Properties

Label 37.4.e.a.27.1
Level $37$
Weight $4$
Character 37.27
Analytic conductor $2.183$
Analytic rank $0$
Dimension $16$
CM no
Inner twists $2$

Related objects

Downloads

Learn more

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [37,4,Mod(11,37)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(37, 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("37.11");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 37 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 37.e (of order \(6\), degree \(2\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(2.18307067021\)
Analytic rank: \(0\)
Dimension: \(16\)
Relative dimension: \(8\) over \(\Q(\zeta_{6})\)
Coefficient field: \(\mathbb{Q}[x]/(x^{16} + \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{16} + 82 x^{14} + 2679 x^{12} + 44392 x^{10} + 392767 x^{8} + 1779258 x^{6} + 3438825 x^{4} + \cdots + 82944 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 2^{12}\cdot 3^{3} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{6}]$

Embedding invariants

Embedding label 27.1
Root \(-4.65090i\) of defining polynomial
Character \(\chi\) \(=\) 37.27
Dual form 37.4.e.a.11.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-4.02780 - 2.32545i) q^{2} +(1.78194 + 3.08642i) q^{3} +(6.81543 + 11.8047i) q^{4} +(11.2971 - 6.52240i) q^{5} -16.5753i q^{6} +(-10.9405 - 18.9495i) q^{7} -26.1886i q^{8} +(7.14934 - 12.3830i) q^{9} +O(q^{10})\) \(q+(-4.02780 - 2.32545i) q^{2} +(1.78194 + 3.08642i) q^{3} +(6.81543 + 11.8047i) q^{4} +(11.2971 - 6.52240i) q^{5} -16.5753i q^{6} +(-10.9405 - 18.9495i) q^{7} -26.1886i q^{8} +(7.14934 - 12.3830i) q^{9} -60.6701 q^{10} +64.2890 q^{11} +(-24.2895 + 42.0706i) q^{12} +(4.00733 - 2.31363i) q^{13} +101.767i q^{14} +(40.2617 + 23.2451i) q^{15} +(-6.37680 + 11.0449i) q^{16} +(-17.3220 - 10.0009i) q^{17} +(-57.5922 + 33.2509i) q^{18} +(-78.5690 + 45.3618i) q^{19} +(153.990 + 88.9060i) q^{20} +(38.9908 - 67.5341i) q^{21} +(-258.943 - 149.501i) q^{22} +98.6344i q^{23} +(80.8290 - 46.6666i) q^{24} +(22.5834 - 39.1156i) q^{25} -21.5209 q^{26} +147.184 q^{27} +(149.129 - 258.299i) q^{28} -176.614i q^{29} +(-108.111 - 187.253i) q^{30} +131.680i q^{31} +(-130.071 + 75.0965i) q^{32} +(114.560 + 198.423i) q^{33} +(46.5131 + 80.5631i) q^{34} +(-247.193 - 142.717i) q^{35} +194.904 q^{36} +(-220.324 + 45.9387i) q^{37} +421.946 q^{38} +(14.2817 + 8.24553i) q^{39} +(-170.813 - 295.856i) q^{40} +(171.976 + 297.870i) q^{41} +(-314.094 + 181.342i) q^{42} +18.1916i q^{43} +(438.158 + 758.911i) q^{44} -186.524i q^{45} +(229.369 - 397.280i) q^{46} -598.471 q^{47} -45.4524 q^{48} +(-67.8900 + 117.589i) q^{49} +(-181.923 + 105.033i) q^{50} -71.2841i q^{51} +(54.6234 + 31.5368i) q^{52} +(316.753 - 548.632i) q^{53} +(-592.827 - 342.269i) q^{54} +(726.282 - 419.319i) q^{55} +(-496.262 + 286.517i) q^{56} +(-280.011 - 161.664i) q^{57} +(-410.708 + 711.367i) q^{58} +(373.646 + 215.725i) q^{59} +633.702i q^{60} +(-353.617 + 204.161i) q^{61} +(306.216 - 530.382i) q^{62} -312.870 q^{63} +800.562 q^{64} +(30.1809 - 52.2748i) q^{65} -1065.61i q^{66} +(354.064 + 613.256i) q^{67} -272.641i q^{68} +(-304.427 + 175.761i) q^{69} +(663.762 + 1149.67i) q^{70} +(408.365 + 707.309i) q^{71} +(-324.294 - 187.231i) q^{72} -458.163 q^{73} +(994.248 + 327.321i) q^{74} +160.970 q^{75} +(-1070.96 - 618.321i) q^{76} +(-703.356 - 1218.25i) q^{77} +(-38.3491 - 66.4226i) q^{78} +(-295.035 + 170.338i) q^{79} +166.368i q^{80} +(69.2415 + 119.930i) q^{81} -1599.68i q^{82} +(250.019 - 433.046i) q^{83} +1062.96 q^{84} -260.919 q^{85} +(42.3037 - 73.2721i) q^{86} +(545.106 - 314.717i) q^{87} -1683.64i q^{88} +(75.0445 + 43.3269i) q^{89} +(-433.751 + 751.279i) q^{90} +(-87.6845 - 50.6247i) q^{91} +(-1164.35 + 672.236i) q^{92} +(-406.421 + 234.647i) q^{93} +(2410.52 + 1391.71i) q^{94} +(-591.736 + 1024.92i) q^{95} +(-463.559 - 267.636i) q^{96} -424.227i q^{97} +(546.894 - 315.750i) q^{98} +(459.625 - 796.093i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 16 q - 6 q^{2} - 3 q^{3} + 18 q^{4} + 18 q^{5} + 23 q^{7} - 53 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 16 q - 6 q^{2} - 3 q^{3} + 18 q^{4} + 18 q^{5} + 23 q^{7} - 53 q^{9} - 4 q^{10} + 36 q^{11} + 14 q^{12} - 9 q^{13} - 93 q^{15} + 90 q^{16} - 210 q^{17} - 144 q^{18} - 135 q^{19} - 18 q^{20} + 71 q^{21} + 18 q^{22} - 126 q^{24} - 72 q^{25} - 276 q^{26} + 1170 q^{27} + 256 q^{28} - 236 q^{30} - 552 q^{32} + 336 q^{33} + 274 q^{34} - 27 q^{35} + 180 q^{36} - 33 q^{37} + 1344 q^{38} - 909 q^{39} - 756 q^{40} + 642 q^{41} + 846 q^{42} - 6 q^{44} + 74 q^{46} - 468 q^{47} - 284 q^{48} + 187 q^{49} - 1932 q^{50} + 180 q^{52} - 249 q^{53} - 342 q^{54} + 162 q^{55} - 996 q^{56} - 141 q^{57} - 1496 q^{58} - 1455 q^{59} + 1188 q^{61} - 510 q^{62} - 3472 q^{63} + 3476 q^{64} + 579 q^{65} - 1033 q^{67} + 810 q^{69} + 2934 q^{70} + 2319 q^{71} + 5196 q^{72} - 1672 q^{73} - 1110 q^{74} + 4364 q^{75} - 3450 q^{76} - 2472 q^{77} + 2622 q^{78} + 1569 q^{79} - 1508 q^{81} + 975 q^{83} + 3064 q^{84} + 3128 q^{85} - 36 q^{86} - 5892 q^{87} + 522 q^{89} - 2908 q^{90} - 1773 q^{91} - 3462 q^{92} + 222 q^{93} - 1614 q^{94} - 4311 q^{95} + 378 q^{96} + 5748 q^{98} - 3606 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/37\mathbb{Z}\right)^\times\).

\(n\) \(2\)
\(\chi(n)\) \(e\left(\frac{1}{6}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −4.02780 2.32545i −1.42404 0.822171i −0.427400 0.904063i \(-0.640570\pi\)
−0.996641 + 0.0818919i \(0.973904\pi\)
\(3\) 1.78194 + 3.08642i 0.342935 + 0.593982i 0.984976 0.172689i \(-0.0552454\pi\)
−0.642041 + 0.766670i \(0.721912\pi\)
\(4\) 6.81543 + 11.8047i 0.851929 + 1.47558i
\(5\) 11.2971 6.52240i 1.01045 0.583381i 0.0991237 0.995075i \(-0.468396\pi\)
0.911322 + 0.411694i \(0.135063\pi\)
\(6\) 16.5753i 1.12781i
\(7\) −10.9405 18.9495i −0.590733 1.02318i −0.994134 0.108156i \(-0.965505\pi\)
0.403401 0.915023i \(-0.367828\pi\)
\(8\) 26.1886i 1.15738i
\(9\) 7.14934 12.3830i 0.264791 0.458631i
\(10\) −60.6701 −1.91856
\(11\) 64.2890 1.76217 0.881085 0.472957i \(-0.156814\pi\)
0.881085 + 0.472957i \(0.156814\pi\)
\(12\) −24.2895 + 42.0706i −0.584313 + 1.01206i
\(13\) 4.00733 2.31363i 0.0854948 0.0493605i −0.456643 0.889650i \(-0.650948\pi\)
0.542138 + 0.840290i \(0.317615\pi\)
\(14\) 101.767i 1.94273i
\(15\) 40.2617 + 23.2451i 0.693035 + 0.400124i
\(16\) −6.37680 + 11.0449i −0.0996375 + 0.172577i
\(17\) −17.3220 10.0009i −0.247130 0.142681i 0.371319 0.928505i \(-0.378906\pi\)
−0.618449 + 0.785825i \(0.712239\pi\)
\(18\) −57.5922 + 33.2509i −0.754145 + 0.435406i
\(19\) −78.5690 + 45.3618i −0.948682 + 0.547722i −0.892671 0.450708i \(-0.851171\pi\)
−0.0560106 + 0.998430i \(0.517838\pi\)
\(20\) 153.990 + 88.9060i 1.72166 + 0.993999i
\(21\) 38.9908 67.5341i 0.405166 0.701769i
\(22\) −258.943 149.501i −2.50940 1.44880i
\(23\) 98.6344i 0.894204i 0.894483 + 0.447102i \(0.147544\pi\)
−0.894483 + 0.447102i \(0.852456\pi\)
\(24\) 80.8290 46.6666i 0.687465 0.396908i
\(25\) 22.5834 39.1156i 0.180667 0.312925i
\(26\) −21.5209 −0.162331
\(27\) 147.184 1.04910
\(28\) 149.129 258.299i 1.00652 1.74335i
\(29\) 176.614i 1.13091i −0.824778 0.565456i \(-0.808700\pi\)
0.824778 0.565456i \(-0.191300\pi\)
\(30\) −108.111 187.253i −0.657941 1.13959i
\(31\) 131.680i 0.762919i 0.924386 + 0.381460i \(0.124578\pi\)
−0.924386 + 0.381460i \(0.875422\pi\)
\(32\) −130.071 + 75.0965i −0.718548 + 0.414854i
\(33\) 114.560 + 198.423i 0.604311 + 1.04670i
\(34\) 46.5131 + 80.5631i 0.234616 + 0.406366i
\(35\) −247.193 142.717i −1.19381 0.689245i
\(36\) 194.904 0.902331
\(37\) −220.324 + 45.9387i −0.978947 + 0.204115i
\(38\) 421.946 1.80128
\(39\) 14.2817 + 8.24553i 0.0586384 + 0.0338549i
\(40\) −170.813 295.856i −0.675196 1.16947i
\(41\) 171.976 + 297.870i 0.655075 + 1.13462i 0.981875 + 0.189529i \(0.0606962\pi\)
−0.326800 + 0.945093i \(0.605970\pi\)
\(42\) −314.094 + 181.342i −1.15395 + 0.666232i
\(43\) 18.1916i 0.0645161i 0.999480 + 0.0322581i \(0.0102698\pi\)
−0.999480 + 0.0322581i \(0.989730\pi\)
\(44\) 438.158 + 758.911i 1.50124 + 2.60023i
\(45\) 186.524i 0.617895i
\(46\) 229.369 397.280i 0.735189 1.27338i
\(47\) −598.471 −1.85736 −0.928681 0.370881i \(-0.879056\pi\)
−0.928681 + 0.370881i \(0.879056\pi\)
\(48\) −45.4524 −0.136677
\(49\) −67.8900 + 117.589i −0.197930 + 0.342825i
\(50\) −181.923 + 105.033i −0.514555 + 0.297079i
\(51\) 71.2841i 0.195721i
\(52\) 54.6234 + 31.5368i 0.145671 + 0.0841032i
\(53\) 316.753 548.632i 0.820931 1.42189i −0.0840586 0.996461i \(-0.526788\pi\)
0.904990 0.425433i \(-0.139878\pi\)
\(54\) −592.827 342.269i −1.49395 0.862535i
\(55\) 726.282 419.319i 1.78058 1.02802i
\(56\) −496.262 + 286.517i −1.18421 + 0.683704i
\(57\) −280.011 161.664i −0.650673 0.375666i
\(58\) −410.708 + 711.367i −0.929803 + 1.61047i
\(59\) 373.646 + 215.725i 0.824484 + 0.476016i 0.851960 0.523606i \(-0.175414\pi\)
−0.0274763 + 0.999622i \(0.508747\pi\)
\(60\) 633.702i 1.36351i
\(61\) −353.617 + 204.161i −0.742231 + 0.428527i −0.822880 0.568215i \(-0.807634\pi\)
0.0806491 + 0.996743i \(0.474301\pi\)
\(62\) 306.216 530.382i 0.627250 1.08643i
\(63\) −312.870 −0.625682
\(64\) 800.562 1.56360
\(65\) 30.1809 52.2748i 0.0575919 0.0997522i
\(66\) 1065.61i 1.98739i
\(67\) 354.064 + 613.256i 0.645608 + 1.11823i 0.984161 + 0.177279i \(0.0567295\pi\)
−0.338552 + 0.940948i \(0.609937\pi\)
\(68\) 272.641i 0.486215i
\(69\) −304.427 + 175.761i −0.531141 + 0.306654i
\(70\) 663.762 + 1149.67i 1.13335 + 1.96303i
\(71\) 408.365 + 707.309i 0.682592 + 1.18228i 0.974187 + 0.225742i \(0.0724806\pi\)
−0.291595 + 0.956542i \(0.594186\pi\)
\(72\) −324.294 187.231i −0.530812 0.306464i
\(73\) −458.163 −0.734575 −0.367287 0.930108i \(-0.619713\pi\)
−0.367287 + 0.930108i \(0.619713\pi\)
\(74\) 994.248 + 327.321i 1.56188 + 0.514192i
\(75\) 160.970 0.247829
\(76\) −1070.96 618.321i −1.61642 0.933240i
\(77\) −703.356 1218.25i −1.04097 1.80302i
\(78\) −38.3491 66.4226i −0.0556690 0.0964216i
\(79\) −295.035 + 170.338i −0.420177 + 0.242590i −0.695153 0.718862i \(-0.744663\pi\)
0.274976 + 0.961451i \(0.411330\pi\)
\(80\) 166.368i 0.232507i
\(81\) 69.2415 + 119.930i 0.0949814 + 0.164513i
\(82\) 1599.68i 2.15433i
\(83\) 250.019 433.046i 0.330640 0.572686i −0.651997 0.758221i \(-0.726069\pi\)
0.982638 + 0.185535i \(0.0594020\pi\)
\(84\) 1062.96 1.38069
\(85\) −260.919 −0.332949
\(86\) 42.3037 73.2721i 0.0530433 0.0918736i
\(87\) 545.106 314.717i 0.671741 0.387830i
\(88\) 1683.64i 2.03951i
\(89\) 75.0445 + 43.3269i 0.0893786 + 0.0516028i 0.544023 0.839070i \(-0.316900\pi\)
−0.454645 + 0.890673i \(0.650234\pi\)
\(90\) −433.751 + 751.279i −0.508015 + 0.879908i
\(91\) −87.6845 50.6247i −0.101009 0.0583177i
\(92\) −1164.35 + 672.236i −1.31947 + 0.761799i
\(93\) −406.421 + 234.647i −0.453160 + 0.261632i
\(94\) 2410.52 + 1391.71i 2.64496 + 1.52707i
\(95\) −591.736 + 1024.92i −0.639061 + 1.10689i
\(96\) −463.559 267.636i −0.492831 0.284536i
\(97\) 424.227i 0.444059i −0.975040 0.222029i \(-0.928732\pi\)
0.975040 0.222029i \(-0.0712681\pi\)
\(98\) 546.894 315.750i 0.563721 0.325464i
\(99\) 459.625 796.093i 0.466606 0.808185i
\(100\) 615.663 0.615663
\(101\) −608.296 −0.599284 −0.299642 0.954052i \(-0.596867\pi\)
−0.299642 + 0.954052i \(0.596867\pi\)
\(102\) −165.768 + 287.118i −0.160916 + 0.278715i
\(103\) 727.287i 0.695745i 0.937542 + 0.347872i \(0.113096\pi\)
−0.937542 + 0.347872i \(0.886904\pi\)
\(104\) −60.5908 104.946i −0.0571290 0.0989503i
\(105\) 1017.25i 0.945466i
\(106\) −2551.63 + 1473.19i −2.33808 + 1.34989i
\(107\) 831.630 + 1440.43i 0.751371 + 1.30141i 0.947158 + 0.320766i \(0.103940\pi\)
−0.195788 + 0.980646i \(0.562726\pi\)
\(108\) 1003.12 + 1737.46i 0.893755 + 1.54803i
\(109\) −5.03709 2.90817i −0.00442629 0.00255552i 0.497785 0.867300i \(-0.334147\pi\)
−0.502212 + 0.864745i \(0.667480\pi\)
\(110\) −3900.42 −3.38082
\(111\) −534.391 598.152i −0.456956 0.511478i
\(112\) 279.062 0.235437
\(113\) −915.498 528.563i −0.762148 0.440027i 0.0679181 0.997691i \(-0.478364\pi\)
−0.830067 + 0.557664i \(0.811698\pi\)
\(114\) 751.885 + 1302.30i 0.617724 + 1.06993i
\(115\) 643.333 + 1114.29i 0.521662 + 0.903545i
\(116\) 2084.87 1203.70i 1.66876 0.963457i
\(117\) 66.1638i 0.0522807i
\(118\) −1003.31 1737.79i −0.782733 1.35573i
\(119\) 437.659i 0.337144i
\(120\) 608.757 1054.40i 0.463097 0.802108i
\(121\) 2802.08 2.10524
\(122\) 1899.07 1.40929
\(123\) −612.902 + 1061.58i −0.449297 + 0.778205i
\(124\) −1554.44 + 897.459i −1.12575 + 0.649953i
\(125\) 1041.41i 0.745171i
\(126\) 1260.18 + 727.564i 0.890996 + 0.514417i
\(127\) 186.302 322.685i 0.130171 0.225462i −0.793572 0.608477i \(-0.791781\pi\)
0.923742 + 0.383015i \(0.125114\pi\)
\(128\) −2183.93 1260.89i −1.50808 0.870690i
\(129\) −56.1469 + 32.4164i −0.0383214 + 0.0221249i
\(130\) −243.125 + 140.368i −0.164027 + 0.0947008i
\(131\) −1463.88 845.169i −0.976332 0.563685i −0.0751710 0.997171i \(-0.523950\pi\)
−0.901161 + 0.433485i \(0.857284\pi\)
\(132\) −1561.55 + 2704.68i −1.02966 + 1.78342i
\(133\) 1719.17 + 992.564i 1.12083 + 0.647114i
\(134\) 3293.43i 2.12320i
\(135\) 1662.76 959.993i 1.06005 0.612022i
\(136\) −261.909 + 453.640i −0.165136 + 0.286024i
\(137\) 132.547 0.0826585 0.0413293 0.999146i \(-0.486841\pi\)
0.0413293 + 0.999146i \(0.486841\pi\)
\(138\) 1634.89 1.00849
\(139\) 191.146 331.075i 0.116639 0.202025i −0.801795 0.597600i \(-0.796121\pi\)
0.918434 + 0.395575i \(0.129455\pi\)
\(140\) 3890.71i 2.34875i
\(141\) −1066.44 1847.13i −0.636955 1.10324i
\(142\) 3798.53i 2.24483i
\(143\) 257.627 148.741i 0.150656 0.0869816i
\(144\) 91.1799 + 157.928i 0.0527662 + 0.0913937i
\(145\) −1151.95 1995.23i −0.659753 1.14273i
\(146\) 1845.39 + 1065.44i 1.04606 + 0.603946i
\(147\) −483.905 −0.271509
\(148\) −2043.89 2287.76i −1.13518 1.27063i
\(149\) 106.373 0.0584862 0.0292431 0.999572i \(-0.490690\pi\)
0.0292431 + 0.999572i \(0.490690\pi\)
\(150\) −648.353 374.327i −0.352918 0.203758i
\(151\) −860.102 1489.74i −0.463537 0.802870i 0.535597 0.844474i \(-0.320087\pi\)
−0.999134 + 0.0416036i \(0.986753\pi\)
\(152\) 1187.96 + 2057.61i 0.633924 + 1.09799i
\(153\) −247.682 + 143.000i −0.130875 + 0.0755609i
\(154\) 6542.47i 3.42343i
\(155\) 858.872 + 1487.61i 0.445073 + 0.770889i
\(156\) 224.787i 0.115368i
\(157\) −308.632 + 534.567i −0.156889 + 0.271739i −0.933745 0.357938i \(-0.883480\pi\)
0.776856 + 0.629678i \(0.216813\pi\)
\(158\) 1584.45 0.797800
\(159\) 2257.74 1.12611
\(160\) −979.619 + 1696.75i −0.484036 + 0.838374i
\(161\) 1869.08 1079.11i 0.914931 0.528236i
\(162\) 644.070i 0.312364i
\(163\) −217.010 125.291i −0.104280 0.0602058i 0.446953 0.894557i \(-0.352509\pi\)
−0.551233 + 0.834352i \(0.685842\pi\)
\(164\) −2344.18 + 4060.23i −1.11615 + 1.93324i
\(165\) 2588.39 + 1494.41i 1.22125 + 0.705087i
\(166\) −2014.05 + 1162.81i −0.941691 + 0.543686i
\(167\) 1075.07 620.691i 0.498151 0.287608i −0.229799 0.973238i \(-0.573807\pi\)
0.727950 + 0.685630i \(0.240473\pi\)
\(168\) −1768.62 1021.11i −0.812215 0.468933i
\(169\) −1087.79 + 1884.11i −0.495127 + 0.857585i
\(170\) 1050.93 + 606.754i 0.474133 + 0.273741i
\(171\) 1297.23i 0.580126i
\(172\) −214.746 + 123.984i −0.0951990 + 0.0549632i
\(173\) 766.510 1327.63i 0.336859 0.583457i −0.646981 0.762506i \(-0.723969\pi\)
0.983840 + 0.179049i \(0.0573020\pi\)
\(174\) −2927.43 −1.27545
\(175\) −988.297 −0.426904
\(176\) −409.959 + 710.069i −0.175578 + 0.304111i
\(177\) 1537.64i 0.652971i
\(178\) −201.509 349.024i −0.0848526 0.146969i
\(179\) 380.426i 0.158851i −0.996841 0.0794257i \(-0.974691\pi\)
0.996841 0.0794257i \(-0.0253086\pi\)
\(180\) 2201.85 1271.24i 0.911757 0.526403i
\(181\) −282.067 488.554i −0.115834 0.200630i 0.802279 0.596949i \(-0.203621\pi\)
−0.918113 + 0.396320i \(0.870287\pi\)
\(182\) 235.450 + 407.812i 0.0958942 + 0.166094i
\(183\) −1260.25 727.608i −0.509074 0.293914i
\(184\) 2583.10 1.03494
\(185\) −2189.40 + 1956.02i −0.870096 + 0.777347i
\(186\) 2182.64 0.860425
\(187\) −1113.62 642.947i −0.435485 0.251428i
\(188\) −4078.84 7064.76i −1.58234 2.74069i
\(189\) −1610.27 2789.07i −0.619735 1.07341i
\(190\) 4766.78 2752.10i 1.82010 1.05083i
\(191\) 1087.66i 0.412045i −0.978547 0.206022i \(-0.933948\pi\)
0.978547 0.206022i \(-0.0660520\pi\)
\(192\) 1426.56 + 2470.87i 0.536213 + 0.928748i
\(193\) 2803.82i 1.04572i 0.852420 + 0.522858i \(0.175134\pi\)
−0.852420 + 0.522858i \(0.824866\pi\)
\(194\) −986.517 + 1708.70i −0.365092 + 0.632358i
\(195\) 215.123 0.0790013
\(196\) −1850.80 −0.674489
\(197\) 1299.36 2250.56i 0.469928 0.813939i −0.529481 0.848322i \(-0.677613\pi\)
0.999409 + 0.0343827i \(0.0109465\pi\)
\(198\) −3702.55 + 2137.67i −1.32893 + 0.767260i
\(199\) 5198.65i 1.85187i −0.377681 0.925936i \(-0.623278\pi\)
0.377681 0.925936i \(-0.376722\pi\)
\(200\) −1024.38 591.428i −0.362174 0.209101i
\(201\) −1261.84 + 2185.58i −0.442804 + 0.766959i
\(202\) 2450.09 + 1414.56i 0.853405 + 0.492714i
\(203\) −3346.76 + 1932.25i −1.15713 + 0.668067i
\(204\) 841.486 485.832i 0.288803 0.166740i
\(205\) 3885.66 + 2243.39i 1.32384 + 0.764317i
\(206\) 1691.27 2929.37i 0.572021 0.990770i
\(207\) 1221.39 + 705.172i 0.410110 + 0.236777i
\(208\) 59.0143i 0.0196726i
\(209\) −5051.12 + 2916.27i −1.67174 + 0.965179i
\(210\) −2365.57 + 4097.30i −0.777334 + 1.34638i
\(211\) −2984.03 −0.973599 −0.486800 0.873514i \(-0.661836\pi\)
−0.486800 + 0.873514i \(0.661836\pi\)
\(212\) 8635.23 2.79750
\(213\) −1455.37 + 2520.77i −0.468170 + 0.810894i
\(214\) 7735.65i 2.47102i
\(215\) 118.653 + 205.513i 0.0376375 + 0.0651900i
\(216\) 3854.54i 1.21421i
\(217\) 2495.28 1440.65i 0.780603 0.450681i
\(218\) 13.5256 + 23.4270i 0.00420215 + 0.00727834i
\(219\) −816.422 1414.08i −0.251912 0.436324i
\(220\) 9899.85 + 5715.68i 3.03385 + 1.75160i
\(221\) −92.5534 −0.0281711
\(222\) 761.447 + 3651.93i 0.230203 + 1.10406i
\(223\) −46.0251 −0.0138209 −0.00691046 0.999976i \(-0.502200\pi\)
−0.00691046 + 0.999976i \(0.502200\pi\)
\(224\) 2846.09 + 1643.19i 0.848939 + 0.490135i
\(225\) −322.913 559.302i −0.0956779 0.165719i
\(226\) 2458.29 + 4257.89i 0.723554 + 1.25323i
\(227\) −5118.69 + 2955.28i −1.49665 + 0.864091i −0.999993 0.00385608i \(-0.998773\pi\)
−0.496657 + 0.867947i \(0.665439\pi\)
\(228\) 4407.25i 1.28016i
\(229\) −1832.23 3173.51i −0.528720 0.915770i −0.999439 0.0334869i \(-0.989339\pi\)
0.470719 0.882283i \(-0.343995\pi\)
\(230\) 5984.16i 1.71558i
\(231\) 2506.68 4341.70i 0.713972 1.23664i
\(232\) −4625.28 −1.30890
\(233\) 3438.59 0.966821 0.483411 0.875394i \(-0.339398\pi\)
0.483411 + 0.875394i \(0.339398\pi\)
\(234\) −153.861 + 266.494i −0.0429837 + 0.0744499i
\(235\) −6761.00 + 3903.47i −1.87676 + 1.08355i
\(236\) 5881.03i 1.62213i
\(237\) −1051.47 607.067i −0.288187 0.166385i
\(238\) 1017.76 1762.80i 0.277190 0.480107i
\(239\) −144.651 83.5144i −0.0391494 0.0226029i 0.480298 0.877106i \(-0.340529\pi\)
−0.519447 + 0.854503i \(0.673862\pi\)
\(240\) −513.482 + 296.459i −0.138105 + 0.0797348i
\(241\) 2424.88 1400.01i 0.648135 0.374201i −0.139606 0.990207i \(-0.544584\pi\)
0.787741 + 0.616006i \(0.211250\pi\)
\(242\) −11286.2 6516.10i −2.99796 1.73087i
\(243\) 1740.21 3014.14i 0.459403 0.795709i
\(244\) −4820.11 2782.89i −1.26466 0.730150i
\(245\) 1771.22i 0.461875i
\(246\) 4937.29 2850.55i 1.27963 0.738797i
\(247\) −209.901 + 363.559i −0.0540716 + 0.0936548i
\(248\) 3448.52 0.882990
\(249\) 1782.08 0.453553
\(250\) 2421.74 4194.58i 0.612658 1.06115i
\(251\) 5453.80i 1.37148i 0.727848 + 0.685738i \(0.240521\pi\)
−0.727848 + 0.685738i \(0.759479\pi\)
\(252\) −2132.35 3693.33i −0.533036 0.923246i
\(253\) 6341.11i 1.57574i
\(254\) −1500.78 + 866.474i −0.370737 + 0.214045i
\(255\) −464.943 805.305i −0.114180 0.197765i
\(256\) 2662.04 + 4610.79i 0.649913 + 1.12568i
\(257\) 3877.79 + 2238.84i 0.941206 + 0.543406i 0.890338 0.455300i \(-0.150468\pi\)
0.0508679 + 0.998705i \(0.483801\pi\)
\(258\) 301.531 0.0727617
\(259\) 3280.98 + 3672.44i 0.787142 + 0.881060i
\(260\) 822.783 0.196257
\(261\) −2187.02 1262.68i −0.518671 0.299455i
\(262\) 3930.80 + 6808.34i 0.926891 + 1.60542i
\(263\) 116.400 + 201.610i 0.0272909 + 0.0472693i 0.879348 0.476179i \(-0.157979\pi\)
−0.852057 + 0.523448i \(0.824645\pi\)
\(264\) 5196.42 3000.15i 1.21143 0.699419i
\(265\) 8263.95i 1.91566i
\(266\) −4616.31 7995.69i −1.06408 1.84303i
\(267\) 308.825i 0.0707857i
\(268\) −4826.20 + 8359.22i −1.10003 + 1.90530i
\(269\) −608.114 −0.137834 −0.0689170 0.997622i \(-0.521954\pi\)
−0.0689170 + 0.997622i \(0.521954\pi\)
\(270\) −8929.66 −2.01275
\(271\) 472.381 818.187i 0.105886 0.183400i −0.808214 0.588889i \(-0.799565\pi\)
0.914100 + 0.405489i \(0.132899\pi\)
\(272\) 220.918 127.547i 0.0492469 0.0284327i
\(273\) 360.842i 0.0799968i
\(274\) −533.871 308.230i −0.117709 0.0679594i
\(275\) 1451.87 2514.70i 0.318366 0.551427i
\(276\) −4149.61 2395.78i −0.904989 0.522496i
\(277\) 2480.98 1432.39i 0.538149 0.310701i −0.206179 0.978514i \(-0.566103\pi\)
0.744329 + 0.667814i \(0.232770\pi\)
\(278\) −1539.80 + 889.003i −0.332198 + 0.191794i
\(279\) 1630.60 + 941.428i 0.349898 + 0.202014i
\(280\) −3737.56 + 6473.64i −0.797720 + 1.38169i
\(281\) −2983.32 1722.42i −0.633345 0.365662i 0.148702 0.988882i \(-0.452491\pi\)
−0.782046 + 0.623220i \(0.785824\pi\)
\(282\) 9919.83i 2.09474i
\(283\) 4591.28 2650.78i 0.964393 0.556793i 0.0668707 0.997762i \(-0.478699\pi\)
0.897522 + 0.440969i \(0.145365\pi\)
\(284\) −5566.37 + 9641.24i −1.16304 + 2.01444i
\(285\) −4217.76 −0.876627
\(286\) −1383.56 −0.286055
\(287\) 3763.00 6517.71i 0.773948 1.34052i
\(288\) 2147.56i 0.439397i
\(289\) −2256.46 3908.31i −0.459284 0.795504i
\(290\) 10715.2i 2.16972i
\(291\) 1309.34 755.948i 0.263763 0.152283i
\(292\) −3122.58 5408.47i −0.625806 1.08393i
\(293\) 4756.68 + 8238.82i 0.948424 + 1.64272i 0.748745 + 0.662858i \(0.230657\pi\)
0.199679 + 0.979861i \(0.436010\pi\)
\(294\) 1949.07 + 1125.30i 0.386640 + 0.223227i
\(295\) 5628.17 1.11080
\(296\) 1203.07 + 5769.98i 0.236240 + 1.13302i
\(297\) 9462.32 1.84868
\(298\) −428.450 247.366i −0.0832868 0.0480856i
\(299\) 228.204 + 395.261i 0.0441383 + 0.0764499i
\(300\) 1097.08 + 1900.19i 0.211133 + 0.365692i
\(301\) 344.722 199.026i 0.0660115 0.0381118i
\(302\) 8000.50i 1.52443i
\(303\) −1083.95 1877.46i −0.205516 0.355964i
\(304\) 1157.05i 0.218295i
\(305\) −2663.24 + 4612.87i −0.499989 + 0.866007i
\(306\) 1330.15 0.248496
\(307\) −1601.21 −0.297675 −0.148837 0.988862i \(-0.547553\pi\)
−0.148837 + 0.988862i \(0.547553\pi\)
\(308\) 9587.35 16605.8i 1.77367 3.07208i
\(309\) −2244.71 + 1295.99i −0.413260 + 0.238596i
\(310\) 7989.06i 1.46370i
\(311\) −6111.23 3528.32i −1.11426 0.643321i −0.174333 0.984687i \(-0.555777\pi\)
−0.939930 + 0.341366i \(0.889110\pi\)
\(312\) 215.939 374.017i 0.0391831 0.0678671i
\(313\) 710.241 + 410.058i 0.128259 + 0.0740506i 0.562757 0.826622i \(-0.309741\pi\)
−0.434498 + 0.900673i \(0.643074\pi\)
\(314\) 2486.22 1435.42i 0.446832 0.257979i
\(315\) −3534.53 + 2040.66i −0.632217 + 0.365011i
\(316\) −4021.58 2321.86i −0.715923 0.413338i
\(317\) 5006.49 8671.49i 0.887042 1.53640i 0.0436865 0.999045i \(-0.486090\pi\)
0.843355 0.537356i \(-0.180577\pi\)
\(318\) −9093.74 5250.27i −1.60362 0.925851i
\(319\) 11354.4i 1.99286i
\(320\) 9044.05 5221.58i 1.57993 0.912173i
\(321\) −2963.84 + 5133.52i −0.515343 + 0.892601i
\(322\) −10037.7 −1.73720
\(323\) 1814.63 0.312597
\(324\) −943.821 + 1634.75i −0.161835 + 0.280306i
\(325\) 208.999i 0.0356713i
\(326\) 582.716 + 1009.29i 0.0989989 + 0.171471i
\(327\) 20.7288i 0.00350552i
\(328\) 7800.81 4503.80i 1.31319 0.758173i
\(329\) 6547.58 + 11340.7i 1.09720 + 1.90041i
\(330\) −6950.33 12038.3i −1.15940 2.00815i
\(331\) −6209.39 3584.99i −1.03111 0.595314i −0.113810 0.993503i \(-0.536306\pi\)
−0.917304 + 0.398189i \(0.869639\pi\)
\(332\) 6815.95 1.12673
\(333\) −1006.31 + 3056.71i −0.165602 + 0.503023i
\(334\) −5773.54 −0.945851
\(335\) 7999.81 + 4618.69i 1.30470 + 0.753272i
\(336\) 497.273 + 861.303i 0.0807395 + 0.139845i
\(337\) −2695.26 4668.32i −0.435668 0.754598i 0.561682 0.827353i \(-0.310154\pi\)
−0.997350 + 0.0727547i \(0.976821\pi\)
\(338\) 8762.83 5059.22i 1.41016 0.814158i
\(339\) 3767.48i 0.603603i
\(340\) −1778.28 3080.06i −0.283649 0.491294i
\(341\) 8465.61i 1.34439i
\(342\) 3016.64 5224.97i 0.476963 0.826124i
\(343\) −4534.19 −0.713770
\(344\) 476.413 0.0746699
\(345\) −2292.77 + 3971.19i −0.357793 + 0.619715i
\(346\) −6174.69 + 3564.96i −0.959403 + 0.553912i
\(347\) 2730.68i 0.422451i −0.977437 0.211226i \(-0.932254\pi\)
0.977437 0.211226i \(-0.0677455\pi\)
\(348\) 7430.26 + 4289.87i 1.14455 + 0.660807i
\(349\) −431.863 + 748.009i −0.0662381 + 0.114728i −0.897243 0.441538i \(-0.854433\pi\)
0.831004 + 0.556266i \(0.187766\pi\)
\(350\) 3980.66 + 2298.23i 0.607929 + 0.350988i
\(351\) 589.815 340.530i 0.0896922 0.0517838i
\(352\) −8362.14 + 4827.88i −1.26620 + 0.731043i
\(353\) −2058.78 1188.64i −0.310419 0.179220i 0.336695 0.941614i \(-0.390691\pi\)
−0.647114 + 0.762393i \(0.724024\pi\)
\(354\) 3575.70 6193.29i 0.536854 0.929858i
\(355\) 9226.70 + 5327.04i 1.37944 + 0.796422i
\(356\) 1181.17i 0.175848i
\(357\) −1350.80 + 779.885i −0.200258 + 0.115619i
\(358\) −884.662 + 1532.28i −0.130603 + 0.226211i
\(359\) −235.220 −0.0345806 −0.0172903 0.999851i \(-0.505504\pi\)
−0.0172903 + 0.999851i \(0.505504\pi\)
\(360\) −4884.79 −0.715142
\(361\) 685.887 1187.99i 0.0999982 0.173202i
\(362\) 2623.73i 0.380940i
\(363\) 4993.15 + 8648.40i 0.721963 + 1.25048i
\(364\) 1380.12i 0.198730i
\(365\) −5175.93 + 2988.32i −0.742248 + 0.428537i
\(366\) 3384.03 + 5861.31i 0.483295 + 0.837092i
\(367\) −1956.89 3389.42i −0.278334 0.482089i 0.692637 0.721286i \(-0.256449\pi\)
−0.970971 + 0.239198i \(0.923116\pi\)
\(368\) −1089.41 628.972i −0.154319 0.0890963i
\(369\) 4918.05 0.693830
\(370\) 13367.1 2787.10i 1.87816 0.391607i
\(371\) −13861.8 −1.93980
\(372\) −5539.87 3198.44i −0.772120 0.445784i
\(373\) 3209.11 + 5558.33i 0.445472 + 0.771581i 0.998085 0.0618575i \(-0.0197024\pi\)
−0.552613 + 0.833438i \(0.686369\pi\)
\(374\) 2990.28 + 5179.32i 0.413433 + 0.716086i
\(375\) −3214.22 + 1855.73i −0.442618 + 0.255546i
\(376\) 15673.1i 2.14968i
\(377\) −408.621 707.752i −0.0558224 0.0966872i
\(378\) 14978.4i 2.03811i
\(379\) −2180.31 + 3776.40i −0.295501 + 0.511823i −0.975101 0.221760i \(-0.928820\pi\)
0.679600 + 0.733583i \(0.262153\pi\)
\(380\) −16131.7 −2.17774
\(381\) 1327.92 0.178561
\(382\) −2529.31 + 4380.89i −0.338771 + 0.586769i
\(383\) −385.070 + 222.320i −0.0513738 + 0.0296607i −0.525467 0.850814i \(-0.676109\pi\)
0.474093 + 0.880475i \(0.342776\pi\)
\(384\) 8987.37i 1.19436i
\(385\) −15891.8 9175.13i −2.10369 1.21457i
\(386\) 6520.13 11293.2i 0.859756 1.48914i
\(387\) 225.267 + 130.058i 0.0295891 + 0.0170833i
\(388\) 5007.86 2891.29i 0.655246 0.378306i
\(389\) 9715.76 5609.40i 1.26635 0.731125i 0.292051 0.956403i \(-0.405662\pi\)
0.974295 + 0.225277i \(0.0723288\pi\)
\(390\) −866.470 500.257i −0.112501 0.0649525i
\(391\) 986.431 1708.55i 0.127586 0.220985i
\(392\) 3079.49 + 1777.94i 0.396780 + 0.229081i
\(393\) 6024.18i 0.773231i
\(394\) −10467.1 + 6043.21i −1.33839 + 0.772722i
\(395\) −2222.03 + 3848.67i −0.283044 + 0.490247i
\(396\) 12530.2 1.59006
\(397\) −1882.68 −0.238008 −0.119004 0.992894i \(-0.537970\pi\)
−0.119004 + 0.992894i \(0.537970\pi\)
\(398\) −12089.2 + 20939.1i −1.52255 + 2.63714i
\(399\) 7074.77i 0.887674i
\(400\) 288.020 + 498.865i 0.0360025 + 0.0623581i
\(401\) 11081.4i 1.38000i −0.723810 0.690000i \(-0.757611\pi\)
0.723810 0.690000i \(-0.242389\pi\)
\(402\) 10164.9 5868.71i 1.26114 0.728121i
\(403\) 304.660 + 527.686i 0.0376580 + 0.0652256i
\(404\) −4145.80 7180.73i −0.510548 0.884294i
\(405\) 1564.46 + 903.241i 0.191947 + 0.110821i
\(406\) 17973.4 2.19706
\(407\) −14164.4 + 2953.35i −1.72507 + 0.359686i
\(408\) −1866.83 −0.226524
\(409\) 5309.32 + 3065.34i 0.641880 + 0.370590i 0.785338 0.619067i \(-0.212489\pi\)
−0.143458 + 0.989656i \(0.545822\pi\)
\(410\) −10433.8 18071.8i −1.25680 2.17684i
\(411\) 236.191 + 409.094i 0.0283465 + 0.0490976i
\(412\) −8585.39 + 4956.78i −1.02663 + 0.592725i
\(413\) 9440.56i 1.12479i
\(414\) −3279.68 5680.58i −0.389342 0.674360i
\(415\) 6522.90i 0.771557i
\(416\) −347.491 + 601.873i −0.0409547 + 0.0709357i
\(417\) 1362.45 0.159999
\(418\) 27126.5 3.17417
\(419\) 1687.45 2922.75i 0.196748 0.340777i −0.750724 0.660616i \(-0.770295\pi\)
0.947472 + 0.319839i \(0.103629\pi\)
\(420\) 12008.4 6933.03i 1.39511 0.805470i
\(421\) 4245.99i 0.491536i 0.969329 + 0.245768i \(0.0790402\pi\)
−0.969329 + 0.245768i \(0.920960\pi\)
\(422\) 12019.1 + 6939.22i 1.38645 + 0.800465i
\(423\) −4278.68 + 7410.88i −0.491812 + 0.851843i
\(424\) −14367.9 8295.31i −1.64568 0.950132i
\(425\) −782.381 + 451.708i −0.0892966 + 0.0515554i
\(426\) 11723.9 6768.77i 1.33339 0.769831i
\(427\) 7737.52 + 4467.26i 0.876920 + 0.506290i
\(428\) −11335.8 + 19634.2i −1.28023 + 2.21742i
\(429\) 918.155 + 530.097i 0.103331 + 0.0596581i
\(430\) 1103.69i 0.123778i
\(431\) 7136.31 4120.15i 0.797550 0.460466i −0.0450639 0.998984i \(-0.514349\pi\)
0.842614 + 0.538519i \(0.181016\pi\)
\(432\) −938.563 + 1625.64i −0.104529 + 0.181050i
\(433\) −8108.68 −0.899950 −0.449975 0.893041i \(-0.648567\pi\)
−0.449975 + 0.893041i \(0.648567\pi\)
\(434\) −13400.7 −1.48215
\(435\) 4105.42 7110.80i 0.452505 0.783762i
\(436\) 79.2817i 0.00870849i
\(437\) −4474.24 7749.61i −0.489775 0.848316i
\(438\) 7594.19i 0.828458i
\(439\) −351.895 + 203.167i −0.0382575 + 0.0220880i −0.519007 0.854770i \(-0.673698\pi\)
0.480749 + 0.876858i \(0.340365\pi\)
\(440\) −10981.4 19020.3i −1.18981 2.06081i
\(441\) 970.738 + 1681.37i 0.104820 + 0.181554i
\(442\) 372.787 + 215.228i 0.0401168 + 0.0231615i
\(443\) −14026.8 −1.50436 −0.752180 0.658958i \(-0.770998\pi\)
−0.752180 + 0.658958i \(0.770998\pi\)
\(444\) 3418.88 10385.0i 0.365435 1.11002i
\(445\) 1130.38 0.120416
\(446\) 185.380 + 107.029i 0.0196816 + 0.0113632i
\(447\) 189.551 + 328.313i 0.0200570 + 0.0347397i
\(448\) −8758.56 15170.3i −0.923668 1.59984i
\(449\) 2696.63 1556.90i 0.283434 0.163640i −0.351543 0.936172i \(-0.614343\pi\)
0.634977 + 0.772531i \(0.281010\pi\)
\(450\) 3003.67i 0.314654i
\(451\) 11056.1 + 19149.8i 1.15435 + 1.99940i
\(452\) 14409.5i 1.49949i
\(453\) 3065.31 5309.27i 0.317927 0.550665i
\(454\) 27489.4 2.84172
\(455\) −1320.78 −0.136086
\(456\) −4233.77 + 7333.10i −0.434790 + 0.753079i
\(457\) −4826.30 + 2786.47i −0.494015 + 0.285220i −0.726239 0.687443i \(-0.758733\pi\)
0.232223 + 0.972662i \(0.425400\pi\)
\(458\) 17043.0i 1.73879i
\(459\) −2549.53 1471.97i −0.259263 0.149686i
\(460\) −8769.19 + 15188.7i −0.888838 + 1.53951i
\(461\) 13627.4 + 7867.76i 1.37677 + 0.794877i 0.991769 0.128041i \(-0.0408689\pi\)
0.384998 + 0.922918i \(0.374202\pi\)
\(462\) −20192.8 + 11658.3i −2.03345 + 1.17401i
\(463\) 11739.3 6777.67i 1.17834 0.680314i 0.222708 0.974885i \(-0.428510\pi\)
0.955629 + 0.294572i \(0.0951769\pi\)
\(464\) 1950.70 + 1126.23i 0.195170 + 0.112681i
\(465\) −3060.93 + 5301.68i −0.305262 + 0.528730i
\(466\) −13849.9 7996.26i −1.37679 0.794892i
\(467\) 5716.11i 0.566403i −0.959060 0.283202i \(-0.908603\pi\)
0.959060 0.283202i \(-0.0913965\pi\)
\(468\) 781.042 450.935i 0.0771447 0.0445395i
\(469\) 7747.28 13418.7i 0.762764 1.32115i
\(470\) 36309.3 3.56345
\(471\) −2199.86 −0.215211
\(472\) 5649.52 9785.26i 0.550933 0.954244i
\(473\) 1169.52i 0.113688i
\(474\) 2823.41 + 4890.29i 0.273594 + 0.473878i
\(475\) 4097.70i 0.395821i
\(476\) −5166.43 + 2982.84i −0.497485 + 0.287223i
\(477\) −4529.15 7844.72i −0.434750 0.753008i
\(478\) 388.417 + 672.758i 0.0371669 + 0.0643750i
\(479\) −11582.0 6686.86i −1.10479 0.637851i −0.167315 0.985903i \(-0.553510\pi\)
−0.937475 + 0.348053i \(0.886843\pi\)
\(480\) −6982.51 −0.663972
\(481\) −776.625 + 693.840i −0.0736197 + 0.0657721i
\(482\) −13022.6 −1.23063
\(483\) 6661.18 + 3845.84i 0.627525 + 0.362302i
\(484\) 19097.4 + 33077.7i 1.79352 + 3.10647i
\(485\) −2766.98 4792.54i −0.259055 0.448697i
\(486\) −14018.5 + 8093.56i −1.30842 + 0.755415i
\(487\) 14049.3i 1.30725i 0.756817 + 0.653627i \(0.226753\pi\)
−0.756817 + 0.653627i \(0.773247\pi\)
\(488\) 5346.69 + 9260.75i 0.495970 + 0.859046i
\(489\) 893.047i 0.0825869i
\(490\) 4118.89 7134.13i 0.379740 0.657728i
\(491\) 11679.3 1.07348 0.536742 0.843746i \(-0.319655\pi\)
0.536742 + 0.843746i \(0.319655\pi\)
\(492\) −16708.8 −1.53108
\(493\) −1766.30 + 3059.32i −0.161359 + 0.279482i
\(494\) 1690.88 976.229i 0.154000 0.0889122i
\(495\) 11991.4i 1.08884i
\(496\) −1454.40 839.700i −0.131663 0.0760154i
\(497\) 8935.45 15476.7i 0.806458 1.39683i
\(498\) −7177.86 4144.14i −0.645879 0.372898i
\(499\) −5607.46 + 3237.47i −0.503054 + 0.290439i −0.729974 0.683475i \(-0.760468\pi\)
0.226920 + 0.973914i \(0.427135\pi\)
\(500\) −12293.5 + 7097.65i −1.09956 + 0.634833i
\(501\) 3831.42 + 2212.07i 0.341667 + 0.197262i
\(502\) 12682.5 21966.8i 1.12759 1.95304i
\(503\) 940.762 + 543.149i 0.0833927 + 0.0481468i 0.541116 0.840948i \(-0.318002\pi\)
−0.457724 + 0.889094i \(0.651335\pi\)
\(504\) 8193.63i 0.724154i
\(505\) −6871.99 + 3967.55i −0.605544 + 0.349611i
\(506\) 14745.9 25540.7i 1.29553 2.24392i
\(507\) −7753.56 −0.679187
\(508\) 5078.93 0.443585
\(509\) −6911.42 + 11970.9i −0.601853 + 1.04244i 0.390687 + 0.920523i \(0.372237\pi\)
−0.992540 + 0.121917i \(0.961096\pi\)
\(510\) 4324.81i 0.375502i
\(511\) 5012.54 + 8681.98i 0.433937 + 0.751601i
\(512\) 4587.50i 0.395978i
\(513\) −11564.1 + 6676.53i −0.995258 + 0.574612i
\(514\) −10412.6 18035.2i −0.893544 1.54766i
\(515\) 4743.66 + 8216.26i 0.405885 + 0.703013i
\(516\) −765.331 441.864i −0.0652942 0.0376976i
\(517\) −38475.1 −3.27299
\(518\) −4675.02 22421.6i −0.396542 1.90183i
\(519\) 5463.51 0.462084
\(520\) −1369.00 790.395i −0.115451 0.0666560i
\(521\) −6394.56 11075.7i −0.537717 0.931353i −0.999027 0.0441140i \(-0.985954\pi\)
0.461309 0.887239i \(-0.347380\pi\)
\(522\) 5872.58 + 10171.6i 0.492406 + 0.852872i
\(523\) 4673.63 2698.32i 0.390753 0.225601i −0.291734 0.956500i \(-0.594232\pi\)
0.682486 + 0.730898i \(0.260899\pi\)
\(524\) 23040.8i 1.92088i
\(525\) −1761.09 3050.30i −0.146401 0.253573i
\(526\) 1082.73i 0.0897512i
\(527\) 1316.92 2280.97i 0.108854 0.188540i
\(528\) −2922.09 −0.240848
\(529\) 2438.25 0.200398
\(530\) −19217.4 + 33285.5i −1.57500 + 2.72798i
\(531\) 5342.65 3084.58i 0.436631 0.252089i
\(532\) 27059.0i 2.20518i
\(533\) 1378.32 + 795.776i 0.112011 + 0.0646696i
\(534\) 718.157 1243.88i 0.0581979 0.100802i
\(535\) 18790.1 + 10848.4i 1.51844 + 0.876671i
\(536\) 16060.3 9272.43i 1.29422 0.747217i
\(537\) 1174.15 677.898i 0.0943548 0.0544757i
\(538\) 2449.36 + 1414.14i 0.196281 + 0.113323i
\(539\) −4364.58 + 7559.68i −0.348786 + 0.604116i
\(540\) 22664.8 + 13085.5i 1.80618 + 1.04280i
\(541\) 3612.93i 0.287120i −0.989642 0.143560i \(-0.954145\pi\)
0.989642 0.143560i \(-0.0458551\pi\)
\(542\) −3805.31 + 2197.00i −0.301572 + 0.174113i
\(543\) 1005.26 1741.15i 0.0794469 0.137606i
\(544\) 3004.13 0.236766
\(545\) −75.8729 −0.00596337
\(546\) −839.119 + 1453.40i −0.0657710 + 0.113919i
\(547\) 84.2737i 0.00658735i −0.999995 0.00329368i \(-0.998952\pi\)
0.999995 0.00329368i \(-0.00104841\pi\)
\(548\) 903.362 + 1564.67i 0.0704192 + 0.121970i
\(549\) 5838.47i 0.453880i
\(550\) −11695.6 + 6752.48i −0.906734 + 0.523503i
\(551\) 8011.54 + 13876.4i 0.619425 + 1.07288i
\(552\) 4602.94 + 7972.52i 0.354917 + 0.614734i
\(553\) 6455.67 + 3727.18i 0.496425 + 0.286611i
\(554\) −13323.8 −1.02180
\(555\) −9938.47 3271.88i −0.760116 0.250241i
\(556\) 5210.98 0.397473
\(557\) 19438.4 + 11222.8i 1.47869 + 0.853724i 0.999710 0.0240992i \(-0.00767177\pi\)
0.478984 + 0.877824i \(0.341005\pi\)
\(558\) −4378.49 7583.77i −0.332180 0.575352i
\(559\) 42.0887 + 72.8997i 0.00318455 + 0.00551580i
\(560\) 3152.60 1820.16i 0.237896 0.137349i
\(561\) 4582.79i 0.344894i
\(562\) 8010.80 + 13875.1i 0.601273 + 1.04143i
\(563\) 6481.36i 0.485181i −0.970129 0.242590i \(-0.922003\pi\)
0.970129 0.242590i \(-0.0779971\pi\)
\(564\) 14536.5 25178.0i 1.08528 1.87976i
\(565\) −13790.0 −1.02681
\(566\) −24657.0 −1.83111
\(567\) 1515.08 2624.19i 0.112217 0.194366i
\(568\) 18523.4 10694.5i 1.36836 0.790020i
\(569\) 1246.42i 0.0918328i −0.998945 0.0459164i \(-0.985379\pi\)
0.998945 0.0459164i \(-0.0146208\pi\)
\(570\) 16988.3 + 9808.19i 1.24835 + 0.720737i
\(571\) −11256.3 + 19496.5i −0.824977 + 1.42890i 0.0769597 + 0.997034i \(0.475479\pi\)
−0.901937 + 0.431868i \(0.857855\pi\)
\(572\) 3511.68 + 2027.47i 0.256697 + 0.148204i
\(573\) 3356.98 1938.16i 0.244747 0.141305i
\(574\) −30313.2 + 17501.4i −2.20427 + 1.27263i
\(575\) 3858.15 + 2227.50i 0.279819 + 0.161553i
\(576\) 5723.49 9913.38i 0.414026 0.717114i
\(577\) 3694.14 + 2132.81i 0.266532 + 0.153883i 0.627311 0.778769i \(-0.284156\pi\)
−0.360778 + 0.932652i \(0.617489\pi\)
\(578\) 20989.2i 1.51044i
\(579\) −8653.75 + 4996.24i −0.621136 + 0.358613i
\(580\) 15702.1 27196.8i 1.12413 1.94704i
\(581\) −10941.4 −0.781280
\(582\) −7031.68 −0.500812
\(583\) 20363.7 35271.0i 1.44662 2.50562i
\(584\) 11998.7i 0.850185i
\(585\) −431.547 747.461i −0.0304996 0.0528269i
\(586\) 44245.7i 3.11907i
\(587\) 6438.56 3717.30i 0.452722 0.261379i −0.256257 0.966609i \(-0.582489\pi\)
0.708979 + 0.705229i \(0.249156\pi\)
\(588\) −3298.02 5712.34i −0.231306 0.400634i
\(589\) −5973.26 10346.0i −0.417867 0.723768i
\(590\) −22669.1 13088.0i −1.58182 0.913263i
\(591\) 9261.58 0.644620
\(592\) 897.572 2726.41i 0.0623142 0.189282i
\(593\) −14017.6 −0.970713 −0.485356 0.874316i \(-0.661310\pi\)
−0.485356 + 0.874316i \(0.661310\pi\)
\(594\) −38112.3 22004.1i −2.63260 1.51993i
\(595\) 2854.59 + 4944.29i 0.196684 + 0.340666i
\(596\) 724.980 + 1255.70i 0.0498261 + 0.0863013i
\(597\) 16045.2 9263.71i 1.09998 0.635073i
\(598\) 2122.71i 0.145157i
\(599\) −4729.26 8191.32i −0.322592 0.558745i 0.658430 0.752642i \(-0.271221\pi\)
−0.981022 + 0.193897i \(0.937887\pi\)
\(600\) 4215.57i 0.286833i
\(601\) −1530.13 + 2650.26i −0.103852 + 0.179877i −0.913269 0.407358i \(-0.866450\pi\)
0.809417 + 0.587235i \(0.199784\pi\)
\(602\) −1851.30 −0.125338
\(603\) 10125.3 0.683804
\(604\) 11723.9 20306.5i 0.789802 1.36798i
\(605\) 31655.5 18276.3i 2.12724 1.22816i
\(606\) 10082.7i 0.675876i
\(607\) 9441.76 + 5451.20i 0.631350 + 0.364510i 0.781275 0.624187i \(-0.214570\pi\)
−0.149925 + 0.988697i \(0.547903\pi\)
\(608\) 6813.03 11800.5i 0.454449 0.787128i
\(609\) −11927.5 6886.34i −0.793639 0.458208i
\(610\) 21454.0 12386.5i 1.42401 0.822153i
\(611\) −2398.27 + 1384.64i −0.158795 + 0.0916802i
\(612\) −3376.13 1949.21i −0.222993 0.128745i
\(613\) −5192.55 + 8993.76i −0.342129 + 0.592585i −0.984828 0.173534i \(-0.944481\pi\)
0.642699 + 0.766119i \(0.277815\pi\)
\(614\) 6449.36 + 3723.54i 0.423901 + 0.244739i
\(615\) 15990.4i 1.04845i
\(616\) −31904.2 + 18419.9i −2.08678 + 1.20480i
\(617\) 11112.1 19246.7i 0.725052 1.25583i −0.233901 0.972260i \(-0.575149\pi\)
0.958953 0.283566i \(-0.0915174\pi\)
\(618\) 12055.0 0.784665
\(619\) −2512.98 −0.163175 −0.0815875 0.996666i \(-0.525999\pi\)
−0.0815875 + 0.996666i \(0.525999\pi\)
\(620\) −11707.2 + 20277.4i −0.758341 + 1.31348i
\(621\) 14517.4i 0.938106i
\(622\) 16409.9 + 28422.7i 1.05784 + 1.83223i
\(623\) 1896.08i 0.121934i
\(624\) −182.143 + 105.160i −0.0116852 + 0.00674644i
\(625\) 9615.41 + 16654.4i 0.615386 + 1.06588i
\(626\) −1907.14 3303.26i −0.121764 0.210902i
\(627\) −18001.6 10393.3i −1.14660 0.661988i
\(628\) −8413.85 −0.534633
\(629\) 4275.89 + 1407.68i 0.271050 + 0.0892337i
\(630\) 18981.9 1.20040
\(631\) −21431.5 12373.5i −1.35210 0.780634i −0.363555 0.931573i \(-0.618437\pi\)
−0.988543 + 0.150939i \(0.951770\pi\)
\(632\) 4460.92 + 7726.55i 0.280769 + 0.486306i
\(633\) −5317.38 9209.98i −0.333882 0.578300i
\(634\) −40330.2 + 23284.7i −2.52637 + 1.45860i
\(635\) 4860.56i 0.303756i
\(636\) 15387.5 + 26651.9i 0.959362 + 1.66166i
\(637\) 628.290i 0.0390797i
\(638\) −26404.0 + 45733.1i −1.63847 + 2.83792i
\(639\) 11678.2 0.722975
\(640\) −32896.2 −2.03178
\(641\) 6914.57 11976.4i 0.426067 0.737970i −0.570452 0.821331i \(-0.693232\pi\)
0.996519 + 0.0833609i \(0.0265654\pi\)
\(642\) 23875.5 13784.5i 1.46774 0.847401i
\(643\) 8884.88i 0.544923i 0.962167 + 0.272461i \(0.0878377\pi\)
−0.962167 + 0.272461i \(0.912162\pi\)
\(644\) 25477.1 + 14709.2i 1.55891 + 0.900039i
\(645\) −422.866 + 732.425i −0.0258145 + 0.0447120i
\(646\) −7308.97 4219.84i −0.445151 0.257008i
\(647\) 12553.2 7247.57i 0.762775 0.440388i −0.0675162 0.997718i \(-0.521507\pi\)
0.830291 + 0.557330i \(0.188174\pi\)
\(648\) 3140.79 1813.34i 0.190404 0.109930i
\(649\) 24021.3 + 13868.7i 1.45288 + 0.838822i
\(650\) −486.016 + 841.804i −0.0293279 + 0.0507974i
\(651\) 8892.91 + 5134.32i 0.535393 + 0.309109i
\(652\) 3415.65i 0.205164i
\(653\) −14870.0 + 8585.19i −0.891130 + 0.514494i −0.874312 0.485365i \(-0.838687\pi\)
−0.0168180 + 0.999859i \(0.505354\pi\)
\(654\) −48.2037 + 83.4913i −0.00288213 + 0.00499200i
\(655\) −22050.1 −1.31537
\(656\) −4386.62 −0.261080
\(657\) −3275.57 + 5673.45i −0.194508 + 0.336898i
\(658\) 60904.3i 3.60835i
\(659\) −12992.9 22504.4i −0.768031 1.33027i −0.938629 0.344929i \(-0.887903\pi\)
0.170597 0.985341i \(-0.445430\pi\)
\(660\) 40740.1i 2.40274i
\(661\) −24978.8 + 14421.5i −1.46984 + 0.848611i −0.999427 0.0338361i \(-0.989228\pi\)
−0.470411 + 0.882448i \(0.655894\pi\)
\(662\) 16673.4 + 28879.2i 0.978899 + 1.69550i
\(663\) −164.925 285.659i −0.00966088 0.0167331i
\(664\) −11340.9 6547.65i −0.662817 0.382678i
\(665\) 25895.6 1.51006
\(666\) 11161.4 9971.68i 0.649395 0.580172i
\(667\) 17420.3 1.01127
\(668\) 14654.1 + 8460.55i 0.848779 + 0.490043i
\(669\) −82.0141 142.053i −0.00473968 0.00820938i
\(670\) −21481.1 37206.3i −1.23864 2.14538i
\(671\) −22733.7 + 13125.3i −1.30794 + 0.755138i
\(672\) 11712.3i 0.672339i
\(673\) 15945.1 + 27617.7i 0.913280 + 1.58185i 0.809401 + 0.587257i \(0.199792\pi\)
0.103879 + 0.994590i \(0.466875\pi\)
\(674\) 25070.7i 1.43277i
\(675\) 3323.92 5757.19i 0.189537 0.328288i
\(676\) −29655.2 −1.68725
\(677\) 7660.95 0.434910 0.217455 0.976070i \(-0.430224\pi\)
0.217455 + 0.976070i \(0.430224\pi\)
\(678\) −8761.08 + 15174.6i −0.496265 + 0.859556i
\(679\) −8038.90 + 4641.26i −0.454351 + 0.262320i
\(680\) 6833.10i 0.385349i
\(681\) −18242.4 10532.3i −1.02651 0.592655i
\(682\) 19686.3 34097.7i 1.10532 1.91447i
\(683\) −5659.42 3267.47i −0.317060 0.183055i 0.333022 0.942919i \(-0.391932\pi\)
−0.650081 + 0.759865i \(0.725265\pi\)
\(684\) −15313.4 + 8841.18i −0.856025 + 0.494226i
\(685\) 1497.40 864.522i 0.0835220 0.0482214i
\(686\) 18262.8 + 10544.0i 1.01644 + 0.586841i
\(687\) 6529.85 11310.0i 0.362634 0.628100i
\(688\) −200.925 116.004i −0.0111340 0.00642823i
\(689\) 2931.40i 0.162086i
\(690\) 18469.6 10663.4i 1.01902 0.588334i
\(691\) −12154.4 + 21052.0i −0.669139 + 1.15898i 0.309006 + 0.951060i \(0.400004\pi\)
−0.978145 + 0.207923i \(0.933330\pi\)
\(692\) 20896.4 1.14792
\(693\) −20114.1 −1.10256
\(694\) −6350.06 + 10998.6i −0.347327 + 0.601588i
\(695\) 4986.93i 0.272180i
\(696\) −8242.00 14275.6i −0.448868 0.777462i
\(697\) 6879.63i 0.373866i
\(698\) 3478.91 2008.55i 0.188652 0.108918i
\(699\) 6127.37 + 10612.9i 0.331557 + 0.574274i
\(700\) −6735.67 11666.5i −0.363692 0.629933i
\(701\) −1208.07 697.479i −0.0650901 0.0375798i 0.467102 0.884204i \(-0.345298\pi\)
−0.532192 + 0.846624i \(0.678632\pi\)
\(702\) −3167.54 −0.170301
\(703\) 15226.8 13603.6i 0.816911 0.729831i
\(704\) 51467.3 2.75532
\(705\) −24095.5 13911.5i −1.28722 0.743175i
\(706\) 5528.24 + 9575.19i 0.294700 + 0.510435i
\(707\) 6655.07 + 11526.9i 0.354017 + 0.613175i
\(708\) −18151.3 + 10479.7i −0.963514 + 0.556285i
\(709\) 22106.7i 1.17099i −0.810674 0.585497i \(-0.800899\pi\)
0.810674 0.585497i \(-0.199101\pi\)
\(710\) −24775.5 42912.5i −1.30959 2.26828i
\(711\) 4871.23i 0.256942i
\(712\) 1134.67 1965.31i 0.0597242 0.103445i
\(713\) −12988.2 −0.682206
\(714\) 7254.33 0.380233
\(715\) 1940.30 3360.70i 0.101487 0.175780i
\(716\) 4490.81 2592.77i 0.234399 0.135330i
\(717\) 595.272i 0.0310054i
\(718\) 947.419 + 546.993i 0.0492443 + 0.0284312i
\(719\) −6208.58 + 10753.6i −0.322032 + 0.557776i −0.980907 0.194477i \(-0.937699\pi\)
0.658875 + 0.752252i \(0.271032\pi\)
\(720\) 2060.14 + 1189.42i 0.106635 + 0.0615656i
\(721\) 13781.8 7956.90i 0.711872 0.410999i
\(722\) −5525.23 + 3189.99i −0.284803 + 0.164431i
\(723\) 8642.02 + 4989.47i 0.444537 + 0.256653i
\(724\) 3844.82 6659.42i 0.197364 0.341844i
\(725\) −6908.37 3988.55i −0.353890 0.204319i
\(726\) 46445.3i 2.37431i
\(727\) −6321.39 + 3649.65i −0.322486 + 0.186187i −0.652500 0.757789i \(-0.726280\pi\)
0.330014 + 0.943976i \(0.392946\pi\)
\(728\) −1325.79 + 2296.33i −0.0674959 + 0.116906i
\(729\) 16142.9 0.820145
\(730\) 27796.8 1.40932
\(731\) 181.932 315.116i 0.00920520 0.0159439i
\(732\) 19835.8i 1.00158i
\(733\) −17121.3 29654.9i −0.862741 1.49431i −0.869273 0.494332i \(-0.835413\pi\)
0.00653261 0.999979i \(-0.497921\pi\)
\(734\) 18202.6i 0.915352i
\(735\) −5466.74 + 3156.22i −0.274345 + 0.158393i
\(736\) −7407.10 12829.5i −0.370964 0.642528i
\(737\) 22762.4 + 39425.7i 1.13767 + 1.97051i
\(738\) −19808.9 11436.7i −0.988043 0.570447i
\(739\) 10310.9 0.513252 0.256626 0.966511i \(-0.417389\pi\)
0.256626 + 0.966511i \(0.417389\pi\)
\(740\) −38011.8 12514.0i −1.88830 0.621655i
\(741\) −1496.13 −0.0741723
\(742\) 55832.4 + 32234.8i 2.76236 + 1.59485i
\(743\) 4167.02 + 7217.49i 0.205751 + 0.356372i 0.950372 0.311116i \(-0.100703\pi\)
−0.744621 + 0.667488i \(0.767370\pi\)
\(744\) 6145.08 + 10643.6i 0.302809 + 0.524480i
\(745\) 1201.71 693.809i 0.0590971 0.0341197i
\(746\) 29850.5i 1.46502i
\(747\) −3574.94 6191.98i −0.175101 0.303284i
\(748\) 17527.9i 0.856794i
\(749\) 18196.9 31518.0i 0.887719 1.53757i
\(750\) 17261.6 0.840408
\(751\) −13969.3 −0.678760 −0.339380 0.940649i \(-0.610217\pi\)
−0.339380 + 0.940649i \(0.610217\pi\)
\(752\) 3816.33 6610.08i 0.185063 0.320538i
\(753\) −16832.7 + 9718.37i −0.814632 + 0.470328i
\(754\) 3800.91i 0.183582i
\(755\) −19433.4 11219.9i −0.936759 0.540838i
\(756\) 21949.4 38017.4i 1.05594 1.82894i
\(757\) −23186.6 13386.8i −1.11325 0.642736i −0.173581 0.984820i \(-0.555534\pi\)
−0.939669 + 0.342084i \(0.888867\pi\)
\(758\) 17563.7 10140.4i 0.841611 0.485904i
\(759\) −19571.3 + 11299.5i −0.935961 + 0.540377i
\(760\) 26841.1 + 15496.7i 1.28109 + 0.739639i
\(761\) −10645.4 + 18438.4i −0.507090 + 0.878306i 0.492876 + 0.870100i \(0.335946\pi\)
−0.999966 + 0.00820684i \(0.997388\pi\)
\(762\) −5348.60 3088.02i −0.254278 0.146807i
\(763\) 127.267i 0.00603852i
\(764\) 12839.5 7412.90i 0.608007 0.351033i
\(765\) −1865.40 + 3230.97i −0.0881617 + 0.152700i
\(766\) 2067.98 0.0975445
\(767\) 1996.43 0.0939855
\(768\) −9487.23 + 16432.4i −0.445756 + 0.772073i
\(769\) 41233.5i 1.93357i 0.255588 + 0.966786i \(0.417731\pi\)
−0.255588 + 0.966786i \(0.582269\pi\)
\(770\) 42672.6 + 73911.2i 1.99716 + 3.45919i
\(771\) 15958.0i 0.745412i
\(772\) −33098.1 + 19109.2i −1.54304 + 0.890875i
\(773\) −7546.77 13071.4i −0.351149 0.608209i 0.635302 0.772264i \(-0.280876\pi\)
−0.986451 + 0.164055i \(0.947542\pi\)
\(774\) −604.887 1047.69i −0.0280907 0.0486545i
\(775\) 5150.76 + 2973.79i 0.238736 + 0.137834i
\(776\) −11109.9 −0.513946
\(777\) −5488.18 + 16670.6i −0.253394 + 0.769695i
\(778\) −52177.5 −2.40444
\(779\) −27023.9 15602.2i −1.24292 0.717597i
\(780\) 1466.15 + 2539.45i 0.0673035 + 0.116573i
\(781\) 26253.4 + 45472.2i 1.20284 + 2.08339i
\(782\) −7946.29 + 4587.79i −0.363374 + 0.209794i
\(783\) 25994.8i 1.18643i
\(784\) −865.842 1499.68i −0.0394425 0.0683164i
\(785\) 8052.09i 0.366104i
\(786\) −14008.9 + 24264.2i −0.635728 + 1.10111i
\(787\) −20294.7 −0.919220 −0.459610 0.888121i \(-0.652011\pi\)
−0.459610 + 0.888121i \(0.652011\pi\)
\(788\) 35422.9 1.60138
\(789\) −414.836 + 718.517i −0.0187181 + 0.0324206i
\(790\) 17899.8 10334.4i 0.806134 0.465421i
\(791\) 23131.0i 1.03975i
\(792\) −20848.6 12036.9i −0.935380 0.540042i
\(793\) −944.707 + 1636.28i −0.0423046 + 0.0732737i
\(794\) 7583.06 + 4378.08i 0.338933 + 0.195683i
\(795\) 25506.0 14725.9i 1.13787 0.656949i
\(796\) 61368.4 35431.1i 2.73259 1.57766i
\(797\) −8659.86 4999.78i −0.384878 0.222210i 0.295060 0.955479i \(-0.404660\pi\)
−0.679939 + 0.733269i \(0.737994\pi\)
\(798\) 16452.0 28495.8i 0.729819 1.26408i
\(799\) 10366.7 + 5985.24i 0.459010 + 0.265009i
\(800\) 6783.74i 0.299802i
\(801\) 1073.04 619.518i 0.0473332 0.0273278i
\(802\) −25769.3 + 44633.7i −1.13459 + 1.96518i
\(803\) −29454.9 −1.29445
\(804\) −34400.1 −1.50895
\(805\) 14076.8 24381.7i 0.616326 1.06751i
\(806\) 2833.89i 0.123845i
\(807\) −1083.63 1876.89i −0.0472682 0.0818709i
\(808\) 15930.4i 0.693601i
\(809\) 33043.1 19077.4i 1.43601 0.829081i 0.438440 0.898760i \(-0.355531\pi\)
0.997569 + 0.0696798i \(0.0221977\pi\)
\(810\) −4200.88 7276.14i −0.182227 0.315627i
\(811\) −11145.3 19304.3i −0.482572 0.835839i 0.517228 0.855848i \(-0.326964\pi\)
−0.999800 + 0.0200088i \(0.993631\pi\)
\(812\) −45619.2 26338.3i −1.97158 1.13829i
\(813\) 3367.03 0.145248
\(814\) 63919.3 + 21043.1i 2.75230 + 0.906095i
\(815\) −3268.79 −0.140492
\(816\) 787.329 + 454.565i 0.0337770 + 0.0195012i
\(817\) −825.204 1429.30i −0.0353369 0.0612053i
\(818\) −14256.6 24693.1i −0.609376 1.05547i
\(819\) −1253.77 + 723.867i −0.0534925 + 0.0308839i
\(820\) 61158.6i 2.60457i
\(821\) −15848.6 27450.6i −0.673716 1.16691i −0.976843 0.213959i \(-0.931364\pi\)
0.303127 0.952950i \(-0.401969\pi\)
\(822\) 2197.00i 0.0932228i
\(823\) 5939.05 10286.7i 0.251546 0.435691i −0.712406 0.701768i \(-0.752394\pi\)
0.963952 + 0.266077i \(0.0857277\pi\)
\(824\) 19046.6 0.805244
\(825\) 10348.6 0.436717
\(826\) −21953.5 + 38024.7i −0.924772 + 1.60175i
\(827\) 1281.48 739.860i 0.0538830 0.0311094i −0.472816 0.881161i \(-0.656763\pi\)
0.526700 + 0.850052i \(0.323429\pi\)
\(828\) 19224.2i 0.806869i
\(829\) 22913.4 + 13229.0i 0.959969 + 0.554238i 0.896163 0.443724i \(-0.146343\pi\)
0.0638054 + 0.997962i \(0.479676\pi\)
\(830\) −15168.7 + 26272.9i −0.634352 + 1.09873i
\(831\) 8841.92 + 5104.89i 0.369101 + 0.213101i
\(832\) 3208.11 1852.21i 0.133679 0.0771799i
\(833\) 2351.99 1357.92i 0.0978289 0.0564815i
\(834\) −5487.67 3168.31i −0.227845 0.131546i
\(835\) 8096.79 14024.0i 0.335570 0.581224i
\(836\) −68851.2 39751.3i −2.84841 1.64453i
\(837\) 19381.2i 0.800375i
\(838\) −13593.4 + 7848.16i −0.560354 + 0.323520i
\(839\) −11992.3 + 20771.3i −0.493468 + 0.854712i −0.999972 0.00752602i \(-0.997604\pi\)
0.506504 + 0.862238i \(0.330938\pi\)
\(840\) −26640.5 −1.09427
\(841\) −6803.62 −0.278962
\(842\) 9873.83 17102.0i 0.404127 0.699968i
\(843\) 12277.0i 0.501593i
\(844\) −20337.5 35225.6i −0.829437 1.43663i
\(845\) 28380.1i 1.15539i
\(846\) 34467.3 19899.7i 1.40072 0.808706i
\(847\) −30656.2 53098.1i −1.24364 2.15404i
\(848\) 4039.74 + 6997.04i 0.163591 + 0.283348i
\(849\) 16362.8 + 9447.07i 0.661449 + 0.381888i
\(850\) 4201.70 0.169549
\(851\) −4531.14 21731.5i −0.182521 0.875379i
\(852\) −39675.9 −1.59539
\(853\) 33871.7 + 19555.8i 1.35961 + 0.784970i 0.989571 0.144047i \(-0.0460116\pi\)
0.370037 + 0.929017i \(0.379345\pi\)
\(854\) −20776.8 35986.4i −0.832513 1.44196i
\(855\) 8461.04 + 14655.0i 0.338435 + 0.586186i
\(856\) 37722.7 21779.2i 1.50623 0.869624i
\(857\) 38303.7i 1.52676i 0.645953 + 0.763378i \(0.276460\pi\)
−0.645953 + 0.763378i \(0.723540\pi\)
\(858\) −2465.43 4270.25i −0.0980983 0.169911i
\(859\) 22048.2i 0.875758i −0.899034 0.437879i \(-0.855730\pi\)
0.899034 0.437879i \(-0.144270\pi\)
\(860\) −1617.34 + 2801.32i −0.0641290 + 0.111075i
\(861\) 26821.9 1.06166
\(862\) −38324.8 −1.51433
\(863\) 9185.79 15910.3i 0.362327 0.627568i −0.626017 0.779810i \(-0.715316\pi\)
0.988343 + 0.152242i \(0.0486492\pi\)
\(864\) −19144.4 + 11053.0i −0.753825 + 0.435221i
\(865\) 19997.9i 0.786069i
\(866\) 32660.1 + 18856.3i 1.28157 + 0.739913i
\(867\) 8041.79 13928.8i 0.315010 0.545613i
\(868\) 34012.9 + 19637.3i 1.33004 + 0.767897i
\(869\) −18967.5 + 10950.9i −0.740424 + 0.427484i
\(870\) −33071.6 + 19093.9i −1.28877 + 0.744073i
\(871\) 2837.70 + 1638.35i 0.110392 + 0.0637351i
\(872\) −76.1608 + 131.914i −0.00295772 + 0.00512292i
\(873\) −5253.21 3032.94i −0.203659 0.117582i
\(874\) 41618.5i 1.61072i
\(875\) 19734.2 11393.5i 0.762443 0.440197i
\(876\) 11128.5 19275.2i 0.429222 0.743434i
\(877\) 5290.63 0.203708 0.101854 0.994799i \(-0.467523\pi\)
0.101854 + 0.994799i \(0.467523\pi\)
\(878\) 1889.82 0.0726403
\(879\) −16952.3 + 29362.2i −0.650497 + 1.12669i
\(880\) 10695.7i 0.409716i
\(881\) 13987.7 + 24227.4i 0.534912 + 0.926495i 0.999168 + 0.0407937i \(0.0129886\pi\)
−0.464255 + 0.885701i \(0.653678\pi\)
\(882\) 9029.61i 0.344720i
\(883\) 15743.2 9089.32i 0.600000 0.346410i −0.169042 0.985609i \(-0.554067\pi\)
0.769041 + 0.639199i \(0.220734\pi\)
\(884\) −630.792 1092.56i −0.0239998 0.0415689i
\(885\) 10029.1 + 17370.9i 0.380931 + 0.659792i
\(886\) 56496.9 + 32618.5i 2.14227 + 1.23684i
\(887\) −20010.0 −0.757464 −0.378732 0.925506i \(-0.623640\pi\)
−0.378732 + 0.925506i \(0.623640\pi\)
\(888\) −15664.8 + 13995.0i −0.591976 + 0.528874i
\(889\) −8152.98 −0.307584
\(890\) −4552.95 2628.65i −0.171478 0.0990028i
\(891\) 4451.47 + 7710.17i 0.167373 + 0.289899i
\(892\) −313.681 543.311i −0.0117744 0.0203939i
\(893\) 47021.2 27147.7i 1.76204 1.01732i
\(894\) 1763.17i 0.0659611i
\(895\) −2481.29 4297.72i −0.0926709 0.160511i
\(896\) 55179.3i 2.05738i
\(897\) −813.293 + 1408.67i −0.0302732 + 0.0524347i
\(898\) −14482.0 −0.538161
\(899\) 23256.6 0.862795
\(900\) 4401.58 7623.77i 0.163022 0.282362i
\(901\) −10973.6 + 6335.62i −0.405753 + 0.234262i
\(902\) 102842.i 3.79630i
\(903\) 1228.55 + 709.305i 0.0452754 + 0.0261398i
\(904\) −13842.3 + 23975.6i −0.509280 + 0.882098i
\(905\) −6373.09 3679.51i −0.234087 0.135150i
\(906\) −24692.9 + 14256.4i −0.905482 + 0.522780i
\(907\) 30214.2 17444.2i 1.10611 0.638615i 0.168294 0.985737i \(-0.446174\pi\)
0.937820 + 0.347122i \(0.112841\pi\)
\(908\) −69772.2 40283.0i −2.55008 1.47229i
\(909\) −4348.92 + 7532.54i −0.158685 + 0.274850i
\(910\) 5319.82 + 3071.40i 0.193792 + 0.111886i
\(911\) 13292.1i 0.483411i 0.970350 + 0.241705i \(0.0777068\pi\)
−0.970350 + 0.241705i \(0.922293\pi\)
\(912\) 3571.15 2061.81i 0.129663 0.0748610i
\(913\) 16073.5 27840.1i 0.582645 1.00917i
\(914\) 25919.2 0.937998
\(915\) −18983.0 −0.685856
\(916\) 24974.8 43257.7i 0.900864 1.56034i
\(917\) 36986.4i 1.33195i
\(918\) 6845.98 + 11857.6i 0.246134 + 0.426317i
\(919\) 18220.3i 0.654007i −0.945023 0.327003i \(-0.893961\pi\)
0.945023 0.327003i \(-0.106039\pi\)
\(920\) 29181.6 16848.0i 1.04575 0.603763i
\(921\) −2853.27 4942.02i −0.102083 0.176813i
\(922\) −36592.2 63379.5i −1.30705 2.26387i
\(923\) 3272.91 + 1889.61i 0.116716 + 0.0673861i
\(924\) 68336.5 2.43301
\(925\) −3178.75 + 9655.55i −0.112991 + 0.343214i
\(926\) −63044.6 −2.23734
\(927\) 9006.02 + 5199.63i 0.319090 + 0.184227i
\(928\) 13263.1 + 22972.4i 0.469163 + 0.812614i
\(929\) −10042.6 17394.3i −0.354669 0.614305i 0.632392 0.774649i \(-0.282073\pi\)
−0.987061 + 0.160343i \(0.948740\pi\)
\(930\) 24657.6 14236.1i 0.869413 0.501956i
\(931\) 12318.5i 0.433642i
\(932\) 23435.5 + 40591.4i 0.823663 + 1.42663i
\(933\) 25149.1i 0.882470i
\(934\) −13292.5 + 23023.3i −0.465680 + 0.806581i
\(935\) −16774.2 −0.586712
\(936\) −1732.74 −0.0605089
\(937\) −1969.98 + 3412.10i −0.0686834 + 0.118963i −0.898322 0.439338i \(-0.855213\pi\)
0.829639 + 0.558301i \(0.188547\pi\)
\(938\) −62409.0 + 36031.8i −2.17241 + 1.25424i
\(939\) 2922.80i 0.101578i
\(940\) −92158.3 53207.6i −3.19774 1.84621i
\(941\) −2588.94 + 4484.17i −0.0896885 + 0.155345i −0.907379 0.420312i \(-0.861920\pi\)
0.817691 + 0.575657i \(0.195254\pi\)
\(942\) 8860.60 + 5115.67i 0.306469 + 0.176940i
\(943\) −29380.3 + 16962.7i −1.01458 + 0.585771i
\(944\) −4765.33 + 2751.27i −0.164299 + 0.0948581i
\(945\) −36382.8 21005.6i −1.25242 0.723083i
\(946\) 2719.66 4710.59i 0.0934713 0.161897i
\(947\) 43168.8 + 24923.5i 1.48131 + 0.855234i 0.999775 0.0211944i \(-0.00674689\pi\)
0.481533 + 0.876428i \(0.340080\pi\)
\(948\) 16549.7i 0.566993i
\(949\) −1836.01 + 1060.02i −0.0628023 + 0.0362589i
\(950\) 9528.99 16504.7i 0.325433 0.563666i
\(951\) 35685.1 1.21679
\(952\) 11461.7 0.390205
\(953\) −9970.31 + 17269.1i −0.338898 + 0.586989i −0.984226 0.176917i \(-0.943388\pi\)
0.645328 + 0.763906i \(0.276721\pi\)
\(954\) 42129.2i 1.42975i
\(955\) −7094.17 12287.5i −0.240379 0.416349i
\(956\) 2276.75i 0.0770243i
\(957\) 35044.3 20232.9i 1.18372 0.683422i
\(958\) 31099.9 + 53866.7i 1.04884 + 1.81665i
\(959\) −1450.13 2511.70i −0.0488291 0.0845744i
\(960\) 32232.0 + 18609.1i 1.08363 + 0.625633i
\(961\) 12451.3 0.417954
\(962\) 4741.58 988.644i 0.158913 0.0331343i
\(963\) 23782.4 0.795824
\(964\) 33053.3 + 19083.3i 1.10433 + 0.637585i
\(965\) 18287.6 + 31675.1i 0.610051 + 1.05664i
\(966\) −17886.6 30980.5i −0.595747 1.03186i
\(967\) 21293.1 12293.6i 0.708106 0.408825i −0.102253 0.994758i \(-0.532605\pi\)
0.810359 + 0.585933i \(0.199272\pi\)
\(968\) 73382.6i 2.43658i
\(969\) 3233.58 + 5600.72i 0.107201 + 0.185677i
\(970\) 25737.8i 0.851951i
\(971\) 19294.0 33418.2i 0.637666 1.10447i −0.348277 0.937391i \(-0.613233\pi\)
0.985944 0.167079i \(-0.0534334\pi\)
\(972\) 47441.3 1.56551
\(973\) −8364.96 −0.275610
\(974\) 32670.8 56587.5i 1.07479 1.86158i
\(975\) 645.058 372.424i 0.0211881 0.0122329i
\(976\) 5207.58i 0.170790i
\(977\) −35406.8 20442.1i −1.15943 0.669398i −0.208264 0.978073i \(-0.566781\pi\)
−0.951168 + 0.308674i \(0.900115\pi\)
\(978\) −2076.74 + 3597.01i −0.0679005 + 0.117607i
\(979\) 4824.54 + 2785.45i 0.157500 + 0.0909329i
\(980\) −20908.7 + 12071.7i −0.681535 + 0.393484i
\(981\) −72.0238 + 41.5830i −0.00234408 + 0.00135336i
\(982\) −47042.0 27159.7i −1.52869 0.882587i
\(983\) −9945.97 + 17226.9i −0.322713 + 0.558956i −0.981047 0.193771i \(-0.937928\pi\)
0.658334 + 0.752726i \(0.271262\pi\)
\(984\) 27801.2 + 16051.0i 0.900681 + 0.520009i
\(985\) 33899.9i 1.09659i
\(986\) 14228.6 8214.88i 0.459564 0.265330i
\(987\) −23334.9 + 40417.2i −0.752540 + 1.30344i
\(988\) −5722.27 −0.184261
\(989\) −1794.32 −0.0576906
\(990\) −27885.4 + 48299.0i −0.895210 + 1.55055i
\(991\) 14693.8i 0.471004i 0.971874 + 0.235502i \(0.0756735\pi\)
−0.971874 + 0.235502i \(0.924327\pi\)
\(992\) −9888.74 17127.8i −0.316500 0.548194i
\(993\) 25553.0i 0.816617i
\(994\) −71980.4 + 41557.9i −2.29686 + 1.32609i
\(995\) −33907.7 58729.8i −1.08035 1.87122i
\(996\) 12145.6 + 21036.9i 0.386395 + 0.669256i
\(997\) −40790.2 23550.3i −1.29573 0.748088i −0.316064 0.948738i \(-0.602361\pi\)
−0.979663 + 0.200650i \(0.935695\pi\)
\(998\) 30114.3 0.955161
\(999\) −32428.2 + 6761.44i −1.02701 + 0.214137i
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 37.4.e.a.27.1 yes 16
3.2 odd 2 333.4.s.c.64.8 16
37.11 even 6 inner 37.4.e.a.11.1 16
37.14 odd 12 1369.4.a.g.1.1 16
37.23 odd 12 1369.4.a.g.1.16 16
111.11 odd 6 333.4.s.c.307.8 16
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
37.4.e.a.11.1 16 37.11 even 6 inner
37.4.e.a.27.1 yes 16 1.1 even 1 trivial
333.4.s.c.64.8 16 3.2 odd 2
333.4.s.c.307.8 16 111.11 odd 6
1369.4.a.g.1.1 16 37.14 odd 12
1369.4.a.g.1.16 16 37.23 odd 12