Properties

Label 242.4.c.r.27.2
Level $242$
Weight $4$
Character 242.27
Analytic conductor $14.278$
Analytic rank $0$
Dimension $8$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [242,4,Mod(3,242)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(242, base_ring=CyclotomicField(10))
 
chi = DirichletCharacter(H, H._module([8]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("242.3");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 242 = 2 \cdot 11^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 242.c (of order \(5\), degree \(4\), 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: \(14.2784622214\)
Analytic rank: \(0\)
Dimension: \(8\)
Relative dimension: \(2\) over \(\Q(\zeta_{5})\)
Coefficient field: \(\mathbb{Q}[x]/(x^{8} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} - x^{7} + 71x^{6} - 141x^{5} + 2911x^{4} + 2710x^{3} + 75340x^{2} + 169400x + 5856400 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 1 \)
Twist minimal: no (minimal twist has level 22)
Sato-Tate group: $\mathrm{SU}(2)[C_{5}]$

Embedding invariants

Embedding label 27.2
Root \(-4.79501 + 3.48378i\) of defining polynomial
Character \(\chi\) \(=\) 242.27
Dual form 242.4.c.r.9.2

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-0.618034 - 1.90211i) q^{2} +(3.48599 + 2.53272i) q^{3} +(-3.23607 + 2.35114i) q^{4} +(-2.49134 + 7.66756i) q^{5} +(2.66306 - 8.19605i) q^{6} +(21.0985 - 15.3289i) q^{7} +(6.47214 + 4.70228i) q^{8} +(-2.60601 - 8.02046i) q^{9} +O(q^{10})\) \(q+(-0.618034 - 1.90211i) q^{2} +(3.48599 + 2.53272i) q^{3} +(-3.23607 + 2.35114i) q^{4} +(-2.49134 + 7.66756i) q^{5} +(2.66306 - 8.19605i) q^{6} +(21.0985 - 15.3289i) q^{7} +(6.47214 + 4.70228i) q^{8} +(-2.60601 - 8.02046i) q^{9} +16.1243 q^{10} -17.2357 q^{12} +(-1.00858 - 3.10408i) q^{13} +(-42.1970 - 30.6579i) q^{14} +(-28.1046 + 20.4192i) q^{15} +(4.94427 - 15.2169i) q^{16} +(-6.44970 + 19.8501i) q^{17} +(-13.6452 + 9.91384i) q^{18} +(101.912 + 74.0431i) q^{19} +(-9.96536 - 30.6702i) q^{20} +112.373 q^{21} +97.8394 q^{23} +(10.6522 + 32.7842i) q^{24} +(48.5425 + 35.2682i) q^{25} +(-5.28097 + 3.83685i) q^{26} +(47.1804 - 145.206i) q^{27} +(-32.2356 + 99.2110i) q^{28} +(213.446 - 155.078i) q^{29} +(56.2091 + 40.8383i) q^{30} +(61.6067 + 189.606i) q^{31} -32.0000 q^{32} +41.7433 q^{34} +(64.9720 + 199.963i) q^{35} +(27.2905 + 19.8277i) q^{36} +(-295.812 + 214.920i) q^{37} +(77.8535 - 239.609i) q^{38} +(4.34587 - 13.3752i) q^{39} +(-52.1793 + 37.9105i) q^{40} +(-221.454 - 160.896i) q^{41} +(-69.4503 - 213.746i) q^{42} +388.059 q^{43} +67.9898 q^{45} +(-60.4681 - 186.102i) q^{46} +(41.9509 + 30.4791i) q^{47} +(55.7758 - 40.5235i) q^{48} +(104.176 - 320.622i) q^{49} +(37.0831 - 114.130i) q^{50} +(-72.7584 + 52.8621i) q^{51} +(10.5619 + 7.67370i) q^{52} +(-127.477 - 392.334i) q^{53} -305.358 q^{54} +208.633 q^{56} +(167.732 + 516.227i) q^{57} +(-426.893 - 310.156i) q^{58} +(-21.2637 + 15.4490i) q^{59} +(42.9399 - 132.156i) q^{60} +(50.7248 - 156.115i) q^{61} +(322.577 - 234.366i) q^{62} +(-177.928 - 129.272i) q^{63} +(19.7771 + 60.8676i) q^{64} +26.3134 q^{65} +276.961 q^{67} +(-25.7988 - 79.4005i) q^{68} +(341.067 + 247.800i) q^{69} +(340.198 - 247.168i) q^{70} +(-159.740 + 491.629i) q^{71} +(20.8481 - 64.1637i) q^{72} +(195.430 - 141.988i) q^{73} +(591.623 + 429.840i) q^{74} +(79.8941 + 245.889i) q^{75} -503.879 q^{76} -28.1271 q^{78} +(-84.3987 - 259.752i) q^{79} +(104.359 + 75.8210i) q^{80} +(348.026 - 252.856i) q^{81} +(-169.176 + 520.670i) q^{82} +(22.4328 - 69.0410i) q^{83} +(-363.647 + 264.205i) q^{84} +(-136.134 - 98.9069i) q^{85} +(-239.834 - 738.132i) q^{86} +1136.84 q^{87} -1194.73 q^{89} +(-42.0200 - 129.324i) q^{90} +(-68.8616 - 50.0309i) q^{91} +(-316.615 + 230.034i) q^{92} +(-265.458 + 816.997i) q^{93} +(32.0476 - 98.6324i) q^{94} +(-821.626 + 596.947i) q^{95} +(-111.552 - 81.0470i) q^{96} +(452.286 + 1391.99i) q^{97} -674.244 q^{98} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q + 4 q^{2} - 7 q^{3} - 8 q^{4} - 30 q^{5} - 6 q^{6} + 4 q^{7} + 16 q^{8} - 81 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q + 4 q^{2} - 7 q^{3} - 8 q^{4} - 30 q^{5} - 6 q^{6} + 4 q^{7} + 16 q^{8} - 81 q^{9} - 100 q^{10} + 32 q^{12} - 48 q^{13} - 8 q^{14} - 279 q^{15} - 32 q^{16} - 109 q^{17} + 42 q^{18} + 288 q^{19} - 120 q^{20} - 50 q^{21} + 628 q^{23} - 24 q^{24} + 38 q^{25} - 14 q^{26} + 242 q^{27} - 4 q^{28} + 528 q^{29} + 558 q^{30} - 522 q^{31} - 256 q^{32} + 208 q^{34} - 17 q^{35} - 84 q^{36} - 406 q^{37} + 544 q^{38} - 1429 q^{39} - 40 q^{40} - 329 q^{41} - 1480 q^{42} + 1442 q^{43} + 2652 q^{45} + 1044 q^{46} + 666 q^{47} - 112 q^{48} - 114 q^{49} + 34 q^{50} + 1158 q^{51} + 28 q^{52} + 414 q^{53} - 1144 q^{54} + 48 q^{56} - 593 q^{57} - 1056 q^{58} - 888 q^{59} + 844 q^{60} - 302 q^{61} - 646 q^{62} - 2061 q^{63} - 128 q^{64} - 138 q^{65} + 578 q^{67} - 436 q^{68} + 1930 q^{69} + 1394 q^{70} + 1090 q^{71} + 648 q^{72} + 253 q^{73} + 812 q^{74} + 2763 q^{75} - 128 q^{76} - 4152 q^{78} - 674 q^{79} + 80 q^{80} - 230 q^{81} - 722 q^{82} - 428 q^{83} - 2860 q^{84} + 1046 q^{85} - 984 q^{86} + 2122 q^{87} - 2202 q^{89} + 1366 q^{90} - 2217 q^{91} + 832 q^{92} - 3721 q^{93} + 2138 q^{94} - 973 q^{95} + 224 q^{96} + 3012 q^{97} - 3292 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/242\mathbb{Z}\right)^\times\).

\(n\) \(123\)
\(\chi(n)\) \(e\left(\frac{2}{5}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −0.618034 1.90211i −0.218508 0.672499i
\(3\) 3.48599 + 2.53272i 0.670879 + 0.487422i 0.870319 0.492488i \(-0.163912\pi\)
−0.199440 + 0.979910i \(0.563912\pi\)
\(4\) −3.23607 + 2.35114i −0.404508 + 0.293893i
\(5\) −2.49134 + 7.66756i −0.222832 + 0.685807i 0.775672 + 0.631136i \(0.217411\pi\)
−0.998504 + 0.0546712i \(0.982589\pi\)
\(6\) 2.66306 8.19605i 0.181198 0.557671i
\(7\) 21.0985 15.3289i 1.13921 0.827685i 0.152202 0.988349i \(-0.451364\pi\)
0.987009 + 0.160665i \(0.0513637\pi\)
\(8\) 6.47214 + 4.70228i 0.286031 + 0.207813i
\(9\) −2.60601 8.02046i −0.0965188 0.297054i
\(10\) 16.1243 0.509895
\(11\) 0 0
\(12\) −17.2357 −0.414626
\(13\) −1.00858 3.10408i −0.0215176 0.0662243i 0.939721 0.341942i \(-0.111085\pi\)
−0.961239 + 0.275717i \(0.911085\pi\)
\(14\) −42.1970 30.6579i −0.805544 0.585262i
\(15\) −28.1046 + 20.4192i −0.483771 + 0.351480i
\(16\) 4.94427 15.2169i 0.0772542 0.237764i
\(17\) −6.44970 + 19.8501i −0.0920166 + 0.283198i −0.986465 0.163974i \(-0.947569\pi\)
0.894448 + 0.447172i \(0.147569\pi\)
\(18\) −13.6452 + 9.91384i −0.178678 + 0.129817i
\(19\) 101.912 + 74.0431i 1.23053 + 0.894035i 0.996930 0.0782975i \(-0.0249484\pi\)
0.233603 + 0.972332i \(0.424948\pi\)
\(20\) −9.96536 30.6702i −0.111416 0.342904i
\(21\) 112.373 1.16770
\(22\) 0 0
\(23\) 97.8394 0.886997 0.443498 0.896275i \(-0.353737\pi\)
0.443498 + 0.896275i \(0.353737\pi\)
\(24\) 10.6522 + 32.7842i 0.0905991 + 0.278835i
\(25\) 48.5425 + 35.2682i 0.388340 + 0.282145i
\(26\) −5.28097 + 3.83685i −0.0398340 + 0.0289411i
\(27\) 47.1804 145.206i 0.336291 1.03500i
\(28\) −32.2356 + 99.2110i −0.217570 + 0.669611i
\(29\) 213.446 155.078i 1.36676 0.993008i 0.368776 0.929518i \(-0.379777\pi\)
0.997982 0.0634903i \(-0.0202232\pi\)
\(30\) 56.2091 + 40.8383i 0.342078 + 0.248534i
\(31\) 61.6067 + 189.606i 0.356932 + 1.09852i 0.954881 + 0.296990i \(0.0959827\pi\)
−0.597949 + 0.801534i \(0.704017\pi\)
\(32\) −32.0000 −0.176777
\(33\) 0 0
\(34\) 41.7433 0.210557
\(35\) 64.9720 + 199.963i 0.313779 + 0.965714i
\(36\) 27.2905 + 19.8277i 0.126345 + 0.0917948i
\(37\) −295.812 + 214.920i −1.31436 + 0.954935i −0.314371 + 0.949300i \(0.601794\pi\)
−0.999984 + 0.00563504i \(0.998206\pi\)
\(38\) 77.8535 239.609i 0.332356 1.02289i
\(39\) 4.34587 13.3752i 0.0178435 0.0549166i
\(40\) −52.1793 + 37.9105i −0.206257 + 0.149854i
\(41\) −221.454 160.896i −0.843545 0.612871i 0.0798140 0.996810i \(-0.474567\pi\)
−0.923359 + 0.383939i \(0.874567\pi\)
\(42\) −69.4503 213.746i −0.255153 0.785279i
\(43\) 388.059 1.37624 0.688121 0.725596i \(-0.258436\pi\)
0.688121 + 0.725596i \(0.258436\pi\)
\(44\) 0 0
\(45\) 67.9898 0.225229
\(46\) −60.4681 186.102i −0.193816 0.596504i
\(47\) 41.9509 + 30.4791i 0.130195 + 0.0945922i 0.650977 0.759098i \(-0.274359\pi\)
−0.520782 + 0.853690i \(0.674359\pi\)
\(48\) 55.7758 40.5235i 0.167720 0.121856i
\(49\) 104.176 320.622i 0.303721 0.934758i
\(50\) 37.0831 114.130i 0.104887 0.322809i
\(51\) −72.7584 + 52.8621i −0.199769 + 0.145141i
\(52\) 10.5619 + 7.67370i 0.0281669 + 0.0204644i
\(53\) −127.477 392.334i −0.330383 1.01682i −0.968952 0.247250i \(-0.920473\pi\)
0.638568 0.769565i \(-0.279527\pi\)
\(54\) −305.358 −0.769517
\(55\) 0 0
\(56\) 208.633 0.497853
\(57\) 167.732 + 516.227i 0.389766 + 1.19958i
\(58\) −426.893 310.156i −0.966444 0.702163i
\(59\) −21.2637 + 15.4490i −0.0469203 + 0.0340896i −0.610998 0.791632i \(-0.709232\pi\)
0.564078 + 0.825722i \(0.309232\pi\)
\(60\) 42.9399 132.156i 0.0923920 0.284353i
\(61\) 50.7248 156.115i 0.106470 0.327680i −0.883603 0.468237i \(-0.844889\pi\)
0.990073 + 0.140557i \(0.0448894\pi\)
\(62\) 322.577 234.366i 0.660763 0.480073i
\(63\) −177.928 129.272i −0.355823 0.258520i
\(64\) 19.7771 + 60.8676i 0.0386271 + 0.118882i
\(65\) 26.3134 0.0502119
\(66\) 0 0
\(67\) 276.961 0.505017 0.252508 0.967595i \(-0.418744\pi\)
0.252508 + 0.967595i \(0.418744\pi\)
\(68\) −25.7988 79.4005i −0.0460083 0.141599i
\(69\) 341.067 + 247.800i 0.595067 + 0.432342i
\(70\) 340.198 247.168i 0.580878 0.422032i
\(71\) −159.740 + 491.629i −0.267009 + 0.821770i 0.724214 + 0.689575i \(0.242203\pi\)
−0.991224 + 0.132195i \(0.957797\pi\)
\(72\) 20.8481 64.1637i 0.0341245 0.105025i
\(73\) 195.430 141.988i 0.313334 0.227650i −0.419992 0.907528i \(-0.637967\pi\)
0.733326 + 0.679878i \(0.237967\pi\)
\(74\) 591.623 + 429.840i 0.929390 + 0.675241i
\(75\) 79.8941 + 245.889i 0.123005 + 0.378571i
\(76\) −503.879 −0.760511
\(77\) 0 0
\(78\) −28.1271 −0.0408303
\(79\) −84.3987 259.752i −0.120197 0.369929i 0.872798 0.488081i \(-0.162303\pi\)
−0.992996 + 0.118152i \(0.962303\pi\)
\(80\) 104.359 + 75.8210i 0.145846 + 0.105963i
\(81\) 348.026 252.856i 0.477402 0.346853i
\(82\) −169.176 + 520.670i −0.227834 + 0.701200i
\(83\) 22.4328 69.0410i 0.0296665 0.0913040i −0.935127 0.354313i \(-0.884715\pi\)
0.964793 + 0.263009i \(0.0847148\pi\)
\(84\) −363.647 + 264.205i −0.472346 + 0.343180i
\(85\) −136.134 98.9069i −0.173715 0.126211i
\(86\) −239.834 738.132i −0.300720 0.925521i
\(87\) 1136.84 1.40094
\(88\) 0 0
\(89\) −1194.73 −1.42294 −0.711470 0.702717i \(-0.751970\pi\)
−0.711470 + 0.702717i \(0.751970\pi\)
\(90\) −42.0200 129.324i −0.0492144 0.151466i
\(91\) −68.8616 50.0309i −0.0793259 0.0576337i
\(92\) −316.615 + 230.034i −0.358798 + 0.260682i
\(93\) −265.458 + 816.997i −0.295987 + 0.910953i
\(94\) 32.0476 98.6324i 0.0351645 0.108225i
\(95\) −821.626 + 596.947i −0.887338 + 0.644689i
\(96\) −111.552 81.0470i −0.118596 0.0861649i
\(97\) 452.286 + 1391.99i 0.473430 + 1.45707i 0.848064 + 0.529894i \(0.177768\pi\)
−0.374634 + 0.927173i \(0.622232\pi\)
\(98\) −674.244 −0.694989
\(99\) 0 0
\(100\) −240.007 −0.240007
\(101\) −278.144 856.040i −0.274023 0.843358i −0.989476 0.144696i \(-0.953779\pi\)
0.715453 0.698661i \(-0.246221\pi\)
\(102\) 145.517 + 105.724i 0.141258 + 0.102630i
\(103\) 337.462 245.180i 0.322826 0.234547i −0.414554 0.910025i \(-0.636063\pi\)
0.737380 + 0.675478i \(0.236063\pi\)
\(104\) 8.06861 24.8326i 0.00760762 0.0234138i
\(105\) −279.959 + 861.626i −0.260202 + 0.800820i
\(106\) −667.478 + 484.952i −0.611615 + 0.444365i
\(107\) −874.051 635.035i −0.789698 0.573749i 0.118176 0.992993i \(-0.462295\pi\)
−0.907874 + 0.419244i \(0.862295\pi\)
\(108\) 188.721 + 580.825i 0.168146 + 0.517499i
\(109\) −1472.08 −1.29358 −0.646789 0.762669i \(-0.723888\pi\)
−0.646789 + 0.762669i \(0.723888\pi\)
\(110\) 0 0
\(111\) −1575.53 −1.34723
\(112\) −128.942 396.844i −0.108785 0.334806i
\(113\) 102.325 + 74.3434i 0.0851851 + 0.0618906i 0.629563 0.776950i \(-0.283234\pi\)
−0.544378 + 0.838840i \(0.683234\pi\)
\(114\) 878.258 638.092i 0.721547 0.524235i
\(115\) −243.751 + 750.189i −0.197652 + 0.608309i
\(116\) −326.117 + 1003.69i −0.261028 + 0.803361i
\(117\) −22.2678 + 16.1785i −0.0175954 + 0.0127838i
\(118\) 42.5274 + 30.8980i 0.0331777 + 0.0241050i
\(119\) 168.203 + 517.675i 0.129572 + 0.398783i
\(120\) −277.913 −0.211416
\(121\) 0 0
\(122\) −328.298 −0.243629
\(123\) −364.483 1121.76i −0.267189 0.822324i
\(124\) −645.154 468.732i −0.467230 0.339463i
\(125\) −1206.66 + 876.689i −0.863414 + 0.627307i
\(126\) −135.925 + 418.334i −0.0961044 + 0.295779i
\(127\) 328.653 1011.49i 0.229632 0.706735i −0.768156 0.640262i \(-0.778826\pi\)
0.997788 0.0664723i \(-0.0211744\pi\)
\(128\) 103.554 75.2365i 0.0715077 0.0519534i
\(129\) 1352.77 + 982.844i 0.923292 + 0.670811i
\(130\) −16.2626 50.0511i −0.0109717 0.0337674i
\(131\) −1525.04 −1.01713 −0.508563 0.861025i \(-0.669823\pi\)
−0.508563 + 0.861025i \(0.669823\pi\)
\(132\) 0 0
\(133\) 3285.18 2.14182
\(134\) −171.171 526.810i −0.110350 0.339623i
\(135\) 995.835 + 723.516i 0.634873 + 0.461262i
\(136\) −135.084 + 98.1444i −0.0851719 + 0.0618810i
\(137\) −642.394 + 1977.09i −0.400609 + 1.23295i 0.523897 + 0.851781i \(0.324478\pi\)
−0.924506 + 0.381166i \(0.875522\pi\)
\(138\) 260.552 801.897i 0.160722 0.494652i
\(139\) −1219.55 + 886.054i −0.744178 + 0.540677i −0.894017 0.448033i \(-0.852125\pi\)
0.149839 + 0.988710i \(0.452125\pi\)
\(140\) −680.396 494.337i −0.410743 0.298422i
\(141\) 69.0453 + 212.500i 0.0412387 + 0.126920i
\(142\) 1033.86 0.610983
\(143\) 0 0
\(144\) −134.931 −0.0780853
\(145\) 657.301 + 2022.96i 0.376454 + 1.15861i
\(146\) −390.860 283.976i −0.221560 0.160973i
\(147\) 1175.20 853.836i 0.659382 0.479069i
\(148\) 451.960 1390.99i 0.251020 0.772559i
\(149\) −132.830 + 408.809i −0.0730327 + 0.224772i −0.980909 0.194466i \(-0.937703\pi\)
0.907877 + 0.419238i \(0.137703\pi\)
\(150\) 418.331 303.935i 0.227711 0.165441i
\(151\) −721.386 524.117i −0.388778 0.282464i 0.376176 0.926548i \(-0.377239\pi\)
−0.764955 + 0.644084i \(0.777239\pi\)
\(152\) 311.414 + 958.434i 0.166178 + 0.511443i
\(153\) 176.015 0.0930064
\(154\) 0 0
\(155\) −1607.30 −0.832912
\(156\) 17.3835 + 53.5009i 0.00892175 + 0.0274583i
\(157\) −437.703 318.010i −0.222500 0.161656i 0.470951 0.882159i \(-0.343911\pi\)
−0.693451 + 0.720503i \(0.743911\pi\)
\(158\) −441.917 + 321.072i −0.222513 + 0.161665i
\(159\) 549.288 1690.54i 0.273971 0.843196i
\(160\) 79.7229 245.362i 0.0393916 0.121235i
\(161\) 2064.26 1499.77i 1.01048 0.734154i
\(162\) −696.052 505.712i −0.337574 0.245262i
\(163\) −904.676 2784.31i −0.434722 1.33794i −0.893371 0.449320i \(-0.851666\pi\)
0.458649 0.888618i \(-0.348334\pi\)
\(164\) 1094.93 0.521339
\(165\) 0 0
\(166\) −145.188 −0.0678842
\(167\) 537.761 + 1655.06i 0.249181 + 0.766900i 0.994921 + 0.100663i \(0.0320963\pi\)
−0.745740 + 0.666237i \(0.767904\pi\)
\(168\) 727.293 + 528.409i 0.333999 + 0.242665i
\(169\) 1768.79 1285.10i 0.805094 0.584935i
\(170\) −103.997 + 320.069i −0.0469188 + 0.144401i
\(171\) 328.278 1010.34i 0.146807 0.451826i
\(172\) −1255.79 + 912.381i −0.556702 + 0.404468i
\(173\) 235.263 + 170.929i 0.103392 + 0.0751183i 0.638280 0.769804i \(-0.279646\pi\)
−0.534888 + 0.844923i \(0.679646\pi\)
\(174\) −702.606 2162.40i −0.306117 0.942133i
\(175\) 1564.80 0.675928
\(176\) 0 0
\(177\) −113.253 −0.0480939
\(178\) 738.387 + 2272.52i 0.310924 + 0.956925i
\(179\) −2103.71 1528.43i −0.878427 0.638215i 0.0544079 0.998519i \(-0.482673\pi\)
−0.932835 + 0.360304i \(0.882673\pi\)
\(180\) −220.020 + 159.854i −0.0911072 + 0.0661933i
\(181\) 573.483 1765.00i 0.235506 0.724814i −0.761548 0.648109i \(-0.775560\pi\)
0.997054 0.0767047i \(-0.0244399\pi\)
\(182\) −52.6056 + 161.903i −0.0214252 + 0.0659400i
\(183\) 572.222 415.743i 0.231147 0.167938i
\(184\) 633.230 + 460.069i 0.253708 + 0.184330i
\(185\) −910.942 2803.59i −0.362021 1.11418i
\(186\) 1718.08 0.677290
\(187\) 0 0
\(188\) −207.417 −0.0804649
\(189\) −1230.42 3786.85i −0.473546 1.45742i
\(190\) 1643.25 + 1193.89i 0.627443 + 0.455864i
\(191\) −1239.54 + 900.578i −0.469581 + 0.341171i −0.797278 0.603612i \(-0.793727\pi\)
0.327697 + 0.944783i \(0.393727\pi\)
\(192\) −85.2179 + 262.274i −0.0320316 + 0.0985832i
\(193\) 324.955 1000.11i 0.121196 0.373002i −0.871993 0.489518i \(-0.837173\pi\)
0.993189 + 0.116516i \(0.0371728\pi\)
\(194\) 2368.20 1720.60i 0.876427 0.636762i
\(195\) 91.7282 + 66.6445i 0.0336861 + 0.0244744i
\(196\) 416.706 + 1282.49i 0.151861 + 0.467379i
\(197\) −1577.77 −0.570616 −0.285308 0.958436i \(-0.592096\pi\)
−0.285308 + 0.958436i \(0.592096\pi\)
\(198\) 0 0
\(199\) 3760.53 1.33958 0.669791 0.742550i \(-0.266384\pi\)
0.669791 + 0.742550i \(0.266384\pi\)
\(200\) 148.333 + 456.521i 0.0524435 + 0.161404i
\(201\) 965.482 + 701.463i 0.338805 + 0.246156i
\(202\) −1456.38 + 1058.12i −0.507280 + 0.368561i
\(203\) 2126.21 6543.81i 0.735128 2.26249i
\(204\) 111.165 342.130i 0.0381525 0.117421i
\(205\) 1785.40 1297.17i 0.608280 0.441942i
\(206\) −674.923 490.360i −0.228272 0.165850i
\(207\) −254.970 784.717i −0.0856118 0.263486i
\(208\) −52.2211 −0.0174081
\(209\) 0 0
\(210\) 1811.93 0.595407
\(211\) 438.984 + 1351.05i 0.143227 + 0.440807i 0.996779 0.0802009i \(-0.0255562\pi\)
−0.853552 + 0.521008i \(0.825556\pi\)
\(212\) 1334.96 + 969.903i 0.432477 + 0.314213i
\(213\) −1802.01 + 1309.24i −0.579680 + 0.421162i
\(214\) −667.715 + 2055.02i −0.213290 + 0.656440i
\(215\) −966.787 + 2975.46i −0.306671 + 0.943837i
\(216\) 988.158 717.939i 0.311276 0.226155i
\(217\) 4206.27 + 3056.03i 1.31585 + 0.956023i
\(218\) 909.797 + 2800.07i 0.282657 + 0.869929i
\(219\) 1040.88 0.321171
\(220\) 0 0
\(221\) 68.1213 0.0207346
\(222\) 973.730 + 2996.83i 0.294380 + 0.906010i
\(223\) −4252.57 3089.67i −1.27701 0.927802i −0.277551 0.960711i \(-0.589523\pi\)
−0.999458 + 0.0329091i \(0.989523\pi\)
\(224\) −675.151 + 490.526i −0.201386 + 0.146315i
\(225\) 156.365 481.242i 0.0463304 0.142590i
\(226\) 78.1693 240.580i 0.0230077 0.0708105i
\(227\) −2254.14 + 1637.73i −0.659087 + 0.478855i −0.866355 0.499429i \(-0.833543\pi\)
0.207267 + 0.978284i \(0.433543\pi\)
\(228\) −1756.52 1276.18i −0.510211 0.370690i
\(229\) 1385.20 + 4263.19i 0.399722 + 1.23022i 0.925223 + 0.379424i \(0.123878\pi\)
−0.525501 + 0.850793i \(0.676122\pi\)
\(230\) 1577.59 0.452275
\(231\) 0 0
\(232\) 2110.67 0.597296
\(233\) 97.5299 + 300.166i 0.0274223 + 0.0843971i 0.963831 0.266514i \(-0.0858719\pi\)
−0.936409 + 0.350911i \(0.885872\pi\)
\(234\) 44.5356 + 32.3570i 0.0124418 + 0.00903950i
\(235\) −338.214 + 245.727i −0.0938837 + 0.0682105i
\(236\) 32.4881 99.9880i 0.00896099 0.0275791i
\(237\) 363.667 1119.25i 0.0996739 0.306765i
\(238\) 880.721 639.881i 0.239868 0.174274i
\(239\) −652.377 473.980i −0.176564 0.128281i 0.495993 0.868326i \(-0.334804\pi\)
−0.672557 + 0.740045i \(0.734804\pi\)
\(240\) 171.760 + 528.622i 0.0461960 + 0.142177i
\(241\) −1009.91 −0.269935 −0.134967 0.990850i \(-0.543093\pi\)
−0.134967 + 0.990850i \(0.543093\pi\)
\(242\) 0 0
\(243\) −2268.70 −0.598919
\(244\) 202.899 + 624.460i 0.0532348 + 0.163840i
\(245\) 2198.85 + 1597.56i 0.573385 + 0.416589i
\(246\) −1908.46 + 1386.57i −0.494629 + 0.359369i
\(247\) 127.050 391.020i 0.0327287 0.100729i
\(248\) −492.854 + 1516.85i −0.126195 + 0.388387i
\(249\) 253.062 183.860i 0.0644062 0.0467938i
\(250\) 2413.32 + 1753.38i 0.610526 + 0.443573i
\(251\) −984.913 3031.25i −0.247678 0.762274i −0.995184 0.0980198i \(-0.968749\pi\)
0.747507 0.664254i \(-0.231251\pi\)
\(252\) 879.724 0.219910
\(253\) 0 0
\(254\) −2127.09 −0.525455
\(255\) −224.057 689.577i −0.0550235 0.169345i
\(256\) −207.108 150.473i −0.0505636 0.0367366i
\(257\) −2057.65 + 1494.97i −0.499426 + 0.362854i −0.808798 0.588087i \(-0.799881\pi\)
0.309372 + 0.950941i \(0.399881\pi\)
\(258\) 1033.42 3180.55i 0.249373 0.767490i
\(259\) −2946.68 + 9068.96i −0.706942 + 2.17574i
\(260\) −85.1519 + 61.8665i −0.0203112 + 0.0147569i
\(261\) −1800.04 1307.81i −0.426895 0.310158i
\(262\) 942.528 + 2900.80i 0.222250 + 0.684016i
\(263\) 2992.29 0.701568 0.350784 0.936456i \(-0.385915\pi\)
0.350784 + 0.936456i \(0.385915\pi\)
\(264\) 0 0
\(265\) 3325.83 0.770960
\(266\) −2030.35 6248.79i −0.468004 1.44037i
\(267\) −4164.83 3025.93i −0.954620 0.693572i
\(268\) −896.263 + 651.173i −0.204284 + 0.148421i
\(269\) −253.804 + 781.130i −0.0575269 + 0.177050i −0.975691 0.219151i \(-0.929671\pi\)
0.918164 + 0.396200i \(0.129671\pi\)
\(270\) 760.750 2341.35i 0.171473 0.527740i
\(271\) −5209.86 + 3785.18i −1.16781 + 0.848463i −0.990745 0.135736i \(-0.956660\pi\)
−0.177064 + 0.984199i \(0.556660\pi\)
\(272\) 270.168 + 196.289i 0.0602256 + 0.0437565i
\(273\) −113.337 348.814i −0.0251262 0.0773304i
\(274\) 4157.66 0.916692
\(275\) 0 0
\(276\) −1686.33 −0.367772
\(277\) 158.979 + 489.286i 0.0344841 + 0.106131i 0.966817 0.255470i \(-0.0822302\pi\)
−0.932333 + 0.361601i \(0.882230\pi\)
\(278\) 2439.10 + 1772.11i 0.526213 + 0.382316i
\(279\) 1360.18 988.229i 0.291871 0.212056i
\(280\) −519.776 + 1599.71i −0.110938 + 0.341431i
\(281\) 2397.56 7378.94i 0.508992 1.56652i −0.284963 0.958539i \(-0.591981\pi\)
0.793955 0.607977i \(-0.208019\pi\)
\(282\) 361.526 262.664i 0.0763424 0.0554660i
\(283\) 4730.62 + 3437.00i 0.993661 + 0.721937i 0.960720 0.277520i \(-0.0895125\pi\)
0.0329415 + 0.999457i \(0.489513\pi\)
\(284\) −638.960 1966.52i −0.133505 0.410885i
\(285\) −4376.08 −0.909532
\(286\) 0 0
\(287\) −7138.71 −1.46824
\(288\) 83.3922 + 256.655i 0.0170623 + 0.0525123i
\(289\) 3622.27 + 2631.73i 0.737283 + 0.535667i
\(290\) 3441.67 2500.52i 0.696903 0.506330i
\(291\) −1948.86 + 5997.99i −0.392593 + 1.20828i
\(292\) −298.591 + 918.967i −0.0598414 + 0.184173i
\(293\) 6532.40 4746.07i 1.30248 0.946308i 0.302505 0.953148i \(-0.402177\pi\)
0.999977 + 0.00683999i \(0.00217725\pi\)
\(294\) −2350.41 1707.67i −0.466254 0.338753i
\(295\) −65.4809 201.529i −0.0129235 0.0397746i
\(296\) −2925.15 −0.574394
\(297\) 0 0
\(298\) 859.695 0.167117
\(299\) −98.6785 303.701i −0.0190860 0.0587408i
\(300\) −836.662 607.871i −0.161016 0.116985i
\(301\) 8187.45 5948.53i 1.56783 1.13910i
\(302\) −551.090 + 1696.08i −0.105005 + 0.323174i
\(303\) 1198.50 3688.61i 0.227235 0.699356i
\(304\) 1630.59 1184.69i 0.307633 0.223509i
\(305\) 1070.65 + 777.871i 0.201000 + 0.146035i
\(306\) −108.783 334.801i −0.0203227 0.0625467i
\(307\) −4210.64 −0.782781 −0.391391 0.920225i \(-0.628006\pi\)
−0.391391 + 0.920225i \(0.628006\pi\)
\(308\) 0 0
\(309\) 1797.36 0.330900
\(310\) 993.365 + 3057.26i 0.181998 + 0.560132i
\(311\) 1066.98 + 775.203i 0.194542 + 0.141343i 0.680792 0.732476i \(-0.261636\pi\)
−0.486250 + 0.873820i \(0.661636\pi\)
\(312\) 91.0211 66.1307i 0.0165162 0.0119997i
\(313\) −1299.77 + 4000.29i −0.234720 + 0.722395i 0.762438 + 0.647061i \(0.224002\pi\)
−0.997158 + 0.0753335i \(0.975998\pi\)
\(314\) −334.376 + 1029.10i −0.0600952 + 0.184954i
\(315\) 1434.48 1042.21i 0.256584 0.186419i
\(316\) 883.834 + 642.143i 0.157340 + 0.114314i
\(317\) −761.140 2342.55i −0.134858 0.415049i 0.860710 0.509095i \(-0.170020\pi\)
−0.995568 + 0.0940461i \(0.970020\pi\)
\(318\) −3555.07 −0.626913
\(319\) 0 0
\(320\) −515.977 −0.0901376
\(321\) −1438.57 4427.45i −0.250134 0.769832i
\(322\) −4128.52 2999.55i −0.714515 0.519125i
\(323\) −2127.06 + 1545.40i −0.366418 + 0.266218i
\(324\) −531.737 + 1636.52i −0.0911757 + 0.280610i
\(325\) 60.5163 186.250i 0.0103287 0.0317886i
\(326\) −4736.95 + 3441.59i −0.804770 + 0.584700i
\(327\) −5131.66 3728.37i −0.867834 0.630518i
\(328\) −676.704 2082.68i −0.113917 0.350600i
\(329\) 1352.31 0.226612
\(330\) 0 0
\(331\) −3332.42 −0.553373 −0.276687 0.960960i \(-0.589236\pi\)
−0.276687 + 0.960960i \(0.589236\pi\)
\(332\) 89.7311 + 276.164i 0.0148332 + 0.0456520i
\(333\) 2494.64 + 1812.46i 0.410527 + 0.298266i
\(334\) 2815.75 2045.77i 0.461291 0.335148i
\(335\) −690.003 + 2123.61i −0.112534 + 0.346344i
\(336\) 555.602 1709.97i 0.0902101 0.277638i
\(337\) −6733.84 + 4892.42i −1.08847 + 0.790822i −0.979141 0.203183i \(-0.934871\pi\)
−0.109333 + 0.994005i \(0.534871\pi\)
\(338\) −3537.58 2570.21i −0.569288 0.413612i
\(339\) 168.413 + 518.321i 0.0269821 + 0.0830422i
\(340\) 673.082 0.107362
\(341\) 0 0
\(342\) −2124.66 −0.335931
\(343\) 47.3696 + 145.789i 0.00745691 + 0.0229500i
\(344\) 2511.57 + 1824.76i 0.393648 + 0.286002i
\(345\) −2749.73 + 1997.80i −0.429103 + 0.311762i
\(346\) 179.725 553.137i 0.0279251 0.0859446i
\(347\) 1119.41 3445.20i 0.173179 0.532991i −0.826366 0.563133i \(-0.809596\pi\)
0.999546 + 0.0301417i \(0.00959585\pi\)
\(348\) −3678.89 + 2672.87i −0.566694 + 0.411727i
\(349\) −1688.14 1226.51i −0.258923 0.188119i 0.450749 0.892651i \(-0.351157\pi\)
−0.709672 + 0.704532i \(0.751157\pi\)
\(350\) −967.097 2976.42i −0.147696 0.454561i
\(351\) −498.316 −0.0757782
\(352\) 0 0
\(353\) 7582.15 1.14322 0.571611 0.820525i \(-0.306319\pi\)
0.571611 + 0.820525i \(0.306319\pi\)
\(354\) 69.9942 + 215.420i 0.0105089 + 0.0323431i
\(355\) −3371.63 2449.63i −0.504078 0.366234i
\(356\) 3866.24 2808.99i 0.575591 0.418191i
\(357\) −724.772 + 2230.62i −0.107448 + 0.330691i
\(358\) −1607.09 + 4946.11i −0.237255 + 0.730196i
\(359\) −3667.27 + 2664.42i −0.539139 + 0.391707i −0.823765 0.566931i \(-0.808131\pi\)
0.284626 + 0.958639i \(0.408131\pi\)
\(360\) 440.039 + 319.707i 0.0644225 + 0.0468057i
\(361\) 2784.05 + 8568.41i 0.405897 + 1.24922i
\(362\) −3711.66 −0.538896
\(363\) 0 0
\(364\) 340.471 0.0490261
\(365\) 601.820 + 1852.21i 0.0863033 + 0.265614i
\(366\) −1144.44 831.487i −0.163445 0.118750i
\(367\) 2340.53 1700.49i 0.332901 0.241867i −0.408760 0.912642i \(-0.634039\pi\)
0.741661 + 0.670775i \(0.234039\pi\)
\(368\) 483.745 1488.81i 0.0685243 0.210896i
\(369\) −713.348 + 2195.46i −0.100638 + 0.309732i
\(370\) −4769.76 + 3465.43i −0.670183 + 0.486917i
\(371\) −8703.64 6323.56i −1.21798 0.884914i
\(372\) −1061.83 3267.99i −0.147993 0.455477i
\(373\) −3389.46 −0.470508 −0.235254 0.971934i \(-0.575592\pi\)
−0.235254 + 0.971934i \(0.575592\pi\)
\(374\) 0 0
\(375\) −6426.80 −0.885010
\(376\) 128.190 + 394.530i 0.0175822 + 0.0541125i
\(377\) −696.651 506.146i −0.0951707 0.0691455i
\(378\) −6442.58 + 4680.81i −0.876642 + 0.636918i
\(379\) 2491.74 7668.78i 0.337710 1.03936i −0.627662 0.778486i \(-0.715988\pi\)
0.965372 0.260878i \(-0.0840119\pi\)
\(380\) 1255.33 3863.52i 0.169466 0.521564i
\(381\) 3707.51 2693.66i 0.498533 0.362206i
\(382\) 2479.08 + 1801.16i 0.332044 + 0.241244i
\(383\) 1623.73 + 4997.34i 0.216629 + 0.666715i 0.999034 + 0.0439454i \(0.0139928\pi\)
−0.782405 + 0.622770i \(0.786007\pi\)
\(384\) 551.542 0.0732962
\(385\) 0 0
\(386\) −2103.15 −0.277325
\(387\) −1011.28 3112.41i −0.132833 0.408819i
\(388\) −4736.40 3441.20i −0.619728 0.450259i
\(389\) 9169.81 6662.26i 1.19519 0.868354i 0.201384 0.979512i \(-0.435456\pi\)
0.993803 + 0.111158i \(0.0354560\pi\)
\(390\) 70.0741 215.666i 0.00909831 0.0280017i
\(391\) −631.035 + 1942.13i −0.0816184 + 0.251196i
\(392\) 2181.90 1585.24i 0.281129 0.204252i
\(393\) −5316.28 3862.51i −0.682369 0.495770i
\(394\) 975.115 + 3001.09i 0.124684 + 0.383738i
\(395\) 2201.93 0.280484
\(396\) 0 0
\(397\) 9896.10 1.25106 0.625530 0.780200i \(-0.284883\pi\)
0.625530 + 0.780200i \(0.284883\pi\)
\(398\) −2324.13 7152.95i −0.292709 0.900867i
\(399\) 11452.1 + 8320.44i 1.43690 + 1.04397i
\(400\) 776.679 564.291i 0.0970849 0.0705363i
\(401\) −4590.06 + 14126.7i −0.571612 + 1.75924i 0.0758224 + 0.997121i \(0.475842\pi\)
−0.647435 + 0.762121i \(0.724158\pi\)
\(402\) 737.562 2269.98i 0.0915081 0.281633i
\(403\) 526.417 382.464i 0.0650687 0.0472752i
\(404\) 2912.76 + 2116.25i 0.358701 + 0.260612i
\(405\) 1071.74 + 3298.46i 0.131494 + 0.404696i
\(406\) −13761.1 −1.68215
\(407\) 0 0
\(408\) −719.474 −0.0873022
\(409\) 2577.84 + 7933.79i 0.311653 + 0.959170i 0.977110 + 0.212734i \(0.0682367\pi\)
−0.665457 + 0.746436i \(0.731763\pi\)
\(410\) −3570.79 2594.33i −0.430119 0.312500i
\(411\) −7246.78 + 5265.10i −0.869726 + 0.631893i
\(412\) −515.595 + 1586.84i −0.0616543 + 0.189752i
\(413\) −211.815 + 651.900i −0.0252367 + 0.0776705i
\(414\) −1335.04 + 969.964i −0.158487 + 0.115148i
\(415\) 473.488 + 344.009i 0.0560063 + 0.0406910i
\(416\) 32.2744 + 99.3305i 0.00380381 + 0.0117069i
\(417\) −6495.46 −0.762791
\(418\) 0 0
\(419\) −13082.4 −1.52534 −0.762670 0.646788i \(-0.776112\pi\)
−0.762670 + 0.646788i \(0.776112\pi\)
\(420\) −1119.84 3446.50i −0.130101 0.400410i
\(421\) 4494.50 + 3265.45i 0.520306 + 0.378024i 0.816719 0.577036i \(-0.195791\pi\)
−0.296413 + 0.955060i \(0.595791\pi\)
\(422\) 2298.55 1669.99i 0.265146 0.192640i
\(423\) 135.132 415.894i 0.0155328 0.0478049i
\(424\) 1019.82 3138.67i 0.116808 0.359499i
\(425\) −1013.16 + 736.105i −0.115637 + 0.0840149i
\(426\) 3604.02 + 2618.48i 0.409895 + 0.297806i
\(427\) −1322.86 4071.35i −0.149924 0.461420i
\(428\) 4321.55 0.488060
\(429\) 0 0
\(430\) 6257.18 0.701739
\(431\) −111.190 342.207i −0.0124265 0.0382449i 0.944651 0.328077i \(-0.106401\pi\)
−0.957078 + 0.289832i \(0.906401\pi\)
\(432\) −1976.32 1435.88i −0.220106 0.159916i
\(433\) −12109.6 + 8798.13i −1.34399 + 0.976469i −0.344707 + 0.938710i \(0.612022\pi\)
−0.999287 + 0.0377584i \(0.987978\pi\)
\(434\) 3213.30 9889.53i 0.355400 1.09381i
\(435\) −2832.26 + 8716.79i −0.312176 + 0.960777i
\(436\) 4763.76 3461.07i 0.523263 0.380173i
\(437\) 9970.97 + 7244.34i 1.09148 + 0.793006i
\(438\) −643.301 1979.88i −0.0701784 0.215987i
\(439\) 15893.9 1.72796 0.863979 0.503527i \(-0.167965\pi\)
0.863979 + 0.503527i \(0.167965\pi\)
\(440\) 0 0
\(441\) −2843.02 −0.306989
\(442\) −42.1013 129.575i −0.00453067 0.0139440i
\(443\) 2126.47 + 1544.97i 0.228062 + 0.165697i 0.695948 0.718092i \(-0.254984\pi\)
−0.467886 + 0.883789i \(0.654984\pi\)
\(444\) 5098.52 3704.29i 0.544966 0.395941i
\(445\) 2976.49 9160.70i 0.317077 0.975862i
\(446\) −3248.67 + 9998.39i −0.344908 + 1.06152i
\(447\) −1498.44 + 1088.68i −0.158555 + 0.115197i
\(448\) 1350.30 + 981.052i 0.142401 + 0.103461i
\(449\) −400.941 1233.97i −0.0421416 0.129698i 0.927772 0.373147i \(-0.121721\pi\)
−0.969914 + 0.243449i \(0.921721\pi\)
\(450\) −1012.02 −0.106015
\(451\) 0 0
\(452\) −505.922 −0.0526473
\(453\) −1187.30 3654.13i −0.123144 0.378998i
\(454\) 4508.29 + 3275.46i 0.466045 + 0.338602i
\(455\) 555.173 403.357i 0.0572020 0.0415597i
\(456\) −1341.86 + 4129.82i −0.137803 + 0.424115i
\(457\) 695.893 2141.74i 0.0712309 0.219226i −0.909103 0.416571i \(-0.863232\pi\)
0.980334 + 0.197345i \(0.0632318\pi\)
\(458\) 7252.98 5269.60i 0.739977 0.537625i
\(459\) 2578.06 + 1873.07i 0.262165 + 0.190474i
\(460\) −975.005 3000.76i −0.0988258 0.304154i
\(461\) 16772.0 1.69447 0.847233 0.531222i \(-0.178267\pi\)
0.847233 + 0.531222i \(0.178267\pi\)
\(462\) 0 0
\(463\) 7726.06 0.775509 0.387754 0.921763i \(-0.373251\pi\)
0.387754 + 0.921763i \(0.373251\pi\)
\(464\) −1304.47 4014.74i −0.130514 0.401680i
\(465\) −5603.02 4070.84i −0.558783 0.405980i
\(466\) 510.673 371.026i 0.0507650 0.0368829i
\(467\) −2334.79 + 7185.73i −0.231351 + 0.712026i 0.766233 + 0.642562i \(0.222129\pi\)
−0.997585 + 0.0694632i \(0.977871\pi\)
\(468\) 34.0221 104.709i 0.00336042 0.0103423i
\(469\) 5843.45 4245.51i 0.575320 0.417995i
\(470\) 676.428 + 491.454i 0.0663858 + 0.0482321i
\(471\) −720.399 2217.16i −0.0704760 0.216903i
\(472\) −210.267 −0.0205049
\(473\) 0 0
\(474\) −2353.70 −0.228078
\(475\) 2335.68 + 7188.47i 0.225617 + 0.694378i
\(476\) −1761.44 1279.76i −0.169612 0.123231i
\(477\) −2814.49 + 2044.85i −0.270161 + 0.196284i
\(478\) −498.372 + 1533.83i −0.0476883 + 0.146769i
\(479\) 4123.09 12689.6i 0.393296 1.21044i −0.536984 0.843592i \(-0.680437\pi\)
0.930280 0.366849i \(-0.119563\pi\)
\(480\) 899.346 653.413i 0.0855194 0.0621335i
\(481\) 965.476 + 701.460i 0.0915217 + 0.0664944i
\(482\) 624.161 + 1920.97i 0.0589829 + 0.181531i
\(483\) 10994.5 1.03575
\(484\) 0 0
\(485\) −11800.0 −1.10476
\(486\) 1402.13 + 4315.33i 0.130869 + 0.402772i
\(487\) −15225.8 11062.2i −1.41672 1.02931i −0.992301 0.123846i \(-0.960477\pi\)
−0.424423 0.905464i \(-0.639523\pi\)
\(488\) 1062.39 771.875i 0.0985499 0.0716007i
\(489\) 3898.18 11997.4i 0.360494 1.10949i
\(490\) 1679.77 5169.81i 0.154866 0.476629i
\(491\) −2539.64 + 1845.15i −0.233426 + 0.169594i −0.698349 0.715757i \(-0.746082\pi\)
0.464923 + 0.885351i \(0.346082\pi\)
\(492\) 3816.91 + 2773.15i 0.349755 + 0.254112i
\(493\) 1701.65 + 5237.15i 0.155453 + 0.478436i
\(494\) −822.285 −0.0748914
\(495\) 0 0
\(496\) 3189.82 0.288764
\(497\) 4165.88 + 12821.3i 0.375987 + 1.15717i
\(498\) −506.124 367.720i −0.0455421 0.0330882i
\(499\) 4510.52 3277.08i 0.404646 0.293993i −0.366785 0.930306i \(-0.619541\pi\)
0.771431 + 0.636313i \(0.219541\pi\)
\(500\) 1843.61 5674.05i 0.164897 0.507502i
\(501\) −2317.17 + 7131.52i −0.206634 + 0.635953i
\(502\) −5157.07 + 3746.83i −0.458509 + 0.333126i
\(503\) −1908.53 1386.63i −0.169180 0.122916i 0.499974 0.866041i \(-0.333343\pi\)
−0.669153 + 0.743124i \(0.733343\pi\)
\(504\) −543.700 1673.34i −0.0480522 0.147889i
\(505\) 7256.68 0.639442
\(506\) 0 0
\(507\) 9420.79 0.825231
\(508\) 1314.61 + 4045.96i 0.114816 + 0.353367i
\(509\) 6167.24 + 4480.76i 0.537049 + 0.390189i 0.822988 0.568059i \(-0.192305\pi\)
−0.285939 + 0.958248i \(0.592305\pi\)
\(510\) −1173.18 + 852.363i −0.101861 + 0.0740064i
\(511\) 1946.75 5991.47i 0.168530 0.518683i
\(512\) −158.217 + 486.941i −0.0136568 + 0.0420312i
\(513\) 15559.7 11304.8i 1.33914 0.972943i
\(514\) 4115.29 + 2989.94i 0.353148 + 0.256577i
\(515\) 1039.20 + 3198.33i 0.0889179 + 0.273661i
\(516\) −6688.46 −0.570626
\(517\) 0 0
\(518\) 19071.3 1.61766
\(519\) 387.210 + 1191.71i 0.0327488 + 0.100791i
\(520\) 170.304 + 123.733i 0.0143622 + 0.0104347i
\(521\) −16944.7 + 12311.1i −1.42488 + 1.03523i −0.433935 + 0.900944i \(0.642875\pi\)
−0.990942 + 0.134290i \(0.957125\pi\)
\(522\) −1375.11 + 4232.15i −0.115300 + 0.354858i
\(523\) −1847.87 + 5687.16i −0.154497 + 0.475492i −0.998110 0.0614601i \(-0.980424\pi\)
0.843613 + 0.536952i \(0.180424\pi\)
\(524\) 4935.14 3585.59i 0.411436 0.298926i
\(525\) 5454.86 + 3963.19i 0.453466 + 0.329462i
\(526\) −1849.34 5691.67i −0.153298 0.471804i
\(527\) −4161.05 −0.343943
\(528\) 0 0
\(529\) −2594.45 −0.213237
\(530\) −2055.48 6326.11i −0.168461 0.518469i
\(531\) 179.321 + 130.285i 0.0146552 + 0.0106476i
\(532\) −10631.1 + 7723.93i −0.866382 + 0.629464i
\(533\) −276.080 + 849.686i −0.0224359 + 0.0690507i
\(534\) −3181.65 + 9792.11i −0.257834 + 0.793532i
\(535\) 7046.73 5119.75i 0.569452 0.413731i
\(536\) 1792.53 + 1302.35i 0.144450 + 0.104949i
\(537\) −3462.41 10656.2i −0.278238 0.856329i
\(538\) 1642.66 0.131636
\(539\) 0 0
\(540\) −4923.68 −0.392373
\(541\) −2611.90 8038.61i −0.207568 0.638829i −0.999598 0.0283471i \(-0.990976\pi\)
0.792030 0.610482i \(-0.209024\pi\)
\(542\) 10419.7 + 7570.37i 0.825766 + 0.599954i
\(543\) 6469.40 4700.29i 0.511286 0.371471i
\(544\) 206.390 635.204i 0.0162664 0.0500628i
\(545\) 3667.46 11287.3i 0.288251 0.887145i
\(546\) −593.438 + 431.158i −0.0465143 + 0.0337946i
\(547\) −984.276 715.118i −0.0769371 0.0558981i 0.548652 0.836051i \(-0.315141\pi\)
−0.625589 + 0.780153i \(0.715141\pi\)
\(548\) −2569.58 7908.34i −0.200305 0.616474i
\(549\) −1384.30 −0.107615
\(550\) 0 0
\(551\) 33235.1 2.56963
\(552\) 1042.21 + 3207.59i 0.0803611 + 0.247326i
\(553\) −5762.41 4186.64i −0.443115 0.321942i
\(554\) 832.423 604.791i 0.0638380 0.0463811i
\(555\) 3925.18 12080.5i 0.300206 0.923940i
\(556\) 1863.30 5734.66i 0.142125 0.437417i
\(557\) −5355.71 + 3891.15i −0.407412 + 0.296002i −0.772553 0.634950i \(-0.781021\pi\)
0.365141 + 0.930952i \(0.381021\pi\)
\(558\) −2720.36 1976.46i −0.206384 0.149946i
\(559\) −391.387 1204.56i −0.0296134 0.0911407i
\(560\) 3364.06 0.253853
\(561\) 0 0
\(562\) −15517.4 −1.16470
\(563\) 300.163 + 923.806i 0.0224695 + 0.0691541i 0.961663 0.274236i \(-0.0884248\pi\)
−0.939193 + 0.343390i \(0.888425\pi\)
\(564\) −723.052 525.328i −0.0539822 0.0392204i
\(565\) −824.959 + 599.368i −0.0614270 + 0.0446293i
\(566\) 3613.87 11122.4i 0.268379 0.825985i
\(567\) 3466.81 10669.7i 0.256777 0.790277i
\(568\) −3345.64 + 2430.75i −0.247148 + 0.179563i
\(569\) −3400.09 2470.31i −0.250508 0.182005i 0.455444 0.890265i \(-0.349481\pi\)
−0.705952 + 0.708260i \(0.749481\pi\)
\(570\) 2704.57 + 8323.80i 0.198740 + 0.611659i
\(571\) −11418.5 −0.836862 −0.418431 0.908248i \(-0.637420\pi\)
−0.418431 + 0.908248i \(0.637420\pi\)
\(572\) 0 0
\(573\) −6601.93 −0.481326
\(574\) 4411.96 + 13578.6i 0.320822 + 0.987389i
\(575\) 4749.37 + 3450.62i 0.344456 + 0.250262i
\(576\) 436.647 317.243i 0.0315862 0.0229487i
\(577\) −449.300 + 1382.80i −0.0324170 + 0.0997693i −0.965956 0.258707i \(-0.916704\pi\)
0.933539 + 0.358476i \(0.116704\pi\)
\(578\) 2767.17 8516.47i 0.199133 0.612869i
\(579\) 3665.78 2663.34i 0.263117 0.191165i
\(580\) −6883.35 5001.04i −0.492785 0.358029i
\(581\) −585.028 1800.53i −0.0417746 0.128569i
\(582\) 12613.3 0.898348
\(583\) 0 0
\(584\) 1932.52 0.136932
\(585\) −68.5729 211.046i −0.00484639 0.0149157i
\(586\) −13064.8 9492.14i −0.920993 0.669141i
\(587\) −7891.56 + 5733.56i −0.554889 + 0.403150i −0.829585 0.558381i \(-0.811423\pi\)
0.274696 + 0.961531i \(0.411423\pi\)
\(588\) −1795.55 + 5526.14i −0.125931 + 0.387575i
\(589\) −7760.58 + 23884.6i −0.542902 + 1.67088i
\(590\) −342.862 + 249.104i −0.0239244 + 0.0173821i
\(591\) −5500.08 3996.05i −0.382814 0.278131i
\(592\) 1807.84 + 5563.96i 0.125510 + 0.386279i
\(593\) −22963.3 −1.59020 −0.795102 0.606476i \(-0.792583\pi\)
−0.795102 + 0.606476i \(0.792583\pi\)
\(594\) 0 0
\(595\) −4388.35 −0.302361
\(596\) −531.321 1635.24i −0.0365164 0.112386i
\(597\) 13109.2 + 9524.36i 0.898697 + 0.652942i
\(598\) −516.687 + 375.395i −0.0353326 + 0.0256707i
\(599\) 3086.67 9499.79i 0.210547 0.647998i −0.788893 0.614531i \(-0.789345\pi\)
0.999440 0.0334667i \(-0.0106548\pi\)
\(600\) −639.153 + 1967.11i −0.0434888 + 0.133845i
\(601\) 383.430 278.578i 0.0260240 0.0189076i −0.574697 0.818366i \(-0.694880\pi\)
0.600721 + 0.799459i \(0.294880\pi\)
\(602\) −16374.9 11897.1i −1.10862 0.805462i
\(603\) −721.761 2221.35i −0.0487436 0.150017i
\(604\) 3566.73 0.240278
\(605\) 0 0
\(606\) −7756.86 −0.519968
\(607\) −1234.23 3798.56i −0.0825301 0.254001i 0.901274 0.433250i \(-0.142633\pi\)
−0.983804 + 0.179249i \(0.942633\pi\)
\(608\) −3261.17 2369.38i −0.217530 0.158044i
\(609\) 23985.6 17426.6i 1.59597 1.15954i
\(610\) 817.902 2517.24i 0.0542883 0.167082i
\(611\) 52.2988 160.959i 0.00346282 0.0106575i
\(612\) −569.597 + 413.837i −0.0376219 + 0.0273339i
\(613\) −8536.93 6202.44i −0.562485 0.408669i 0.269883 0.962893i \(-0.413015\pi\)
−0.832368 + 0.554224i \(0.813015\pi\)
\(614\) 2602.32 + 8009.11i 0.171044 + 0.526419i
\(615\) 9509.23 0.623494
\(616\) 0 0
\(617\) −14598.0 −0.952500 −0.476250 0.879310i \(-0.658004\pi\)
−0.476250 + 0.879310i \(0.658004\pi\)
\(618\) −1110.83 3418.78i −0.0723044 0.222530i
\(619\) 11322.4 + 8226.22i 0.735196 + 0.534151i 0.891203 0.453605i \(-0.149862\pi\)
−0.156007 + 0.987756i \(0.549862\pi\)
\(620\) 5201.33 3778.99i 0.336920 0.244787i
\(621\) 4616.10 14206.9i 0.298289 0.918040i
\(622\) 815.097 2508.61i 0.0525441 0.161714i
\(623\) −25207.1 + 18314.0i −1.62103 + 1.17775i
\(624\) −182.042 132.261i −0.0116787 0.00848509i
\(625\) −1398.17 4303.12i −0.0894827 0.275400i
\(626\) 8412.30 0.537097
\(627\) 0 0
\(628\) 2164.12 0.137513
\(629\) −2358.29 7258.07i −0.149493 0.460093i
\(630\) −2868.96 2084.42i −0.181432 0.131818i
\(631\) 6604.52 4798.46i 0.416675 0.302732i −0.359624 0.933097i \(-0.617095\pi\)
0.776298 + 0.630366i \(0.217095\pi\)
\(632\) 675.189 2078.02i 0.0424962 0.130790i
\(633\) −1891.54 + 5821.58i −0.118771 + 0.365540i
\(634\) −3985.38 + 2895.55i −0.249652 + 0.181383i
\(635\) 6936.88 + 5039.94i 0.433514 + 0.314967i
\(636\) 2197.15 + 6762.14i 0.136986 + 0.421598i
\(637\) −1100.31 −0.0684391
\(638\) 0 0
\(639\) 4359.38 0.269882
\(640\) 318.892 + 981.447i 0.0196958 + 0.0606174i
\(641\) −14287.5 10380.5i −0.880381 0.639634i 0.0529714 0.998596i \(-0.483131\pi\)
−0.933352 + 0.358962i \(0.883131\pi\)
\(642\) −7532.43 + 5472.63i −0.463055 + 0.336429i
\(643\) −5571.61 + 17147.7i −0.341715 + 1.05169i 0.621603 + 0.783332i \(0.286482\pi\)
−0.963319 + 0.268360i \(0.913518\pi\)
\(644\) −3153.91 + 9706.74i −0.192984 + 0.593943i
\(645\) −10906.2 + 7923.84i −0.665786 + 0.483722i
\(646\) 4254.13 + 3090.81i 0.259097 + 0.188245i
\(647\) 3050.55 + 9388.62i 0.185362 + 0.570486i 0.999954 0.00954786i \(-0.00303922\pi\)
−0.814592 + 0.580034i \(0.803039\pi\)
\(648\) 3441.47 0.208632
\(649\) 0 0
\(650\) −391.670 −0.0236347
\(651\) 6922.93 + 21306.6i 0.416791 + 1.28275i
\(652\) 9473.89 + 6883.19i 0.569059 + 0.413445i
\(653\) −8059.85 + 5855.82i −0.483011 + 0.350928i −0.802490 0.596665i \(-0.796492\pi\)
0.319479 + 0.947593i \(0.396492\pi\)
\(654\) −3920.24 + 12065.3i −0.234394 + 0.721390i
\(655\) 3799.40 11693.4i 0.226649 0.697553i
\(656\) −3543.27 + 2574.33i −0.210886 + 0.153218i
\(657\) −1648.10 1197.42i −0.0978670 0.0711046i
\(658\) −835.775 2572.25i −0.0495165 0.152396i
\(659\) −15778.5 −0.932692 −0.466346 0.884602i \(-0.654430\pi\)
−0.466346 + 0.884602i \(0.654430\pi\)
\(660\) 0 0
\(661\) 9698.70 0.570704 0.285352 0.958423i \(-0.407889\pi\)
0.285352 + 0.958423i \(0.407889\pi\)
\(662\) 2059.55 + 6338.65i 0.120916 + 0.372143i
\(663\) 237.470 + 172.532i 0.0139104 + 0.0101065i
\(664\) 469.838 341.357i 0.0274597 0.0199507i
\(665\) −8184.51 + 25189.3i −0.477266 + 1.46887i
\(666\) 1905.74 5865.26i 0.110880 0.341253i
\(667\) 20883.5 15172.7i 1.21231 0.880795i
\(668\) −5631.51 4091.53i −0.326182 0.236985i
\(669\) −6999.14 21541.1i −0.404488 1.24489i
\(670\) 4465.79 0.257506
\(671\) 0 0
\(672\) −3595.93 −0.206423
\(673\) −8352.35 25705.9i −0.478394 1.47235i −0.841325 0.540530i \(-0.818224\pi\)
0.362931 0.931816i \(-0.381776\pi\)
\(674\) 13467.7 + 9784.84i 0.769667 + 0.559196i
\(675\) 7411.41 5384.70i 0.422615 0.307048i
\(676\) −2702.47 + 8317.36i −0.153759 + 0.473223i
\(677\) 1074.03 3305.53i 0.0609724 0.187654i −0.915931 0.401336i \(-0.868546\pi\)
0.976903 + 0.213683i \(0.0685458\pi\)
\(678\) 881.820 640.679i 0.0499500 0.0362908i
\(679\) 30880.3 + 22435.9i 1.74533 + 1.26806i
\(680\) −415.987 1280.28i −0.0234594 0.0722006i
\(681\) −12005.8 −0.675572
\(682\) 0 0
\(683\) −2691.57 −0.150790 −0.0753952 0.997154i \(-0.524022\pi\)
−0.0753952 + 0.997154i \(0.524022\pi\)
\(684\) 1313.11 + 4041.34i 0.0734036 + 0.225913i
\(685\) −13559.0 9851.19i −0.756296 0.549481i
\(686\) 248.031 180.205i 0.0138044 0.0100295i
\(687\) −5968.69 + 18369.8i −0.331470 + 1.02016i
\(688\) 1918.67 5905.06i 0.106321 0.327221i
\(689\) −1089.26 + 791.397i −0.0602289 + 0.0437588i
\(690\) 5499.47 + 3995.60i 0.303422 + 0.220449i
\(691\) 2218.32 + 6827.29i 0.122126 + 0.375865i 0.993366 0.114991i \(-0.0366841\pi\)
−0.871241 + 0.490856i \(0.836684\pi\)
\(692\) −1163.21 −0.0638995
\(693\) 0 0
\(694\) −7244.99 −0.396277
\(695\) −3755.56 11558.4i −0.204973 0.630843i
\(696\) 7357.79 + 5345.75i 0.400713 + 0.291135i
\(697\) 4622.12 3358.16i 0.251184 0.182496i
\(698\) −1289.63 + 3969.06i −0.0699328 + 0.215231i
\(699\) −420.248 + 1293.39i −0.0227400 + 0.0699865i
\(700\) −5063.78 + 3679.05i −0.273419 + 0.198650i
\(701\) −3324.47 2415.37i −0.179121 0.130139i 0.494612 0.869114i \(-0.335310\pi\)
−0.673733 + 0.738975i \(0.735310\pi\)
\(702\) 307.976 + 947.854i 0.0165581 + 0.0509607i
\(703\) −46060.0 −2.47110
\(704\) 0 0
\(705\) −1801.37 −0.0962319
\(706\) −4686.03 14422.1i −0.249803 0.768815i
\(707\) −18990.6 13797.5i −1.01020 0.733957i
\(708\) 366.494 266.274i 0.0194544 0.0141344i
\(709\) −4955.56 + 15251.6i −0.262496 + 0.807880i 0.729763 + 0.683700i \(0.239630\pi\)
−0.992260 + 0.124181i \(0.960370\pi\)
\(710\) −2575.70 + 7927.18i −0.136147 + 0.419016i
\(711\) −1863.39 + 1353.83i −0.0982878 + 0.0714103i
\(712\) −7732.49 5617.98i −0.407004 0.295706i
\(713\) 6027.57 + 18550.9i 0.316598 + 0.974387i
\(714\) 4690.82 0.245868
\(715\) 0 0
\(716\) 10401.3 0.542898
\(717\) −1073.72 3304.58i −0.0559259 0.172122i
\(718\) 7334.53 + 5328.85i 0.381229 + 0.276979i
\(719\) 29782.9 21638.6i 1.54481 1.12237i 0.597577 0.801812i \(-0.296130\pi\)
0.947230 0.320556i \(-0.103870\pi\)
\(720\) 336.160 1034.59i 0.0173999 0.0535515i
\(721\) 3361.57 10345.9i 0.173636 0.534396i
\(722\) 14577.5 10591.1i 0.751408 0.545930i
\(723\) −3520.55 2557.83i −0.181093 0.131572i
\(724\) 2293.93 + 7059.99i 0.117753 + 0.362407i
\(725\) 15830.5 0.810939
\(726\) 0 0
\(727\) −21685.1 −1.10627 −0.553133 0.833093i \(-0.686568\pi\)
−0.553133 + 0.833093i \(0.686568\pi\)
\(728\) −210.422 647.614i −0.0107126 0.0329700i
\(729\) −17305.4 12573.1i −0.879204 0.638779i
\(730\) 3151.17 2289.46i 0.159767 0.116078i
\(731\) −2502.86 + 7703.02i −0.126637 + 0.389749i
\(732\) −874.277 + 2690.75i −0.0441451 + 0.135865i
\(733\) −19522.6 + 14184.0i −0.983745 + 0.714733i −0.958543 0.284950i \(-0.908023\pi\)
−0.0252028 + 0.999682i \(0.508023\pi\)
\(734\) −4681.06 3400.99i −0.235397 0.171026i
\(735\) 3619.00 + 11138.1i 0.181617 + 0.558961i
\(736\) −3130.86 −0.156800
\(737\) 0 0
\(738\) 4616.89 0.230285
\(739\) −11144.2 34298.2i −0.554729 1.70728i −0.696659 0.717403i \(-0.745331\pi\)
0.141930 0.989877i \(-0.454669\pi\)
\(740\) 9539.51 + 6930.86i 0.473891 + 0.344302i
\(741\) 1433.24 1041.31i 0.0710544 0.0516240i
\(742\) −6648.99 + 20463.5i −0.328965 + 1.01245i
\(743\) 4345.03 13372.6i 0.214541 0.660288i −0.784645 0.619945i \(-0.787155\pi\)
0.999186 0.0403430i \(-0.0128450\pi\)
\(744\) −5559.83 + 4039.46i −0.273970 + 0.199051i
\(745\) −2803.64 2036.97i −0.137876 0.100173i
\(746\) 2094.80 + 6447.13i 0.102810 + 0.316416i
\(747\) −612.201 −0.0299856
\(748\) 0 0
\(749\) −28175.6 −1.37452
\(750\) 3971.98 + 12224.5i 0.193382 + 0.595168i
\(751\) 23415.3 + 17012.2i 1.13773 + 0.826612i 0.986802 0.161933i \(-0.0517728\pi\)
0.150931 + 0.988544i \(0.451773\pi\)
\(752\) 671.214 487.666i 0.0325487 0.0236480i
\(753\) 4243.91 13061.4i 0.205387 0.632117i
\(754\) −532.194 + 1637.92i −0.0257047 + 0.0791110i
\(755\) 5815.92 4225.51i 0.280348 0.203685i
\(756\) 12885.2 + 9361.62i 0.619880 + 0.450369i
\(757\) −6681.79 20564.4i −0.320811 0.987354i −0.973296 0.229553i \(-0.926274\pi\)
0.652486 0.757801i \(-0.273726\pi\)
\(758\) −16126.9 −0.772763
\(759\) 0 0
\(760\) −8124.69 −0.387781
\(761\) 6672.83 + 20536.9i 0.317858 + 0.978266i 0.974562 + 0.224118i \(0.0719501\pi\)
−0.656704 + 0.754148i \(0.728050\pi\)
\(762\) −7415.01 5387.32i −0.352516 0.256118i
\(763\) −31058.7 + 22565.5i −1.47366 + 1.07067i
\(764\) 1893.85 5828.67i 0.0896820 0.276013i
\(765\) −438.514 + 1349.61i −0.0207248 + 0.0637845i
\(766\) 8501.98 6177.05i 0.401030 0.291365i
\(767\) 69.4009 + 50.4227i 0.00326717 + 0.00237374i
\(768\) −340.871 1049.09i −0.0160158 0.0492916i
\(769\) 30161.8 1.41439 0.707194 0.707020i \(-0.249961\pi\)
0.707194 + 0.707020i \(0.249961\pi\)
\(770\) 0 0
\(771\) −10959.3 −0.511918
\(772\) 1299.82 + 4000.43i 0.0605978 + 0.186501i
\(773\) −25088.2 18227.7i −1.16735 0.848128i −0.176659 0.984272i \(-0.556529\pi\)
−0.990689 + 0.136144i \(0.956529\pi\)
\(774\) −5295.15 + 3847.15i −0.245905 + 0.178660i
\(775\) −3696.51 + 11376.7i −0.171332 + 0.527307i
\(776\) −3618.29 + 11135.9i −0.167383 + 0.515151i
\(777\) −33241.2 + 24151.2i −1.53478 + 1.11508i
\(778\) −18339.6 13324.5i −0.845125 0.614019i
\(779\) −10655.5 32794.3i −0.490082 1.50832i
\(780\) −453.529 −0.0208192
\(781\) 0 0
\(782\) 4084.14 0.186763
\(783\) −12447.8 38310.4i −0.568133 1.74853i
\(784\) −4363.80 3170.49i −0.198788 0.144428i
\(785\) 3528.83 2563.84i 0.160445 0.116570i
\(786\) −4061.28 + 12499.3i −0.184302 + 0.567222i
\(787\) −6031.60 + 18563.3i −0.273193 + 0.840803i 0.716498 + 0.697589i \(0.245744\pi\)
−0.989692 + 0.143214i \(0.954256\pi\)
\(788\) 5105.77 3709.56i 0.230819 0.167700i
\(789\) 10431.1 + 7578.63i 0.470667 + 0.341960i
\(790\) −1360.87 4188.32i −0.0612880 0.188625i
\(791\) 3298.51 0.148270
\(792\) 0 0
\(793\) −535.753 −0.0239913
\(794\) −6116.12 18823.5i −0.273367 0.841336i
\(795\) 11593.8 + 8423.40i 0.517220 + 0.375783i
\(796\) −12169.3 + 8841.53i −0.541872 + 0.393693i
\(797\) 6763.71 20816.6i 0.300606 0.925170i −0.680674 0.732586i \(-0.738313\pi\)
0.981280 0.192584i \(-0.0616868\pi\)
\(798\) 8748.63 26925.5i 0.388093 1.19443i
\(799\) −875.585 + 636.149i −0.0387684 + 0.0281669i
\(800\) −1553.36 1128.58i −0.0686494 0.0498767i
\(801\) 3113.49 + 9582.33i 0.137340 + 0.422690i
\(802\) 29707.5 1.30799
\(803\) 0 0
\(804\) −4773.60 −0.209393
\(805\) 6356.83 + 19564.3i 0.278321 + 0.856585i
\(806\) −1052.83 764.928i −0.0460105 0.0334286i
\(807\) −2863.14 + 2080.19i −0.124891 + 0.0907389i
\(808\) 2225.15 6848.32i 0.0968819 0.298172i
\(809\) −11484.8 + 35346.5i −0.499114 + 1.53612i 0.311331 + 0.950302i \(0.399225\pi\)
−0.810445 + 0.585815i \(0.800775\pi\)
\(810\) 5611.68 4077.12i 0.243425 0.176859i
\(811\) −23104.6 16786.5i −1.00038 0.726822i −0.0382139 0.999270i \(-0.512167\pi\)
−0.962171 + 0.272448i \(0.912167\pi\)
\(812\) 8504.86 + 26175.3i 0.367564 + 1.13125i
\(813\) −27748.3 −1.19702
\(814\) 0 0
\(815\) 23602.7 1.01444
\(816\) 444.660 + 1368.52i 0.0190762 + 0.0587106i
\(817\) 39547.7 + 28733.1i 1.69351 + 1.23041i
\(818\) 13497.8 9806.70i 0.576942 0.419173i
\(819\) −221.817 + 682.683i −0.00946388 + 0.0291268i
\(820\) −2727.84 + 8395.44i −0.116171 + 0.357538i
\(821\) −5091.27 + 3699.02i −0.216427 + 0.157243i −0.690717 0.723125i \(-0.742705\pi\)
0.474290 + 0.880369i \(0.342705\pi\)
\(822\) 14493.6 + 10530.2i 0.614989 + 0.446816i
\(823\) 4616.39 + 14207.8i 0.195525 + 0.601765i 0.999970 + 0.00773755i \(0.00246296\pi\)
−0.804445 + 0.594027i \(0.797537\pi\)
\(824\) 3337.00 0.141080
\(825\) 0 0
\(826\) 1370.90 0.0577477
\(827\) 10710.2 + 32962.7i 0.450340 + 1.38600i 0.876520 + 0.481365i \(0.159859\pi\)
−0.426180 + 0.904638i \(0.640141\pi\)
\(828\) 2670.08 + 1939.93i 0.112067 + 0.0814217i
\(829\) 23723.3 17236.0i 0.993903 0.722113i 0.0331310 0.999451i \(-0.489452\pi\)
0.960772 + 0.277338i \(0.0894522\pi\)
\(830\) 361.713 1113.24i 0.0151268 0.0465555i
\(831\) −685.026 + 2108.29i −0.0285960 + 0.0880095i
\(832\) 168.991 122.779i 0.00704172 0.00511611i
\(833\) 5692.48 + 4135.83i 0.236774 + 0.172027i
\(834\) 4014.41 + 12355.1i 0.166676 + 0.512976i
\(835\) −14030.0 −0.581471
\(836\) 0 0
\(837\) 30438.6 1.25700
\(838\) 8085.37 + 24884.2i 0.333299 + 1.02579i
\(839\) −4764.29 3461.46i −0.196045 0.142435i 0.485433 0.874274i \(-0.338662\pi\)
−0.681477 + 0.731839i \(0.738662\pi\)
\(840\) −5863.54 + 4260.11i −0.240847 + 0.174986i
\(841\) 13973.6 43006.3i 0.572947 1.76335i
\(842\) 3433.50 10567.2i 0.140530 0.432506i
\(843\) 27046.7 19650.6i 1.10503 0.802849i
\(844\) −4597.10 3339.99i −0.187486 0.136217i
\(845\) 5446.94 + 16763.9i 0.221752 + 0.682482i
\(846\) −874.594 −0.0355428
\(847\) 0 0
\(848\) −6600.39 −0.267286
\(849\) 7785.94 + 23962.7i 0.314738 + 0.968665i
\(850\) 2026.32 + 1472.21i 0.0817674 + 0.0594075i
\(851\) −28942.0 + 21027.6i −1.16583 + 0.847024i
\(852\) 2753.23 8473.56i 0.110709 0.340727i
\(853\) 11785.3 36271.4i 0.473060 1.45593i −0.375496 0.926824i \(-0.622528\pi\)
0.848556 0.529105i \(-0.177472\pi\)
\(854\) −6926.59 + 5032.46i −0.277544 + 0.201648i
\(855\) 6928.95 + 5034.18i 0.277152 + 0.201363i
\(856\) −2670.86 8220.07i −0.106645 0.328220i
\(857\) 12704.1 0.506377 0.253188 0.967417i \(-0.418521\pi\)
0.253188 + 0.967417i \(0.418521\pi\)
\(858\) 0 0
\(859\) −11123.7 −0.441833 −0.220916 0.975293i \(-0.570905\pi\)
−0.220916 + 0.975293i \(0.570905\pi\)
\(860\) −3867.15 11901.9i −0.153336 0.471919i
\(861\) −24885.5 18080.3i −0.985010 0.715652i
\(862\) −582.198 + 422.991i −0.0230043 + 0.0167136i
\(863\) −4227.50 + 13010.9i −0.166751 + 0.513206i −0.999161 0.0409539i \(-0.986960\pi\)
0.832410 + 0.554160i \(0.186960\pi\)
\(864\) −1509.77 + 4646.60i −0.0594485 + 0.182964i
\(865\) −1896.73 + 1378.05i −0.0745557 + 0.0541679i
\(866\) 24219.2 + 17596.3i 0.950347 + 0.690468i
\(867\) 5961.75 + 18348.4i 0.233531 + 0.718736i
\(868\) −20796.9 −0.813242
\(869\) 0 0
\(870\) 18330.8 0.714334
\(871\) −279.336 859.707i −0.0108667 0.0334444i
\(872\) −9527.52 6922.15i −0.370003 0.268823i
\(873\) 9985.77 7255.09i 0.387133 0.281269i
\(874\) 7617.14 23443.2i 0.294798 0.907296i
\(875\) −12019.9 + 36993.6i −0.464398 + 1.42927i
\(876\) −3368.37 + 2447.26i −0.129916 + 0.0943897i
\(877\) −36735.1 26689.6i −1.41443 1.02764i −0.992660 0.120942i \(-0.961409\pi\)
−0.421771 0.906702i \(-0.638591\pi\)
\(878\) −9822.96 30232.0i −0.377573 1.16205i
\(879\) 34792.3 1.33506
\(880\) 0 0
\(881\) 13620.9 0.520884 0.260442 0.965490i \(-0.416132\pi\)
0.260442 + 0.965490i \(0.416132\pi\)
\(882\) 1757.08 + 5407.75i 0.0670795 + 0.206449i
\(883\) 6428.23 + 4670.38i 0.244991 + 0.177996i 0.703504 0.710691i \(-0.251618\pi\)
−0.458513 + 0.888688i \(0.651618\pi\)
\(884\) −220.445 + 160.163i −0.00838731 + 0.00609373i
\(885\) 282.152 868.374i 0.0107169 0.0329831i
\(886\) 1624.48 4999.62i 0.0615974 0.189577i
\(887\) 33607.5 24417.2i 1.27218 0.924296i 0.272897 0.962043i \(-0.412018\pi\)
0.999287 + 0.0377468i \(0.0120180\pi\)
\(888\) −10197.0 7408.58i −0.385349 0.279972i
\(889\) −8571.00 26378.8i −0.323355 0.995183i
\(890\) −19264.3 −0.725550
\(891\) 0 0
\(892\) 21025.9 0.789235
\(893\) 2018.51 + 6212.35i 0.0756405 + 0.232798i
\(894\) 2996.89 + 2177.37i 0.112115 + 0.0814564i
\(895\) 16960.4 12322.4i 0.633434 0.460217i
\(896\) 1031.54 3174.75i 0.0384613 0.118372i
\(897\) 425.198 1308.62i 0.0158271 0.0487109i
\(898\) −2099.35 + 1525.27i −0.0780137 + 0.0566803i
\(899\) 42553.4 + 30916.9i 1.57868 + 1.14698i
\(900\) 625.460 + 1924.97i 0.0231652 + 0.0712951i
\(901\) 8610.07 0.318361
\(902\) 0 0
\(903\) 43607.3 1.60704
\(904\) 312.677 + 962.321i 0.0115039 + 0.0354052i
\(905\) 12104.5 + 8794.42i 0.444604 + 0.323024i
\(906\) −6216.79 + 4516.76i −0.227968 + 0.165628i
\(907\) 13359.1 41115.2i 0.489066 1.50519i −0.336938 0.941527i \(-0.609391\pi\)
0.826004 0.563664i \(-0.190609\pi\)
\(908\) 3444.03 10599.6i 0.125874 0.387402i
\(909\) −6140.99 + 4461.69i −0.224075 + 0.162800i
\(910\) −1110.35 806.713i −0.0404479 0.0293871i
\(911\) −10352.3 31861.2i −0.376496 1.15874i −0.942464 0.334308i \(-0.891497\pi\)
0.565968 0.824427i \(-0.308503\pi\)
\(912\) 8684.69 0.315328
\(913\) 0 0
\(914\) −4503.92 −0.162994
\(915\) 1762.14 + 5423.30i 0.0636661 + 0.195944i
\(916\) −14506.0 10539.2i −0.523243 0.380158i
\(917\) −32176.1 + 23377.3i −1.15872 + 0.841861i
\(918\) 1969.47 6061.39i 0.0708083 0.217926i
\(919\) 5840.57 17975.4i 0.209644 0.645217i −0.789847 0.613304i \(-0.789840\pi\)
0.999491 0.0319130i \(-0.0101599\pi\)
\(920\) −5105.19 + 3709.14i −0.182949 + 0.132920i
\(921\) −14678.2 10664.4i −0.525151 0.381545i
\(922\) −10365.7 31902.2i −0.370254 1.13953i
\(923\) 1687.17 0.0601665
\(924\) 0 0
\(925\) −21939.3 −0.779847
\(926\) −4774.97 14695.8i −0.169455 0.521528i
\(927\) −2845.89 2067.66i −0.100832 0.0732587i
\(928\) −6830.29 + 4962.49i −0.241611 + 0.175541i
\(929\) 9007.59 27722.5i 0.318116 0.979060i −0.656337 0.754468i \(-0.727895\pi\)
0.974453 0.224592i \(-0.0721049\pi\)
\(930\) −4280.33 + 13173.5i −0.150922 + 0.464490i
\(931\) 34356.7 24961.6i 1.20945 0.878714i
\(932\) −1021.35 742.051i −0.0358963 0.0260802i
\(933\) 1756.09 + 5404.70i 0.0616205 + 0.189648i
\(934\) 15111.0 0.529388
\(935\) 0 0
\(936\) −220.196 −0.00768946
\(937\) −9948.17 30617.3i −0.346844 1.06748i −0.960589 0.277972i \(-0.910338\pi\)
0.613745 0.789504i \(-0.289662\pi\)
\(938\) −11686.9 8491.03i −0.406813 0.295567i
\(939\) −14662.6 + 10653.0i −0.509580 + 0.370231i
\(940\) 516.745 1590.38i 0.0179302 0.0551834i
\(941\) 11556.0 35565.6i 0.400333 1.23210i −0.524397 0.851474i \(-0.675709\pi\)
0.924730 0.380624i \(-0.124291\pi\)
\(942\) −3772.06 + 2740.56i −0.130467 + 0.0947901i
\(943\) −21666.9 15742.0i −0.748221 0.543615i
\(944\) 129.952 + 399.952i 0.00448049 + 0.0137895i
\(945\) 32101.3 1.10503
\(946\) 0 0
\(947\) 3065.34 0.105185 0.0525925 0.998616i \(-0.483252\pi\)
0.0525925 + 0.998616i \(0.483252\pi\)
\(948\) 1454.67 + 4477.01i 0.0498369 + 0.153382i
\(949\) −637.848 463.424i −0.0218182 0.0158518i
\(950\) 12229.8 8885.44i 0.417669 0.303454i
\(951\) 3279.69 10093.8i 0.111831 0.344180i
\(952\) −1345.62 + 4141.40i −0.0458107 + 0.140991i
\(953\) −13256.1 + 9631.11i −0.450584 + 0.327369i −0.789826 0.613331i \(-0.789829\pi\)
0.339242 + 0.940699i \(0.389829\pi\)
\(954\) 5628.99 + 4089.70i 0.191033 + 0.138793i
\(955\) −3817.12 11747.9i −0.129339 0.398066i
\(956\) 3225.53 0.109122
\(957\) 0 0
\(958\) −26685.2 −0.899958
\(959\) 16753.1 + 51560.7i 0.564114 + 1.73617i
\(960\) −1798.69 1306.83i −0.0604714 0.0439350i
\(961\) −8053.62 + 5851.30i −0.270337 + 0.196412i
\(962\) 737.558 2269.97i 0.0247192 0.0760778i
\(963\) −2815.49 + 8665.20i −0.0942139 + 0.289961i
\(964\) 3268.15 2374.45i 0.109191 0.0793318i
\(965\) 6858.81 + 4983.22i 0.228801 + 0.166234i
\(966\) −6794.98 20912.8i −0.226320 0.696540i
\(967\) 16183.5 0.538187 0.269094 0.963114i \(-0.413276\pi\)
0.269094 + 0.963114i \(0.413276\pi\)
\(968\) 0 0
\(969\) −11329.0 −0.375583
\(970\) 7292.79 + 22444.9i 0.241399 + 0.742951i
\(971\) −3797.56 2759.09i −0.125509 0.0911879i 0.523260 0.852173i \(-0.324716\pi\)
−0.648769 + 0.760985i \(0.724716\pi\)
\(972\) 7341.67 5334.04i 0.242268 0.176018i
\(973\) −12148.4 + 37388.8i −0.400265 + 1.23189i
\(974\) −11631.4 + 35797.9i −0.382644 + 1.17766i
\(975\) 682.679 495.995i 0.0224238 0.0162919i
\(976\) −2124.79 1543.75i −0.0696853 0.0506293i
\(977\) −2368.18 7288.50i −0.0775483 0.238669i 0.904766 0.425909i \(-0.140046\pi\)
−0.982314 + 0.187240i \(0.940046\pi\)
\(978\) −25229.5 −0.824899
\(979\) 0 0
\(980\) −10871.7 −0.354372
\(981\) 3836.26 + 11806.8i 0.124854 + 0.384263i
\(982\) 5079.27 + 3690.31i 0.165057 + 0.119921i
\(983\) −30255.0 + 21981.6i −0.981674 + 0.713228i −0.958082 0.286493i \(-0.907510\pi\)
−0.0235922 + 0.999722i \(0.507510\pi\)
\(984\) 2915.86 8974.10i 0.0944657 0.290736i
\(985\) 3930.76 12097.6i 0.127152 0.391333i
\(986\) 8909.96 6473.47i 0.287780 0.209084i
\(987\) 4714.14 + 3425.03i 0.152029 + 0.110456i
\(988\) 508.200 + 1564.08i 0.0163644 + 0.0503643i
\(989\) 37967.5 1.22072
\(990\) 0 0
\(991\) 15536.1 0.498002 0.249001 0.968503i \(-0.419898\pi\)
0.249001 + 0.968503i \(0.419898\pi\)
\(992\) −1971.42 6067.39i −0.0630973 0.194193i
\(993\) −11616.8 8440.09i −0.371246 0.269726i
\(994\) 21812.9 15848.0i 0.696038 0.505701i
\(995\) −9368.75 + 28834.1i −0.298502 + 0.918695i
\(996\) −386.644 + 1189.97i −0.0123005 + 0.0378570i
\(997\) 33305.5 24197.8i 1.05797 0.768659i 0.0842568 0.996444i \(-0.473148\pi\)
0.973711 + 0.227785i \(0.0731484\pi\)
\(998\) −9021.03 6554.16i −0.286128 0.207884i
\(999\) 17251.2 + 53093.7i 0.546350 + 1.68149i
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 242.4.c.r.27.2 8
11.2 odd 10 242.4.c.n.9.2 8
11.3 even 5 242.4.a.n.1.2 4
11.4 even 5 22.4.c.b.3.1 8
11.5 even 5 22.4.c.b.15.1 yes 8
11.6 odd 10 242.4.c.q.81.1 8
11.7 odd 10 242.4.c.q.3.1 8
11.8 odd 10 242.4.a.o.1.2 4
11.9 even 5 inner 242.4.c.r.9.2 8
11.10 odd 2 242.4.c.n.27.2 8
33.5 odd 10 198.4.f.d.37.1 8
33.8 even 10 2178.4.a.bt.1.4 4
33.14 odd 10 2178.4.a.by.1.4 4
33.26 odd 10 198.4.f.d.91.1 8
44.3 odd 10 1936.4.a.bn.1.3 4
44.15 odd 10 176.4.m.b.113.2 8
44.19 even 10 1936.4.a.bm.1.3 4
44.27 odd 10 176.4.m.b.81.2 8
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
22.4.c.b.3.1 8 11.4 even 5
22.4.c.b.15.1 yes 8 11.5 even 5
176.4.m.b.81.2 8 44.27 odd 10
176.4.m.b.113.2 8 44.15 odd 10
198.4.f.d.37.1 8 33.5 odd 10
198.4.f.d.91.1 8 33.26 odd 10
242.4.a.n.1.2 4 11.3 even 5
242.4.a.o.1.2 4 11.8 odd 10
242.4.c.n.9.2 8 11.2 odd 10
242.4.c.n.27.2 8 11.10 odd 2
242.4.c.q.3.1 8 11.7 odd 10
242.4.c.q.81.1 8 11.6 odd 10
242.4.c.r.9.2 8 11.9 even 5 inner
242.4.c.r.27.2 8 1.1 even 1 trivial
1936.4.a.bm.1.3 4 44.19 even 10
1936.4.a.bn.1.3 4 44.3 odd 10
2178.4.a.bt.1.4 4 33.8 even 10
2178.4.a.by.1.4 4 33.14 odd 10