0.644320i
\(372\) −18.8764 187.827i −0.0507429 0.504912i
\(373\) 63.0002 0.168901 0.0844507 0.996428i \(-0.473086\pi\)
0.0844507 + 0.996428i \(0.473086\pi\)
\(374\) −79.5195 + 204.222i −0.212619 + 0.546047i
\(375\) −40.6038 404.024i −0.108277 1.07740i
\(376\) 223.886i 0.595440i
\(377\) 14.8643 14.8643i 0.0394279 0.0394279i
\(378\) 55.9870 + 180.679i 0.148114 + 0.477988i
\(379\) 340.542 + 340.542i 0.898527 + 0.898527i 0.995306 0.0967791i \(-0.0308540\pi\)
−0.0967791 + 0.995306i \(0.530854\pi\)
\(380\) 100.177 + 100.177i 0.263624 + 0.263624i
\(381\) 81.5743 99.8023i 0.214106 0.261948i
\(382\) 130.567i 0.341800i
\(383\) 507.354 1.32468 0.662342 0.749202i \(-0.269563\pi\)
0.662342 + 0.749202i \(0.269563\pi\)
\(384\) 26.2796 + 21.4798i 0.0684364 + 0.0559371i
\(385\) 138.077 138.077i 0.358642 0.358642i
\(386\) 309.643 309.643i 0.802184 0.802184i
\(387\) −159.497 + 32.3856i −0.412138 + 0.0836836i
\(388\) −57.0960 57.0960i −0.147155 0.147155i
\(389\) −23.5326 −0.0604952 −0.0302476 0.999542i \(-0.509630\pi\)
−0.0302476 + 0.999542i \(0.509630\pi\)
\(390\) −41.3376 + 4.15436i −0.105994 + 0.0106522i
\(391\) 62.4325 160.339i 0.159674 0.410074i
\(392\) 69.1829i 0.176487i
\(393\) −42.9477 + 4.31618i −0.109282 + 0.0109826i
\(394\) 100.939 + 100.939i 0.256190 + 0.256190i
\(395\) 496.689i 1.25744i
\(396\) 90.6167 136.791i 0.228830 0.345433i
\(397\) 269.112 269.112i 0.677863 0.677863i −0.281653 0.959516i \(-0.590883\pi\)
0.959516 + 0.281653i \(0.0908827\pi\)
\(398\) 155.839 + 155.839i 0.391556 + 0.391556i
\(399\) −24.3435 242.228i −0.0610113 0.607087i
\(400\) 25.2048i 0.0630119i
\(401\) 305.035 + 305.035i 0.760687 + 0.760687i 0.976447 0.215760i \(-0.0692227\pi\)
−0.215760 + 0.976447i \(0.569223\pi\)
\(402\) 198.934 + 162.600i 0.494861 + 0.404479i
\(403\) −50.3801 50.3801i −0.125013 0.125013i
\(404\) 334.303i 0.827482i
\(405\) 131.462 324.654i 0.324599 0.801616i
\(406\) 65.0323i 0.160178i
\(407\) 639.929i 1.57231i
\(408\) 38.6364 138.979i 0.0946971 0.340635i
\(409\) −439.207 −1.07386 −0.536928 0.843628i \(-0.680415\pi\)
−0.536928 + 0.843628i \(0.680415\pi\)
\(410\) −146.899 −0.358289
\(411\) −200.252 + 244.999i −0.487231 + 0.596104i
\(412\) −44.6374 −0.108343
\(413\) 378.360 378.360i 0.916127 0.916127i
\(414\) −71.1451 + 107.398i −0.171848 + 0.259415i
\(415\) −505.519 + 505.519i −1.21812 + 1.21812i
\(416\) 12.8103 0.0307940
\(417\) 1.52163 + 15.1408i 0.00364898 + 0.0363089i
\(418\) −149.327 + 149.327i −0.357241 + 0.357241i
\(419\) −54.5759 54.5759i −0.130253 0.130253i 0.638975 0.769228i \(-0.279359\pi\)
−0.769228 + 0.638975i \(0.779359\pi\)
\(420\) −81.3395 + 99.5151i −0.193666 + 0.236941i
\(421\) −718.243 −1.70604 −0.853020 0.521878i \(-0.825232\pi\)
−0.853020 + 0.521878i \(0.825232\pi\)
\(422\) 67.9376 67.9376i 0.160990 0.160990i
\(423\) −698.153 + 141.758i −1.65048 + 0.335126i
\(424\) −193.018 −0.455230
\(425\) 98.0671 43.0998i 0.230746 0.101411i
\(426\) −57.3511 + 5.76369i −0.134627 + 0.0135298i
\(427\) 67.2753i 0.157553i
\(428\) −208.397 + 208.397i −0.486908 + 0.486908i
\(429\) −6.19261 61.6190i −0.0144350 0.143634i
\(430\) −78.1971 78.1971i −0.181854 0.181854i
\(431\) 486.540 + 486.540i 1.12886 + 1.12886i 0.990362 + 0.138501i \(0.0442284\pi\)
0.138501 + 0.990362i \(0.455772\pi\)
\(432\) −50.3421 + 95.5493i −0.116533 + 0.221179i
\(433\) 401.213i 0.926589i −0.886204 0.463295i \(-0.846667\pi\)
0.886204 0.463295i \(-0.153333\pi\)
\(434\) −220.416 −0.507871
\(435\) −76.2094 + 93.2387i −0.175194 + 0.214342i
\(436\) −120.432 + 120.432i −0.276220 + 0.276220i
\(437\) 117.240 117.240i 0.268283 0.268283i
\(438\) 42.2316 + 420.222i 0.0964192 + 0.959410i
\(439\) −224.591 224.591i −0.511596 0.511596i 0.403419 0.915015i \(-0.367822\pi\)
−0.915015 + 0.403419i \(0.867822\pi\)
\(440\) 111.492 0.253391
\(441\) −215.736 + 43.8048i −0.489198 + 0.0993305i
\(442\) −21.9054 49.8425i −0.0495597 0.112766i
\(443\) 224.083i 0.505832i 0.967488 + 0.252916i \(0.0813896\pi\)
−0.967488 + 0.252916i \(0.918610\pi\)
\(444\) −42.1181 419.092i −0.0948605 0.943900i
\(445\) −123.160 123.160i −0.276765 0.276765i
\(446\) 486.038i 1.08977i
\(447\) 461.544 564.678i 1.03254 1.26326i
\(448\) 28.0229 28.0229i 0.0625512 0.0625512i
\(449\) −166.816 166.816i −0.371527 0.371527i 0.496506 0.868033i \(-0.334616\pi\)
−0.868033 + 0.496506i \(0.834616\pi\)
\(450\) −78.5972 + 15.9590i −0.174660 + 0.0354644i
\(451\) 218.971i 0.485524i
\(452\) −184.730 184.730i −0.408695 0.408695i
\(453\) −256.444 + 313.748i −0.566102 + 0.692599i
\(454\) −376.286 376.286i −0.828823 0.828823i
\(455\) 48.5098i 0.106615i
\(456\) 87.9664 107.623i 0.192909 0.236015i
\(457\) 358.924i 0.785391i 0.919669 + 0.392695i \(0.128457\pi\)
−0.919669 + 0.392695i \(0.871543\pi\)
\(458\) 391.530i 0.854870i
\(459\) 457.849 + 32.4838i 0.997493 + 0.0707708i
\(460\) −87.5347 −0.190293
\(461\) −666.524 −1.44582 −0.722911 0.690941i \(-0.757196\pi\)
−0.722911 + 0.690941i \(0.757196\pi\)
\(462\) −148.340 121.247i −0.321083 0.262439i
\(463\) −175.521 −0.379096 −0.189548 0.981871i \(-0.560702\pi\)
−0.189548 + 0.981871i \(0.560702\pi\)
\(464\) 26.2555 26.2555i 0.0565852 0.0565852i
\(465\) 316.017 + 258.299i 0.679606 + 0.555482i
\(466\) 300.177 300.177i 0.644156 0.644156i
\(467\) −314.564 −0.673585 −0.336793 0.941579i \(-0.609342\pi\)
−0.336793 + 0.941579i \(0.609342\pi\)
\(468\) 8.11113 + 39.9469i 0.0173315 + 0.0853567i
\(469\) 212.131 212.131i 0.452305 0.452305i
\(470\) −342.285 342.285i −0.728266 0.728266i
\(471\) 238.308 + 194.783i 0.505961 + 0.413552i
\(472\) 305.511 0.647269
\(473\) 116.563 116.563i 0.246433 0.246433i
\(474\) −484.877 + 48.7294i −1.02295 + 0.102805i
\(475\) 103.221 0.217308
\(476\) −156.951 61.1133i −0.329729 0.128389i
\(477\) −122.214 601.896i −0.256213 1.26184i
\(478\) 232.878i 0.487193i
\(479\) 317.240 317.240i 0.662297 0.662297i −0.293624 0.955921i \(-0.594861\pi\)
0.955921 + 0.293624i \(0.0948614\pi\)
\(480\) −73.0165 + 7.33805i −0.152118 + 0.0152876i
\(481\) −112.411 112.411i −0.233703 0.233703i
\(482\) −144.792 144.792i −0.300398 0.300398i
\(483\) 116.465 + 95.1937i 0.241128 + 0.197088i
\(484\) 75.8069i 0.156626i
\(485\) 174.581 0.359962
\(486\) −329.831 96.4848i −0.678665 0.198528i
\(487\) 319.242 319.242i 0.655528 0.655528i −0.298790 0.954319i \(-0.596583\pi\)
0.954319 + 0.298790i \(0.0965832\pi\)
\(488\) 27.1611 27.1611i 0.0556580 0.0556580i
\(489\) 383.603 38.5515i 0.784464 0.0788374i
\(490\) −105.770 105.770i −0.215856 0.215856i
\(491\) 148.054 0.301537 0.150768 0.988569i \(-0.451825\pi\)
0.150768 + 0.988569i \(0.451825\pi\)
\(492\) 14.4120 + 143.405i 0.0292927 + 0.291474i
\(493\) −147.052 57.2589i −0.298280 0.116144i
\(494\) 52.4620i 0.106198i
\(495\) 70.5937 + 347.671i 0.142614 + 0.702365i
\(496\) −88.9887 88.9887i −0.179413 0.179413i
\(497\) 67.3017i 0.135416i
\(498\) 543.093 + 443.902i 1.09055 + 0.891369i
\(499\) −383.524 + 383.524i −0.768585 + 0.768585i −0.977857 0.209272i \(-0.932891\pi\)
0.209272 + 0.977857i \(0.432891\pi\)
\(500\) −191.418 191.418i −0.382836 0.382836i
\(501\) −381.234 + 38.3134i −0.760946 + 0.0764739i
\(502\) 20.5089i 0.0408545i
\(503\) 43.5758 + 43.5758i 0.0866319 + 0.0866319i 0.749095 0.662463i \(-0.230489\pi\)
−0.662463 + 0.749095i \(0.730489\pi\)
\(504\) 105.129 + 69.6419i 0.208589 + 0.138178i
\(505\) 511.095 + 511.095i 1.01207 + 1.01207i
\(506\) 130.482i 0.257869i
\(507\) −380.643 311.122i −0.750775 0.613652i
\(508\) 85.9325i 0.169158i
\(509\) 786.816i 1.54581i 0.634524 + 0.772904i \(0.281196\pi\)
−0.634524 + 0.772904i \(0.718804\pi\)
\(510\) 153.408 + 271.546i 0.300800 + 0.532443i
\(511\) 493.132 0.965033
\(512\) 22.6274 0.0441942
\(513\) 391.303 + 206.166i 0.762775 + 0.401883i
\(514\) 380.336 0.739952
\(515\) 68.2434 68.2434i 0.132511 0.132511i
\(516\) −68.6657 + 84.0093i −0.133073 + 0.162809i
\(517\) 510.220 510.220i 0.986886 0.986886i
\(518\) −491.806 −0.949432
\(519\) −82.5961 + 8.30078i −0.159145 + 0.0159938i
\(520\) −19.5849 + 19.5849i −0.0376632 + 0.0376632i
\(521\) 167.182 + 167.182i 0.320888 + 0.320888i 0.849108 0.528220i \(-0.177140\pi\)
−0.528220 + 0.849108i \(0.677140\pi\)
\(522\) 98.4981 + 65.2495i 0.188694 + 0.124999i
\(523\) −641.177 −1.22596 −0.612980 0.790099i \(-0.710029\pi\)
−0.612980 + 0.790099i \(0.710029\pi\)
\(524\) −20.3477 + 20.3477i −0.0388315 + 0.0388315i
\(525\) 9.36396 + 93.1752i 0.0178361 + 0.177477i
\(526\) 411.635 0.782577
\(527\) −194.069 + 498.408i −0.368253 + 0.945745i
\(528\) −10.9383 108.841i −0.0207165 0.206137i
\(529\) 426.556i 0.806344i
\(530\) 295.093 295.093i 0.556779 0.556779i
\(531\) 193.442 + 952.690i 0.364297 + 1.79414i
\(532\) −114.762 114.762i −0.215719 0.215719i
\(533\) 38.4649 + 38.4649i 0.0721668 + 0.0721668i
\(534\) −108.148 + 132.315i −0.202525 + 0.247780i
\(535\) 637.210i 1.19105i
\(536\) 171.288 0.319566
\(537\) −379.746 310.389i −0.707162 0.578005i
\(538\) −294.047 + 294.047i −0.546556 + 0.546556i
\(539\) 157.663 157.663i 0.292510 0.292510i
\(540\) −69.1147 223.045i −0.127990 0.413046i
\(541\) 171.204 + 171.204i 0.316458 + 0.316458i 0.847405 0.530947i \(-0.178164\pi\)
−0.530947 + 0.847405i \(0.678164\pi\)
\(542\) 43.3652 0.0800096
\(543\) 516.953 51.9530i 0.952031 0.0956777i
\(544\) −38.6925 88.0391i −0.0711260 0.161837i
\(545\) 368.242i 0.675674i
\(546\) 47.3562 4.75922i 0.0867329 0.00871653i
\(547\) −284.575 284.575i −0.520247 0.520247i 0.397399 0.917646i \(-0.369913\pi\)
−0.917646 + 0.397399i \(0.869913\pi\)
\(548\) 210.951i 0.384946i
\(549\) 101.895 + 67.5000i 0.185602 + 0.122951i
\(550\) 57.4399 57.4399i 0.104436 0.104436i
\(551\) −107.524 107.524i −0.195144 0.195144i
\(552\) 8.58790 + 85.4530i 0.0155578 + 0.154806i
\(553\) 569.005i 1.02894i
\(554\) 68.7670 + 68.7670i 0.124128 + 0.124128i
\(555\) 705.116 + 576.332i 1.27048 + 1.03844i
\(556\) 7.17339 + 7.17339i 0.0129018 + 0.0129018i
\(557\) 383.754i 0.688966i −0.938793 0.344483i \(-0.888054\pi\)
0.938793 0.344483i \(-0.111946\pi\)
\(558\) 221.152 333.843i 0.396330 0.598285i
\(559\) 40.9513i 0.0732581i
\(560\) 85.6852i 0.153009i
\(561\) −404.774 + 228.675i −0.721522 + 0.407620i
\(562\) 97.9286 0.174250
\(563\) 12.8676 0.0228555 0.0114277 0.999935i \(-0.496362\pi\)
0.0114277 + 0.999935i \(0.496362\pi\)
\(564\) −300.564 + 367.726i −0.532915 + 0.651997i
\(565\) 564.846 0.999727
\(566\) 300.633 300.633i 0.531153 0.531153i
\(567\) −150.603 + 371.923i −0.265614 + 0.655949i
\(568\) −27.1717 + 27.1717i −0.0478376 + 0.0478376i
\(569\) −516.933 −0.908493 −0.454247 0.890876i \(-0.650092\pi\)
−0.454247 + 0.890876i \(0.650092\pi\)
\(570\) 30.0515 + 299.025i 0.0527220 + 0.524605i
\(571\) −753.602 + 753.602i −1.31979 + 1.31979i −0.405857 + 0.913936i \(0.633027\pi\)
−0.913936 + 0.405857i \(0.866973\pi\)
\(572\) −29.1938 29.1938i −0.0510381 0.0510381i
\(573\) −175.286 + 214.454i −0.305908 + 0.374265i
\(574\) 168.286 0.293182
\(575\) −45.0973 + 45.0973i −0.0784302 + 0.0784302i
\(576\) 14.3271 + 70.5602i 0.0248734 + 0.122500i
\(577\) −380.406 −0.659283 −0.329641 0.944106i \(-0.606928\pi\)
−0.329641 + 0.944106i \(0.606928\pi\)
\(578\) −276.380 + 301.091i −0.478167 + 0.520919i
\(579\) 924.274 92.8881i 1.59633 0.160428i
\(580\) 80.2810i 0.138415i
\(581\) 579.121 579.121i 0.996767 0.996767i
\(582\) −17.1279 170.430i −0.0294294 0.292834i
\(583\) 439.874 + 439.874i 0.754501 + 0.754501i
\(584\) 199.092 + 199.092i 0.340911 + 0.340911i
\(585\) −73.4731 48.6718i −0.125595 0.0831997i
\(586\) 248.546i 0.424141i
\(587\) 857.140 1.46020 0.730102 0.683338i \(-0.239472\pi\)
0.730102 + 0.683338i \(0.239472\pi\)
\(588\) −92.8773 + 113.631i −0.157955 + 0.193250i
\(589\) −364.436 + 364.436i −0.618736 + 0.618736i
\(590\) −467.078 + 467.078i −0.791657 + 0.791657i
\(591\) 30.2801 + 301.299i 0.0512354 + 0.509813i
\(592\) −198.557 198.557i −0.335400 0.335400i
\(593\) −691.294 −1.16576 −0.582878 0.812559i \(-0.698074\pi\)
−0.582878 + 0.812559i \(0.698074\pi\)
\(594\) 332.477 103.024i 0.559725 0.173442i
\(595\) 333.385 146.520i 0.560311 0.246253i
\(596\) 486.202i 0.815776i
\(597\) 46.7494 + 465.175i 0.0783072 + 0.779188i
\(598\) 22.9207 + 22.9207i 0.0383289 + 0.0383289i
\(599\) 674.839i 1.12661i −0.826250 0.563304i \(-0.809530\pi\)
0.826250 0.563304i \(-0.190470\pi\)
\(600\) −33.8371 + 41.3982i −0.0563952 + 0.0689969i
\(601\) 606.268 606.268i 1.00877 1.00877i 0.00880462 0.999961i \(-0.497197\pi\)
0.999961 0.00880462i \(-0.00280263\pi\)
\(602\) 89.5823 + 89.5823i 0.148808 + 0.148808i
\(603\) 108.455 + 534.134i 0.179859 + 0.885795i
\(604\) 270.145i 0.447260i
\(605\) 115.897 + 115.897i 0.191565 + 0.191565i
\(606\) 448.798 549.083i 0.740591 0.906078i
\(607\) −90.0709 90.0709i −0.148387 0.148387i 0.629010 0.777397i \(-0.283460\pi\)
−0.777397 + 0.629010i \(0.783460\pi\)
\(608\) 92.6661i 0.152411i
\(609\) 87.3052 106.814i 0.143358 0.175392i
\(610\) 83.0499i 0.136147i
\(611\) 179.252i 0.293375i
\(612\) 250.038 176.401i 0.408558 0.288237i
\(613\) −661.357 −1.07889 −0.539443 0.842022i \(-0.681365\pi\)
−0.539443 + 0.842022i \(0.681365\pi\)
\(614\) 744.520 1.21257
\(615\) −241.277 197.210i −0.392320 0.320666i
\(616\) −127.725 −0.207345
\(617\) 296.006 296.006i 0.479751 0.479751i −0.425301 0.905052i \(-0.639832\pi\)
0.905052 + 0.425301i \(0.139832\pi\)
\(618\) −73.3157 59.9252i −0.118634 0.0969664i
\(619\) 671.731 671.731i 1.08519 1.08519i 0.0891716 0.996016i \(-0.471578\pi\)
0.996016 0.0891716i \(-0.0284220\pi\)
\(620\) 272.099 0.438869
\(621\) −261.035 + 80.8866i −0.420346 + 0.130252i
\(622\) 238.013 238.013i 0.382658 0.382658i
\(623\) 141.092 + 141.092i 0.226472 + 0.226472i
\(624\) 21.0406 + 17.1977i 0.0337189 + 0.0275604i
\(625\) 427.765 0.684424
\(626\) −443.969 + 443.969i −0.709215 + 0.709215i
\(627\) −445.735 + 44.7957i −0.710901 + 0.0714444i
\(628\) 205.189 0.326734
\(629\) −433.019 + 1112.08i −0.688425 + 1.76801i
\(630\) −267.196 + 54.2536i −0.424121 + 0.0861168i
\(631\) 425.417i 0.674195i −0.941470 0.337097i \(-0.890555\pi\)
0.941470 0.337097i \(-0.109445\pi\)
\(632\) −229.725 + 229.725i −0.363488 + 0.363488i
\(633\) 202.791 20.3802i 0.320365 0.0321962i
\(634\) −583.228 583.228i −0.919918 0.919918i
\(635\) 131.377 + 131.377i 0.206893 + 0.206893i
\(636\) −317.026 259.124i −0.498469 0.407428i
\(637\) 55.3908i 0.0869557i
\(638\) −119.669 −0.187569
\(639\) −101.935 67.5265i −0.159523 0.105675i
\(640\) −34.5937 + 34.5937i −0.0540527 + 0.0540527i
\(641\) −441.841 + 441.841i −0.689299 + 0.689299i −0.962077 0.272778i \(-0.912058\pi\)
0.272778 + 0.962077i \(0.412058\pi\)
\(642\) −622.056 + 62.5157i −0.968935 + 0.0973765i
\(643\) 153.381 + 153.381i 0.238540 + 0.238540i 0.816246 0.577705i \(-0.196052\pi\)
−0.577705 + 0.816246i \(0.696052\pi\)
\(644\) 100.279 0.155713
\(645\) −23.4579 233.416i −0.0363688 0.361885i
\(646\) −360.547 + 158.458i −0.558122 + 0.245291i
\(647\) 159.259i 0.246149i 0.992397 + 0.123075i \(0.0392755\pi\)
−0.992397 + 0.123075i \(0.960725\pi\)
\(648\) −210.960 + 89.3536i −0.325555 + 0.137891i
\(649\) −696.239 696.239i −1.07279 1.07279i
\(650\) 20.1800i 0.0310462i
\(651\) −362.028 295.906i −0.556110 0.454541i
\(652\) 181.743 181.743i 0.278747 0.278747i
\(653\) −793.451 793.451i −1.21509 1.21509i −0.969333 0.245752i \(-0.920965\pi\)
−0.245752 0.969333i \(-0.579035\pi\)
\(654\) −359.485 + 36.1277i −0.549671 + 0.0552411i
\(655\) 62.2168i 0.0949875i
\(656\) 67.9424 + 67.9424i 0.103571 + 0.103571i
\(657\) −494.779 + 746.899i −0.753088 + 1.13683i
\(658\) 392.121 + 392.121i 0.595928 + 0.595928i
\(659\) 1134.84i 1.72207i −0.508546 0.861035i \(-0.669817\pi\)
0.508546 0.861035i \(-0.330183\pi\)
\(660\) 183.123 + 149.677i 0.277459 + 0.226783i
\(661\) 540.175i 0.817208i −0.912712 0.408604i \(-0.866016\pi\)
0.912712 0.408604i \(-0.133984\pi\)
\(662\) 276.966i 0.418378i
\(663\) 30.9340 111.273i 0.0466576 0.167832i
\(664\) 467.618 0.704243
\(665\) 350.907 0.527679
\(666\) 493.449 744.890i 0.740914 1.11845i
\(667\) 93.9548 0.140862
\(668\) −180.621 + 180.621i −0.270390 + 0.270390i
\(669\) 652.501 798.305i 0.975338 1.19328i
\(670\) −261.871 + 261.871i −0.390853 + 0.390853i
\(671\) −123.797 −0.184496
\(672\) 83.6475 8.40644i 0.124475 0.0125096i
\(673\) −174.135 + 174.135i −0.258744 + 0.258744i −0.824543 0.565799i \(-0.808568\pi\)
0.565799 + 0.824543i \(0.308568\pi\)
\(674\) 506.330 + 506.330i 0.751232 + 0.751232i
\(675\) −150.519 79.3037i −0.222991 0.117487i
\(676\) −327.744 −0.484828
\(677\) −605.055 + 605.055i −0.893729 + 0.893729i −0.994872 0.101143i \(-0.967750\pi\)
0.101143 + 0.994872i \(0.467750\pi\)
\(678\) −55.4162 551.413i −0.0817348 0.813294i
\(679\) −200.000 −0.294550
\(680\) 193.752 + 75.4430i 0.284930 + 0.110946i
\(681\) −112.880 1123.20i −0.165756 1.64934i
\(682\) 405.598i 0.594719i
\(683\) 645.841 645.841i 0.945595 0.945595i −0.0529996 0.998595i \(-0.516878\pi\)
0.998595 + 0.0529996i \(0.0168782\pi\)
\(684\) 288.965 58.6737i 0.422464 0.0857803i
\(685\) −322.510 322.510i −0.470817 0.470817i
\(686\) 363.906 + 363.906i 0.530475 + 0.530475i
\(687\) −525.625 + 643.078i −0.765103 + 0.936068i
\(688\) 72.3342i 0.105137i
\(689\) −154.538 −0.224293
\(690\) −143.774 117.514i −0.208367 0.170311i
\(691\) −572.002 + 572.002i −0.827789 + 0.827789i −0.987211 0.159422i \(-0.949037\pi\)
0.159422 + 0.987211i \(0.449037\pi\)
\(692\) −39.1323 + 39.1323i −0.0565496 + 0.0565496i
\(693\) −80.8719 398.290i −0.116698 0.574733i
\(694\) −87.6155 87.6155i −0.126247 0.126247i
\(695\) −21.9339 −0.0315596
\(696\) 78.3718 7.87624i 0.112603 0.0113164i
\(697\) 148.171 380.532i 0.212584 0.545956i
\(698\) 234.164i 0.335479i
\(699\) 896.016 90.0483i 1.28185 0.128824i
\(700\) 44.1445 + 44.1445i 0.0630635 + 0.0630635i
\(701\) 233.074i 0.332488i 0.986085 + 0.166244i \(0.0531640\pi\)
−0.986085 + 0.166244i \(0.946836\pi\)
\(702\) −40.3060 + 76.5009i −0.0574160 + 0.108976i
\(703\) −813.151 + 813.151i −1.15669 + 1.15669i
\(704\) −51.5664 51.5664i −0.0732477 0.0732477i
\(705\) −102.680 1021.71i −0.145646 1.44923i
\(706\) 59.2391i 0.0839080i
\(707\) −585.509 585.509i −0.828160 0.828160i
\(708\) 501.794 + 410.146i 0.708749 + 0.579302i
\(709\) −112.143 112.143i −0.158171 0.158171i 0.623585 0.781756i \(-0.285676\pi\)
−0.781756 + 0.623585i \(0.785676\pi\)
\(710\) 83.0825i 0.117018i
\(711\) −861.817 570.906i −1.21212 0.802962i
\(712\) 113.926i 0.160009i
\(713\) 318.444i 0.446626i
\(714\) −175.744 311.082i −0.246140 0.435689i
\(715\) 89.2652 0.124846
\(716\) −326.971 −0.456664
\(717\) −312.637 + 382.496i −0.436034 + 0.533468i
\(718\) −571.946 −0.796582
\(719\) −352.542 + 352.542i −0.490323 + 0.490323i −0.908408 0.418085i \(-0.862701\pi\)
0.418085 + 0.908408i \(0.362701\pi\)
\(720\) −129.779 85.9714i −0.180249 0.119405i
\(721\) −78.1794 + 78.1794i −0.108432 + 0.108432i
\(722\) 131.035 0.181489
\(723\) −43.4352 432.198i −0.0600764 0.597784i
\(724\) 244.922 244.922i 0.338289 0.338289i
\(725\) 41.3602 + 41.3602i 0.0570486 + 0.0570486i
\(726\) 101.770 124.511i 0.140179 0.171503i
\(727\) 560.698 0.771249 0.385625 0.922656i \(-0.373986\pi\)
0.385625 + 0.922656i \(0.373986\pi\)
\(728\) 22.4364 22.4364i 0.0308192 0.0308192i
\(729\) −412.210 601.269i −0.565445 0.824786i
\(730\) −608.760 −0.833918
\(731\) 281.439 123.690i 0.385006 0.169207i
\(732\) 81.0749 8.14790i 0.110758 0.0111310i
\(733\) 715.196i 0.975711i 0.872924 + 0.487856i \(0.162221\pi\)
−0.872924 + 0.487856i \(0.837779\pi\)
\(734\) 351.980 351.980i 0.479536 0.479536i
\(735\) −31.7292 315.718i −0.0431690 0.429549i
\(736\) 40.4859 + 40.4859i 0.0550080 + 0.0550080i
\(737\) −390.353 390.353i −0.529651 0.529651i
\(738\) −168.849 + 254.887i −0.228792 + 0.345376i
\(739\) 553.000i 0.748308i 0.927366 + 0.374154i \(0.122067\pi\)
−0.927366 + 0.374154i \(0.877933\pi\)
\(740\) 607.123 0.820437
\(741\) 70.4297 86.1675i 0.0950468 0.116285i
\(742\) −338.058 + 338.058i −0.455603 + 0.455603i
\(743\) 5.84822 5.84822i 0.00787109 0.00787109i −0.703160 0.711031i \(-0.748228\pi\)
0.711031 + 0.703160i \(0.248228\pi\)
\(744\) −26.6952 265.628i −0.0358806 0.357027i
\(745\) 743.326 + 743.326i 0.997753 + 0.997753i
\(746\) 89.0958 0.119431
\(747\) 296.083 + 1458.19i 0.396363 + 1.95207i
\(748\) −112.458 + 288.813i −0.150344 + 0.386114i
\(749\) 729.986i 0.974614i
\(750\) −57.4224 571.376i −0.0765632 0.761835i
\(751\) −157.647 157.647i −0.209916 0.209916i 0.594316 0.804232i \(-0.297423\pi\)
−0.804232 + 0.594316i \(0.797423\pi\)
\(752\) 316.622i 0.421040i
\(753\) −27.5330 + 33.6854i −0.0365645 + 0.0447349i
\(754\) 21.0213 21.0213i 0.0278797 0.0278797i
\(755\) −413.008 413.008i −0.547031 0.547031i
\(756\) 79.1775 + 255.519i 0.104732 + 0.337988i
\(757\) 221.919i 0.293156i 0.989199 + 0.146578i \(0.0468259\pi\)
−0.989199 + 0.146578i \(0.953174\pi\)
\(758\) 481.599 + 481.599i 0.635354 + 0.635354i
\(759\) 175.170 214.313i 0.230791 0.282362i
\(760\) 141.672 + 141.672i 0.186410 + 0.186410i
\(761\) 433.531i 0.569686i 0.958574 + 0.284843i \(0.0919415\pi\)
−0.958574 + 0.284843i \(0.908059\pi\)
\(762\) 115.363 141.142i 0.151396 0.185226i
\(763\) 421.857i 0.552892i
\(764\) 184.650i 0.241689i
\(765\) −112.579 + 651.956i −0.147162 + 0.852230i
\(766\) 717.507 0.936693
\(767\) 244.605 0.318912
\(768\) 37.1649 + 30.3771i 0.0483919 + 0.0395535i
\(769\) −126.996 −0.165144 −0.0825722 0.996585i \(-0.526314\pi\)
−0.0825722 + 0.996585i \(0.526314\pi\)
\(770\) 195.271 195.271i 0.253598 0.253598i
\(771\) 624.691 + 510.597i 0.810235 + 0.662252i
\(772\) 437.902 437.902i 0.567230 0.567230i
\(773\) 374.560 0.484554 0.242277 0.970207i \(-0.422106\pi\)
0.242277 + 0.970207i \(0.422106\pi\)
\(774\) −225.563 + 45.8001i −0.291425 + 0.0591732i
\(775\) 140.184 140.184i 0.180882 0.180882i
\(776\) −80.7460 80.7460i −0.104054 0.104054i
\(777\) −807.778 660.244i −1.03961 0.849735i
\(778\) −33.2802 −0.0427766
\(779\) 278.245 278.245i 0.357182 0.357182i
\(780\) −58.4602 + 5.87516i −0.0749489 + 0.00753225i
\(781\) 123.845 0.158572
\(782\) 88.2928 226.753i 0.112906 0.289966i
\(783\) 74.1838 + 239.403i 0.0947430 + 0.305751i
\(784\) 97.8394i 0.124795i
\(785\) −313.702 + 313.702i −0.399620 + 0.399620i
\(786\) −60.7372 + 6.10400i −0.0772738 + 0.00776590i
\(787\) 778.915 + 778.915i 0.989726 + 0.989726i 0.999948 0.0102216i \(-0.00325369\pi\)
−0.0102216 + 0.999948i \(0.503254\pi\)
\(788\) 142.749 + 142.749i 0.181154 + 0.181154i
\(789\) 676.100 + 552.616i 0.856908 + 0.700401i
\(790\) 702.425i 0.889145i
\(791\) −647.086 −0.818060
\(792\) 128.151 193.452i 0.161807 0.244258i
\(793\) 21.7463 21.7463i 0.0274229 0.0274229i
\(794\) 380.581 380.581i 0.479322 0.479322i
\(795\) 880.842 88.5233i 1.10798 0.111350i
\(796\) 220.390 + 220.390i 0.276872 + 0.276872i
\(797\) 1081.50 1.35696 0.678481 0.734618i \(-0.262639\pi\)
0.678481 + 0.734618i \(0.262639\pi\)
\(798\) −34.4269 342.562i −0.0431415 0.429275i
\(799\) 1231.92 541.419i 1.54182 0.677620i
\(800\) 35.6449i 0.0445561i
\(801\) −355.262 + 72.1351i −0.443523 + 0.0900563i
\(802\) 431.385 + 431.385i 0.537887 + 0.537887i
\(803\) 907.436i 1.13006i
\(804\) 281.335 + 229.952i 0.349920 + 0.286010i
\(805\) −153.311 + 153.311i −0.190449 + 0.190449i
\(806\) −71.2482 71.2482i −0.0883972 0.0883972i
\(807\) −877.720 + 88.2095i −1.08763 + 0.109306i
\(808\) 472.775i 0.585118i
\(809\) −358.740 358.740i −0.443437 0.443437i 0.449729 0.893165i \(-0.351521\pi\)
−0.893165 + 0.449729i \(0.851521\pi\)
\(810\) 185.916 459.131i 0.229526 0.566828i
\(811\) 120.348 + 120.348i 0.148394 + 0.148394i 0.777400 0.629006i \(-0.216538\pi\)
−0.629006 + 0.777400i \(0.716538\pi\)
\(812\) 91.9696i 0.113263i
\(813\) 71.2262 + 58.2174i 0.0876092 + 0.0716081i
\(814\) 904.996i 1.11179i
\(815\) 555.712i 0.681855i
\(816\) 54.6401 196.546i 0.0669609 0.240866i
\(817\) 296.231 0.362583
\(818\) −621.133 −0.759331
\(819\) 84.1705 + 55.7583i 0.102772 + 0.0680809i
\(820\) −207.746 −0.253349
\(821\) 371.478 371.478i 0.452471 0.452471i −0.443703 0.896174i \(-0.646336\pi\)
0.896174 + 0.443703i \(0.146336\pi\)
\(822\) −283.199 + 346.481i −0.344524 + 0.421509i
\(823\) −455.455 + 455.455i −0.553408 + 0.553408i −0.927423 0.374015i \(-0.877981\pi\)
0.374015 + 0.927423i \(0.377981\pi\)
\(824\) −63.1268 −0.0766102
\(825\) 171.456 17.2311i 0.207826 0.0208862i
\(826\) 535.083 535.083i 0.647800 0.647800i
\(827\) −235.576 235.576i −0.284856 0.284856i 0.550186 0.835042i \(-0.314557\pi\)
−0.835042 + 0.550186i \(0.814557\pi\)
\(828\) −100.614 + 151.884i −0.121515 + 0.183434i
\(829\) −206.893 −0.249569 −0.124785 0.992184i \(-0.539824\pi\)
−0.124785 + 0.992184i \(0.539824\pi\)
\(830\) −714.913 + 714.913i −0.861340 + 0.861340i
\(831\) 20.6290 + 205.267i 0.0248243 + 0.247012i
\(832\) 18.1165 0.0217746
\(833\) 380.675 167.304i 0.456993 0.200845i
\(834\) 2.15190 + 21.4123i 0.00258022 + 0.0256742i
\(835\) 552.280i 0.661414i
\(836\) −211.180 + 211.180i −0.252608 + 0.252608i
\(837\) 811.418 251.433i 0.969436 0.300398i
\(838\) −77.1819 77.1819i −0.0921025 0.0921025i
\(839\) −615.416 615.416i −0.733511 0.733511i 0.237802 0.971314i \(-0.423573\pi\)
−0.971314 + 0.237802i \(0.923573\pi\)
\(840\) −115.031 + 140.736i −0.136942 + 0.167542i
\(841\) 754.831i 0.897540i
\(842\) −1015.75 −1.20635
\(843\) 160.845 + 131.468i 0.190801 + 0.155953i
\(844\) 96.0782 96.0782i 0.113837 0.113837i
\(845\) 501.067 501.067i 0.592979 0.592979i
\(846\) −987.337 + 200.477i −1.16707 + 0.236970i
\(847\) −132.771 132.771i −0.156754 0.156754i
\(848\) −272.968 −0.321896
\(849\) 897.378 90.1851i 1.05698 0.106225i
\(850\) 138.688 60.9523i 0.163162 0.0717085i
\(851\) 710.532i 0.834937i
\(852\) −81.1067 + 8.15109i −0.0951956 + 0.00956701i
\(853\) 940.089 + 940.089i 1.10210 + 1.10210i 0.994157 + 0.107939i \(0.0344253\pi\)
0.107939 + 0.994157i \(0.465575\pi\)
\(854\) 95.1417i 0.111407i
\(855\) −352.079 + 531.484i −0.411788 + 0.621619i
\(856\) −294.717 + 294.717i −0.344296 + 0.344296i
\(857\) 219.073 + 219.073i 0.255628 + 0.255628i 0.823273 0.567645i \(-0.192145\pi\)
−0.567645 + 0.823273i \(0.692145\pi\)
\(858\) −8.75768 87.1424i −0.0102071 0.101565i
\(859\) 1089.87i 1.26876i −0.773021 0.634381i \(-0.781255\pi\)
0.773021 0.634381i \(-0.218745\pi\)
\(860\) −110.587 110.587i −0.128590 0.128590i
\(861\) 276.406 + 225.923i 0.321029 + 0.262396i
\(862\) 688.072 + 688.072i 0.798227 + 0.798227i
\(863\) 624.771i 0.723953i 0.932187 + 0.361976i \(0.117898\pi\)
−0.932187 + 0.361976i \(0.882102\pi\)
\(864\) −71.1944 + 135.127i −0.0824010 + 0.156397i
\(865\) 119.654i 0.138328i
\(866\) 567.401i 0.655197i
\(867\) −858.159 + 123.497i −0.989803 + 0.142441i
\(868\) −311.715 −0.359119
\(869\) 1047.05 1.20490
\(870\) −107.776 + 131.859i −0.123881 + 0.151563i
\(871\) 137.140 0.157451
\(872\) −170.316 + 170.316i −0.195317 + 0.195317i
\(873\) 200.668 302.920i 0.229860 0.346988i
\(874\) 165.802 165.802i 0.189705 0.189705i
\(875\) −670.512 −0.766299
\(876\) 59.7245 + 594.283i 0.0681787 + 0.678405i
\(877\) −851.798 + 851.798i −0.971264 + 0.971264i −0.999598 0.0283346i \(-0.990980\pi\)
0.0283346 + 0.999598i \(0.490980\pi\)
\(878\) −317.619 317.619i −0.361753 0.361753i
\(879\) 333.671 408.231i 0.379603 0.464427i
\(880\) 157.673 0.179174
\(881\) −131.718 + 131.718i −0.149509 + 0.149509i −0.777899 0.628390i \(-0.783714\pi\)
0.628390 + 0.777899i \(0.283714\pi\)
\(882\) −305.097 + 61.9493i −0.345915 + 0.0702373i
\(883\) −456.928 −0.517472 −0.258736 0.965948i \(-0.583306\pi\)
−0.258736 + 0.965948i \(0.583306\pi\)
\(884\) −30.9789 70.4879i −0.0350440 0.0797374i
\(885\) −1394.21 + 140.116i −1.57538 + 0.158323i
\(886\) 316.902i 0.357677i
\(887\) −841.913 + 841.913i −0.949169 + 0.949169i −0.998769 0.0496005i \(-0.984205\pi\)
0.0496005 + 0.998769i \(0.484205\pi\)
\(888\) −59.5640 592.685i −0.0670765 0.667438i
\(889\) −150.505 150.505i −0.169297 0.169297i
\(890\) −174.175 174.175i −0.195702 0.195702i
\(891\) 684.394 + 277.132i 0.768118 + 0.311035i
\(892\) 687.362i 0.770585i
\(893\) 1296.66 1.45203
\(894\) 652.722 798.575i 0.730114 0.893261i
\(895\) 499.887 499.887i 0.558533 0.558533i
\(896\) 39.6304 39.6304i 0.0442304 0.0442304i
\(897\) 6.87584 + 68.4174i 0.00766537 + 0.0762735i
\(898\) −235.913 235.913i −0.262710 0.262710i
\(899\) −292.055 −0.324867
\(900\) −111.153 + 22.5694i −0.123504 + 0.0250771i
\(901\) 466.771 + 1062.07i 0.518059 + 1.17877i
\(902\) 309.672i 0.343317i
\(903\) 26.8733 + 267.400i 0.0297600 + 0.296124i
\(904\) −261.248 261.248i −0.288991 0.288991i
\(905\) 748.892i 0.827505i
\(906\) −362.667 + 443.706i −0.400294 + 0.489742i
\(907\) −215.244 + 215.244i −0.237314 + 0.237314i −0.815737 0.578423i \(-0.803668\pi\)
0.578423 + 0.815737i \(0.303668\pi\)
\(908\) −532.149 532.149i −0.586067 0.586067i
\(909\) 1474.28 299.349i 1.62187 0.329317i
\(910\) 68.6032i 0.0753882i
\(911\) 244.858 + 244.858i 0.268780 + 0.268780i 0.828608 0.559829i \(-0.189133\pi\)
−0.559829 + 0.828608i \(0.689133\pi\)
\(912\) 124.403 152.202i 0.136407 0.166888i
\(913\) −1065.67 1065.67i −1.16722 1.16722i
\(914\) 507.595i 0.555355i
\(915\) −111.494 + 136.407i −0.121851 + 0.149079i
\(916\) 553.708i 0.604484i
\(917\) 71.2754i 0.0777267i
\(918\) 647.496 + 45.9390i 0.705334 + 0.0500425i
\(919\) −1243.12 −1.35268 −0.676342 0.736588i \(-0.736436\pi\)
−0.676342 + 0.736588i \(0.736436\pi\)
\(920\) −123.793 −0.134557
\(921\) 1222.85 + 999.510i 1.32775 + 1.08524i
\(922\) −942.607 −1.02235
\(923\) −21.7549 + 21.7549i −0.0235697 + 0.0235697i
\(924\) −209.785 171.469i −0.227040 0.185573i
\(925\) 312.786 312.786i 0.338147 0.338147i
\(926\) −248.225 −0.268061
\(927\) −39.9702 196.851i −0.0431178 0.212353i
\(928\) 37.1309 37.1309i 0.0400118 0.0400118i
\(929\) −85.2682 85.2682i −0.0917849 0.0917849i 0.659723 0.751508i \(-0.270673\pi\)
−0.751508 + 0.659723i \(0.770673\pi\)
\(930\) 446.915 + 365.290i 0.480554 + 0.392785i
\(931\) 400.682 0.430378
\(932\) 424.514 424.514i 0.455487 0.455487i
\(933\) 710.460 71.4002i 0.761479 0.0765275i
\(934\) −444.861 −0.476297
\(935\) −269.619 613.478i −0.288363 0.656127i
\(936\) 11.4709 + 56.4935i 0.0122552 + 0.0603563i
\(937\) 467.613i 0.499053i −0.968368 0.249527i \(-0.919725\pi\)
0.968368 0.249527i \(-0.0802750\pi\)
\(938\) 299.999 299.999i 0.319828 0.319828i
\(939\) −1325.23 + 133.184i −1.41132 + 0.141836i
\(940\) −484.064 484.064i −0.514962 0.514962i
\(941\) 729.906 + 729.906i 0.775670 + 0.775670i 0.979091 0.203421i \(-0.0652061\pi\)
−0.203421 + 0.979091i \(0.565206\pi\)
\(942\) 337.018 + 275.464i 0.357769 + 0.292425i
\(943\) 243.130i 0.257826i
\(944\) 432.058 0.457689
\(945\) −511.698 269.598i −0.541479 0.285289i
\(946\) 164.845 164.845i 0.174255 0.174255i
\(947\) 447.287 447.287i 0.472320 0.472320i −0.430345 0.902665i \(-0.641608\pi\)
0.902665 + 0.430345i \(0.141608\pi\)
\(948\) −685.720 + 68.9138i −0.723333 + 0.0726939i
\(949\) 159.402 + 159.402i 0.167968 + 0.167968i
\(950\) 145.977 0.153660
\(951\) −174.959 1740.91i −0.183974 1.83061i
\(952\) −221.962 86.4273i −0.233153 0.0907849i
\(953\) 837.817i 0.879136i 0.898209 + 0.439568i \(0.144868\pi\)
−0.898209 + 0.439568i \(0.855132\pi\)
\(954\) −172.836 851.209i −0.181170 0.892253i
\(955\) −282.301 282.301i −0.295603 0.295603i
\(956\) 329.340i 0.344497i
\(957\) −196.553 160.655i −0.205385 0.167873i
\(958\) 448.645 448.645i 0.468315 0.468315i
\(959\) 369.466 + 369.466i 0.385262 + 0.385262i
\(960\) −103.261 + 10.3776i −0.107563 + 0.0108100i
\(961\) 28.8729i 0.0300447i
\(962\) −158.973 158.973i −0.165253 0.165253i
\(963\) −1105.64 732.424i −1.14812 0.760565i
\(964\) −204.766 204.766i −0.212413 0.212413i
\(965\) 1338.96i 1.38753i
\(966\) 164.706 + 134.624i 0.170504 + 0.139363i
\(967\) 1140.58i 1.17950i −0.807585 0.589751i \(-0.799226\pi\)
0.807585 0.589751i \(-0.200774\pi\)
\(968\) 107.207i 0.110751i
\(969\) −804.917 223.768i −0.830667 0.230927i
\(970\) 246.895 0.254531
\(971\) −1208.99 −1.24509 −0.622547 0.782582i \(-0.713902\pi\)
−0.622547 + 0.782582i \(0.713902\pi\)
\(972\) −466.452 136.450i −0.479889 0.140381i
\(973\) 25.1274 0.0258247
\(974\) 451.477 451.477i 0.463529 0.463529i
\(975\) −27.0915 + 33.1451i −0.0277861 + 0.0339950i
\(976\) 38.4116 38.4116i 0.0393561 0.0393561i
\(977\) 1782.73 1.82469 0.912347 0.409417i \(-0.134268\pi\)
0.912347 + 0.409417i \(0.134268\pi\)
\(978\) 542.496 54.5200i 0.554700 0.0557465i
\(979\) 259.630 259.630i 0.265200 0.265200i
\(980\) −149.581 149.581i −0.152633 0.152633i
\(981\) −638.946 423.266i −0.651321 0.431464i
\(982\) 209.381 0.213219
\(983\) 496.507 496.507i 0.505094 0.505094i −0.407923 0.913017i \(-0.633747\pi\)
0.913017 + 0.407923i \(0.133747\pi\)
\(984\) 20.3816 + 202.805i 0.0207130 + 0.206103i
\(985\) −436.482 −0.443129
\(986\) −207.963 80.9763i −0.210916 0.0821260i
\(987\) 117.630 + 1170.47i 0.119179 + 1.18588i
\(988\) 74.1925i 0.0750936i
\(989\) −129.423 + 129.423i −0.130863 + 0.130863i
\(990\) 99.8346 + 491.681i 0.100843 + 0.496647i
\(991\) 11.1339 + 11.1339i 0.0112350 + 0.0112350i 0.712702 0.701467i \(-0.247471\pi\)
−0.701467 + 0.712702i \(0.747471\pi\)
\(992\) −125.849 125.849i −0.126864 0.126864i
\(993\) −371.825 + 454.910i −0.374446 + 0.458117i
\(994\) 95.1790i 0.0957535i
\(995\) −673.883 −0.677269
\(996\) 768.050 + 627.772i 0.771134 + 0.630293i
\(997\) 1232.84 1232.84i 1.23655 1.23655i 0.275149 0.961402i \(-0.411273\pi\)
0.961402 0.275149i \(-0.0887272\pi\)
\(998\) −542.385 + 542.385i −0.543472 + 0.543472i
\(999\) 1810.48 561.014i 1.81230 0.561575i
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 102.3.e.b.47.9 yes 20
3.2 odd 2 inner 102.3.e.b.47.4 20
17.4 even 4 inner 102.3.e.b.89.4 yes 20
51.38 odd 4 inner 102.3.e.b.89.9 yes 20
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
102.3.e.b.47.4 20 3.2 odd 2 inner
102.3.e.b.47.9 yes 20 1.1 even 1 trivial
102.3.e.b.89.4 yes 20 17.4 even 4 inner
102.3.e.b.89.9 yes 20 51.38 odd 4 inner