Properties

Label 230.3.f.a.93.5
Level $230$
Weight $3$
Character 230.93
Analytic conductor $6.267$
Analytic rank $0$
Dimension $20$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [230,3,Mod(47,230)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(230, base_ring=CyclotomicField(4))
 
chi = DirichletCharacter(H, H._module([1, 0]))
 
N = Newforms(chi, 3, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("230.47");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 230 = 2 \cdot 5 \cdot 23 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 230.f (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: \(6.26704608029\)
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: \( x^{20} - 52 x^{17} + 1020 x^{16} - 1316 x^{15} + 1352 x^{14} - 18724 x^{13} + 250686 x^{12} + \cdots + 88804 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{7}]\)
Coefficient ring index: \( 2^{2} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{4}]$

Embedding invariants

Embedding label 93.5
Root \(-0.0649756 - 0.0649756i\) of defining polynomial
Character \(\chi\) \(=\) 230.93
Dual form 230.3.f.a.47.5

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-1.00000 + 1.00000i) q^{2} +(-0.0649756 - 0.0649756i) q^{3} -2.00000i q^{4} +(-4.95703 + 0.654141i) q^{5} +0.129951 q^{6} +(-3.31044 + 3.31044i) q^{7} +(2.00000 + 2.00000i) q^{8} -8.99156i q^{9} +O(q^{10})\) \(q+(-1.00000 + 1.00000i) q^{2} +(-0.0649756 - 0.0649756i) q^{3} -2.00000i q^{4} +(-4.95703 + 0.654141i) q^{5} +0.129951 q^{6} +(-3.31044 + 3.31044i) q^{7} +(2.00000 + 2.00000i) q^{8} -8.99156i q^{9} +(4.30288 - 5.61117i) q^{10} +11.2959 q^{11} +(-0.129951 + 0.129951i) q^{12} +(6.07959 + 6.07959i) q^{13} -6.62087i q^{14} +(0.364589 + 0.279583i) q^{15} -4.00000 q^{16} +(18.2517 - 18.2517i) q^{17} +(8.99156 + 8.99156i) q^{18} -22.9272i q^{19} +(1.30828 + 9.91405i) q^{20} +0.430195 q^{21} +(-11.2959 + 11.2959i) q^{22} +(-3.39116 - 3.39116i) q^{23} -0.259903i q^{24} +(24.1442 - 6.48519i) q^{25} -12.1592 q^{26} +(-1.16901 + 1.16901i) q^{27} +(6.62087 + 6.62087i) q^{28} -24.1743i q^{29} +(-0.644172 + 0.0850065i) q^{30} +1.45528 q^{31} +(4.00000 - 4.00000i) q^{32} +(-0.733956 - 0.733956i) q^{33} +36.5034i q^{34} +(14.2444 - 18.5754i) q^{35} -17.9831 q^{36} +(3.02520 - 3.02520i) q^{37} +(22.9272 + 22.9272i) q^{38} -0.790050i q^{39} +(-11.2223 - 8.60577i) q^{40} +46.8844 q^{41} +(-0.430195 + 0.430195i) q^{42} +(48.4158 + 48.4158i) q^{43} -22.5917i q^{44} +(5.88175 + 44.5714i) q^{45} +6.78233 q^{46} +(9.42035 - 9.42035i) q^{47} +(0.259903 + 0.259903i) q^{48} +27.0820i q^{49} +(-17.6590 + 30.6294i) q^{50} -2.37183 q^{51} +(12.1592 - 12.1592i) q^{52} +(-69.3124 - 69.3124i) q^{53} -2.33803i q^{54} +(-55.9939 + 7.38909i) q^{55} -13.2417 q^{56} +(-1.48971 + 1.48971i) q^{57} +(24.1743 + 24.1743i) q^{58} -92.6123i q^{59} +(0.559165 - 0.729178i) q^{60} -113.348 q^{61} +(-1.45528 + 1.45528i) q^{62} +(29.7660 + 29.7660i) q^{63} +8.00000i q^{64} +(-34.1136 - 26.1598i) q^{65} +1.46791 q^{66} +(-6.74683 + 6.74683i) q^{67} +(-36.5034 - 36.5034i) q^{68} +0.440686i q^{69} +(4.33099 + 32.8198i) q^{70} -26.7478 q^{71} +(17.9831 - 17.9831i) q^{72} +(33.5695 + 33.5695i) q^{73} +6.05040i q^{74} +(-1.99016 - 1.14741i) q^{75} -45.8543 q^{76} +(-37.3942 + 37.3942i) q^{77} +(0.790050 + 0.790050i) q^{78} -55.9899i q^{79} +(19.8281 - 2.61657i) q^{80} -80.7721 q^{81} +(-46.8844 + 46.8844i) q^{82} +(77.9157 + 77.9157i) q^{83} -0.860391i q^{84} +(-78.5349 + 102.413i) q^{85} -96.8315 q^{86} +(-1.57074 + 1.57074i) q^{87} +(22.5917 + 22.5917i) q^{88} -81.5042i q^{89} +(-50.4531 - 38.6896i) q^{90} -40.2522 q^{91} +(-6.78233 + 6.78233i) q^{92} +(-0.0945580 - 0.0945580i) q^{93} +18.8407i q^{94} +(14.9976 + 113.650i) q^{95} -0.519805 q^{96} +(2.69032 - 2.69032i) q^{97} +(-27.0820 - 27.0820i) q^{98} -101.567i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 20 q - 20 q^{2} + 4 q^{5} + 8 q^{7} + 40 q^{8}+O(q^{10}) \) Copy content Toggle raw display \( 20 q - 20 q^{2} + 4 q^{5} + 8 q^{7} + 40 q^{8} + 4 q^{10} + 56 q^{11} - 4 q^{13} - 48 q^{15} - 80 q^{16} - 72 q^{17} - 28 q^{18} - 16 q^{20} + 8 q^{21} - 56 q^{22} + 36 q^{25} + 8 q^{26} + 156 q^{27} - 16 q^{28} + 84 q^{30} - 212 q^{31} + 80 q^{32} - 100 q^{33} + 56 q^{36} + 72 q^{37} + 88 q^{38} + 24 q^{40} - 12 q^{41} - 8 q^{42} + 120 q^{43} - 32 q^{45} + 8 q^{47} - 28 q^{50} + 64 q^{51} - 8 q^{52} - 244 q^{53} + 68 q^{55} + 32 q^{56} - 384 q^{57} - 188 q^{58} - 72 q^{60} + 328 q^{61} + 212 q^{62} + 172 q^{63} + 20 q^{65} + 200 q^{66} + 56 q^{67} + 144 q^{68} - 28 q^{70} - 92 q^{71} - 56 q^{72} + 144 q^{73} - 124 q^{75} - 176 q^{76} + 292 q^{77} - 208 q^{78} - 16 q^{80} - 84 q^{81} + 12 q^{82} - 72 q^{83} - 20 q^{85} - 240 q^{86} - 208 q^{87} + 112 q^{88} - 56 q^{90} - 192 q^{91} + 256 q^{93} - 96 q^{95} - 276 q^{97} + 104 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/230\mathbb{Z}\right)^\times\).

\(n\) \(47\) \(51\)
\(\chi(n)\) \(e\left(\frac{3}{4}\right)\) \(1\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −1.00000 + 1.00000i −0.500000 + 0.500000i
\(3\) −0.0649756 0.0649756i −0.0216585 0.0216585i 0.696195 0.717853i \(-0.254875\pi\)
−0.717853 + 0.696195i \(0.754875\pi\)
\(4\) 2.00000i 0.500000i
\(5\) −4.95703 + 0.654141i −0.991405 + 0.130828i
\(6\) 0.129951 0.0216585
\(7\) −3.31044 + 3.31044i −0.472919 + 0.472919i −0.902858 0.429939i \(-0.858535\pi\)
0.429939 + 0.902858i \(0.358535\pi\)
\(8\) 2.00000 + 2.00000i 0.250000 + 0.250000i
\(9\) 8.99156i 0.999062i
\(10\) 4.30288 5.61117i 0.430288 0.561117i
\(11\) 11.2959 1.02690 0.513448 0.858120i \(-0.328368\pi\)
0.513448 + 0.858120i \(0.328368\pi\)
\(12\) −0.129951 + 0.129951i −0.0108293 + 0.0108293i
\(13\) 6.07959 + 6.07959i 0.467661 + 0.467661i 0.901156 0.433495i \(-0.142720\pi\)
−0.433495 + 0.901156i \(0.642720\pi\)
\(14\) 6.62087i 0.472919i
\(15\) 0.364589 + 0.279583i 0.0243059 + 0.0186388i
\(16\) −4.00000 −0.250000
\(17\) 18.2517 18.2517i 1.07363 1.07363i 0.0765647 0.997065i \(-0.475605\pi\)
0.997065 0.0765647i \(-0.0243952\pi\)
\(18\) 8.99156 + 8.99156i 0.499531 + 0.499531i
\(19\) 22.9272i 1.20669i −0.797479 0.603346i \(-0.793834\pi\)
0.797479 0.603346i \(-0.206166\pi\)
\(20\) 1.30828 + 9.91405i 0.0654141 + 0.495703i
\(21\) 0.430195 0.0204855
\(22\) −11.2959 + 11.2959i −0.513448 + 0.513448i
\(23\) −3.39116 3.39116i −0.147442 0.147442i
\(24\) 0.259903i 0.0108293i
\(25\) 24.1442 6.48519i 0.965768 0.259408i
\(26\) −12.1592 −0.467661
\(27\) −1.16901 + 1.16901i −0.0432968 + 0.0432968i
\(28\) 6.62087 + 6.62087i 0.236460 + 0.236460i
\(29\) 24.1743i 0.833597i −0.908999 0.416799i \(-0.863152\pi\)
0.908999 0.416799i \(-0.136848\pi\)
\(30\) −0.644172 + 0.0850065i −0.0214724 + 0.00283355i
\(31\) 1.45528 0.0469447 0.0234723 0.999724i \(-0.492528\pi\)
0.0234723 + 0.999724i \(0.492528\pi\)
\(32\) 4.00000 4.00000i 0.125000 0.125000i
\(33\) −0.733956 0.733956i −0.0222411 0.0222411i
\(34\) 36.5034i 1.07363i
\(35\) 14.2444 18.5754i 0.406983 0.530726i
\(36\) −17.9831 −0.499531
\(37\) 3.02520 3.02520i 0.0817622 0.0817622i −0.665043 0.746805i \(-0.731587\pi\)
0.746805 + 0.665043i \(0.231587\pi\)
\(38\) 22.9272 + 22.9272i 0.603346 + 0.603346i
\(39\) 0.790050i 0.0202577i
\(40\) −11.2223 8.60577i −0.280558 0.215144i
\(41\) 46.8844 1.14352 0.571762 0.820420i \(-0.306260\pi\)
0.571762 + 0.820420i \(0.306260\pi\)
\(42\) −0.430195 + 0.430195i −0.0102427 + 0.0102427i
\(43\) 48.4158 + 48.4158i 1.12595 + 1.12595i 0.990829 + 0.135118i \(0.0431415\pi\)
0.135118 + 0.990829i \(0.456858\pi\)
\(44\) 22.5917i 0.513448i
\(45\) 5.88175 + 44.5714i 0.130706 + 0.990475i
\(46\) 6.78233 0.147442
\(47\) 9.42035 9.42035i 0.200433 0.200433i −0.599753 0.800185i \(-0.704734\pi\)
0.800185 + 0.599753i \(0.204734\pi\)
\(48\) 0.259903 + 0.259903i 0.00541464 + 0.00541464i
\(49\) 27.0820i 0.552695i
\(50\) −17.6590 + 30.6294i −0.353180 + 0.612588i
\(51\) −2.37183 −0.0465065
\(52\) 12.1592 12.1592i 0.233830 0.233830i
\(53\) −69.3124 69.3124i −1.30778 1.30778i −0.923013 0.384768i \(-0.874281\pi\)
−0.384768 0.923013i \(-0.625719\pi\)
\(54\) 2.33803i 0.0432968i
\(55\) −55.9939 + 7.38909i −1.01807 + 0.134347i
\(56\) −13.2417 −0.236460
\(57\) −1.48971 + 1.48971i −0.0261352 + 0.0261352i
\(58\) 24.1743 + 24.1743i 0.416799 + 0.416799i
\(59\) 92.6123i 1.56970i −0.619686 0.784850i \(-0.712740\pi\)
0.619686 0.784850i \(-0.287260\pi\)
\(60\) 0.559165 0.729178i 0.00931942 0.0121530i
\(61\) −113.348 −1.85816 −0.929080 0.369878i \(-0.879400\pi\)
−0.929080 + 0.369878i \(0.879400\pi\)
\(62\) −1.45528 + 1.45528i −0.0234723 + 0.0234723i
\(63\) 29.7660 + 29.7660i 0.472476 + 0.472476i
\(64\) 8.00000i 0.125000i
\(65\) −34.1136 26.1598i −0.524824 0.402458i
\(66\) 1.46791 0.0222411
\(67\) −6.74683 + 6.74683i −0.100699 + 0.100699i −0.755661 0.654962i \(-0.772684\pi\)
0.654962 + 0.755661i \(0.272684\pi\)
\(68\) −36.5034 36.5034i −0.536815 0.536815i
\(69\) 0.440686i 0.00638676i
\(70\) 4.33099 + 32.8198i 0.0618712 + 0.468855i
\(71\) −26.7478 −0.376730 −0.188365 0.982099i \(-0.560319\pi\)
−0.188365 + 0.982099i \(0.560319\pi\)
\(72\) 17.9831 17.9831i 0.249765 0.249765i
\(73\) 33.5695 + 33.5695i 0.459856 + 0.459856i 0.898608 0.438752i \(-0.144579\pi\)
−0.438752 + 0.898608i \(0.644579\pi\)
\(74\) 6.05040i 0.0817622i
\(75\) −1.99016 1.14741i −0.0265355 0.0152987i
\(76\) −45.8543 −0.603346
\(77\) −37.3942 + 37.3942i −0.485639 + 0.485639i
\(78\) 0.790050 + 0.790050i 0.0101289 + 0.0101289i
\(79\) 55.9899i 0.708733i −0.935107 0.354367i \(-0.884696\pi\)
0.935107 0.354367i \(-0.115304\pi\)
\(80\) 19.8281 2.61657i 0.247851 0.0327071i
\(81\) −80.7721 −0.997186
\(82\) −46.8844 + 46.8844i −0.571762 + 0.571762i
\(83\) 77.9157 + 77.9157i 0.938743 + 0.938743i 0.998229 0.0594862i \(-0.0189462\pi\)
−0.0594862 + 0.998229i \(0.518946\pi\)
\(84\) 0.860391i 0.0102427i
\(85\) −78.5349 + 102.413i −0.923940 + 1.20486i
\(86\) −96.8315 −1.12595
\(87\) −1.57074 + 1.57074i −0.0180545 + 0.0180545i
\(88\) 22.5917 + 22.5917i 0.256724 + 0.256724i
\(89\) 81.5042i 0.915778i −0.889009 0.457889i \(-0.848606\pi\)
0.889009 0.457889i \(-0.151394\pi\)
\(90\) −50.4531 38.6896i −0.560590 0.429885i
\(91\) −40.2522 −0.442332
\(92\) −6.78233 + 6.78233i −0.0737210 + 0.0737210i
\(93\) −0.0945580 0.0945580i −0.00101675 0.00101675i
\(94\) 18.8407i 0.200433i
\(95\) 14.9976 + 113.650i 0.157869 + 1.19632i
\(96\) −0.519805 −0.00541464
\(97\) 2.69032 2.69032i 0.0277352 0.0277352i −0.693103 0.720838i \(-0.743757\pi\)
0.720838 + 0.693103i \(0.243757\pi\)
\(98\) −27.0820 27.0820i −0.276347 0.276347i
\(99\) 101.567i 1.02593i
\(100\) −12.9704 48.2884i −0.129704 0.482884i
\(101\) 32.0918 0.317740 0.158870 0.987299i \(-0.449215\pi\)
0.158870 + 0.987299i \(0.449215\pi\)
\(102\) 2.37183 2.37183i 0.0232533 0.0232533i
\(103\) 23.0915 + 23.0915i 0.224189 + 0.224189i 0.810260 0.586071i \(-0.199326\pi\)
−0.586071 + 0.810260i \(0.699326\pi\)
\(104\) 24.3184i 0.233830i
\(105\) −2.13249 + 0.281409i −0.0203094 + 0.00268008i
\(106\) 138.625 1.30778
\(107\) −0.772222 + 0.772222i −0.00721703 + 0.00721703i −0.710706 0.703489i \(-0.751624\pi\)
0.703489 + 0.710706i \(0.251624\pi\)
\(108\) 2.33803 + 2.33803i 0.0216484 + 0.0216484i
\(109\) 17.8026i 0.163326i −0.996660 0.0816632i \(-0.973977\pi\)
0.996660 0.0816632i \(-0.0260232\pi\)
\(110\) 48.6048 63.3830i 0.441862 0.576209i
\(111\) −0.393129 −0.00354170
\(112\) 13.2417 13.2417i 0.118230 0.118230i
\(113\) −50.2540 50.2540i −0.444726 0.444726i 0.448871 0.893597i \(-0.351826\pi\)
−0.893597 + 0.448871i \(0.851826\pi\)
\(114\) 2.97941i 0.0261352i
\(115\) 19.0284 + 14.5918i 0.165464 + 0.126885i
\(116\) −48.3486 −0.416799
\(117\) 54.6650 54.6650i 0.467222 0.467222i
\(118\) 92.6123 + 92.6123i 0.784850 + 0.784850i
\(119\) 120.842i 1.01548i
\(120\) 0.170013 + 1.28834i 0.00141678 + 0.0107362i
\(121\) 6.59659 0.0545172
\(122\) 113.348 113.348i 0.929080 0.929080i
\(123\) −3.04635 3.04635i −0.0247671 0.0247671i
\(124\) 2.91057i 0.0234723i
\(125\) −115.441 + 47.9410i −0.923529 + 0.383528i
\(126\) −59.5319 −0.472476
\(127\) 24.9970 24.9970i 0.196827 0.196827i −0.601811 0.798638i \(-0.705554\pi\)
0.798638 + 0.601811i \(0.205554\pi\)
\(128\) −8.00000 8.00000i −0.0625000 0.0625000i
\(129\) 6.29169i 0.0487728i
\(130\) 60.2734 7.95382i 0.463641 0.0611832i
\(131\) 193.717 1.47876 0.739378 0.673291i \(-0.235120\pi\)
0.739378 + 0.673291i \(0.235120\pi\)
\(132\) −1.46791 + 1.46791i −0.0111205 + 0.0111205i
\(133\) 75.8989 + 75.8989i 0.570668 + 0.570668i
\(134\) 13.4937i 0.100699i
\(135\) 5.03013 6.55953i 0.0372602 0.0485891i
\(136\) 73.0068 0.536815
\(137\) 83.2274 83.2274i 0.607499 0.607499i −0.334792 0.942292i \(-0.608666\pi\)
0.942292 + 0.334792i \(0.108666\pi\)
\(138\) −0.440686 0.440686i −0.00319338 0.00319338i
\(139\) 144.121i 1.03684i 0.855126 + 0.518420i \(0.173479\pi\)
−0.855126 + 0.518420i \(0.826521\pi\)
\(140\) −37.1508 28.4888i −0.265363 0.203492i
\(141\) −1.22419 −0.00868217
\(142\) 26.7478 26.7478i 0.188365 0.188365i
\(143\) 68.6742 + 68.6742i 0.480239 + 0.480239i
\(144\) 35.9662i 0.249765i
\(145\) 15.8134 + 119.833i 0.109058 + 0.826432i
\(146\) −67.1390 −0.459856
\(147\) 1.75967 1.75967i 0.0119706 0.0119706i
\(148\) −6.05040 6.05040i −0.0408811 0.0408811i
\(149\) 224.861i 1.50913i −0.656224 0.754567i \(-0.727847\pi\)
0.656224 0.754567i \(-0.272153\pi\)
\(150\) 3.13757 0.842759i 0.0209171 0.00561839i
\(151\) 248.329 1.64457 0.822283 0.569079i \(-0.192700\pi\)
0.822283 + 0.569079i \(0.192700\pi\)
\(152\) 45.8543 45.8543i 0.301673 0.301673i
\(153\) −164.111 164.111i −1.07262 1.07262i
\(154\) 74.7885i 0.485639i
\(155\) −7.21388 + 0.951962i −0.0465412 + 0.00614169i
\(156\) −1.58010 −0.0101289
\(157\) −154.022 + 154.022i −0.981033 + 0.981033i −0.999823 0.0187908i \(-0.994018\pi\)
0.0187908 + 0.999823i \(0.494018\pi\)
\(158\) 55.9899 + 55.9899i 0.354367 + 0.354367i
\(159\) 9.00724i 0.0566493i
\(160\) −17.2115 + 22.4447i −0.107572 + 0.140279i
\(161\) 22.4525 0.139456
\(162\) 80.7721 80.7721i 0.498593 0.498593i
\(163\) −0.742426 0.742426i −0.00455476 0.00455476i 0.704826 0.709380i \(-0.251025\pi\)
−0.709380 + 0.704826i \(0.751025\pi\)
\(164\) 93.7689i 0.571762i
\(165\) 4.11835 + 3.15813i 0.0249597 + 0.0191402i
\(166\) −155.831 −0.938743
\(167\) 115.646 115.646i 0.692492 0.692492i −0.270288 0.962780i \(-0.587119\pi\)
0.962780 + 0.270288i \(0.0871189\pi\)
\(168\) 0.860391 + 0.860391i 0.00512137 + 0.00512137i
\(169\) 95.0772i 0.562587i
\(170\) −23.8784 180.948i −0.140461 1.06440i
\(171\) −206.151 −1.20556
\(172\) 96.8315 96.8315i 0.562974 0.562974i
\(173\) 135.671 + 135.671i 0.784224 + 0.784224i 0.980541 0.196317i \(-0.0628980\pi\)
−0.196317 + 0.980541i \(0.562898\pi\)
\(174\) 3.14148i 0.0180545i
\(175\) −58.4590 + 101.397i −0.334051 + 0.579409i
\(176\) −45.1835 −0.256724
\(177\) −6.01754 + 6.01754i −0.0339974 + 0.0339974i
\(178\) 81.5042 + 81.5042i 0.457889 + 0.457889i
\(179\) 317.529i 1.77390i 0.461861 + 0.886952i \(0.347182\pi\)
−0.461861 + 0.886952i \(0.652818\pi\)
\(180\) 89.1427 11.7635i 0.495237 0.0653528i
\(181\) 39.6540 0.219083 0.109541 0.993982i \(-0.465062\pi\)
0.109541 + 0.993982i \(0.465062\pi\)
\(182\) 40.2522 40.2522i 0.221166 0.221166i
\(183\) 7.36485 + 7.36485i 0.0402451 + 0.0402451i
\(184\) 13.5647i 0.0737210i
\(185\) −13.0171 + 16.9749i −0.0703626 + 0.0917562i
\(186\) 0.189116 0.00101675
\(187\) 206.169 206.169i 1.10251 1.10251i
\(188\) −18.8407 18.8407i −0.100216 0.100216i
\(189\) 7.73988i 0.0409518i
\(190\) −128.648 98.6529i −0.677095 0.519226i
\(191\) 106.653 0.558395 0.279197 0.960234i \(-0.409932\pi\)
0.279197 + 0.960234i \(0.409932\pi\)
\(192\) 0.519805 0.519805i 0.00270732 0.00270732i
\(193\) −141.080 141.080i −0.730985 0.730985i 0.239830 0.970815i \(-0.422908\pi\)
−0.970815 + 0.239830i \(0.922908\pi\)
\(194\) 5.38063i 0.0277352i
\(195\) 0.516805 + 3.91630i 0.00265028 + 0.0200836i
\(196\) 54.1641 0.276347
\(197\) −126.726 + 126.726i −0.643281 + 0.643281i −0.951361 0.308080i \(-0.900314\pi\)
0.308080 + 0.951361i \(0.400314\pi\)
\(198\) 101.567 + 101.567i 0.512967 + 0.512967i
\(199\) 96.1858i 0.483346i 0.970358 + 0.241673i \(0.0776961\pi\)
−0.970358 + 0.241673i \(0.922304\pi\)
\(200\) 61.2588 + 35.3180i 0.306294 + 0.176590i
\(201\) 0.876759 0.00436198
\(202\) −32.0918 + 32.0918i −0.158870 + 0.158870i
\(203\) 80.0275 + 80.0275i 0.394224 + 0.394224i
\(204\) 4.74366i 0.0232533i
\(205\) −232.407 + 30.6691i −1.13369 + 0.149605i
\(206\) −46.1830 −0.224189
\(207\) −30.4919 + 30.4919i −0.147304 + 0.147304i
\(208\) −24.3184 24.3184i −0.116915 0.116915i
\(209\) 258.982i 1.23915i
\(210\) 1.85108 2.41390i 0.00881467 0.0114948i
\(211\) 380.514 1.80338 0.901692 0.432379i \(-0.142326\pi\)
0.901692 + 0.432379i \(0.142326\pi\)
\(212\) −138.625 + 138.625i −0.653891 + 0.653891i
\(213\) 1.73796 + 1.73796i 0.00815943 + 0.00815943i
\(214\) 1.54444i 0.00721703i
\(215\) −271.669 208.327i −1.26358 0.968965i
\(216\) −4.67605 −0.0216484
\(217\) −4.81763 + 4.81763i −0.0222010 + 0.0222010i
\(218\) 17.8026 + 17.8026i 0.0816632 + 0.0816632i
\(219\) 4.36240i 0.0199196i
\(220\) 14.7782 + 111.988i 0.0671736 + 0.509035i
\(221\) 221.926 1.00419
\(222\) 0.393129 0.393129i 0.00177085 0.00177085i
\(223\) −60.6308 60.6308i −0.271887 0.271887i 0.557973 0.829859i \(-0.311579\pi\)
−0.829859 + 0.557973i \(0.811579\pi\)
\(224\) 26.4835i 0.118230i
\(225\) −58.3119 217.094i −0.259164 0.964862i
\(226\) 100.508 0.444726
\(227\) −234.946 + 234.946i −1.03501 + 1.03501i −0.0356411 + 0.999365i \(0.511347\pi\)
−0.999365 + 0.0356411i \(0.988653\pi\)
\(228\) 2.97941 + 2.97941i 0.0130676 + 0.0130676i
\(229\) 338.701i 1.47905i 0.673132 + 0.739523i \(0.264949\pi\)
−0.673132 + 0.739523i \(0.735051\pi\)
\(230\) −33.6202 + 4.43660i −0.146175 + 0.0192896i
\(231\) 4.85943 0.0210365
\(232\) 48.3486 48.3486i 0.208399 0.208399i
\(233\) −194.995 194.995i −0.836888 0.836888i 0.151560 0.988448i \(-0.451570\pi\)
−0.988448 + 0.151560i \(0.951570\pi\)
\(234\) 109.330i 0.467222i
\(235\) −40.5347 + 52.8591i −0.172488 + 0.224932i
\(236\) −185.225 −0.784850
\(237\) −3.63798 + 3.63798i −0.0153501 + 0.0153501i
\(238\) −120.842 120.842i −0.507740 0.507740i
\(239\) 197.284i 0.825457i −0.910854 0.412728i \(-0.864576\pi\)
0.910854 0.412728i \(-0.135424\pi\)
\(240\) −1.45836 1.11833i −0.00607649 0.00465971i
\(241\) −95.2497 −0.395227 −0.197613 0.980280i \(-0.563319\pi\)
−0.197613 + 0.980280i \(0.563319\pi\)
\(242\) −6.59659 + 6.59659i −0.0272586 + 0.0272586i
\(243\) 15.7693 + 15.7693i 0.0648944 + 0.0648944i
\(244\) 226.696i 0.929080i
\(245\) −17.7155 134.246i −0.0723081 0.547944i
\(246\) 6.09269 0.0247671
\(247\) 139.388 139.388i 0.564323 0.564323i
\(248\) 2.91057 + 2.91057i 0.0117362 + 0.0117362i
\(249\) 10.1252i 0.0406636i
\(250\) 67.5002 163.382i 0.270001 0.653529i
\(251\) −287.374 −1.14492 −0.572459 0.819934i \(-0.694010\pi\)
−0.572459 + 0.819934i \(0.694010\pi\)
\(252\) 59.5319 59.5319i 0.236238 0.236238i
\(253\) −38.3061 38.3061i −0.151408 0.151408i
\(254\) 49.9940i 0.196827i
\(255\) 11.7572 1.55151i 0.0461068 0.00608436i
\(256\) 16.0000 0.0625000
\(257\) −127.591 + 127.591i −0.496465 + 0.496465i −0.910336 0.413871i \(-0.864176\pi\)
0.413871 + 0.910336i \(0.364176\pi\)
\(258\) 6.29169 + 6.29169i 0.0243864 + 0.0243864i
\(259\) 20.0295i 0.0773338i
\(260\) −52.3195 + 68.2272i −0.201229 + 0.262412i
\(261\) −217.365 −0.832815
\(262\) −193.717 + 193.717i −0.739378 + 0.739378i
\(263\) −289.451 289.451i −1.10057 1.10057i −0.994341 0.106233i \(-0.966121\pi\)
−0.106233 0.994341i \(-0.533879\pi\)
\(264\) 2.93582i 0.0111205i
\(265\) 388.924 + 298.243i 1.46764 + 1.12545i
\(266\) −151.798 −0.570668
\(267\) −5.29579 + 5.29579i −0.0198344 + 0.0198344i
\(268\) 13.4937 + 13.4937i 0.0503494 + 0.0503494i
\(269\) 336.736i 1.25181i 0.779901 + 0.625903i \(0.215269\pi\)
−0.779901 + 0.625903i \(0.784731\pi\)
\(270\) 1.52940 + 11.5897i 0.00566444 + 0.0429246i
\(271\) 201.995 0.745370 0.372685 0.927958i \(-0.378437\pi\)
0.372685 + 0.927958i \(0.378437\pi\)
\(272\) −73.0068 + 73.0068i −0.268407 + 0.268407i
\(273\) 2.61541 + 2.61541i 0.00958026 + 0.00958026i
\(274\) 166.455i 0.607499i
\(275\) 272.730 73.2558i 0.991744 0.266385i
\(276\) 0.881373 0.00319338
\(277\) −231.622 + 231.622i −0.836182 + 0.836182i −0.988354 0.152172i \(-0.951373\pi\)
0.152172 + 0.988354i \(0.451373\pi\)
\(278\) −144.121 144.121i −0.518420 0.518420i
\(279\) 13.0853i 0.0469006i
\(280\) 65.6396 8.66197i 0.234427 0.0309356i
\(281\) −14.7060 −0.0523347 −0.0261673 0.999658i \(-0.508330\pi\)
−0.0261673 + 0.999658i \(0.508330\pi\)
\(282\) 1.22419 1.22419i 0.00434109 0.00434109i
\(283\) −203.571 203.571i −0.719334 0.719334i 0.249135 0.968469i \(-0.419854\pi\)
−0.968469 + 0.249135i \(0.919854\pi\)
\(284\) 53.4957i 0.188365i
\(285\) 6.41003 8.35899i 0.0224913 0.0293298i
\(286\) −137.348 −0.480239
\(287\) −155.208 + 155.208i −0.540794 + 0.540794i
\(288\) −35.9662 35.9662i −0.124883 0.124883i
\(289\) 377.249i 1.30536i
\(290\) −135.646 104.019i −0.467745 0.358687i
\(291\) −0.349610 −0.00120141
\(292\) 67.1390 67.1390i 0.229928 0.229928i
\(293\) 270.813 + 270.813i 0.924277 + 0.924277i 0.997328 0.0730512i \(-0.0232736\pi\)
−0.0730512 + 0.997328i \(0.523274\pi\)
\(294\) 3.51935i 0.0119706i
\(295\) 60.5815 + 459.081i 0.205361 + 1.55621i
\(296\) 12.1008 0.0408811
\(297\) −13.2050 + 13.2050i −0.0444613 + 0.0444613i
\(298\) 224.861 + 224.861i 0.754567 + 0.754567i
\(299\) 41.2338i 0.137906i
\(300\) −2.29481 + 3.98033i −0.00764937 + 0.0132678i
\(301\) −320.555 −1.06497
\(302\) −248.329 + 248.329i −0.822283 + 0.822283i
\(303\) −2.08518 2.08518i −0.00688180 0.00688180i
\(304\) 91.7086i 0.301673i
\(305\) 561.868 74.1455i 1.84219 0.243100i
\(306\) 328.222 1.07262
\(307\) 110.923 110.923i 0.361314 0.361314i −0.502982 0.864297i \(-0.667764\pi\)
0.864297 + 0.502982i \(0.167764\pi\)
\(308\) 74.7885 + 74.7885i 0.242820 + 0.242820i
\(309\) 3.00077i 0.00971124i
\(310\) 6.26192 8.16584i 0.0201997 0.0263414i
\(311\) 460.089 1.47938 0.739692 0.672945i \(-0.234971\pi\)
0.739692 + 0.672945i \(0.234971\pi\)
\(312\) 1.58010 1.58010i 0.00506443 0.00506443i
\(313\) 305.558 + 305.558i 0.976222 + 0.976222i 0.999724 0.0235016i \(-0.00748149\pi\)
−0.0235016 + 0.999724i \(0.507481\pi\)
\(314\) 308.044i 0.981033i
\(315\) −167.022 128.080i −0.530228 0.406602i
\(316\) −111.980 −0.354367
\(317\) 308.414 308.414i 0.972915 0.972915i −0.0267276 0.999643i \(-0.508509\pi\)
0.999643 + 0.0267276i \(0.00850866\pi\)
\(318\) −9.00724 9.00724i −0.0283246 0.0283246i
\(319\) 273.070i 0.856018i
\(320\) −5.23313 39.6562i −0.0163535 0.123926i
\(321\) 0.100351 0.000312621
\(322\) −22.4525 + 22.4525i −0.0697282 + 0.0697282i
\(323\) −418.459 418.459i −1.29554 1.29554i
\(324\) 161.544i 0.498593i
\(325\) 186.214 + 107.360i 0.572966 + 0.330337i
\(326\) 1.48485 0.00455476
\(327\) −1.15673 + 1.15673i −0.00353741 + 0.00353741i
\(328\) 93.7689 + 93.7689i 0.285881 + 0.285881i
\(329\) 62.3709i 0.189577i
\(330\) −7.27648 + 0.960222i −0.0220499 + 0.00290976i
\(331\) −12.4523 −0.0376203 −0.0188101 0.999823i \(-0.505988\pi\)
−0.0188101 + 0.999823i \(0.505988\pi\)
\(332\) 155.831 155.831i 0.469371 0.469371i
\(333\) −27.2013 27.2013i −0.0816855 0.0816855i
\(334\) 231.292i 0.692492i
\(335\) 29.0308 37.8576i 0.0866591 0.113008i
\(336\) −1.72078 −0.00512137
\(337\) −147.444 + 147.444i −0.437520 + 0.437520i −0.891177 0.453657i \(-0.850119\pi\)
0.453657 + 0.891177i \(0.350119\pi\)
\(338\) 95.0772 + 95.0772i 0.281293 + 0.281293i
\(339\) 6.53057i 0.0192642i
\(340\) 204.827 + 157.070i 0.602431 + 0.461970i
\(341\) 16.4387 0.0482073
\(342\) 206.151 206.151i 0.602780 0.602780i
\(343\) −251.865 251.865i −0.734299 0.734299i
\(344\) 193.663i 0.562974i
\(345\) −0.288271 2.18449i −0.000835568 0.00633186i
\(346\) −271.341 −0.784224
\(347\) −476.493 + 476.493i −1.37318 + 1.37318i −0.517488 + 0.855690i \(0.673133\pi\)
−0.855690 + 0.517488i \(0.826867\pi\)
\(348\) 3.14148 + 3.14148i 0.00902725 + 0.00902725i
\(349\) 193.545i 0.554571i −0.960788 0.277286i \(-0.910565\pi\)
0.960788 0.277286i \(-0.0894348\pi\)
\(350\) −42.9376 159.856i −0.122679 0.456730i
\(351\) −14.2142 −0.0404964
\(352\) 45.1835 45.1835i 0.128362 0.128362i
\(353\) −155.526 155.526i −0.440584 0.440584i 0.451624 0.892208i \(-0.350845\pi\)
−0.892208 + 0.451624i \(0.850845\pi\)
\(354\) 12.0351i 0.0339974i
\(355\) 132.590 17.4969i 0.373492 0.0492869i
\(356\) −163.008 −0.457889
\(357\) 7.85180 7.85180i 0.0219938 0.0219938i
\(358\) −317.529 317.529i −0.886952 0.886952i
\(359\) 264.514i 0.736808i 0.929666 + 0.368404i \(0.120096\pi\)
−0.929666 + 0.368404i \(0.879904\pi\)
\(360\) −77.3792 + 100.906i −0.214942 + 0.280295i
\(361\) −164.654 −0.456106
\(362\) −39.6540 + 39.6540i −0.109541 + 0.109541i
\(363\) −0.428617 0.428617i −0.00118076 0.00118076i
\(364\) 80.5044i 0.221166i
\(365\) −188.364 144.446i −0.516066 0.395742i
\(366\) −14.7297 −0.0402451
\(367\) 13.5911 13.5911i 0.0370329 0.0370329i −0.688348 0.725381i \(-0.741664\pi\)
0.725381 + 0.688348i \(0.241664\pi\)
\(368\) 13.5647 + 13.5647i 0.0368605 + 0.0368605i
\(369\) 421.564i 1.14245i
\(370\) −3.95782 29.9920i −0.0106968 0.0810594i
\(371\) 458.909 1.23695
\(372\) −0.189116 + 0.189116i −0.000508377 + 0.000508377i
\(373\) −491.491 491.491i −1.31767 1.31767i −0.915616 0.402054i \(-0.868296\pi\)
−0.402054 0.915616i \(-0.631704\pi\)
\(374\) 412.337i 1.10251i
\(375\) 10.6159 + 4.38587i 0.0283090 + 0.0116957i
\(376\) 37.6814 0.100216
\(377\) 146.970 146.970i 0.389841 0.389841i
\(378\) 7.73988 + 7.73988i 0.0204759 + 0.0204759i
\(379\) 617.809i 1.63010i 0.579389 + 0.815051i \(0.303291\pi\)
−0.579389 + 0.815051i \(0.696709\pi\)
\(380\) 227.301 29.9952i 0.598160 0.0789347i
\(381\) −3.24839 −0.00852596
\(382\) −106.653 + 106.653i −0.279197 + 0.279197i
\(383\) 235.834 + 235.834i 0.615755 + 0.615755i 0.944440 0.328685i \(-0.106605\pi\)
−0.328685 + 0.944440i \(0.606605\pi\)
\(384\) 1.03961i 0.00270732i
\(385\) 160.903 209.825i 0.417930 0.545001i
\(386\) 282.160 0.730985
\(387\) 435.333 435.333i 1.12489 1.12489i
\(388\) −5.38063 5.38063i −0.0138676 0.0138676i
\(389\) 226.762i 0.582935i −0.956581 0.291467i \(-0.905856\pi\)
0.956581 0.291467i \(-0.0941435\pi\)
\(390\) −4.43310 3.39950i −0.0113669 0.00871665i
\(391\) −123.789 −0.316596
\(392\) −54.1641 + 54.1641i −0.138174 + 0.138174i
\(393\) −12.5869 12.5869i −0.0320277 0.0320277i
\(394\) 253.453i 0.643281i
\(395\) 36.6253 + 277.543i 0.0927223 + 0.702642i
\(396\) −203.135 −0.512967
\(397\) 67.6041 67.6041i 0.170287 0.170287i −0.616818 0.787106i \(-0.711579\pi\)
0.787106 + 0.616818i \(0.211579\pi\)
\(398\) −96.1858 96.1858i −0.241673 0.241673i
\(399\) 9.86315i 0.0247197i
\(400\) −96.5768 + 25.9408i −0.241442 + 0.0648519i
\(401\) −424.222 −1.05791 −0.528955 0.848650i \(-0.677416\pi\)
−0.528955 + 0.848650i \(0.677416\pi\)
\(402\) −0.876759 + 0.876759i −0.00218099 + 0.00218099i
\(403\) 8.84753 + 8.84753i 0.0219542 + 0.0219542i
\(404\) 64.1836i 0.158870i
\(405\) 400.389 52.8364i 0.988616 0.130460i
\(406\) −160.055 −0.394224
\(407\) 34.1723 34.1723i 0.0839613 0.0839613i
\(408\) −4.74366 4.74366i −0.0116266 0.0116266i
\(409\) 10.9416i 0.0267521i 0.999911 + 0.0133761i \(0.00425786\pi\)
−0.999911 + 0.0133761i \(0.995742\pi\)
\(410\) 201.738 263.076i 0.492045 0.641650i
\(411\) −10.8155 −0.0263151
\(412\) 46.1830 46.1830i 0.112095 0.112095i
\(413\) 306.587 + 306.587i 0.742341 + 0.742341i
\(414\) 60.9837i 0.147304i
\(415\) −437.198 335.262i −1.05349 0.807860i
\(416\) 48.6367 0.116915
\(417\) 9.36433 9.36433i 0.0224564 0.0224564i
\(418\) 258.982 + 258.982i 0.619574 + 0.619574i
\(419\) 47.1621i 0.112559i −0.998415 0.0562794i \(-0.982076\pi\)
0.998415 0.0562794i \(-0.0179238\pi\)
\(420\) 0.562817 + 4.26498i 0.00134004 + 0.0101547i
\(421\) 317.805 0.754882 0.377441 0.926034i \(-0.376804\pi\)
0.377441 + 0.926034i \(0.376804\pi\)
\(422\) −380.514 + 380.514i −0.901692 + 0.901692i
\(423\) −84.7036 84.7036i −0.200245 0.200245i
\(424\) 277.250i 0.653891i
\(425\) 322.307 559.038i 0.758369 1.31538i
\(426\) −3.47592 −0.00815943
\(427\) 375.231 375.231i 0.878760 0.878760i
\(428\) 1.54444 + 1.54444i 0.00360851 + 0.00360851i
\(429\) 8.92430i 0.0208026i
\(430\) 479.996 63.3415i 1.11627 0.147306i
\(431\) 526.966 1.22266 0.611330 0.791376i \(-0.290635\pi\)
0.611330 + 0.791376i \(0.290635\pi\)
\(432\) 4.67605 4.67605i 0.0108242 0.0108242i
\(433\) −156.271 156.271i −0.360904 0.360904i 0.503242 0.864146i \(-0.332140\pi\)
−0.864146 + 0.503242i \(0.832140\pi\)
\(434\) 9.63525i 0.0222010i
\(435\) 6.75872 8.81369i 0.0155373 0.0202614i
\(436\) −35.6052 −0.0816632
\(437\) −77.7498 + 77.7498i −0.177917 + 0.177917i
\(438\) 4.36240 + 4.36240i 0.00995982 + 0.00995982i
\(439\) 217.027i 0.494366i −0.968969 0.247183i \(-0.920495\pi\)
0.968969 0.247183i \(-0.0795048\pi\)
\(440\) −126.766 97.2096i −0.288104 0.220931i
\(441\) 243.510 0.552176
\(442\) −221.926 + 221.926i −0.502094 + 0.502094i
\(443\) −54.4175 54.4175i −0.122839 0.122839i 0.643015 0.765854i \(-0.277683\pi\)
−0.765854 + 0.643015i \(0.777683\pi\)
\(444\) 0.786258i 0.00177085i
\(445\) 53.3153 + 404.019i 0.119810 + 0.907907i
\(446\) 121.262 0.271887
\(447\) −14.6105 + 14.6105i −0.0326856 + 0.0326856i
\(448\) −26.4835 26.4835i −0.0591149 0.0591149i
\(449\) 318.334i 0.708984i 0.935059 + 0.354492i \(0.115346\pi\)
−0.935059 + 0.354492i \(0.884654\pi\)
\(450\) 275.406 + 158.782i 0.612013 + 0.352849i
\(451\) 529.600 1.17428
\(452\) −100.508 + 100.508i −0.222363 + 0.222363i
\(453\) −16.1354 16.1354i −0.0356189 0.0356189i
\(454\) 469.893i 1.03501i
\(455\) 199.531 26.3306i 0.438530 0.0578695i
\(456\) −5.95883 −0.0130676
\(457\) −402.986 + 402.986i −0.881807 + 0.881807i −0.993718 0.111911i \(-0.964303\pi\)
0.111911 + 0.993718i \(0.464303\pi\)
\(458\) −338.701 338.701i −0.739523 0.739523i
\(459\) 42.6729i 0.0929694i
\(460\) 29.1836 38.0568i 0.0634426 0.0827321i
\(461\) 446.523 0.968597 0.484299 0.874903i \(-0.339075\pi\)
0.484299 + 0.874903i \(0.339075\pi\)
\(462\) −4.85943 + 4.85943i −0.0105182 + 0.0105182i
\(463\) 288.951 + 288.951i 0.624085 + 0.624085i 0.946573 0.322488i \(-0.104519\pi\)
−0.322488 + 0.946573i \(0.604519\pi\)
\(464\) 96.6973i 0.208399i
\(465\) 0.530581 + 0.406872i 0.00114103 + 0.000874994i
\(466\) 389.990 0.836888
\(467\) −408.528 + 408.528i −0.874792 + 0.874792i −0.992990 0.118198i \(-0.962288\pi\)
0.118198 + 0.992990i \(0.462288\pi\)
\(468\) −109.330 109.330i −0.233611 0.233611i
\(469\) 44.6699i 0.0952449i
\(470\) −12.3245 93.3938i −0.0262223 0.198710i
\(471\) 20.0154 0.0424955
\(472\) 185.225 185.225i 0.392425 0.392425i
\(473\) 546.898 + 546.898i 1.15623 + 1.15623i
\(474\) 7.27596i 0.0153501i
\(475\) −148.687 553.558i −0.313025 1.16538i
\(476\) 241.684 0.507740
\(477\) −623.226 + 623.226i −1.30655 + 1.30655i
\(478\) 197.284 + 197.284i 0.412728 + 0.412728i
\(479\) 315.169i 0.657973i 0.944335 + 0.328986i \(0.106707\pi\)
−0.944335 + 0.328986i \(0.893293\pi\)
\(480\) 2.57669 0.340026i 0.00536810 0.000708388i
\(481\) 36.7840 0.0764739
\(482\) 95.2497 95.2497i 0.197613 0.197613i
\(483\) −1.45886 1.45886i −0.00302042 0.00302042i
\(484\) 13.1932i 0.0272586i
\(485\) −11.5761 + 15.0958i −0.0238683 + 0.0311254i
\(486\) −31.5387 −0.0648944
\(487\) −222.544 + 222.544i −0.456969 + 0.456969i −0.897659 0.440690i \(-0.854734\pi\)
0.440690 + 0.897659i \(0.354734\pi\)
\(488\) −226.696 226.696i −0.464540 0.464540i
\(489\) 0.0964792i 0.000197299i
\(490\) 151.962 + 116.531i 0.310126 + 0.237818i
\(491\) −515.585 −1.05007 −0.525035 0.851080i \(-0.675948\pi\)
−0.525035 + 0.851080i \(0.675948\pi\)
\(492\) −6.09269 + 6.09269i −0.0123835 + 0.0123835i
\(493\) −441.222 441.222i −0.894974 0.894974i
\(494\) 278.775i 0.564323i
\(495\) 66.4394 + 503.472i 0.134221 + 1.01712i
\(496\) −5.82114 −0.0117362
\(497\) 88.5470 88.5470i 0.178163 0.178163i
\(498\) 10.1252 + 10.1252i 0.0203318 + 0.0203318i
\(499\) 327.060i 0.655430i −0.944777 0.327715i \(-0.893721\pi\)
0.944777 0.327715i \(-0.106279\pi\)
\(500\) 95.8819 + 230.882i 0.191764 + 0.461765i
\(501\) −15.0284 −0.0299967
\(502\) 287.374 287.374i 0.572459 0.572459i
\(503\) 126.415 + 126.415i 0.251322 + 0.251322i 0.821513 0.570190i \(-0.193131\pi\)
−0.570190 + 0.821513i \(0.693131\pi\)
\(504\) 119.064i 0.236238i
\(505\) −159.080 + 20.9926i −0.315009 + 0.0415694i
\(506\) 76.6123 0.151408
\(507\) −6.17770 + 6.17770i −0.0121848 + 0.0121848i
\(508\) −49.9940 49.9940i −0.0984134 0.0984134i
\(509\) 270.227i 0.530898i 0.964125 + 0.265449i \(0.0855202\pi\)
−0.964125 + 0.265449i \(0.914480\pi\)
\(510\) −10.2057 + 13.3087i −0.0200112 + 0.0260956i
\(511\) −222.259 −0.434950
\(512\) −16.0000 + 16.0000i −0.0312500 + 0.0312500i
\(513\) 26.8021 + 26.8021i 0.0522459 + 0.0522459i
\(514\) 255.183i 0.496465i
\(515\) −129.570 99.3601i −0.251593 0.192932i
\(516\) −12.5834 −0.0243864
\(517\) 106.411 106.411i 0.205824 0.205824i
\(518\) −20.0295 20.0295i −0.0386669 0.0386669i
\(519\) 17.6306i 0.0339703i
\(520\) −15.9076 120.547i −0.0305916 0.231821i
\(521\) −371.214 −0.712502 −0.356251 0.934390i \(-0.615945\pi\)
−0.356251 + 0.934390i \(0.615945\pi\)
\(522\) 217.365 217.365i 0.416408 0.416408i
\(523\) −417.334 417.334i −0.797962 0.797962i 0.184812 0.982774i \(-0.440832\pi\)
−0.982774 + 0.184812i \(0.940832\pi\)
\(524\) 387.434i 0.739378i
\(525\) 10.3867 2.78990i 0.0197842 0.00531409i
\(526\) 578.902 1.10057
\(527\) 26.5614 26.5614i 0.0504012 0.0504012i
\(528\) 2.93582 + 2.93582i 0.00556027 + 0.00556027i
\(529\) 23.0000i 0.0434783i
\(530\) −687.167 + 90.6802i −1.29654 + 0.171095i
\(531\) −832.729 −1.56823
\(532\) 151.798 151.798i 0.285334 0.285334i
\(533\) 285.038 + 285.038i 0.534781 + 0.534781i
\(534\) 10.5916i 0.0198344i
\(535\) 3.32278 4.33307i 0.00621081 0.00809919i
\(536\) −26.9873 −0.0503494
\(537\) 20.6316 20.6316i 0.0384202 0.0384202i
\(538\) −336.736 336.736i −0.625903 0.625903i
\(539\) 305.915i 0.567560i
\(540\) −13.1191 10.0603i −0.0242945 0.0186301i
\(541\) 560.715 1.03644 0.518221 0.855247i \(-0.326594\pi\)
0.518221 + 0.855247i \(0.326594\pi\)
\(542\) −201.995 + 201.995i −0.372685 + 0.372685i
\(543\) −2.57654 2.57654i −0.00474502 0.00474502i
\(544\) 146.014i 0.268407i
\(545\) 11.6454 + 88.2478i 0.0213677 + 0.161923i
\(546\) −5.23082 −0.00958026
\(547\) −76.6064 + 76.6064i −0.140048 + 0.140048i −0.773655 0.633607i \(-0.781574\pi\)
0.633607 + 0.773655i \(0.281574\pi\)
\(548\) −166.455 166.455i −0.303750 0.303750i
\(549\) 1019.17i 1.85642i
\(550\) −199.474 + 345.985i −0.362680 + 0.629064i
\(551\) −554.248 −1.00590
\(552\) −0.881373 + 0.881373i −0.00159669 + 0.00159669i
\(553\) 185.351 + 185.351i 0.335174 + 0.335174i
\(554\) 463.245i 0.836182i
\(555\) 1.94875 0.257162i 0.00351126 0.000463354i
\(556\) 288.241 0.518420
\(557\) −262.627 + 262.627i −0.471502 + 0.471502i −0.902401 0.430898i \(-0.858197\pi\)
0.430898 + 0.902401i \(0.358197\pi\)
\(558\) 13.0853 + 13.0853i 0.0234503 + 0.0234503i
\(559\) 588.696i 1.05312i
\(560\) −56.9777 + 74.3016i −0.101746 + 0.132681i
\(561\) −26.7919 −0.0477574
\(562\) 14.7060 14.7060i 0.0261673 0.0261673i
\(563\) 516.006 + 516.006i 0.916529 + 0.916529i 0.996775 0.0802456i \(-0.0255705\pi\)
−0.0802456 + 0.996775i \(0.525570\pi\)
\(564\) 2.44837i 0.00434109i
\(565\) 281.984 + 216.237i 0.499086 + 0.382721i
\(566\) 407.143 0.719334
\(567\) 267.391 267.391i 0.471589 0.471589i
\(568\) −53.4957 53.4957i −0.0941825 0.0941825i
\(569\) 231.361i 0.406609i −0.979116 0.203305i \(-0.934832\pi\)
0.979116 0.203305i \(-0.0651682\pi\)
\(570\) 1.94896 + 14.7690i 0.00341922 + 0.0259106i
\(571\) −1110.09 −1.94411 −0.972056 0.234751i \(-0.924573\pi\)
−0.972056 + 0.234751i \(0.924573\pi\)
\(572\) 137.348 137.348i 0.240120 0.240120i
\(573\) −6.92988 6.92988i −0.0120940 0.0120940i
\(574\) 310.416i 0.540794i
\(575\) −103.869 59.8846i −0.180642 0.104147i
\(576\) 71.9325 0.124883
\(577\) −78.6205 + 78.6205i −0.136257 + 0.136257i −0.771946 0.635688i \(-0.780716\pi\)
0.635688 + 0.771946i \(0.280716\pi\)
\(578\) 377.249 + 377.249i 0.652680 + 0.652680i
\(579\) 18.3335i 0.0316642i
\(580\) 239.665 31.6268i 0.413216 0.0545290i
\(581\) −515.870 −0.887899
\(582\) 0.349610 0.349610i 0.000600705 0.000600705i
\(583\) −782.944 782.944i −1.34296 1.34296i
\(584\) 134.278i 0.229928i
\(585\) −235.217 + 306.734i −0.402080 + 0.524332i
\(586\) −541.626 −0.924277
\(587\) 417.321 417.321i 0.710939 0.710939i −0.255793 0.966732i \(-0.582336\pi\)
0.966732 + 0.255793i \(0.0823365\pi\)
\(588\) −3.51935 3.51935i −0.00598528 0.00598528i
\(589\) 33.3655i 0.0566478i
\(590\) −519.663 398.500i −0.880785 0.675424i
\(591\) 16.4683 0.0278651
\(592\) −12.1008 + 12.1008i −0.0204405 + 0.0204405i
\(593\) 667.040 + 667.040i 1.12486 + 1.12486i 0.991001 + 0.133855i \(0.0427358\pi\)
0.133855 + 0.991001i \(0.457264\pi\)
\(594\) 26.4100i 0.0444613i
\(595\) −79.0478 599.018i −0.132854 1.00675i
\(596\) −449.722 −0.754567
\(597\) 6.24973 6.24973i 0.0104686 0.0104686i
\(598\) 41.2338 + 41.2338i 0.0689528 + 0.0689528i
\(599\) 226.878i 0.378761i −0.981904 0.189381i \(-0.939352\pi\)
0.981904 0.189381i \(-0.0606480\pi\)
\(600\) −1.68552 6.27514i −0.00280920 0.0104586i
\(601\) 278.390 0.463212 0.231606 0.972810i \(-0.425602\pi\)
0.231606 + 0.972810i \(0.425602\pi\)
\(602\) 320.555 320.555i 0.532483 0.532483i
\(603\) 60.6645 + 60.6645i 0.100604 + 0.100604i
\(604\) 496.659i 0.822283i
\(605\) −32.6994 + 4.31510i −0.0540487 + 0.00713239i
\(606\) 4.17037 0.00688180
\(607\) −213.989 + 213.989i −0.352536 + 0.352536i −0.861052 0.508516i \(-0.830194\pi\)
0.508516 + 0.861052i \(0.330194\pi\)
\(608\) −91.7086 91.7086i −0.150837 0.150837i
\(609\) 10.3997i 0.0170766i
\(610\) −487.723 + 636.013i −0.799545 + 1.04265i
\(611\) 114.544 0.187469
\(612\) −328.222 + 328.222i −0.536311 + 0.536311i
\(613\) −598.265 598.265i −0.975962 0.975962i 0.0237560 0.999718i \(-0.492438\pi\)
−0.999718 + 0.0237560i \(0.992438\pi\)
\(614\) 221.847i 0.361314i
\(615\) 17.0936 + 13.1081i 0.0277944 + 0.0213139i
\(616\) −149.577 −0.242820
\(617\) 279.954 279.954i 0.453734 0.453734i −0.442858 0.896592i \(-0.646035\pi\)
0.896592 + 0.442858i \(0.146035\pi\)
\(618\) 3.00077 + 3.00077i 0.00485562 + 0.00485562i
\(619\) 492.991i 0.796431i 0.917292 + 0.398216i \(0.130370\pi\)
−0.917292 + 0.398216i \(0.869630\pi\)
\(620\) 1.90392 + 14.4278i 0.00307084 + 0.0232706i
\(621\) 7.92863 0.0127675
\(622\) −460.089 + 460.089i −0.739692 + 0.739692i
\(623\) 269.814 + 269.814i 0.433089 + 0.433089i
\(624\) 3.16020i 0.00506443i
\(625\) 540.885 313.159i 0.865415 0.501055i
\(626\) −611.115 −0.976222
\(627\) −16.8275 + 16.8275i −0.0268382 + 0.0268382i
\(628\) 308.044 + 308.044i 0.490516 + 0.490516i
\(629\) 110.430i 0.175565i
\(630\) 295.101 38.9423i 0.468415 0.0618132i
\(631\) −1160.95 −1.83986 −0.919932 0.392078i \(-0.871756\pi\)
−0.919932 + 0.392078i \(0.871756\pi\)
\(632\) 111.980 111.980i 0.177183 0.177183i
\(633\) −24.7241 24.7241i −0.0390587 0.0390587i
\(634\) 616.828i 0.972915i
\(635\) −107.559 + 140.262i −0.169385 + 0.220886i
\(636\) 18.0145 0.0283246
\(637\) −164.648 + 164.648i −0.258474 + 0.258474i
\(638\) 273.070 + 273.070i 0.428009 + 0.428009i
\(639\) 240.505i 0.376377i
\(640\) 44.8893 + 34.4231i 0.0701396 + 0.0537860i
\(641\) 589.604 0.919818 0.459909 0.887966i \(-0.347882\pi\)
0.459909 + 0.887966i \(0.347882\pi\)
\(642\) −0.100351 + 0.100351i −0.000156310 + 0.000156310i
\(643\) −529.425 529.425i −0.823368 0.823368i 0.163222 0.986589i \(-0.447811\pi\)
−0.986589 + 0.163222i \(0.947811\pi\)
\(644\) 44.9049i 0.0697282i
\(645\) 4.11565 + 31.1881i 0.00638086 + 0.0483536i
\(646\) 836.919 1.29554
\(647\) 97.4272 97.4272i 0.150583 0.150583i −0.627795 0.778378i \(-0.716043\pi\)
0.778378 + 0.627795i \(0.216043\pi\)
\(648\) −161.544 161.544i −0.249297 0.249297i
\(649\) 1046.14i 1.61192i
\(650\) −293.574 + 78.8546i −0.451652 + 0.121315i
\(651\) 0.626057 0.000961684
\(652\) −1.48485 + 1.48485i −0.00227738 + 0.00227738i
\(653\) 290.130 + 290.130i 0.444303 + 0.444303i 0.893455 0.449152i \(-0.148274\pi\)
−0.449152 + 0.893455i \(0.648274\pi\)
\(654\) 2.31347i 0.00353741i
\(655\) −960.260 + 126.718i −1.46605 + 0.193463i
\(656\) −187.538 −0.285881
\(657\) 301.842 301.842i 0.459425 0.459425i
\(658\) −62.3709 62.3709i −0.0947886 0.0947886i
\(659\) 821.428i 1.24648i 0.782032 + 0.623238i \(0.214183\pi\)
−0.782032 + 0.623238i \(0.785817\pi\)
\(660\) 6.31626 8.23670i 0.00957009 0.0124798i
\(661\) 226.046 0.341976 0.170988 0.985273i \(-0.445304\pi\)
0.170988 + 0.985273i \(0.445304\pi\)
\(662\) 12.4523 12.4523i 0.0188101 0.0188101i
\(663\) −14.4198 14.4198i −0.0217493 0.0217493i
\(664\) 311.663i 0.469371i
\(665\) −425.881 326.584i −0.640423 0.491104i
\(666\) 54.4025 0.0816855
\(667\) −81.9791 + 81.9791i −0.122907 + 0.122907i
\(668\) −231.292 231.292i −0.346246 0.346246i
\(669\) 7.87905i 0.0117774i
\(670\) 8.82676 + 66.8884i 0.0131743 + 0.0998334i
\(671\) −1280.36 −1.90814
\(672\) 1.72078 1.72078i 0.00256069 0.00256069i
\(673\) 744.480 + 744.480i 1.10621 + 1.10621i 0.993644 + 0.112566i \(0.0359070\pi\)
0.112566 + 0.993644i \(0.464093\pi\)
\(674\) 294.888i 0.437520i
\(675\) −20.6436 + 35.8062i −0.0305831 + 0.0530462i
\(676\) −190.154 −0.281293
\(677\) −777.563 + 777.563i −1.14854 + 1.14854i −0.161702 + 0.986840i \(0.551698\pi\)
−0.986840 + 0.161702i \(0.948302\pi\)
\(678\) −6.53057 6.53057i −0.00963211 0.00963211i
\(679\) 17.8122i 0.0262330i
\(680\) −361.897 + 47.7568i −0.532201 + 0.0702305i
\(681\) 30.5316 0.0448334
\(682\) −16.4387 + 16.4387i −0.0241037 + 0.0241037i
\(683\) −224.810 224.810i −0.329151 0.329151i 0.523112 0.852264i \(-0.324771\pi\)
−0.852264 + 0.523112i \(0.824771\pi\)
\(684\) 412.302i 0.602780i
\(685\) −358.118 + 467.003i −0.522800 + 0.681756i
\(686\) 503.729 0.734299
\(687\) 22.0073 22.0073i 0.0320340 0.0320340i
\(688\) −193.663 193.663i −0.281487 0.281487i
\(689\) 842.782i 1.22320i
\(690\) 2.47276 + 1.89622i 0.00358372 + 0.00274815i
\(691\) 957.450 1.38560 0.692800 0.721130i \(-0.256377\pi\)
0.692800 + 0.721130i \(0.256377\pi\)
\(692\) 271.341 271.341i 0.392112 0.392112i
\(693\) 336.232 + 336.232i 0.485184 + 0.485184i
\(694\) 952.986i 1.37318i
\(695\) −94.2753 714.410i −0.135648 1.02793i
\(696\) −6.28297 −0.00902725
\(697\) 855.721 855.721i 1.22772 1.22772i
\(698\) 193.545 + 193.545i 0.277286 + 0.277286i
\(699\) 25.3398i 0.0362516i
\(700\) 202.793 + 116.918i 0.289705 + 0.167026i
\(701\) 551.764 0.787110 0.393555 0.919301i \(-0.371245\pi\)
0.393555 + 0.919301i \(0.371245\pi\)
\(702\) 14.2142 14.2142i 0.0202482 0.0202482i
\(703\) −69.3592 69.3592i −0.0986618 0.0986618i
\(704\) 90.3669i 0.128362i
\(705\) 6.06832 0.800791i 0.00860755 0.00113587i
\(706\) 311.052 0.440584
\(707\) −106.238 + 106.238i −0.150266 + 0.150266i
\(708\) 12.0351 + 12.0351i 0.0169987 + 0.0169987i
\(709\) 283.238i 0.399489i 0.979848 + 0.199744i \(0.0640112\pi\)
−0.979848 + 0.199744i \(0.935989\pi\)
\(710\) −115.093 + 150.087i −0.162103 + 0.211390i
\(711\) −503.437 −0.708068
\(712\) 163.008 163.008i 0.228944 0.228944i
\(713\) −4.93511 4.93511i −0.00692161 0.00692161i
\(714\) 15.7036i 0.0219938i
\(715\) −385.343 295.497i −0.538941 0.413283i
\(716\) 635.058 0.886952
\(717\) −12.8187 + 12.8187i −0.0178782 + 0.0178782i
\(718\) −264.514 264.514i −0.368404 0.368404i
\(719\) 278.263i 0.387014i −0.981099 0.193507i \(-0.938014\pi\)
0.981099 0.193507i \(-0.0619862\pi\)
\(720\) −23.5270 178.285i −0.0326764 0.247619i
\(721\) −152.886 −0.212047
\(722\) 164.654 164.654i 0.228053 0.228053i
\(723\) 6.18891 + 6.18891i 0.00856004 + 0.00856004i
\(724\) 79.3080i 0.109541i
\(725\) −156.775 583.670i −0.216241 0.805061i
\(726\) 0.857235 0.00118076
\(727\) 912.951 912.951i 1.25578 1.25578i 0.302689 0.953089i \(-0.402116\pi\)
0.953089 0.302689i \(-0.0978844\pi\)
\(728\) −80.5044 80.5044i −0.110583 0.110583i
\(729\) 724.900i 0.994375i
\(730\) 332.810 43.9184i 0.455904 0.0601622i
\(731\) 1767.34 2.41770
\(732\) 14.7297 14.7297i 0.0201225 0.0201225i
\(733\) 457.180 + 457.180i 0.623711 + 0.623711i 0.946478 0.322767i \(-0.104613\pi\)
−0.322767 + 0.946478i \(0.604613\pi\)
\(734\) 27.1822i 0.0370329i
\(735\) −7.57167 + 9.87382i −0.0103016 + 0.0134338i
\(736\) −27.1293 −0.0368605
\(737\) −76.2112 + 76.2112i −0.103407 + 0.103407i
\(738\) 421.564 + 421.564i 0.571225 + 0.571225i
\(739\) 480.868i 0.650701i 0.945593 + 0.325351i \(0.105482\pi\)
−0.945593 + 0.325351i \(0.894518\pi\)
\(740\) 33.9498 + 26.0342i 0.0458781 + 0.0351813i
\(741\) −18.1136 −0.0244448
\(742\) −458.909 + 458.909i −0.618475 + 0.618475i
\(743\) 280.766 + 280.766i 0.377882 + 0.377882i 0.870338 0.492456i \(-0.163901\pi\)
−0.492456 + 0.870338i \(0.663901\pi\)
\(744\) 0.378232i 0.000508377i
\(745\) 147.091 + 1114.64i 0.197437 + 1.49616i
\(746\) 982.982 1.31767
\(747\) 700.583 700.583i 0.937862 0.937862i
\(748\) −412.337 412.337i −0.551253 0.551253i
\(749\) 5.11278i 0.00682615i
\(750\) −15.0017 + 6.22999i −0.0200023 + 0.00830665i
\(751\) 109.950 0.146405 0.0732025 0.997317i \(-0.476678\pi\)
0.0732025 + 0.997317i \(0.476678\pi\)
\(752\) −37.6814 + 37.6814i −0.0501082 + 0.0501082i
\(753\) 18.6723 + 18.6723i 0.0247972 + 0.0247972i
\(754\) 293.940i 0.389841i
\(755\) −1230.98 + 162.443i −1.63043 + 0.215156i
\(756\) −15.4798 −0.0204759
\(757\) 288.009 288.009i 0.380461 0.380461i −0.490807 0.871268i \(-0.663298\pi\)
0.871268 + 0.490807i \(0.163298\pi\)
\(758\) −617.809 617.809i −0.815051 0.815051i
\(759\) 4.97793i 0.00655854i
\(760\) −197.306 + 257.296i −0.259613 + 0.338548i
\(761\) −61.1841 −0.0803996 −0.0401998 0.999192i \(-0.512799\pi\)
−0.0401998 + 0.999192i \(0.512799\pi\)
\(762\) 3.24839 3.24839i 0.00426298 0.00426298i
\(763\) 58.9343 + 58.9343i 0.0772402 + 0.0772402i
\(764\) 213.307i 0.279197i
\(765\) 920.855 + 706.151i 1.20373 + 0.923074i
\(766\) −471.668 −0.615755
\(767\) 563.045 563.045i 0.734087 0.734087i
\(768\) −1.03961 1.03961i −0.00135366 0.00135366i
\(769\) 759.640i 0.987828i −0.869511 0.493914i \(-0.835566\pi\)
0.869511 0.493914i \(-0.164434\pi\)
\(770\) 48.9222 + 370.728i 0.0635354 + 0.481465i
\(771\) 16.5807 0.0215054
\(772\) −282.160 + 282.160i −0.365493 + 0.365493i
\(773\) 698.836 + 698.836i 0.904058 + 0.904058i 0.995784 0.0917267i \(-0.0292386\pi\)
−0.0917267 + 0.995784i \(0.529239\pi\)
\(774\) 870.666i 1.12489i
\(775\) 35.1367 9.43780i 0.0453376 0.0121778i
\(776\) 10.7613 0.0138676
\(777\) 1.30143 1.30143i 0.00167494 0.00167494i
\(778\) 226.762 + 226.762i 0.291467 + 0.291467i
\(779\) 1074.93i 1.37988i
\(780\) 7.83260 1.03361i 0.0100418 0.00132514i
\(781\) −302.140 −0.386863
\(782\) 123.789 123.789i 0.158298 0.158298i
\(783\) 28.2601 + 28.2601i 0.0360921 + 0.0360921i
\(784\) 108.328i 0.138174i
\(785\) 662.739 864.244i 0.844254 1.10095i
\(786\) 25.1738 0.0320277
\(787\) 357.294 357.294i 0.453995 0.453995i −0.442683 0.896678i \(-0.645973\pi\)
0.896678 + 0.442683i \(0.145973\pi\)
\(788\) 253.453 + 253.453i 0.321641 + 0.321641i
\(789\) 37.6145i 0.0476737i
\(790\) −314.169 240.918i −0.397682 0.304960i
\(791\) 332.725 0.420639
\(792\) 203.135 203.135i 0.256483 0.256483i
\(793\) −689.108 689.108i −0.868989 0.868989i
\(794\) 135.208i 0.170287i
\(795\) −5.89201 44.6491i −0.00741133 0.0561624i
\(796\) 192.372 0.241673
\(797\) 609.058 609.058i 0.764188 0.764188i −0.212889 0.977076i \(-0.568287\pi\)
0.977076 + 0.212889i \(0.0682871\pi\)
\(798\) 9.86315 + 9.86315i 0.0123598 + 0.0123598i
\(799\) 343.875i 0.430381i
\(800\) 70.6360 122.518i 0.0882950 0.153147i
\(801\) −732.850 −0.914919
\(802\) 424.222 424.222i 0.528955 0.528955i
\(803\) 379.197 + 379.197i 0.472225 + 0.472225i
\(804\) 1.75352i 0.00218099i
\(805\) −111.297 + 14.6871i −0.138258 + 0.0182448i
\(806\) −17.6951 −0.0219542
\(807\) 21.8796 21.8796i 0.0271123 0.0271123i
\(808\) 64.1836 + 64.1836i 0.0794351 + 0.0794351i
\(809\) 974.708i 1.20483i −0.798183 0.602415i \(-0.794205\pi\)
0.798183 0.602415i \(-0.205795\pi\)
\(810\) −347.553 + 453.226i −0.429078 + 0.559538i
\(811\) 347.990 0.429087 0.214543 0.976714i \(-0.431174\pi\)
0.214543 + 0.976714i \(0.431174\pi\)
\(812\) 160.055 160.055i 0.197112 0.197112i
\(813\) −13.1248 13.1248i −0.0161436 0.0161436i
\(814\) 68.3445i 0.0839613i
\(815\) 4.16588 + 3.19457i 0.00511151 + 0.00391972i
\(816\) 9.48733 0.0116266
\(817\) 1110.04 1110.04i 1.35867 1.35867i
\(818\) −10.9416 10.9416i −0.0133761 0.0133761i
\(819\) 361.930i 0.441917i
\(820\) 61.3381 + 464.815i 0.0748026 + 0.566847i
\(821\) −1001.46 −1.21980 −0.609902 0.792477i \(-0.708791\pi\)
−0.609902 + 0.792477i \(0.708791\pi\)
\(822\) 10.8155 10.8155i 0.0131576 0.0131576i
\(823\) 953.159 + 953.159i 1.15815 + 1.15815i 0.984873 + 0.173280i \(0.0554365\pi\)
0.173280 + 0.984873i \(0.444564\pi\)
\(824\) 92.3660i 0.112095i
\(825\) −22.4806 12.9609i −0.0272492 0.0157102i
\(826\) −613.174 −0.742341
\(827\) 633.756 633.756i 0.766332 0.766332i −0.211127 0.977459i \(-0.567713\pi\)
0.977459 + 0.211127i \(0.0677134\pi\)
\(828\) 60.9837 + 60.9837i 0.0736518 + 0.0736518i
\(829\) 187.497i 0.226172i −0.993585 0.113086i \(-0.963926\pi\)
0.993585 0.113086i \(-0.0360736\pi\)
\(830\) 772.460 101.936i 0.930674 0.122814i
\(831\) 30.0996 0.0362210
\(832\) −48.6367 + 48.6367i −0.0584576 + 0.0584576i
\(833\) 494.293 + 494.293i 0.593389 + 0.593389i
\(834\) 18.7287i 0.0224564i
\(835\) −497.612 + 648.909i −0.595942 + 0.777137i
\(836\) −517.964 −0.619574
\(837\) −1.70125 + 1.70125i −0.00203255 + 0.00203255i
\(838\) 47.1621 + 47.1621i 0.0562794 + 0.0562794i
\(839\) 415.818i 0.495611i −0.968810 0.247806i \(-0.920291\pi\)
0.968810 0.247806i \(-0.0797094\pi\)
\(840\) −4.82780 3.70216i −0.00574738 0.00440733i
\(841\) 256.602 0.305116
\(842\) −317.805 + 317.805i −0.377441 + 0.377441i
\(843\) 0.955535 + 0.955535i 0.00113349 + 0.00113349i
\(844\) 761.028i 0.901692i
\(845\) 62.1939 + 471.300i 0.0736023 + 0.557752i
\(846\) 169.407 0.200245
\(847\) −21.8376 + 21.8376i −0.0257823 + 0.0257823i
\(848\) 277.250 + 277.250i 0.326945 + 0.326945i
\(849\) 26.4544i 0.0311594i
\(850\) 236.731 + 881.345i 0.278508 + 1.03688i
\(851\) −20.5179 −0.0241104
\(852\) 3.47592 3.47592i 0.00407971 0.00407971i
\(853\) 482.084 + 482.084i 0.565163 + 0.565163i 0.930769 0.365607i \(-0.119138\pi\)
−0.365607 + 0.930769i \(0.619138\pi\)
\(854\) 750.461i 0.878760i
\(855\) 1021.89 134.852i 1.19520 0.157721i
\(856\) −3.08889 −0.00360851
\(857\) 115.279 115.279i 0.134515 0.134515i −0.636644 0.771158i \(-0.719678\pi\)
0.771158 + 0.636644i \(0.219678\pi\)
\(858\) 8.92430 + 8.92430i 0.0104013 + 0.0104013i
\(859\) 761.975i 0.887048i 0.896262 + 0.443524i \(0.146272\pi\)
−0.896262 + 0.443524i \(0.853728\pi\)
\(860\) −416.655 + 543.338i −0.484482 + 0.631788i
\(861\) 20.1695 0.0234256
\(862\) −526.966 + 526.966i −0.611330 + 0.611330i
\(863\) −622.781 622.781i −0.721647 0.721647i 0.247294 0.968941i \(-0.420459\pi\)
−0.968941 + 0.247294i \(0.920459\pi\)
\(864\) 9.35210i 0.0108242i
\(865\) −761.271 583.775i −0.880082 0.674885i
\(866\) 312.543 0.360904
\(867\) −24.5120 + 24.5120i −0.0282722 + 0.0282722i
\(868\) 9.63525 + 9.63525i 0.0111005 + 0.0111005i
\(869\) 632.455i 0.727796i
\(870\) 2.05497 + 15.5724i 0.00236204 + 0.0178993i
\(871\) −82.0359 −0.0941858
\(872\) 35.6052 35.6052i 0.0408316 0.0408316i
\(873\) −24.1901 24.1901i −0.0277092 0.0277092i
\(874\) 155.500i 0.177917i
\(875\) 223.455 540.866i 0.255377 0.618133i
\(876\) −8.72480 −0.00995982
\(877\) −416.753 + 416.753i −0.475203 + 0.475203i −0.903594 0.428390i \(-0.859081\pi\)
0.428390 + 0.903594i \(0.359081\pi\)
\(878\) 217.027 + 217.027i 0.247183 + 0.247183i
\(879\) 35.1925i 0.0400370i
\(880\) 223.976 29.5564i 0.254518 0.0335868i
\(881\) −964.219 −1.09446 −0.547230 0.836982i \(-0.684318\pi\)
−0.547230 + 0.836982i \(0.684318\pi\)
\(882\) −243.510 + 243.510i −0.276088 + 0.276088i
\(883\) 507.321 + 507.321i 0.574542 + 0.574542i 0.933394 0.358852i \(-0.116832\pi\)
−0.358852 + 0.933394i \(0.616832\pi\)
\(884\) 443.851i 0.502094i
\(885\) 25.8928 33.7654i 0.0292574 0.0381530i
\(886\) 108.835 0.122839
\(887\) −892.012 + 892.012i −1.00565 + 1.00565i −0.00566696 + 0.999984i \(0.501804\pi\)
−0.999984 + 0.00566696i \(0.998196\pi\)
\(888\) −0.786258 0.786258i −0.000885425 0.000885425i
\(889\) 165.502i 0.186166i
\(890\) −457.334 350.703i −0.513858 0.394049i
\(891\) −912.391 −1.02401
\(892\) −121.262 + 121.262i −0.135943 + 0.135943i
\(893\) −215.982 215.982i −0.241861 0.241861i
\(894\) 29.2210i 0.0326856i
\(895\) −207.709 1574.00i −0.232077 1.75866i
\(896\) 52.9670 0.0591149
\(897\) −2.67919 + 2.67919i −0.00298684 + 0.00298684i
\(898\) −318.334 318.334i −0.354492 0.354492i
\(899\) 35.1805i 0.0391329i
\(900\) −434.188 + 116.624i −0.482431 + 0.129582i
\(901\) −2530.14 −2.80814
\(902\) −529.600 + 529.600i −0.587140 + 0.587140i
\(903\) 20.8282 + 20.8282i 0.0230656 + 0.0230656i
\(904\) 201.016i 0.222363i
\(905\) −196.566 + 25.9393i −0.217200 + 0.0286622i
\(906\) 32.2707 0.0356189
\(907\) −632.605 + 632.605i −0.697470 + 0.697470i −0.963864 0.266394i \(-0.914168\pi\)
0.266394 + 0.963864i \(0.414168\pi\)
\(908\) 469.893 + 469.893i 0.517503 + 0.517503i
\(909\) 288.555i 0.317442i
\(910\) −173.200 + 225.862i −0.190330 + 0.248200i
\(911\) 1670.00 1.83315 0.916573 0.399867i \(-0.130944\pi\)
0.916573 + 0.399867i \(0.130944\pi\)
\(912\) 5.95883 5.95883i 0.00653380 0.00653380i
\(913\) 880.125 + 880.125i 0.963992 + 0.963992i
\(914\) 805.972i 0.881807i
\(915\) −41.3254 31.6901i −0.0451644 0.0346340i
\(916\) 677.403 0.739523
\(917\) −641.288 + 641.288i −0.699332 + 0.699332i
\(918\) −42.6729 42.6729i −0.0464847 0.0464847i
\(919\) 259.027i 0.281857i 0.990020 + 0.140929i \(0.0450088\pi\)
−0.990020 + 0.140929i \(0.954991\pi\)
\(920\) 8.87320 + 67.2404i 0.00964479 + 0.0730873i
\(921\) −14.4146 −0.0156511
\(922\) −446.523 + 446.523i −0.484299 + 0.484299i
\(923\) −162.616 162.616i −0.176182 0.176182i
\(924\) 9.71886i 0.0105182i
\(925\) 53.4220 92.6601i 0.0577536 0.100173i
\(926\) −577.903 −0.624085
\(927\) 207.629 207.629i 0.223979 0.223979i
\(928\) −96.6973 96.6973i −0.104200 0.104200i
\(929\) 1646.83i 1.77269i −0.463023 0.886346i \(-0.653235\pi\)
0.463023 0.886346i \(-0.346765\pi\)
\(930\) −0.937453 + 0.123709i −0.00100801 + 0.000133020i
\(931\) 620.914 0.666932
\(932\) −389.990 + 389.990i −0.418444 + 0.418444i
\(933\) −29.8946 29.8946i −0.0320413 0.0320413i
\(934\) 817.056i 0.874792i
\(935\) −887.120 + 1156.85i −0.948792 + 1.23727i
\(936\) 218.660 0.233611
\(937\) 960.988 960.988i 1.02560 1.02560i 0.0259367 0.999664i \(-0.491743\pi\)
0.999664 0.0259367i \(-0.00825685\pi\)
\(938\) 44.6699 + 44.6699i 0.0476225 + 0.0476225i
\(939\) 39.7076i 0.0422871i
\(940\) 105.718 + 81.0693i 0.112466 + 0.0862440i
\(941\) 546.195 0.580441 0.290221 0.956960i \(-0.406271\pi\)
0.290221 + 0.956960i \(0.406271\pi\)
\(942\) −20.0154 + 20.0154i −0.0212477 + 0.0212477i
\(943\) −158.993 158.993i −0.168603 0.168603i
\(944\) 370.449i 0.392425i
\(945\) 5.06298 + 38.3668i 0.00535765 + 0.0405998i
\(946\) −1093.80 −1.15623
\(947\) −432.367 + 432.367i −0.456565 + 0.456565i −0.897526 0.440961i \(-0.854638\pi\)
0.440961 + 0.897526i \(0.354638\pi\)
\(948\) 7.27596 + 7.27596i 0.00767507 + 0.00767507i
\(949\) 408.178i 0.430114i
\(950\) 702.245 + 404.871i 0.739205 + 0.426180i
\(951\) −40.0788 −0.0421439
\(952\) −241.684 + 241.684i −0.253870 + 0.253870i
\(953\) −817.027 817.027i −0.857321 0.857321i 0.133701 0.991022i \(-0.457314\pi\)
−0.991022 + 0.133701i \(0.957314\pi\)
\(954\) 1246.45i 1.30655i
\(955\) −528.684 + 69.7664i −0.553596 + 0.0730538i
\(956\) −394.568 −0.412728
\(957\) −17.7429 + 17.7429i −0.0185401 + 0.0185401i
\(958\) −315.169 315.169i −0.328986 0.328986i
\(959\) 551.038i 0.574597i
\(960\) −2.23666 + 2.91671i −0.00232986 + 0.00303824i
\(961\) −958.882 −0.997796
\(962\) −36.7840 + 36.7840i −0.0382370 + 0.0382370i
\(963\) 6.94348 + 6.94348i 0.00721026 + 0.00721026i
\(964\) 190.499i 0.197613i
\(965\) 791.624 + 607.052i 0.820336 + 0.629069i
\(966\) 2.91773 0.00302042
\(967\) 840.345 840.345i 0.869023 0.869023i −0.123341 0.992364i \(-0.539361\pi\)
0.992364 + 0.123341i \(0.0393610\pi\)
\(968\) 13.1932 + 13.1932i 0.0136293 + 0.0136293i
\(969\) 54.3793i 0.0561190i
\(970\) −3.51969 26.6719i −0.00362855 0.0274968i
\(971\) −967.764 −0.996668 −0.498334 0.866985i \(-0.666055\pi\)
−0.498334 + 0.866985i \(0.666055\pi\)
\(972\) 31.5387 31.5387i 0.0324472 0.0324472i
\(973\) −477.102 477.102i −0.490341 0.490341i
\(974\) 445.088i 0.456969i
\(975\) −5.12363 19.0751i −0.00525500 0.0195642i
\(976\) 453.391 0.464540
\(977\) 22.2028 22.2028i 0.0227255 0.0227255i −0.695653 0.718378i \(-0.744885\pi\)
0.718378 + 0.695653i \(0.244885\pi\)
\(978\) −0.0964792 0.0964792i −9.86495e−5 9.86495e-5i
\(979\) 920.661i 0.940409i
\(980\) −268.493 + 35.4310i −0.273972 + 0.0361540i
\(981\) −160.073 −0.163173
\(982\) 515.585 515.585i 0.525035 0.525035i
\(983\) 1032.01 + 1032.01i 1.04986 + 1.04986i 0.998690 + 0.0511687i \(0.0162946\pi\)
0.0511687 + 0.998690i \(0.483705\pi\)
\(984\) 12.1854i 0.0123835i
\(985\) 545.289 711.083i 0.553593 0.721911i
\(986\) 882.445 0.894974
\(987\) 4.05259 4.05259i 0.00410597 0.00410597i
\(988\) −278.775 278.775i −0.282161 0.282161i
\(989\) 328.372i 0.332024i
\(990\) −569.912 437.033i −0.575668 0.441447i
\(991\) 326.492 0.329457 0.164729 0.986339i \(-0.447325\pi\)
0.164729 + 0.986339i \(0.447325\pi\)
\(992\) 5.82114 5.82114i 0.00586808 0.00586808i
\(993\) 0.809097 + 0.809097i 0.000814800 + 0.000814800i
\(994\) 177.094i 0.178163i
\(995\) −62.9191 476.795i −0.0632353 0.479191i
\(996\) −20.2505 −0.0203318
\(997\) 19.2512 19.2512i 0.0193092 0.0193092i −0.697386 0.716695i \(-0.745654\pi\)
0.716695 + 0.697386i \(0.245654\pi\)
\(998\) 327.060 + 327.060i 0.327715 + 0.327715i
\(999\) 7.07300i 0.00708008i
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 230.3.f.a.93.5 yes 20
5.2 odd 4 inner 230.3.f.a.47.5 20
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
230.3.f.a.47.5 20 5.2 odd 4 inner
230.3.f.a.93.5 yes 20 1.1 even 1 trivial