Properties

Label 168.4.c.b.85.7
Level $168$
Weight $4$
Character 168.85
Analytic conductor $9.912$
Analytic rank $0$
Dimension $20$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [168,4,Mod(85,168)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(168, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 1, 0, 0]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("168.85");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 168 = 2^{3} \cdot 3 \cdot 7 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 168.c (of order \(2\), degree \(1\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(9.91232088096\)
Analytic rank: \(0\)
Dimension: \(20\)
Coefficient field: \(\mathbb{Q}[x]/(x^{20} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{20} - 2 x^{19} - 5 x^{18} - 26 x^{17} + 122 x^{16} + 124 x^{15} - 276 x^{14} - 1376 x^{13} + \cdots + 1073741824 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{13}]\)
Coefficient ring index: \( 2^{24}\cdot 3^{10} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 85.7
Root \(2.78865 + 0.472666i\) of defining polynomial
Character \(\chi\) \(=\) 168.85
Dual form 168.4.c.b.85.8

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-0.472666 - 2.78865i) q^{2} +3.00000i q^{3} +(-7.55317 + 2.63620i) q^{4} +8.98099i q^{5} +(8.36596 - 1.41800i) q^{6} -7.00000 q^{7} +(10.9216 + 19.8171i) q^{8} -9.00000 q^{9} +O(q^{10})\) \(q+(-0.472666 - 2.78865i) q^{2} +3.00000i q^{3} +(-7.55317 + 2.63620i) q^{4} +8.98099i q^{5} +(8.36596 - 1.41800i) q^{6} -7.00000 q^{7} +(10.9216 + 19.8171i) q^{8} -9.00000 q^{9} +(25.0449 - 4.24501i) q^{10} -58.9468i q^{11} +(-7.90861 - 22.6595i) q^{12} -54.8428i q^{13} +(3.30866 + 19.5206i) q^{14} -26.9430 q^{15} +(50.1009 - 39.8234i) q^{16} -111.971 q^{17} +(4.25399 + 25.0979i) q^{18} -38.6067i q^{19} +(-23.6757 - 67.8350i) q^{20} -21.0000i q^{21} +(-164.382 + 27.8621i) q^{22} +112.146 q^{23} +(-59.4514 + 32.7647i) q^{24} +44.3418 q^{25} +(-152.937 + 25.9223i) q^{26} -27.0000i q^{27} +(52.8722 - 18.4534i) q^{28} -234.402i q^{29} +(12.7350 + 75.1346i) q^{30} -180.033 q^{31} +(-134.735 - 120.891i) q^{32} +176.840 q^{33} +(52.9249 + 312.248i) q^{34} -62.8669i q^{35} +(67.9786 - 23.7258i) q^{36} +131.345i q^{37} +(-107.661 + 18.2480i) q^{38} +164.528 q^{39} +(-177.978 + 98.0866i) q^{40} -500.500 q^{41} +(-58.5617 + 9.92598i) q^{42} +495.083i q^{43} +(155.396 + 445.235i) q^{44} -80.8289i q^{45} +(-53.0077 - 312.737i) q^{46} +111.705 q^{47} +(119.470 + 150.303i) q^{48} +49.0000 q^{49} +(-20.9588 - 123.654i) q^{50} -335.913i q^{51} +(144.577 + 414.237i) q^{52} -696.410i q^{53} +(-75.2936 + 12.7620i) q^{54} +529.400 q^{55} +(-76.4511 - 138.720i) q^{56} +115.820 q^{57} +(-653.666 + 110.794i) q^{58} -407.787i q^{59} +(203.505 - 71.0271i) q^{60} -124.411i q^{61} +(85.0952 + 502.048i) q^{62} +63.0000 q^{63} +(-273.438 + 432.869i) q^{64} +492.542 q^{65} +(-83.5864 - 493.146i) q^{66} -143.848i q^{67} +(845.736 - 295.178i) q^{68} +336.439i q^{69} +(-175.314 + 29.7151i) q^{70} +251.341 q^{71} +(-98.2942 - 178.354i) q^{72} -709.691 q^{73} +(366.276 - 62.0823i) q^{74} +133.025i q^{75} +(101.775 + 291.603i) q^{76} +412.627i q^{77} +(-77.7669 - 458.812i) q^{78} +865.909 q^{79} +(357.654 + 449.956i) q^{80} +81.0000 q^{81} +(236.569 + 1395.72i) q^{82} +57.3886i q^{83} +(55.3603 + 158.617i) q^{84} -1005.61i q^{85} +(1380.61 - 234.009i) q^{86} +703.206 q^{87} +(1168.16 - 643.792i) q^{88} -765.447 q^{89} +(-225.404 + 38.2051i) q^{90} +383.899i q^{91} +(-847.060 + 295.640i) q^{92} -540.098i q^{93} +(-52.7990 - 311.506i) q^{94} +346.726 q^{95} +(362.672 - 404.204i) q^{96} +370.748 q^{97} +(-23.1606 - 136.644i) q^{98} +530.521i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 20 q + 4 q^{2} - 14 q^{4} + 6 q^{6} - 140 q^{7} + 10 q^{8} - 180 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 20 q + 4 q^{2} - 14 q^{4} + 6 q^{6} - 140 q^{7} + 10 q^{8} - 180 q^{9} - 84 q^{10} + 12 q^{12} - 28 q^{14} + 60 q^{15} - 134 q^{16} - 52 q^{17} - 36 q^{18} - 8 q^{20} + 8 q^{22} - 244 q^{23} - 348 q^{24} - 844 q^{25} - 332 q^{26} + 98 q^{28} + 60 q^{30} + 264 q^{31} - 46 q^{32} + 396 q^{33} - 612 q^{34} + 126 q^{36} + 884 q^{38} - 312 q^{39} - 964 q^{40} - 236 q^{41} - 42 q^{42} + 576 q^{44} + 1356 q^{46} - 432 q^{48} + 980 q^{49} - 2456 q^{50} + 1492 q^{52} - 54 q^{54} + 72 q^{55} - 70 q^{56} - 912 q^{57} - 1404 q^{58} + 684 q^{60} + 4964 q^{62} + 1260 q^{63} - 1670 q^{64} + 1744 q^{65} + 792 q^{66} + 3408 q^{68} + 588 q^{70} - 636 q^{71} - 90 q^{72} - 2784 q^{73} - 4916 q^{74} + 2664 q^{76} - 888 q^{78} + 2872 q^{79} - 1764 q^{80} + 1620 q^{81} + 2628 q^{82} - 84 q^{84} + 3328 q^{86} - 2348 q^{88} + 220 q^{89} + 756 q^{90} + 2580 q^{92} - 1704 q^{94} - 1240 q^{95} - 564 q^{96} + 4400 q^{97} + 196 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/168\mathbb{Z}\right)^\times\).

\(n\) \(73\) \(85\) \(113\) \(127\)
\(\chi(n)\) \(1\) \(-1\) \(1\) \(1\)

Coefficient data

For each \(n\) we display the coefficients of the \(q\)-expansion \(a_n\), the Satake parameters \(\alpha_p\), and the Satake angles \(\theta_p = \textrm{Arg}(\alpha_p)\).



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −0.472666 2.78865i −0.167113 0.985938i
\(3\) 3.00000i 0.577350i
\(4\) −7.55317 + 2.63620i −0.944147 + 0.329525i
\(5\) 8.98099i 0.803284i 0.915797 + 0.401642i \(0.131560\pi\)
−0.915797 + 0.401642i \(0.868440\pi\)
\(6\) 8.36596 1.41800i 0.569231 0.0964825i
\(7\) −7.00000 −0.377964
\(8\) 10.9216 + 19.8171i 0.482670 + 0.875802i
\(9\) −9.00000 −0.333333
\(10\) 25.0449 4.24501i 0.791988 0.134239i
\(11\) 58.9468i 1.61574i −0.589362 0.807869i \(-0.700621\pi\)
0.589362 0.807869i \(-0.299379\pi\)
\(12\) −7.90861 22.6595i −0.190252 0.545103i
\(13\) 54.8428i 1.17005i −0.811015 0.585025i \(-0.801085\pi\)
0.811015 0.585025i \(-0.198915\pi\)
\(14\) 3.30866 + 19.5206i 0.0631626 + 0.372649i
\(15\) −26.9430 −0.463776
\(16\) 50.1009 39.8234i 0.782826 0.622240i
\(17\) −111.971 −1.59747 −0.798734 0.601684i \(-0.794497\pi\)
−0.798734 + 0.601684i \(0.794497\pi\)
\(18\) 4.25399 + 25.0979i 0.0557042 + 0.328646i
\(19\) 38.6067i 0.466157i −0.972458 0.233078i \(-0.925120\pi\)
0.972458 0.233078i \(-0.0748798\pi\)
\(20\) −23.6757 67.8350i −0.264703 0.758418i
\(21\) 21.0000i 0.218218i
\(22\) −164.382 + 27.8621i −1.59302 + 0.270010i
\(23\) 112.146 1.01670 0.508350 0.861151i \(-0.330256\pi\)
0.508350 + 0.861151i \(0.330256\pi\)
\(24\) −59.4514 + 32.7647i −0.505645 + 0.278670i
\(25\) 44.3418 0.354734
\(26\) −152.937 + 25.9223i −1.15360 + 0.195530i
\(27\) 27.0000i 0.192450i
\(28\) 52.8722 18.4534i 0.356854 0.124549i
\(29\) 234.402i 1.50094i −0.660902 0.750472i \(-0.729826\pi\)
0.660902 0.750472i \(-0.270174\pi\)
\(30\) 12.7350 + 75.1346i 0.0775029 + 0.457255i
\(31\) −180.033 −1.04306 −0.521529 0.853234i \(-0.674638\pi\)
−0.521529 + 0.853234i \(0.674638\pi\)
\(32\) −134.735 120.891i −0.744311 0.667834i
\(33\) 176.840 0.932847
\(34\) 52.9249 + 312.248i 0.266957 + 1.57500i
\(35\) 62.8669i 0.303613i
\(36\) 67.9786 23.7258i 0.314716 0.109842i
\(37\) 131.345i 0.583594i 0.956480 + 0.291797i \(0.0942532\pi\)
−0.956480 + 0.291797i \(0.905747\pi\)
\(38\) −107.661 + 18.2480i −0.459601 + 0.0779006i
\(39\) 164.528 0.675528
\(40\) −177.978 + 98.0866i −0.703518 + 0.387721i
\(41\) −500.500 −1.90646 −0.953231 0.302242i \(-0.902265\pi\)
−0.953231 + 0.302242i \(0.902265\pi\)
\(42\) −58.5617 + 9.92598i −0.215149 + 0.0364670i
\(43\) 495.083i 1.75580i 0.478844 + 0.877900i \(0.341056\pi\)
−0.478844 + 0.877900i \(0.658944\pi\)
\(44\) 155.396 + 445.235i 0.532426 + 1.52549i
\(45\) 80.8289i 0.267761i
\(46\) −53.0077 312.737i −0.169903 1.00240i
\(47\) 111.705 0.346677 0.173338 0.984862i \(-0.444545\pi\)
0.173338 + 0.984862i \(0.444545\pi\)
\(48\) 119.470 + 150.303i 0.359251 + 0.451965i
\(49\) 49.0000 0.142857
\(50\) −20.9588 123.654i −0.0592806 0.349746i
\(51\) 335.913i 0.922299i
\(52\) 144.577 + 414.237i 0.385561 + 1.10470i
\(53\) 696.410i 1.80489i −0.430804 0.902445i \(-0.641770\pi\)
0.430804 0.902445i \(-0.358230\pi\)
\(54\) −75.2936 + 12.7620i −0.189744 + 0.0321608i
\(55\) 529.400 1.29790
\(56\) −76.4511 138.720i −0.182432 0.331022i
\(57\) 115.820 0.269136
\(58\) −653.666 + 110.794i −1.47984 + 0.250827i
\(59\) 407.787i 0.899819i −0.893074 0.449909i \(-0.851456\pi\)
0.893074 0.449909i \(-0.148544\pi\)
\(60\) 203.505 71.0271i 0.437873 0.152826i
\(61\) 124.411i 0.261134i −0.991440 0.130567i \(-0.958320\pi\)
0.991440 0.130567i \(-0.0416797\pi\)
\(62\) 85.0952 + 502.048i 0.174308 + 1.02839i
\(63\) 63.0000 0.125988
\(64\) −273.438 + 432.869i −0.534059 + 0.845447i
\(65\) 492.542 0.939882
\(66\) −83.5864 493.146i −0.155890 0.919729i
\(67\) 143.848i 0.262296i −0.991363 0.131148i \(-0.958134\pi\)
0.991363 0.131148i \(-0.0418663\pi\)
\(68\) 845.736 295.178i 1.50824 0.526406i
\(69\) 336.439i 0.586992i
\(70\) −175.314 + 29.7151i −0.299343 + 0.0507376i
\(71\) 251.341 0.420122 0.210061 0.977688i \(-0.432634\pi\)
0.210061 + 0.977688i \(0.432634\pi\)
\(72\) −98.2942 178.354i −0.160890 0.291934i
\(73\) −709.691 −1.13785 −0.568925 0.822390i \(-0.692640\pi\)
−0.568925 + 0.822390i \(0.692640\pi\)
\(74\) 366.276 62.0823i 0.575387 0.0975259i
\(75\) 133.025i 0.204806i
\(76\) 101.775 + 291.603i 0.153610 + 0.440120i
\(77\) 412.627i 0.610691i
\(78\) −77.7669 458.812i −0.112889 0.666029i
\(79\) 865.909 1.23319 0.616597 0.787279i \(-0.288511\pi\)
0.616597 + 0.787279i \(0.288511\pi\)
\(80\) 357.654 + 449.956i 0.499836 + 0.628832i
\(81\) 81.0000 0.111111
\(82\) 236.569 + 1395.72i 0.318594 + 1.87965i
\(83\) 57.3886i 0.0758942i 0.999280 + 0.0379471i \(0.0120818\pi\)
−0.999280 + 0.0379471i \(0.987918\pi\)
\(84\) 55.3603 + 158.617i 0.0719083 + 0.206030i
\(85\) 1005.61i 1.28322i
\(86\) 1380.61 234.009i 1.73111 0.293416i
\(87\) 703.206 0.866570
\(88\) 1168.16 643.792i 1.41507 0.779869i
\(89\) −765.447 −0.911654 −0.455827 0.890068i \(-0.650656\pi\)
−0.455827 + 0.890068i \(0.650656\pi\)
\(90\) −225.404 + 38.2051i −0.263996 + 0.0447463i
\(91\) 383.899i 0.442237i
\(92\) −847.060 + 295.640i −0.959914 + 0.335028i
\(93\) 540.098i 0.602210i
\(94\) −52.7990 311.506i −0.0579340 0.341802i
\(95\) 346.726 0.374456
\(96\) 362.672 404.204i 0.385574 0.429728i
\(97\) 370.748 0.388080 0.194040 0.980994i \(-0.437841\pi\)
0.194040 + 0.980994i \(0.437841\pi\)
\(98\) −23.1606 136.644i −0.0238732 0.140848i
\(99\) 530.521i 0.538579i
\(100\) −334.921 + 116.894i −0.334921 + 0.116894i
\(101\) 621.424i 0.612218i 0.951997 + 0.306109i \(0.0990272\pi\)
−0.951997 + 0.306109i \(0.900973\pi\)
\(102\) −936.745 + 158.775i −0.909329 + 0.154128i
\(103\) 433.871 0.415054 0.207527 0.978229i \(-0.433458\pi\)
0.207527 + 0.978229i \(0.433458\pi\)
\(104\) 1086.83 598.970i 1.02473 0.564748i
\(105\) 188.601 0.175291
\(106\) −1942.04 + 329.169i −1.77951 + 0.301620i
\(107\) 926.967i 0.837508i −0.908100 0.418754i \(-0.862467\pi\)
0.908100 0.418754i \(-0.137533\pi\)
\(108\) 71.1775 + 203.936i 0.0634172 + 0.181701i
\(109\) 1423.90i 1.25123i 0.780131 + 0.625617i \(0.215153\pi\)
−0.780131 + 0.625617i \(0.784847\pi\)
\(110\) −250.229 1476.31i −0.216895 1.27965i
\(111\) −394.035 −0.336938
\(112\) −350.706 + 278.764i −0.295880 + 0.235185i
\(113\) −2027.39 −1.68779 −0.843897 0.536505i \(-0.819744\pi\)
−0.843897 + 0.536505i \(0.819744\pi\)
\(114\) −54.7441 322.982i −0.0449760 0.265351i
\(115\) 1007.18i 0.816699i
\(116\) 617.931 + 1770.48i 0.494599 + 1.41711i
\(117\) 493.585i 0.390016i
\(118\) −1137.18 + 192.747i −0.887165 + 0.150371i
\(119\) 783.797 0.603786
\(120\) −294.260 533.933i −0.223851 0.406176i
\(121\) −2143.72 −1.61061
\(122\) −346.938 + 58.8047i −0.257461 + 0.0436387i
\(123\) 1501.50i 1.10070i
\(124\) 1359.82 474.602i 0.984800 0.343714i
\(125\) 1520.86i 1.08824i
\(126\) −29.7779 175.685i −0.0210542 0.124216i
\(127\) −482.735 −0.337290 −0.168645 0.985677i \(-0.553939\pi\)
−0.168645 + 0.985677i \(0.553939\pi\)
\(128\) 1336.37 + 557.922i 0.922806 + 0.385264i
\(129\) −1485.25 −1.01371
\(130\) −232.808 1373.53i −0.157066 0.926666i
\(131\) 1448.68i 0.966193i 0.875567 + 0.483097i \(0.160488\pi\)
−0.875567 + 0.483097i \(0.839512\pi\)
\(132\) −1335.71 + 466.187i −0.880744 + 0.307397i
\(133\) 270.247i 0.176191i
\(134\) −401.142 + 67.9920i −0.258608 + 0.0438330i
\(135\) 242.487 0.154592
\(136\) −1222.90 2218.94i −0.771050 1.39907i
\(137\) −1043.62 −0.650823 −0.325412 0.945572i \(-0.605503\pi\)
−0.325412 + 0.945572i \(0.605503\pi\)
\(138\) 938.211 159.023i 0.578738 0.0980938i
\(139\) 630.925i 0.384995i −0.981297 0.192498i \(-0.938341\pi\)
0.981297 0.192498i \(-0.0616588\pi\)
\(140\) 165.730 + 474.845i 0.100048 + 0.286655i
\(141\) 335.114i 0.200154i
\(142\) −118.800 700.903i −0.0702077 0.414214i
\(143\) −3232.80 −1.89049
\(144\) −450.908 + 358.411i −0.260942 + 0.207413i
\(145\) 2105.16 1.20568
\(146\) 335.447 + 1979.08i 0.190149 + 1.12185i
\(147\) 147.000i 0.0824786i
\(148\) −346.252 992.071i −0.192309 0.550998i
\(149\) 562.011i 0.309005i −0.987992 0.154502i \(-0.950623\pi\)
0.987992 0.154502i \(-0.0493775\pi\)
\(150\) 370.962 62.8765i 0.201926 0.0342256i
\(151\) −466.027 −0.251157 −0.125579 0.992084i \(-0.540079\pi\)
−0.125579 + 0.992084i \(0.540079\pi\)
\(152\) 765.074 421.646i 0.408261 0.225000i
\(153\) 1007.74 0.532489
\(154\) 1150.67 195.035i 0.602104 0.102054i
\(155\) 1616.87i 0.837872i
\(156\) −1242.71 + 433.730i −0.637798 + 0.222604i
\(157\) 314.250i 0.159745i 0.996805 + 0.0798723i \(0.0254513\pi\)
−0.996805 + 0.0798723i \(0.974549\pi\)
\(158\) −409.285 2414.72i −0.206082 1.21585i
\(159\) 2089.23 1.04205
\(160\) 1085.72 1210.05i 0.536460 0.597893i
\(161\) −785.023 −0.384276
\(162\) −38.2859 225.881i −0.0185681 0.109549i
\(163\) 1926.67i 0.925820i 0.886405 + 0.462910i \(0.153195\pi\)
−0.886405 + 0.462910i \(0.846805\pi\)
\(164\) 3780.36 1319.42i 1.79998 0.628228i
\(165\) 1588.20i 0.749341i
\(166\) 160.037 27.1256i 0.0748270 0.0126829i
\(167\) 1454.39 0.673917 0.336958 0.941520i \(-0.390602\pi\)
0.336958 + 0.941520i \(0.390602\pi\)
\(168\) 416.160 229.353i 0.191116 0.105327i
\(169\) −810.727 −0.369016
\(170\) −2804.30 + 475.318i −1.26518 + 0.214442i
\(171\) 347.460i 0.155386i
\(172\) −1305.14 3739.45i −0.578581 1.65773i
\(173\) 3142.64i 1.38110i −0.723284 0.690550i \(-0.757368\pi\)
0.723284 0.690550i \(-0.242632\pi\)
\(174\) −332.382 1961.00i −0.144815 0.854384i
\(175\) −310.392 −0.134077
\(176\) −2347.46 2953.28i −1.00538 1.26484i
\(177\) 1223.36 0.519511
\(178\) 361.801 + 2134.57i 0.152349 + 0.898834i
\(179\) 608.194i 0.253958i 0.991905 + 0.126979i \(0.0405281\pi\)
−0.991905 + 0.126979i \(0.959472\pi\)
\(180\) 213.081 + 610.515i 0.0882342 + 0.252806i
\(181\) 3075.47i 1.26297i −0.775387 0.631486i \(-0.782445\pi\)
0.775387 0.631486i \(-0.217555\pi\)
\(182\) 1070.56 181.456i 0.436018 0.0739034i
\(183\) 373.232 0.150766
\(184\) 1224.81 + 2222.42i 0.490731 + 0.890428i
\(185\) −1179.61 −0.468792
\(186\) −1506.14 + 255.286i −0.593741 + 0.100637i
\(187\) 6600.33i 2.58109i
\(188\) −843.725 + 294.476i −0.327314 + 0.114239i
\(189\) 189.000i 0.0727393i
\(190\) −163.886 966.899i −0.0625764 0.369191i
\(191\) −222.395 −0.0842509 −0.0421255 0.999112i \(-0.513413\pi\)
−0.0421255 + 0.999112i \(0.513413\pi\)
\(192\) −1298.61 820.314i −0.488119 0.308339i
\(193\) 2275.04 0.848502 0.424251 0.905545i \(-0.360537\pi\)
0.424251 + 0.905545i \(0.360537\pi\)
\(194\) −175.240 1033.89i −0.0648531 0.382623i
\(195\) 1477.63i 0.542641i
\(196\) −370.106 + 129.174i −0.134878 + 0.0470750i
\(197\) 140.119i 0.0506754i −0.999679 0.0253377i \(-0.991934\pi\)
0.999679 0.0253377i \(-0.00806610\pi\)
\(198\) 1479.44 250.759i 0.531006 0.0900034i
\(199\) 1003.14 0.357342 0.178671 0.983909i \(-0.442820\pi\)
0.178671 + 0.983909i \(0.442820\pi\)
\(200\) 484.282 + 878.727i 0.171220 + 0.310677i
\(201\) 431.544 0.151437
\(202\) 1732.94 293.726i 0.603609 0.102309i
\(203\) 1640.81i 0.567303i
\(204\) 885.535 + 2537.21i 0.303921 + 0.870785i
\(205\) 4494.99i 1.53143i
\(206\) −205.076 1209.92i −0.0693608 0.409218i
\(207\) −1009.32 −0.338900
\(208\) −2184.02 2747.67i −0.728052 0.915945i
\(209\) −2275.74 −0.753187
\(210\) −89.1452 525.942i −0.0292933 0.172826i
\(211\) 2462.02i 0.803283i −0.915797 0.401641i \(-0.868440\pi\)
0.915797 0.401641i \(-0.131560\pi\)
\(212\) 1835.88 + 5260.10i 0.594757 + 1.70408i
\(213\) 754.023i 0.242558i
\(214\) −2584.99 + 438.146i −0.825730 + 0.139958i
\(215\) −4446.33 −1.41041
\(216\) 535.063 294.883i 0.168548 0.0928899i
\(217\) 1260.23 0.394239
\(218\) 3970.75 673.027i 1.23364 0.209097i
\(219\) 2129.07i 0.656938i
\(220\) −3998.65 + 1395.61i −1.22541 + 0.427690i
\(221\) 6140.80i 1.86912i
\(222\) 186.247 + 1098.83i 0.0563066 + 0.332200i
\(223\) 6458.67 1.93948 0.969741 0.244138i \(-0.0785050\pi\)
0.969741 + 0.244138i \(0.0785050\pi\)
\(224\) 943.142 + 846.236i 0.281323 + 0.252417i
\(225\) −399.076 −0.118245
\(226\) 958.278 + 5653.69i 0.282052 + 1.66406i
\(227\) 1776.16i 0.519329i −0.965699 0.259664i \(-0.916388\pi\)
0.965699 0.259664i \(-0.0836120\pi\)
\(228\) −874.808 + 305.325i −0.254104 + 0.0886870i
\(229\) 2046.20i 0.590466i 0.955425 + 0.295233i \(0.0953972\pi\)
−0.955425 + 0.295233i \(0.904603\pi\)
\(230\) 2808.69 476.062i 0.805215 0.136481i
\(231\) −1237.88 −0.352583
\(232\) 4645.18 2560.04i 1.31453 0.724461i
\(233\) 5827.32 1.63846 0.819229 0.573467i \(-0.194402\pi\)
0.819229 + 0.573467i \(0.194402\pi\)
\(234\) 1376.44 233.301i 0.384532 0.0651767i
\(235\) 1003.22i 0.278480i
\(236\) 1075.01 + 3080.08i 0.296513 + 0.849561i
\(237\) 2597.73i 0.711985i
\(238\) −370.474 2185.74i −0.100900 0.595296i
\(239\) −5894.12 −1.59523 −0.797613 0.603169i \(-0.793904\pi\)
−0.797613 + 0.603169i \(0.793904\pi\)
\(240\) −1349.87 + 1072.96i −0.363056 + 0.288580i
\(241\) −2057.48 −0.549934 −0.274967 0.961454i \(-0.588667\pi\)
−0.274967 + 0.961454i \(0.588667\pi\)
\(242\) 1013.26 + 5978.09i 0.269153 + 1.58796i
\(243\) 243.000i 0.0641500i
\(244\) 327.972 + 939.695i 0.0860501 + 0.246548i
\(245\) 440.069i 0.114755i
\(246\) −4187.16 + 709.708i −1.08522 + 0.183940i
\(247\) −2117.30 −0.545426
\(248\) −1966.24 3567.73i −0.503453 0.913512i
\(249\) −172.166 −0.0438175
\(250\) 4241.14 718.857i 1.07293 0.181858i
\(251\) 5593.16i 1.40652i −0.710932 0.703261i \(-0.751727\pi\)
0.710932 0.703261i \(-0.248273\pi\)
\(252\) −475.850 + 166.081i −0.118951 + 0.0415163i
\(253\) 6610.65i 1.64272i
\(254\) 228.172 + 1346.18i 0.0563654 + 0.332547i
\(255\) 3016.83 0.740868
\(256\) 924.195 3990.37i 0.225634 0.974212i
\(257\) 1528.67 0.371035 0.185517 0.982641i \(-0.440604\pi\)
0.185517 + 0.982641i \(0.440604\pi\)
\(258\) 702.026 + 4141.84i 0.169404 + 0.999457i
\(259\) 919.415i 0.220578i
\(260\) −3720.26 + 1298.44i −0.887387 + 0.309715i
\(261\) 2109.62i 0.500315i
\(262\) 4039.85 684.739i 0.952607 0.161463i
\(263\) −2983.60 −0.699530 −0.349765 0.936837i \(-0.613739\pi\)
−0.349765 + 0.936837i \(0.613739\pi\)
\(264\) 1931.38 + 3504.47i 0.450257 + 0.816989i
\(265\) 6254.45 1.44984
\(266\) 753.624 127.736i 0.173713 0.0294437i
\(267\) 2296.34i 0.526344i
\(268\) 379.212 + 1086.51i 0.0864332 + 0.247646i
\(269\) 5552.68i 1.25856i 0.777178 + 0.629281i \(0.216650\pi\)
−0.777178 + 0.629281i \(0.783350\pi\)
\(270\) −114.615 676.212i −0.0258343 0.152418i
\(271\) −4238.12 −0.949990 −0.474995 0.879988i \(-0.657550\pi\)
−0.474995 + 0.879988i \(0.657550\pi\)
\(272\) −5609.84 + 4459.06i −1.25054 + 0.994009i
\(273\) −1151.70 −0.255326
\(274\) 493.285 + 2910.30i 0.108761 + 0.641671i
\(275\) 2613.80i 0.573157i
\(276\) −886.920 2541.18i −0.193429 0.554207i
\(277\) 3761.88i 0.815990i −0.912984 0.407995i \(-0.866228\pi\)
0.912984 0.407995i \(-0.133772\pi\)
\(278\) −1759.43 + 298.217i −0.379582 + 0.0643376i
\(279\) 1620.29 0.347686
\(280\) 1245.84 686.606i 0.265905 0.146545i
\(281\) 1343.51 0.285221 0.142610 0.989779i \(-0.454450\pi\)
0.142610 + 0.989779i \(0.454450\pi\)
\(282\) 934.517 158.397i 0.197339 0.0334482i
\(283\) 2863.45i 0.601463i 0.953709 + 0.300732i \(0.0972309\pi\)
−0.953709 + 0.300732i \(0.902769\pi\)
\(284\) −1898.42 + 662.586i −0.396657 + 0.138441i
\(285\) 1040.18i 0.216192i
\(286\) 1528.04 + 9015.16i 0.315925 + 1.86391i
\(287\) 3503.50 0.720575
\(288\) 1212.61 + 1088.02i 0.248104 + 0.222611i
\(289\) 7624.50 1.55190
\(290\) −995.039 5870.57i −0.201485 1.18873i
\(291\) 1112.24i 0.224058i
\(292\) 5360.42 1870.89i 1.07430 0.374950i
\(293\) 3539.23i 0.705680i −0.935684 0.352840i \(-0.885216\pi\)
0.935684 0.352840i \(-0.114784\pi\)
\(294\) 409.932 69.4819i 0.0813188 0.0137832i
\(295\) 3662.33 0.722810
\(296\) −2602.88 + 1434.49i −0.511113 + 0.281683i
\(297\) −1591.56 −0.310949
\(298\) −1567.25 + 265.643i −0.304660 + 0.0516386i
\(299\) 6150.41i 1.18959i
\(300\) −350.682 1004.76i −0.0674887 0.193367i
\(301\) 3465.58i 0.663630i
\(302\) 220.275 + 1299.59i 0.0419716 + 0.247626i
\(303\) −1864.27 −0.353464
\(304\) −1537.45 1934.23i −0.290061 0.364920i
\(305\) 1117.33 0.209765
\(306\) −476.324 2810.23i −0.0889857 0.525001i
\(307\) 3008.84i 0.559360i −0.960093 0.279680i \(-0.909772\pi\)
0.960093 0.279680i \(-0.0902283\pi\)
\(308\) −1087.77 3116.65i −0.201238 0.576582i
\(309\) 1301.61i 0.239632i
\(310\) −4508.89 + 764.240i −0.826090 + 0.140019i
\(311\) 3951.63 0.720503 0.360252 0.932855i \(-0.382691\pi\)
0.360252 + 0.932855i \(0.382691\pi\)
\(312\) 1796.91 + 3260.48i 0.326057 + 0.591629i
\(313\) −262.745 −0.0474479 −0.0237240 0.999719i \(-0.507552\pi\)
−0.0237240 + 0.999719i \(0.507552\pi\)
\(314\) 876.336 148.535i 0.157498 0.0266954i
\(315\) 565.803i 0.101204i
\(316\) −6540.36 + 2282.71i −1.16432 + 0.406369i
\(317\) 5155.26i 0.913401i −0.889621 0.456700i \(-0.849031\pi\)
0.889621 0.456700i \(-0.150969\pi\)
\(318\) −987.507 5826.13i −0.174140 1.02740i
\(319\) −13817.2 −2.42513
\(320\) −3887.59 2455.75i −0.679135 0.429001i
\(321\) 2780.90 0.483535
\(322\) 371.054 + 2189.16i 0.0642174 + 0.378873i
\(323\) 4322.83i 0.744670i
\(324\) −611.807 + 213.532i −0.104905 + 0.0366139i
\(325\) 2431.83i 0.415057i
\(326\) 5372.82 910.673i 0.912801 0.154716i
\(327\) −4271.69 −0.722400
\(328\) −5466.25 9918.48i −0.920193 1.66968i
\(329\) −781.933 −0.131031
\(330\) 4428.94 750.688i 0.738804 0.125224i
\(331\) 6802.50i 1.12961i −0.825226 0.564803i \(-0.808952\pi\)
0.825226 0.564803i \(-0.191048\pi\)
\(332\) −151.288 433.466i −0.0250091 0.0716553i
\(333\) 1182.10i 0.194531i
\(334\) −687.440 4055.79i −0.112620 0.664440i
\(335\) 1291.90 0.210698
\(336\) −836.291 1052.12i −0.135784 0.170827i
\(337\) 433.772 0.0701159 0.0350580 0.999385i \(-0.488838\pi\)
0.0350580 + 0.999385i \(0.488838\pi\)
\(338\) 383.203 + 2260.84i 0.0616672 + 0.363826i
\(339\) 6082.17i 0.974449i
\(340\) 2650.99 + 7595.55i 0.422854 + 1.21155i
\(341\) 10612.3i 1.68531i
\(342\) 968.945 164.232i 0.153200 0.0259669i
\(343\) −343.000 −0.0539949
\(344\) −9811.12 + 5407.09i −1.53773 + 0.847473i
\(345\) −3021.55 −0.471521
\(346\) −8763.73 + 1485.42i −1.36168 + 0.230799i
\(347\) 4388.13i 0.678867i −0.940630 0.339434i \(-0.889765\pi\)
0.940630 0.339434i \(-0.110235\pi\)
\(348\) −5311.44 + 1853.79i −0.818169 + 0.285557i
\(349\) 1270.81i 0.194914i 0.995240 + 0.0974571i \(0.0310709\pi\)
−0.995240 + 0.0974571i \(0.968929\pi\)
\(350\) 146.712 + 865.577i 0.0224059 + 0.132192i
\(351\) −1480.75 −0.225176
\(352\) −7126.12 + 7942.17i −1.07904 + 1.20261i
\(353\) 12777.9 1.92663 0.963315 0.268375i \(-0.0864865\pi\)
0.963315 + 0.268375i \(0.0864865\pi\)
\(354\) −578.241 3411.53i −0.0868168 0.512205i
\(355\) 2257.29i 0.337478i
\(356\) 5781.55 2017.87i 0.860735 0.300413i
\(357\) 2351.39i 0.348596i
\(358\) 1696.04 287.472i 0.250387 0.0424396i
\(359\) 6124.58 0.900399 0.450199 0.892928i \(-0.351353\pi\)
0.450199 + 0.892928i \(0.351353\pi\)
\(360\) 1601.80 882.780i 0.234506 0.129240i
\(361\) 5368.53 0.782698
\(362\) −8576.43 + 1453.67i −1.24521 + 0.211059i
\(363\) 6431.16i 0.929885i
\(364\) −1012.04 2899.66i −0.145728 0.417537i
\(365\) 6373.73i 0.914017i
\(366\) −176.414 1040.81i −0.0251948 0.148645i
\(367\) −3190.01 −0.453725 −0.226863 0.973927i \(-0.572847\pi\)
−0.226863 + 0.973927i \(0.572847\pi\)
\(368\) 5618.62 4466.04i 0.795899 0.632632i
\(369\) 4504.50 0.635488
\(370\) 557.560 + 3289.52i 0.0783410 + 0.462200i
\(371\) 4874.87i 0.682185i
\(372\) 1423.81 + 4079.45i 0.198443 + 0.568574i
\(373\) 8037.61i 1.11574i −0.829928 0.557871i \(-0.811618\pi\)
0.829928 0.557871i \(-0.188382\pi\)
\(374\) 18406.0 3119.75i 2.54479 0.431333i
\(375\) −4562.57 −0.628294
\(376\) 1219.99 + 2213.67i 0.167331 + 0.303620i
\(377\) −12855.3 −1.75618
\(378\) 527.055 89.3338i 0.0717164 0.0121557i
\(379\) 3762.31i 0.509913i 0.966953 + 0.254956i \(0.0820611\pi\)
−0.966953 + 0.254956i \(0.917939\pi\)
\(380\) −2618.88 + 914.040i −0.353542 + 0.123393i
\(381\) 1448.21i 0.194734i
\(382\) 105.118 + 620.182i 0.0140794 + 0.0830662i
\(383\) 9479.32 1.26468 0.632338 0.774693i \(-0.282096\pi\)
0.632338 + 0.774693i \(0.282096\pi\)
\(384\) −1673.76 + 4009.10i −0.222432 + 0.532783i
\(385\) −3705.80 −0.490559
\(386\) −1075.33 6344.30i −0.141795 0.836571i
\(387\) 4455.74i 0.585267i
\(388\) −2800.33 + 977.367i −0.366405 + 0.127882i
\(389\) 6672.27i 0.869660i 0.900513 + 0.434830i \(0.143192\pi\)
−0.900513 + 0.434830i \(0.856808\pi\)
\(390\) 4120.59 698.424i 0.535011 0.0906822i
\(391\) −12557.1 −1.62415
\(392\) 535.158 + 971.040i 0.0689529 + 0.125115i
\(393\) −4346.03 −0.557832
\(394\) −390.743 + 66.2294i −0.0499628 + 0.00846850i
\(395\) 7776.72i 0.990606i
\(396\) −1398.56 4007.12i −0.177475 0.508498i
\(397\) 13824.8i 1.74772i 0.486178 + 0.873860i \(0.338391\pi\)
−0.486178 + 0.873860i \(0.661609\pi\)
\(398\) −474.152 2797.42i −0.0597163 0.352317i
\(399\) −810.740 −0.101724
\(400\) 2221.56 1765.84i 0.277695 0.220730i
\(401\) −137.695 −0.0171475 −0.00857377 0.999963i \(-0.502729\pi\)
−0.00857377 + 0.999963i \(0.502729\pi\)
\(402\) −203.976 1203.43i −0.0253070 0.149307i
\(403\) 9873.48i 1.22043i
\(404\) −1638.20 4693.72i −0.201741 0.578023i
\(405\) 727.460i 0.0892538i
\(406\) 4575.66 775.557i 0.559326 0.0948036i
\(407\) 7742.36 0.942935
\(408\) 6656.83 3668.70i 0.807751 0.445166i
\(409\) −12325.1 −1.49007 −0.745034 0.667027i \(-0.767567\pi\)
−0.745034 + 0.667027i \(0.767567\pi\)
\(410\) −12535.0 + 2124.63i −1.50990 + 0.255922i
\(411\) 3130.87i 0.375753i
\(412\) −3277.10 + 1143.77i −0.391872 + 0.136771i
\(413\) 2854.51i 0.340100i
\(414\) 477.069 + 2814.63i 0.0566345 + 0.334134i
\(415\) −515.407 −0.0609646
\(416\) −6629.98 + 7389.22i −0.781398 + 0.870880i
\(417\) 1892.78 0.222277
\(418\) 1075.66 + 6346.24i 0.125867 + 0.742595i
\(419\) 3339.25i 0.389339i −0.980869 0.194670i \(-0.937637\pi\)
0.980869 0.194670i \(-0.0623635\pi\)
\(420\) −1424.53 + 497.190i −0.165500 + 0.0577628i
\(421\) 3287.17i 0.380539i −0.981732 0.190270i \(-0.939064\pi\)
0.981732 0.190270i \(-0.0609362\pi\)
\(422\) −6865.73 + 1163.71i −0.791987 + 0.134239i
\(423\) −1005.34 −0.115559
\(424\) 13800.8 7605.89i 1.58073 0.871167i
\(425\) −4964.99 −0.566677
\(426\) 2102.71 356.401i 0.239147 0.0405345i
\(427\) 870.874i 0.0986992i
\(428\) 2443.67 + 7001.55i 0.275980 + 0.790730i
\(429\) 9698.41i 1.09148i
\(430\) 2101.63 + 12399.3i 0.235697 + 1.39057i
\(431\) −12701.9 −1.41955 −0.709776 0.704427i \(-0.751204\pi\)
−0.709776 + 0.704427i \(0.751204\pi\)
\(432\) −1075.23 1352.72i −0.119750 0.150655i
\(433\) −11643.1 −1.29222 −0.646108 0.763246i \(-0.723604\pi\)
−0.646108 + 0.763246i \(0.723604\pi\)
\(434\) −595.667 3514.34i −0.0658823 0.388695i
\(435\) 6315.49i 0.696102i
\(436\) −3753.68 10754.9i −0.412313 1.18135i
\(437\) 4329.59i 0.473941i
\(438\) −5937.24 + 1006.34i −0.647700 + 0.109783i
\(439\) −11073.2 −1.20386 −0.601930 0.798549i \(-0.705601\pi\)
−0.601930 + 0.798549i \(0.705601\pi\)
\(440\) 5781.89 + 10491.2i 0.626456 + 1.13670i
\(441\) −441.000 −0.0476190
\(442\) 17124.6 2902.55i 1.84283 0.312353i
\(443\) 7274.35i 0.780168i −0.920779 0.390084i \(-0.872446\pi\)
0.920779 0.390084i \(-0.127554\pi\)
\(444\) 2976.21 1038.76i 0.318119 0.111030i
\(445\) 6874.47i 0.732318i
\(446\) −3052.79 18011.0i −0.324112 1.91221i
\(447\) 1686.03 0.178404
\(448\) 1914.07 3030.08i 0.201855 0.319549i
\(449\) 9735.36 1.02325 0.511626 0.859208i \(-0.329043\pi\)
0.511626 + 0.859208i \(0.329043\pi\)
\(450\) 188.630 + 1112.88i 0.0197602 + 0.116582i
\(451\) 29502.8i 3.08034i
\(452\) 15313.2 5344.61i 1.59353 0.556171i
\(453\) 1398.08i 0.145006i
\(454\) −4953.09 + 839.529i −0.512026 + 0.0867864i
\(455\) −3447.80 −0.355242
\(456\) 1264.94 + 2295.22i 0.129904 + 0.235710i
\(457\) 2155.33 0.220617 0.110309 0.993897i \(-0.464816\pi\)
0.110309 + 0.993897i \(0.464816\pi\)
\(458\) 5706.14 967.168i 0.582162 0.0986742i
\(459\) 3023.22i 0.307433i
\(460\) −2655.14 7607.44i −0.269123 0.771084i
\(461\) 3606.81i 0.364395i −0.983262 0.182197i \(-0.941679\pi\)
0.983262 0.182197i \(-0.0583209\pi\)
\(462\) 585.104 + 3452.02i 0.0589210 + 0.347625i
\(463\) 8719.74 0.875250 0.437625 0.899158i \(-0.355820\pi\)
0.437625 + 0.899158i \(0.355820\pi\)
\(464\) −9334.68 11743.7i −0.933948 1.17498i
\(465\) 4850.61 0.483746
\(466\) −2754.38 16250.4i −0.273807 1.61542i
\(467\) 9661.28i 0.957325i 0.877999 + 0.478662i \(0.158878\pi\)
−0.877999 + 0.478662i \(0.841122\pi\)
\(468\) −1301.19 3728.13i −0.128520 0.368233i
\(469\) 1006.94i 0.0991386i
\(470\) 2797.63 474.187i 0.274564 0.0465375i
\(471\) −942.751 −0.0922286
\(472\) 8081.17 4453.68i 0.788063 0.434316i
\(473\) 29183.5 2.83691
\(474\) 7244.16 1227.86i 0.701973 0.118982i
\(475\) 1711.89i 0.165362i
\(476\) −5920.15 + 2066.25i −0.570063 + 0.198963i
\(477\) 6267.69i 0.601630i
\(478\) 2785.95 + 16436.7i 0.266582 + 1.57279i
\(479\) 7341.60 0.700306 0.350153 0.936693i \(-0.386130\pi\)
0.350153 + 0.936693i \(0.386130\pi\)
\(480\) 3630.15 + 3257.16i 0.345194 + 0.309726i
\(481\) 7203.32 0.682834
\(482\) 972.502 + 5737.61i 0.0919010 + 0.542201i
\(483\) 2355.07i 0.221862i
\(484\) 16191.9 5651.28i 1.52065 0.530736i
\(485\) 3329.69i 0.311739i
\(486\) 677.643 114.858i 0.0632479 0.0107203i
\(487\) 14785.8 1.37579 0.687894 0.725811i \(-0.258535\pi\)
0.687894 + 0.725811i \(0.258535\pi\)
\(488\) 2465.46 1358.76i 0.228701 0.126041i
\(489\) −5780.02 −0.534523
\(490\) 1227.20 208.005i 0.113141 0.0191770i
\(491\) 7352.33i 0.675776i −0.941186 0.337888i \(-0.890288\pi\)
0.941186 0.337888i \(-0.109712\pi\)
\(492\) 3958.26 + 11341.1i 0.362707 + 1.03922i
\(493\) 26246.2i 2.39771i
\(494\) 1000.77 + 5904.40i 0.0911476 + 0.537756i
\(495\) −4764.60 −0.432632
\(496\) −9019.79 + 7169.51i −0.816533 + 0.649033i
\(497\) −1759.39 −0.158791
\(498\) 81.3769 + 480.111i 0.00732246 + 0.0432014i
\(499\) 16803.9i 1.50751i 0.657157 + 0.753754i \(0.271759\pi\)
−0.657157 + 0.753754i \(0.728241\pi\)
\(500\) −4009.29 11487.3i −0.358602 1.02746i
\(501\) 4363.17i 0.389086i
\(502\) −15597.4 + 2643.69i −1.38674 + 0.235047i
\(503\) 3372.87 0.298984 0.149492 0.988763i \(-0.452236\pi\)
0.149492 + 0.988763i \(0.452236\pi\)
\(504\) 688.060 + 1248.48i 0.0608107 + 0.110341i
\(505\) −5581.00 −0.491785
\(506\) −18434.8 + 3124.63i −1.61962 + 0.274519i
\(507\) 2432.18i 0.213051i
\(508\) 3646.18 1272.59i 0.318451 0.111146i
\(509\) 1413.69i 0.123106i −0.998104 0.0615530i \(-0.980395\pi\)
0.998104 0.0615530i \(-0.0196053\pi\)
\(510\) −1425.95 8412.90i −0.123808 0.730450i
\(511\) 4967.83 0.430067
\(512\) −11564.6 691.147i −0.998219 0.0596575i
\(513\) −1042.38 −0.0897119
\(514\) −722.551 4262.93i −0.0620046 0.365817i
\(515\) 3896.59i 0.333407i
\(516\) 11218.3 3915.41i 0.957093 0.334044i
\(517\) 6584.63i 0.560139i
\(518\) −2563.93 + 434.576i −0.217476 + 0.0368613i
\(519\) 9427.92 0.797379
\(520\) 5379.34 + 9760.78i 0.453653 + 0.823151i
\(521\) −20868.7 −1.75484 −0.877422 0.479720i \(-0.840738\pi\)
−0.877422 + 0.479720i \(0.840738\pi\)
\(522\) 5882.99 997.145i 0.493279 0.0836089i
\(523\) 17290.7i 1.44564i −0.691035 0.722821i \(-0.742845\pi\)
0.691035 0.722821i \(-0.257155\pi\)
\(524\) −3819.00 10942.1i −0.318385 0.912228i
\(525\) 931.177i 0.0774094i
\(526\) 1410.24 + 8320.21i 0.116900 + 0.689693i
\(527\) 20158.4 1.66625
\(528\) 8859.85 7042.38i 0.730257 0.580455i
\(529\) 409.770 0.0336788
\(530\) −2956.26 17441.5i −0.242287 1.42945i
\(531\) 3670.08i 0.299940i
\(532\) −712.425 2041.22i −0.0580593 0.166350i
\(533\) 27448.8i 2.23066i
\(534\) −6403.70 + 1085.40i −0.518942 + 0.0879587i
\(535\) 8325.09 0.672757
\(536\) 2850.66 1571.05i 0.229719 0.126602i
\(537\) −1824.58 −0.146623
\(538\) 15484.5 2624.56i 1.24086 0.210321i
\(539\) 2888.39i 0.230820i
\(540\) −1831.54 + 639.244i −0.145958 + 0.0509420i
\(541\) 4714.93i 0.374696i −0.982294 0.187348i \(-0.940011\pi\)
0.982294 0.187348i \(-0.0599892\pi\)
\(542\) 2003.21 + 11818.6i 0.158755 + 0.936631i
\(543\) 9226.42 0.729178
\(544\) 15086.4 + 13536.3i 1.18901 + 1.06684i
\(545\) −12788.0 −1.00510
\(546\) 544.368 + 3211.69i 0.0426681 + 0.251735i
\(547\) 11384.3i 0.889868i −0.895563 0.444934i \(-0.853227\pi\)
0.895563 0.444934i \(-0.146773\pi\)
\(548\) 7882.67 2751.20i 0.614473 0.214463i
\(549\) 1119.70i 0.0870445i
\(550\) −7288.99 + 1235.46i −0.565098 + 0.0957818i
\(551\) −9049.48 −0.699675
\(552\) −6667.25 + 3674.44i −0.514089 + 0.283324i
\(553\) −6061.36 −0.466104
\(554\) −10490.6 + 1778.11i −0.804515 + 0.136362i
\(555\) 3538.82i 0.270657i
\(556\) 1663.25 + 4765.49i 0.126866 + 0.363492i
\(557\) 1616.13i 0.122940i 0.998109 + 0.0614699i \(0.0195788\pi\)
−0.998109 + 0.0614699i \(0.980421\pi\)
\(558\) −765.857 4518.43i −0.0581027 0.342797i
\(559\) 27151.7 2.05437
\(560\) −2503.57 3149.69i −0.188920 0.237676i
\(561\) −19801.0 −1.49019
\(562\) −635.031 3746.58i −0.0476640 0.281210i
\(563\) 2529.62i 0.189362i 0.995508 + 0.0946811i \(0.0301831\pi\)
−0.995508 + 0.0946811i \(0.969817\pi\)
\(564\) −883.429 2531.18i −0.0659558 0.188975i
\(565\) 18208.0i 1.35578i
\(566\) 7985.16 1353.45i 0.593006 0.100512i
\(567\) −567.000 −0.0419961
\(568\) 2745.04 + 4980.86i 0.202781 + 0.367944i
\(569\) 5697.25 0.419756 0.209878 0.977728i \(-0.432693\pi\)
0.209878 + 0.977728i \(0.432693\pi\)
\(570\) 2900.70 491.657i 0.213152 0.0361285i
\(571\) 15930.1i 1.16752i −0.811926 0.583760i \(-0.801581\pi\)
0.811926 0.583760i \(-0.198419\pi\)
\(572\) 24417.9 8522.32i 1.78490 0.622965i
\(573\) 667.184i 0.0486423i
\(574\) −1655.98 9770.05i −0.120417 0.710442i
\(575\) 4972.76 0.360658
\(576\) 2460.94 3895.82i 0.178020 0.281816i
\(577\) −9446.91 −0.681595 −0.340797 0.940137i \(-0.610697\pi\)
−0.340797 + 0.940137i \(0.610697\pi\)
\(578\) −3603.84 21262.1i −0.259343 1.53008i
\(579\) 6825.12i 0.489883i
\(580\) −15900.7 + 5549.64i −1.13834 + 0.397304i
\(581\) 401.720i 0.0286853i
\(582\) 3101.67 525.720i 0.220907 0.0374430i
\(583\) −41051.1 −2.91623
\(584\) −7750.94 14064.0i −0.549206 0.996531i
\(585\) −4432.88 −0.313294
\(586\) −9869.69 + 1672.87i −0.695756 + 0.117928i
\(587\) 17574.2i 1.23571i 0.786290 + 0.617857i \(0.211999\pi\)
−0.786290 + 0.617857i \(0.788001\pi\)
\(588\) −387.522 1110.32i −0.0271788 0.0778719i
\(589\) 6950.45i 0.486228i
\(590\) −1731.06 10213.0i −0.120791 0.712646i
\(591\) 420.356 0.0292575
\(592\) 5230.60 + 6580.50i 0.363136 + 0.456853i
\(593\) 6137.13 0.424995 0.212497 0.977162i \(-0.431840\pi\)
0.212497 + 0.977162i \(0.431840\pi\)
\(594\) 752.277 + 4438.32i 0.0519635 + 0.306576i
\(595\) 7039.27i 0.485012i
\(596\) 1481.57 + 4244.97i 0.101825 + 0.291746i
\(597\) 3009.43i 0.206311i
\(598\) −17151.3 + 2907.09i −1.17286 + 0.198795i
\(599\) −26532.1 −1.80980 −0.904901 0.425622i \(-0.860055\pi\)
−0.904901 + 0.425622i \(0.860055\pi\)
\(600\) −2636.18 + 1452.85i −0.179369 + 0.0988537i
\(601\) −6237.94 −0.423379 −0.211690 0.977337i \(-0.567897\pi\)
−0.211690 + 0.977337i \(0.567897\pi\)
\(602\) −9664.30 + 1638.06i −0.654298 + 0.110901i
\(603\) 1294.63i 0.0874320i
\(604\) 3519.99 1228.54i 0.237130 0.0827627i
\(605\) 19252.7i 1.29378i
\(606\) 881.178 + 5198.81i 0.0590683 + 0.348494i
\(607\) 2650.63 0.177242 0.0886209 0.996065i \(-0.471754\pi\)
0.0886209 + 0.996065i \(0.471754\pi\)
\(608\) −4667.19 + 5201.65i −0.311315 + 0.346965i
\(609\) −4922.44 −0.327533
\(610\) −528.124 3115.85i −0.0350543 0.206815i
\(611\) 6126.19i 0.405629i
\(612\) −7611.63 + 2656.60i −0.502748 + 0.175469i
\(613\) 2531.31i 0.166784i −0.996517 0.0833921i \(-0.973425\pi\)
0.996517 0.0833921i \(-0.0265754\pi\)
\(614\) −8390.60 + 1422.17i −0.551494 + 0.0934760i
\(615\) 13485.0 0.884172
\(616\) −8177.09 + 4506.54i −0.534845 + 0.294763i
\(617\) 22390.8 1.46097 0.730485 0.682928i \(-0.239294\pi\)
0.730485 + 0.682928i \(0.239294\pi\)
\(618\) 3629.75 615.228i 0.236262 0.0400455i
\(619\) 4854.99i 0.315248i 0.987499 + 0.157624i \(0.0503834\pi\)
−0.987499 + 0.157624i \(0.949617\pi\)
\(620\) 4262.40 + 12212.5i 0.276100 + 0.791074i
\(621\) 3027.95i 0.195664i
\(622\) −1867.80 11019.7i −0.120405 0.710371i
\(623\) 5358.13 0.344573
\(624\) 8243.01 6552.07i 0.528821 0.420341i
\(625\) −8116.08 −0.519429
\(626\) 124.190 + 732.704i 0.00792915 + 0.0467807i
\(627\) 6827.21i 0.434853i
\(628\) −828.428 2373.59i −0.0526399 0.150822i
\(629\) 14706.8i 0.932273i
\(630\) 1577.83 267.436i 0.0997812 0.0169125i
\(631\) 23946.3 1.51076 0.755379 0.655289i \(-0.227453\pi\)
0.755379 + 0.655289i \(0.227453\pi\)
\(632\) 9457.09 + 17159.8i 0.595226 + 1.08003i
\(633\) 7386.07 0.463776
\(634\) −14376.2 + 2436.71i −0.900556 + 0.152641i
\(635\) 4335.44i 0.270940i
\(636\) −15780.3 + 5507.63i −0.983852 + 0.343383i
\(637\) 2687.29i 0.167150i
\(638\) 6530.94 + 38531.5i 0.405270 + 2.39103i
\(639\) −2262.07 −0.140041
\(640\) −5010.69 + 12001.9i −0.309476 + 0.741276i
\(641\) −17358.0 −1.06958 −0.534790 0.844985i \(-0.679609\pi\)
−0.534790 + 0.844985i \(0.679609\pi\)
\(642\) −1314.44 7754.97i −0.0808048 0.476736i
\(643\) 11744.3i 0.720293i 0.932896 + 0.360146i \(0.117273\pi\)
−0.932896 + 0.360146i \(0.882727\pi\)
\(644\) 5929.42 2069.48i 0.362813 0.126629i
\(645\) 13339.0i 0.814299i
\(646\) 12054.9 2043.25i 0.734199 0.124444i
\(647\) 23793.4 1.44577 0.722887 0.690967i \(-0.242815\pi\)
0.722887 + 0.690967i \(0.242815\pi\)
\(648\) 884.648 + 1605.19i 0.0536300 + 0.0973113i
\(649\) −24037.7 −1.45387
\(650\) −6781.52 + 1149.44i −0.409220 + 0.0693612i
\(651\) 3780.68i 0.227614i
\(652\) −5079.10 14552.5i −0.305081 0.874110i
\(653\) 7027.81i 0.421163i −0.977576 0.210582i \(-0.932464\pi\)
0.977576 0.210582i \(-0.0675358\pi\)
\(654\) 2019.08 + 11912.3i 0.120722 + 0.712241i
\(655\) −13010.5 −0.776128
\(656\) −25075.5 + 19931.6i −1.49243 + 1.18628i
\(657\) 6387.22 0.379283
\(658\) 369.593 + 2180.54i 0.0218970 + 0.129189i
\(659\) 16588.1i 0.980547i 0.871569 + 0.490273i \(0.163103\pi\)
−0.871569 + 0.490273i \(0.836897\pi\)
\(660\) −4186.82 11996.0i −0.246927 0.707488i
\(661\) 5341.60i 0.314318i −0.987573 0.157159i \(-0.949766\pi\)
0.987573 0.157159i \(-0.0502335\pi\)
\(662\) −18969.8 + 3215.31i −1.11372 + 0.188771i
\(663\) −18422.4 −1.07913
\(664\) −1137.28 + 626.774i −0.0664683 + 0.0366319i
\(665\) −2427.08 −0.141531
\(666\) −3296.48 + 558.740i −0.191796 + 0.0325086i
\(667\) 26287.3i 1.52601i
\(668\) −10985.3 + 3834.07i −0.636276 + 0.222073i
\(669\) 19376.0i 1.11976i
\(670\) −610.636 3602.66i −0.0352103 0.207735i
\(671\) −7333.60 −0.421923
\(672\) −2538.71 + 2829.43i −0.145733 + 0.162422i
\(673\) −10396.5 −0.595477 −0.297738 0.954648i \(-0.596232\pi\)
−0.297738 + 0.954648i \(0.596232\pi\)
\(674\) −205.029 1209.64i −0.0117173 0.0691300i
\(675\) 1197.23i 0.0682686i
\(676\) 6123.56 2137.24i 0.348405 0.121600i
\(677\) 7689.12i 0.436510i −0.975892 0.218255i \(-0.929964\pi\)
0.975892 0.218255i \(-0.0700364\pi\)
\(678\) −16961.1 + 2874.83i −0.960746 + 0.162843i
\(679\) −2595.24 −0.146681
\(680\) 19928.3 10982.9i 1.12385 0.619373i
\(681\) 5328.47 0.299835
\(682\) 29594.1 5016.09i 1.66161 0.281636i
\(683\) 1703.19i 0.0954182i −0.998861 0.0477091i \(-0.984808\pi\)
0.998861 0.0477091i \(-0.0151920\pi\)
\(684\) −915.975 2624.43i −0.0512035 0.146707i
\(685\) 9372.78i 0.522796i
\(686\) 162.124 + 956.508i 0.00902323 + 0.0532356i
\(687\) −6138.60 −0.340905
\(688\) 19715.9 + 24804.1i 1.09253 + 1.37449i
\(689\) −38193.0 −2.11181
\(690\) 1428.18 + 8426.06i 0.0787972 + 0.464891i
\(691\) 19314.7i 1.06334i −0.846952 0.531669i \(-0.821565\pi\)
0.846952 0.531669i \(-0.178435\pi\)
\(692\) 8284.63 + 23736.9i 0.455108 + 1.30396i
\(693\) 3713.65i 0.203564i
\(694\) −12237.0 + 2074.12i −0.669321 + 0.113447i
\(695\) 5666.33 0.309261
\(696\) 7680.12 + 13935.5i 0.418268 + 0.758944i
\(697\) 56041.5 3.04551
\(698\) 3543.86 600.670i 0.192173 0.0325726i
\(699\) 17482.0i 0.945964i
\(700\) 2344.45 818.257i 0.126588 0.0441817i
\(701\) 8776.10i 0.472851i 0.971650 + 0.236426i \(0.0759760\pi\)
−0.971650 + 0.236426i \(0.924024\pi\)
\(702\) 699.902 + 4129.31i 0.0376298 + 0.222010i
\(703\) 5070.79 0.272046
\(704\) 25516.2 + 16118.3i 1.36602 + 0.862899i
\(705\) −3009.66 −0.160780
\(706\) −6039.69 35633.2i −0.321964 1.89954i
\(707\) 4349.97i 0.231397i
\(708\) −9240.25 + 3225.03i −0.490494 + 0.171192i
\(709\) 15446.1i 0.818180i 0.912494 + 0.409090i \(0.134154\pi\)
−0.912494 + 0.409090i \(0.865846\pi\)
\(710\) 6294.80 1066.94i 0.332732 0.0563968i
\(711\) −7793.18 −0.411065
\(712\) −8359.89 15169.0i −0.440028 0.798429i
\(713\) −20190.0 −1.06048
\(714\) 6557.21 1111.42i 0.343694 0.0582548i
\(715\) 29033.8i 1.51860i
\(716\) −1603.32 4593.79i −0.0836857 0.239774i
\(717\) 17682.4i 0.921004i
\(718\) −2894.88 17079.3i −0.150468 0.887737i
\(719\) 1510.03 0.0783237 0.0391618 0.999233i \(-0.487531\pi\)
0.0391618 + 0.999233i \(0.487531\pi\)
\(720\) −3218.88 4049.60i −0.166612 0.209611i
\(721\) −3037.10 −0.156876
\(722\) −2537.52 14971.0i −0.130799 0.771692i
\(723\) 6172.45i 0.317505i
\(724\) 8107.57 + 23229.6i 0.416181 + 1.19243i
\(725\) 10393.8i 0.532436i
\(726\) −17934.3 + 3039.79i −0.916809 + 0.155396i
\(727\) 32352.4 1.65046 0.825231 0.564795i \(-0.191045\pi\)
0.825231 + 0.564795i \(0.191045\pi\)
\(728\) −7607.79 + 4192.79i −0.387312 + 0.213455i
\(729\) −729.000 −0.0370370
\(730\) −17774.1 + 3012.64i −0.901164 + 0.152744i
\(731\) 55434.9i 2.80483i
\(732\) −2819.09 + 983.915i −0.142345 + 0.0496811i
\(733\) 11397.7i 0.574327i 0.957882 + 0.287164i \(0.0927123\pi\)
−0.957882 + 0.287164i \(0.907288\pi\)
\(734\) 1507.81 + 8895.84i 0.0758232 + 0.447345i
\(735\) −1320.21 −0.0662538
\(736\) −15110.0 13557.4i −0.756740 0.678986i
\(737\) −8479.37 −0.423802
\(738\) −2129.12 12561.5i −0.106198 0.626551i
\(739\) 5146.85i 0.256198i 0.991761 + 0.128099i \(0.0408875\pi\)
−0.991761 + 0.128099i \(0.959113\pi\)
\(740\) 8909.78 3109.69i 0.442608 0.154479i
\(741\) 6351.89i 0.314902i
\(742\) 13594.3 2304.18i 0.672592 0.114002i
\(743\) 22350.2 1.10357 0.551783 0.833988i \(-0.313948\pi\)
0.551783 + 0.833988i \(0.313948\pi\)
\(744\) 10703.2 5898.72i 0.527417 0.290669i
\(745\) 5047.42 0.248219
\(746\) −22414.1 + 3799.11i −1.10005 + 0.186455i
\(747\) 516.498i 0.0252981i
\(748\) −17399.8 49853.4i −0.850534 2.43693i
\(749\) 6488.77i 0.316548i
\(750\) 2156.57 + 12723.4i 0.104996 + 0.619459i
\(751\) 12773.8 0.620670 0.310335 0.950627i \(-0.399559\pi\)
0.310335 + 0.950627i \(0.399559\pi\)
\(752\) 5596.50 4448.46i 0.271388 0.215716i
\(753\) 16779.5 0.812055
\(754\) 6076.24 + 35848.8i 0.293480 + 1.73148i
\(755\) 4185.39i 0.201751i
\(756\) −498.242 1427.55i −0.0239694 0.0686766i
\(757\) 1662.37i 0.0798149i −0.999203 0.0399075i \(-0.987294\pi\)
0.999203 0.0399075i \(-0.0127063\pi\)
\(758\) 10491.8 1778.32i 0.502742 0.0852129i
\(759\) 19832.0 0.948425
\(760\) 3786.80 + 6871.12i 0.180739 + 0.327950i
\(761\) 36358.5 1.73192 0.865962 0.500109i \(-0.166707\pi\)
0.865962 + 0.500109i \(0.166707\pi\)
\(762\) −4038.54 + 684.517i −0.191996 + 0.0325426i
\(763\) 9967.27i 0.472922i
\(764\) 1679.79 586.278i 0.0795452 0.0277628i
\(765\) 9050.50i 0.427740i
\(766\) −4480.55 26434.5i −0.211343 1.24689i
\(767\) −22364.1 −1.05283
\(768\) 11971.1 + 2772.59i 0.562462 + 0.130270i
\(769\) 17531.9 0.822127 0.411063 0.911607i \(-0.365158\pi\)
0.411063 + 0.911607i \(0.365158\pi\)
\(770\) 1751.61 + 10334.2i 0.0819786 + 0.483661i
\(771\) 4586.01i 0.214217i
\(772\) −17183.8 + 5997.47i −0.801111 + 0.279603i
\(773\) 17860.7i 0.831054i 0.909581 + 0.415527i \(0.136403\pi\)
−0.909581 + 0.415527i \(0.863597\pi\)
\(774\) −12425.5 + 2106.08i −0.577037 + 0.0978054i
\(775\) −7982.96 −0.370008
\(776\) 4049.16 + 7347.17i 0.187315 + 0.339882i
\(777\) 2758.24 0.127351
\(778\) 18606.7 3153.76i 0.857431 0.145331i
\(779\) 19322.6i 0.888710i
\(780\) −3895.32 11160.8i −0.178814 0.512333i
\(781\) 14815.7i 0.678807i
\(782\) 5935.32 + 35017.5i 0.271415 + 1.60131i
\(783\) −6328.86 −0.288857
\(784\) 2454.94 1951.35i 0.111832 0.0888915i
\(785\) −2822.28 −0.128320
\(786\) 2054.22 + 12119.6i 0.0932208 + 0.549988i
\(787\) 11778.6i 0.533496i −0.963766 0.266748i \(-0.914051\pi\)
0.963766 0.266748i \(-0.0859492\pi\)
\(788\) 369.382 + 1058.34i 0.0166988 + 0.0478450i
\(789\) 8950.79i 0.403874i
\(790\) 21686.6 3675.79i 0.976675 0.165543i
\(791\) 14191.7 0.637926
\(792\) −10513.4 + 5794.13i −0.471689 + 0.259956i
\(793\) −6823.02 −0.305539
\(794\) 38552.5 6534.49i 1.72314 0.292066i
\(795\) 18763.3i 0.837066i
\(796\) −7576.93 + 2644.49i −0.337383 + 0.117753i
\(797\) 9149.34i 0.406633i −0.979113 0.203316i \(-0.934828\pi\)
0.979113 0.203316i \(-0.0651720\pi\)
\(798\) 383.209 + 2260.87i 0.0169993 + 0.100293i
\(799\) −12507.7 −0.553805
\(800\) −5974.37 5360.51i −0.264032 0.236903i
\(801\) 6889.02 0.303885
\(802\) 65.0838 + 383.984i 0.00286557 + 0.0169064i
\(803\) 41834.0i 1.83847i
\(804\) −3259.53 + 1137.64i −0.142978 + 0.0499022i
\(805\) 7050.29i 0.308683i
\(806\) 27533.7 4666.86i 1.20327 0.203949i
\(807\) −16658.0 −0.726631
\(808\) −12314.8 + 6786.93i −0.536182 + 0.295499i
\(809\) 11885.2 0.516514 0.258257 0.966076i \(-0.416852\pi\)
0.258257 + 0.966076i \(0.416852\pi\)
\(810\) 2028.63 343.846i 0.0879987 0.0149154i
\(811\) 22554.1i 0.976549i −0.872690 0.488274i \(-0.837626\pi\)
0.872690 0.488274i \(-0.162374\pi\)
\(812\) −4325.52 12393.4i −0.186941 0.535618i
\(813\) 12714.4i 0.548477i
\(814\) −3659.55 21590.8i −0.157576 0.929675i
\(815\) −17303.4 −0.743697
\(816\) −13377.2 16829.5i −0.573891 0.721999i
\(817\) 19113.5 0.818478
\(818\) 5825.66 + 34370.5i 0.249009 + 1.46911i
\(819\) 3455.09i 0.147412i
\(820\) 11849.7 + 33951.4i 0.504645 + 1.44590i
\(821\) 9016.04i 0.383267i 0.981467 + 0.191633i \(0.0613784\pi\)
−0.981467 + 0.191633i \(0.938622\pi\)
\(822\) −8730.91 + 1479.86i −0.370469 + 0.0627931i
\(823\) 8909.42 0.377355 0.188677 0.982039i \(-0.439580\pi\)
0.188677 + 0.982039i \(0.439580\pi\)
\(824\) 4738.56 + 8598.08i 0.200334 + 0.363505i
\(825\) 7841.41 0.330913
\(826\) 7960.23 1349.23i 0.335317 0.0568349i
\(827\) 24206.8i 1.01784i 0.860814 + 0.508920i \(0.169955\pi\)
−0.860814 + 0.508920i \(0.830045\pi\)
\(828\) 7623.54 2660.76i 0.319971 0.111676i
\(829\) 498.801i 0.0208976i 0.999945 + 0.0104488i \(0.00332601\pi\)
−0.999945 + 0.0104488i \(0.996674\pi\)
\(830\) 243.615 + 1437.29i 0.0101880 + 0.0601073i
\(831\) 11285.6 0.471112
\(832\) 23739.7 + 14996.1i 0.989215 + 0.624875i
\(833\) −5486.58 −0.228210
\(834\) −894.650 5278.29i −0.0371453 0.219152i
\(835\) 13061.9i 0.541347i
\(836\) 17189.0 5999.30i 0.711119 0.248194i
\(837\) 4860.88i 0.200737i
\(838\) −9312.02 + 1578.35i −0.383864 + 0.0650635i
\(839\) −23273.2 −0.957666 −0.478833 0.877906i \(-0.658940\pi\)
−0.478833 + 0.877906i \(0.658940\pi\)
\(840\) 2059.82 + 3737.53i 0.0846078 + 0.153520i
\(841\) −30555.3 −1.25283
\(842\) −9166.79 + 1553.74i −0.375188 + 0.0635929i
\(843\) 4030.53i 0.164672i
\(844\) 6490.39 + 18596.1i 0.264702 + 0.758417i
\(845\) 7281.14i 0.296424i
\(846\) 475.191 + 2803.55i 0.0193113 + 0.113934i
\(847\) 15006.0 0.608753
\(848\) −27733.4 34890.7i −1.12308 1.41292i
\(849\) −8590.34 −0.347255
\(850\) 2346.78 + 13845.6i 0.0946988 + 0.558708i
\(851\) 14729.8i 0.593340i
\(852\) −1987.76 5695.27i −0.0799289 0.229010i
\(853\) 17701.4i 0.710531i 0.934765 + 0.355266i \(0.115610\pi\)
−0.934765 + 0.355266i \(0.884390\pi\)
\(854\) 2428.57 411.633i 0.0973113 0.0164939i
\(855\) −3120.53 −0.124819
\(856\) 18369.8 10123.9i 0.733491 0.404240i
\(857\) 13312.4 0.530620 0.265310 0.964163i \(-0.414526\pi\)
0.265310 + 0.964163i \(0.414526\pi\)
\(858\) −27045.5 + 4584.11i −1.07613 + 0.182400i
\(859\) 6535.20i 0.259579i −0.991542 0.129789i \(-0.958570\pi\)
0.991542 0.129789i \(-0.0414301\pi\)
\(860\) 33583.9 11721.4i 1.33163 0.464765i
\(861\) 10510.5i 0.416024i
\(862\) 6003.74 + 35421.1i 0.237225 + 1.39959i
\(863\) −32795.4 −1.29359 −0.646795 0.762664i \(-0.723891\pi\)
−0.646795 + 0.762664i \(0.723891\pi\)
\(864\) −3264.05 + 3637.83i −0.128525 + 0.143243i
\(865\) 28224.0 1.10942
\(866\) 5503.28 + 32468.4i 0.215946 + 1.27404i
\(867\) 22873.5i 0.895992i
\(868\) −9518.72 + 3322.22i −0.372219 + 0.129912i
\(869\) 51042.5i 1.99252i
\(870\) 17611.7 2985.12i 0.686314 0.116327i
\(871\) −7889.02 −0.306899
\(872\) −28217.5 + 15551.2i −1.09583 + 0.603933i
\(873\) −3336.73 −0.129360
\(874\) −12073.7 + 2046.45i −0.467277 + 0.0792016i
\(875\) 10646.0i 0.411315i
\(876\) 5612.66 + 16081.2i 0.216478 + 0.620246i
\(877\) 47714.2i 1.83716i 0.395231 + 0.918582i \(0.370665\pi\)
−0.395231 + 0.918582i \(0.629335\pi\)
\(878\) 5233.92 + 30879.3i 0.201180 + 1.18693i
\(879\) 10617.7 0.407424
\(880\) 26523.4 21082.5i 1.01603 0.807604i
\(881\) −26128.4 −0.999191 −0.499595 0.866259i \(-0.666518\pi\)
−0.499595 + 0.866259i \(0.666518\pi\)
\(882\) 208.446 + 1229.80i 0.00795774 + 0.0469494i
\(883\) 26426.3i 1.00715i 0.863950 + 0.503577i \(0.167983\pi\)
−0.863950 + 0.503577i \(0.832017\pi\)
\(884\) −16188.4 46382.5i −0.615921 1.76472i
\(885\) 10987.0i 0.417315i
\(886\) −20285.6 + 3438.34i −0.769198 + 0.130376i
\(887\) 11595.6 0.438944 0.219472 0.975619i \(-0.429567\pi\)
0.219472 + 0.975619i \(0.429567\pi\)
\(888\) −4303.48 7808.64i −0.162630 0.295091i
\(889\) 3379.15 0.127484
\(890\) −19170.5 + 3249.33i −0.722020 + 0.122379i
\(891\) 4774.69i 0.179526i
\(892\) −48783.4 + 17026.4i −1.83115 + 0.639108i
\(893\) 4312.55i 0.161606i
\(894\) −796.930 4701.76i −0.0298136 0.175895i
\(895\) −5462.18 −0.204001
\(896\) −9354.57 3905.45i −0.348788 0.145616i
\(897\) 18451.2 0.686810
\(898\) −4601.57 27148.5i −0.170998 1.00886i
\(899\) 42200.0i 1.56557i
\(900\) 3014.29 1052.05i 0.111640 0.0389646i
\(901\) 77977.7i 2.88326i
\(902\) 82273.2 13945.0i 3.03703 0.514764i
\(903\) 10396.7 0.383147
\(904\) −22142.3 40177.1i −0.814648 1.47817i
\(905\) 27620.8 1.01453
\(906\) −3898.77 + 660.826i −0.142967 + 0.0242323i
\(907\) 42382.2i 1.55158i −0.630994 0.775788i \(-0.717353\pi\)
0.630994 0.775788i \(-0.282647\pi\)
\(908\) 4682.31 + 13415.6i 0.171132 + 0.490323i
\(909\) 5592.82i 0.204073i
\(910\) 1629.66 + 9614.71i 0.0593654 + 0.350247i
\(911\) −8454.22 −0.307465 −0.153733 0.988112i \(-0.549129\pi\)
−0.153733 + 0.988112i \(0.549129\pi\)
\(912\) 5802.68 4612.34i 0.210686 0.167467i
\(913\) 3382.87 0.122625
\(914\) −1018.75 6010.47i −0.0368680 0.217515i
\(915\) 3351.99i 0.121108i
\(916\) −5394.19 15455.3i −0.194573 0.557486i
\(917\) 10140.7i 0.365187i
\(918\) 8430.70 1428.97i 0.303110 0.0513759i
\(919\) 36015.8 1.29277 0.646383 0.763014i \(-0.276281\pi\)
0.646383 + 0.763014i \(0.276281\pi\)
\(920\) −19959.5 + 11000.0i −0.715267 + 0.394196i
\(921\) 9026.51 0.322946
\(922\) −10058.1 + 1704.82i −0.359270 + 0.0608949i
\(923\) 13784.2i 0.491564i
\(924\) 9349.94 3263.31i 0.332890 0.116185i
\(925\) 5824.07i 0.207021i
\(926\) −4121.53 24316.3i −0.146265 0.862942i
\(927\) −3904.84 −0.138351
\(928\) −28337.1 + 31582.1i −1.00238 + 1.11717i
\(929\) 19664.5 0.694481 0.347240 0.937776i \(-0.387119\pi\)
0.347240 + 0.937776i \(0.387119\pi\)
\(930\) −2292.72 13526.7i −0.0808400 0.476943i
\(931\) 1891.73i 0.0665938i
\(932\) −44014.8 + 15362.0i −1.54694 + 0.539913i
\(933\) 11854.9i 0.415983i
\(934\) 26942.0 4566.56i 0.943863 0.159981i
\(935\) −59277.5 −2.07335
\(936\) −9781.44 + 5390.73i −0.341577 + 0.188249i
\(937\) 20967.0 0.731017 0.365509 0.930808i \(-0.380895\pi\)
0.365509 + 0.930808i \(0.380895\pi\)
\(938\) 2808.00 475.944i 0.0977445 0.0165673i
\(939\) 788.234i 0.0273941i
\(940\) −2644.69 7577.49i −0.0917662 0.262926i
\(941\) 37124.0i 1.28609i −0.765829 0.643044i \(-0.777671\pi\)
0.765829 0.643044i \(-0.222329\pi\)
\(942\) 445.606 + 2629.01i 0.0154126 + 0.0909317i
\(943\) −56129.2 −1.93830
\(944\) −16239.5 20430.5i −0.559904 0.704402i
\(945\) −1697.41 −0.0584303
\(946\) −13794.1 81382.7i −0.474084 2.79702i
\(947\) 28450.0i 0.976240i −0.872776 0.488120i \(-0.837683\pi\)
0.872776 0.488120i \(-0.162317\pi\)
\(948\) −6848.13 19621.1i −0.234617 0.672218i
\(949\) 38921.4i 1.33134i
\(950\) −4773.86 + 809.151i −0.163036 + 0.0276340i
\(951\) 15465.8 0.527352
\(952\) 8560.30 + 15532.6i 0.291430 + 0.528797i
\(953\) −36489.4 −1.24030 −0.620151 0.784483i \(-0.712929\pi\)
−0.620151 + 0.784483i \(0.712929\pi\)
\(954\) 17478.4 2962.52i 0.593170 0.100540i
\(955\) 1997.33i 0.0676774i
\(956\) 44519.3 15538.1i 1.50613 0.525667i
\(957\) 41451.7i 1.40015i
\(958\) −3470.13 20473.2i −0.117030 0.690458i
\(959\) 7305.37 0.245988
\(960\) 7367.24 11662.8i 0.247684 0.392099i
\(961\) 2620.72 0.0879700
\(962\) −3404.76 20087.6i −0.114110 0.673232i
\(963\) 8342.71i 0.279169i
\(964\) 15540.5 5423.94i 0.519219 0.181217i
\(965\) 20432.1i 0.681589i
\(966\) −6567.47 + 1113.16i −0.218742 + 0.0370760i
\(967\) −39597.5 −1.31682 −0.658412 0.752658i \(-0.728772\pi\)
−0.658412 + 0.752658i \(0.728772\pi\)
\(968\) −23412.8 42482.4i −0.777393 1.41057i
\(969\) −12968.5 −0.429936
\(970\) 9285.34 1573.83i 0.307355 0.0520955i
\(971\) 6633.40i 0.219234i −0.993974 0.109617i \(-0.965038\pi\)
0.993974 0.109617i \(-0.0349624\pi\)
\(972\) −640.597 1835.42i −0.0211391 0.0605670i
\(973\) 4416.48i 0.145515i
\(974\) −6988.75 41232.5i −0.229912 1.35644i
\(975\) 7295.48 0.239633
\(976\) −4954.45 6233.08i −0.162488 0.204422i
\(977\) −24844.2 −0.813549 −0.406774 0.913529i \(-0.633346\pi\)
−0.406774 + 0.913529i \(0.633346\pi\)
\(978\) 2732.02 + 16118.5i 0.0893255 + 0.527006i
\(979\) 45120.6i 1.47299i
\(980\) −1160.11 3323.91i −0.0378146 0.108345i
\(981\) 12815.1i 0.417078i
\(982\) −20503.1 + 3475.19i −0.666273 + 0.112931i
\(983\) −7133.71 −0.231465 −0.115732 0.993280i \(-0.536922\pi\)
−0.115732 + 0.993280i \(0.536922\pi\)
\(984\) 29755.4 16398.8i 0.963992 0.531274i
\(985\) 1258.41 0.0407068
\(986\) 73191.6 12405.7i 2.36399 0.400688i
\(987\) 2345.80i 0.0756511i
\(988\) 15992.3 5581.62i 0.514962 0.179732i
\(989\) 55521.6i 1.78512i
\(990\) 2252.07 + 13286.8i 0.0722983 + 0.426549i
\(991\) −56431.1 −1.80887 −0.904436 0.426609i \(-0.859708\pi\)
−0.904436 + 0.426609i \(0.859708\pi\)
\(992\) 24256.6 + 21764.3i 0.776359 + 0.696589i
\(993\) 20407.5 0.652178
\(994\) 831.602 + 4906.32i 0.0265360 + 0.156558i
\(995\) 9009.23i 0.287047i
\(996\) 1300.40 453.864i 0.0413702 0.0144390i
\(997\) 55825.3i 1.77333i −0.462417 0.886663i \(-0.653018\pi\)
0.462417 0.886663i \(-0.346982\pi\)
\(998\) 46860.3 7942.63i 1.48631 0.251923i
\(999\) 3546.31 0.112313
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 168.4.c.b.85.7 20
3.2 odd 2 504.4.c.e.253.14 20
4.3 odd 2 672.4.c.b.337.7 20
8.3 odd 2 672.4.c.b.337.14 20
8.5 even 2 inner 168.4.c.b.85.8 yes 20
12.11 even 2 2016.4.c.f.1009.6 20
24.5 odd 2 504.4.c.e.253.13 20
24.11 even 2 2016.4.c.f.1009.15 20
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
168.4.c.b.85.7 20 1.1 even 1 trivial
168.4.c.b.85.8 yes 20 8.5 even 2 inner
504.4.c.e.253.13 20 24.5 odd 2
504.4.c.e.253.14 20 3.2 odd 2
672.4.c.b.337.7 20 4.3 odd 2
672.4.c.b.337.14 20 8.3 odd 2
2016.4.c.f.1009.6 20 12.11 even 2
2016.4.c.f.1009.15 20 24.11 even 2