Properties

Label 169.4.e.h.23.18
Level $169$
Weight $4$
Character 169.23
Analytic conductor $9.971$
Analytic rank $0$
Dimension $36$
CM no
Inner twists $4$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [169,4,Mod(23,169)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(169, base_ring=CyclotomicField(6))
 
chi = DirichletCharacter(H, H._module([5]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("169.23");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 169 = 13^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 169.e (of order \(6\), degree \(2\), not 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: \(9.97132279097\)
Analytic rank: \(0\)
Dimension: \(36\)
Relative dimension: \(18\) over \(\Q(\zeta_{6})\)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{6}]$

Embedding invariants

Embedding label 23.18
Character \(\chi\) \(=\) 169.23
Dual form 169.4.e.h.147.18

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(4.70109 - 2.71418i) q^{2} +(-0.837548 - 1.45068i) q^{3} +(10.7335 - 18.5910i) q^{4} +7.70909i q^{5} +(-7.87478 - 4.54651i) q^{6} +(-13.0120 - 7.51249i) q^{7} -73.1038i q^{8} +(12.0970 - 20.9527i) q^{9} +O(q^{10})\) \(q+(4.70109 - 2.71418i) q^{2} +(-0.837548 - 1.45068i) q^{3} +(10.7335 - 18.5910i) q^{4} +7.70909i q^{5} +(-7.87478 - 4.54651i) q^{6} +(-13.0120 - 7.51249i) q^{7} -73.1038i q^{8} +(12.0970 - 20.9527i) q^{9} +(20.9238 + 36.2412i) q^{10} +(2.17375 - 1.25501i) q^{11} -35.9593 q^{12} -81.5609 q^{14} +(11.1834 - 6.45673i) q^{15} +(-112.549 - 194.940i) q^{16} +(-1.03238 + 1.78814i) q^{17} -131.334i q^{18} +(81.7897 + 47.2213i) q^{19} +(143.320 + 82.7456i) q^{20} +25.1683i q^{21} +(6.81266 - 11.7999i) q^{22} +(17.9370 + 31.0678i) q^{23} +(-106.050 + 61.2279i) q^{24} +65.5699 q^{25} -85.7549 q^{27} +(-279.329 + 161.271i) q^{28} +(70.0990 + 121.415i) q^{29} +(35.0494 - 60.7074i) q^{30} +264.013i q^{31} +(-551.724 - 318.538i) q^{32} +(-3.64124 - 2.10227i) q^{33} +11.2083i q^{34} +(57.9145 - 100.311i) q^{35} +(-259.687 - 449.791i) q^{36} +(-222.398 + 128.402i) q^{37} +512.668 q^{38} +563.564 q^{40} +(341.360 - 197.084i) q^{41} +(68.3111 + 118.318i) q^{42} +(128.333 - 222.280i) q^{43} -53.8828i q^{44} +(161.526 + 93.2571i) q^{45} +(168.647 + 97.3685i) q^{46} +415.204i q^{47} +(-188.530 + 326.543i) q^{48} +(-58.6251 - 101.542i) q^{49} +(308.250 - 177.968i) q^{50} +3.45868 q^{51} -504.917 q^{53} +(-403.142 + 232.754i) q^{54} +(9.67502 + 16.7576i) q^{55} +(-549.191 + 951.227i) q^{56} -158.200i q^{57} +(659.083 + 380.522i) q^{58} +(104.209 + 60.1650i) q^{59} -277.214i q^{60} +(376.415 - 651.969i) q^{61} +(716.577 + 1241.15i) q^{62} +(-314.813 + 181.758i) q^{63} -1657.50 q^{64} -22.8237 q^{66} +(183.557 - 105.977i) q^{67} +(22.1622 + 38.3860i) q^{68} +(30.0462 - 52.0416i) q^{69} -628.760i q^{70} +(355.532 + 205.267i) q^{71} +(-1531.72 - 884.339i) q^{72} -17.4680i q^{73} +(-697.010 + 1207.26i) q^{74} +(-54.9179 - 95.1206i) q^{75} +(1755.78 - 1013.70i) q^{76} -37.7131 q^{77} -174.953 q^{79} +(1502.81 - 867.647i) q^{80} +(-254.796 - 441.319i) q^{81} +(1069.84 - 1853.02i) q^{82} +963.151i q^{83} +(467.903 + 270.144i) q^{84} +(-13.7849 - 7.95873i) q^{85} -1393.28i q^{86} +(117.422 - 203.382i) q^{87} +(-91.7463 - 158.909i) q^{88} +(-413.644 + 238.817i) q^{89} +1012.47 q^{90} +770.109 q^{92} +(382.997 - 221.123i) q^{93} +(1126.94 + 1951.91i) q^{94} +(-364.033 + 630.525i) q^{95} +1067.16i q^{96} +(-906.730 - 523.501i) q^{97} +(-551.204 - 318.238i) q^{98} -60.7278i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 36 q - 2 q^{3} + 74 q^{4} - 132 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 36 q - 2 q^{3} + 74 q^{4} - 132 q^{9} - 294 q^{10} - 156 q^{12} - 588 q^{14} - 538 q^{16} - 110 q^{17} - 680 q^{22} - 408 q^{23} - 1228 q^{25} - 2672 q^{27} - 560 q^{29} + 1042 q^{30} - 40 q^{35} - 1818 q^{36} + 2956 q^{38} + 52 q^{40} + 8 q^{42} - 1066 q^{43} + 264 q^{48} + 806 q^{49} - 1880 q^{51} - 1112 q^{53} + 500 q^{55} + 500 q^{56} + 272 q^{61} + 4070 q^{62} - 1136 q^{64} + 13116 q^{66} + 3072 q^{68} - 4100 q^{69} + 3980 q^{74} + 4786 q^{75} + 2872 q^{77} + 1648 q^{79} + 1670 q^{81} + 5514 q^{82} + 1572 q^{87} - 1272 q^{88} + 5120 q^{90} + 16040 q^{92} + 5062 q^{94} - 3228 q^{95}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/169\mathbb{Z}\right)^\times\).

\(n\) \(2\)
\(\chi(n)\) \(e\left(\frac{5}{6}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 4.70109 2.71418i 1.66209 0.959606i 0.690371 0.723456i \(-0.257447\pi\)
0.971716 0.236151i \(-0.0758859\pi\)
\(3\) −0.837548 1.45068i −0.161186 0.279183i 0.774108 0.633053i \(-0.218199\pi\)
−0.935294 + 0.353871i \(0.884865\pi\)
\(4\) 10.7335 18.5910i 1.34169 2.32387i
\(5\) 7.70909i 0.689522i 0.938690 + 0.344761i \(0.112040\pi\)
−0.938690 + 0.344761i \(0.887960\pi\)
\(6\) −7.87478 4.54651i −0.535811 0.309351i
\(7\) −13.0120 7.51249i −0.702583 0.405636i 0.105726 0.994395i \(-0.466283\pi\)
−0.808309 + 0.588759i \(0.799617\pi\)
\(8\) 73.1038i 3.23076i
\(9\) 12.0970 20.9527i 0.448038 0.776025i
\(10\) 20.9238 + 36.2412i 0.661670 + 1.14605i
\(11\) 2.17375 1.25501i 0.0595827 0.0344001i −0.469913 0.882713i \(-0.655715\pi\)
0.529495 + 0.848313i \(0.322381\pi\)
\(12\) −35.9593 −0.865047
\(13\) 0 0
\(14\) −81.5609 −1.55700
\(15\) 11.1834 6.45673i 0.192503 0.111141i
\(16\) −112.549 194.940i −1.75857 3.04593i
\(17\) −1.03238 + 1.78814i −0.0147288 + 0.0255110i −0.873296 0.487190i \(-0.838022\pi\)
0.858567 + 0.512701i \(0.171355\pi\)
\(18\) 131.334i 1.71976i
\(19\) 81.7897 + 47.2213i 0.987571 + 0.570174i 0.904547 0.426373i \(-0.140209\pi\)
0.0830237 + 0.996548i \(0.473542\pi\)
\(20\) 143.320 + 82.7456i 1.60236 + 0.925124i
\(21\) 25.1683i 0.261532i
\(22\) 6.81266 11.7999i 0.0660211 0.114352i
\(23\) 17.9370 + 31.0678i 0.162614 + 0.281656i 0.935805 0.352517i \(-0.114674\pi\)
−0.773191 + 0.634173i \(0.781341\pi\)
\(24\) −106.050 + 61.2279i −0.901972 + 0.520754i
\(25\) 65.5699 0.524559
\(26\) 0 0
\(27\) −85.7549 −0.611242
\(28\) −279.329 + 161.271i −1.88529 + 1.08848i
\(29\) 70.0990 + 121.415i 0.448864 + 0.777455i 0.998312 0.0580727i \(-0.0184955\pi\)
−0.549449 + 0.835528i \(0.685162\pi\)
\(30\) 35.0494 60.7074i 0.213304 0.369453i
\(31\) 264.013i 1.52961i 0.644259 + 0.764807i \(0.277166\pi\)
−0.644259 + 0.764807i \(0.722834\pi\)
\(32\) −551.724 318.538i −3.04787 1.75969i
\(33\) −3.64124 2.10227i −0.0192078 0.0110896i
\(34\) 11.2083i 0.0565354i
\(35\) 57.9145 100.311i 0.279695 0.484446i
\(36\) −259.687 449.791i −1.20226 2.08237i
\(37\) −222.398 + 128.402i −0.988164 + 0.570517i −0.904725 0.425996i \(-0.859924\pi\)
−0.0834390 + 0.996513i \(0.526590\pi\)
\(38\) 512.668 2.18857
\(39\) 0 0
\(40\) 563.564 2.22768
\(41\) 341.360 197.084i 1.30028 0.750717i 0.319829 0.947475i \(-0.396375\pi\)
0.980452 + 0.196758i \(0.0630414\pi\)
\(42\) 68.3111 + 118.318i 0.250968 + 0.434689i
\(43\) 128.333 222.280i 0.455131 0.788310i −0.543565 0.839367i \(-0.682926\pi\)
0.998696 + 0.0510575i \(0.0162592\pi\)
\(44\) 53.8828i 0.184617i
\(45\) 161.526 + 93.2571i 0.535086 + 0.308932i
\(46\) 168.647 + 97.3685i 0.540558 + 0.312091i
\(47\) 415.204i 1.28859i 0.764777 + 0.644295i \(0.222849\pi\)
−0.764777 + 0.644295i \(0.777151\pi\)
\(48\) −188.530 + 326.543i −0.566914 + 0.981925i
\(49\) −58.6251 101.542i −0.170919 0.296040i
\(50\) 308.250 177.968i 0.871863 0.503370i
\(51\) 3.45868 0.00949631
\(52\) 0 0
\(53\) −504.917 −1.30860 −0.654299 0.756236i \(-0.727036\pi\)
−0.654299 + 0.756236i \(0.727036\pi\)
\(54\) −403.142 + 232.754i −1.01594 + 0.586552i
\(55\) 9.67502 + 16.7576i 0.0237196 + 0.0410836i
\(56\) −549.191 + 951.227i −1.31051 + 2.26988i
\(57\) 158.200i 0.367617i
\(58\) 659.083 + 380.522i 1.49210 + 0.861465i
\(59\) 104.209 + 60.1650i 0.229946 + 0.132760i 0.610547 0.791980i \(-0.290950\pi\)
−0.380601 + 0.924739i \(0.624283\pi\)
\(60\) 277.214i 0.596469i
\(61\) 376.415 651.969i 0.790081 1.36846i −0.135835 0.990732i \(-0.543372\pi\)
0.925916 0.377730i \(-0.123295\pi\)
\(62\) 716.577 + 1241.15i 1.46783 + 2.54235i
\(63\) −314.813 + 181.758i −0.629567 + 0.363481i
\(64\) −1657.50 −3.23730
\(65\) 0 0
\(66\) −22.8237 −0.0425668
\(67\) 183.557 105.977i 0.334702 0.193240i −0.323225 0.946322i \(-0.604767\pi\)
0.657927 + 0.753082i \(0.271434\pi\)
\(68\) 22.1622 + 38.3860i 0.0395229 + 0.0684557i
\(69\) 30.0462 52.0416i 0.0524223 0.0907981i
\(70\) 628.760i 1.07359i
\(71\) 355.532 + 205.267i 0.594281 + 0.343108i 0.766788 0.641900i \(-0.221854\pi\)
−0.172508 + 0.985008i \(0.555187\pi\)
\(72\) −1531.72 884.339i −2.50715 1.44750i
\(73\) 17.4680i 0.0280065i −0.999902 0.0140032i \(-0.995542\pi\)
0.999902 0.0140032i \(-0.00445752\pi\)
\(74\) −697.010 + 1207.26i −1.09494 + 1.89650i
\(75\) −54.9179 95.1206i −0.0845517 0.146448i
\(76\) 1755.78 1013.70i 2.65003 1.52999i
\(77\) −37.7131 −0.0558157
\(78\) 0 0
\(79\) −174.953 −0.249162 −0.124581 0.992209i \(-0.539759\pi\)
−0.124581 + 0.992209i \(0.539759\pi\)
\(80\) 1502.81 867.647i 2.10024 1.21257i
\(81\) −254.796 441.319i −0.349514 0.605376i
\(82\) 1069.84 1853.02i 1.44079 2.49552i
\(83\) 963.151i 1.27373i 0.770976 + 0.636865i \(0.219769\pi\)
−0.770976 + 0.636865i \(0.780231\pi\)
\(84\) 467.903 + 270.144i 0.607767 + 0.350894i
\(85\) −13.7849 7.95873i −0.0175904 0.0101558i
\(86\) 1393.28i 1.74699i
\(87\) 117.422 203.382i 0.144701 0.250630i
\(88\) −91.7463 158.909i −0.111139 0.192498i
\(89\) −413.644 + 238.817i −0.492654 + 0.284434i −0.725675 0.688038i \(-0.758472\pi\)
0.233021 + 0.972472i \(0.425139\pi\)
\(90\) 1012.47 1.18581
\(91\) 0 0
\(92\) 770.109 0.872711
\(93\) 382.997 221.123i 0.427042 0.246553i
\(94\) 1126.94 + 1951.91i 1.23654 + 2.14175i
\(95\) −364.033 + 630.525i −0.393148 + 0.680952i
\(96\) 1067.16i 1.13455i
\(97\) −906.730 523.501i −0.949119 0.547974i −0.0563117 0.998413i \(-0.517934\pi\)
−0.892807 + 0.450439i \(0.851267\pi\)
\(98\) −551.204 318.238i −0.568163 0.328029i
\(99\) 60.7278i 0.0616502i
\(100\) 703.795 1219.01i 0.703795 1.21901i
\(101\) −196.629 340.571i −0.193716 0.335525i 0.752763 0.658292i \(-0.228721\pi\)
−0.946479 + 0.322766i \(0.895387\pi\)
\(102\) 16.2596 9.38746i 0.0157837 0.00911272i
\(103\) −1629.16 −1.55851 −0.779254 0.626708i \(-0.784402\pi\)
−0.779254 + 0.626708i \(0.784402\pi\)
\(104\) 0 0
\(105\) −194.025 −0.180332
\(106\) −2373.66 + 1370.43i −2.17500 + 1.25574i
\(107\) −33.6007 58.1981i −0.0303580 0.0525815i 0.850447 0.526060i \(-0.176331\pi\)
−0.880805 + 0.473479i \(0.842998\pi\)
\(108\) −920.452 + 1594.27i −0.820097 + 1.42045i
\(109\) 330.138i 0.290105i 0.989424 + 0.145053i \(0.0463352\pi\)
−0.989424 + 0.145053i \(0.953665\pi\)
\(110\) 90.9663 + 52.5194i 0.0788482 + 0.0455230i
\(111\) 372.539 + 215.085i 0.318557 + 0.183919i
\(112\) 3382.08i 2.85336i
\(113\) −244.487 + 423.464i −0.203535 + 0.352533i −0.949665 0.313268i \(-0.898576\pi\)
0.746130 + 0.665800i \(0.231910\pi\)
\(114\) −429.384 743.715i −0.352768 0.611011i
\(115\) −239.505 + 138.278i −0.194208 + 0.112126i
\(116\) 3009.63 2.40894
\(117\) 0 0
\(118\) 653.194 0.509588
\(119\) 26.8667 15.5115i 0.0206964 0.0119491i
\(120\) −472.012 817.548i −0.359071 0.621930i
\(121\) −662.350 + 1147.22i −0.497633 + 0.861926i
\(122\) 4086.62i 3.03267i
\(123\) −571.811 330.135i −0.419174 0.242010i
\(124\) 4908.26 + 2833.78i 3.55463 + 2.05227i
\(125\) 1469.12i 1.05122i
\(126\) −986.644 + 1708.92i −0.697597 + 1.20827i
\(127\) 211.426 + 366.201i 0.147725 + 0.255867i 0.930386 0.366581i \(-0.119472\pi\)
−0.782661 + 0.622448i \(0.786138\pi\)
\(128\) −3378.26 + 1950.44i −2.33280 + 1.34684i
\(129\) −429.941 −0.293443
\(130\) 0 0
\(131\) 1743.96 1.16313 0.581567 0.813498i \(-0.302440\pi\)
0.581567 + 0.813498i \(0.302440\pi\)
\(132\) −78.1665 + 45.1295i −0.0515418 + 0.0297577i
\(133\) −709.499 1228.89i −0.462567 0.801189i
\(134\) 575.278 996.412i 0.370869 0.642365i
\(135\) 661.093i 0.421465i
\(136\) 130.720 + 75.4710i 0.0824200 + 0.0475852i
\(137\) −1865.58 1077.09i −1.16341 0.671696i −0.211293 0.977423i \(-0.567767\pi\)
−0.952119 + 0.305726i \(0.901101\pi\)
\(138\) 326.203i 0.201219i
\(139\) −644.835 + 1116.89i −0.393483 + 0.681533i −0.992906 0.118899i \(-0.962063\pi\)
0.599423 + 0.800433i \(0.295397\pi\)
\(140\) −1243.25 2153.37i −0.750528 1.29995i
\(141\) 602.326 347.753i 0.359752 0.207703i
\(142\) 2228.52 1.31700
\(143\) 0 0
\(144\) −5446.01 −3.15163
\(145\) −935.999 + 540.399i −0.536072 + 0.309502i
\(146\) −47.4112 82.1187i −0.0268752 0.0465492i
\(147\) −98.2026 + 170.092i −0.0550994 + 0.0954350i
\(148\) 5512.81i 3.06182i
\(149\) −1621.69 936.283i −0.891638 0.514787i −0.0171599 0.999853i \(-0.505462\pi\)
−0.874478 + 0.485065i \(0.838796\pi\)
\(150\) −516.348 298.114i −0.281065 0.162273i
\(151\) 1558.07i 0.839695i −0.907595 0.419847i \(-0.862084\pi\)
0.907595 0.419847i \(-0.137916\pi\)
\(152\) 3452.06 5979.14i 1.84210 3.19061i
\(153\) 24.9775 + 43.2623i 0.0131981 + 0.0228598i
\(154\) −177.293 + 102.360i −0.0927705 + 0.0535611i
\(155\) −2035.30 −1.05470
\(156\) 0 0
\(157\) 2301.74 1.17006 0.585028 0.811013i \(-0.301084\pi\)
0.585028 + 0.811013i \(0.301084\pi\)
\(158\) −822.472 + 474.854i −0.414129 + 0.239097i
\(159\) 422.892 + 732.471i 0.210928 + 0.365338i
\(160\) 2455.64 4253.29i 1.21335 2.10158i
\(161\) 539.007i 0.263849i
\(162\) −2395.64 1383.12i −1.16185 0.670792i
\(163\) −273.232 157.751i −0.131296 0.0758035i 0.432914 0.901435i \(-0.357486\pi\)
−0.564209 + 0.825632i \(0.690819\pi\)
\(164\) 8461.63i 4.02892i
\(165\) 16.2066 28.0706i 0.00764655 0.0132442i
\(166\) 2614.16 + 4527.86i 1.22228 + 2.11705i
\(167\) 641.899 370.601i 0.297435 0.171724i −0.343855 0.939023i \(-0.611733\pi\)
0.641290 + 0.767299i \(0.278400\pi\)
\(168\) 1839.90 0.844947
\(169\) 0 0
\(170\) −86.4056 −0.0389824
\(171\) 1978.83 1142.48i 0.884939 0.510920i
\(172\) −2754.93 4771.68i −1.22129 2.11533i
\(173\) 754.606 1307.02i 0.331628 0.574397i −0.651203 0.758903i \(-0.725735\pi\)
0.982831 + 0.184507i \(0.0590688\pi\)
\(174\) 1274.82i 0.555425i
\(175\) −853.196 492.593i −0.368546 0.212780i
\(176\) −489.304 282.500i −0.209561 0.120990i
\(177\) 201.564i 0.0855960i
\(178\) −1296.39 + 2245.41i −0.545889 + 0.945507i
\(179\) −1882.69 3260.92i −0.786139 1.36163i −0.928316 0.371792i \(-0.878743\pi\)
0.142177 0.989841i \(-0.454590\pi\)
\(180\) 3467.48 2001.95i 1.43584 0.828982i
\(181\) −1947.48 −0.799753 −0.399876 0.916569i \(-0.630947\pi\)
−0.399876 + 0.916569i \(0.630947\pi\)
\(182\) 0 0
\(183\) −1261.06 −0.509401
\(184\) 2271.18 1311.26i 0.909964 0.525368i
\(185\) −989.861 1714.49i −0.393384 0.681361i
\(186\) 1200.33 2079.04i 0.473187 0.819584i
\(187\) 5.18262i 0.00202669i
\(188\) 7719.05 + 4456.60i 2.99452 + 1.72889i
\(189\) 1115.84 + 644.233i 0.429448 + 0.247942i
\(190\) 3952.21i 1.50907i
\(191\) −1228.68 + 2128.13i −0.465465 + 0.806209i −0.999222 0.0394284i \(-0.987446\pi\)
0.533757 + 0.845638i \(0.320780\pi\)
\(192\) 1388.23 + 2404.49i 0.521808 + 0.903798i
\(193\) 1042.73 602.021i 0.388899 0.224531i −0.292784 0.956179i \(-0.594582\pi\)
0.681683 + 0.731648i \(0.261248\pi\)
\(194\) −5683.50 −2.10336
\(195\) 0 0
\(196\) −2517.01 −0.917278
\(197\) −346.323 + 199.949i −0.125251 + 0.0723137i −0.561317 0.827601i \(-0.689705\pi\)
0.436065 + 0.899915i \(0.356372\pi\)
\(198\) −164.826 285.487i −0.0591599 0.102468i
\(199\) −1881.09 + 3258.14i −0.670085 + 1.16062i 0.307794 + 0.951453i \(0.400409\pi\)
−0.977880 + 0.209169i \(0.932924\pi\)
\(200\) 4793.41i 1.69473i
\(201\) −307.475 177.521i −0.107899 0.0622953i
\(202\) −1848.74 1067.37i −0.643945 0.371782i
\(203\) 2106.47i 0.728302i
\(204\) 37.1238 64.3002i 0.0127411 0.0220682i
\(205\) 1519.34 + 2631.58i 0.517636 + 0.896572i
\(206\) −7658.85 + 4421.84i −2.59038 + 1.49555i
\(207\) 867.939 0.291429
\(208\) 0 0
\(209\) 237.054 0.0784562
\(210\) −912.127 + 526.617i −0.299727 + 0.173048i
\(211\) 1226.14 + 2123.74i 0.400053 + 0.692912i 0.993732 0.111790i \(-0.0356585\pi\)
−0.593679 + 0.804702i \(0.702325\pi\)
\(212\) −5419.53 + 9386.91i −1.75573 + 3.04102i
\(213\) 687.683i 0.221217i
\(214\) −315.920 182.397i −0.100915 0.0582634i
\(215\) 1713.57 + 989.332i 0.543557 + 0.313823i
\(216\) 6269.01i 1.97478i
\(217\) 1983.39 3435.33i 0.620467 1.07468i
\(218\) 896.053 + 1552.01i 0.278387 + 0.482180i
\(219\) −25.3404 + 14.6303i −0.00781893 + 0.00451426i
\(220\) 415.388 0.127297
\(221\) 0 0
\(222\) 2335.12 0.705959
\(223\) −3992.65 + 2305.16i −1.19896 + 0.692219i −0.960323 0.278890i \(-0.910033\pi\)
−0.238635 + 0.971109i \(0.576700\pi\)
\(224\) 4786.03 + 8289.64i 1.42759 + 2.47266i
\(225\) 793.201 1373.86i 0.235022 0.407071i
\(226\) 2654.33i 0.781253i
\(227\) 1375.77 + 794.300i 0.402260 + 0.232245i 0.687458 0.726224i \(-0.258726\pi\)
−0.285199 + 0.958468i \(0.592060\pi\)
\(228\) −2941.10 1698.05i −0.854295 0.493228i
\(229\) 353.354i 0.101966i 0.998700 + 0.0509832i \(0.0162355\pi\)
−0.998700 + 0.0509832i \(0.983764\pi\)
\(230\) −750.623 + 1300.12i −0.215194 + 0.372727i
\(231\) 31.5865 + 54.7095i 0.00899672 + 0.0155828i
\(232\) 8875.89 5124.50i 2.51177 1.45017i
\(233\) 6622.95 1.86216 0.931081 0.364812i \(-0.118867\pi\)
0.931081 + 0.364812i \(0.118867\pi\)
\(234\) 0 0
\(235\) −3200.85 −0.888511
\(236\) 2237.05 1291.56i 0.617033 0.356244i
\(237\) 146.532 + 253.801i 0.0401614 + 0.0695617i
\(238\) 84.2020 145.842i 0.0229328 0.0397208i
\(239\) 1852.86i 0.501471i 0.968056 + 0.250736i \(0.0806724\pi\)
−0.968056 + 0.250736i \(0.919328\pi\)
\(240\) −2517.35 1453.39i −0.677059 0.390900i
\(241\) −1438.26 830.377i −0.384424 0.221947i 0.295317 0.955399i \(-0.404575\pi\)
−0.679741 + 0.733452i \(0.737908\pi\)
\(242\) 7190.94i 1.91013i
\(243\) −1584.50 + 2744.43i −0.418295 + 0.724508i
\(244\) −8080.50 13995.8i −2.12009 3.67210i
\(245\) 782.793 451.946i 0.204126 0.117852i
\(246\) −3584.18 −0.928939
\(247\) 0 0
\(248\) 19300.3 4.94182
\(249\) 1397.22 806.685i 0.355603 0.205307i
\(250\) 3987.45 + 6906.47i 1.00875 + 1.74721i
\(251\) 3280.75 5682.43i 0.825017 1.42897i −0.0768900 0.997040i \(-0.524499\pi\)
0.901907 0.431931i \(-0.142168\pi\)
\(252\) 7803.59i 1.95071i
\(253\) 77.9812 + 45.0224i 0.0193780 + 0.0111879i
\(254\) 1987.87 + 1147.70i 0.491063 + 0.283516i
\(255\) 26.6633i 0.00654791i
\(256\) −3957.68 + 6854.90i −0.966230 + 1.67356i
\(257\) 990.429 + 1715.47i 0.240394 + 0.416375i 0.960827 0.277150i \(-0.0893900\pi\)
−0.720433 + 0.693525i \(0.756057\pi\)
\(258\) −2021.19 + 1166.93i −0.487728 + 0.281590i
\(259\) 3858.47 0.925689
\(260\) 0 0
\(261\) 3391.96 0.804432
\(262\) 8198.53 4733.42i 1.93323 1.11615i
\(263\) 165.643 + 286.902i 0.0388364 + 0.0672667i 0.884790 0.465989i \(-0.154302\pi\)
−0.845954 + 0.533256i \(0.820968\pi\)
\(264\) −153.684 + 266.188i −0.0358280 + 0.0620559i
\(265\) 3892.45i 0.902307i
\(266\) −6670.84 3851.41i −1.53765 0.887764i
\(267\) 692.893 + 400.042i 0.158818 + 0.0916935i
\(268\) 4550.00i 1.03707i
\(269\) 2891.96 5009.02i 0.655487 1.13534i −0.326285 0.945271i \(-0.605797\pi\)
0.981772 0.190065i \(-0.0608698\pi\)
\(270\) −1794.32 3107.86i −0.404441 0.700512i
\(271\) −3712.68 + 2143.52i −0.832211 + 0.480478i −0.854609 0.519272i \(-0.826203\pi\)
0.0223978 + 0.999749i \(0.492870\pi\)
\(272\) 464.772 0.103606
\(273\) 0 0
\(274\) −11693.7 −2.57826
\(275\) 142.532 82.2912i 0.0312547 0.0180449i
\(276\) −645.003 1117.18i −0.140669 0.243646i
\(277\) 17.2524 29.8821i 0.00374223 0.00648173i −0.864148 0.503237i \(-0.832142\pi\)
0.867890 + 0.496756i \(0.165475\pi\)
\(278\) 7000.79i 1.51036i
\(279\) 5531.77 + 3193.77i 1.18702 + 0.685326i
\(280\) −7333.10 4233.77i −1.56513 0.903628i
\(281\) 4215.51i 0.894933i 0.894301 + 0.447466i \(0.147674\pi\)
−0.894301 + 0.447466i \(0.852326\pi\)
\(282\) 1887.73 3269.64i 0.398626 0.690441i
\(283\) 312.943 + 542.032i 0.0657332 + 0.113853i 0.897019 0.441992i \(-0.145728\pi\)
−0.831286 + 0.555845i \(0.812395\pi\)
\(284\) 7632.22 4406.47i 1.59468 0.920689i
\(285\) 1219.58 0.253480
\(286\) 0 0
\(287\) −5922.38 −1.21807
\(288\) −13348.4 + 7706.73i −2.73113 + 1.57682i
\(289\) 2454.37 + 4251.09i 0.499566 + 0.865274i
\(290\) −2933.48 + 5080.93i −0.593999 + 1.02884i
\(291\) 1753.83i 0.353303i
\(292\) −324.747 187.493i −0.0650836 0.0375760i
\(293\) 769.474 + 444.256i 0.153424 + 0.0885792i 0.574746 0.818332i \(-0.305101\pi\)
−0.421323 + 0.906911i \(0.638434\pi\)
\(294\) 1066.16i 0.211495i
\(295\) −463.817 + 803.355i −0.0915407 + 0.158553i
\(296\) 9386.66 + 16258.2i 1.84320 + 3.19252i
\(297\) −186.410 + 107.624i −0.0364195 + 0.0210268i
\(298\) −10165.0 −1.97597
\(299\) 0 0
\(300\) −2357.85 −0.453768
\(301\) −3339.74 + 1928.20i −0.639534 + 0.369235i
\(302\) −4228.88 7324.63i −0.805777 1.39565i
\(303\) −329.372 + 570.489i −0.0624486 + 0.108164i
\(304\) 21258.8i 4.01077i
\(305\) 5026.09 + 2901.82i 0.943584 + 0.544779i
\(306\) 234.843 + 135.587i 0.0438728 + 0.0253300i
\(307\) 4467.87i 0.830601i −0.909684 0.415301i \(-0.863676\pi\)
0.909684 0.415301i \(-0.136324\pi\)
\(308\) −404.794 + 701.124i −0.0748873 + 0.129709i
\(309\) 1364.50 + 2363.39i 0.251210 + 0.435108i
\(310\) −9568.12 + 5524.16i −1.75301 + 1.01210i
\(311\) 2722.79 0.496448 0.248224 0.968703i \(-0.420153\pi\)
0.248224 + 0.968703i \(0.420153\pi\)
\(312\) 0 0
\(313\) −2513.73 −0.453944 −0.226972 0.973901i \(-0.572883\pi\)
−0.226972 + 0.973901i \(0.572883\pi\)
\(314\) 10820.7 6247.32i 1.94473 1.12279i
\(315\) −1401.19 2426.92i −0.250628 0.434101i
\(316\) −1877.86 + 3252.56i −0.334298 + 0.579021i
\(317\) 3069.18i 0.543792i −0.962327 0.271896i \(-0.912349\pi\)
0.962327 0.271896i \(-0.0876507\pi\)
\(318\) 3976.11 + 2295.61i 0.701161 + 0.404816i
\(319\) 304.755 + 175.950i 0.0534890 + 0.0308819i
\(320\) 12777.8i 2.23219i
\(321\) −56.2844 + 97.4874i −0.00978657 + 0.0169508i
\(322\) −1462.96 2533.92i −0.253191 0.438540i
\(323\) −168.876 + 97.5009i −0.0290914 + 0.0167960i
\(324\) −10939.4 −1.87576
\(325\) 0 0
\(326\) −1712.65 −0.290966
\(327\) 478.923 276.506i 0.0809923 0.0467610i
\(328\) −14407.6 24954.7i −2.42539 4.20090i
\(329\) 3119.22 5402.64i 0.522699 0.905341i
\(330\) 175.950i 0.0293507i
\(331\) 8174.52 + 4719.56i 1.35744 + 0.783718i 0.989278 0.146045i \(-0.0466543\pi\)
0.368161 + 0.929762i \(0.379988\pi\)
\(332\) 17905.9 + 10338.0i 2.95999 + 1.70895i
\(333\) 6213.12i 1.02245i
\(334\) 2011.75 3484.46i 0.329575 0.570841i
\(335\) 816.983 + 1415.06i 0.133243 + 0.230784i
\(336\) 4906.30 2832.65i 0.796608 0.459922i
\(337\) 5601.75 0.905480 0.452740 0.891643i \(-0.350447\pi\)
0.452740 + 0.891643i \(0.350447\pi\)
\(338\) 0 0
\(339\) 819.079 0.131228
\(340\) −295.921 + 170.850i −0.0472017 + 0.0272519i
\(341\) 331.340 + 573.897i 0.0526189 + 0.0911386i
\(342\) 6201.76 10741.8i 0.980564 1.69839i
\(343\) 6915.25i 1.08860i
\(344\) −16249.5 9381.64i −2.54684 1.47042i
\(345\) 401.193 + 231.629i 0.0626073 + 0.0361464i
\(346\) 8192.54i 1.27293i
\(347\) −4986.79 + 8637.38i −0.771485 + 1.33625i 0.165265 + 0.986249i \(0.447152\pi\)
−0.936749 + 0.350001i \(0.886181\pi\)
\(348\) −2520.71 4366.00i −0.388288 0.672535i
\(349\) 5488.37 3168.71i 0.841792 0.486009i −0.0160809 0.999871i \(-0.505119\pi\)
0.857873 + 0.513862i \(0.171786\pi\)
\(350\) −5347.94 −0.816741
\(351\) 0 0
\(352\) −1599.08 −0.242134
\(353\) 5101.56 2945.39i 0.769203 0.444100i −0.0633871 0.997989i \(-0.520190\pi\)
0.832590 + 0.553889i \(0.186857\pi\)
\(354\) −547.081 947.572i −0.0821385 0.142268i
\(355\) −1582.42 + 2740.83i −0.236581 + 0.409770i
\(356\) 10253.4i 1.52649i
\(357\) −45.0043 25.9833i −0.00667194 0.00385205i
\(358\) −17701.4 10219.9i −2.61326 1.50877i
\(359\) 7743.25i 1.13837i −0.822211 0.569183i \(-0.807260\pi\)
0.822211 0.569183i \(-0.192740\pi\)
\(360\) 6817.45 11808.2i 0.998086 1.72874i
\(361\) 1030.21 + 1784.37i 0.150198 + 0.260150i
\(362\) −9155.30 + 5285.81i −1.32926 + 0.767448i
\(363\) 2219.00 0.320846
\(364\) 0 0
\(365\) 134.662 0.0193111
\(366\) −5928.37 + 3422.74i −0.846668 + 0.488824i
\(367\) 5657.54 + 9799.14i 0.804690 + 1.39376i 0.916500 + 0.400034i \(0.131002\pi\)
−0.111811 + 0.993730i \(0.535665\pi\)
\(368\) 4037.57 6993.28i 0.571937 0.990624i
\(369\) 9536.54i 1.34540i
\(370\) −9306.86 5373.32i −1.30768 0.754988i
\(371\) 6569.99 + 3793.18i 0.919398 + 0.530815i
\(372\) 9493.71i 1.32319i
\(373\) 5189.68 8988.79i 0.720406 1.24778i −0.240431 0.970666i \(-0.577289\pi\)
0.960837 0.277114i \(-0.0893779\pi\)
\(374\) 14.0665 + 24.3640i 0.00194482 + 0.00336853i
\(375\) 2131.22 1230.46i 0.293482 0.169442i
\(376\) 30353.0 4.16313
\(377\) 0 0
\(378\) 6994.25 0.951707
\(379\) −6087.46 + 3514.60i −0.825044 + 0.476339i −0.852153 0.523293i \(-0.824703\pi\)
0.0271087 + 0.999632i \(0.491370\pi\)
\(380\) 7814.72 + 13535.5i 1.05496 + 1.82725i
\(381\) 354.160 613.422i 0.0476224 0.0824845i
\(382\) 13339.4i 1.78665i
\(383\) −4616.21 2665.17i −0.615868 0.355572i 0.159391 0.987216i \(-0.449047\pi\)
−0.775259 + 0.631644i \(0.782380\pi\)
\(384\) 5658.91 + 3267.17i 0.752031 + 0.434185i
\(385\) 290.734i 0.0384862i
\(386\) 3267.98 5660.32i 0.430922 0.746380i
\(387\) −3104.90 5377.84i −0.407832 0.706385i
\(388\) −19464.8 + 11238.0i −2.54684 + 1.47042i
\(389\) 226.100 0.0294697 0.0147348 0.999891i \(-0.495310\pi\)
0.0147348 + 0.999891i \(0.495310\pi\)
\(390\) 0 0
\(391\) −74.0714 −0.00958044
\(392\) −7423.07 + 4285.71i −0.956433 + 0.552197i
\(393\) −1460.65 2529.92i −0.187481 0.324727i
\(394\) −1085.40 + 1879.96i −0.138785 + 0.240384i
\(395\) 1348.73i 0.171803i
\(396\) −1128.99 651.822i −0.143267 0.0827154i
\(397\) −10984.5 6341.91i −1.38866 0.801742i −0.395493 0.918469i \(-0.629426\pi\)
−0.993164 + 0.116727i \(0.962760\pi\)
\(398\) 20422.5i 2.57207i
\(399\) −1188.48 + 2058.51i −0.149119 + 0.258281i
\(400\) −7379.79 12782.2i −0.922474 1.59777i
\(401\) 8913.86 5146.42i 1.11007 0.640898i 0.171220 0.985233i \(-0.445229\pi\)
0.938847 + 0.344335i \(0.111896\pi\)
\(402\) −1927.29 −0.239116
\(403\) 0 0
\(404\) −8442.07 −1.03963
\(405\) 3402.17 1964.24i 0.417420 0.240998i
\(406\) −5717.33 9902.71i −0.698883 1.21050i
\(407\) −322.292 + 558.226i −0.0392517 + 0.0679859i
\(408\) 252.842i 0.0306803i
\(409\) −9987.52 5766.30i −1.20746 0.697128i −0.245257 0.969458i \(-0.578872\pi\)
−0.962204 + 0.272331i \(0.912206\pi\)
\(410\) 14285.1 + 8247.52i 1.72071 + 0.993454i
\(411\) 3608.47i 0.433073i
\(412\) −17486.7 + 30287.8i −2.09103 + 3.62178i
\(413\) −903.978 1565.74i −0.107704 0.186549i
\(414\) 4080.26 2355.74i 0.484381 0.279658i
\(415\) −7425.02 −0.878264
\(416\) 0 0
\(417\) 2160.32 0.253696
\(418\) 1114.41 643.406i 0.130401 0.0752871i
\(419\) −2086.61 3614.12i −0.243288 0.421387i 0.718361 0.695671i \(-0.244893\pi\)
−0.961649 + 0.274283i \(0.911559\pi\)
\(420\) −2082.56 + 3607.11i −0.241949 + 0.419069i
\(421\) 1949.71i 0.225708i −0.993612 0.112854i \(-0.964001\pi\)
0.993612 0.112854i \(-0.0359993\pi\)
\(422\) 11528.4 + 6655.93i 1.32984 + 0.767786i
\(423\) 8699.63 + 5022.73i 0.999978 + 0.577337i
\(424\) 36911.4i 4.22777i
\(425\) −67.6932 + 117.248i −0.00772612 + 0.0133820i
\(426\) −1866.49 3232.86i −0.212281 0.367682i
\(427\) −9795.82 + 5655.62i −1.11019 + 0.640971i
\(428\) −1442.61 −0.162924
\(429\) 0 0
\(430\) 10740.9 1.20459
\(431\) −1002.49 + 578.786i −0.112037 + 0.0646848i −0.554972 0.831869i \(-0.687271\pi\)
0.442934 + 0.896554i \(0.353938\pi\)
\(432\) 9651.59 + 16717.0i 1.07491 + 1.86180i
\(433\) −5573.38 + 9653.37i −0.618567 + 1.07139i 0.371181 + 0.928561i \(0.378953\pi\)
−0.989747 + 0.142828i \(0.954380\pi\)
\(434\) 21533.1i 2.38162i
\(435\) 1567.89 + 905.221i 0.172815 + 0.0997747i
\(436\) 6137.59 + 3543.54i 0.674168 + 0.389231i
\(437\) 3388.04i 0.370874i
\(438\) −79.4183 + 137.557i −0.00866383 + 0.0150062i
\(439\) 1672.77 + 2897.33i 0.181861 + 0.314993i 0.942514 0.334166i \(-0.108454\pi\)
−0.760653 + 0.649159i \(0.775121\pi\)
\(440\) 1225.05 707.281i 0.132731 0.0766325i
\(441\) −2836.76 −0.306312
\(442\) 0 0
\(443\) 12320.7 1.32139 0.660696 0.750654i \(-0.270261\pi\)
0.660696 + 0.750654i \(0.270261\pi\)
\(444\) 7997.30 4617.24i 0.854808 0.493524i
\(445\) −1841.07 3188.82i −0.196123 0.339696i
\(446\) −12513.2 + 21673.5i −1.32852 + 2.30106i
\(447\) 3136.73i 0.331906i
\(448\) 21567.4 + 12451.9i 2.27447 + 1.31317i
\(449\) −12314.6 7109.83i −1.29435 0.747291i −0.314924 0.949117i \(-0.601979\pi\)
−0.979421 + 0.201826i \(0.935313\pi\)
\(450\) 8611.55i 0.902116i
\(451\) 494.687 856.824i 0.0516495 0.0894596i
\(452\) 5248.41 + 9090.52i 0.546161 + 0.945978i
\(453\) −2260.25 + 1304.96i −0.234428 + 0.135347i
\(454\) 8623.48 0.891454
\(455\) 0 0
\(456\) −11565.1 −1.18768
\(457\) −13238.3 + 7643.16i −1.35506 + 0.782346i −0.988953 0.148226i \(-0.952644\pi\)
−0.366109 + 0.930572i \(0.619310\pi\)
\(458\) 959.067 + 1661.15i 0.0978477 + 0.169477i
\(459\) 88.5318 153.342i 0.00900286 0.0155934i
\(460\) 5936.84i 0.601754i
\(461\) −6150.99 3551.27i −0.621432 0.358784i 0.155995 0.987758i \(-0.450142\pi\)
−0.777426 + 0.628974i \(0.783475\pi\)
\(462\) 296.982 + 171.463i 0.0299067 + 0.0172666i
\(463\) 13129.1i 1.31785i −0.752211 0.658923i \(-0.771012\pi\)
0.752211 0.658923i \(-0.228988\pi\)
\(464\) 15779.1 27330.1i 1.57872 2.73442i
\(465\) 1704.66 + 2952.56i 0.170004 + 0.294455i
\(466\) 31135.1 17975.9i 3.09508 1.78694i
\(467\) −12669.7 −1.25542 −0.627712 0.778445i \(-0.716009\pi\)
−0.627712 + 0.778445i \(0.716009\pi\)
\(468\) 0 0
\(469\) −3184.59 −0.313541
\(470\) −15047.5 + 8687.66i −1.47678 + 0.852621i
\(471\) −1927.82 3339.07i −0.188597 0.326659i
\(472\) 4398.29 7618.06i 0.428915 0.742902i
\(473\) 644.240i 0.0626262i
\(474\) 1377.72 + 795.426i 0.133504 + 0.0770784i
\(475\) 5362.94 + 3096.30i 0.518039 + 0.299090i
\(476\) 665.972i 0.0641277i
\(477\) −6108.00 + 10579.4i −0.586302 + 1.01550i
\(478\) 5028.99 + 8710.47i 0.481215 + 0.833489i
\(479\) 136.847 79.0087i 0.0130537 0.00753654i −0.493459 0.869769i \(-0.664268\pi\)
0.506513 + 0.862233i \(0.330934\pi\)
\(480\) −8226.86 −0.782298
\(481\) 0 0
\(482\) −9015.16 −0.851928
\(483\) −781.924 + 451.444i −0.0736620 + 0.0425288i
\(484\) 14218.7 + 24627.5i 1.33534 + 2.31287i
\(485\) 4035.72 6990.07i 0.377840 0.654438i
\(486\) 17202.4i 1.60559i
\(487\) −11091.6 6403.71i −1.03205 0.595852i −0.114476 0.993426i \(-0.536519\pi\)
−0.917570 + 0.397574i \(0.869852\pi\)
\(488\) −47661.4 27517.3i −4.42117 2.55256i
\(489\) 528.494i 0.0488739i
\(490\) 2453.32 4249.28i 0.226183 0.391761i
\(491\) −7117.26 12327.5i −0.654170 1.13306i −0.982101 0.188354i \(-0.939685\pi\)
0.327931 0.944702i \(-0.393649\pi\)
\(492\) −12275.1 + 7087.02i −1.12480 + 0.649406i
\(493\) −289.476 −0.0264449
\(494\) 0 0
\(495\) 468.156 0.0425092
\(496\) 51466.5 29714.2i 4.65910 2.68994i
\(497\) −3084.13 5341.87i −0.278354 0.482124i
\(498\) 4378.97 7584.60i 0.394029 0.682478i
\(499\) 379.793i 0.0340719i −0.999855 0.0170360i \(-0.994577\pi\)
0.999855 0.0170360i \(-0.00542298\pi\)
\(500\) 27312.4 + 15768.8i 2.44290 + 1.41041i
\(501\) −1075.24 620.792i −0.0958849 0.0553591i
\(502\) 35618.2i 3.16677i
\(503\) −6542.73 + 11332.3i −0.579972 + 1.00454i 0.415510 + 0.909589i \(0.363603\pi\)
−0.995482 + 0.0949520i \(0.969730\pi\)
\(504\) 13287.2 + 23014.0i 1.17432 + 2.03398i
\(505\) 2625.49 1515.83i 0.231352 0.133571i
\(506\) 488.795 0.0429439
\(507\) 0 0
\(508\) 9077.40 0.792804
\(509\) 13289.3 7672.55i 1.15724 0.668134i 0.206600 0.978425i \(-0.433760\pi\)
0.950641 + 0.310292i \(0.100427\pi\)
\(510\) 72.3688 + 125.346i 0.00628342 + 0.0108832i
\(511\) −131.228 + 227.294i −0.0113604 + 0.0196769i
\(512\) 11760.4i 1.01512i
\(513\) −7013.87 4049.46i −0.603645 0.348515i
\(514\) 9312.20 + 5376.40i 0.799112 + 0.461367i
\(515\) 12559.4i 1.07463i
\(516\) −4614.77 + 7993.02i −0.393709 + 0.681925i
\(517\) 521.087 + 902.549i 0.0443276 + 0.0767777i
\(518\) 18139.0 10472.6i 1.53858 0.888297i
\(519\) −2528.08 −0.213815
\(520\) 0 0
\(521\) 19946.6 1.67731 0.838653 0.544666i \(-0.183343\pi\)
0.838653 + 0.544666i \(0.183343\pi\)
\(522\) 15945.9 9206.37i 1.33704 0.771938i
\(523\) 416.467 + 721.343i 0.0348200 + 0.0603100i 0.882910 0.469542i \(-0.155581\pi\)
−0.848090 + 0.529852i \(0.822248\pi\)
\(524\) 18718.8 32422.0i 1.56057 2.70298i
\(525\) 1650.28i 0.137189i
\(526\) 1557.41 + 899.169i 0.129099 + 0.0745354i
\(527\) −472.091 272.562i −0.0390220 0.0225294i
\(528\) 946.429i 0.0780076i
\(529\) 5440.03 9422.40i 0.447113 0.774423i
\(530\) −10564.8 18298.8i −0.865860 1.49971i
\(531\) 2521.23 1455.64i 0.206049 0.118963i
\(532\) −30461.7 −2.48248
\(533\) 0 0
\(534\) 4343.14 0.351959
\(535\) 448.655 259.031i 0.0362561 0.0209325i
\(536\) −7747.29 13418.7i −0.624313 1.08134i
\(537\) −3153.69 + 5462.35i −0.253430 + 0.438953i
\(538\) 31397.2i 2.51604i
\(539\) −254.872 147.151i −0.0203676 0.0117592i
\(540\) −12290.4 7095.85i −0.979432 0.565475i
\(541\) 9717.26i 0.772232i 0.922450 + 0.386116i \(0.126184\pi\)
−0.922450 + 0.386116i \(0.873816\pi\)
\(542\) −11635.8 + 20153.7i −0.922139 + 1.59719i
\(543\) 1631.11 + 2825.17i 0.128909 + 0.223277i
\(544\) 1139.18 657.706i 0.0897830 0.0518362i
\(545\) −2545.06 −0.200034
\(546\) 0 0
\(547\) −17069.7 −1.33427 −0.667137 0.744935i \(-0.732481\pi\)
−0.667137 + 0.744935i \(0.732481\pi\)
\(548\) −40048.5 + 23122.0i −3.12188 + 1.80242i
\(549\) −9107.00 15773.8i −0.707973 1.22625i
\(550\) 446.706 773.717i 0.0346320 0.0599843i
\(551\) 13240.7i 1.02372i
\(552\) −3804.44 2196.49i −0.293347 0.169364i
\(553\) 2276.49 + 1314.33i 0.175057 + 0.101069i
\(554\) 187.305i 0.0143643i
\(555\) −1658.11 + 2871.93i −0.126816 + 0.219652i
\(556\) 13842.7 + 23976.2i 1.05587 + 1.82881i
\(557\) −7047.15 + 4068.67i −0.536081 + 0.309507i −0.743489 0.668748i \(-0.766831\pi\)
0.207408 + 0.978255i \(0.433497\pi\)
\(558\) 34673.8 2.63057
\(559\) 0 0
\(560\) −26072.7 −1.96745
\(561\) 7.51829 4.34069i 0.000565816 0.000326674i
\(562\) 11441.6 + 19817.5i 0.858783 + 1.48746i
\(563\) −2484.78 + 4303.76i −0.186005 + 0.322170i −0.943915 0.330189i \(-0.892887\pi\)
0.757910 + 0.652360i \(0.226221\pi\)
\(564\) 14930.5i 1.11469i
\(565\) −3264.53 1884.77i −0.243079 0.140342i
\(566\) 2942.34 + 1698.76i 0.218509 + 0.126156i
\(567\) 7656.60i 0.567103i
\(568\) 15005.8 25990.8i 1.10850 1.91998i
\(569\) −222.421 385.245i −0.0163873 0.0283836i 0.857715 0.514125i \(-0.171883\pi\)
−0.874103 + 0.485741i \(0.838550\pi\)
\(570\) 5733.37 3310.16i 0.421306 0.243241i
\(571\) −22724.7 −1.66550 −0.832750 0.553650i \(-0.813235\pi\)
−0.832750 + 0.553650i \(0.813235\pi\)
\(572\) 0 0
\(573\) 4116.30 0.300106
\(574\) −27841.6 + 16074.4i −2.02454 + 1.16887i
\(575\) 1176.13 + 2037.11i 0.0853008 + 0.147745i
\(576\) −20050.8 + 34729.0i −1.45043 + 2.51223i
\(577\) 3282.72i 0.236848i 0.992963 + 0.118424i \(0.0377843\pi\)
−0.992963 + 0.118424i \(0.962216\pi\)
\(578\) 23076.4 + 13323.2i 1.66064 + 0.958774i
\(579\) −1746.67 1008.44i −0.125370 0.0723825i
\(580\) 23201.5i 1.66102i
\(581\) 7235.66 12532.5i 0.516671 0.894900i
\(582\) 4760.20 + 8244.91i 0.339032 + 0.587221i
\(583\) −1097.56 + 633.678i −0.0779698 + 0.0450159i
\(584\) −1276.98 −0.0904823
\(585\) 0 0
\(586\) 4823.16 0.340005
\(587\) 9315.72 5378.43i 0.655027 0.378180i −0.135353 0.990798i \(-0.543217\pi\)
0.790380 + 0.612617i \(0.209883\pi\)
\(588\) 2108.12 + 3651.37i 0.147853 + 0.256088i
\(589\) −12467.0 + 21593.5i −0.872147 + 1.51060i
\(590\) 5035.53i 0.351372i
\(591\) 580.123 + 334.934i 0.0403775 + 0.0233119i
\(592\) 50061.2 + 28902.9i 3.47551 + 2.00659i
\(593\) 9838.16i 0.681290i 0.940192 + 0.340645i \(0.110645\pi\)
−0.940192 + 0.340645i \(0.889355\pi\)
\(594\) −584.219 + 1011.90i −0.0403549 + 0.0698967i
\(595\) 119.580 + 207.118i 0.00823914 + 0.0142706i
\(596\) −34812.9 + 20099.2i −2.39260 + 1.38137i
\(597\) 6302.01 0.432034
\(598\) 0 0
\(599\) 439.112 0.0299527 0.0149763 0.999888i \(-0.495233\pi\)
0.0149763 + 0.999888i \(0.495233\pi\)
\(600\) −6953.68 + 4014.71i −0.473138 + 0.273166i
\(601\) −958.258 1659.75i −0.0650386 0.112650i 0.831673 0.555266i \(-0.187384\pi\)
−0.896711 + 0.442616i \(0.854050\pi\)
\(602\) −10467.0 + 18129.3i −0.708641 + 1.22740i
\(603\) 5128.01i 0.346316i
\(604\) −28966.1 16723.6i −1.95135 1.12661i
\(605\) −8844.05 5106.12i −0.594317 0.343129i
\(606\) 3575.89i 0.239704i
\(607\) 2333.50 4041.73i 0.156036 0.270262i −0.777400 0.629007i \(-0.783462\pi\)
0.933436 + 0.358745i \(0.116795\pi\)
\(608\) −30083.6 52106.3i −2.00666 3.47564i
\(609\) −3055.80 + 1764.27i −0.203329 + 0.117392i
\(610\) 31504.2 2.09109
\(611\) 0 0
\(612\) 1072.39 0.0708311
\(613\) 5750.98 3320.33i 0.378923 0.218771i −0.298427 0.954433i \(-0.596462\pi\)
0.677350 + 0.735661i \(0.263128\pi\)
\(614\) −12126.6 21003.9i −0.797050 1.38053i
\(615\) 2545.04 4408.14i 0.166872 0.289030i
\(616\) 2756.97i 0.180327i
\(617\) 3181.17 + 1836.65i 0.207568 + 0.119839i 0.600180 0.799865i \(-0.295095\pi\)
−0.392613 + 0.919704i \(0.628429\pi\)
\(618\) 12829.3 + 7407.01i 0.835066 + 0.482125i
\(619\) 15843.8i 1.02878i 0.857557 + 0.514390i \(0.171982\pi\)
−0.857557 + 0.514390i \(0.828018\pi\)
\(620\) −21845.9 + 37838.2i −1.41508 + 2.45100i
\(621\) −1538.19 2664.22i −0.0993967 0.172160i
\(622\) 12800.1 7390.14i 0.825140 0.476395i
\(623\) 7176.45 0.461506
\(624\) 0 0
\(625\) −3129.35 −0.200278
\(626\) −11817.3 + 6822.71i −0.754494 + 0.435608i
\(627\) −198.544 343.888i −0.0126461 0.0219036i
\(628\) 24705.7 42791.6i 1.56985 2.71906i
\(629\) 530.239i 0.0336121i
\(630\) −13174.2 7606.13i −0.833132 0.481009i
\(631\) 10257.4 + 5922.12i 0.647133 + 0.373623i 0.787357 0.616497i \(-0.211449\pi\)
−0.140224 + 0.990120i \(0.544782\pi\)
\(632\) 12789.8i 0.804983i
\(633\) 2053.91 3557.47i 0.128966 0.223375i
\(634\) −8330.29 14428.5i −0.521827 0.903830i
\(635\) −2823.08 + 1629.91i −0.176426 + 0.101860i
\(636\) 18156.5 1.13200
\(637\) 0 0
\(638\) 1910.24 0.118538
\(639\) 8601.77 4966.24i 0.532521 0.307451i
\(640\) −15036.1 26043.3i −0.928679 1.60852i
\(641\) 13766.8 23844.8i 0.848294 1.46929i −0.0344363 0.999407i \(-0.510964\pi\)
0.882730 0.469881i \(-0.155703\pi\)
\(642\) 611.063i 0.0375650i
\(643\) 18818.7 + 10865.0i 1.15418 + 0.666365i 0.949902 0.312548i \(-0.101183\pi\)
0.204276 + 0.978913i \(0.434516\pi\)
\(644\) −10020.7 5785.44i −0.613152 0.354003i
\(645\) 3314.45i 0.202336i
\(646\) −529.269 + 916.721i −0.0322350 + 0.0558327i
\(647\) −9121.79 15799.4i −0.554273 0.960029i −0.997960 0.0638468i \(-0.979663\pi\)
0.443687 0.896182i \(-0.353670\pi\)
\(648\) −32262.1 + 18626.5i −1.95583 + 1.12920i
\(649\) 302.032 0.0182678
\(650\) 0 0
\(651\) −6644.74 −0.400043
\(652\) −5865.48 + 3386.43i −0.352316 + 0.203410i
\(653\) 11839.1 + 20506.0i 0.709496 + 1.22888i 0.965044 + 0.262087i \(0.0844106\pi\)
−0.255549 + 0.966796i \(0.582256\pi\)
\(654\) 1500.97 2599.76i 0.0897442 0.155442i
\(655\) 13444.4i 0.802007i
\(656\) −76839.2 44363.1i −4.57327 2.64038i
\(657\) −366.001 211.311i −0.0217337 0.0125480i
\(658\) 33864.4i 2.00634i
\(659\) 3808.28 6596.13i 0.225113 0.389907i −0.731240 0.682120i \(-0.761058\pi\)
0.956353 + 0.292213i \(0.0943915\pi\)
\(660\) −347.907 602.593i −0.0205186 0.0355392i
\(661\) −6571.94 + 3794.31i −0.386716 + 0.223270i −0.680736 0.732529i \(-0.738340\pi\)
0.294021 + 0.955799i \(0.405007\pi\)
\(662\) 51238.9 3.00824
\(663\) 0 0
\(664\) 70410.0 4.11511
\(665\) 9473.61 5469.59i 0.552438 0.318950i
\(666\) 16863.5 + 29208.4i 0.981152 + 1.69941i
\(667\) −2514.73 + 4355.65i −0.145983 + 0.252850i
\(668\) 15911.4i 0.921602i
\(669\) 6688.07 + 3861.36i 0.386511 + 0.223152i
\(670\) 7681.43 + 4434.87i 0.442925 + 0.255723i
\(671\) 1889.62i 0.108716i
\(672\) 8017.05 13885.9i 0.460215 0.797116i
\(673\) 6994.55 + 12114.9i 0.400624 + 0.693901i 0.993801 0.111171i \(-0.0354600\pi\)
−0.593177 + 0.805072i \(0.702127\pi\)
\(674\) 26334.3 15204.1i 1.50499 0.868904i
\(675\) −5622.94 −0.320633
\(676\) 0 0
\(677\) −16112.1 −0.914678 −0.457339 0.889292i \(-0.651197\pi\)
−0.457339 + 0.889292i \(0.651197\pi\)
\(678\) 3850.57 2223.13i 0.218112 0.125927i
\(679\) 7865.59 + 13623.6i 0.444556 + 0.769994i
\(680\) −581.813 + 1007.73i −0.0328110 + 0.0568304i
\(681\) 2661.06i 0.149738i
\(682\) 3115.32 + 1798.63i 0.174914 + 0.100987i
\(683\) −8073.17 4661.05i −0.452286 0.261127i 0.256509 0.966542i \(-0.417428\pi\)
−0.708795 + 0.705414i \(0.750761\pi\)
\(684\) 49051.1i 2.74198i
\(685\) 8303.42 14382.0i 0.463150 0.802199i
\(686\) 18769.2 + 32509.2i 1.04462 + 1.80934i
\(687\) 512.603 295.951i 0.0284673 0.0164356i
\(688\) −57774.8 −3.20152
\(689\) 0 0
\(690\) 2514.73 0.138745
\(691\) −23995.3 + 13853.7i −1.32102 + 0.762689i −0.983891 0.178770i \(-0.942788\pi\)
−0.337126 + 0.941460i \(0.609455\pi\)
\(692\) −16199.2 28057.8i −0.889884 1.54132i
\(693\) −456.217 + 790.190i −0.0250076 + 0.0433144i
\(694\) 54140.2i 2.96129i
\(695\) −8610.19 4971.09i −0.469932 0.271316i
\(696\) −14868.0 8584.03i −0.809725 0.467495i
\(697\) 813.865i 0.0442286i
\(698\) 17200.9 29792.8i 0.932755 1.61558i
\(699\) −5547.04 9607.75i −0.300155 0.519883i
\(700\) −18315.6 + 10574.5i −0.988949 + 0.570970i
\(701\) −7657.78 −0.412597 −0.206298 0.978489i \(-0.566142\pi\)
−0.206298 + 0.978489i \(0.566142\pi\)
\(702\) 0 0
\(703\) −24253.2 −1.30118
\(704\) −3602.98 + 2080.18i −0.192887 + 0.111363i
\(705\) 2680.86 + 4643.39i 0.143216 + 0.248057i
\(706\) 15988.6 27693.1i 0.852322 1.47626i
\(707\) 5908.68i 0.314312i
\(708\) −3747.28 2163.49i −0.198914 0.114843i
\(709\) 1961.07 + 1132.22i 0.103878 + 0.0599740i 0.551039 0.834480i \(-0.314232\pi\)
−0.447161 + 0.894453i \(0.647565\pi\)
\(710\) 17179.9i 0.908098i
\(711\) −2116.42 + 3665.74i −0.111634 + 0.193356i
\(712\) 17458.5 + 30238.9i 0.918937 + 1.59165i
\(713\) −8202.30 + 4735.60i −0.430825 + 0.248737i
\(714\) −282.093 −0.0147858
\(715\) 0 0
\(716\) −80831.6 −4.21902
\(717\) 2687.90 1551.86i 0.140002 0.0808302i
\(718\) −21016.6 36401.7i −1.09238 1.89206i
\(719\) −3608.48 + 6250.08i −0.187168 + 0.324184i −0.944305 0.329072i \(-0.893264\pi\)
0.757137 + 0.653256i \(0.226598\pi\)
\(720\) 41983.8i 2.17312i
\(721\) 21198.7 + 12239.1i 1.09498 + 0.632187i
\(722\) 9686.19 + 5592.32i 0.499283 + 0.288261i
\(723\) 2781.92i 0.143099i
\(724\) −20903.3 + 36205.6i −1.07302 + 1.85852i
\(725\) 4596.38 + 7961.17i 0.235456 + 0.407821i
\(726\) 10431.7 6022.76i 0.533275 0.307886i
\(727\) 14576.3 0.743612 0.371806 0.928310i \(-0.378739\pi\)
0.371806 + 0.928310i \(0.378739\pi\)
\(728\) 0 0
\(729\) −8450.60 −0.429335
\(730\) 633.060 365.498i 0.0320967 0.0185311i
\(731\) 264.978 + 458.955i 0.0134070 + 0.0232217i
\(732\) −13535.6 + 23444.4i −0.683457 + 1.18378i
\(733\) 4019.83i 0.202559i 0.994858 + 0.101279i \(0.0322936\pi\)
−0.994858 + 0.101279i \(0.967706\pi\)
\(734\) 53193.2 + 30711.1i 2.67493 + 1.54437i
\(735\) −1311.25 757.053i −0.0658045 0.0379923i
\(736\) 22854.5i 1.14460i
\(737\) 266.004 460.733i 0.0132950 0.0230276i
\(738\) −25883.9 44832.2i −1.29105 2.23617i
\(739\) −23537.1 + 13589.2i −1.17162 + 0.676436i −0.954061 0.299611i \(-0.903143\pi\)
−0.217559 + 0.976047i \(0.569810\pi\)
\(740\) −42498.7 −2.11120
\(741\) 0 0
\(742\) 41181.5 2.03749
\(743\) 31054.1 17929.1i 1.53333 0.885269i 0.534125 0.845405i \(-0.320641\pi\)
0.999205 0.0398633i \(-0.0126922\pi\)
\(744\) −16164.9 27998.5i −0.796553 1.37967i
\(745\) 7217.89 12501.8i 0.354957 0.614804i
\(746\) 56342.8i 2.76523i
\(747\) 20180.6 + 11651.3i 0.988445 + 0.570679i
\(748\) 96.3500 + 55.6277i 0.00470976 + 0.00271918i
\(749\) 1009.70i 0.0492572i
\(750\) 6679.37 11569.0i 0.325195 0.563254i
\(751\) 16784.6 + 29071.7i 0.815549 + 1.41257i 0.908933 + 0.416943i \(0.136898\pi\)
−0.0933834 + 0.995630i \(0.529768\pi\)
\(752\) 80939.8 46730.6i 3.92496 2.26608i
\(753\) −10991.1 −0.531925
\(754\) 0 0
\(755\) 12011.3 0.578988
\(756\) 23953.9 13829.8i 1.15237 0.665322i
\(757\) −10675.9 18491.2i −0.512578 0.887812i −0.999894 0.0145856i \(-0.995357\pi\)
0.487315 0.873226i \(-0.337976\pi\)
\(758\) −19078.5 + 33044.9i −0.914197 + 1.58344i
\(759\) 150.834i 0.00721333i
\(760\) 46093.7 + 26612.2i 2.19999 + 1.27017i
\(761\) 33574.1 + 19384.0i 1.59929 + 0.923350i 0.991624 + 0.129156i \(0.0412268\pi\)
0.607665 + 0.794194i \(0.292107\pi\)
\(762\) 3845.01i 0.182795i
\(763\) 2480.16 4295.76i 0.117677 0.203823i
\(764\) 26376.0 + 45684.6i 1.24902 + 2.16336i
\(765\) −333.513 + 192.554i −0.0157623 + 0.00910039i
\(766\) −28935.0 −1.36484
\(767\) 0 0
\(768\) 13259.0 0.622972
\(769\) −952.253 + 549.784i −0.0446543 + 0.0257812i −0.522161 0.852847i \(-0.674874\pi\)
0.477507 + 0.878628i \(0.341541\pi\)
\(770\) −789.103 1366.77i −0.0369316 0.0639673i
\(771\) 1659.06 2873.58i 0.0774964 0.134228i
\(772\) 25847.2i 1.20500i
\(773\) −14332.0 8274.61i −0.666866 0.385015i 0.128022 0.991771i \(-0.459137\pi\)
−0.794888 + 0.606756i \(0.792471\pi\)
\(774\) −29192.8 16854.5i −1.35570 0.782716i
\(775\) 17311.3i 0.802373i
\(776\) −38269.9 + 66285.4i −1.77037 + 3.06638i
\(777\) −3231.65 5597.38i −0.149208 0.258436i
\(778\) 1062.91 613.674i 0.0489812 0.0282793i
\(779\) 37226.3 1.71216
\(780\) 0 0
\(781\) 1030.45 0.0472118
\(782\) −348.217 + 201.043i −0.0159235 + 0.00919346i
\(783\) −6011.33 10411.9i −0.274365 0.475213i
\(784\) −13196.3 + 22856.7i −0.601145 + 1.04121i
\(785\) 17744.3i 0.806779i
\(786\) −13733.3 7928.93i −0.623220 0.359816i
\(787\) −34239.5 19768.2i −1.55083 0.895374i −0.998074 0.0620340i \(-0.980241\pi\)
−0.552760 0.833340i \(-0.686425\pi\)
\(788\) 8584.64i 0.388090i
\(789\) 277.468 480.588i 0.0125198 0.0216849i
\(790\) −3660.70 6340.51i −0.164863 0.285551i
\(791\) 6362.54 3673.42i 0.286000 0.165122i
\(792\) −4439.43 −0.199177
\(793\) 0 0
\(794\) −68852.3 −3.07743
\(795\) −5646.69 + 3260.12i −0.251909 + 0.145439i
\(796\) 40381.4 + 69942.7i 1.79809 + 3.11439i
\(797\) 3955.06 6850.37i 0.175779 0.304458i −0.764652 0.644444i \(-0.777089\pi\)
0.940430 + 0.339986i \(0.110422\pi\)
\(798\) 12903.0i 0.572381i
\(799\) −742.442 428.649i −0.0328732 0.0189794i
\(800\) −36176.5 20886.5i −1.59879 0.923062i
\(801\) 11555.9i 0.509748i
\(802\) 27936.6 48387.6i 1.23002 2.13046i
\(803\) −21.9226 37.9710i −0.000963426 0.00166870i
\(804\) −6600.58 + 3810.85i −0.289533 + 0.167162i
\(805\) 4155.25 0.181930
\(806\) 0 0
\(807\) −9688.62 −0.422621
\(808\) −24897.0 + 14374.3i −1.08400 + 0.625849i
\(809\) 2861.50 + 4956.27i 0.124357 + 0.215393i 0.921482 0.388422i \(-0.126980\pi\)
−0.797124 + 0.603815i \(0.793646\pi\)
\(810\) 10662.6 18468.2i 0.462526 0.801119i
\(811\) 7697.61i 0.333292i −0.986017 0.166646i \(-0.946706\pi\)
0.986017 0.166646i \(-0.0532937\pi\)
\(812\) −39161.4 22609.8i −1.69248 0.977154i
\(813\) 6219.10 + 3590.60i 0.268282 + 0.154893i
\(814\) 3499.03i 0.150665i
\(815\) 1216.11 2106.37i 0.0522682 0.0905312i
\(816\) −389.269 674.234i −0.0166999 0.0289251i
\(817\) 20992.7 12120.1i 0.898948 0.519008i
\(818\) −62603.0 −2.67587
\(819\) 0 0
\(820\) 65231.5 2.77803
\(821\) −16482.5 + 9516.19i −0.700662 + 0.404528i −0.807594 0.589739i \(-0.799231\pi\)
0.106932 + 0.994266i \(0.465897\pi\)
\(822\) 9794.04 + 16963.8i 0.415579 + 0.719805i
\(823\) 651.994 1129.29i 0.0276149 0.0478305i −0.851888 0.523725i \(-0.824542\pi\)
0.879503 + 0.475894i \(0.157875\pi\)
\(824\) 119098.i 5.03517i
\(825\) −238.756 137.846i −0.0100756 0.00581717i
\(826\) −8499.36 4907.11i −0.358027 0.206707i
\(827\) 26093.6i 1.09717i −0.836093 0.548587i \(-0.815166\pi\)
0.836093 0.548587i \(-0.184834\pi\)
\(828\) 9316.03 16135.8i 0.391008 0.677245i
\(829\) −13739.8 23798.0i −0.575635 0.997030i −0.995972 0.0896616i \(-0.971421\pi\)
0.420337 0.907368i \(-0.361912\pi\)
\(830\) −34905.7 + 20152.8i −1.45975 + 0.842788i
\(831\) −57.7989 −0.00241278
\(832\) 0 0
\(833\) 242.094 0.0100697
\(834\) 10155.9 5863.49i 0.421665 0.243449i
\(835\) 2857.00 + 4948.46i 0.118408 + 0.205088i
\(836\) 2544.42 4407.06i 0.105264 0.182322i
\(837\) 22640.4i 0.934965i
\(838\) −19618.7 11326.9i −0.808732 0.466921i
\(839\) 8642.58 + 4989.79i 0.355632 + 0.205324i 0.667163 0.744912i \(-0.267509\pi\)
−0.311531 + 0.950236i \(0.600842\pi\)
\(840\) 14183.9i 0.582609i
\(841\) 2366.77 4099.37i 0.0970426 0.168083i
\(842\) −5291.87 9165.78i −0.216591 0.375147i
\(843\) 6115.33 3530.69i 0.249850 0.144251i
\(844\) 52643.3 2.14699
\(845\) 0 0
\(846\) 54530.4 2.21607
\(847\) 17237.0 9951.79i 0.699257 0.403716i
\(848\) 56827.7 + 98428.4i 2.30126 + 3.98590i
\(849\) 524.209 907.956i 0.0211906 0.0367032i
\(850\) 734.925i 0.0296561i
\(851\) −7978.33 4606.29i −0.321379 0.185548i
\(852\) −12784.7 7381.25i −0.514081 0.296805i
\(853\) 21573.0i 0.865940i −0.901408 0.432970i \(-0.857466\pi\)
0.901408 0.432970i \(-0.142534\pi\)
\(854\) −30700.7 + 53175.2i −1.23016 + 2.13070i
\(855\) 8807.45 + 15254.9i 0.352290 + 0.610185i
\(856\) −4254.50 + 2456.34i −0.169878 + 0.0980794i
\(857\) 38422.7 1.53150 0.765749 0.643139i \(-0.222368\pi\)
0.765749 + 0.643139i \(0.222368\pi\)
\(858\) 0 0
\(859\) 38359.4 1.52364 0.761820 0.647788i \(-0.224306\pi\)
0.761820 + 0.647788i \(0.224306\pi\)
\(860\) 36785.3 21238.0i 1.45857 0.842105i
\(861\) 4960.27 + 8591.45i 0.196336 + 0.340065i
\(862\) −3141.86 + 5441.85i −0.124144 + 0.215023i
\(863\) 961.590i 0.0379292i −0.999820 0.0189646i \(-0.993963\pi\)
0.999820 0.0189646i \(-0.00603698\pi\)
\(864\) 47313.1 + 27316.2i 1.86299 + 1.07560i
\(865\) 10075.9 + 5817.33i 0.396059 + 0.228665i
\(866\) 60508.5i 2.37432i
\(867\) 4111.30 7120.98i 0.161046 0.278940i
\(868\) −42577.5 73746.4i −1.66495 2.88377i
\(869\) −380.305 + 219.569i −0.0148457 + 0.00857119i
\(870\) 9827.71 0.382978
\(871\) 0 0
\(872\) 24134.3 0.937261
\(873\) −21937.5 + 12665.6i −0.850483 + 0.491026i
\(874\) 9195.74 + 15927.5i 0.355893 + 0.616425i
\(875\) 11036.8 19116.2i 0.426412 0.738567i
\(876\) 628.137i 0.0242269i
\(877\) −8592.14 4960.67i −0.330828 0.191003i 0.325381 0.945583i \(-0.394508\pi\)
−0.656209 + 0.754580i \(0.727841\pi\)
\(878\) 15727.7 + 9080.40i 0.604539 + 0.349031i
\(879\) 1488.34i 0.0571110i
\(880\) 2177.82 3772.09i 0.0834253 0.144497i
\(881\) −1503.44 2604.03i −0.0574939 0.0995824i 0.835846 0.548964i \(-0.184978\pi\)
−0.893340 + 0.449382i \(0.851644\pi\)
\(882\) −13335.9 + 7699.46i −0.509117 + 0.293939i
\(883\) −6550.51 −0.249651 −0.124826 0.992179i \(-0.539837\pi\)
−0.124826 + 0.992179i \(0.539837\pi\)
\(884\) 0 0
\(885\) 1553.88 0.0590204
\(886\) 57921.0 33440.7i 2.19627 1.26802i
\(887\) −10864.7 18818.3i −0.411276 0.712352i 0.583753 0.811931i \(-0.301584\pi\)
−0.995030 + 0.0995795i \(0.968250\pi\)
\(888\) 15723.5 27234.0i 0.594198 1.02918i
\(889\) 6353.36i 0.239690i
\(890\) −17310.0 9993.95i −0.651948 0.376402i
\(891\) −1107.72 639.545i −0.0416500 0.0240466i
\(892\) 98969.8i 3.71497i
\(893\) −19606.5 + 33959.4i −0.734721 + 1.27257i
\(894\) 8513.63 + 14746.0i 0.318499 + 0.551657i
\(895\) 25138.7 14513.8i 0.938876 0.542061i
\(896\) 58610.6 2.18531
\(897\) 0 0
\(898\) −77189.4 −2.86842
\(899\) −32055.1 + 18507.0i −1.18921 + 0.686589i
\(900\) −17027.7 29492.8i −0.630654 1.09233i
\(901\) 521.267 902.861i 0.0192741 0.0333837i
\(902\) 5370.68i 0.198253i
\(903\) 5594.39 + 3229.92i 0.206168 + 0.119031i
\(904\) 30956.9 + 17872.9i 1.13895 + 0.657572i
\(905\) 15013.3i 0.551447i
\(906\) −7083.77 + 12269.5i −0.259760 + 0.449918i
\(907\) −8920.92 15451.5i −0.326587 0.565665i 0.655245 0.755416i \(-0.272565\pi\)
−0.981832 + 0.189751i \(0.939232\pi\)
\(908\) 29533.6 17051.3i 1.07941 0.623200i
\(909\) −9514.49 −0.347168
\(910\) 0 0
\(911\) 30706.4 1.11674 0.558370 0.829592i \(-0.311427\pi\)
0.558370 + 0.829592i \(0.311427\pi\)
\(912\) −30839.6 + 17805.2i −1.11974 + 0.646480i
\(913\) 1208.77 + 2093.65i 0.0438164 + 0.0758922i
\(914\) −41489.8 + 71862.4i −1.50149 + 2.60065i
\(915\) 9721.64i 0.351243i
\(916\) 6569.21 + 3792.74i 0.236957 + 0.136807i
\(917\) −22692.5 13101.5i −0.817198 0.471810i
\(918\) 961.164i 0.0345568i
\(919\) −24930.7 + 43181.3i −0.894873 + 1.54997i −0.0609114 + 0.998143i \(0.519401\pi\)
−0.833962 + 0.551822i \(0.813933\pi\)
\(920\) 10108.7 + 17508.7i 0.362253 + 0.627440i
\(921\) −6481.42 + 3742.05i −0.231889 + 0.133881i
\(922\) −38555.1 −1.37716
\(923\) 0 0
\(924\) 1356.14 0.0482832
\(925\) −14582.6 + 8419.29i −0.518351 + 0.299270i
\(926\) −35634.8 61721.2i −1.26461 2.19037i
\(927\) −19708.1 + 34135.3i −0.698271 + 1.20944i
\(928\) 89316.7i 3.15945i
\(929\) −2955.69 1706.47i −0.104384 0.0602663i 0.446899 0.894584i \(-0.352528\pi\)
−0.551283 + 0.834318i \(0.685862\pi\)
\(930\) 16027.5 + 9253.49i 0.565121 + 0.326273i
\(931\) 11073.4i 0.389814i
\(932\) 71087.5 123127.i 2.49844 4.32743i
\(933\) −2280.47 3949.88i −0.0800205 0.138600i
\(934\) −59561.4 + 34387.8i −2.08663 + 1.20471i
\(935\) −39.9533 −0.00139745
\(936\) 0 0
\(937\) −12818.0 −0.446900 −0.223450 0.974715i \(-0.571732\pi\)
−0.223450 + 0.974715i \(0.571732\pi\)
\(938\) −14971.1 + 8643.54i −0.521133 + 0.300876i
\(939\) 2105.37 + 3646.61i 0.0731695 + 0.126733i
\(940\) −34356.3 + 59506.9i −1.19211 + 2.06479i
\(941\) 23306.2i 0.807396i 0.914892 + 0.403698i \(0.132275\pi\)
−0.914892 + 0.403698i \(0.867725\pi\)
\(942\) −18125.7 10464.9i −0.626928 0.361957i
\(943\) 12246.0 + 7070.21i 0.422888 + 0.244155i
\(944\) 27085.9i 0.933868i
\(945\) −4966.45 + 8602.14i −0.170962 + 0.296114i
\(946\) −1748.58 3028.63i −0.0600965 0.104090i
\(947\) −6065.26 + 3501.78i −0.208125 + 0.120161i −0.600440 0.799670i \(-0.705008\pi\)
0.392315 + 0.919831i \(0.371674\pi\)
\(948\) 6291.20 0.215537
\(949\) 0 0
\(950\) 33615.6 1.14804
\(951\) −4452.38 + 2570.58i −0.151817 + 0.0876518i
\(952\) −1133.95 1964.06i −0.0386046 0.0668651i
\(953\) −6192.33 + 10725.4i −0.210482 + 0.364566i −0.951865 0.306516i \(-0.900837\pi\)
0.741383 + 0.671082i \(0.234170\pi\)
\(954\) 66312.7i 2.25048i
\(955\) −16405.9 9471.97i −0.555899 0.320949i
\(956\) 34446.5 + 19887.7i 1.16536 + 0.672818i
\(957\) 589.467i 0.0199109i
\(958\) 428.887 742.855i 0.0144642 0.0250528i
\(959\) 16183.3 + 28030.3i 0.544929 + 0.943844i
\(960\) −18536.4 + 10702.0i −0.623189 + 0.359798i
\(961\) −39911.6 −1.33972
\(962\) 0 0
\(963\) −1625.87 −0.0544061
\(964\) −30875.1 + 17825.7i −1.03155 + 0.595568i
\(965\) 4641.04 + 8038.51i 0.154819 + 0.268154i
\(966\) −2450.60 + 4244.56i −0.0816218 + 0.141373i
\(967\) 53796.7i 1.78902i −0.447045 0.894511i \(-0.647524\pi\)
0.447045 0.894511i \(-0.352476\pi\)
\(968\) 83866.4 + 48420.3i 2.78468 + 1.60773i
\(969\) 282.884 + 163.323i 0.00937828 + 0.00541455i
\(970\) 43814.6i 1.45031i
\(971\) 24286.6 42065.6i 0.802671 1.39027i −0.115181 0.993344i \(-0.536745\pi\)
0.917852 0.396922i \(-0.129922\pi\)
\(972\) 34014.5 + 58914.8i 1.12244 + 1.94413i
\(973\) 16781.2 9688.63i 0.552909 0.319222i
\(974\) −69523.2 −2.28713
\(975\) 0 0
\(976\) −169460. −5.55766
\(977\) −1053.63 + 608.315i −0.0345022 + 0.0199199i −0.517152 0.855894i \(-0.673008\pi\)
0.482650 + 0.875814i \(0.339674\pi\)
\(978\) 1434.43 + 2484.50i 0.0468997 + 0.0812327i
\(979\) −599.438 + 1038.26i −0.0195691 + 0.0338947i
\(980\) 19403.9i 0.632484i
\(981\) 6917.27 + 3993.69i 0.225129 + 0.129978i
\(982\) −66917.8 38635.0i −2.17457 1.25549i
\(983\) 10230.5i 0.331944i 0.986130 + 0.165972i \(0.0530761\pi\)
−0.986130 + 0.165972i \(0.946924\pi\)
\(984\) −24134.1 + 41801.5i −0.781878 + 1.35425i
\(985\) −1541.43 2669.83i −0.0498619 0.0863634i
\(986\) −1360.85 + 785.688i −0.0439537 + 0.0253767i
\(987\) −10450.0 −0.337007
\(988\) 0 0
\(989\) 9207.66 0.296043
\(990\) 2200.84 1270.66i 0.0706540 0.0407921i
\(991\) 816.414 + 1414.07i 0.0261698 + 0.0453274i 0.878814 0.477165i \(-0.158336\pi\)
−0.852644 + 0.522492i \(0.825002\pi\)
\(992\) 84098.0 145662.i 2.69165 4.66207i
\(993\) 15811.4i 0.505298i
\(994\) −28997.5 16741.7i −0.925298 0.534221i
\(995\) −25117.3 14501.5i −0.800275 0.462039i
\(996\) 34634.2i 1.10184i
\(997\) −30543.6 + 52903.0i −0.970236 + 1.68050i −0.275399 + 0.961330i \(0.588810\pi\)
−0.694837 + 0.719168i \(0.744523\pi\)
\(998\) −1030.83 1785.44i −0.0326956 0.0566305i
\(999\) 19071.8 11011.1i 0.604008 0.348724i
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 169.4.e.h.23.18 36
13.2 odd 12 169.4.a.l.1.9 yes 9
13.3 even 3 169.4.b.g.168.18 18
13.4 even 6 inner 169.4.e.h.147.18 36
13.5 odd 4 169.4.c.k.146.1 18
13.6 odd 12 169.4.c.k.22.1 18
13.7 odd 12 169.4.c.l.22.9 18
13.8 odd 4 169.4.c.l.146.9 18
13.9 even 3 inner 169.4.e.h.147.1 36
13.10 even 6 169.4.b.g.168.1 18
13.11 odd 12 169.4.a.k.1.1 9
13.12 even 2 inner 169.4.e.h.23.1 36
39.2 even 12 1521.4.a.bg.1.1 9
39.11 even 12 1521.4.a.bh.1.9 9
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
169.4.a.k.1.1 9 13.11 odd 12
169.4.a.l.1.9 yes 9 13.2 odd 12
169.4.b.g.168.1 18 13.10 even 6
169.4.b.g.168.18 18 13.3 even 3
169.4.c.k.22.1 18 13.6 odd 12
169.4.c.k.146.1 18 13.5 odd 4
169.4.c.l.22.9 18 13.7 odd 12
169.4.c.l.146.9 18 13.8 odd 4
169.4.e.h.23.1 36 13.12 even 2 inner
169.4.e.h.23.18 36 1.1 even 1 trivial
169.4.e.h.147.1 36 13.9 even 3 inner
169.4.e.h.147.18 36 13.4 even 6 inner
1521.4.a.bg.1.1 9 39.2 even 12
1521.4.a.bh.1.9 9 39.11 even 12