Properties

Label 242.4.c.r.81.2
Level $242$
Weight $4$
Character 242.81
Analytic conductor $14.278$
Analytic rank $0$
Dimension $8$
CM no
Inner twists $2$

Related objects

Downloads

Learn more

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [242,4,Mod(3,242)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(242, base_ring=CyclotomicField(10))
 
chi = DirichletCharacter(H, H._module([8]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("242.3");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 242 = 2 \cdot 11^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 242.c (of order \(5\), degree \(4\), not minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(14.2784622214\)
Analytic rank: \(0\)
Dimension: \(8\)
Relative dimension: \(2\) over \(\Q(\zeta_{5})\)
Coefficient field: \(\mathbb{Q}[x]/(x^{8} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} - x^{7} + 71x^{6} - 141x^{5} + 2911x^{4} + 2710x^{3} + 75340x^{2} + 169400x + 5856400 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 1 \)
Twist minimal: no (minimal twist has level 22)
Sato-Tate group: $\mathrm{SU}(2)[C_{5}]$

Embedding invariants

Embedding label 81.2
Root \(-2.53202 - 7.79275i\) of defining polynomial
Character \(\chi\) \(=\) 242.81
Dual form 242.4.c.r.3.2

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(1.61803 + 1.17557i) q^{2} +(2.34103 - 7.20496i) q^{3} +(1.23607 + 3.80423i) q^{4} +(-4.37525 + 3.17880i) q^{5} +(12.2578 - 8.90583i) q^{6} +(-6.84467 - 21.0657i) q^{7} +(-2.47214 + 7.60845i) q^{8} +(-24.5876 - 17.8639i) q^{9} +O(q^{10})\) \(q+(1.61803 + 1.17557i) q^{2} +(2.34103 - 7.20496i) q^{3} +(1.23607 + 3.80423i) q^{4} +(-4.37525 + 3.17880i) q^{5} +(12.2578 - 8.90583i) q^{6} +(-6.84467 - 21.0657i) q^{7} +(-2.47214 + 7.60845i) q^{8} +(-24.5876 - 17.8639i) q^{9} -10.8162 q^{10} +30.3030 q^{12} +(-62.1543 - 45.1577i) q^{13} +(13.6893 - 42.1315i) q^{14} +(12.6606 + 38.9652i) q^{15} +(-12.9443 + 9.40456i) q^{16} +(-47.9653 + 34.8488i) q^{17} +(-18.7833 - 57.8089i) q^{18} +(29.4377 - 90.6001i) q^{19} +(-17.5010 - 12.7152i) q^{20} -167.801 q^{21} +142.484 q^{23} +(49.0313 + 35.6233i) q^{24} +(-29.5891 + 91.0660i) q^{25} +(-47.4817 - 146.134i) q^{26} +(-20.7889 + 15.1041i) q^{27} +(71.6783 - 52.0773i) q^{28} +(-6.30960 - 19.4190i) q^{29} +(-25.3211 + 77.9303i) q^{30} +(-172.567 - 125.377i) q^{31} -32.0000 q^{32} -118.577 q^{34} +(96.9109 + 70.4099i) q^{35} +(37.5665 - 115.618i) q^{36} +(-44.9859 - 138.452i) q^{37} +(154.138 - 111.988i) q^{38} +(-470.865 + 342.104i) q^{39} +(-13.3696 - 41.1473i) q^{40} +(25.5967 - 78.7785i) q^{41} +(-271.508 - 197.262i) q^{42} -151.373 q^{43} +164.363 q^{45} +(230.544 + 167.500i) q^{46} +(27.9241 - 85.9416i) q^{47} +(37.4566 + 115.279i) q^{48} +(-119.423 + 86.7656i) q^{49} +(-154.931 + 112.564i) q^{50} +(138.796 + 427.170i) q^{51} +(94.9633 - 292.267i) q^{52} +(189.997 + 138.041i) q^{53} -51.3931 q^{54} +177.199 q^{56} +(-583.855 - 424.196i) q^{57} +(12.6192 - 38.8379i) q^{58} +(93.4769 + 287.692i) q^{59} +(-132.583 + 96.3272i) q^{60} +(120.770 - 87.7443i) q^{61} +(-131.829 - 405.729i) q^{62} +(-208.023 + 640.229i) q^{63} +(-51.7771 - 37.6183i) q^{64} +415.488 q^{65} +826.236 q^{67} +(-191.861 - 139.395i) q^{68} +(333.560 - 1026.59i) q^{69} +(74.0333 + 227.851i) q^{70} +(727.278 - 528.399i) q^{71} +(196.701 - 142.912i) q^{72} +(-42.6423 - 131.240i) q^{73} +(89.9719 - 276.905i) q^{74} +(586.858 + 426.377i) q^{75} +381.050 q^{76} -1164.04 q^{78} +(246.312 + 178.956i) q^{79} +(26.7391 - 82.2945i) q^{80} +(-193.417 - 595.278i) q^{81} +(134.026 - 97.3755i) q^{82} +(618.327 - 449.241i) q^{83} +(-207.414 - 638.355i) q^{84} +(99.0824 - 304.944i) q^{85} +(-244.926 - 177.949i) q^{86} -154.684 q^{87} -313.100 q^{89} +(265.944 + 193.220i) q^{90} +(-525.855 + 1618.42i) q^{91} +(176.120 + 542.041i) q^{92} +(-1307.32 + 949.825i) q^{93} +(146.213 - 106.230i) q^{94} +(159.202 + 489.974i) q^{95} +(-74.9131 + 230.559i) q^{96} +(471.257 + 342.388i) q^{97} -295.229 q^{98} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q + 4 q^{2} - 7 q^{3} - 8 q^{4} - 30 q^{5} - 6 q^{6} + 4 q^{7} + 16 q^{8} - 81 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q + 4 q^{2} - 7 q^{3} - 8 q^{4} - 30 q^{5} - 6 q^{6} + 4 q^{7} + 16 q^{8} - 81 q^{9} - 100 q^{10} + 32 q^{12} - 48 q^{13} - 8 q^{14} - 279 q^{15} - 32 q^{16} - 109 q^{17} + 42 q^{18} + 288 q^{19} - 120 q^{20} - 50 q^{21} + 628 q^{23} - 24 q^{24} + 38 q^{25} - 14 q^{26} + 242 q^{27} - 4 q^{28} + 528 q^{29} + 558 q^{30} - 522 q^{31} - 256 q^{32} + 208 q^{34} - 17 q^{35} - 84 q^{36} - 406 q^{37} + 544 q^{38} - 1429 q^{39} - 40 q^{40} - 329 q^{41} - 1480 q^{42} + 1442 q^{43} + 2652 q^{45} + 1044 q^{46} + 666 q^{47} - 112 q^{48} - 114 q^{49} + 34 q^{50} + 1158 q^{51} + 28 q^{52} + 414 q^{53} - 1144 q^{54} + 48 q^{56} - 593 q^{57} - 1056 q^{58} - 888 q^{59} + 844 q^{60} - 302 q^{61} - 646 q^{62} - 2061 q^{63} - 128 q^{64} - 138 q^{65} + 578 q^{67} - 436 q^{68} + 1930 q^{69} + 1394 q^{70} + 1090 q^{71} + 648 q^{72} + 253 q^{73} + 812 q^{74} + 2763 q^{75} - 128 q^{76} - 4152 q^{78} - 674 q^{79} + 80 q^{80} - 230 q^{81} - 722 q^{82} - 428 q^{83} - 2860 q^{84} + 1046 q^{85} - 984 q^{86} + 2122 q^{87} - 2202 q^{89} + 1366 q^{90} - 2217 q^{91} + 832 q^{92} - 3721 q^{93} + 2138 q^{94} - 973 q^{95} + 224 q^{96} + 3012 q^{97} - 3292 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

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

\(n\) \(123\)
\(\chi(n)\) \(e\left(\frac{1}{5}\right)\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 1.61803 + 1.17557i 0.572061 + 0.415627i
\(3\) 2.34103 7.20496i 0.450532 1.38660i −0.425769 0.904832i \(-0.639996\pi\)
0.876301 0.481764i \(-0.160004\pi\)
\(4\) 1.23607 + 3.80423i 0.154508 + 0.475528i
\(5\) −4.37525 + 3.17880i −0.391334 + 0.284321i −0.766002 0.642838i \(-0.777757\pi\)
0.374668 + 0.927159i \(0.377757\pi\)
\(6\) 12.2578 8.90583i 0.834039 0.605965i
\(7\) −6.84467 21.0657i −0.369577 1.13744i −0.947065 0.321043i \(-0.895967\pi\)
0.577487 0.816400i \(-0.304033\pi\)
\(8\) −2.47214 + 7.60845i −0.109254 + 0.336249i
\(9\) −24.5876 17.8639i −0.910652 0.661627i
\(10\) −10.8162 −0.342038
\(11\) 0 0
\(12\) 30.3030 0.728977
\(13\) −62.1543 45.1577i −1.32604 0.963423i −0.999836 0.0181234i \(-0.994231\pi\)
−0.326203 0.945300i \(-0.605769\pi\)
\(14\) 13.6893 42.1315i 0.261331 0.804293i
\(15\) 12.6606 + 38.9652i 0.217929 + 0.670718i
\(16\) −12.9443 + 9.40456i −0.202254 + 0.146946i
\(17\) −47.9653 + 34.8488i −0.684311 + 0.497181i −0.874785 0.484511i \(-0.838997\pi\)
0.190474 + 0.981692i \(0.438997\pi\)
\(18\) −18.7833 57.8089i −0.245959 0.756983i
\(19\) 29.4377 90.6001i 0.355446 1.09395i −0.600304 0.799772i \(-0.704954\pi\)
0.955750 0.294180i \(-0.0950464\pi\)
\(20\) −17.5010 12.7152i −0.195667 0.142160i
\(21\) −167.801 −1.74368
\(22\) 0 0
\(23\) 142.484 1.29174 0.645868 0.763449i \(-0.276495\pi\)
0.645868 + 0.763449i \(0.276495\pi\)
\(24\) 49.0313 + 35.6233i 0.417019 + 0.302982i
\(25\) −29.5891 + 91.0660i −0.236713 + 0.728528i
\(26\) −47.4817 146.134i −0.358151 1.10227i
\(27\) −20.7889 + 15.1041i −0.148179 + 0.107658i
\(28\) 71.6783 52.0773i 0.483783 0.351489i
\(29\) −6.30960 19.4190i −0.0404022 0.124345i 0.928821 0.370529i \(-0.120823\pi\)
−0.969223 + 0.246183i \(0.920823\pi\)
\(30\) −25.3211 + 77.9303i −0.154099 + 0.474269i
\(31\) −172.567 125.377i −0.999803 0.726399i −0.0377570 0.999287i \(-0.512021\pi\)
−0.962046 + 0.272888i \(0.912021\pi\)
\(32\) −32.0000 −0.176777
\(33\) 0 0
\(34\) −118.577 −0.598110
\(35\) 96.9109 + 70.4099i 0.468027 + 0.340041i
\(36\) 37.5665 115.618i 0.173919 0.535268i
\(37\) −44.9859 138.452i −0.199882 0.615174i −0.999885 0.0151777i \(-0.995169\pi\)
0.800003 0.599997i \(-0.204831\pi\)
\(38\) 154.138 111.988i 0.658013 0.478074i
\(39\) −470.865 + 342.104i −1.93330 + 1.40463i
\(40\) −13.3696 41.1473i −0.0528478 0.162649i
\(41\) 25.5967 78.7785i 0.0975007 0.300076i −0.890397 0.455185i \(-0.849573\pi\)
0.987897 + 0.155109i \(0.0495729\pi\)
\(42\) −271.508 197.262i −0.997492 0.724720i
\(43\) −151.373 −0.536841 −0.268420 0.963302i \(-0.586502\pi\)
−0.268420 + 0.963302i \(0.586502\pi\)
\(44\) 0 0
\(45\) 164.363 0.544483
\(46\) 230.544 + 167.500i 0.738953 + 0.536881i
\(47\) 27.9241 85.9416i 0.0866628 0.266721i −0.898329 0.439324i \(-0.855218\pi\)
0.984991 + 0.172604i \(0.0552180\pi\)
\(48\) 37.4566 + 115.279i 0.112633 + 0.346649i
\(49\) −119.423 + 86.7656i −0.348171 + 0.252961i
\(50\) −154.931 + 112.564i −0.438210 + 0.318378i
\(51\) 138.796 + 427.170i 0.381085 + 1.17286i
\(52\) 94.9633 292.267i 0.253251 0.779426i
\(53\) 189.997 + 138.041i 0.492416 + 0.357761i 0.806113 0.591762i \(-0.201567\pi\)
−0.313697 + 0.949523i \(0.601567\pi\)
\(54\) −51.3931 −0.129513
\(55\) 0 0
\(56\) 177.199 0.422842
\(57\) −583.855 424.196i −1.35673 0.985721i
\(58\) 12.6192 38.8379i 0.0285687 0.0879253i
\(59\) 93.4769 + 287.692i 0.206265 + 0.634819i 0.999659 + 0.0261105i \(0.00831218\pi\)
−0.793394 + 0.608709i \(0.791688\pi\)
\(60\) −132.583 + 96.3272i −0.285273 + 0.207263i
\(61\) 120.770 87.7443i 0.253491 0.184172i −0.453781 0.891113i \(-0.649925\pi\)
0.707273 + 0.706941i \(0.249925\pi\)
\(62\) −131.829 405.729i −0.270038 0.831090i
\(63\) −208.023 + 640.229i −0.416007 + 1.28034i
\(64\) −51.7771 37.6183i −0.101127 0.0734732i
\(65\) 415.488 0.792845
\(66\) 0 0
\(67\) 826.236 1.50658 0.753290 0.657689i \(-0.228466\pi\)
0.753290 + 0.657689i \(0.228466\pi\)
\(68\) −191.861 139.395i −0.342155 0.248591i
\(69\) 333.560 1026.59i 0.581969 1.79112i
\(70\) 74.0333 + 227.851i 0.126410 + 0.389049i
\(71\) 727.278 528.399i 1.21566 0.883231i 0.219930 0.975516i \(-0.429417\pi\)
0.995733 + 0.0922852i \(0.0294171\pi\)
\(72\) 196.701 142.912i 0.321964 0.233921i
\(73\) −42.6423 131.240i −0.0683685 0.210417i 0.911035 0.412329i \(-0.135284\pi\)
−0.979404 + 0.201912i \(0.935284\pi\)
\(74\) 89.9719 276.905i 0.141338 0.434994i
\(75\) 586.858 + 426.377i 0.903527 + 0.656451i
\(76\) 381.050 0.575124
\(77\) 0 0
\(78\) −1164.04 −1.68977
\(79\) 246.312 + 178.956i 0.350788 + 0.254863i 0.749200 0.662344i \(-0.230438\pi\)
−0.398411 + 0.917207i \(0.630438\pi\)
\(80\) 26.7391 82.2945i 0.0373691 0.115010i
\(81\) −193.417 595.278i −0.265319 0.816568i
\(82\) 134.026 97.3755i 0.180496 0.131138i
\(83\) 618.327 449.241i 0.817713 0.594103i −0.0983437 0.995153i \(-0.531354\pi\)
0.916056 + 0.401049i \(0.131354\pi\)
\(84\) −207.414 638.355i −0.269413 0.829169i
\(85\) 99.0824 304.944i 0.126435 0.389128i
\(86\) −244.926 177.949i −0.307106 0.223125i
\(87\) −154.684 −0.190619
\(88\) 0 0
\(89\) −313.100 −0.372905 −0.186452 0.982464i \(-0.559699\pi\)
−0.186452 + 0.982464i \(0.559699\pi\)
\(90\) 265.944 + 193.220i 0.311478 + 0.226302i
\(91\) −525.855 + 1618.42i −0.605765 + 1.86435i
\(92\) 176.120 + 542.041i 0.199584 + 0.614257i
\(93\) −1307.32 + 949.825i −1.45767 + 1.05906i
\(94\) 146.213 106.230i 0.160433 0.116561i
\(95\) 159.202 + 489.974i 0.171935 + 0.529161i
\(96\) −74.9131 + 230.559i −0.0796436 + 0.245118i
\(97\) 471.257 + 342.388i 0.493287 + 0.358394i 0.806447 0.591306i \(-0.201388\pi\)
−0.313160 + 0.949700i \(0.601388\pi\)
\(98\) −295.229 −0.304313
\(99\) 0 0
\(100\) −383.010 −0.383010
\(101\) 114.520 + 83.2036i 0.112823 + 0.0819709i 0.642766 0.766062i \(-0.277787\pi\)
−0.529943 + 0.848033i \(0.677787\pi\)
\(102\) −277.592 + 854.341i −0.269468 + 0.829337i
\(103\) 260.001 + 800.200i 0.248725 + 0.765496i 0.995002 + 0.0998600i \(0.0318395\pi\)
−0.746277 + 0.665636i \(0.768161\pi\)
\(104\) 497.234 361.262i 0.468825 0.340622i
\(105\) 734.172 533.408i 0.682361 0.495764i
\(106\) 145.145 + 446.709i 0.132997 + 0.409323i
\(107\) −19.9106 + 61.2784i −0.0179890 + 0.0553646i −0.959648 0.281204i \(-0.909266\pi\)
0.941659 + 0.336568i \(0.109266\pi\)
\(108\) −83.1558 60.4162i −0.0740895 0.0538292i
\(109\) 1559.04 1.36999 0.684995 0.728547i \(-0.259804\pi\)
0.684995 + 0.728547i \(0.259804\pi\)
\(110\) 0 0
\(111\) −1102.86 −0.943052
\(112\) 286.713 + 208.309i 0.241892 + 0.175745i
\(113\) −691.933 + 2129.55i −0.576032 + 1.77284i 0.0566082 + 0.998396i \(0.481971\pi\)
−0.632640 + 0.774446i \(0.718029\pi\)
\(114\) −446.026 1372.73i −0.366440 1.12779i
\(115\) −623.402 + 452.928i −0.505500 + 0.367267i
\(116\) 66.0750 48.0063i 0.0528872 0.0384248i
\(117\) 721.530 + 2220.64i 0.570132 + 1.75469i
\(118\) −186.954 + 575.384i −0.145852 + 0.448885i
\(119\) 1062.42 + 771.895i 0.818421 + 0.594618i
\(120\) −327.763 −0.249338
\(121\) 0 0
\(122\) 298.559 0.221559
\(123\) −507.673 368.846i −0.372157 0.270388i
\(124\) 263.658 811.457i 0.190945 0.587669i
\(125\) −368.920 1135.42i −0.263978 0.812441i
\(126\) −1089.22 + 791.366i −0.770124 + 0.559528i
\(127\) −884.624 + 642.717i −0.618092 + 0.449070i −0.852255 0.523127i \(-0.824765\pi\)
0.234163 + 0.972197i \(0.424765\pi\)
\(128\) −39.5542 121.735i −0.0273135 0.0840623i
\(129\) −354.369 + 1090.64i −0.241864 + 0.744381i
\(130\) 672.273 + 488.435i 0.453556 + 0.329528i
\(131\) −2466.16 −1.64481 −0.822403 0.568906i \(-0.807367\pi\)
−0.822403 + 0.568906i \(0.807367\pi\)
\(132\) 0 0
\(133\) −2110.05 −1.37567
\(134\) 1336.88 + 971.299i 0.861856 + 0.626175i
\(135\) 42.9439 132.168i 0.0273780 0.0842607i
\(136\) −146.569 451.092i −0.0924130 0.284418i
\(137\) 787.405 572.083i 0.491040 0.356762i −0.314544 0.949243i \(-0.601852\pi\)
0.805584 + 0.592481i \(0.201852\pi\)
\(138\) 1746.54 1268.94i 1.07736 0.782747i
\(139\) −390.301 1201.22i −0.238165 0.732995i −0.996686 0.0813469i \(-0.974078\pi\)
0.758521 0.651648i \(-0.225922\pi\)
\(140\) −148.067 + 455.702i −0.0893851 + 0.275099i
\(141\) −553.835 402.384i −0.330789 0.240332i
\(142\) 1797.93 1.06253
\(143\) 0 0
\(144\) 486.271 0.281407
\(145\) 89.3351 + 64.9057i 0.0511647 + 0.0371733i
\(146\) 85.2846 262.479i 0.0483439 0.148787i
\(147\) 345.571 + 1063.56i 0.193892 + 0.596740i
\(148\) 471.099 342.273i 0.261649 0.190099i
\(149\) 395.884 287.627i 0.217665 0.158143i −0.473610 0.880735i \(-0.657049\pi\)
0.691275 + 0.722592i \(0.257049\pi\)
\(150\) 448.320 + 1379.79i 0.244034 + 0.751060i
\(151\) 527.731 1624.19i 0.284412 0.875329i −0.702163 0.712017i \(-0.747782\pi\)
0.986574 0.163313i \(-0.0522180\pi\)
\(152\) 616.552 + 447.951i 0.329006 + 0.239037i
\(153\) 1801.89 0.952118
\(154\) 0 0
\(155\) 1153.57 0.597787
\(156\) −1883.46 1368.41i −0.966651 0.702313i
\(157\) 791.617 2436.35i 0.402407 1.23848i −0.520634 0.853780i \(-0.674304\pi\)
0.923041 0.384702i \(-0.125696\pi\)
\(158\) 188.166 + 579.115i 0.0947447 + 0.291594i
\(159\) 1439.37 1045.76i 0.717920 0.521599i
\(160\) 140.008 101.722i 0.0691787 0.0502613i
\(161\) −975.255 3001.53i −0.477397 1.46928i
\(162\) 386.835 1190.56i 0.187609 0.577400i
\(163\) −1469.25 1067.47i −0.706013 0.512949i 0.175872 0.984413i \(-0.443726\pi\)
−0.881885 + 0.471464i \(0.843726\pi\)
\(164\) 331.330 0.157759
\(165\) 0 0
\(166\) 1528.59 0.714707
\(167\) −306.557 222.727i −0.142048 0.103204i 0.514492 0.857495i \(-0.327981\pi\)
−0.656540 + 0.754291i \(0.727981\pi\)
\(168\) 414.828 1276.71i 0.190504 0.586311i
\(169\) 1145.02 + 3524.02i 0.521176 + 1.60402i
\(170\) 518.802 376.932i 0.234061 0.170055i
\(171\) −2342.28 + 1701.76i −1.04748 + 0.761036i
\(172\) −187.107 575.857i −0.0829464 0.255283i
\(173\) 15.6739 48.2395i 0.00688826 0.0211999i −0.947553 0.319598i \(-0.896452\pi\)
0.954442 + 0.298398i \(0.0964522\pi\)
\(174\) −250.284 181.842i −0.109046 0.0792264i
\(175\) 2120.90 0.916142
\(176\) 0 0
\(177\) 2291.64 0.973167
\(178\) −506.606 368.071i −0.213324 0.154989i
\(179\) 6.44850 19.8465i 0.00269265 0.00828712i −0.949701 0.313158i \(-0.898613\pi\)
0.952394 + 0.304871i \(0.0986132\pi\)
\(180\) 203.163 + 625.273i 0.0841273 + 0.258917i
\(181\) 142.511 103.540i 0.0585235 0.0425198i −0.558139 0.829748i \(-0.688484\pi\)
0.616662 + 0.787228i \(0.288484\pi\)
\(182\) −2753.41 + 2000.47i −1.12141 + 0.814752i
\(183\) −349.468 1075.55i −0.141166 0.434465i
\(184\) −352.240 + 1084.08i −0.141127 + 0.434346i
\(185\) 636.937 + 462.762i 0.253127 + 0.183908i
\(186\) −3231.88 −1.27405
\(187\) 0 0
\(188\) 361.457 0.140223
\(189\) 460.471 + 334.552i 0.177219 + 0.128757i
\(190\) −318.405 + 979.949i −0.121576 + 0.374173i
\(191\) −358.219 1102.48i −0.135706 0.417659i 0.859993 0.510305i \(-0.170468\pi\)
−0.995699 + 0.0926459i \(0.970468\pi\)
\(192\) −392.250 + 284.986i −0.147439 + 0.107120i
\(193\) 1039.54 755.267i 0.387707 0.281686i −0.376808 0.926291i \(-0.622978\pi\)
0.764515 + 0.644606i \(0.222978\pi\)
\(194\) 360.008 + 1107.99i 0.133232 + 0.410047i
\(195\) 972.671 2993.57i 0.357202 1.09936i
\(196\) −477.691 347.063i −0.174085 0.126481i
\(197\) −2685.06 −0.971078 −0.485539 0.874215i \(-0.661377\pi\)
−0.485539 + 0.874215i \(0.661377\pi\)
\(198\) 0 0
\(199\) −1333.54 −0.475036 −0.237518 0.971383i \(-0.576334\pi\)
−0.237518 + 0.971383i \(0.576334\pi\)
\(200\) −619.723 450.255i −0.219105 0.159189i
\(201\) 1934.25 5953.00i 0.678763 2.08902i
\(202\) 87.4854 + 269.252i 0.0304725 + 0.0937848i
\(203\) −365.887 + 265.833i −0.126504 + 0.0919104i
\(204\) −1453.49 + 1056.02i −0.498847 + 0.362433i
\(205\) 138.429 + 426.042i 0.0471626 + 0.145151i
\(206\) −520.001 + 1600.40i −0.175875 + 0.541287i
\(207\) −3503.34 2545.32i −1.17632 0.854648i
\(208\) 1229.23 0.409768
\(209\) 0 0
\(210\) 1814.97 0.596405
\(211\) 1317.22 + 957.013i 0.429767 + 0.312244i 0.781556 0.623835i \(-0.214426\pi\)
−0.351789 + 0.936079i \(0.614426\pi\)
\(212\) −290.289 + 893.418i −0.0940431 + 0.289435i
\(213\) −2104.51 6477.01i −0.676989 2.08356i
\(214\) −104.253 + 75.7443i −0.0333018 + 0.0241952i
\(215\) 662.293 481.184i 0.210084 0.152635i
\(216\) −63.5254 195.511i −0.0200109 0.0615872i
\(217\) −1460.00 + 4493.41i −0.456733 + 1.40568i
\(218\) 2522.58 + 1832.76i 0.783719 + 0.569405i
\(219\) −1045.40 −0.322565
\(220\) 0 0
\(221\) 4554.94 1.38642
\(222\) −1784.46 1296.49i −0.539483 0.391958i
\(223\) −812.157 + 2499.56i −0.243884 + 0.750596i 0.751934 + 0.659238i \(0.229121\pi\)
−0.995818 + 0.0913586i \(0.970879\pi\)
\(224\) 219.029 + 674.103i 0.0653327 + 0.201073i
\(225\) 2354.32 1710.52i 0.697577 0.506820i
\(226\) −3623.01 + 2632.27i −1.06637 + 0.774761i
\(227\) 526.118 + 1619.23i 0.153831 + 0.473444i 0.998041 0.0625696i \(-0.0199295\pi\)
−0.844209 + 0.536014i \(0.819930\pi\)
\(228\) 892.052 2745.45i 0.259112 0.797465i
\(229\) −4365.41 3171.66i −1.25971 0.915236i −0.260971 0.965347i \(-0.584043\pi\)
−0.998744 + 0.0501107i \(0.984043\pi\)
\(230\) −1541.13 −0.441823
\(231\) 0 0
\(232\) 163.346 0.0462251
\(233\) 4897.94 + 3558.56i 1.37714 + 1.00055i 0.997141 + 0.0755682i \(0.0240771\pi\)
0.380003 + 0.924985i \(0.375923\pi\)
\(234\) −1443.06 + 4441.28i −0.403144 + 1.24075i
\(235\) 151.016 + 464.781i 0.0419201 + 0.129017i
\(236\) −978.902 + 711.214i −0.270005 + 0.196170i
\(237\) 1866.00 1355.73i 0.511433 0.371578i
\(238\) 811.618 + 2497.90i 0.221048 + 0.680315i
\(239\) 969.263 2983.08i 0.262328 0.807362i −0.729969 0.683480i \(-0.760466\pi\)
0.992297 0.123882i \(-0.0395345\pi\)
\(240\) −530.332 385.309i −0.142637 0.103632i
\(241\) −6499.26 −1.73715 −0.868577 0.495555i \(-0.834965\pi\)
−0.868577 + 0.495555i \(0.834965\pi\)
\(242\) 0 0
\(243\) −5435.56 −1.43494
\(244\) 483.078 + 350.977i 0.126746 + 0.0920861i
\(245\) 246.693 759.242i 0.0643290 0.197984i
\(246\) −387.828 1193.61i −0.100516 0.309357i
\(247\) −5920.98 + 4301.84i −1.52527 + 1.10818i
\(248\) 1380.53 1003.02i 0.353484 0.256821i
\(249\) −1789.24 5506.71i −0.455375 1.40150i
\(250\) 737.841 2270.84i 0.186661 0.574482i
\(251\) −4502.82 3271.49i −1.13233 0.822687i −0.146299 0.989240i \(-0.546736\pi\)
−0.986032 + 0.166553i \(0.946736\pi\)
\(252\) −2692.70 −0.673113
\(253\) 0 0
\(254\) −2186.91 −0.540232
\(255\) −1965.16 1427.77i −0.482600 0.350629i
\(256\) 79.1084 243.470i 0.0193136 0.0594410i
\(257\) −1865.32 5740.87i −0.452745 1.39341i −0.873762 0.486354i \(-0.838327\pi\)
0.421016 0.907053i \(-0.361673\pi\)
\(258\) −1855.50 + 1348.10i −0.447746 + 0.325306i
\(259\) −2608.69 + 1895.32i −0.625853 + 0.454709i
\(260\) 513.571 + 1580.61i 0.122501 + 0.377020i
\(261\) −191.761 + 590.180i −0.0454778 + 0.139966i
\(262\) −3990.33 2899.15i −0.940930 0.683625i
\(263\) −708.442 −0.166100 −0.0830502 0.996545i \(-0.526466\pi\)
−0.0830502 + 0.996545i \(0.526466\pi\)
\(264\) 0 0
\(265\) −1270.09 −0.294418
\(266\) −3414.13 2480.51i −0.786969 0.571766i
\(267\) −732.977 + 2255.87i −0.168006 + 0.517068i
\(268\) 1021.28 + 3143.19i 0.232779 + 0.716421i
\(269\) 3891.13 2827.07i 0.881958 0.640780i −0.0518111 0.998657i \(-0.516499\pi\)
0.933769 + 0.357877i \(0.116499\pi\)
\(270\) 224.857 163.368i 0.0506829 0.0368233i
\(271\) −1619.52 4984.38i −0.363022 1.11727i −0.951210 0.308543i \(-0.900159\pi\)
0.588189 0.808724i \(-0.299841\pi\)
\(272\) 293.138 902.185i 0.0653459 0.201114i
\(273\) 10429.6 + 7577.53i 2.31219 + 1.67990i
\(274\) 1946.57 0.429185
\(275\) 0 0
\(276\) 4317.69 0.941646
\(277\) 4319.95 + 3138.63i 0.937041 + 0.680800i 0.947707 0.319143i \(-0.103395\pi\)
−0.0106653 + 0.999943i \(0.503395\pi\)
\(278\) 780.601 2402.44i 0.168408 0.518306i
\(279\) 2003.27 + 6165.44i 0.429867 + 1.32299i
\(280\) −775.287 + 563.279i −0.165472 + 0.120223i
\(281\) 2653.55 1927.92i 0.563337 0.409288i −0.269342 0.963045i \(-0.586806\pi\)
0.832679 + 0.553757i \(0.186806\pi\)
\(282\) −423.092 1302.14i −0.0893431 0.274970i
\(283\) −1512.79 + 4655.89i −0.317760 + 0.977964i 0.656844 + 0.754027i \(0.271891\pi\)
−0.974604 + 0.223937i \(0.928109\pi\)
\(284\) 2909.11 + 2113.59i 0.607831 + 0.441615i
\(285\) 3902.95 0.811195
\(286\) 0 0
\(287\) −1834.73 −0.377354
\(288\) 786.803 + 571.646i 0.160982 + 0.116960i
\(289\) −431.973 + 1329.48i −0.0879244 + 0.270604i
\(290\) 68.2459 + 210.039i 0.0138191 + 0.0425308i
\(291\) 3570.12 2593.85i 0.719190 0.522522i
\(292\) 446.556 324.442i 0.0894956 0.0650224i
\(293\) 2072.21 + 6377.59i 0.413172 + 1.27161i 0.913875 + 0.405995i \(0.133075\pi\)
−0.500703 + 0.865619i \(0.666925\pi\)
\(294\) −691.141 + 2127.11i −0.137103 + 0.421959i
\(295\) −1323.50 961.580i −0.261211 0.189781i
\(296\) 1164.62 0.228690
\(297\) 0 0
\(298\) 978.680 0.190246
\(299\) −8855.99 6434.25i −1.71289 1.24449i
\(300\) −896.639 + 2759.57i −0.172558 + 0.531080i
\(301\) 1036.10 + 3188.78i 0.198404 + 0.610625i
\(302\) 2763.24 2007.61i 0.526511 0.382533i
\(303\) 867.574 630.329i 0.164491 0.119510i
\(304\) 471.004 + 1449.60i 0.0888616 + 0.273488i
\(305\) −249.475 + 767.805i −0.0468357 + 0.144146i
\(306\) 2915.52 + 2118.25i 0.544670 + 0.395726i
\(307\) 9507.29 1.76746 0.883730 0.467998i \(-0.155025\pi\)
0.883730 + 0.467998i \(0.155025\pi\)
\(308\) 0 0
\(309\) 6374.08 1.17349
\(310\) 1866.52 + 1356.10i 0.341971 + 0.248456i
\(311\) 1782.43 5485.77i 0.324992 1.00022i −0.646452 0.762954i \(-0.723748\pi\)
0.971444 0.237268i \(-0.0762520\pi\)
\(312\) −1438.84 4428.28i −0.261084 0.803532i
\(313\) −4836.10 + 3513.63i −0.873331 + 0.634512i −0.931479 0.363796i \(-0.881481\pi\)
0.0581477 + 0.998308i \(0.481481\pi\)
\(314\) 4144.96 3011.49i 0.744948 0.541236i
\(315\) −1125.01 3462.42i −0.201229 0.619318i
\(316\) −376.332 + 1158.23i −0.0669946 + 0.206188i
\(317\) −4232.72 3075.25i −0.749948 0.544869i 0.145863 0.989305i \(-0.453404\pi\)
−0.895811 + 0.444436i \(0.853404\pi\)
\(318\) 3558.31 0.627485
\(319\) 0 0
\(320\) 346.118 0.0604644
\(321\) 394.897 + 286.910i 0.0686636 + 0.0498870i
\(322\) 1950.51 6003.05i 0.337571 1.03894i
\(323\) 1745.32 + 5371.53i 0.300656 + 0.925324i
\(324\) 2025.49 1471.61i 0.347307 0.252333i
\(325\) 5951.43 4323.96i 1.01577 0.738001i
\(326\) −1122.40 3454.40i −0.190688 0.586876i
\(327\) 3649.77 11232.8i 0.617225 1.89962i
\(328\) 536.104 + 389.502i 0.0902481 + 0.0655691i
\(329\) −2001.55 −0.335408
\(330\) 0 0
\(331\) −3963.72 −0.658205 −0.329102 0.944294i \(-0.606746\pi\)
−0.329102 + 0.944294i \(0.606746\pi\)
\(332\) 2473.31 + 1796.96i 0.408856 + 0.297052i
\(333\) −1367.21 + 4207.84i −0.224993 + 0.692457i
\(334\) −234.189 720.758i −0.0383659 0.118078i
\(335\) −3614.99 + 2626.44i −0.589576 + 0.428352i
\(336\) 2172.07 1578.10i 0.352667 0.256227i
\(337\) 1578.03 + 4856.66i 0.255076 + 0.785043i 0.993815 + 0.111051i \(0.0354217\pi\)
−0.738739 + 0.673992i \(0.764578\pi\)
\(338\) −2290.05 + 7048.05i −0.368527 + 1.13421i
\(339\) 13723.5 + 9970.70i 2.19870 + 1.59745i
\(340\) 1282.55 0.204576
\(341\) 0 0
\(342\) −5790.43 −0.915528
\(343\) −3501.23 2543.79i −0.551162 0.400442i
\(344\) 374.214 1151.71i 0.0586520 0.180512i
\(345\) 1803.92 + 5551.91i 0.281507 + 0.866391i
\(346\) 82.0699 59.6272i 0.0127517 0.00926468i
\(347\) −6104.64 + 4435.28i −0.944422 + 0.686162i −0.949481 0.313825i \(-0.898390\pi\)
0.00505934 + 0.999987i \(0.498390\pi\)
\(348\) −191.200 588.453i −0.0294523 0.0906447i
\(349\) −1006.38 + 3097.32i −0.154356 + 0.475059i −0.998095 0.0616946i \(-0.980350\pi\)
0.843739 + 0.536754i \(0.180350\pi\)
\(350\) 3431.69 + 2493.27i 0.524090 + 0.380773i
\(351\) 1974.19 0.300212
\(352\) 0 0
\(353\) −6506.83 −0.981087 −0.490543 0.871417i \(-0.663202\pi\)
−0.490543 + 0.871417i \(0.663202\pi\)
\(354\) 3707.96 + 2693.99i 0.556711 + 0.404474i
\(355\) −1502.35 + 4623.75i −0.224609 + 0.691276i
\(356\) −387.012 1191.10i −0.0576169 0.177327i
\(357\) 8048.64 5847.68i 1.19322 0.866925i
\(358\) 33.7648 24.5316i 0.00498471 0.00362160i
\(359\) 1256.53 + 3867.19i 0.184727 + 0.568531i 0.999944 0.0106250i \(-0.00338212\pi\)
−0.815217 + 0.579156i \(0.803382\pi\)
\(360\) −406.327 + 1250.55i −0.0594870 + 0.183082i
\(361\) −1792.74 1302.51i −0.261371 0.189897i
\(362\) 352.307 0.0511514
\(363\) 0 0
\(364\) −6806.81 −0.980148
\(365\) 603.755 + 438.654i 0.0865808 + 0.0629046i
\(366\) 698.937 2151.11i 0.0998197 0.307213i
\(367\) −430.236 1324.13i −0.0611939 0.188335i 0.915786 0.401666i \(-0.131569\pi\)
−0.976980 + 0.213331i \(0.931569\pi\)
\(368\) −1844.35 + 1340.00i −0.261259 + 0.189816i
\(369\) −2036.65 + 1479.72i −0.287328 + 0.208756i
\(370\) 486.577 + 1497.53i 0.0683674 + 0.210413i
\(371\) 1607.46 4947.26i 0.224947 0.692315i
\(372\) −5229.29 3799.30i −0.728833 0.529528i
\(373\) 9440.30 1.31046 0.655228 0.755431i \(-0.272572\pi\)
0.655228 + 0.755431i \(0.272572\pi\)
\(374\) 0 0
\(375\) −9044.32 −1.24546
\(376\) 584.850 + 424.919i 0.0802163 + 0.0582806i
\(377\) −484.747 + 1491.90i −0.0662222 + 0.203811i
\(378\) 351.769 + 1082.63i 0.0478652 + 0.147314i
\(379\) −1043.92 + 758.449i −0.141484 + 0.102794i −0.656276 0.754521i \(-0.727869\pi\)
0.514792 + 0.857315i \(0.327869\pi\)
\(380\) −1667.19 + 1211.28i −0.225066 + 0.163520i
\(381\) 2559.82 + 7878.31i 0.344208 + 1.05936i
\(382\) 716.437 2204.97i 0.0959584 0.295330i
\(383\) 4573.29 + 3322.69i 0.610141 + 0.443293i 0.849464 0.527647i \(-0.176925\pi\)
−0.239323 + 0.970940i \(0.576925\pi\)
\(384\) −969.696 −0.128866
\(385\) 0 0
\(386\) 2569.88 0.338868
\(387\) 3721.90 + 2704.12i 0.488875 + 0.355188i
\(388\) −720.016 + 2215.98i −0.0942095 + 0.289947i
\(389\) −3967.16 12209.7i −0.517077 1.59140i −0.779471 0.626439i \(-0.784512\pi\)
0.262394 0.964961i \(-0.415488\pi\)
\(390\) 5092.97 3700.26i 0.661263 0.480436i
\(391\) −6834.28 + 4965.39i −0.883950 + 0.642227i
\(392\) −364.923 1123.12i −0.0470189 0.144709i
\(393\) −5773.37 + 17768.6i −0.741038 + 2.28068i
\(394\) −4344.51 3156.47i −0.555516 0.403606i
\(395\) −1646.54 −0.209738
\(396\) 0 0
\(397\) 7691.26 0.972326 0.486163 0.873868i \(-0.338396\pi\)
0.486163 + 0.873868i \(0.338396\pi\)
\(398\) −2157.71 1567.67i −0.271750 0.197438i
\(399\) −4939.70 + 15202.8i −0.619785 + 1.90750i
\(400\) −473.426 1457.06i −0.0591783 0.182132i
\(401\) −6299.15 + 4576.60i −0.784450 + 0.569936i −0.906311 0.422611i \(-0.861114\pi\)
0.121861 + 0.992547i \(0.461114\pi\)
\(402\) 10127.9 7358.32i 1.25655 0.912934i
\(403\) 5064.02 + 15585.4i 0.625947 + 1.92647i
\(404\) −174.971 + 538.505i −0.0215473 + 0.0663159i
\(405\) 2738.52 + 1989.65i 0.335995 + 0.244115i
\(406\) −904.523 −0.110568
\(407\) 0 0
\(408\) −3593.23 −0.436008
\(409\) 7167.80 + 5207.71i 0.866564 + 0.629596i 0.929663 0.368412i \(-0.120098\pi\)
−0.0630988 + 0.998007i \(0.520098\pi\)
\(410\) −276.859 + 852.084i −0.0333490 + 0.102638i
\(411\) −2278.50 7012.49i −0.273455 0.841607i
\(412\) −2722.76 + 1978.20i −0.325585 + 0.236551i
\(413\) 5420.63 3938.32i 0.645839 0.469230i
\(414\) −2676.31 8236.84i −0.317714 0.977823i
\(415\) −1277.28 + 3931.07i −0.151083 + 0.464985i
\(416\) 1988.94 + 1445.05i 0.234413 + 0.170311i
\(417\) −9568.47 −1.12367
\(418\) 0 0
\(419\) 9469.08 1.10405 0.552023 0.833829i \(-0.313856\pi\)
0.552023 + 0.833829i \(0.313856\pi\)
\(420\) 2936.69 + 2133.63i 0.341180 + 0.247882i
\(421\) 1600.07 4924.52i 0.185232 0.570086i −0.814720 0.579854i \(-0.803109\pi\)
0.999952 + 0.00976831i \(0.00310940\pi\)
\(422\) 1006.26 + 3096.96i 0.116076 + 0.357246i
\(423\) −2221.84 + 1614.26i −0.255389 + 0.185551i
\(424\) −1519.97 + 1104.33i −0.174095 + 0.126488i
\(425\) −1754.29 5399.15i −0.200225 0.616229i
\(426\) 4209.02 12954.0i 0.478703 1.47330i
\(427\) −2675.03 1943.52i −0.303170 0.220266i
\(428\) −257.728 −0.0291069
\(429\) 0 0
\(430\) 1637.28 0.183620
\(431\) −8465.20 6150.32i −0.946065 0.687357i 0.00380775 0.999993i \(-0.498788\pi\)
−0.949873 + 0.312636i \(0.898788\pi\)
\(432\) 127.051 391.022i 0.0141498 0.0435487i
\(433\) 4894.28 + 15063.1i 0.543197 + 1.67179i 0.725239 + 0.688497i \(0.241729\pi\)
−0.182042 + 0.983291i \(0.558271\pi\)
\(434\) −7644.64 + 5554.16i −0.845517 + 0.614304i
\(435\) 676.780 491.709i 0.0745957 0.0541969i
\(436\) 1927.08 + 5930.94i 0.211675 + 0.651469i
\(437\) 4194.41 12909.1i 0.459143 1.41310i
\(438\) −1691.50 1228.94i −0.184527 0.134067i
\(439\) −4824.70 −0.524534 −0.262267 0.964995i \(-0.584470\pi\)
−0.262267 + 0.964995i \(0.584470\pi\)
\(440\) 0 0
\(441\) 4486.29 0.484429
\(442\) 7370.05 + 5354.65i 0.793116 + 0.576233i
\(443\) 1107.33 3408.00i 0.118760 0.365506i −0.873953 0.486011i \(-0.838451\pi\)
0.992713 + 0.120505i \(0.0384515\pi\)
\(444\) −1363.21 4195.52i −0.145709 0.448448i
\(445\) 1369.89 995.282i 0.145930 0.106024i
\(446\) −4252.51 + 3089.63i −0.451484 + 0.328023i
\(447\) −1145.56 3525.68i −0.121215 0.373062i
\(448\) −438.059 + 1348.21i −0.0461972 + 0.142180i
\(449\) 6307.08 + 4582.36i 0.662917 + 0.481637i 0.867647 0.497181i \(-0.165632\pi\)
−0.204730 + 0.978819i \(0.565632\pi\)
\(450\) 5820.21 0.609705
\(451\) 0 0
\(452\) −8956.57 −0.932039
\(453\) −10466.8 7604.57i −1.08559 0.788728i
\(454\) −1052.24 + 3238.45i −0.108775 + 0.334776i
\(455\) −2843.88 8752.55i −0.293018 0.901815i
\(456\) 4670.84 3393.57i 0.479676 0.348505i
\(457\) −2708.61 + 1967.92i −0.277250 + 0.201434i −0.717717 0.696335i \(-0.754813\pi\)
0.440467 + 0.897769i \(0.354813\pi\)
\(458\) −3334.88 10263.7i −0.340237 1.04714i
\(459\) 470.789 1448.94i 0.0478748 0.147344i
\(460\) −2493.61 1811.71i −0.252750 0.183634i
\(461\) 7171.96 0.724580 0.362290 0.932065i \(-0.381995\pi\)
0.362290 + 0.932065i \(0.381995\pi\)
\(462\) 0 0
\(463\) 4034.74 0.404990 0.202495 0.979283i \(-0.435095\pi\)
0.202495 + 0.979283i \(0.435095\pi\)
\(464\) 264.300 + 192.025i 0.0264436 + 0.0192124i
\(465\) 2700.55 8311.43i 0.269322 0.828889i
\(466\) 3741.69 + 11515.7i 0.371954 + 1.14476i
\(467\) 9564.07 6948.70i 0.947692 0.688539i −0.00256754 0.999997i \(-0.500817\pi\)
0.950260 + 0.311458i \(0.100817\pi\)
\(468\) −7555.96 + 5489.73i −0.746313 + 0.542228i
\(469\) −5655.32 17405.3i −0.556798 1.71365i
\(470\) −302.033 + 929.561i −0.0296420 + 0.0912287i
\(471\) −15700.6 11407.1i −1.53598 1.11595i
\(472\) −2419.98 −0.235993
\(473\) 0 0
\(474\) 4613.00 0.447009
\(475\) 7379.55 + 5361.56i 0.712836 + 0.517905i
\(476\) −1623.24 + 4995.81i −0.156304 + 0.481056i
\(477\) −2205.61 6788.18i −0.211715 0.651592i
\(478\) 5075.12 3687.29i 0.485629 0.352830i
\(479\) 7006.04 5090.19i 0.668297 0.485546i −0.201158 0.979559i \(-0.564470\pi\)
0.869455 + 0.494013i \(0.164470\pi\)
\(480\) −405.138 1246.89i −0.0385248 0.118567i
\(481\) −3456.13 + 10636.9i −0.327622 + 1.00832i
\(482\) −10516.0 7640.34i −0.993759 0.722008i
\(483\) −23909.0 −2.25238
\(484\) 0 0
\(485\) −3150.25 −0.294939
\(486\) −8794.92 6389.88i −0.820876 0.596401i
\(487\) 2295.27 7064.12i 0.213570 0.657301i −0.785682 0.618631i \(-0.787688\pi\)
0.999252 0.0386707i \(-0.0123123\pi\)
\(488\) 369.039 + 1135.79i 0.0342328 + 0.105358i
\(489\) −11130.6 + 8086.88i −1.02933 + 0.747855i
\(490\) 1291.70 938.475i 0.119088 0.0865224i
\(491\) −1713.16 5272.55i −0.157462 0.484617i 0.840940 0.541128i \(-0.182002\pi\)
−0.998402 + 0.0565108i \(0.982002\pi\)
\(492\) 775.656 2387.22i 0.0710757 0.218749i
\(493\) 979.369 + 711.554i 0.0894697 + 0.0650036i
\(494\) −14637.5 −1.33314
\(495\) 0 0
\(496\) 3412.87 0.308956
\(497\) −16109.1 11703.9i −1.45391 1.05632i
\(498\) 3578.48 11013.4i 0.321999 0.991010i
\(499\) 6307.66 + 19413.0i 0.565871 + 1.74157i 0.665349 + 0.746533i \(0.268283\pi\)
−0.0994775 + 0.995040i \(0.531717\pi\)
\(500\) 3863.38 2806.91i 0.345552 0.251058i
\(501\) −2322.40 + 1687.32i −0.207100 + 0.150467i
\(502\) −3439.85 10586.8i −0.305832 0.941255i
\(503\) −56.4703 + 173.798i −0.00500574 + 0.0154061i −0.953528 0.301304i \(-0.902578\pi\)
0.948522 + 0.316710i \(0.102578\pi\)
\(504\) −4356.89 3165.46i −0.385062 0.279764i
\(505\) −765.540 −0.0674576
\(506\) 0 0
\(507\) 28071.0 2.45893
\(508\) −3538.50 2570.87i −0.309046 0.224535i
\(509\) 1469.47 4522.55i 0.127963 0.393828i −0.866467 0.499235i \(-0.833614\pi\)
0.994429 + 0.105407i \(0.0336145\pi\)
\(510\) −1501.25 4620.36i −0.130346 0.401163i
\(511\) −2472.78 + 1796.58i −0.214069 + 0.155531i
\(512\) 414.217 300.946i 0.0357538 0.0259767i
\(513\) 756.448 + 2328.11i 0.0651033 + 0.200367i
\(514\) 3730.64 11481.7i 0.320139 0.985288i
\(515\) −3681.24 2674.58i −0.314981 0.228847i
\(516\) −4587.05 −0.391344
\(517\) 0 0
\(518\) −6449.03 −0.547016
\(519\) −310.870 225.860i −0.0262923 0.0191025i
\(520\) −1027.14 + 3161.22i −0.0866215 + 0.266593i
\(521\) −3625.12 11157.0i −0.304836 0.938189i −0.979738 0.200282i \(-0.935814\pi\)
0.674902 0.737907i \(-0.264186\pi\)
\(522\) −1004.07 + 729.503i −0.0841899 + 0.0611676i
\(523\) 278.172 202.104i 0.0232574 0.0168975i −0.576096 0.817382i \(-0.695425\pi\)
0.599353 + 0.800485i \(0.295425\pi\)
\(524\) −3048.34 9381.84i −0.254136 0.782151i
\(525\) 4965.10 15281.0i 0.412752 1.27032i
\(526\) −1146.28 832.824i −0.0950196 0.0690358i
\(527\) 12646.4 1.04533
\(528\) 0 0
\(529\) 8134.66 0.668584
\(530\) −2055.04 1493.08i −0.168425 0.122368i
\(531\) 2840.94 8743.53i 0.232178 0.714570i
\(532\) −2608.16 8027.10i −0.212553 0.654171i
\(533\) −5148.40 + 3740.53i −0.418390 + 0.303978i
\(534\) −3837.92 + 2788.41i −0.311017 + 0.225967i
\(535\) −107.678 331.400i −0.00870157 0.0267807i
\(536\) −2042.57 + 6286.38i −0.164600 + 0.506586i
\(537\) −127.897 92.9225i −0.0102778 0.00746723i
\(538\) 9619.41 0.770859
\(539\) 0 0
\(540\) 555.878 0.0442985
\(541\) 13950.5 + 10135.6i 1.10865 + 0.805480i 0.982450 0.186525i \(-0.0597224\pi\)
0.126198 + 0.992005i \(0.459722\pi\)
\(542\) 3239.04 9968.75i 0.256695 0.790027i
\(543\) −412.381 1269.18i −0.0325911 0.100305i
\(544\) 1534.89 1115.16i 0.120970 0.0878900i
\(545\) −6821.19 + 4955.88i −0.536124 + 0.389517i
\(546\) 7967.49 + 24521.4i 0.624500 + 1.92201i
\(547\) −2361.88 + 7269.13i −0.184619 + 0.568200i −0.999942 0.0108075i \(-0.996560\pi\)
0.815322 + 0.579008i \(0.196560\pi\)
\(548\) 3149.62 + 2288.33i 0.245520 + 0.178381i
\(549\) −4536.89 −0.352696
\(550\) 0 0
\(551\) −1945.10 −0.150388
\(552\) 6986.17 + 5075.75i 0.538679 + 0.391373i
\(553\) 2083.92 6413.64i 0.160248 0.493193i
\(554\) 3300.15 + 10156.8i 0.253086 + 0.778919i
\(555\) 4825.28 3505.77i 0.369048 0.268129i
\(556\) 4087.28 2969.58i 0.311761 0.226508i
\(557\) 8067.26 + 24828.5i 0.613681 + 1.88872i 0.419514 + 0.907749i \(0.362201\pi\)
0.194168 + 0.980968i \(0.437799\pi\)
\(558\) −4006.55 + 12330.9i −0.303962 + 0.935498i
\(559\) 9408.47 + 6835.66i 0.711871 + 0.517205i
\(560\) −1916.62 −0.144628
\(561\) 0 0
\(562\) 6559.94 0.492374
\(563\) 14622.1 + 10623.6i 1.09458 + 0.795258i 0.980167 0.198175i \(-0.0635015\pi\)
0.114412 + 0.993433i \(0.463502\pi\)
\(564\) 846.184 2604.29i 0.0631751 0.194433i
\(565\) −3742.04 11516.8i −0.278635 0.857551i
\(566\) −7921.07 + 5754.99i −0.588246 + 0.427386i
\(567\) −11216.1 + 8148.96i −0.830743 + 0.603570i
\(568\) 2222.36 + 6839.73i 0.164170 + 0.505262i
\(569\) 2411.93 7423.15i 0.177703 0.546915i −0.822043 0.569425i \(-0.807166\pi\)
0.999747 + 0.0225104i \(0.00716588\pi\)
\(570\) 6315.10 + 4588.19i 0.464053 + 0.337154i
\(571\) −13039.6 −0.955672 −0.477836 0.878449i \(-0.658579\pi\)
−0.477836 + 0.878449i \(0.658579\pi\)
\(572\) 0 0
\(573\) −8781.96 −0.640264
\(574\) −2968.65 2156.85i −0.215869 0.156838i
\(575\) −4215.98 + 12975.4i −0.305771 + 0.941066i
\(576\) 601.064 + 1849.89i 0.0434798 + 0.133817i
\(577\) 7741.83 5624.77i 0.558573 0.405827i −0.272364 0.962194i \(-0.587805\pi\)
0.830936 + 0.556368i \(0.187805\pi\)
\(578\) −2261.84 + 1643.32i −0.162768 + 0.118258i
\(579\) −3008.08 9257.93i −0.215910 0.664502i
\(580\) −136.492 + 420.079i −0.00977158 + 0.0300738i
\(581\) −13695.8 9950.60i −0.977966 0.710534i
\(582\) 8825.83 0.628595
\(583\) 0 0
\(584\) 1103.95 0.0782220
\(585\) −10215.8 7422.25i −0.722006 0.524568i
\(586\) −4144.41 + 12755.2i −0.292157 + 0.899167i
\(587\) 3005.81 + 9250.93i 0.211351 + 0.650471i 0.999393 + 0.0348493i \(0.0110951\pi\)
−0.788042 + 0.615622i \(0.788905\pi\)
\(588\) −3618.86 + 2629.26i −0.253809 + 0.184403i
\(589\) −16439.1 + 11943.7i −1.15002 + 0.835540i
\(590\) −1011.06 3111.74i −0.0705506 0.217132i
\(591\) −6285.81 + 19345.7i −0.437502 + 1.34649i
\(592\) 1884.40 + 1369.09i 0.130825 + 0.0950496i
\(593\) 6926.77 0.479677 0.239838 0.970813i \(-0.422906\pi\)
0.239838 + 0.970813i \(0.422906\pi\)
\(594\) 0 0
\(595\) −7102.06 −0.489338
\(596\) 1583.54 + 1150.51i 0.108833 + 0.0790715i
\(597\) −3121.86 + 9608.10i −0.214019 + 0.658682i
\(598\) −6765.37 20821.7i −0.462636 1.42385i
\(599\) 17786.0 12922.3i 1.21321 0.881451i 0.217695 0.976017i \(-0.430146\pi\)
0.995519 + 0.0945657i \(0.0301462\pi\)
\(600\) −4694.86 + 3411.02i −0.319445 + 0.232090i
\(601\) −2275.37 7002.88i −0.154433 0.475297i 0.843670 0.536863i \(-0.180391\pi\)
−0.998103 + 0.0615656i \(0.980391\pi\)
\(602\) −2072.19 + 6377.56i −0.140293 + 0.431777i
\(603\) −20315.2 14759.8i −1.37197 0.996794i
\(604\) 6831.10 0.460188
\(605\) 0 0
\(606\) 2144.76 0.143771
\(607\) −8226.41 5976.84i −0.550082 0.399658i 0.277734 0.960658i \(-0.410417\pi\)
−0.827816 + 0.561000i \(0.810417\pi\)
\(608\) −942.008 + 2899.20i −0.0628346 + 0.193385i
\(609\) 1058.76 + 3258.53i 0.0704485 + 0.216818i
\(610\) −1306.27 + 949.060i −0.0867037 + 0.0629939i
\(611\) −5616.53 + 4080.65i −0.371883 + 0.270189i
\(612\) 2227.26 + 6854.79i 0.147110 + 0.452759i
\(613\) 7751.53 23856.8i 0.510737 1.57189i −0.280171 0.959950i \(-0.590391\pi\)
0.790908 0.611936i \(-0.209609\pi\)
\(614\) 15383.1 + 11176.5i 1.01110 + 0.734604i
\(615\) 3393.68 0.222515
\(616\) 0 0
\(617\) −26335.5 −1.71836 −0.859178 0.511677i \(-0.829024\pi\)
−0.859178 + 0.511677i \(0.829024\pi\)
\(618\) 10313.5 + 7493.18i 0.671309 + 0.487735i
\(619\) −7615.16 + 23437.0i −0.494473 + 1.52183i 0.323303 + 0.946296i \(0.395207\pi\)
−0.817776 + 0.575537i \(0.804793\pi\)
\(620\) 1425.89 + 4388.44i 0.0923632 + 0.284265i
\(621\) −2962.09 + 2152.08i −0.191408 + 0.139066i
\(622\) 9332.94 6780.78i 0.601635 0.437113i
\(623\) 2143.06 + 6595.67i 0.137817 + 0.424157i
\(624\) 2877.67 8856.56i 0.184614 0.568183i
\(625\) −4459.78 3240.22i −0.285426 0.207374i
\(626\) −11955.5 −0.763319
\(627\) 0 0
\(628\) 10246.9 0.651108
\(629\) 6982.67 + 5073.20i 0.442635 + 0.321593i
\(630\) 2250.02 6924.84i 0.142290 0.437924i
\(631\) 2303.82 + 7090.43i 0.145346 + 0.447331i 0.997055 0.0766847i \(-0.0244335\pi\)
−0.851709 + 0.524015i \(0.824433\pi\)
\(632\) −1970.50 + 1431.65i −0.124022 + 0.0901076i
\(633\) 9978.89 7250.09i 0.626580 0.455237i
\(634\) −3233.51 9951.73i −0.202554 0.623397i
\(635\) 1827.38 5624.09i 0.114200 0.351473i
\(636\) 5757.47 + 4183.05i 0.358960 + 0.260800i
\(637\) 11340.8 0.705397
\(638\) 0 0
\(639\) −27321.3 −1.69141
\(640\) 560.031 + 406.887i 0.0345894 + 0.0251306i
\(641\) −858.656 + 2642.67i −0.0529093 + 0.162838i −0.974020 0.226464i \(-0.927284\pi\)
0.921110 + 0.389302i \(0.127284\pi\)
\(642\) 301.675 + 928.460i 0.0185454 + 0.0570769i
\(643\) −6114.32 + 4442.31i −0.375000 + 0.272454i −0.759281 0.650763i \(-0.774449\pi\)
0.384281 + 0.923216i \(0.374449\pi\)
\(644\) 10213.0 7420.18i 0.624921 0.454031i
\(645\) −1916.46 5898.27i −0.116993 0.360068i
\(646\) −3490.63 + 10743.1i −0.212596 + 0.654303i
\(647\) 22191.9 + 16123.4i 1.34846 + 0.979713i 0.999087 + 0.0427297i \(0.0136054\pi\)
0.349373 + 0.936984i \(0.386395\pi\)
\(648\) 5007.30 0.303557
\(649\) 0 0
\(650\) 14712.7 0.887817
\(651\) 28956.9 + 21038.4i 1.74334 + 1.26661i
\(652\) 2244.81 6908.81i 0.134837 0.414984i
\(653\) 87.9858 + 270.792i 0.00527282 + 0.0162281i 0.953658 0.300892i \(-0.0972843\pi\)
−0.948385 + 0.317120i \(0.897284\pi\)
\(654\) 19110.4 13884.5i 1.14263 0.830166i
\(655\) 10790.1 7839.44i 0.643668 0.467652i
\(656\) 409.547 + 1260.46i 0.0243752 + 0.0750191i
\(657\) −1295.98 + 3988.62i −0.0769575 + 0.236851i
\(658\) −3238.58 2352.97i −0.191874 0.139405i
\(659\) 20747.0 1.22639 0.613193 0.789933i \(-0.289885\pi\)
0.613193 + 0.789933i \(0.289885\pi\)
\(660\) 0 0
\(661\) −18908.8 −1.11266 −0.556328 0.830963i \(-0.687790\pi\)
−0.556328 + 0.830963i \(0.687790\pi\)
\(662\) −6413.43 4659.63i −0.376534 0.273568i
\(663\) 10663.3 32818.2i 0.624626 1.92240i
\(664\) 1889.44 + 5815.09i 0.110428 + 0.339863i
\(665\) 9231.98 6707.43i 0.538347 0.391132i
\(666\) −7158.81 + 5201.18i −0.416514 + 0.302615i
\(667\) −899.017 2766.89i −0.0521890 0.160621i
\(668\) 468.377 1441.52i 0.0271288 0.0834939i
\(669\) 16108.0 + 11703.1i 0.930897 + 0.676336i
\(670\) −8936.74 −0.515308
\(671\) 0 0
\(672\) 5369.65 0.308242
\(673\) −24162.0 17554.7i −1.38392 1.00548i −0.996502 0.0835714i \(-0.973367\pi\)
−0.387417 0.921905i \(-0.626633\pi\)
\(674\) −3156.05 + 9713.33i −0.180366 + 0.555109i
\(675\) −760.339 2340.08i −0.0433562 0.133437i
\(676\) −11990.9 + 8711.86i −0.682229 + 0.495668i
\(677\) 13980.4 10157.4i 0.793665 0.576631i −0.115384 0.993321i \(-0.536810\pi\)
0.909049 + 0.416690i \(0.136810\pi\)
\(678\) 10483.8 + 32265.9i 0.593847 + 1.82767i
\(679\) 3987.06 12270.9i 0.225345 0.693541i
\(680\) 2075.21 + 1507.73i 0.117030 + 0.0850275i
\(681\) 12898.1 0.725782
\(682\) 0 0
\(683\) 25104.0 1.40641 0.703204 0.710988i \(-0.251752\pi\)
0.703204 + 0.710988i \(0.251752\pi\)
\(684\) −9369.11 6807.06i −0.523738 0.380518i
\(685\) −1626.55 + 5006.01i −0.0907260 + 0.279226i
\(686\) −2674.70 8231.88i −0.148864 0.458155i
\(687\) −33071.3 + 24027.7i −1.83660 + 1.33437i
\(688\) 1959.41 1423.60i 0.108578 0.0788867i
\(689\) −5575.51 17159.6i −0.308287 0.948810i
\(690\) −3607.85 + 11103.8i −0.199056 + 0.612631i
\(691\) 21167.0 + 15378.7i 1.16531 + 0.846647i 0.990440 0.137944i \(-0.0440495\pi\)
0.174870 + 0.984592i \(0.444050\pi\)
\(692\) 202.888 0.0111454
\(693\) 0 0
\(694\) −15091.5 −0.825455
\(695\) 5526.11 + 4014.95i 0.301608 + 0.219131i
\(696\) 382.400 1176.91i 0.0208259 0.0640955i
\(697\) 1517.58 + 4670.64i 0.0824714 + 0.253821i
\(698\) −5269.47 + 3828.50i −0.285748 + 0.207608i
\(699\) 37105.5 26958.7i 2.00781 1.45876i
\(700\) 2621.58 + 8068.38i 0.141552 + 0.435652i
\(701\) −469.534 + 1445.08i −0.0252982 + 0.0778600i −0.962909 0.269828i \(-0.913033\pi\)
0.937610 + 0.347688i \(0.113033\pi\)
\(702\) 3194.30 + 2320.80i 0.171739 + 0.124776i
\(703\) −13868.1 −0.744018
\(704\) 0 0
\(705\) 3702.26 0.197781
\(706\) −10528.3 7649.24i −0.561242 0.407766i
\(707\) 968.893 2981.95i 0.0515403 0.158625i
\(708\) 2832.63 + 8717.93i 0.150363 + 0.462768i
\(709\) 17583.1 12774.9i 0.931378 0.676686i −0.0149520 0.999888i \(-0.504760\pi\)
0.946330 + 0.323203i \(0.104760\pi\)
\(710\) −7866.39 + 5715.26i −0.415803 + 0.302099i
\(711\) −2859.36 8800.21i −0.150822 0.464182i
\(712\) 774.025 2382.20i 0.0407413 0.125389i
\(713\) −24588.0 17864.2i −1.29148 0.938317i
\(714\) 19897.3 1.04291
\(715\) 0 0
\(716\) 83.4712 0.00435679
\(717\) −19223.9 13967.0i −1.00130 0.727486i
\(718\) −2513.06 + 7734.39i −0.130622 + 0.402012i
\(719\) −4348.44 13383.1i −0.225549 0.694167i −0.998235 0.0593798i \(-0.981088\pi\)
0.772687 0.634787i \(-0.218912\pi\)
\(720\) −2127.56 + 1545.76i −0.110124 + 0.0800098i
\(721\) 15077.2 10954.2i 0.778784 0.565820i
\(722\) −1369.54 4215.00i −0.0705939 0.217266i
\(723\) −15215.0 + 46826.9i −0.782644 + 2.40873i
\(724\) 570.044 + 414.161i 0.0292618 + 0.0212599i
\(725\) 1955.10 0.100153
\(726\) 0 0
\(727\) 10409.2 0.531027 0.265513 0.964107i \(-0.414459\pi\)
0.265513 + 0.964107i \(0.414459\pi\)
\(728\) −11013.7 8001.89i −0.560705 0.407376i
\(729\) −7502.56 + 23090.5i −0.381170 + 1.17312i
\(730\) 461.228 + 1419.51i 0.0233847 + 0.0719706i
\(731\) 7260.64 5275.16i 0.367366 0.266907i
\(732\) 3659.68 2658.91i 0.184789 0.134257i
\(733\) −5993.34 18445.6i −0.302004 0.929474i −0.980778 0.195127i \(-0.937488\pi\)
0.678774 0.734348i \(-0.262512\pi\)
\(734\) 860.473 2648.26i 0.0432706 0.133173i
\(735\) −4892.79 3554.82i −0.245542 0.178397i
\(736\) −4559.48 −0.228349
\(737\) 0 0
\(738\) −5034.89 −0.251134
\(739\) 5397.95 + 3921.84i 0.268697 + 0.195220i 0.713972 0.700174i \(-0.246894\pi\)
−0.445275 + 0.895394i \(0.646894\pi\)
\(740\) −973.154 + 2995.06i −0.0483430 + 0.148785i
\(741\) 17133.4 + 52731.2i 0.849408 + 2.61421i
\(742\) 8416.78 6115.15i 0.416428 0.302553i
\(743\) −5311.34 + 3858.92i −0.262253 + 0.190538i −0.711140 0.703050i \(-0.751821\pi\)
0.448886 + 0.893589i \(0.351821\pi\)
\(744\) −3994.82 12294.8i −0.196851 0.605845i
\(745\) −817.783 + 2516.88i −0.0402164 + 0.123773i
\(746\) 15274.7 + 11097.7i 0.749662 + 0.544661i
\(747\) −23228.4 −1.13773
\(748\) 0 0
\(749\) 1427.16 0.0696223
\(750\) −14634.0 10632.2i −0.712478 0.517646i
\(751\) 5852.37 18011.8i 0.284362 0.875177i −0.702227 0.711953i \(-0.747811\pi\)
0.986589 0.163224i \(-0.0521893\pi\)
\(752\) 446.786 + 1375.07i 0.0216657 + 0.0666801i
\(753\) −34112.2 + 24784.0i −1.65089 + 1.19944i
\(754\) −2538.17 + 1844.09i −0.122592 + 0.0890686i
\(755\) 2854.02 + 8783.79i 0.137574 + 0.423410i
\(756\) −703.538 + 2165.27i −0.0338458 + 0.104167i
\(757\) 8865.50 + 6441.16i 0.425657 + 0.309258i 0.779910 0.625892i \(-0.215265\pi\)
−0.354253 + 0.935150i \(0.615265\pi\)
\(758\) −2580.70 −0.123661
\(759\) 0 0
\(760\) −4121.52 −0.196715
\(761\) 28673.3 + 20832.4i 1.36584 + 0.992344i 0.998049 + 0.0624371i \(0.0198873\pi\)
0.367795 + 0.929907i \(0.380113\pi\)
\(762\) −5119.63 + 15756.6i −0.243392 + 0.749084i
\(763\) −10671.1 32842.3i −0.506318 1.55829i
\(764\) 3751.31 2725.49i 0.177641 0.129064i
\(765\) −7883.70 + 5727.84i −0.372596 + 0.270707i
\(766\) 3493.68 + 10752.4i 0.164793 + 0.507182i
\(767\) 7181.54 22102.5i 0.338084 1.04052i
\(768\) −1569.00 1139.95i −0.0737193 0.0535602i
\(769\) 4444.21 0.208404 0.104202 0.994556i \(-0.466771\pi\)
0.104202 + 0.994556i \(0.466771\pi\)
\(770\) 0 0
\(771\) −45729.5 −2.13607
\(772\) 4158.15 + 3021.07i 0.193854 + 0.140843i
\(773\) 3139.67 9662.90i 0.146088 0.449612i −0.851061 0.525066i \(-0.824041\pi\)
0.997149 + 0.0754539i \(0.0240406\pi\)
\(774\) 2843.28 + 8750.70i 0.132041 + 0.406379i
\(775\) 16523.7 12005.2i 0.765869 0.556436i
\(776\) −3770.05 + 2739.11i −0.174403 + 0.126712i
\(777\) 7548.70 + 23232.5i 0.348531 + 1.07267i
\(778\) 7934.32 24419.3i 0.365629 1.12529i
\(779\) −6383.83 4638.12i −0.293613 0.213322i
\(780\) 12590.5 0.577965
\(781\) 0 0
\(782\) −16895.3 −0.772600
\(783\) 424.475 + 308.399i 0.0193736 + 0.0140757i
\(784\) 729.846 2246.24i 0.0332474 0.102325i
\(785\) 4281.14 + 13176.0i 0.194650 + 0.599072i
\(786\) −30229.8 + 21963.2i −1.37183 + 0.996694i
\(787\) 14780.8 10738.9i 0.669477 0.486404i −0.200373 0.979720i \(-0.564215\pi\)
0.869850 + 0.493316i \(0.164215\pi\)
\(788\) −3318.91 10214.6i −0.150040 0.461775i
\(789\) −1658.49 + 5104.30i −0.0748336 + 0.230314i
\(790\) −2664.16 1935.63i −0.119983 0.0871728i
\(791\) 49596.6 2.22939
\(792\) 0 0
\(793\) −11468.7 −0.513575
\(794\) 12444.7 + 9041.62i 0.556230 + 0.404125i
\(795\) −2973.32 + 9150.92i −0.132645 + 0.408239i
\(796\) −1648.35 5073.08i −0.0733970 0.225893i
\(797\) −14549.3 + 10570.7i −0.646630 + 0.469804i −0.862122 0.506701i \(-0.830865\pi\)
0.215491 + 0.976506i \(0.430865\pi\)
\(798\) −25864.6 + 18791.7i −1.14736 + 0.833609i
\(799\) 1655.57 + 5095.33i 0.0733041 + 0.225607i
\(800\) 946.852 2914.11i 0.0418454 0.128787i
\(801\) 7698.37 + 5593.19i 0.339586 + 0.246724i
\(802\) −15572.3 −0.685634
\(803\) 0 0
\(804\) 25037.4 1.09826
\(805\) 13808.2 + 10032.3i 0.604567 + 0.439244i
\(806\) −10128.0 + 31170.9i −0.442611 + 1.36222i
\(807\) −11259.7 34653.8i −0.491152 1.51161i
\(808\) −916.159 + 665.629i −0.0398891 + 0.0289811i
\(809\) −4161.78 + 3023.71i −0.180866 + 0.131407i −0.674534 0.738243i \(-0.735656\pi\)
0.493669 + 0.869650i \(0.335656\pi\)
\(810\) 2092.04 + 6438.64i 0.0907492 + 0.279297i
\(811\) −2551.24 + 7851.91i −0.110464 + 0.339973i −0.990974 0.134055i \(-0.957200\pi\)
0.880510 + 0.474027i \(0.157200\pi\)
\(812\) −1463.55 1063.33i −0.0632519 0.0459552i
\(813\) −39703.6 −1.71275
\(814\) 0 0
\(815\) 9821.58 0.422129
\(816\) −5813.96 4224.09i −0.249423 0.181217i
\(817\) −4456.08 + 13714.4i −0.190818 + 0.587278i
\(818\) 5475.71 + 16852.5i 0.234051 + 0.720335i
\(819\) 41840.8 30399.1i 1.78515 1.29699i
\(820\) −1449.65 + 1053.23i −0.0617366 + 0.0448543i
\(821\) 76.4045 + 235.149i 0.00324791 + 0.00999604i 0.952667 0.304015i \(-0.0983272\pi\)
−0.949419 + 0.314011i \(0.898327\pi\)
\(822\) 4556.99 14025.0i 0.193362 0.595106i
\(823\) −9542.21 6932.82i −0.404156 0.293637i 0.367076 0.930191i \(-0.380359\pi\)
−0.771232 + 0.636555i \(0.780359\pi\)
\(824\) −6731.04 −0.284571
\(825\) 0 0
\(826\) 13400.5 0.564484
\(827\) 2242.32 + 1629.14i 0.0942844 + 0.0685016i 0.633929 0.773392i \(-0.281441\pi\)
−0.539644 + 0.841893i \(0.681441\pi\)
\(828\) 5352.62 16473.7i 0.224658 0.691425i
\(829\) −8435.56 25962.0i −0.353413 1.08769i −0.956924 0.290338i \(-0.906232\pi\)
0.603512 0.797354i \(-0.293768\pi\)
\(830\) −6687.94 + 4859.08i −0.279689 + 0.203206i
\(831\) 32726.8 23777.4i 1.36616 0.992575i
\(832\) 1519.41 + 4676.27i 0.0633127 + 0.194856i
\(833\) 2704.46 8323.47i 0.112490 0.346208i
\(834\) −15482.1 11248.4i −0.642808 0.467027i
\(835\) 2049.26 0.0849314
\(836\) 0 0
\(837\) 5481.18 0.226353
\(838\) 15321.3 + 11131.6i 0.631582 + 0.458871i
\(839\) 2705.36 8326.25i 0.111322 0.342615i −0.879840 0.475270i \(-0.842350\pi\)
0.991162 + 0.132655i \(0.0423503\pi\)
\(840\) 2243.43 + 6904.57i 0.0921497 + 0.283608i
\(841\) 19393.8 14090.4i 0.795188 0.577738i
\(842\) 8378.09 6087.04i 0.342907 0.249137i
\(843\) −7678.52 23632.1i −0.313716 0.965518i
\(844\) −2012.53 + 6193.92i −0.0820782 + 0.252611i
\(845\) −16211.9 11778.7i −0.660009 0.479525i
\(846\) −5492.70 −0.223218
\(847\) 0 0
\(848\) −3757.58 −0.152165
\(849\) 30004.0 + 21799.2i 1.21288 + 0.881209i
\(850\) 3508.58 10798.3i 0.141580 0.435740i
\(851\) −6409.77 19727.2i −0.258195 0.794643i
\(852\) 22038.7 16012.1i 0.886190 0.643854i
\(853\) −33318.8 + 24207.5i −1.33741 + 0.971687i −0.337878 + 0.941190i \(0.609709\pi\)
−0.999535 + 0.0304969i \(0.990291\pi\)
\(854\) −2043.54 6289.36i −0.0818834 0.252011i
\(855\) 4838.47 14891.3i 0.193535 0.595638i
\(856\) −417.012 302.977i −0.0166509 0.0120976i
\(857\) −18020.0 −0.718265 −0.359132 0.933287i \(-0.616927\pi\)
−0.359132 + 0.933287i \(0.616927\pi\)
\(858\) 0 0
\(859\) 6159.11 0.244640 0.122320 0.992491i \(-0.460967\pi\)
0.122320 + 0.992491i \(0.460967\pi\)
\(860\) 2649.17 + 1924.74i 0.105042 + 0.0763174i
\(861\) −4295.16 + 13219.1i −0.170010 + 0.523237i
\(862\) −6466.83 19902.9i −0.255523 0.786420i
\(863\) −23407.0 + 17006.2i −0.923270 + 0.670795i −0.944336 0.328983i \(-0.893294\pi\)
0.0210656 + 0.999778i \(0.493294\pi\)
\(864\) 665.246 483.330i 0.0261946 0.0190315i
\(865\) 84.7663 + 260.884i 0.00333195 + 0.0102547i
\(866\) −9788.56 + 30126.1i −0.384098 + 1.18213i
\(867\) 8567.56 + 6224.70i 0.335605 + 0.243831i
\(868\) −18898.6 −0.739009
\(869\) 0 0
\(870\) 1673.09 0.0651990
\(871\) −51354.1 37311.0i −1.99778 1.45147i
\(872\) −3854.16 + 11861.9i −0.149677 + 0.460658i
\(873\) −5470.68 16837.0i −0.212090 0.652745i
\(874\) 21962.2 15956.5i 0.849980 0.617546i
\(875\) −21393.3 + 15543.2i −0.826544 + 0.600519i
\(876\) −1292.19 3976.95i −0.0498391 0.153389i
\(877\) −13952.9 + 42942.7i −0.537237 + 1.65345i 0.201528 + 0.979483i \(0.435409\pi\)
−0.738765 + 0.673963i \(0.764591\pi\)
\(878\) −7806.53 5671.78i −0.300066 0.218010i
\(879\) 50801.4 1.94936
\(880\) 0 0
\(881\) 22263.5 0.851391 0.425696 0.904866i \(-0.360029\pi\)
0.425696 + 0.904866i \(0.360029\pi\)
\(882\) 7258.97 + 5273.95i 0.277123 + 0.201342i
\(883\) 11809.2 36345.1i 0.450071 1.38518i −0.426754 0.904368i \(-0.640343\pi\)
0.876825 0.480809i \(-0.159657\pi\)
\(884\) 5630.22 + 17328.0i 0.214213 + 0.659281i
\(885\) −10026.5 + 7284.68i −0.380833 + 0.276691i
\(886\) 5798.04 4212.52i 0.219852 0.159732i
\(887\) 14882.4 + 45803.4i 0.563364 + 1.73385i 0.672764 + 0.739857i \(0.265107\pi\)
−0.109401 + 0.993998i \(0.534893\pi\)
\(888\) 2726.42 8391.05i 0.103032 0.317100i
\(889\) 19594.3 + 14236.1i 0.739224 + 0.537078i
\(890\) 3386.55 0.127548
\(891\) 0 0
\(892\) −10512.8 −0.394612
\(893\) −6964.29 5059.85i −0.260975 0.189610i
\(894\) 2291.12 7051.36i 0.0857122 0.263795i
\(895\) 34.8742 + 107.332i 0.00130247 + 0.00400860i
\(896\) −2293.71 + 1666.48i −0.0855216 + 0.0621351i
\(897\) −67090.7 + 48744.3i −2.49732 + 1.81441i
\(898\) 4818.18 + 14828.8i 0.179048 + 0.551052i
\(899\) −1345.86 + 4142.14i −0.0499300 + 0.153669i
\(900\) 9417.29 + 6842.06i 0.348789 + 0.253410i
\(901\) −13923.8 −0.514838
\(902\) 0 0
\(903\) 25400.6 0.936078
\(904\) −14492.0 10529.1i −0.533183 0.387380i
\(905\) −294.386 + 906.028i −0.0108130 + 0.0332789i
\(906\) −7995.92 24608.9i −0.293208 0.902402i
\(907\) −6884.64 + 5001.98i −0.252040 + 0.183118i −0.706631 0.707583i \(-0.749786\pi\)
0.454590 + 0.890701i \(0.349786\pi\)
\(908\) −5509.58 + 4002.95i −0.201368 + 0.146302i
\(909\) −1329.43 4091.55i −0.0485086 0.149294i
\(910\) 5687.75 17505.1i 0.207195 0.637680i
\(911\) −9128.51 6632.25i −0.331988 0.241203i 0.409286 0.912406i \(-0.365778\pi\)
−0.741274 + 0.671203i \(0.765778\pi\)
\(912\) 11547.0 0.419252
\(913\) 0 0
\(914\) −6696.04 −0.242325
\(915\) 4947.98 + 3594.92i 0.178771 + 0.129884i
\(916\) 6669.76 20527.4i 0.240584 0.740442i
\(917\) 16880.1 + 51951.5i 0.607883 + 1.87087i
\(918\) 2465.08 1790.99i 0.0886273 0.0643915i
\(919\) −21485.0 + 15609.8i −0.771191 + 0.560303i −0.902322 0.431062i \(-0.858139\pi\)
0.131131 + 0.991365i \(0.458139\pi\)
\(920\) −1904.95 5862.82i −0.0682655 0.210100i
\(921\) 22256.9 68499.7i 0.796298 2.45075i
\(922\) 11604.5 + 8431.14i 0.414504 + 0.301155i
\(923\) −69064.7 −2.46294
\(924\) 0 0
\(925\) 13939.4 0.495486
\(926\) 6528.35 + 4743.13i 0.231679 + 0.168325i
\(927\) 7901.93 24319.6i 0.279971 0.861663i
\(928\) 201.907 + 621.407i 0.00714217 + 0.0219813i
\(929\) 38762.5 28162.6i 1.36895 0.994602i 0.371134 0.928579i \(-0.378969\pi\)
0.997818 0.0660230i \(-0.0210311\pi\)
\(930\) 14140.3 10273.5i 0.498578 0.362238i
\(931\) 4345.44 + 13373.9i 0.152971 + 0.470796i
\(932\) −7483.38 + 23031.5i −0.263011 + 0.809465i
\(933\) −35352.0 25684.7i −1.24049 0.901265i
\(934\) 23643.7 0.828314
\(935\) 0 0
\(936\) −18679.4 −0.652301
\(937\) −4626.72 3361.51i −0.161311 0.117199i 0.504201 0.863586i \(-0.331787\pi\)
−0.665512 + 0.746387i \(0.731787\pi\)
\(938\) 11310.6 34810.5i 0.393716 1.21173i
\(939\) 13994.1 + 43069.5i 0.486348 + 1.49683i
\(940\) −1581.46 + 1149.00i −0.0548741 + 0.0398684i
\(941\) 8984.62 6527.71i 0.311254 0.226140i −0.421180 0.906977i \(-0.638384\pi\)
0.732435 + 0.680837i \(0.238384\pi\)
\(942\) −11994.2 36914.3i −0.414853 1.27679i
\(943\) 3647.11 11224.7i 0.125945 0.387620i
\(944\) −3915.61 2844.86i −0.135002 0.0980850i
\(945\) −3078.15 −0.105960
\(946\) 0 0
\(947\) 39759.1 1.36430 0.682152 0.731210i \(-0.261044\pi\)
0.682152 + 0.731210i \(0.261044\pi\)
\(948\) 7464.00 + 5422.91i 0.255717 + 0.185789i
\(949\) −3276.08 + 10082.7i −0.112061 + 0.344889i
\(950\) 5637.47 + 17350.4i 0.192530 + 0.592547i
\(951\) −32066.0 + 23297.3i −1.09339 + 0.794394i
\(952\) −8499.38 + 6175.16i −0.289355 + 0.210229i
\(953\) −4923.25 15152.2i −0.167345 0.515035i 0.831857 0.554991i \(-0.187278\pi\)
−0.999201 + 0.0399561i \(0.987278\pi\)
\(954\) 4411.23 13576.4i 0.149705 0.460745i
\(955\) 5071.87 + 3684.93i 0.171855 + 0.124860i
\(956\) 12546.4 0.424456
\(957\) 0 0
\(958\) 17319.9 0.584113
\(959\) −17440.9 12671.5i −0.587274 0.426679i
\(960\) 810.275 2493.77i 0.0272412 0.0838397i
\(961\) 4853.93 + 14938.9i 0.162933 + 0.501456i
\(962\) −18096.5 + 13147.9i −0.606503 + 0.440650i
\(963\) 1584.23 1151.01i 0.0530125 0.0385158i
\(964\) −8033.52 24724.6i −0.268405 0.826066i
\(965\) −2147.38 + 6608.96i −0.0716338 + 0.220466i
\(966\) −38685.6 28106.7i −1.28850 0.936148i
\(967\) 14952.9 0.497264 0.248632 0.968598i \(-0.420019\pi\)
0.248632 + 0.968598i \(0.420019\pi\)
\(968\) 0 0
\(969\) 42787.5 1.41851
\(970\) −5097.21 3703.34i −0.168723 0.122585i
\(971\) 8633.10 26569.9i 0.285324 0.878136i −0.700978 0.713183i \(-0.747253\pi\)
0.986301 0.164953i \(-0.0527472\pi\)
\(972\) −6718.72 20678.1i −0.221711 0.682356i
\(973\) −22633.1 + 16443.9i −0.745720 + 0.541797i
\(974\) 12018.2 8731.73i 0.395367 0.287251i
\(975\) −17221.5 53002.4i −0.565671 1.74096i
\(976\) −738.078 + 2271.57i −0.0242063 + 0.0744992i
\(977\) −26988.2 19608.1i −0.883755 0.642086i 0.0504873 0.998725i \(-0.483923\pi\)
−0.934242 + 0.356639i \(0.883923\pi\)
\(978\) −27516.4 −0.899671
\(979\) 0 0
\(980\) 3193.26 0.104087
\(981\) −38333.1 27850.6i −1.24758 0.906423i
\(982\) 3426.31 10545.1i 0.111342 0.342676i
\(983\) 3816.38 + 11745.6i 0.123829 + 0.381106i 0.993686 0.112198i \(-0.0357891\pi\)
−0.869857 + 0.493304i \(0.835789\pi\)
\(984\) 4061.39 2950.77i 0.131577 0.0955966i
\(985\) 11747.8 8535.27i 0.380016 0.276098i
\(986\) 748.172 + 2302.64i 0.0241649 + 0.0743721i
\(987\) −4685.71 + 14421.1i −0.151112 + 0.465075i
\(988\) −23683.9 17207.4i −0.762637 0.554088i
\(989\) −21568.2 −0.693457
\(990\) 0 0
\(991\) −30154.0 −0.966571 −0.483286 0.875463i \(-0.660557\pi\)
−0.483286 + 0.875463i \(0.660557\pi\)
\(992\) 5522.13 + 4012.06i 0.176742 + 0.128410i
\(993\) −9279.21 + 28558.5i −0.296543 + 0.912664i
\(994\) −12306.2 37874.7i −0.392686 1.20856i
\(995\) 5834.56 4239.06i 0.185898 0.135062i
\(996\) 18737.1 13613.3i 0.596093 0.433087i
\(997\) 646.801 + 1990.65i 0.0205460 + 0.0632342i 0.960804 0.277229i \(-0.0894161\pi\)
−0.940258 + 0.340463i \(0.889416\pi\)
\(998\) −12615.3 + 38826.0i −0.400131 + 1.23148i
\(999\) 3026.40 + 2198.81i 0.0958470 + 0.0696369i
Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))

Twists

       By twisting character
Char Parity Ord Type Twist Min Dim
1.1 even 1 trivial 242.4.c.r.81.2 8
11.2 odd 10 242.4.c.q.27.1 8
11.3 even 5 inner 242.4.c.r.3.2 8
11.4 even 5 22.4.c.b.9.1 yes 8
11.5 even 5 242.4.a.n.1.3 4
11.6 odd 10 242.4.a.o.1.3 4
11.7 odd 10 242.4.c.q.9.1 8
11.8 odd 10 242.4.c.n.3.2 8
11.9 even 5 22.4.c.b.5.1 8
11.10 odd 2 242.4.c.n.81.2 8
33.5 odd 10 2178.4.a.by.1.3 4
33.17 even 10 2178.4.a.bt.1.3 4
33.20 odd 10 198.4.f.d.181.2 8
33.26 odd 10 198.4.f.d.163.2 8
44.15 odd 10 176.4.m.b.97.2 8
44.27 odd 10 1936.4.a.bn.1.2 4
44.31 odd 10 176.4.m.b.49.2 8
44.39 even 10 1936.4.a.bm.1.2 4
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
22.4.c.b.5.1 8 11.9 even 5
22.4.c.b.9.1 yes 8 11.4 even 5
176.4.m.b.49.2 8 44.31 odd 10
176.4.m.b.97.2 8 44.15 odd 10
198.4.f.d.163.2 8 33.26 odd 10
198.4.f.d.181.2 8 33.20 odd 10
242.4.a.n.1.3 4 11.5 even 5
242.4.a.o.1.3 4 11.6 odd 10
242.4.c.n.3.2 8 11.8 odd 10
242.4.c.n.81.2 8 11.10 odd 2
242.4.c.q.9.1 8 11.7 odd 10
242.4.c.q.27.1 8 11.2 odd 10
242.4.c.r.3.2 8 11.3 even 5 inner
242.4.c.r.81.2 8 1.1 even 1 trivial
1936.4.a.bm.1.2 4 44.39 even 10
1936.4.a.bn.1.2 4 44.27 odd 10
2178.4.a.bt.1.3 4 33.17 even 10
2178.4.a.by.1.3 4 33.5 odd 10