Properties

Label 21.4.c.b.20.3
Level $21$
Weight $4$
Character 21.20
Analytic conductor $1.239$
Analytic rank $0$
Dimension $4$
CM no
Inner twists $4$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [21,4,Mod(20,21)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(21, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([1, 1]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("21.20");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 21 = 3 \cdot 7 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 21.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: \(1.23904011012\)
Analytic rank: \(0\)
Dimension: \(4\)
Coefficient field: \(\Q(\sqrt{-6}, \sqrt{-17})\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{4} + 46x^{2} + 121 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 20.3
Root \(-6.57260i\) of defining polynomial
Character \(\chi\) \(=\) 21.20
Dual form 21.4.c.b.20.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+4.12311i q^{2} +(-5.04975 + 1.22474i) q^{3} -9.00000 q^{4} +10.0995 q^{5} +(-5.04975 - 20.8207i) q^{6} +(7.00000 + 17.1464i) q^{7} -4.12311i q^{8} +(24.0000 - 12.3693i) q^{9} +O(q^{10})\) \(q+4.12311i q^{2} +(-5.04975 + 1.22474i) q^{3} -9.00000 q^{4} +10.0995 q^{5} +(-5.04975 - 20.8207i) q^{6} +(7.00000 + 17.1464i) q^{7} -4.12311i q^{8} +(24.0000 - 12.3693i) q^{9} +41.6413i q^{10} -32.9848i q^{11} +(45.4478 - 11.0227i) q^{12} -56.3383i q^{13} +(-70.6965 + 28.8617i) q^{14} +(-51.0000 + 12.3693i) q^{15} -55.0000 q^{16} +60.5970 q^{17} +(51.0000 + 98.9545i) q^{18} +36.7423i q^{19} -90.8955 q^{20} +(-56.3483 - 78.0120i) q^{21} +136.000 q^{22} +90.7083i q^{23} +(5.04975 + 20.8207i) q^{24} -23.0000 q^{25} +232.289 q^{26} +(-106.045 + 91.8559i) q^{27} +(-63.0000 - 154.318i) q^{28} -57.7235i q^{29} +(-51.0000 - 210.278i) q^{30} -254.747i q^{31} -259.756i q^{32} +(40.3980 + 166.565i) q^{33} +249.848i q^{34} +(70.6965 + 173.170i) q^{35} +(-216.000 + 111.324i) q^{36} +230.000 q^{37} -151.493 q^{38} +(69.0000 + 284.494i) q^{39} -41.6413i q^{40} -141.393 q^{41} +(321.652 - 232.330i) q^{42} +44.0000 q^{43} +296.864i q^{44} +(242.388 - 124.924i) q^{45} -374.000 q^{46} -343.383 q^{47} +(277.736 - 67.3610i) q^{48} +(-245.000 + 240.050i) q^{49} -94.8314i q^{50} +(-306.000 + 74.2159i) q^{51} +507.044i q^{52} -206.155i q^{53} +(-378.731 - 437.234i) q^{54} -333.131i q^{55} +(70.6965 - 28.8617i) q^{56} +(-45.0000 - 185.540i) q^{57} +238.000 q^{58} +131.294 q^{59} +(459.000 - 111.324i) q^{60} +71.0352i q^{61} +1050.35 q^{62} +(380.090 + 324.929i) q^{63} +631.000 q^{64} -568.989i q^{65} +(-686.766 + 166.565i) q^{66} -64.0000 q^{67} -545.373 q^{68} +(-111.095 - 458.055i) q^{69} +(-714.000 + 291.489i) q^{70} +461.788i q^{71} +(-51.0000 - 98.9545i) q^{72} +88.1816i q^{73} +948.314i q^{74} +(116.144 - 28.1691i) q^{75} -330.681i q^{76} +(565.572 - 230.894i) q^{77} +(-1173.00 + 284.494i) q^{78} -442.000 q^{79} -555.473 q^{80} +(423.000 - 593.727i) q^{81} -582.979i q^{82} -494.876 q^{83} +(507.134 + 702.108i) q^{84} +612.000 q^{85} +181.417i q^{86} +(70.6965 + 291.489i) q^{87} -136.000 q^{88} -484.776 q^{89} +(515.075 + 999.392i) q^{90} +(966.000 - 394.368i) q^{91} -816.375i q^{92} +(312.000 + 1286.41i) q^{93} -1415.81i q^{94} +371.080i q^{95} +(318.134 + 1311.70i) q^{96} +1092.47i q^{97} +(-989.751 - 1010.16i) q^{98} +(-408.000 - 791.636i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 4 q - 36 q^{4} + 28 q^{7} + 96 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 4 q - 36 q^{4} + 28 q^{7} + 96 q^{9} - 204 q^{15} - 220 q^{16} + 204 q^{18} - 84 q^{21} + 544 q^{22} - 92 q^{25} - 252 q^{28} - 204 q^{30} - 864 q^{36} + 920 q^{37} + 276 q^{39} + 1428 q^{42} + 176 q^{43} - 1496 q^{46} - 980 q^{49} - 1224 q^{51} - 180 q^{57} + 952 q^{58} + 1836 q^{60} + 672 q^{63} + 2524 q^{64} - 256 q^{67} - 2856 q^{70} - 204 q^{72} - 4692 q^{78} - 1768 q^{79} + 1692 q^{81} + 756 q^{84} + 2448 q^{85} - 544 q^{88} + 3864 q^{91} + 1248 q^{93} - 1632 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/21\mathbb{Z}\right)^\times\).

\(n\) \(8\) \(10\)
\(\chi(n)\) \(-1\) \(-1\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 4.12311i 1.45774i 0.684653 + 0.728869i \(0.259954\pi\)
−0.684653 + 0.728869i \(0.740046\pi\)
\(3\) −5.04975 + 1.22474i −0.971825 + 0.235702i
\(4\) −9.00000 −1.12500
\(5\) 10.0995 0.903327 0.451664 0.892188i \(-0.350831\pi\)
0.451664 + 0.892188i \(0.350831\pi\)
\(6\) −5.04975 20.8207i −0.343592 1.41667i
\(7\) 7.00000 + 17.1464i 0.377964 + 0.925820i
\(8\) 4.12311i 0.182217i
\(9\) 24.0000 12.3693i 0.888889 0.458123i
\(10\) 41.6413i 1.31681i
\(11\) 32.9848i 0.904119i −0.891988 0.452059i \(-0.850690\pi\)
0.891988 0.452059i \(-0.149310\pi\)
\(12\) 45.4478 11.0227i 1.09330 0.265165i
\(13\) 56.3383i 1.20196i −0.799266 0.600978i \(-0.794778\pi\)
0.799266 0.600978i \(-0.205222\pi\)
\(14\) −70.6965 + 28.8617i −1.34960 + 0.550973i
\(15\) −51.0000 + 12.3693i −0.877876 + 0.212916i
\(16\) −55.0000 −0.859375
\(17\) 60.5970 0.864526 0.432263 0.901748i \(-0.357715\pi\)
0.432263 + 0.901748i \(0.357715\pi\)
\(18\) 51.0000 + 98.9545i 0.667823 + 1.29577i
\(19\) 36.7423i 0.443646i 0.975087 + 0.221823i \(0.0712007\pi\)
−0.975087 + 0.221823i \(0.928799\pi\)
\(20\) −90.8955 −1.01624
\(21\) −56.3483 78.0120i −0.585533 0.810648i
\(22\) 136.000 1.31797
\(23\) 90.7083i 0.822348i 0.911557 + 0.411174i \(0.134881\pi\)
−0.911557 + 0.411174i \(0.865119\pi\)
\(24\) 5.04975 + 20.8207i 0.0429490 + 0.177083i
\(25\) −23.0000 −0.184000
\(26\) 232.289 1.75214
\(27\) −106.045 + 91.8559i −0.755864 + 0.654729i
\(28\) −63.0000 154.318i −0.425210 1.04155i
\(29\) 57.7235i 0.369620i −0.982774 0.184810i \(-0.940833\pi\)
0.982774 0.184810i \(-0.0591670\pi\)
\(30\) −51.0000 210.278i −0.310376 1.27971i
\(31\) 254.747i 1.47593i −0.674838 0.737966i \(-0.735786\pi\)
0.674838 0.737966i \(-0.264214\pi\)
\(32\) 259.756i 1.43496i
\(33\) 40.3980 + 166.565i 0.213103 + 0.878645i
\(34\) 249.848i 1.26025i
\(35\) 70.6965 + 173.170i 0.341426 + 0.836318i
\(36\) −216.000 + 111.324i −1.00000 + 0.515388i
\(37\) 230.000 1.02194 0.510970 0.859599i \(-0.329286\pi\)
0.510970 + 0.859599i \(0.329286\pi\)
\(38\) −151.493 −0.646719
\(39\) 69.0000 + 284.494i 0.283304 + 1.16809i
\(40\) 41.6413i 0.164602i
\(41\) −141.393 −0.538583 −0.269291 0.963059i \(-0.586789\pi\)
−0.269291 + 0.963059i \(0.586789\pi\)
\(42\) 321.652 232.330i 1.18171 0.853554i
\(43\) 44.0000 0.156045 0.0780225 0.996952i \(-0.475139\pi\)
0.0780225 + 0.996952i \(0.475139\pi\)
\(44\) 296.864i 1.01713i
\(45\) 242.388 124.924i 0.802957 0.413835i
\(46\) −374.000 −1.19877
\(47\) −343.383 −1.06569 −0.532847 0.846212i \(-0.678878\pi\)
−0.532847 + 0.846212i \(0.678878\pi\)
\(48\) 277.736 67.3610i 0.835162 0.202557i
\(49\) −245.000 + 240.050i −0.714286 + 0.699854i
\(50\) 94.8314i 0.268224i
\(51\) −306.000 + 74.2159i −0.840168 + 0.203771i
\(52\) 507.044i 1.35220i
\(53\) 206.155i 0.534294i −0.963656 0.267147i \(-0.913919\pi\)
0.963656 0.267147i \(-0.0860810\pi\)
\(54\) −378.731 437.234i −0.954423 1.10185i
\(55\) 333.131i 0.816715i
\(56\) 70.6965 28.8617i 0.168700 0.0688716i
\(57\) −45.0000 185.540i −0.104568 0.431146i
\(58\) 238.000 0.538809
\(59\) 131.294 0.289711 0.144856 0.989453i \(-0.453728\pi\)
0.144856 + 0.989453i \(0.453728\pi\)
\(60\) 459.000 111.324i 0.987611 0.239531i
\(61\) 71.0352i 0.149100i 0.997217 + 0.0745502i \(0.0237521\pi\)
−0.997217 + 0.0745502i \(0.976248\pi\)
\(62\) 1050.35 2.15152
\(63\) 380.090 + 324.929i 0.760108 + 0.649797i
\(64\) 631.000 1.23242
\(65\) 568.989i 1.08576i
\(66\) −686.766 + 166.565i −1.28083 + 0.310648i
\(67\) −64.0000 −0.116699 −0.0583496 0.998296i \(-0.518584\pi\)
−0.0583496 + 0.998296i \(0.518584\pi\)
\(68\) −545.373 −0.972592
\(69\) −111.095 458.055i −0.193829 0.799178i
\(70\) −714.000 + 291.489i −1.21913 + 0.497709i
\(71\) 461.788i 0.771889i 0.922522 + 0.385945i \(0.126124\pi\)
−0.922522 + 0.385945i \(0.873876\pi\)
\(72\) −51.0000 98.9545i −0.0834779 0.161971i
\(73\) 88.1816i 0.141382i 0.997498 + 0.0706910i \(0.0225204\pi\)
−0.997498 + 0.0706910i \(0.977480\pi\)
\(74\) 948.314i 1.48972i
\(75\) 116.144 28.1691i 0.178816 0.0433692i
\(76\) 330.681i 0.499102i
\(77\) 565.572 230.894i 0.837051 0.341725i
\(78\) −1173.00 + 284.494i −1.70277 + 0.412982i
\(79\) −442.000 −0.629480 −0.314740 0.949178i \(-0.601917\pi\)
−0.314740 + 0.949178i \(0.601917\pi\)
\(80\) −555.473 −0.776297
\(81\) 423.000 593.727i 0.580247 0.814441i
\(82\) 582.979i 0.785112i
\(83\) −494.876 −0.654454 −0.327227 0.944946i \(-0.606114\pi\)
−0.327227 + 0.944946i \(0.606114\pi\)
\(84\) 507.134 + 702.108i 0.658725 + 0.911979i
\(85\) 612.000 0.780950
\(86\) 181.417i 0.227473i
\(87\) 70.6965 + 291.489i 0.0871203 + 0.359206i
\(88\) −136.000 −0.164746
\(89\) −484.776 −0.577373 −0.288686 0.957424i \(-0.593218\pi\)
−0.288686 + 0.957424i \(0.593218\pi\)
\(90\) 515.075 + 999.392i 0.603263 + 1.17050i
\(91\) 966.000 394.368i 1.11279 0.454297i
\(92\) 816.375i 0.925141i
\(93\) 312.000 + 1286.41i 0.347881 + 1.43435i
\(94\) 1415.81i 1.55350i
\(95\) 371.080i 0.400757i
\(96\) 318.134 + 1311.70i 0.338224 + 1.39453i
\(97\) 1092.47i 1.14354i 0.820413 + 0.571772i \(0.193744\pi\)
−0.820413 + 0.571772i \(0.806256\pi\)
\(98\) −989.751 1010.16i −1.02020 1.04124i
\(99\) −408.000 791.636i −0.414197 0.803661i
\(100\) 207.000 0.207000
\(101\) 1262.44 1.24374 0.621868 0.783122i \(-0.286374\pi\)
0.621868 + 0.783122i \(0.286374\pi\)
\(102\) −306.000 1261.67i −0.297044 1.22474i
\(103\) 48.9898i 0.0468651i −0.999725 0.0234326i \(-0.992541\pi\)
0.999725 0.0234326i \(-0.00745950\pi\)
\(104\) −232.289 −0.219017
\(105\) −569.090 787.883i −0.528928 0.732281i
\(106\) 850.000 0.778861
\(107\) 1467.83i 1.32617i −0.748545 0.663084i \(-0.769247\pi\)
0.748545 0.663084i \(-0.230753\pi\)
\(108\) 954.403 826.703i 0.850347 0.736570i
\(109\) −1870.00 −1.64324 −0.821622 0.570033i \(-0.806930\pi\)
−0.821622 + 0.570033i \(0.806930\pi\)
\(110\) 1373.53 1.19056
\(111\) −1161.44 + 281.691i −0.993147 + 0.240873i
\(112\) −385.000 943.054i −0.324813 0.795627i
\(113\) 1673.98i 1.39358i 0.717274 + 0.696791i \(0.245390\pi\)
−0.717274 + 0.696791i \(0.754610\pi\)
\(114\) 765.000 185.540i 0.628498 0.152433i
\(115\) 916.109i 0.742849i
\(116\) 519.511i 0.415823i
\(117\) −696.866 1352.12i −0.550643 1.06840i
\(118\) 541.337i 0.422323i
\(119\) 424.179 + 1039.02i 0.326760 + 0.800395i
\(120\) 51.0000 + 210.278i 0.0387970 + 0.159964i
\(121\) 243.000 0.182569
\(122\) −292.886 −0.217349
\(123\) 714.000 173.170i 0.523408 0.126945i
\(124\) 2292.72i 1.66042i
\(125\) −1494.73 −1.06954
\(126\) −1339.72 + 1567.15i −0.947234 + 1.10804i
\(127\) −1048.00 −0.732244 −0.366122 0.930567i \(-0.619315\pi\)
−0.366122 + 0.930567i \(0.619315\pi\)
\(128\) 523.634i 0.361587i
\(129\) −222.189 + 53.8888i −0.151649 + 0.0367802i
\(130\) 2346.00 1.58275
\(131\) 2555.17 1.70417 0.852086 0.523401i \(-0.175337\pi\)
0.852086 + 0.523401i \(0.175337\pi\)
\(132\) −363.582 1499.09i −0.239741 0.988476i
\(133\) −630.000 + 257.196i −0.410736 + 0.167682i
\(134\) 263.879i 0.170117i
\(135\) −1071.00 + 927.699i −0.682793 + 0.591434i
\(136\) 249.848i 0.157532i
\(137\) 1006.04i 0.627384i 0.949525 + 0.313692i \(0.101566\pi\)
−0.949525 + 0.313692i \(0.898434\pi\)
\(138\) 1888.61 458.055i 1.16499 0.282552i
\(139\) 1393.76i 0.850483i −0.905080 0.425242i \(-0.860189\pi\)
0.905080 0.425242i \(-0.139811\pi\)
\(140\) −636.269 1558.53i −0.384104 0.940858i
\(141\) 1734.00 420.557i 1.03567 0.251186i
\(142\) −1904.00 −1.12521
\(143\) −1858.31 −1.08671
\(144\) −1320.00 + 680.312i −0.763889 + 0.393699i
\(145\) 582.979i 0.333888i
\(146\) −363.582 −0.206098
\(147\) 943.189 1512.26i 0.529204 0.848495i
\(148\) −2070.00 −1.14968
\(149\) 255.633i 0.140552i −0.997528 0.0702760i \(-0.977612\pi\)
0.997528 0.0702760i \(-0.0223880\pi\)
\(150\) 116.144 + 478.875i 0.0632210 + 0.260667i
\(151\) 1448.00 0.780375 0.390187 0.920735i \(-0.372410\pi\)
0.390187 + 0.920735i \(0.372410\pi\)
\(152\) 151.493 0.0808399
\(153\) 1454.33 749.544i 0.768467 0.396059i
\(154\) 952.000 + 2331.91i 0.498145 + 1.22020i
\(155\) 2572.82i 1.33325i
\(156\) −621.000 2560.45i −0.318717 1.31410i
\(157\) 3397.44i 1.72704i 0.504314 + 0.863520i \(0.331745\pi\)
−0.504314 + 0.863520i \(0.668255\pi\)
\(158\) 1822.41i 0.917616i
\(159\) 252.488 + 1041.03i 0.125934 + 0.519241i
\(160\) 2623.40i 1.29624i
\(161\) −1555.32 + 634.958i −0.761346 + 0.310818i
\(162\) 2448.00 + 1744.07i 1.18724 + 0.845848i
\(163\) 3128.00 1.50309 0.751546 0.659681i \(-0.229309\pi\)
0.751546 + 0.659681i \(0.229309\pi\)
\(164\) 1272.54 0.605905
\(165\) 408.000 + 1682.23i 0.192502 + 0.793704i
\(166\) 2040.42i 0.954022i
\(167\) 706.965 0.327585 0.163792 0.986495i \(-0.447627\pi\)
0.163792 + 0.986495i \(0.447627\pi\)
\(168\) −321.652 + 232.330i −0.147714 + 0.106694i
\(169\) −977.000 −0.444697
\(170\) 2523.34i 1.13842i
\(171\) 454.478 + 881.816i 0.203244 + 0.394352i
\(172\) −396.000 −0.175551
\(173\) −2252.19 −0.989773 −0.494887 0.868957i \(-0.664790\pi\)
−0.494887 + 0.868957i \(0.664790\pi\)
\(174\) −1201.84 + 291.489i −0.523628 + 0.126999i
\(175\) −161.000 394.368i −0.0695455 0.170351i
\(176\) 1814.17i 0.776977i
\(177\) −663.000 + 160.801i −0.281549 + 0.0682856i
\(178\) 1998.78i 0.841658i
\(179\) 3496.39i 1.45996i −0.683469 0.729980i \(-0.739529\pi\)
0.683469 0.729980i \(-0.260471\pi\)
\(180\) −2181.49 + 1124.32i −0.903327 + 0.465564i
\(181\) 183.712i 0.0754430i 0.999288 + 0.0377215i \(0.0120100\pi\)
−0.999288 + 0.0377215i \(0.987990\pi\)
\(182\) 1626.02 + 3982.92i 0.662245 + 1.62216i
\(183\) −87.0000 358.710i −0.0351433 0.144900i
\(184\) 374.000 0.149846
\(185\) 2322.89 0.923146
\(186\) −5304.00 + 1286.41i −2.09090 + 0.507119i
\(187\) 1998.78i 0.781634i
\(188\) 3090.45 1.19890
\(189\) −2317.31 1175.30i −0.891851 0.452330i
\(190\) −1530.00 −0.584199
\(191\) 263.879i 0.0999665i 0.998750 + 0.0499832i \(0.0159168\pi\)
−0.998750 + 0.0499832i \(0.984083\pi\)
\(192\) −3186.39 + 772.814i −1.19770 + 0.290485i
\(193\) −652.000 −0.243171 −0.121585 0.992581i \(-0.538798\pi\)
−0.121585 + 0.992581i \(0.538798\pi\)
\(194\) −4504.38 −1.66699
\(195\) 696.866 + 2873.25i 0.255916 + 1.05517i
\(196\) 2205.00 2160.45i 0.803571 0.787336i
\(197\) 2020.32i 0.730670i 0.930876 + 0.365335i \(0.119046\pi\)
−0.930876 + 0.365335i \(0.880954\pi\)
\(198\) 3264.00 1682.23i 1.17153 0.603791i
\(199\) 4849.99i 1.72767i −0.503773 0.863836i \(-0.668055\pi\)
0.503773 0.863836i \(-0.331945\pi\)
\(200\) 94.8314i 0.0335280i
\(201\) 323.184 78.3837i 0.113411 0.0275063i
\(202\) 5205.17i 1.81304i
\(203\) 989.751 404.064i 0.342202 0.139703i
\(204\) 2754.00 667.943i 0.945189 0.229242i
\(205\) −1428.00 −0.486516
\(206\) 201.990 0.0683171
\(207\) 1122.00 + 2177.00i 0.376736 + 0.730976i
\(208\) 3098.60i 1.03293i
\(209\) 1211.94 0.401109
\(210\) 3248.52 2346.42i 1.06747 0.771039i
\(211\) −2224.00 −0.725623 −0.362812 0.931863i \(-0.618183\pi\)
−0.362812 + 0.931863i \(0.618183\pi\)
\(212\) 1855.40i 0.601081i
\(213\) −565.572 2331.91i −0.181936 0.750141i
\(214\) 6052.00 1.93321
\(215\) 444.378 0.140960
\(216\) 378.731 + 437.234i 0.119303 + 0.137731i
\(217\) 4368.00 1783.23i 1.36645 0.557850i
\(218\) 7710.21i 2.39542i
\(219\) −108.000 445.295i −0.0333240 0.137399i
\(220\) 2998.18i 0.918804i
\(221\) 3413.93i 1.03912i
\(222\) −1161.44 4788.75i −0.351130 1.44775i
\(223\) 1915.50i 0.575208i 0.957749 + 0.287604i \(0.0928587\pi\)
−0.957749 + 0.287604i \(0.907141\pi\)
\(224\) 4453.88 1818.29i 1.32852 0.542364i
\(225\) −552.000 + 284.494i −0.163556 + 0.0842946i
\(226\) −6902.00 −2.03148
\(227\) −5948.61 −1.73931 −0.869654 0.493661i \(-0.835658\pi\)
−0.869654 + 0.493661i \(0.835658\pi\)
\(228\) 405.000 + 1669.86i 0.117639 + 0.485040i
\(229\) 3706.08i 1.06945i 0.845025 + 0.534726i \(0.179585\pi\)
−0.845025 + 0.534726i \(0.820415\pi\)
\(230\) −3777.21 −1.08288
\(231\) −2573.21 + 1858.64i −0.732922 + 0.529392i
\(232\) −238.000 −0.0673511
\(233\) 956.561i 0.268954i 0.990917 + 0.134477i \(0.0429355\pi\)
−0.990917 + 0.134477i \(0.957065\pi\)
\(234\) 5574.93 2873.25i 1.55745 0.802694i
\(235\) −3468.00 −0.962670
\(236\) −1181.64 −0.325925
\(237\) 2231.99 541.337i 0.611744 0.148370i
\(238\) −4284.00 + 1748.94i −1.16677 + 0.476331i
\(239\) 4791.05i 1.29668i 0.761350 + 0.648341i \(0.224537\pi\)
−0.761350 + 0.648341i \(0.775463\pi\)
\(240\) 2805.00 680.312i 0.754425 0.182975i
\(241\) 3786.91i 1.01218i −0.862479 0.506092i \(-0.831090\pi\)
0.862479 0.506092i \(-0.168910\pi\)
\(242\) 1001.91i 0.266138i
\(243\) −1408.88 + 3516.24i −0.371933 + 0.928260i
\(244\) 639.317i 0.167738i
\(245\) −2474.38 + 2424.39i −0.645234 + 0.632197i
\(246\) 714.000 + 2943.90i 0.185053 + 0.762992i
\(247\) 2070.00 0.533243
\(248\) −1050.35 −0.268940
\(249\) 2499.00 606.097i 0.636015 0.154256i
\(250\) 6162.92i 1.55911i
\(251\) 4029.70 1.01336 0.506678 0.862135i \(-0.330873\pi\)
0.506678 + 0.862135i \(0.330873\pi\)
\(252\) −3420.81 2924.36i −0.855121 0.731022i
\(253\) 2992.00 0.743500
\(254\) 4321.01i 1.06742i
\(255\) −3090.45 + 749.544i −0.758947 + 0.184072i
\(256\) 2889.00 0.705322
\(257\) −201.990 −0.0490264 −0.0245132 0.999700i \(-0.507804\pi\)
−0.0245132 + 0.999700i \(0.507804\pi\)
\(258\) −222.189 916.109i −0.0536159 0.221064i
\(259\) 1610.00 + 3943.68i 0.386257 + 0.946132i
\(260\) 5120.90i 1.22148i
\(261\) −714.000 1385.36i −0.169331 0.328551i
\(262\) 10535.3i 2.48424i
\(263\) 8279.20i 1.94113i 0.240840 + 0.970565i \(0.422577\pi\)
−0.240840 + 0.970565i \(0.577423\pi\)
\(264\) 686.766 166.565i 0.160104 0.0388310i
\(265\) 2082.07i 0.482643i
\(266\) −1060.45 2597.56i −0.244437 0.598746i
\(267\) 2448.00 593.727i 0.561105 0.136088i
\(268\) 576.000 0.131287
\(269\) 5787.02 1.31168 0.655838 0.754902i \(-0.272316\pi\)
0.655838 + 0.754902i \(0.272316\pi\)
\(270\) −3825.00 4415.85i −0.862156 0.995333i
\(271\) 1219.85i 0.273433i 0.990610 + 0.136717i \(0.0436549\pi\)
−0.990610 + 0.136717i \(0.956345\pi\)
\(272\) −3332.84 −0.742952
\(273\) −4395.06 + 3174.56i −0.974363 + 0.703785i
\(274\) −4148.00 −0.914561
\(275\) 758.651i 0.166358i
\(276\) 999.851 + 4122.49i 0.218058 + 0.899075i
\(277\) −3214.00 −0.697150 −0.348575 0.937281i \(-0.613334\pi\)
−0.348575 + 0.937281i \(0.613334\pi\)
\(278\) 5746.62 1.23978
\(279\) −3151.05 6113.93i −0.676158 1.31194i
\(280\) 714.000 291.489i 0.152392 0.0622136i
\(281\) 9235.76i 1.96071i −0.197245 0.980354i \(-0.563200\pi\)
0.197245 0.980354i \(-0.436800\pi\)
\(282\) 1734.00 + 7149.47i 0.366164 + 1.50973i
\(283\) 2981.03i 0.626162i −0.949726 0.313081i \(-0.898639\pi\)
0.949726 0.313081i \(-0.101361\pi\)
\(284\) 4156.09i 0.868375i
\(285\) −454.478 1873.86i −0.0944594 0.389466i
\(286\) 7662.00i 1.58414i
\(287\) −989.751 2424.39i −0.203565 0.498631i
\(288\) −3213.00 6234.14i −0.657388 1.27552i
\(289\) −1241.00 −0.252595
\(290\) 2403.68 0.486721
\(291\) −1338.00 5516.72i −0.269536 1.11133i
\(292\) 793.635i 0.159055i
\(293\) 5160.85 1.02901 0.514505 0.857487i \(-0.327976\pi\)
0.514505 + 0.857487i \(0.327976\pi\)
\(294\) 6235.19 + 3888.87i 1.23688 + 0.771440i
\(295\) 1326.00 0.261704
\(296\) 948.314i 0.186215i
\(297\) 3029.85 + 3497.87i 0.591952 + 0.683391i
\(298\) 1054.00 0.204888
\(299\) 5110.35 0.988425
\(300\) −1045.30 + 253.522i −0.201168 + 0.0487904i
\(301\) 308.000 + 754.443i 0.0589795 + 0.144470i
\(302\) 5970.26i 1.13758i
\(303\) −6375.00 + 1546.16i −1.20869 + 0.293151i
\(304\) 2020.83i 0.381258i
\(305\) 717.420i 0.134686i
\(306\) 3090.45 + 5996.35i 0.577350 + 1.12022i
\(307\) 1873.86i 0.348361i −0.984714 0.174180i \(-0.944272\pi\)
0.984714 0.174180i \(-0.0557276\pi\)
\(308\) −5090.15 + 2078.05i −0.941683 + 0.384440i
\(309\) 60.0000 + 247.386i 0.0110462 + 0.0455447i
\(310\) 10608.0 1.94353
\(311\) −8564.38 −1.56155 −0.780774 0.624814i \(-0.785175\pi\)
−0.780774 + 0.624814i \(0.785175\pi\)
\(312\) 1173.00 284.494i 0.212846 0.0516228i
\(313\) 533.989i 0.0964308i 0.998837 + 0.0482154i \(0.0153534\pi\)
−0.998837 + 0.0482154i \(0.984647\pi\)
\(314\) −14008.0 −2.51757
\(315\) 3838.72 + 3281.62i 0.686626 + 0.586979i
\(316\) 3978.00 0.708165
\(317\) 5104.40i 0.904391i −0.891919 0.452195i \(-0.850641\pi\)
0.891919 0.452195i \(-0.149359\pi\)
\(318\) −4292.29 + 1041.03i −0.756917 + 0.183579i
\(319\) −1904.00 −0.334180
\(320\) 6372.79 1.11328
\(321\) 1797.71 + 7412.16i 0.312581 + 1.28880i
\(322\) −2618.00 6412.76i −0.453091 1.10984i
\(323\) 2226.48i 0.383543i
\(324\) −3807.00 + 5343.54i −0.652778 + 0.916246i
\(325\) 1295.78i 0.221160i
\(326\) 12897.1i 2.19111i
\(327\) 9443.04 2290.27i 1.59695 0.387316i
\(328\) 582.979i 0.0981390i
\(329\) −2403.68 5887.79i −0.402794 0.986640i
\(330\) −6936.00 + 1682.23i −1.15701 + 0.280617i
\(331\) 3632.00 0.603120 0.301560 0.953447i \(-0.402493\pi\)
0.301560 + 0.953447i \(0.402493\pi\)
\(332\) 4453.88 0.736261
\(333\) 5520.00 2844.94i 0.908391 0.468174i
\(334\) 2914.89i 0.477532i
\(335\) −646.368 −0.105418
\(336\) 3099.15 + 4290.66i 0.503193 + 0.696651i
\(337\) −6256.00 −1.01123 −0.505617 0.862758i \(-0.668735\pi\)
−0.505617 + 0.862758i \(0.668735\pi\)
\(338\) 4028.27i 0.648252i
\(339\) −2050.20 8453.19i −0.328471 1.35432i
\(340\) −5508.00 −0.878568
\(341\) −8402.79 −1.33442
\(342\) −3635.82 + 1873.86i −0.574862 + 0.296277i
\(343\) −5831.00 2520.52i −0.917914 0.396780i
\(344\) 181.417i 0.0284341i
\(345\) −1122.00 4626.12i −0.175091 0.721919i
\(346\) 9286.02i 1.44283i
\(347\) 1072.01i 0.165845i −0.996556 0.0829227i \(-0.973575\pi\)
0.996556 0.0829227i \(-0.0264255\pi\)
\(348\) −636.269 2623.40i −0.0980103 0.404107i
\(349\) 6287.84i 0.964414i 0.876057 + 0.482207i \(0.160165\pi\)
−0.876057 + 0.482207i \(0.839835\pi\)
\(350\) 1626.02 663.820i 0.248327 0.101379i
\(351\) 5175.00 + 5974.38i 0.786955 + 0.908515i
\(352\) −8568.00 −1.29737
\(353\) 5292.14 0.797938 0.398969 0.916964i \(-0.369368\pi\)
0.398969 + 0.916964i \(0.369368\pi\)
\(354\) −663.000 2733.62i −0.0995425 0.410424i
\(355\) 4663.83i 0.697268i
\(356\) 4362.99 0.649544
\(357\) −3414.54 4727.30i −0.506209 0.700826i
\(358\) 14416.0 2.12824
\(359\) 3207.78i 0.471588i 0.971803 + 0.235794i \(0.0757690\pi\)
−0.971803 + 0.235794i \(0.924231\pi\)
\(360\) −515.075 999.392i −0.0754078 0.146313i
\(361\) 5509.00 0.803178
\(362\) −757.463 −0.109976
\(363\) −1227.09 + 297.613i −0.177426 + 0.0430320i
\(364\) −8694.00 + 3549.31i −1.25189 + 0.511084i
\(365\) 890.591i 0.127714i
\(366\) 1479.00 358.710i 0.211226 0.0512297i
\(367\) 9381.55i 1.33437i 0.744893 + 0.667184i \(0.232500\pi\)
−0.744893 + 0.667184i \(0.767500\pi\)
\(368\) 4988.96i 0.706705i
\(369\) −3393.43 + 1748.94i −0.478740 + 0.246737i
\(370\) 9577.50i 1.34570i
\(371\) 3534.83 1443.09i 0.494661 0.201944i
\(372\) −2808.00 11577.7i −0.391366 1.61364i
\(373\) 4598.00 0.638272 0.319136 0.947709i \(-0.396607\pi\)
0.319136 + 0.947709i \(0.396607\pi\)
\(374\) 8241.20 1.13942
\(375\) 7548.00 1830.66i 1.03941 0.252093i
\(376\) 1415.81i 0.194188i
\(377\) −3252.04 −0.444267
\(378\) 4845.88 9554.53i 0.659379 1.30008i
\(379\) 5252.00 0.711813 0.355906 0.934522i \(-0.384172\pi\)
0.355906 + 0.934522i \(0.384172\pi\)
\(380\) 3339.72i 0.450852i
\(381\) 5292.14 1283.53i 0.711613 0.172592i
\(382\) −1088.00 −0.145725
\(383\) 1918.91 0.256009 0.128005 0.991774i \(-0.459143\pi\)
0.128005 + 0.991774i \(0.459143\pi\)
\(384\) −641.319 2644.22i −0.0852270 0.351400i
\(385\) 5712.00 2331.91i 0.756131 0.308689i
\(386\) 2688.26i 0.354479i
\(387\) 1056.00 544.250i 0.138707 0.0714878i
\(388\) 9832.25i 1.28649i
\(389\) 7067.00i 0.921109i 0.887632 + 0.460554i \(0.152349\pi\)
−0.887632 + 0.460554i \(0.847651\pi\)
\(390\) −11846.7 + 2873.25i −1.53816 + 0.373058i
\(391\) 5496.65i 0.710941i
\(392\) 989.751 + 1010.16i 0.127526 + 0.130155i
\(393\) −12903.0 + 3129.44i −1.65616 + 0.401677i
\(394\) −8330.00 −1.06513
\(395\) −4463.98 −0.568626
\(396\) 3672.00 + 7124.73i 0.465972 + 0.904119i
\(397\) 13337.5i 1.68612i −0.537822 0.843059i \(-0.680753\pi\)
0.537822 0.843059i \(-0.319247\pi\)
\(398\) 19997.0 2.51849
\(399\) 2866.34 2070.37i 0.359641 0.259769i
\(400\) 1265.00 0.158125
\(401\) 13251.7i 1.65027i 0.564939 + 0.825133i \(0.308900\pi\)
−0.564939 + 0.825133i \(0.691100\pi\)
\(402\) 323.184 + 1332.52i 0.0400969 + 0.165324i
\(403\) −14352.0 −1.77401
\(404\) −11361.9 −1.39920
\(405\) 4272.09 5996.35i 0.524153 0.735706i
\(406\) 1666.00 + 4080.85i 0.203651 + 0.498840i
\(407\) 7586.51i 0.923955i
\(408\) 306.000 + 1261.67i 0.0371305 + 0.153093i
\(409\) 7461.15i 0.902029i 0.892517 + 0.451015i \(0.148938\pi\)
−0.892517 + 0.451015i \(0.851062\pi\)
\(410\) 5887.79i 0.709213i
\(411\) −1232.14 5080.24i −0.147876 0.609708i
\(412\) 440.908i 0.0527233i
\(413\) 919.055 + 2251.22i 0.109501 + 0.268221i
\(414\) −8976.00 + 4626.12i −1.06557 + 0.549183i
\(415\) −4998.00 −0.591186
\(416\) −14634.2 −1.72476
\(417\) 1707.00 + 7038.14i 0.200461 + 0.826521i
\(418\) 4996.96i 0.584711i
\(419\) −9261.25 −1.07981 −0.539906 0.841725i \(-0.681540\pi\)
−0.539906 + 0.841725i \(0.681540\pi\)
\(420\) 5121.81 + 7090.94i 0.595044 + 0.823816i
\(421\) −2854.00 −0.330393 −0.165196 0.986261i \(-0.552826\pi\)
−0.165196 + 0.986261i \(0.552826\pi\)
\(422\) 9169.79i 1.05777i
\(423\) −8241.20 + 4247.42i −0.947283 + 0.488218i
\(424\) −850.000 −0.0973577
\(425\) −1393.73 −0.159073
\(426\) 9614.73 2331.91i 1.09351 0.265215i
\(427\) −1218.00 + 497.246i −0.138040 + 0.0563547i
\(428\) 13210.4i 1.49194i
\(429\) 9384.00 2275.95i 1.05609 0.256140i
\(430\) 1832.22i 0.205482i
\(431\) 11289.1i 1.26166i −0.775921 0.630830i \(-0.782715\pi\)
0.775921 0.630830i \(-0.217285\pi\)
\(432\) 5832.46 5052.07i 0.649571 0.562657i
\(433\) 13036.2i 1.44683i −0.690411 0.723417i \(-0.742570\pi\)
0.690411 0.723417i \(-0.257430\pi\)
\(434\) 7352.44 + 18009.7i 0.813199 + 1.99192i
\(435\) 714.000 + 2943.90i 0.0786981 + 0.324481i
\(436\) 16830.0 1.84865
\(437\) −3332.84 −0.364831
\(438\) 1836.00 445.295i 0.200291 0.0485777i
\(439\) 3003.07i 0.326490i 0.986586 + 0.163245i \(0.0521960\pi\)
−0.986586 + 0.163245i \(0.947804\pi\)
\(440\) −1373.53 −0.148820
\(441\) −2910.75 + 8791.68i −0.314301 + 0.949323i
\(442\) 14076.0 1.51477
\(443\) 6844.36i 0.734052i 0.930211 + 0.367026i \(0.119624\pi\)
−0.930211 + 0.367026i \(0.880376\pi\)
\(444\) 10453.0 2535.22i 1.11729 0.270983i
\(445\) −4896.00 −0.521557
\(446\) −7897.81 −0.838503
\(447\) 313.085 + 1290.88i 0.0331284 + 0.136592i
\(448\) 4417.00 + 10819.4i 0.465812 + 1.14100i
\(449\) 2655.28i 0.279088i −0.990216 0.139544i \(-0.955436\pi\)
0.990216 0.139544i \(-0.0445636\pi\)
\(450\) −1173.00 2275.95i −0.122879 0.238421i
\(451\) 4663.83i 0.486943i
\(452\) 15065.8i 1.56778i
\(453\) −7312.04 + 1773.43i −0.758388 + 0.183936i
\(454\) 24526.7i 2.53546i
\(455\) 9756.12 3982.92i 1.00522 0.410378i
\(456\) −765.000 + 185.540i −0.0785623 + 0.0190542i
\(457\) 1196.00 0.122421 0.0612106 0.998125i \(-0.480504\pi\)
0.0612106 + 0.998125i \(0.480504\pi\)
\(458\) −15280.6 −1.55898
\(459\) −6426.00 + 5566.19i −0.653464 + 0.566030i
\(460\) 8244.98i 0.835705i
\(461\) 5443.63 0.549968 0.274984 0.961449i \(-0.411327\pi\)
0.274984 + 0.961449i \(0.411327\pi\)
\(462\) −7663.36 10609.6i −0.771714 1.06841i
\(463\) 926.000 0.0929479 0.0464739 0.998920i \(-0.485202\pi\)
0.0464739 + 0.998920i \(0.485202\pi\)
\(464\) 3174.79i 0.317642i
\(465\) 3151.05 + 12992.1i 0.314250 + 1.29569i
\(466\) −3944.00 −0.392065
\(467\) 7786.72 0.771577 0.385788 0.922587i \(-0.373929\pi\)
0.385788 + 0.922587i \(0.373929\pi\)
\(468\) 6271.79 + 12169.1i 0.619474 + 1.20196i
\(469\) −448.000 1097.37i −0.0441081 0.108042i
\(470\) 14298.9i 1.40332i
\(471\) −4161.00 17156.2i −0.407067 1.67838i
\(472\) 541.337i 0.0527904i
\(473\) 1451.33i 0.141083i
\(474\) 2231.99 + 9202.73i 0.216284 + 0.891763i
\(475\) 845.074i 0.0816308i
\(476\) −3817.61 9351.20i −0.367605 0.900445i
\(477\) −2550.00 4947.73i −0.244772 0.474928i
\(478\) −19754.0 −1.89022
\(479\) 12503.2 1.19266 0.596331 0.802739i \(-0.296625\pi\)
0.596331 + 0.802739i \(0.296625\pi\)
\(480\) 3213.00 + 13247.5i 0.305526 + 1.25972i
\(481\) 12957.8i 1.22833i
\(482\) 15613.8 1.47550
\(483\) 7076.34 5111.26i 0.666635 0.481512i
\(484\) −2187.00 −0.205391
\(485\) 11033.4i 1.03299i
\(486\) −14497.8 5808.96i −1.35316 0.542181i
\(487\) 13712.0 1.27587 0.637936 0.770089i \(-0.279788\pi\)
0.637936 + 0.770089i \(0.279788\pi\)
\(488\) 292.886 0.0271687
\(489\) −15795.6 + 3831.00i −1.46074 + 0.354282i
\(490\) −9996.00 10202.1i −0.921578 0.940582i
\(491\) 5772.35i 0.530555i −0.964172 0.265277i \(-0.914536\pi\)
0.964172 0.265277i \(-0.0854635\pi\)
\(492\) −6426.00 + 1558.53i −0.588834 + 0.142813i
\(493\) 3497.87i 0.319546i
\(494\) 8534.83i 0.777328i
\(495\) −4120.60 7995.13i −0.374156 0.725969i
\(496\) 14011.1i 1.26838i
\(497\) −7918.01 + 3232.51i −0.714631 + 0.291747i
\(498\) 2499.00 + 10303.6i 0.224865 + 0.927143i
\(499\) 15476.0 1.38838 0.694189 0.719792i \(-0.255763\pi\)
0.694189 + 0.719792i \(0.255763\pi\)
\(500\) 13452.5 1.20323
\(501\) −3570.00 + 865.852i −0.318355 + 0.0772124i
\(502\) 16614.9i 1.47721i
\(503\) −1696.72 −0.150403 −0.0752017 0.997168i \(-0.523960\pi\)
−0.0752017 + 0.997168i \(0.523960\pi\)
\(504\) 1339.72 1567.15i 0.118404 0.138505i
\(505\) 12750.0 1.12350
\(506\) 12336.3i 1.08383i
\(507\) 4933.61 1196.58i 0.432168 0.104816i
\(508\) 9432.00 0.823774
\(509\) −4231.69 −0.368500 −0.184250 0.982879i \(-0.558986\pi\)
−0.184250 + 0.982879i \(0.558986\pi\)
\(510\) −3090.45 12742.2i −0.268328 1.10635i
\(511\) −1512.00 + 617.271i −0.130894 + 0.0534373i
\(512\) 16100.7i 1.38976i
\(513\) −3375.00 3896.33i −0.290468 0.335336i
\(514\) 832.827i 0.0714677i
\(515\) 494.773i 0.0423345i
\(516\) 1999.70 484.999i 0.170605 0.0413777i
\(517\) 11326.4i 0.963513i
\(518\) −16260.2 + 6638.20i −1.37921 + 0.563061i
\(519\) 11373.0 2758.36i 0.961887 0.233292i
\(520\) −2346.00 −0.197844
\(521\) 19572.8 1.64588 0.822938 0.568131i \(-0.192333\pi\)
0.822938 + 0.568131i \(0.192333\pi\)
\(522\) 5712.00 2943.90i 0.478941 0.246841i
\(523\) 8369.91i 0.699791i 0.936789 + 0.349895i \(0.113783\pi\)
−0.936789 + 0.349895i \(0.886217\pi\)
\(524\) −22996.6 −1.91719
\(525\) 1296.01 + 1794.28i 0.107738 + 0.149159i
\(526\) −34136.0 −2.82966
\(527\) 15436.9i 1.27598i
\(528\) −2221.89 9161.09i −0.183135 0.755086i
\(529\) 3939.00 0.323745
\(530\) 8584.58 0.703567
\(531\) 3151.05 1624.01i 0.257521 0.132723i
\(532\) 5670.00 2314.77i 0.462078 0.188643i
\(533\) 7965.84i 0.647352i
\(534\) 2448.00 + 10093.4i 0.198381 + 0.817945i
\(535\) 14824.3i 1.19796i
\(536\) 263.879i 0.0212646i
\(537\) 4282.19 + 17655.9i 0.344116 + 1.41883i
\(538\) 23860.5i 1.91208i
\(539\) 7918.01 + 8081.29i 0.632751 + 0.645799i
\(540\) 9639.00 8349.29i 0.768142 0.665363i
\(541\) −16150.0 −1.28344 −0.641722 0.766938i \(-0.721780\pi\)
−0.641722 + 0.766938i \(0.721780\pi\)
\(542\) −5029.55 −0.398594
\(543\) −225.000 927.699i −0.0177821 0.0733174i
\(544\) 15740.4i 1.24056i
\(545\) −18886.1 −1.48439
\(546\) −13089.1 18121.3i −1.02593 1.42037i
\(547\) −18352.0 −1.43451 −0.717253 0.696813i \(-0.754601\pi\)
−0.717253 + 0.696813i \(0.754601\pi\)
\(548\) 9054.34i 0.705807i
\(549\) 878.657 + 1704.84i 0.0683063 + 0.132534i
\(550\) −3128.00 −0.242506
\(551\) 2120.90 0.163980
\(552\) −1888.61 + 458.055i −0.145624 + 0.0353190i
\(553\) −3094.00 7578.72i −0.237921 0.582785i
\(554\) 13251.7i 1.01626i
\(555\) −11730.0 + 2844.94i −0.897137 + 0.217588i
\(556\) 12543.8i 0.956793i
\(557\) 3323.22i 0.252800i −0.991979 0.126400i \(-0.959658\pi\)
0.991979 0.126400i \(-0.0403423\pi\)
\(558\) 25208.4 12992.1i 1.91246 0.985662i
\(559\) 2478.88i 0.187559i
\(560\) −3888.31 9524.37i −0.293413 0.718711i
\(561\) 2448.00 + 10093.4i 0.184233 + 0.759612i
\(562\) 38080.0 2.85820
\(563\) −14290.8 −1.06978 −0.534889 0.844922i \(-0.679647\pi\)
−0.534889 + 0.844922i \(0.679647\pi\)
\(564\) −15606.0 + 3785.01i −1.16513 + 0.282585i
\(565\) 16906.4i 1.25886i
\(566\) 12291.1 0.912780
\(567\) 13141.3 + 3096.85i 0.973338 + 0.229375i
\(568\) 1904.00 0.140652
\(569\) 14801.9i 1.09056i −0.838253 0.545281i \(-0.816423\pi\)
0.838253 0.545281i \(-0.183577\pi\)
\(570\) 7726.12 1873.86i 0.567740 0.137697i
\(571\) 4136.00 0.303128 0.151564 0.988447i \(-0.451569\pi\)
0.151564 + 0.988447i \(0.451569\pi\)
\(572\) 16724.8 1.22255
\(573\) −323.184 1332.52i −0.0235623 0.0971500i
\(574\) 9996.00 4080.85i 0.726873 0.296745i
\(575\) 2086.29i 0.151312i
\(576\) 15144.0 7805.04i 1.09549 0.564601i
\(577\) 19458.7i 1.40395i −0.712202 0.701974i \(-0.752302\pi\)
0.712202 0.701974i \(-0.247698\pi\)
\(578\) 5116.77i 0.368218i
\(579\) 3292.44 798.534i 0.236320 0.0573159i
\(580\) 5246.81i 0.375624i
\(581\) −3464.13 8485.35i −0.247360 0.605907i
\(582\) 22746.0 5516.72i 1.62002 0.392913i
\(583\) −6800.00 −0.483066
\(584\) 363.582 0.0257622
\(585\) −7038.00 13655.7i −0.497411 0.965119i
\(586\) 21278.7i 1.50003i
\(587\) −18310.4 −1.28748 −0.643740 0.765244i \(-0.722618\pi\)
−0.643740 + 0.765244i \(0.722618\pi\)
\(588\) −8488.70 + 13610.3i −0.595354 + 0.954557i
\(589\) 9360.00 0.654791
\(590\) 5467.24i 0.381496i
\(591\) −2474.38 10202.1i −0.172221 0.710083i
\(592\) −12650.0 −0.878229
\(593\) 7998.81 0.553915 0.276958 0.960882i \(-0.410674\pi\)
0.276958 + 0.960882i \(0.410674\pi\)
\(594\) −14422.1 + 12492.4i −0.996205 + 0.862911i
\(595\) 4284.00 + 10493.6i 0.295171 + 0.723019i
\(596\) 2300.69i 0.158121i
\(597\) 5940.00 + 24491.2i 0.407216 + 1.67900i
\(598\) 21070.5i 1.44086i
\(599\) 12435.3i 0.848234i 0.905607 + 0.424117i \(0.139415\pi\)
−0.905607 + 0.424117i \(0.860585\pi\)
\(600\) −116.144 478.875i −0.00790262 0.0325833i
\(601\) 18557.3i 1.25952i −0.776791 0.629758i \(-0.783154\pi\)
0.776791 0.629758i \(-0.216846\pi\)
\(602\) −3110.65 + 1269.92i −0.210599 + 0.0859766i
\(603\) −1536.00 + 791.636i −0.103733 + 0.0534626i
\(604\) −13032.0 −0.877921
\(605\) 2454.18 0.164920
\(606\) −6375.00 26284.8i −0.427338 1.76196i
\(607\) 1592.17i 0.106465i −0.998582 0.0532324i \(-0.983048\pi\)
0.998582 0.0532324i \(-0.0169524\pi\)
\(608\) 9544.03 0.636614
\(609\) −4503.12 + 3252.62i −0.299632 + 0.216425i
\(610\) −2958.00 −0.196338
\(611\) 19345.6i 1.28092i
\(612\) −13089.0 + 6745.89i −0.864526 + 0.445566i
\(613\) −1786.00 −0.117677 −0.0588384 0.998268i \(-0.518740\pi\)
−0.0588384 + 0.998268i \(0.518740\pi\)
\(614\) 7726.12 0.507819
\(615\) 7211.05 1748.94i 0.472809 0.114673i
\(616\) −952.000 2331.91i −0.0622681 0.152525i
\(617\) 8254.46i 0.538593i 0.963057 + 0.269297i \(0.0867912\pi\)
−0.963057 + 0.269297i \(0.913209\pi\)
\(618\) −1020.00 + 247.386i −0.0663923 + 0.0161025i
\(619\) 8301.32i 0.539028i 0.962996 + 0.269514i \(0.0868630\pi\)
−0.962996 + 0.269514i \(0.913137\pi\)
\(620\) 23155.4i 1.49991i
\(621\) −8332.09 9619.15i −0.538414 0.621583i
\(622\) 35311.8i 2.27633i
\(623\) −3393.43 8312.18i −0.218226 0.534543i
\(624\) −3795.00 15647.2i −0.243464 1.00383i
\(625\) −12221.0 −0.782144
\(626\) −2201.69 −0.140571
\(627\) −6120.00 + 1484.32i −0.389807 + 0.0945422i
\(628\) 30577.0i 1.94292i
\(629\) 13937.3 0.883493
\(630\) −13530.5 + 15827.4i −0.855662 + 1.00092i
\(631\) −13102.0 −0.826596 −0.413298 0.910596i \(-0.635623\pi\)
−0.413298 + 0.910596i \(0.635623\pi\)
\(632\) 1822.41i 0.114702i
\(633\) 11230.6 2723.83i 0.705179 0.171031i
\(634\) 21046.0 1.31837
\(635\) −10584.3 −0.661456
\(636\) −2272.39 9369.30i −0.141676 0.584146i
\(637\) 13524.0 + 13802.9i 0.841194 + 0.858540i
\(638\) 7850.39i 0.487147i
\(639\) 5712.00 + 11082.9i 0.353620 + 0.686124i
\(640\) 5288.45i 0.326632i
\(641\) 9837.73i 0.606189i 0.952961 + 0.303094i \(0.0980197\pi\)
−0.952961 + 0.303094i \(0.901980\pi\)
\(642\) −30561.1 + 7412.16i −1.87874 + 0.455661i
\(643\) 9624.05i 0.590257i −0.955458 0.295129i \(-0.904638\pi\)
0.955458 0.295129i \(-0.0953625\pi\)
\(644\) 13997.9 5714.62i 0.856514 0.349670i
\(645\) −2244.00 + 544.250i −0.136988 + 0.0332245i
\(646\) −9180.00 −0.559106
\(647\) 7695.82 0.467626 0.233813 0.972282i \(-0.424880\pi\)
0.233813 + 0.972282i \(0.424880\pi\)
\(648\) −2448.00 1744.07i −0.148405 0.105731i
\(649\) 4330.70i 0.261933i
\(650\) −5342.64 −0.322393
\(651\) −19873.3 + 14354.5i −1.19646 + 0.864208i
\(652\) −28152.0 −1.69098
\(653\) 28309.2i 1.69652i −0.529582 0.848259i \(-0.677651\pi\)
0.529582 0.848259i \(-0.322349\pi\)
\(654\) 9443.04 + 38934.6i 0.564605 + 2.32793i
\(655\) 25806.0 1.53943
\(656\) 7776.62 0.462844
\(657\) 1090.75 + 2116.36i 0.0647703 + 0.125673i
\(658\) 24276.0 9910.64i 1.43826 0.587168i
\(659\) 22973.9i 1.35802i 0.734127 + 0.679012i \(0.237592\pi\)
−0.734127 + 0.679012i \(0.762408\pi\)
\(660\) −3672.00 15140.0i −0.216564 0.892917i
\(661\) 10804.7i 0.635785i 0.948127 + 0.317893i \(0.102975\pi\)
−0.948127 + 0.317893i \(0.897025\pi\)
\(662\) 14975.1i 0.879191i
\(663\) 4181.20 + 17239.5i 0.244923 + 1.00984i
\(664\) 2040.42i 0.119253i
\(665\) −6362.69 + 2597.56i −0.371029 + 0.151472i
\(666\) 11730.0 + 22759.5i 0.682475 + 1.32420i
\(667\) 5236.00 0.303956
\(668\) −6362.69 −0.368533
\(669\) −2346.00 9672.81i −0.135578 0.559002i
\(670\) 2665.04i 0.153671i
\(671\) 2343.09 0.134804
\(672\) −20264.1 + 14636.8i −1.16325 + 0.840217i
\(673\) 26882.0 1.53971 0.769855 0.638219i \(-0.220328\pi\)
0.769855 + 0.638219i \(0.220328\pi\)
\(674\) 25794.1i 1.47411i
\(675\) 2439.03 2112.68i 0.139079 0.120470i
\(676\) 8793.00 0.500284
\(677\) −20491.9 −1.16332 −0.581660 0.813432i \(-0.697597\pi\)
−0.581660 + 0.813432i \(0.697597\pi\)
\(678\) 34853.4 8453.19i 1.97424 0.478824i
\(679\) −18732.0 + 7647.31i −1.05872 + 0.432219i
\(680\) 2523.34i 0.142302i
\(681\) 30039.0 7285.53i 1.69030 0.409959i
\(682\) 34645.6i 1.94523i
\(683\) 725.667i 0.0406543i −0.999793 0.0203271i \(-0.993529\pi\)
0.999793 0.0203271i \(-0.00647077\pi\)
\(684\) −4090.30 7936.35i −0.228650 0.443646i
\(685\) 10160.5i 0.566733i
\(686\) 10392.4 24041.8i 0.578401 1.33808i
\(687\) −4539.00 18714.8i −0.252072 1.03932i
\(688\) −2420.00 −0.134101
\(689\) −11614.4 −0.642198
\(690\) 19074.0 4626.12i 1.05237 0.255237i
\(691\) 11760.0i 0.647426i −0.946155 0.323713i \(-0.895069\pi\)
0.946155 0.323713i \(-0.104931\pi\)
\(692\) 20269.7 1.11350
\(693\) 10717.7 12537.2i 0.587494 0.687228i
\(694\) 4420.00 0.241759
\(695\) 14076.3i 0.768265i
\(696\) 1201.84 291.489i 0.0654535 0.0158748i
\(697\) −8568.00 −0.465619
\(698\) −25925.4 −1.40586
\(699\) −1171.54 4830.39i −0.0633931 0.261377i
\(700\) 1449.00 + 3549.31i 0.0782386 + 0.191645i
\(701\) 21877.2i 1.17873i −0.807867 0.589365i \(-0.799378\pi\)
0.807867 0.589365i \(-0.200622\pi\)
\(702\) −24633.0 + 21337.1i −1.32438 + 1.14717i
\(703\) 8450.74i 0.453379i
\(704\) 20813.4i 1.11426i
\(705\) 17512.5 4247.42i 0.935547 0.226903i
\(706\) 21820.1i 1.16318i
\(707\) 8837.07 + 21646.3i 0.470088 + 1.15148i
\(708\) 5967.00 1447.21i 0.316742 0.0768213i
\(709\) −24382.0 −1.29152 −0.645758 0.763542i \(-0.723459\pi\)
−0.645758 + 0.763542i \(0.723459\pi\)
\(710\) −19229.5 −1.01643
\(711\) −10608.0 + 5467.24i −0.559537 + 0.288379i
\(712\) 1998.78i 0.105207i
\(713\) 23107.7 1.21373
\(714\) 19491.1 14078.5i 1.02162 0.737920i
\(715\) −18768.0 −0.981655
\(716\) 31467.5i 1.64245i
\(717\) −5867.81 24193.6i −0.305631 1.26015i
\(718\) −13226.0 −0.687451
\(719\) −11089.3 −0.575187 −0.287594 0.957753i \(-0.592855\pi\)
−0.287594 + 0.957753i \(0.592855\pi\)
\(720\) −13331.3 + 6870.82i −0.690042 + 0.355639i
\(721\) 840.000 342.929i 0.0433887 0.0177134i
\(722\) 22714.2i 1.17082i
\(723\) 4638.00 + 19123.0i 0.238574 + 0.983666i
\(724\) 1653.41i 0.0848734i
\(725\) 1327.64i 0.0680101i
\(726\) −1227.09 5059.42i −0.0627294 0.258640i
\(727\) 5927.77i 0.302405i 0.988503 + 0.151203i \(0.0483146\pi\)
−0.988503 + 0.151203i \(0.951685\pi\)
\(728\) −1626.02 3982.92i −0.0827807 0.202770i
\(729\) 2808.00 19481.7i 0.142661 0.989772i
\(730\) −3672.00 −0.186174
\(731\) 2666.27 0.134905
\(732\) 783.000 + 3228.39i 0.0395362 + 0.163012i
\(733\) 22532.9i 1.13543i 0.823225 + 0.567715i \(0.192172\pi\)
−0.823225 + 0.567715i \(0.807828\pi\)
\(734\) −38681.1 −1.94516
\(735\) 9525.75 15273.0i 0.478044 0.766468i
\(736\) 23562.0 1.18004
\(737\) 2111.03i 0.105510i
\(738\) −7211.05 13991.5i −0.359678 0.697878i
\(739\) −9220.00 −0.458949 −0.229474 0.973315i \(-0.573701\pi\)
−0.229474 + 0.973315i \(0.573701\pi\)
\(740\) −20906.0 −1.03854
\(741\) −10453.0 + 2535.22i −0.518219 + 0.125687i
\(742\) 5950.00 + 14574.5i 0.294382 + 0.721085i
\(743\) 14950.4i 0.738191i −0.929391 0.369096i \(-0.879667\pi\)
0.929391 0.369096i \(-0.120333\pi\)
\(744\) 5304.00 1286.41i 0.261363 0.0633898i
\(745\) 2581.76i 0.126964i
\(746\) 18958.0i 0.930433i
\(747\) −11877.0 + 6121.27i −0.581737 + 0.299820i
\(748\) 17989.1i 0.879338i
\(749\) 25168.0 10274.8i 1.22779 0.501245i
\(750\) 7548.00 + 31121.2i 0.367485 + 1.51518i
\(751\) 26648.0 1.29481 0.647403 0.762148i \(-0.275855\pi\)
0.647403 + 0.762148i \(0.275855\pi\)
\(752\) 18886.1 0.915830
\(753\) −20349.0 + 4935.36i −0.984806 + 0.238850i
\(754\) 13408.5i 0.647625i
\(755\) 14624.1 0.704934
\(756\) 20855.8 + 10577.7i 1.00333 + 0.508871i
\(757\) −3274.00 −0.157194 −0.0785968 0.996906i \(-0.525044\pi\)
−0.0785968 + 0.996906i \(0.525044\pi\)
\(758\) 21654.6i 1.03764i
\(759\) −15108.9 + 3664.44i −0.722552 + 0.175245i
\(760\) 1530.00 0.0730249
\(761\) 36701.6 1.74827 0.874134 0.485685i \(-0.161430\pi\)
0.874134 + 0.485685i \(0.161430\pi\)
\(762\) 5292.14 + 21820.1i 0.251593 + 1.03735i
\(763\) −13090.0 32063.8i −0.621088 1.52135i
\(764\) 2374.91i 0.112462i
\(765\) 14688.0 7570.02i 0.694177 0.357771i
\(766\) 7911.85i 0.373194i
\(767\) 7396.85i 0.348220i
\(768\) −14588.7 + 3538.29i −0.685450 + 0.166246i
\(769\) 20570.8i 0.964633i 0.875997 + 0.482316i \(0.160204\pi\)
−0.875997 + 0.482316i \(0.839796\pi\)
\(770\) 9614.73 + 23551.2i 0.449988 + 1.10224i
\(771\) 1020.00 247.386i 0.0476451 0.0115556i
\(772\) 5868.00 0.273567
\(773\) −26450.6 −1.23074 −0.615370 0.788238i \(-0.710993\pi\)
−0.615370 + 0.788238i \(0.710993\pi\)
\(774\) 2244.00 + 4354.00i 0.104210 + 0.202198i
\(775\) 5859.18i 0.271572i
\(776\) 4504.38 0.208373
\(777\) −12960.1 17942.8i −0.598380 0.828434i
\(778\) −29138.0 −1.34274
\(779\) 5195.11i 0.238940i
\(780\) −6271.79 25859.3i −0.287905 1.18706i
\(781\) 15232.0 0.697879
\(782\) −22663.3 −1.03637
\(783\) 5302.24 + 6121.27i 0.242001 + 0.279383i
\(784\) 13475.0 13202.7i 0.613839 0.601437i
\(785\) 34312.5i 1.56008i
\(786\) −12903.0 53200.4i −0.585540 2.41424i
\(787\) 24071.1i 1.09027i −0.838348 0.545136i \(-0.816478\pi\)
0.838348 0.545136i \(-0.183522\pi\)
\(788\) 18182.9i 0.822004i
\(789\) −10139.9 41807.9i −0.457529 1.88644i
\(790\) 18405.5i 0.828908i
\(791\) −28702.8 + 11717.9i −1.29021 + 0.526725i
\(792\) −3264.00 + 1682.23i −0.146441 + 0.0754739i
\(793\) 4002.00 0.179212
\(794\) 54991.8 2.45792
\(795\) 2550.00 + 10513.9i 0.113760 + 0.469044i
\(796\) 43649.9i 1.94363i
\(797\) 24673.1 1.09657 0.548285 0.836292i \(-0.315281\pi\)
0.548285 + 0.836292i \(0.315281\pi\)
\(798\) 8536.34 + 11818.2i 0.378676 + 0.524262i
\(799\) −20808.0 −0.921319
\(800\) 5974.38i 0.264033i
\(801\) −11634.6 + 5996.35i −0.513220 + 0.264508i
\(802\) −54638.0 −2.40565
\(803\) 2908.66 0.127826
\(804\) −2908.66 + 705.453i −0.127588 + 0.0309445i
\(805\) −15708.0 + 6412.76i −0.687744 + 0.280770i
\(806\) 59174.8i 2.58603i
\(807\) −29223.0 + 7087.62i −1.27472 + 0.309165i
\(808\) 5205.17i 0.226630i
\(809\) 44884.1i 1.95061i −0.220867 0.975304i \(-0.570889\pi\)
0.220867 0.975304i \(-0.429111\pi\)
\(810\) 24723.6 + 17614.3i 1.07247 + 0.764077i
\(811\) 30430.0i 1.31756i 0.752335 + 0.658781i \(0.228927\pi\)
−0.752335 + 0.658781i \(0.771073\pi\)
\(812\) −8907.76 + 3636.58i −0.384977 + 0.157166i
\(813\) −1494.00 6159.92i −0.0644488 0.265729i
\(814\) 31280.0 1.34688
\(815\) 31591.3 1.35778
\(816\) 16830.0 4081.87i 0.722019 0.175115i
\(817\) 1616.66i 0.0692287i
\(818\) −30763.1 −1.31492
\(819\) 18305.9 21413.6i 0.781027 0.913616i
\(820\) 12852.0 0.547331
\(821\) 18446.8i 0.784162i 0.919931 + 0.392081i \(0.128245\pi\)
−0.919931 + 0.392081i \(0.871755\pi\)
\(822\) 20946.4 5080.24i 0.888794 0.215564i
\(823\) 35006.0 1.48266 0.741332 0.671138i \(-0.234194\pi\)
0.741332 + 0.671138i \(0.234194\pi\)
\(824\) −201.990 −0.00853963
\(825\) −929.154 3831.00i −0.0392109 0.161671i
\(826\) −9282.00 + 3789.36i −0.390995 + 0.159623i
\(827\) 1500.81i 0.0631056i 0.999502 + 0.0315528i \(0.0100452\pi\)
−0.999502 + 0.0315528i \(0.989955\pi\)
\(828\) −10098.0 19593.0i −0.423828 0.822348i
\(829\) 34089.5i 1.42820i 0.700043 + 0.714101i \(0.253164\pi\)
−0.700043 + 0.714101i \(0.746836\pi\)
\(830\) 20607.3i 0.861794i
\(831\) 16229.9 3936.33i 0.677508 0.164320i
\(832\) 35549.4i 1.48132i
\(833\) −14846.3 + 14546.3i −0.617518 + 0.605042i
\(834\) −29019.0 + 7038.14i −1.20485 + 0.292219i
\(835\) 7140.00 0.295916
\(836\) −10907.5 −0.451247
\(837\) 23400.0 + 27014.6i 0.966335 + 1.11560i
\(838\) 38185.1i 1.57408i
\(839\) 989.751 0.0407271 0.0203635 0.999793i \(-0.493518\pi\)
0.0203635 + 0.999793i \(0.493518\pi\)
\(840\) −3248.52 + 2346.42i −0.133434 + 0.0963798i
\(841\) 21057.0 0.863381
\(842\) 11767.3i 0.481626i
\(843\) 11311.4 + 46638.3i 0.462143 + 1.90547i
\(844\) 20016.0 0.816326
\(845\) −9867.22 −0.401707
\(846\) −17512.5 33979.3i −0.711695 1.38089i
\(847\) 1701.00 + 4166.58i 0.0690048 + 0.169027i
\(848\) 11338.5i 0.459159i
\(849\) 3651.00 + 15053.5i 0.147588 + 0.608520i
\(850\) 5746.50i 0.231886i
\(851\) 20862.9i 0.840390i
\(852\) 5090.15 + 20987.2i 0.204678 + 0.843909i
\(853\) 21592.3i 0.866711i −0.901223 0.433356i \(-0.857329\pi\)
0.901223 0.433356i \(-0.142671\pi\)
\(854\) −2050.20 5021.94i −0.0821503 0.201226i
\(855\) 4590.00 + 8905.91i 0.183596 + 0.356229i
\(856\) −6052.00 −0.241651
\(857\) −46881.9 −1.86868 −0.934338 0.356388i \(-0.884008\pi\)
−0.934338 + 0.356388i \(0.884008\pi\)
\(858\) 9384.00 + 38691.2i 0.373385 + 1.53951i
\(859\) 35593.5i 1.41378i −0.707324 0.706889i \(-0.750098\pi\)
0.707324 0.706889i \(-0.249902\pi\)
\(860\) −3999.40 −0.158580
\(861\) 7967.25 + 11030.4i 0.315358 + 0.436601i
\(862\) 46546.0 1.83917
\(863\) 3727.29i 0.147020i 0.997294 + 0.0735100i \(0.0234201\pi\)
−0.997294 + 0.0735100i \(0.976580\pi\)
\(864\) 23860.1 + 27545.7i 0.939510 + 1.08464i
\(865\) −22746.0 −0.894089
\(866\) 53749.6 2.10910
\(867\) 6266.74 1519.91i 0.245478 0.0595372i
\(868\) −39312.0 + 16049.1i −1.53725 + 0.627581i
\(869\) 14579.3i 0.569124i
\(870\) −12138.0 + 2943.90i −0.473008 + 0.114721i
\(871\) 3605.65i 0.140267i
\(872\) 7710.21i 0.299427i
\(873\) 13513.1 + 26219.3i 0.523884 + 1.01648i
\(874\) 13741.6i 0.531828i
\(875\) −10463.1 25629.2i −0.404248 0.990201i
\(876\) 972.000 + 4007.66i 0.0374895 + 0.154573i
\(877\) −30430.0 −1.17166 −0.585831 0.810433i \(-0.699232\pi\)
−0.585831 + 0.810433i \(0.699232\pi\)
\(878\) −12382.0 −0.475936
\(879\) −26061.0 + 6320.72i −1.00002 + 0.242540i
\(880\) 18322.2i 0.701864i
\(881\) −36479.4 −1.39503 −0.697516 0.716570i \(-0.745711\pi\)
−0.697516 + 0.716570i \(0.745711\pi\)
\(882\) −36249.0 12001.3i −1.38386 0.458169i
\(883\) 21632.0 0.824433 0.412217 0.911086i \(-0.364755\pi\)
0.412217 + 0.911086i \(0.364755\pi\)
\(884\) 30725.4i 1.16901i
\(885\) −6695.97 + 1624.01i −0.254331 + 0.0616842i
\(886\) −28220.0 −1.07006
\(887\) −3171.24 −0.120045 −0.0600225 0.998197i \(-0.519117\pi\)
−0.0600225 + 0.998197i \(0.519117\pi\)
\(888\) 1161.44 + 4788.75i 0.0438913 + 0.180968i
\(889\) −7336.00 17969.5i −0.276762 0.677926i
\(890\) 20186.7i 0.760293i
\(891\) −19584.0 13952.6i −0.736351 0.524612i
\(892\) 17239.5i 0.647109i
\(893\) 12616.7i 0.472790i
\(894\) −5322.44 + 1290.88i −0.199115 + 0.0482925i
\(895\) 35311.8i 1.31882i
\(896\) −8978.46 + 3665.44i −0.334765 + 0.136667i
\(897\) −25806.0 + 6258.87i −0.960577 + 0.232974i
\(898\) 10948.0 0.406837
\(899\) −14704.9 −0.545534
\(900\) 4968.00 2560.45i 0.184000 0.0948314i
\(901\) 12492.4i 0.461911i
\(902\) −19229.5 −0.709835
\(903\) −2479.32 3432.53i −0.0913696 0.126498i
\(904\) 6902.00 0.253935
\(905\) 1855.40i 0.0681497i
\(906\) −7312.04 30148.3i −0.268131 1.10553i
\(907\) 26900.0 0.984785 0.492392 0.870373i \(-0.336123\pi\)
0.492392 + 0.870373i \(0.336123\pi\)
\(908\) 53537.5 1.95672
\(909\) 30298.5 15615.5i 1.10554 0.569784i
\(910\) 16422.0 + 40225.5i 0.598224 + 1.46534i
\(911\) 25917.8i 0.942587i 0.881977 + 0.471293i \(0.156213\pi\)
−0.881977 + 0.471293i \(0.843787\pi\)
\(912\) 2475.00 + 10204.7i 0.0898634 + 0.370516i
\(913\) 16323.4i 0.591704i
\(914\) 4931.23i 0.178458i
\(915\) −878.657 3622.80i −0.0317459 0.130892i
\(916\) 33354.7i 1.20313i
\(917\) 17886.2 + 43812.1i 0.644117 + 1.57776i
\(918\) −22950.0 26495.1i −0.825123 0.952579i
\(919\) −13126.0 −0.471150 −0.235575 0.971856i \(-0.575697\pi\)
−0.235575 + 0.971856i \(0.575697\pi\)
\(920\) 3777.21 0.135360
\(921\) 2295.00 + 9462.53i 0.0821095 + 0.338546i
\(922\) 22444.7i 0.801709i
\(923\) 26016.3 0.927777
\(924\) 23158.9 16727.7i 0.824538 0.595566i
\(925\) −5290.00 −0.188037
\(926\) 3818.00i 0.135494i
\(927\) −605.970 1175.76i −0.0214700 0.0416579i
\(928\) −14994.0 −0.530390
\(929\) 41226.2 1.45596 0.727980 0.685598i \(-0.240459\pi\)
0.727980 + 0.685598i \(0.240459\pi\)
\(930\) −53567.8 + 12992.1i −1.88877 + 0.458094i
\(931\) −8820.00 9001.87i −0.310487 0.316890i
\(932\) 8609.04i 0.302574i
\(933\) 43248.0 10489.2i 1.51755 0.368060i
\(934\) 32105.5i 1.12476i
\(935\) 20186.7i 0.706071i
\(936\) −5574.93 + 2873.25i −0.194682 + 0.100337i
\(937\) 12580.6i 0.438623i 0.975655 + 0.219311i \(0.0703811\pi\)
−0.975655 + 0.219311i \(0.929619\pi\)
\(938\) 4524.58 1847.15i 0.157498 0.0642981i
\(939\) −654.000 2696.51i −0.0227289 0.0937139i
\(940\) 31212.0 1.08300
\(941\) −5383.04 −0.186485 −0.0932423 0.995643i \(-0.529723\pi\)
−0.0932423 + 0.995643i \(0.529723\pi\)
\(942\) 70737.0 17156.2i 2.44664 0.593398i
\(943\) 12825.5i 0.442902i
\(944\) −7221.15 −0.248971
\(945\) −23403.7 11869.9i −0.805633 0.408602i
\(946\) 5984.00 0.205662
\(947\) 51340.9i 1.76173i −0.473370 0.880863i \(-0.656963\pi\)
0.473370 0.880863i \(-0.343037\pi\)
\(948\) −20087.9 + 4872.04i −0.688212 + 0.166916i
\(949\) 4968.00 0.169935
\(950\) 3484.33 0.118996
\(951\) 6251.59 + 25776.0i 0.213167 + 0.878910i
\(952\) 4284.00 1748.94i 0.145846 0.0595413i
\(953\) 32440.6i 1.10268i −0.834281 0.551340i \(-0.814117\pi\)
0.834281 0.551340i \(-0.185883\pi\)
\(954\) 20400.0 10513.9i 0.692321 0.356814i
\(955\) 2665.04i 0.0903024i
\(956\) 43119.4i 1.45877i
\(957\) 9614.73 2331.91i 0.324765 0.0787671i
\(958\) 51552.0i 1.73859i
\(959\) −17250.0 + 7042.26i −0.580845 + 0.237129i
\(960\) −32181.0 + 7805.04i −1.08191 + 0.262403i
\(961\) −35105.0 −1.17838
\(962\) 53426.4 1.79058
\(963\) −18156.0 35227.8i −0.607548 1.17882i
\(964\) 34082.2i 1.13871i
\(965\) −6584.88 −0.219663
\(966\) 21074.3 + 29176.5i 0.701918 + 0.971779i
\(967\) 34232.0 1.13839 0.569197 0.822201i \(-0.307254\pi\)
0.569197 + 0.822201i \(0.307254\pi\)
\(968\) 1001.91i 0.0332673i
\(969\) −2726.87 11243.2i −0.0904020 0.372737i
\(970\) −45492.0 −1.50584
\(971\) −19784.9 −0.653891 −0.326946 0.945043i \(-0.606019\pi\)
−0.326946 + 0.945043i \(0.606019\pi\)
\(972\) 12679.9 31646.2i 0.418425 1.04429i
\(973\) 23898.0 9756.32i 0.787394 0.321452i
\(974\) 56536.0i 1.85989i
\(975\) −1587.00 6543.37i −0.0521279 0.214929i
\(976\) 3906.94i 0.128133i
\(977\) 39796.2i 1.30317i 0.758577 + 0.651583i \(0.225895\pi\)
−0.758577 + 0.651583i \(0.774105\pi\)
\(978\) −15795.6 65127.0i −0.516450 2.12938i
\(979\) 15990.3i 0.522013i
\(980\) 22269.4 21819.5i 0.725888 0.711222i
\(981\) −44880.0 + 23130.6i −1.46066 + 0.752807i
\(982\) 23800.0 0.773410
\(983\) 22683.5 0.736003 0.368001 0.929825i \(-0.380042\pi\)
0.368001 + 0.929825i \(0.380042\pi\)
\(984\) −714.000 2943.90i −0.0231316 0.0953740i
\(985\) 20404.2i 0.660034i
\(986\) 14422.1 0.465814
\(987\) 19349.0 + 26788.0i 0.623999 + 0.863902i
\(988\) −18630.0 −0.599898
\(989\) 3991.17i 0.128323i
\(990\) 32964.8 16989.7i 1.05827 0.545421i
\(991\) −50422.0 −1.61625 −0.808127 0.589008i \(-0.799519\pi\)
−0.808127 + 0.589008i \(0.799519\pi\)
\(992\) −66172.0 −2.11790
\(993\) −18340.7 + 4448.27i −0.586127 + 0.142157i
\(994\) −13328.0 32646.8i −0.425290 1.04174i
\(995\) 48982.5i 1.56065i
\(996\) −22491.0 + 5454.87i −0.715517 + 0.173538i
\(997\) 46121.4i 1.46508i −0.680726 0.732538i \(-0.738336\pi\)
0.680726 0.732538i \(-0.261664\pi\)
\(998\) 63809.2i 2.02389i
\(999\) −24390.3 + 21126.8i −0.772448 + 0.669093i
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 21.4.c.b.20.3 yes 4
3.2 odd 2 inner 21.4.c.b.20.2 yes 4
4.3 odd 2 336.4.k.b.209.3 4
7.2 even 3 147.4.g.c.80.4 8
7.3 odd 6 147.4.g.c.68.1 8
7.4 even 3 147.4.g.c.68.2 8
7.5 odd 6 147.4.g.c.80.3 8
7.6 odd 2 inner 21.4.c.b.20.4 yes 4
12.11 even 2 336.4.k.b.209.1 4
21.2 odd 6 147.4.g.c.80.1 8
21.5 even 6 147.4.g.c.80.2 8
21.11 odd 6 147.4.g.c.68.3 8
21.17 even 6 147.4.g.c.68.4 8
21.20 even 2 inner 21.4.c.b.20.1 4
28.27 even 2 336.4.k.b.209.2 4
84.83 odd 2 336.4.k.b.209.4 4
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
21.4.c.b.20.1 4 21.20 even 2 inner
21.4.c.b.20.2 yes 4 3.2 odd 2 inner
21.4.c.b.20.3 yes 4 1.1 even 1 trivial
21.4.c.b.20.4 yes 4 7.6 odd 2 inner
147.4.g.c.68.1 8 7.3 odd 6
147.4.g.c.68.2 8 7.4 even 3
147.4.g.c.68.3 8 21.11 odd 6
147.4.g.c.68.4 8 21.17 even 6
147.4.g.c.80.1 8 21.2 odd 6
147.4.g.c.80.2 8 21.5 even 6
147.4.g.c.80.3 8 7.5 odd 6
147.4.g.c.80.4 8 7.2 even 3
336.4.k.b.209.1 4 12.11 even 2
336.4.k.b.209.2 4 28.27 even 2
336.4.k.b.209.3 4 4.3 odd 2
336.4.k.b.209.4 4 84.83 odd 2