Properties

Label 20.4.e.b.7.2
Level $20$
Weight $4$
Character 20.7
Analytic conductor $1.180$
Analytic rank $0$
Dimension $12$
CM no
Inner twists $4$

Related objects

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [20,4,Mod(3,20)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(20, base_ring=CyclotomicField(4))
 
chi = DirichletCharacter(H, H._module([2, 3]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("20.3");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 20 = 2^{2} \cdot 5 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 20.e (of order \(4\), degree \(2\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(1.18003820011\)
Analytic rank: \(0\)
Dimension: \(12\)
Relative dimension: \(6\) over \(\Q(i)\)
Coefficient field: \(\mathbb{Q}[x]/(x^{12} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{12} - 7x^{10} + 44x^{8} - 156x^{6} + 704x^{4} - 1792x^{2} + 4096 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{9}]\)
Coefficient ring index: \( 2^{14} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{4}]$

Embedding invariants

Embedding label 7.2
Root \(-1.83244 + 0.801352i\) of defining polynomial
Character \(\chi\) \(=\) 20.7
Dual form 20.4.e.b.3.2

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-2.63379 + 1.03109i) q^{2} +(-5.55970 - 5.55970i) q^{3} +(5.87372 - 5.43134i) q^{4} +(-10.4994 - 3.84216i) q^{5} +(20.3756 + 8.91056i) q^{6} +(1.14202 - 1.14202i) q^{7} +(-9.86997 + 20.3613i) q^{8} +34.8205i q^{9} +O(q^{10})\) \(q+(-2.63379 + 1.03109i) q^{2} +(-5.55970 - 5.55970i) q^{3} +(5.87372 - 5.43134i) q^{4} +(-10.4994 - 3.84216i) q^{5} +(20.3756 + 8.91056i) q^{6} +(1.14202 - 1.14202i) q^{7} +(-9.86997 + 20.3613i) q^{8} +34.8205i q^{9} +(31.6149 - 0.706375i) q^{10} -27.0350i q^{11} +(-62.8527 - 2.45951i) q^{12} +(40.4777 - 40.4777i) q^{13} +(-1.83032 + 4.18535i) q^{14} +(37.0124 + 79.7348i) q^{15} +(5.00116 - 63.8043i) q^{16} +(-36.2735 - 36.2735i) q^{17} +(-35.9029 - 91.7099i) q^{18} -56.8829 q^{19} +(-82.5387 + 34.4581i) q^{20} -12.6985 q^{21} +(27.8754 + 71.2046i) q^{22} +(54.9839 + 54.9839i) q^{23} +(168.077 - 58.3288i) q^{24} +(95.4757 + 80.6808i) q^{25} +(-64.8739 + 148.346i) q^{26} +(43.4795 - 43.4795i) q^{27} +(0.505208 - 12.9106i) q^{28} -57.1173i q^{29} +(-179.696 - 171.842i) q^{30} -190.845i q^{31} +(52.6158 + 173.204i) q^{32} +(-150.306 + 150.306i) q^{33} +(132.938 + 58.1357i) q^{34} +(-16.3783 + 7.60271i) q^{35} +(189.122 + 204.526i) q^{36} +(-50.4605 - 50.4605i) q^{37} +(149.818 - 58.6513i) q^{38} -450.088 q^{39} +(181.860 - 175.860i) q^{40} -71.5197 q^{41} +(33.4453 - 13.0933i) q^{42} +(66.9381 + 66.9381i) q^{43} +(-146.836 - 158.796i) q^{44} +(133.786 - 365.595i) q^{45} +(-201.509 - 88.1229i) q^{46} +(343.017 - 343.017i) q^{47} +(-382.538 + 326.928i) q^{48} +340.392i q^{49} +(-334.652 - 114.053i) q^{50} +403.339i q^{51} +(17.9066 - 457.603i) q^{52} +(240.148 - 240.148i) q^{53} +(-69.6848 + 159.347i) q^{54} +(-103.873 + 283.852i) q^{55} +(11.9813 + 34.5247i) q^{56} +(316.252 + 316.252i) q^{57} +(58.8929 + 150.435i) q^{58} +738.207 q^{59} +(650.467 + 267.313i) q^{60} -187.952 q^{61} +(196.777 + 502.645i) q^{62} +(39.7656 + 39.7656i) q^{63} +(-317.167 - 401.932i) q^{64} +(-580.515 + 269.471i) q^{65} +(240.897 - 550.855i) q^{66} +(-576.434 + 576.434i) q^{67} +(-410.074 - 16.0468i) q^{68} -611.387i q^{69} +(35.2980 - 36.9114i) q^{70} -157.380i q^{71} +(-708.991 - 343.677i) q^{72} +(180.613 - 180.613i) q^{73} +(184.932 + 80.8733i) q^{74} +(-82.2548 - 979.377i) q^{75} +(-334.114 + 308.950i) q^{76} +(-30.8744 - 30.8744i) q^{77} +(1185.44 - 464.080i) q^{78} +55.6778 q^{79} +(-297.655 + 650.693i) q^{80} +456.687 q^{81} +(188.368 - 73.7430i) q^{82} +(-858.601 - 858.601i) q^{83} +(-74.5876 + 68.9700i) q^{84} +(241.482 + 520.219i) q^{85} +(-245.320 - 107.282i) q^{86} +(-317.555 + 317.555i) q^{87} +(550.468 + 266.835i) q^{88} +158.689i q^{89} +(24.5963 + 1100.85i) q^{90} -92.4525i q^{91} +(621.596 + 24.3239i) q^{92} +(-1061.04 + 1061.04i) q^{93} +(-549.756 + 1257.12i) q^{94} +(597.238 + 218.553i) q^{95} +(670.433 - 1255.49i) q^{96} +(-1117.12 - 1117.12i) q^{97} +(-350.973 - 896.521i) q^{98} +941.372 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 12 q - 6 q^{2} + 8 q^{6} - 12 q^{8}+O(q^{10}) \) Copy content Toggle raw display \( 12 q - 6 q^{2} + 8 q^{6} - 12 q^{8} - 110 q^{10} - 80 q^{12} + 116 q^{13} + 312 q^{16} - 332 q^{17} + 198 q^{18} + 140 q^{20} - 144 q^{21} + 360 q^{22} + 340 q^{25} - 164 q^{26} - 880 q^{28} - 1240 q^{30} - 376 q^{32} + 80 q^{33} + 460 q^{36} + 508 q^{37} + 1600 q^{38} + 1420 q^{40} - 656 q^{41} + 1160 q^{42} + 1180 q^{45} - 1432 q^{46} - 2720 q^{48} - 1570 q^{50} - 932 q^{52} - 644 q^{53} + 2048 q^{56} - 960 q^{57} + 1576 q^{58} + 3280 q^{60} - 896 q^{61} + 2440 q^{62} - 2740 q^{65} - 1680 q^{66} - 844 q^{68} - 3040 q^{70} - 3036 q^{72} + 1436 q^{73} + 800 q^{76} + 3120 q^{77} + 3720 q^{78} + 1840 q^{80} + 5988 q^{81} - 1352 q^{82} + 500 q^{85} - 2552 q^{86} - 2400 q^{88} - 750 q^{90} - 1840 q^{92} - 3280 q^{93} + 1088 q^{96} - 4772 q^{97} + 1698 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/20\mathbb{Z}\right)^\times\).

\(n\) \(11\) \(17\)
\(\chi(n)\) \(-1\) \(e\left(\frac{1}{4}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −2.63379 + 1.03109i −0.931186 + 0.364544i
\(3\) −5.55970 5.55970i −1.06996 1.06996i −0.997361 0.0726035i \(-0.976869\pi\)
−0.0726035 0.997361i \(-0.523131\pi\)
\(4\) 5.87372 5.43134i 0.734215 0.678917i
\(5\) −10.4994 3.84216i −0.939097 0.343653i
\(6\) 20.3756 + 8.91056i 1.38639 + 0.606286i
\(7\) 1.14202 1.14202i 0.0616631 0.0616631i −0.675603 0.737266i \(-0.736117\pi\)
0.737266 + 0.675603i \(0.236117\pi\)
\(8\) −9.86997 + 20.3613i −0.436195 + 0.899852i
\(9\) 34.8205i 1.28965i
\(10\) 31.6149 0.706375i 0.999750 0.0223375i
\(11\) 27.0350i 0.741033i −0.928826 0.370516i \(-0.879181\pi\)
0.928826 0.370516i \(-0.120819\pi\)
\(12\) −62.8527 2.45951i −1.51200 0.0591667i
\(13\) 40.4777 40.4777i 0.863577 0.863577i −0.128174 0.991752i \(-0.540912\pi\)
0.991752 + 0.128174i \(0.0409117\pi\)
\(14\) −1.83032 + 4.18535i −0.0349409 + 0.0798988i
\(15\) 37.0124 + 79.7348i 0.637104 + 1.37250i
\(16\) 5.00116 63.8043i 0.0781431 0.996942i
\(17\) −36.2735 36.2735i −0.517507 0.517507i 0.399309 0.916816i \(-0.369250\pi\)
−0.916816 + 0.399309i \(0.869250\pi\)
\(18\) −35.9029 91.7099i −0.470134 1.20090i
\(19\) −56.8829 −0.686834 −0.343417 0.939183i \(-0.611584\pi\)
−0.343417 + 0.939183i \(0.611584\pi\)
\(20\) −82.5387 + 34.4581i −0.922811 + 0.385254i
\(21\) −12.6985 −0.131955
\(22\) 27.8754 + 71.2046i 0.270139 + 0.690039i
\(23\) 54.9839 + 54.9839i 0.498475 + 0.498475i 0.910963 0.412488i \(-0.135340\pi\)
−0.412488 + 0.910963i \(0.635340\pi\)
\(24\) 168.077 58.3288i 1.42952 0.496096i
\(25\) 95.4757 + 80.6808i 0.763805 + 0.645447i
\(26\) −64.8739 + 148.346i −0.489339 + 1.11896i
\(27\) 43.4795 43.4795i 0.309912 0.309912i
\(28\) 0.505208 12.9106i 0.00340983 0.0871381i
\(29\) 57.1173i 0.365739i −0.983137 0.182869i \(-0.941461\pi\)
0.983137 0.182869i \(-0.0585385\pi\)
\(30\) −179.696 171.842i −1.09360 1.04580i
\(31\) 190.845i 1.10570i −0.833281 0.552850i \(-0.813540\pi\)
0.833281 0.552850i \(-0.186460\pi\)
\(32\) 52.6158 + 173.204i 0.290664 + 0.956825i
\(33\) −150.306 + 150.306i −0.792878 + 0.792878i
\(34\) 132.938 + 58.1357i 0.670549 + 0.293241i
\(35\) −16.3783 + 7.60271i −0.0790983 + 0.0367169i
\(36\) 189.122 + 204.526i 0.875564 + 0.946878i
\(37\) −50.4605 50.4605i −0.224207 0.224207i 0.586060 0.810267i \(-0.300678\pi\)
−0.810267 + 0.586060i \(0.800678\pi\)
\(38\) 149.818 58.6513i 0.639570 0.250381i
\(39\) −450.088 −1.84799
\(40\) 181.860 175.860i 0.718866 0.695148i
\(41\) −71.5197 −0.272427 −0.136213 0.990680i \(-0.543493\pi\)
−0.136213 + 0.990680i \(0.543493\pi\)
\(42\) 33.4453 13.0933i 0.122874 0.0481033i
\(43\) 66.9381 + 66.9381i 0.237394 + 0.237394i 0.815770 0.578376i \(-0.196313\pi\)
−0.578376 + 0.815770i \(0.696313\pi\)
\(44\) −146.836 158.796i −0.503100 0.544077i
\(45\) 133.786 365.595i 0.443191 1.21110i
\(46\) −201.509 88.1229i −0.645889 0.282457i
\(47\) 343.017 343.017i 1.06456 1.06456i 0.0667913 0.997767i \(-0.478724\pi\)
0.997767 0.0667913i \(-0.0212762\pi\)
\(48\) −382.538 + 326.928i −1.15030 + 0.983082i
\(49\) 340.392i 0.992395i
\(50\) −334.652 114.053i −0.946539 0.322590i
\(51\) 403.339i 1.10743i
\(52\) 17.9066 457.603i 0.0477539 1.22035i
\(53\) 240.148 240.148i 0.622394 0.622394i −0.323749 0.946143i \(-0.604943\pi\)
0.946143 + 0.323749i \(0.104943\pi\)
\(54\) −69.6848 + 159.347i −0.175609 + 0.401563i
\(55\) −103.873 + 283.852i −0.254658 + 0.695901i
\(56\) 11.9813 + 34.5247i 0.0285905 + 0.0823848i
\(57\) 316.252 + 316.252i 0.734888 + 0.734888i
\(58\) 58.8929 + 150.435i 0.133328 + 0.340571i
\(59\) 738.207 1.62892 0.814461 0.580218i \(-0.197033\pi\)
0.814461 + 0.580218i \(0.197033\pi\)
\(60\) 650.467 + 267.313i 1.39958 + 0.575167i
\(61\) −187.952 −0.394506 −0.197253 0.980353i \(-0.563202\pi\)
−0.197253 + 0.980353i \(0.563202\pi\)
\(62\) 196.777 + 502.645i 0.403077 + 1.02961i
\(63\) 39.7656 + 39.7656i 0.0795237 + 0.0795237i
\(64\) −317.167 401.932i −0.619467 0.785022i
\(65\) −580.515 + 269.471i −1.10775 + 0.514212i
\(66\) 240.897 550.855i 0.449278 1.02736i
\(67\) −576.434 + 576.434i −1.05108 + 1.05108i −0.0524612 + 0.998623i \(0.516707\pi\)
−0.998623 + 0.0524612i \(0.983293\pi\)
\(68\) −410.074 16.0468i −0.731305 0.0286170i
\(69\) 611.387i 1.06670i
\(70\) 35.2980 36.9114i 0.0602703 0.0630251i
\(71\) 157.380i 0.263064i −0.991312 0.131532i \(-0.958010\pi\)
0.991312 0.131532i \(-0.0419896\pi\)
\(72\) −708.991 343.677i −1.16049 0.562538i
\(73\) 180.613 180.613i 0.289577 0.289577i −0.547336 0.836913i \(-0.684358\pi\)
0.836913 + 0.547336i \(0.184358\pi\)
\(74\) 184.932 + 80.8733i 0.290512 + 0.127045i
\(75\) −82.2548 979.377i −0.126640 1.50785i
\(76\) −334.114 + 308.950i −0.504284 + 0.466303i
\(77\) −30.8744 30.8744i −0.0456944 0.0456944i
\(78\) 1185.44 464.080i 1.72083 0.673676i
\(79\) 55.6778 0.0792942 0.0396471 0.999214i \(-0.487377\pi\)
0.0396471 + 0.999214i \(0.487377\pi\)
\(80\) −297.655 + 650.693i −0.415986 + 0.909371i
\(81\) 456.687 0.626457
\(82\) 188.368 73.7430i 0.253680 0.0993116i
\(83\) −858.601 858.601i −1.13547 1.13547i −0.989253 0.146213i \(-0.953292\pi\)
−0.146213 0.989253i \(-0.546708\pi\)
\(84\) −74.5876 + 68.9700i −0.0968831 + 0.0895863i
\(85\) 241.482 + 520.219i 0.308146 + 0.663832i
\(86\) −245.320 107.282i −0.307599 0.134518i
\(87\) −317.555 + 317.555i −0.391327 + 0.391327i
\(88\) 550.468 + 266.835i 0.666820 + 0.323235i
\(89\) 158.689i 0.189000i 0.995525 + 0.0944998i \(0.0301252\pi\)
−0.995525 + 0.0944998i \(0.969875\pi\)
\(90\) 24.5963 + 1100.85i 0.0288075 + 1.28933i
\(91\) 92.4525i 0.106502i
\(92\) 621.596 + 24.3239i 0.704411 + 0.0275646i
\(93\) −1061.04 + 1061.04i −1.18306 + 1.18306i
\(94\) −549.756 + 1257.12i −0.603223 + 1.37938i
\(95\) 597.238 + 218.553i 0.645003 + 0.236032i
\(96\) 670.433 1255.49i 0.712769 1.33477i
\(97\) −1117.12 1117.12i −1.16935 1.16935i −0.982363 0.186986i \(-0.940128\pi\)
−0.186986 0.982363i \(-0.559872\pi\)
\(98\) −350.973 896.521i −0.361772 0.924105i
\(99\) 941.372 0.955671
\(100\) 999.002 44.6639i 0.999002 0.0446639i
\(101\) 787.780 0.776109 0.388055 0.921636i \(-0.373147\pi\)
0.388055 + 0.921636i \(0.373147\pi\)
\(102\) −415.878 1062.31i −0.403706 1.03122i
\(103\) 522.455 + 522.455i 0.499796 + 0.499796i 0.911374 0.411578i \(-0.135022\pi\)
−0.411578 + 0.911374i \(0.635022\pi\)
\(104\) 424.666 + 1223.69i 0.400403 + 1.15378i
\(105\) 133.327 + 48.7898i 0.123918 + 0.0453466i
\(106\) −384.887 + 880.114i −0.352674 + 0.806455i
\(107\) −615.276 + 615.276i −0.555897 + 0.555897i −0.928137 0.372240i \(-0.878590\pi\)
0.372240 + 0.928137i \(0.378590\pi\)
\(108\) 19.2346 491.538i 0.0171375 0.437947i
\(109\) 398.877i 0.350509i −0.984523 0.175254i \(-0.943925\pi\)
0.984523 0.175254i \(-0.0560748\pi\)
\(110\) −19.0968 854.708i −0.0165528 0.740848i
\(111\) 561.091i 0.479787i
\(112\) −67.1542 78.5770i −0.0566560 0.0662931i
\(113\) 692.888 692.888i 0.576826 0.576826i −0.357201 0.934028i \(-0.616269\pi\)
0.934028 + 0.357201i \(0.116269\pi\)
\(114\) −1159.03 506.859i −0.952216 0.416418i
\(115\) −366.042 788.555i −0.296814 0.639419i
\(116\) −310.223 335.491i −0.248306 0.268531i
\(117\) 1409.45 + 1409.45i 1.11371 + 1.11371i
\(118\) −1944.28 + 761.156i −1.51683 + 0.593814i
\(119\) −82.8499 −0.0638221
\(120\) −1988.82 33.3597i −1.51295 0.0253776i
\(121\) 600.109 0.450871
\(122\) 495.028 193.795i 0.367358 0.143815i
\(123\) 397.628 + 397.628i 0.291487 + 0.291487i
\(124\) −1036.54 1120.97i −0.750679 0.811821i
\(125\) −692.451 1213.93i −0.495477 0.868621i
\(126\) −145.736 63.7325i −0.103041 0.0450614i
\(127\) 498.629 498.629i 0.348395 0.348395i −0.511116 0.859512i \(-0.670768\pi\)
0.859512 + 0.511116i \(0.170768\pi\)
\(128\) 1249.78 + 731.577i 0.863015 + 0.505179i
\(129\) 744.311i 0.508007i
\(130\) 1251.11 1308.29i 0.844072 0.882652i
\(131\) 1747.61i 1.16557i 0.812626 + 0.582785i \(0.198037\pi\)
−0.812626 + 0.582785i \(0.801963\pi\)
\(132\) −66.4929 + 1699.22i −0.0438444 + 1.12044i
\(133\) −64.9613 + 64.9613i −0.0423523 + 0.0423523i
\(134\) 923.854 2112.56i 0.595588 1.36192i
\(135\) −623.565 + 289.455i −0.397540 + 0.184535i
\(136\) 1096.59 380.558i 0.691413 0.239945i
\(137\) 124.289 + 124.289i 0.0775092 + 0.0775092i 0.744799 0.667289i \(-0.232546\pi\)
−0.667289 + 0.744799i \(0.732546\pi\)
\(138\) 630.394 + 1610.27i 0.388860 + 0.993297i
\(139\) 9.83873 0.00600367 0.00300184 0.999995i \(-0.499044\pi\)
0.00300184 + 0.999995i \(0.499044\pi\)
\(140\) −54.9088 + 133.612i −0.0331474 + 0.0806593i
\(141\) −3814.15 −2.27808
\(142\) 162.272 + 414.506i 0.0958985 + 0.244962i
\(143\) −1094.32 1094.32i −0.639939 0.639939i
\(144\) 2221.70 + 174.143i 1.28570 + 0.100777i
\(145\) −219.454 + 599.699i −0.125687 + 0.343464i
\(146\) −289.469 + 661.925i −0.164087 + 0.375214i
\(147\) 1892.47 1892.47i 1.06183 1.06183i
\(148\) −570.459 22.3229i −0.316834 0.0123982i
\(149\) 2840.41i 1.56171i 0.624711 + 0.780856i \(0.285217\pi\)
−0.624711 + 0.780856i \(0.714783\pi\)
\(150\) 1226.46 + 2494.66i 0.667603 + 1.35792i
\(151\) 2913.54i 1.57020i −0.619368 0.785101i \(-0.712611\pi\)
0.619368 0.785101i \(-0.287389\pi\)
\(152\) 561.433 1158.21i 0.299594 0.618049i
\(153\) 1263.06 1263.06i 0.667401 0.667401i
\(154\) 113.151 + 49.4826i 0.0592076 + 0.0258923i
\(155\) −733.255 + 2003.76i −0.379977 + 1.03836i
\(156\) −2643.69 + 2444.58i −1.35682 + 1.25463i
\(157\) 1572.29 + 1572.29i 0.799251 + 0.799251i 0.982977 0.183727i \(-0.0588161\pi\)
−0.183727 + 0.982977i \(0.558816\pi\)
\(158\) −146.644 + 57.4087i −0.0738377 + 0.0289063i
\(159\) −2670.30 −1.33188
\(160\) 113.041 2020.70i 0.0558544 0.998439i
\(161\) 125.585 0.0614751
\(162\) −1202.82 + 470.884i −0.583348 + 0.228371i
\(163\) 1457.19 + 1457.19i 0.700222 + 0.700222i 0.964458 0.264236i \(-0.0851199\pi\)
−0.264236 + 0.964458i \(0.585120\pi\)
\(164\) −420.087 + 388.448i −0.200020 + 0.184955i
\(165\) 2155.63 1000.63i 1.01706 0.472115i
\(166\) 3146.67 + 1376.08i 1.47126 + 0.643402i
\(167\) 801.239 801.239i 0.371268 0.371268i −0.496671 0.867939i \(-0.665444\pi\)
0.867939 + 0.496671i \(0.165444\pi\)
\(168\) 125.334 258.559i 0.0575580 0.118740i
\(169\) 1079.90i 0.491532i
\(170\) −1172.41 1121.16i −0.528937 0.505818i
\(171\) 1980.69i 0.885773i
\(172\) 756.739 + 29.6122i 0.335470 + 0.0131274i
\(173\) −1180.59 + 1180.59i −0.518837 + 0.518837i −0.917220 0.398382i \(-0.869572\pi\)
0.398382 + 0.917220i \(0.369572\pi\)
\(174\) 508.947 1163.80i 0.221742 0.507055i
\(175\) 201.174 16.8959i 0.0868989 0.00729836i
\(176\) −1724.95 135.206i −0.738767 0.0579066i
\(177\) −4104.21 4104.21i −1.74289 1.74289i
\(178\) −163.622 417.953i −0.0688987 0.175994i
\(179\) −3724.41 −1.55517 −0.777585 0.628778i \(-0.783555\pi\)
−0.777585 + 0.628778i \(0.783555\pi\)
\(180\) −1199.85 2874.04i −0.496841 1.19010i
\(181\) 545.856 0.224161 0.112081 0.993699i \(-0.464249\pi\)
0.112081 + 0.993699i \(0.464249\pi\)
\(182\) 95.3266 + 243.501i 0.0388246 + 0.0991729i
\(183\) 1044.96 + 1044.96i 0.422107 + 0.422107i
\(184\) −1662.23 + 576.855i −0.665986 + 0.231121i
\(185\) 335.929 + 723.683i 0.133503 + 0.287601i
\(186\) 1700.53 3888.58i 0.670371 1.53293i
\(187\) −980.654 + 980.654i −0.383489 + 0.383489i
\(188\) 151.745 3877.83i 0.0588677 1.50436i
\(189\) 99.3087i 0.0382203i
\(190\) −1798.35 + 40.1807i −0.686662 + 0.0153422i
\(191\) 3668.60i 1.38980i 0.719109 + 0.694898i \(0.244550\pi\)
−0.719109 + 0.694898i \(0.755450\pi\)
\(192\) −471.264 + 3997.97i −0.177138 + 1.50275i
\(193\) −715.028 + 715.028i −0.266678 + 0.266678i −0.827760 0.561082i \(-0.810385\pi\)
0.561082 + 0.827760i \(0.310385\pi\)
\(194\) 4094.13 + 1790.42i 1.51516 + 0.662602i
\(195\) 4725.66 + 1729.31i 1.73545 + 0.635069i
\(196\) 1848.78 + 1999.36i 0.673754 + 0.728631i
\(197\) 272.976 + 272.976i 0.0987246 + 0.0987246i 0.754744 0.656019i \(-0.227761\pi\)
−0.656019 + 0.754744i \(0.727761\pi\)
\(198\) −2479.38 + 970.636i −0.889907 + 0.348384i
\(199\) 4554.16 1.62229 0.811146 0.584844i \(-0.198844\pi\)
0.811146 + 0.584844i \(0.198844\pi\)
\(200\) −2585.11 + 1147.69i −0.913975 + 0.405771i
\(201\) 6409.60 2.24925
\(202\) −2074.85 + 812.269i −0.722702 + 0.282926i
\(203\) −65.2289 65.2289i −0.0225526 0.0225526i
\(204\) 2190.67 + 2369.10i 0.751851 + 0.813090i
\(205\) 750.915 + 274.790i 0.255835 + 0.0936203i
\(206\) −1914.73 837.341i −0.647601 0.283205i
\(207\) −1914.56 + 1914.56i −0.642857 + 0.642857i
\(208\) −2380.22 2785.09i −0.793454 0.928419i
\(209\) 1537.83i 0.508966i
\(210\) −401.463 + 8.96992i −0.131922 + 0.00294754i
\(211\) 4250.89i 1.38694i −0.720487 0.693468i \(-0.756082\pi\)
0.720487 0.693468i \(-0.243918\pi\)
\(212\) 106.237 2714.89i 0.0344170 0.879525i
\(213\) −874.984 + 874.984i −0.281469 + 0.281469i
\(214\) 986.105 2254.91i 0.314994 0.720292i
\(215\) −445.624 959.998i −0.141355 0.304518i
\(216\) 456.159 + 1314.44i 0.143693 + 0.414058i
\(217\) −217.948 217.948i −0.0681809 0.0681809i
\(218\) 411.276 + 1050.56i 0.127776 + 0.326389i
\(219\) −2008.31 −0.619675
\(220\) 931.576 + 2231.43i 0.285486 + 0.683833i
\(221\) −2936.54 −0.893814
\(222\) −578.533 1477.80i −0.174904 0.446771i
\(223\) −258.746 258.746i −0.0776991 0.0776991i 0.667189 0.744888i \(-0.267497\pi\)
−0.744888 + 0.667189i \(0.767497\pi\)
\(224\) 257.890 + 137.714i 0.0769241 + 0.0410776i
\(225\) −2809.35 + 3324.51i −0.832399 + 0.985040i
\(226\) −1110.49 + 2539.35i −0.326854 + 0.747412i
\(227\) 2127.58 2127.58i 0.622080 0.622080i −0.323983 0.946063i \(-0.605022\pi\)
0.946063 + 0.323983i \(0.105022\pi\)
\(228\) 3575.25 + 139.904i 1.03849 + 0.0406377i
\(229\) 4654.98i 1.34328i −0.740880 0.671638i \(-0.765591\pi\)
0.740880 0.671638i \(-0.234409\pi\)
\(230\) 1777.15 + 1699.47i 0.509486 + 0.487216i
\(231\) 343.305i 0.0977827i
\(232\) 1162.98 + 563.746i 0.329111 + 0.159533i
\(233\) 3392.53 3392.53i 0.953871 0.953871i −0.0451108 0.998982i \(-0.514364\pi\)
0.998982 + 0.0451108i \(0.0143641\pi\)
\(234\) −5165.48 2258.94i −1.44307 0.631075i
\(235\) −4919.41 + 2283.56i −1.36556 + 0.633885i
\(236\) 4336.02 4009.45i 1.19598 1.10590i
\(237\) −309.552 309.552i −0.0848420 0.0848420i
\(238\) 218.209 85.4254i 0.0594303 0.0232660i
\(239\) 1434.32 0.388195 0.194098 0.980982i \(-0.437822\pi\)
0.194098 + 0.980982i \(0.437822\pi\)
\(240\) 5272.53 1962.78i 1.41808 0.527904i
\(241\) −6438.62 −1.72094 −0.860472 0.509497i \(-0.829831\pi\)
−0.860472 + 0.509497i \(0.829831\pi\)
\(242\) −1580.56 + 618.764i −0.419845 + 0.164362i
\(243\) −3712.99 3712.99i −0.980199 0.980199i
\(244\) −1103.98 + 1020.83i −0.289652 + 0.267837i
\(245\) 1307.84 3573.91i 0.341040 0.931955i
\(246\) −1457.26 637.280i −0.377689 0.165169i
\(247\) −2302.49 + 2302.49i −0.593134 + 0.593134i
\(248\) 3885.85 + 1883.63i 0.994966 + 0.482301i
\(249\) 9547.12i 2.42982i
\(250\) 3075.44 + 2483.27i 0.778032 + 0.628224i
\(251\) 1877.58i 0.472159i −0.971734 0.236079i \(-0.924137\pi\)
0.971734 0.236079i \(-0.0758626\pi\)
\(252\) 449.552 + 17.5916i 0.112377 + 0.00439748i
\(253\) 1486.49 1486.49i 0.369386 0.369386i
\(254\) −799.156 + 1827.42i −0.197415 + 0.451426i
\(255\) 1549.69 4234.83i 0.380571 1.03998i
\(256\) −4045.98 638.191i −0.987787 0.155808i
\(257\) 1940.33 + 1940.33i 0.470952 + 0.470952i 0.902223 0.431270i \(-0.141934\pi\)
−0.431270 + 0.902223i \(0.641934\pi\)
\(258\) 767.449 + 1960.36i 0.185191 + 0.473049i
\(259\) −115.254 −0.0276506
\(260\) −1946.19 + 4735.77i −0.464222 + 1.12961i
\(261\) 1988.85 0.471674
\(262\) −1801.94 4602.85i −0.424902 1.08536i
\(263\) −1004.94 1004.94i −0.235616 0.235616i 0.579416 0.815032i \(-0.303281\pi\)
−0.815032 + 0.579416i \(0.803281\pi\)
\(264\) −1576.92 4543.96i −0.367623 1.05932i
\(265\) −3444.10 + 1598.73i −0.798376 + 0.370601i
\(266\) 104.114 238.075i 0.0239986 0.0548772i
\(267\) 882.261 882.261i 0.202223 0.202223i
\(268\) −255.004 + 6516.62i −0.0581227 + 1.48532i
\(269\) 6594.94i 1.49480i −0.664376 0.747398i \(-0.731303\pi\)
0.664376 0.747398i \(-0.268697\pi\)
\(270\) 1343.89 1405.31i 0.302912 0.316758i
\(271\) 4781.49i 1.07179i 0.844285 + 0.535895i \(0.180026\pi\)
−0.844285 + 0.535895i \(0.819974\pi\)
\(272\) −2495.81 + 2133.00i −0.556364 + 0.475485i
\(273\) −514.008 + 514.008i −0.113953 + 0.113953i
\(274\) −455.506 199.199i −0.100431 0.0439200i
\(275\) 2181.21 2581.18i 0.478297 0.566005i
\(276\) −3320.65 3591.12i −0.724202 0.783188i
\(277\) 5490.27 + 5490.27i 1.19090 + 1.19090i 0.976816 + 0.214082i \(0.0686760\pi\)
0.214082 + 0.976816i \(0.431324\pi\)
\(278\) −25.9132 + 10.1446i −0.00559053 + 0.00218860i
\(279\) 6645.30 1.42596
\(280\) 6.85241 408.523i 0.00146253 0.0871925i
\(281\) 3046.29 0.646714 0.323357 0.946277i \(-0.395189\pi\)
0.323357 + 0.946277i \(0.395189\pi\)
\(282\) 10045.7 3932.72i 2.12132 0.830461i
\(283\) 5858.21 + 5858.21i 1.23051 + 1.23051i 0.963768 + 0.266743i \(0.0859474\pi\)
0.266743 + 0.963768i \(0.414053\pi\)
\(284\) −854.783 924.405i −0.178599 0.193146i
\(285\) −2105.37 4535.55i −0.437584 0.942677i
\(286\) 4010.53 + 1753.87i 0.829188 + 0.362616i
\(287\) −81.6767 + 81.6767i −0.0167987 + 0.0167987i
\(288\) −6031.04 + 1832.11i −1.23397 + 0.374854i
\(289\) 2281.47i 0.464374i
\(290\) −40.3462 1805.76i −0.00816969 0.365647i
\(291\) 12421.8i 2.50232i
\(292\) 79.9000 2041.84i 0.0160130 0.409211i
\(293\) −5371.12 + 5371.12i −1.07094 + 1.07094i −0.0736515 + 0.997284i \(0.523465\pi\)
−0.997284 + 0.0736515i \(0.976535\pi\)
\(294\) −3033.08 + 6935.69i −0.601676 + 1.37584i
\(295\) −7750.75 2836.31i −1.52972 0.559784i
\(296\) 1525.49 529.399i 0.299551 0.103955i
\(297\) −1175.47 1175.47i −0.229655 0.229655i
\(298\) −2928.71 7481.04i −0.569314 1.45425i
\(299\) 4451.25 0.860944
\(300\) −5802.47 5305.83i −1.11669 1.02111i
\(301\) 152.889 0.0292770
\(302\) 3004.11 + 7673.66i 0.572408 + 1.46215i
\(303\) −4379.82 4379.82i −0.830409 0.830409i
\(304\) −284.481 + 3629.38i −0.0536713 + 0.684734i
\(305\) 1973.39 + 722.143i 0.370479 + 0.135573i
\(306\) −2024.31 + 4628.96i −0.378177 + 0.864772i
\(307\) −1464.75 + 1464.75i −0.272306 + 0.272306i −0.830028 0.557722i \(-0.811676\pi\)
0.557722 + 0.830028i \(0.311676\pi\)
\(308\) −349.037 13.6583i −0.0645722 0.00252680i
\(309\) 5809.38i 1.06953i
\(310\) −134.808 6033.53i −0.0246986 1.10542i
\(311\) 1381.23i 0.251840i −0.992040 0.125920i \(-0.959812\pi\)
0.992040 0.125920i \(-0.0401882\pi\)
\(312\) 4442.36 9164.39i 0.806086 1.66292i
\(313\) −1989.95 + 1989.95i −0.359356 + 0.359356i −0.863575 0.504220i \(-0.831780\pi\)
0.504220 + 0.863575i \(0.331780\pi\)
\(314\) −5762.25 2519.92i −1.03561 0.452889i
\(315\) −264.730 570.301i −0.0473519 0.102009i
\(316\) 327.036 302.405i 0.0582190 0.0538342i
\(317\) −2078.83 2078.83i −0.368325 0.368325i 0.498541 0.866866i \(-0.333869\pi\)
−0.866866 + 0.498541i \(0.833869\pi\)
\(318\) 7033.02 2753.31i 1.24023 0.485529i
\(319\) −1544.17 −0.271024
\(320\) 1785.79 + 5438.65i 0.311964 + 0.950094i
\(321\) 6841.49 1.18958
\(322\) −330.765 + 129.489i −0.0572447 + 0.0224104i
\(323\) 2063.34 + 2063.34i 0.355441 + 0.355441i
\(324\) 2682.45 2480.42i 0.459954 0.425312i
\(325\) 7130.42 598.861i 1.21700 0.102212i
\(326\) −5340.43 2335.45i −0.907298 0.396775i
\(327\) −2217.63 + 2217.63i −0.375032 + 0.375032i
\(328\) 705.898 1456.24i 0.118831 0.245144i
\(329\) 783.463i 0.131288i
\(330\) −4645.75 + 4858.09i −0.774970 + 0.810392i
\(331\) 8633.95i 1.43373i −0.697211 0.716866i \(-0.745576\pi\)
0.697211 0.716866i \(-0.254424\pi\)
\(332\) −9706.53 379.830i −1.60456 0.0627888i
\(333\) 1757.06 1757.06i 0.289148 0.289148i
\(334\) −1284.15 + 2936.44i −0.210376 + 0.481063i
\(335\) 8266.97 3837.47i 1.34828 0.625862i
\(336\) −63.5074 + 810.221i −0.0103113 + 0.131551i
\(337\) −3115.08 3115.08i −0.503528 0.503528i 0.409004 0.912532i \(-0.365876\pi\)
−0.912532 + 0.409004i \(0.865876\pi\)
\(338\) 1113.47 + 2844.22i 0.179185 + 0.457708i
\(339\) −7704.49 −1.23437
\(340\) 4243.88 + 1744.05i 0.676932 + 0.278189i
\(341\) −5159.48 −0.819360
\(342\) 2042.26 + 5216.73i 0.322904 + 0.824820i
\(343\) 780.445 + 780.445i 0.122857 + 0.122857i
\(344\) −2023.62 + 702.271i −0.317170 + 0.110070i
\(345\) −2349.05 + 6419.21i −0.366575 + 1.00174i
\(346\) 1892.14 4326.73i 0.293995 0.672273i
\(347\) 646.980 646.980i 0.100091 0.100091i −0.655288 0.755379i \(-0.727453\pi\)
0.755379 + 0.655288i \(0.227453\pi\)
\(348\) −140.481 + 3589.98i −0.0216395 + 0.552997i
\(349\) 9611.76i 1.47423i 0.675768 + 0.737114i \(0.263812\pi\)
−0.675768 + 0.737114i \(0.736188\pi\)
\(350\) −512.428 + 251.928i −0.0782584 + 0.0384746i
\(351\) 3519.90i 0.535267i
\(352\) 4682.57 1422.47i 0.709039 0.215391i
\(353\) −5085.16 + 5085.16i −0.766730 + 0.766730i −0.977529 0.210799i \(-0.932393\pi\)
0.210799 + 0.977529i \(0.432393\pi\)
\(354\) 15041.4 + 6577.84i 2.25831 + 0.987593i
\(355\) −604.678 + 1652.40i −0.0904027 + 0.247043i
\(356\) 861.892 + 932.093i 0.128315 + 0.138766i
\(357\) 460.620 + 460.620i 0.0682874 + 0.0682874i
\(358\) 9809.32 3840.19i 1.44815 0.566928i
\(359\) −5598.06 −0.822992 −0.411496 0.911411i \(-0.634994\pi\)
−0.411496 + 0.911411i \(0.634994\pi\)
\(360\) 6123.53 + 6332.47i 0.896496 + 0.927084i
\(361\) −3623.33 −0.528259
\(362\) −1437.67 + 562.825i −0.208736 + 0.0817167i
\(363\) −3336.42 3336.42i −0.482416 0.482416i
\(364\) −502.141 543.040i −0.0723059 0.0781952i
\(365\) −2590.28 + 1202.39i −0.371455 + 0.172427i
\(366\) −3829.65 1674.76i −0.546937 0.239183i
\(367\) 3676.76 3676.76i 0.522957 0.522957i −0.395506 0.918463i \(-0.629431\pi\)
0.918463 + 0.395506i \(0.129431\pi\)
\(368\) 3783.19 3233.22i 0.535903 0.457999i
\(369\) 2490.35i 0.351335i
\(370\) −1630.95 1559.66i −0.229159 0.219143i
\(371\) 548.506i 0.0767575i
\(372\) −469.385 + 11995.1i −0.0654206 + 1.67182i
\(373\) 6801.10 6801.10i 0.944096 0.944096i −0.0544219 0.998518i \(-0.517332\pi\)
0.998518 + 0.0544219i \(0.0173316\pi\)
\(374\) 1571.70 3593.98i 0.217301 0.496899i
\(375\) −2899.29 + 10598.9i −0.399250 + 1.45954i
\(376\) 3598.72 + 10369.9i 0.493590 + 1.42230i
\(377\) −2311.98 2311.98i −0.315844 0.315844i
\(378\) 102.396 + 261.558i 0.0139330 + 0.0355902i
\(379\) 9992.48 1.35430 0.677150 0.735845i \(-0.263215\pi\)
0.677150 + 0.735845i \(0.263215\pi\)
\(380\) 4695.04 1960.08i 0.633818 0.264605i
\(381\) −5544.46 −0.745541
\(382\) −3782.65 9662.34i −0.506642 1.29416i
\(383\) 1910.84 + 1910.84i 0.254932 + 0.254932i 0.822989 0.568057i \(-0.192305\pi\)
−0.568057 + 0.822989i \(0.692305\pi\)
\(384\) −2881.05 11015.7i −0.382872 1.46392i
\(385\) 205.539 + 442.788i 0.0272084 + 0.0586144i
\(386\) 1145.98 2620.49i 0.151111 0.345543i
\(387\) −2330.82 + 2330.82i −0.306155 + 0.306155i
\(388\) −12629.2 494.196i −1.65244 0.0646624i
\(389\) 152.974i 0.0199385i 0.999950 + 0.00996927i \(0.00317337\pi\)
−0.999950 + 0.00996927i \(0.996827\pi\)
\(390\) −14229.5 + 317.931i −1.84753 + 0.0412796i
\(391\) 3988.91i 0.515929i
\(392\) −6930.82 3359.66i −0.893009 0.432878i
\(393\) 9716.21 9716.21i 1.24712 1.24712i
\(394\) −1000.42 437.500i −0.127920 0.0559415i
\(395\) −584.585 213.923i −0.0744649 0.0272497i
\(396\) 5529.35 5112.91i 0.701668 0.648821i
\(397\) 3823.37 + 3823.37i 0.483349 + 0.483349i 0.906199 0.422850i \(-0.138970\pi\)
−0.422850 + 0.906199i \(0.638970\pi\)
\(398\) −11994.7 + 4695.74i −1.51065 + 0.591397i
\(399\) 722.330 0.0906309
\(400\) 5625.27 5688.26i 0.703159 0.711033i
\(401\) 10939.9 1.36238 0.681190 0.732106i \(-0.261463\pi\)
0.681190 + 0.732106i \(0.261463\pi\)
\(402\) −16881.6 + 6608.85i −2.09447 + 0.819949i
\(403\) −7724.96 7724.96i −0.954858 0.954858i
\(404\) 4627.20 4278.70i 0.569831 0.526914i
\(405\) −4794.95 1754.66i −0.588304 0.215284i
\(406\) 239.056 + 104.543i 0.0292221 + 0.0127792i
\(407\) −1364.20 + 1364.20i −0.166145 + 0.166145i
\(408\) −8212.52 3980.95i −0.996521 0.483055i
\(409\) 2982.65i 0.360593i 0.983612 + 0.180296i \(0.0577057\pi\)
−0.983612 + 0.180296i \(0.942294\pi\)
\(410\) −2261.09 + 50.5197i −0.272359 + 0.00608534i
\(411\) 1382.02i 0.165864i
\(412\) 5906.38 + 231.125i 0.706278 + 0.0276376i
\(413\) 843.045 843.045i 0.100444 0.100444i
\(414\) 3068.48 7016.65i 0.364270 0.832970i
\(415\) 5715.93 + 12313.7i 0.676106 + 1.45652i
\(416\) 9140.67 + 4881.13i 1.07730 + 0.575282i
\(417\) −54.7004 54.7004i −0.00642371 0.00642371i
\(418\) −1585.64 4050.32i −0.185541 0.473942i
\(419\) −2828.22 −0.329755 −0.164878 0.986314i \(-0.552723\pi\)
−0.164878 + 0.986314i \(0.552723\pi\)
\(420\) 1048.12 437.568i 0.121769 0.0508360i
\(421\) 739.946 0.0856597 0.0428299 0.999082i \(-0.486363\pi\)
0.0428299 + 0.999082i \(0.486363\pi\)
\(422\) 4383.04 + 11196.0i 0.505600 + 1.29150i
\(423\) 11944.0 + 11944.0i 1.37290 + 1.37290i
\(424\) 2519.48 + 7259.99i 0.288577 + 0.831548i
\(425\) −536.660 6389.81i −0.0612514 0.729297i
\(426\) 1402.34 3206.71i 0.159492 0.364708i
\(427\) −214.645 + 214.645i −0.0243265 + 0.0243265i
\(428\) −272.187 + 6955.73i −0.0307399 + 0.785555i
\(429\) 12168.1i 1.36942i
\(430\) 2163.52 + 2068.96i 0.242638 + 0.232032i
\(431\) 7074.45i 0.790636i 0.918544 + 0.395318i \(0.129366\pi\)
−0.918544 + 0.395318i \(0.870634\pi\)
\(432\) −2556.73 2991.63i −0.284747 0.333182i
\(433\) 2645.06 2645.06i 0.293564 0.293564i −0.544922 0.838487i \(-0.683441\pi\)
0.838487 + 0.544922i \(0.183441\pi\)
\(434\) 798.752 + 349.306i 0.0883441 + 0.0386341i
\(435\) 4554.24 2114.05i 0.501975 0.233013i
\(436\) −2166.43 2342.89i −0.237966 0.257349i
\(437\) −3127.64 3127.64i −0.342370 0.342370i
\(438\) 5289.46 2070.74i 0.577033 0.225899i
\(439\) −12903.4 −1.40284 −0.701419 0.712750i \(-0.747450\pi\)
−0.701419 + 0.712750i \(0.747450\pi\)
\(440\) −4754.38 4916.60i −0.515128 0.532703i
\(441\) −11852.6 −1.27984
\(442\) 7734.23 3027.83i 0.832307 0.325835i
\(443\) 2108.72 + 2108.72i 0.226159 + 0.226159i 0.811086 0.584927i \(-0.198877\pi\)
−0.584927 + 0.811086i \(0.698877\pi\)
\(444\) 3047.47 + 3295.69i 0.325736 + 0.352267i
\(445\) 609.707 1666.14i 0.0649503 0.177489i
\(446\) 948.272 + 414.693i 0.100677 + 0.0440275i
\(447\) 15791.8 15791.8i 1.67098 1.67098i
\(448\) −821.223 96.8022i −0.0866052 0.0102087i
\(449\) 136.127i 0.0143079i 0.999974 + 0.00715394i \(0.00227719\pi\)
−0.999974 + 0.00715394i \(0.997723\pi\)
\(450\) 3971.37 11652.7i 0.416027 1.22070i
\(451\) 1933.53i 0.201877i
\(452\) 306.521 7833.13i 0.0318972 0.815132i
\(453\) −16198.4 + 16198.4i −1.68006 + 1.68006i
\(454\) −3409.88 + 7797.31i −0.352497 + 0.806048i
\(455\) −355.217 + 970.698i −0.0365996 + 0.100015i
\(456\) −9560.71 + 3317.91i −0.981845 + 0.340736i
\(457\) −6660.47 6660.47i −0.681759 0.681759i 0.278638 0.960396i \(-0.410117\pi\)
−0.960396 + 0.278638i \(0.910117\pi\)
\(458\) 4799.69 + 12260.3i 0.489683 + 1.25084i
\(459\) −3154.31 −0.320764
\(460\) −6432.94 2643.66i −0.652038 0.267959i
\(461\) 9556.54 0.965493 0.482747 0.875760i \(-0.339639\pi\)
0.482747 + 0.875760i \(0.339639\pi\)
\(462\) −353.977 904.194i −0.0356461 0.0910539i
\(463\) −914.613 914.613i −0.0918049 0.0918049i 0.659713 0.751518i \(-0.270678\pi\)
−0.751518 + 0.659713i \(0.770678\pi\)
\(464\) −3644.33 285.653i −0.364620 0.0285799i
\(465\) 15217.0 7063.61i 1.51757 0.704446i
\(466\) −5437.22 + 12433.2i −0.540503 + 1.23596i
\(467\) −541.819 + 541.819i −0.0536882 + 0.0536882i −0.733441 0.679753i \(-0.762087\pi\)
0.679753 + 0.733441i \(0.262087\pi\)
\(468\) 15934.0 + 623.518i 1.57382 + 0.0615857i
\(469\) 1316.59i 0.129626i
\(470\) 10602.2 11086.8i 1.04051 1.08807i
\(471\) 17482.9i 1.71034i
\(472\) −7286.09 + 15030.9i −0.710528 + 1.46579i
\(473\) 1809.67 1809.67i 0.175917 0.175917i
\(474\) 1134.47 + 496.120i 0.109932 + 0.0480750i
\(475\) −5430.94 4589.36i −0.524607 0.443315i
\(476\) −486.637 + 449.986i −0.0468592 + 0.0433299i
\(477\) 8362.07 + 8362.07i 0.802669 + 0.802669i
\(478\) −3777.71 + 1478.91i −0.361482 + 0.141514i
\(479\) −19357.9 −1.84652 −0.923260 0.384176i \(-0.874486\pi\)
−0.923260 + 0.384176i \(0.874486\pi\)
\(480\) −11862.9 + 10606.0i −1.12806 + 1.00853i
\(481\) −4085.06 −0.387240
\(482\) 16958.0 6638.77i 1.60252 0.627361i
\(483\) −698.215 698.215i −0.0657761 0.0657761i
\(484\) 3524.87 3259.39i 0.331036 0.306104i
\(485\) 7436.99 + 16021.3i 0.696281 + 1.49998i
\(486\) 13607.7 + 5950.83i 1.27007 + 0.555422i
\(487\) −141.166 + 141.166i −0.0131352 + 0.0131352i −0.713644 0.700509i \(-0.752956\pi\)
0.700509 + 0.713644i \(0.252956\pi\)
\(488\) 1855.09 3826.96i 0.172082 0.354997i
\(489\) 16203.1i 1.49842i
\(490\) 240.444 + 10761.4i 0.0221677 + 0.992148i
\(491\) 929.849i 0.0854654i 0.999087 + 0.0427327i \(0.0136064\pi\)
−0.999087 + 0.0427327i \(0.986394\pi\)
\(492\) 4495.21 + 175.904i 0.411910 + 0.0161186i
\(493\) −2071.84 + 2071.84i −0.189272 + 0.189272i
\(494\) 3690.22 8438.36i 0.336095 0.768542i
\(495\) −9883.86 3616.90i −0.897467 0.328419i
\(496\) −12176.7 954.444i −1.10232 0.0864028i
\(497\) −179.730 179.730i −0.0162213 0.0162213i
\(498\) −9843.91 25145.1i −0.885776 2.26261i
\(499\) 13526.6 1.21349 0.606747 0.794895i \(-0.292474\pi\)
0.606747 + 0.794895i \(0.292474\pi\)
\(500\) −10660.5 3369.38i −0.953508 0.301366i
\(501\) −8909.29 −0.794487
\(502\) 1935.95 + 4945.16i 0.172123 + 0.439668i
\(503\) −4770.81 4770.81i −0.422902 0.422902i 0.463300 0.886202i \(-0.346665\pi\)
−0.886202 + 0.463300i \(0.846665\pi\)
\(504\) −1202.16 + 417.195i −0.106247 + 0.0368717i
\(505\) −8271.23 3026.77i −0.728842 0.266712i
\(506\) −2382.40 + 5447.80i −0.209310 + 0.478625i
\(507\) −6003.89 + 6003.89i −0.525922 + 0.525922i
\(508\) 220.585 5637.03i 0.0192655 0.492328i
\(509\) 8188.23i 0.713039i −0.934288 0.356520i \(-0.883963\pi\)
0.934288 0.356520i \(-0.116037\pi\)
\(510\) 284.909 + 12751.5i 0.0247372 + 1.10715i
\(511\) 412.526i 0.0357125i
\(512\) 11314.3 2490.89i 0.976613 0.215006i
\(513\) −2473.24 + 2473.24i −0.212858 + 0.212858i
\(514\) −7111.09 3109.78i −0.610227 0.266861i
\(515\) −3478.12 7492.83i −0.297600 0.641113i
\(516\) −4042.60 4371.87i −0.344895 0.372986i
\(517\) −9273.48 9273.48i −0.788872 0.788872i
\(518\) 303.554 118.836i 0.0257479 0.0100799i
\(519\) 13127.5 1.11028
\(520\) 242.877 14479.7i 0.0204824 1.22111i
\(521\) −5465.70 −0.459610 −0.229805 0.973237i \(-0.573809\pi\)
−0.229805 + 0.973237i \(0.573809\pi\)
\(522\) −5238.22 + 2050.68i −0.439216 + 0.171946i
\(523\) 9877.72 + 9877.72i 0.825856 + 0.825856i 0.986941 0.161085i \(-0.0514993\pi\)
−0.161085 + 0.986941i \(0.551499\pi\)
\(524\) 9491.88 + 10265.0i 0.791326 + 0.855780i
\(525\) −1212.40 1024.53i −0.100788 0.0851697i
\(526\) 3682.97 + 1610.62i 0.305295 + 0.133510i
\(527\) −6922.60 + 6922.60i −0.572207 + 0.572207i
\(528\) 8838.49 + 10341.9i 0.728496 + 0.852412i
\(529\) 6120.55i 0.503045i
\(530\) 7422.62 7761.89i 0.608336 0.636142i
\(531\) 25704.7i 2.10073i
\(532\) −28.7377 + 734.391i −0.00234199 + 0.0598494i
\(533\) −2894.96 + 2894.96i −0.235262 + 0.235262i
\(534\) −1414.00 + 3233.38i −0.114588 + 0.262026i
\(535\) 8824.02 4096.05i 0.713076 0.331005i
\(536\) −6047.57 17426.4i −0.487342 1.40430i
\(537\) 20706.6 + 20706.6i 1.66398 + 1.66398i
\(538\) 6799.95 + 17369.7i 0.544920 + 1.39193i
\(539\) 9202.49 0.735397
\(540\) −2090.52 + 5086.97i −0.166596 + 0.405385i
\(541\) 15069.4 1.19757 0.598784 0.800910i \(-0.295651\pi\)
0.598784 + 0.800910i \(0.295651\pi\)
\(542\) −4930.13 12593.5i −0.390715 0.998035i
\(543\) −3034.80 3034.80i −0.239845 0.239845i
\(544\) 4374.15 8191.27i 0.344743 0.645584i
\(545\) −1532.55 + 4187.97i −0.120453 + 0.329162i
\(546\) 823.803 1883.78i 0.0645706 0.147652i
\(547\) 4573.04 4573.04i 0.357457 0.357457i −0.505418 0.862875i \(-0.668662\pi\)
0.862875 + 0.505418i \(0.168662\pi\)
\(548\) 1405.10 + 54.9835i 0.109531 + 0.00428609i
\(549\) 6544.60i 0.508773i
\(550\) −3083.42 + 9047.32i −0.239050 + 0.701416i
\(551\) 3249.00i 0.251202i
\(552\) 12448.7 + 6034.38i 0.959873 + 0.465290i
\(553\) 63.5850 63.5850i 0.00488953 0.00488953i
\(554\) −20121.2 8799.29i −1.54308 0.674812i
\(555\) 2155.80 5891.13i 0.164880 0.450566i
\(556\) 57.7899 53.4375i 0.00440798 0.00407599i
\(557\) 1915.65 + 1915.65i 0.145725 + 0.145725i 0.776205 0.630480i \(-0.217142\pi\)
−0.630480 + 0.776205i \(0.717142\pi\)
\(558\) −17502.3 + 6851.88i −1.32784 + 0.519827i
\(559\) 5419.00 0.410017
\(560\) 403.175 + 1083.03i 0.0304237 + 0.0817256i
\(561\) 10904.3 0.820640
\(562\) −8023.30 + 3140.99i −0.602211 + 0.235756i
\(563\) 1561.15 + 1561.15i 0.116864 + 0.116864i 0.763120 0.646256i \(-0.223666\pi\)
−0.646256 + 0.763120i \(0.723666\pi\)
\(564\) −22403.2 + 20715.9i −1.67260 + 1.54663i
\(565\) −9937.10 + 4612.74i −0.739924 + 0.343468i
\(566\) −21469.6 9388.98i −1.59441 0.697259i
\(567\) 521.544 521.544i 0.0386293 0.0386293i
\(568\) 3204.46 + 1553.33i 0.236719 + 0.114747i
\(569\) 21457.5i 1.58093i 0.612510 + 0.790463i \(0.290160\pi\)
−0.612510 + 0.790463i \(0.709840\pi\)
\(570\) 10221.7 + 9774.88i 0.751120 + 0.718289i
\(571\) 5553.22i 0.406997i 0.979075 + 0.203498i \(0.0652312\pi\)
−0.979075 + 0.203498i \(0.934769\pi\)
\(572\) −12371.3 484.106i −0.904318 0.0353872i
\(573\) 20396.3 20396.3i 1.48703 1.48703i
\(574\) 130.904 299.335i 0.00951884 0.0217666i
\(575\) 813.477 + 9685.77i 0.0589988 + 0.702477i
\(576\) 13995.4 11043.9i 1.01240 0.798894i
\(577\) 762.522 + 762.522i 0.0550160 + 0.0550160i 0.734079 0.679064i \(-0.237614\pi\)
−0.679064 + 0.734079i \(0.737614\pi\)
\(578\) 2352.39 + 6008.91i 0.169285 + 0.432418i
\(579\) 7950.68 0.570672
\(580\) 1968.16 + 4714.39i 0.140902 + 0.337507i
\(581\) −1961.07 −0.140033
\(582\) −12807.9 32716.3i −0.912208 2.33013i
\(583\) −6492.40 6492.40i −0.461214 0.461214i
\(584\) 1894.87 + 5460.17i 0.134265 + 0.386889i
\(585\) −9383.11 20213.8i −0.663152 1.42861i
\(586\) 8608.32 19684.5i 0.606837 1.38764i
\(587\) −15138.4 + 15138.4i −1.06445 + 1.06445i −0.0666722 + 0.997775i \(0.521238\pi\)
−0.997775 + 0.0666722i \(0.978762\pi\)
\(588\) 837.198 21394.5i 0.0587167 1.50050i
\(589\) 10855.8i 0.759432i
\(590\) 23338.3 521.451i 1.62852 0.0363861i
\(591\) 3035.33i 0.211264i
\(592\) −3471.96 + 2967.24i −0.241042 + 0.206001i
\(593\) 1637.51 1637.51i 0.113397 0.113397i −0.648131 0.761529i \(-0.724449\pi\)
0.761529 + 0.648131i \(0.224449\pi\)
\(594\) 4307.95 + 1883.93i 0.297571 + 0.130132i
\(595\) 869.876 + 318.322i 0.0599352 + 0.0219327i
\(596\) 15427.2 + 16683.8i 1.06027 + 1.14663i
\(597\) −25319.8 25319.8i −1.73579 1.73579i
\(598\) −11723.7 + 4589.62i −0.801699 + 0.313852i
\(599\) 10193.4 0.695312 0.347656 0.937622i \(-0.386978\pi\)
0.347656 + 0.937622i \(0.386978\pi\)
\(600\) 20753.3 + 7991.61i 1.41208 + 0.543760i
\(601\) −10688.6 −0.725454 −0.362727 0.931895i \(-0.618154\pi\)
−0.362727 + 0.931895i \(0.618154\pi\)
\(602\) −402.677 + 157.642i −0.0272623 + 0.0106727i
\(603\) −20071.7 20071.7i −1.35553 1.35553i
\(604\) −15824.4 17113.3i −1.06604 1.15287i
\(605\) −6300.80 2305.71i −0.423411 0.154943i
\(606\) 16051.5 + 7019.56i 1.07599 + 0.470544i
\(607\) −12050.0 + 12050.0i −0.805759 + 0.805759i −0.983989 0.178230i \(-0.942963\pi\)
0.178230 + 0.983989i \(0.442963\pi\)
\(608\) −2992.94 9852.35i −0.199638 0.657180i
\(609\) 725.306i 0.0482609i
\(610\) −5942.10 + 132.765i −0.394407 + 0.00881228i
\(611\) 27769.1i 1.83866i
\(612\) 558.756 14279.0i 0.0369058 0.943126i
\(613\) 3893.39 3893.39i 0.256529 0.256529i −0.567112 0.823641i \(-0.691939\pi\)
0.823641 + 0.567112i \(0.191939\pi\)
\(614\) 2347.57 5368.15i 0.154300 0.352835i
\(615\) −2647.11 5702.61i −0.173564 0.373905i
\(616\) 933.374 323.914i 0.0610498 0.0211865i
\(617\) 4210.58 + 4210.58i 0.274735 + 0.274735i 0.831003 0.556268i \(-0.187767\pi\)
−0.556268 + 0.831003i \(0.687767\pi\)
\(618\) 5989.98 + 15300.7i 0.389890 + 0.995930i
\(619\) −6990.42 −0.453907 −0.226954 0.973906i \(-0.572877\pi\)
−0.226954 + 0.973906i \(0.572877\pi\)
\(620\) 6576.15 + 15752.1i 0.425975 + 1.02035i
\(621\) 4781.34 0.308967
\(622\) 1424.16 + 3637.86i 0.0918068 + 0.234510i
\(623\) 181.225 + 181.225i 0.0116543 + 0.0116543i
\(624\) −2250.96 + 28717.6i −0.144408 + 1.84234i
\(625\) 2606.21 + 15406.1i 0.166797 + 0.985991i
\(626\) 3189.30 7292.91i 0.203626 0.465628i
\(627\) 8549.87 8549.87i 0.544576 0.544576i
\(628\) 17774.8 + 695.553i 1.12945 + 0.0441968i
\(629\) 3660.76i 0.232057i
\(630\) 1285.27 + 1229.09i 0.0812802 + 0.0777275i
\(631\) 16801.3i 1.05998i 0.848003 + 0.529991i \(0.177805\pi\)
−0.848003 + 0.529991i \(0.822195\pi\)
\(632\) −549.539 + 1133.67i −0.0345878 + 0.0713531i
\(633\) −23633.7 + 23633.7i −1.48397 + 1.48397i
\(634\) 7618.67 + 3331.76i 0.477249 + 0.208708i
\(635\) −7151.13 + 3319.51i −0.446904 + 0.207450i
\(636\) −15684.6 + 14503.3i −0.977885 + 0.904235i
\(637\) 13778.3 + 13778.3i 0.857010 + 0.857010i
\(638\) 4067.01 1592.17i 0.252374 0.0988003i
\(639\) 5480.04 0.339260
\(640\) −10311.1 12483.0i −0.636848 0.770989i
\(641\) 7637.22 0.470596 0.235298 0.971923i \(-0.424393\pi\)
0.235298 + 0.971923i \(0.424393\pi\)
\(642\) −18019.1 + 7054.17i −1.10772 + 0.433654i
\(643\) −13378.3 13378.3i −0.820509 0.820509i 0.165672 0.986181i \(-0.447021\pi\)
−0.986181 + 0.165672i \(0.947021\pi\)
\(644\) 737.651 682.094i 0.0451359 0.0417365i
\(645\) −2859.76 + 7814.83i −0.174578 + 0.477068i
\(646\) −7561.90 3306.93i −0.460556 0.201408i
\(647\) 9497.02 9497.02i 0.577073 0.577073i −0.357023 0.934096i \(-0.616208\pi\)
0.934096 + 0.357023i \(0.116208\pi\)
\(648\) −4507.49 + 9298.76i −0.273258 + 0.563719i
\(649\) 19957.4i 1.20708i
\(650\) −18162.6 + 8929.36i −1.09599 + 0.538828i
\(651\) 2423.45i 0.145902i
\(652\) 16473.6 + 644.636i 0.989506 + 0.0387207i
\(653\) 12420.7 12420.7i 0.744346 0.744346i −0.229065 0.973411i \(-0.573567\pi\)
0.973411 + 0.229065i \(0.0735667\pi\)
\(654\) 3554.21 8127.36i 0.212509 0.485940i
\(655\) 6714.61 18348.9i 0.400552 1.09458i
\(656\) −357.681 + 4563.26i −0.0212883 + 0.271594i
\(657\) 6289.03 + 6289.03i 0.373453 + 0.373453i
\(658\) 807.819 + 2063.48i 0.0478603 + 0.122254i
\(659\) 5899.85 0.348749 0.174374 0.984679i \(-0.444210\pi\)
0.174374 + 0.984679i \(0.444210\pi\)
\(660\) 7226.82 17585.4i 0.426217 1.03714i
\(661\) 25892.6 1.52361 0.761804 0.647808i \(-0.224314\pi\)
0.761804 + 0.647808i \(0.224314\pi\)
\(662\) 8902.36 + 22740.0i 0.522658 + 1.33507i
\(663\) 16326.3 + 16326.3i 0.956349 + 0.956349i
\(664\) 25956.6 9007.88i 1.51704 0.526466i
\(665\) 931.647 432.464i 0.0543274 0.0252184i
\(666\) −2816.05 + 6439.41i −0.163843 + 0.374658i
\(667\) 3140.53 3140.53i 0.182312 0.182312i
\(668\) 354.454 9058.05i 0.0205303 0.524650i
\(669\) 2877.10i 0.166270i
\(670\) −17816.7 + 18631.1i −1.02734 + 1.07430i
\(671\) 5081.29i 0.292342i
\(672\) −668.143 2199.44i −0.0383544 0.126258i
\(673\) −19481.3 + 19481.3i −1.11582 + 1.11582i −0.123475 + 0.992348i \(0.539404\pi\)
−0.992348 + 0.123475i \(0.960596\pi\)
\(674\) 11416.4 + 4992.55i 0.652437 + 0.285320i
\(675\) 7659.20 643.272i 0.436745 0.0366808i
\(676\) −5865.28 6343.00i −0.333709 0.360890i
\(677\) −17811.4 17811.4i −1.01115 1.01115i −0.999937 0.0112114i \(-0.996431\pi\)
−0.0112114 0.999937i \(-0.503569\pi\)
\(678\) 20292.0 7944.00i 1.14943 0.449982i
\(679\) −2551.55 −0.144211
\(680\) −12975.8 217.651i −0.731762 0.0122743i
\(681\) −23657.4 −1.33121
\(682\) 13589.0 5319.88i 0.762976 0.298693i
\(683\) 13579.6 + 13579.6i 0.760775 + 0.760775i 0.976463 0.215687i \(-0.0691991\pi\)
−0.215687 + 0.976463i \(0.569199\pi\)
\(684\) −10757.8 11634.0i −0.601367 0.650348i
\(685\) −827.428 1782.51i −0.0461524 0.0994249i
\(686\) −2860.24 1250.82i −0.159190 0.0696161i
\(687\) −25880.3 + 25880.3i −1.43726 + 1.43726i
\(688\) 4605.70 3936.17i 0.255219 0.218118i
\(689\) 19441.3i 1.07497i
\(690\) −431.869 19328.9i −0.0238275 1.06644i
\(691\) 12840.8i 0.706928i −0.935448 0.353464i \(-0.885004\pi\)
0.935448 0.353464i \(-0.114996\pi\)
\(692\) −522.274 + 13346.7i −0.0286906 + 0.733186i
\(693\) 1075.06 1075.06i 0.0589296 0.0589296i
\(694\) −1036.92 + 2371.10i −0.0567159 + 0.129691i
\(695\) −103.301 37.8019i −0.00563803 0.00206318i
\(696\) −3331.58 9600.10i −0.181441 0.522832i
\(697\) 2594.27 + 2594.27i 0.140983 + 0.140983i
\(698\) −9910.56 25315.4i −0.537422 1.37278i
\(699\) −37722.9 −2.04122
\(700\) 1089.87 1191.88i 0.0588475 0.0643557i
\(701\) −23786.6 −1.28161 −0.640805 0.767704i \(-0.721399\pi\)
−0.640805 + 0.767704i \(0.721399\pi\)
\(702\) 3629.33 + 9270.70i 0.195128 + 0.498433i
\(703\) 2870.34 + 2870.34i 0.153993 + 0.153993i
\(704\) −10866.2 + 8574.62i −0.581727 + 0.459045i
\(705\) 40046.3 + 14654.5i 2.13934 + 0.782868i
\(706\) 8150.01 18636.5i 0.434461 0.993476i
\(707\) 899.658 899.658i 0.0478573 0.0478573i
\(708\) −46398.3 1815.63i −2.46293 0.0963779i
\(709\) 21270.0i 1.12667i −0.826227 0.563337i \(-0.809517\pi\)
0.826227 0.563337i \(-0.190483\pi\)
\(710\) −111.169 4975.54i −0.00587620 0.262998i
\(711\) 1938.73i 0.102262i
\(712\) −3231.11 1566.25i −0.170072 0.0824408i
\(713\) 10493.4 10493.4i 0.551164 0.551164i
\(714\) −1688.12 738.238i −0.0884821 0.0386945i
\(715\) 7285.15 + 15694.2i 0.381048 + 0.820882i
\(716\) −21876.1 + 20228.5i −1.14183 + 1.05583i
\(717\) −7974.40 7974.40i −0.415355 0.415355i
\(718\) 14744.1 5772.09i 0.766359 0.300017i
\(719\) 22553.8 1.16984 0.584921 0.811090i \(-0.301126\pi\)
0.584921 + 0.811090i \(0.301126\pi\)
\(720\) −22657.4 10364.5i −1.17277 0.536475i
\(721\) 1193.30 0.0616380
\(722\) 9543.10 3735.97i 0.491908 0.192574i
\(723\) 35796.8 + 35796.8i 1.84135 + 1.84135i
\(724\) 3206.21 2964.73i 0.164583 0.152187i
\(725\) 4608.27 5453.31i 0.236065 0.279353i
\(726\) 12227.6 + 5347.30i 0.625081 + 0.273357i
\(727\) 19795.0 19795.0i 1.00984 1.00984i 0.00989382 0.999951i \(-0.496851\pi\)
0.999951 0.00989382i \(-0.00314935\pi\)
\(728\) 1882.46 + 912.504i 0.0958358 + 0.0464556i
\(729\) 28955.6i 1.47110i
\(730\) 5582.48 5837.64i 0.283037 0.295974i
\(731\) 4856.16i 0.245706i
\(732\) 11813.3 + 462.272i 0.596493 + 0.0233416i
\(733\) 10191.1 10191.1i 0.513528 0.513528i −0.402078 0.915606i \(-0.631712\pi\)
0.915606 + 0.402078i \(0.131712\pi\)
\(734\) −5892.76 + 13474.9i −0.296329 + 0.677612i
\(735\) −27141.1 + 12598.7i −1.36206 + 0.632259i
\(736\) −6630.40 + 12416.4i −0.332065 + 0.621842i
\(737\) 15583.9 + 15583.9i 0.778888 + 0.778888i
\(738\) 2567.77 + 6559.06i 0.128077 + 0.327158i
\(739\) −28579.3 −1.42261 −0.711304 0.702885i \(-0.751895\pi\)
−0.711304 + 0.702885i \(0.751895\pi\)
\(740\) 5903.72 + 2426.17i 0.293277 + 0.120524i
\(741\) 25602.3 1.26926
\(742\) 565.558 + 1444.65i 0.0279815 + 0.0714755i
\(743\) −20848.1 20848.1i −1.02940 1.02940i −0.999555 0.0298445i \(-0.990499\pi\)
−0.0298445 0.999555i \(-0.509501\pi\)
\(744\) −11131.7 32076.6i −0.548533 1.58062i
\(745\) 10913.3 29822.6i 0.536687 1.46660i
\(746\) −10900.2 + 24925.2i −0.534964 + 1.22329i
\(747\) 29896.9 29896.9i 1.46435 1.46435i
\(748\) −433.824 + 11086.3i −0.0212061 + 0.541921i
\(749\) 1405.31i 0.0685566i
\(750\) −3292.28 30904.8i −0.160290 1.50464i
\(751\) 13588.4i 0.660252i 0.943937 + 0.330126i \(0.107091\pi\)
−0.943937 + 0.330126i \(0.892909\pi\)
\(752\) −20170.5 23601.5i −0.978115 1.14449i
\(753\) −10438.8 + 10438.8i −0.505193 + 0.505193i
\(754\) 8473.13 + 3705.42i 0.409248 + 0.178970i
\(755\) −11194.3 + 30590.5i −0.539605 + 1.47457i
\(756\) −539.379 583.311i −0.0259484 0.0280619i
\(757\) −1630.23 1630.23i −0.0782719 0.0782719i 0.666887 0.745159i \(-0.267626\pi\)
−0.745159 + 0.666887i \(0.767626\pi\)
\(758\) −26318.1 + 10303.1i −1.26110 + 0.493702i
\(759\) −16528.9 −0.790461
\(760\) −10344.8 + 10003.4i −0.493742 + 0.477451i
\(761\) −33489.9 −1.59528 −0.797640 0.603134i \(-0.793919\pi\)
−0.797640 + 0.603134i \(0.793919\pi\)
\(762\) 14602.9 5716.82i 0.694237 0.271783i
\(763\) −455.524 455.524i −0.0216135 0.0216135i
\(764\) 19925.4 + 21548.4i 0.943556 + 1.02041i
\(765\) −18114.3 + 8408.53i −0.856109 + 0.397400i
\(766\) −7002.98 3062.51i −0.330324 0.144455i
\(767\) 29881.0 29881.0i 1.40670 1.40670i
\(768\) 18946.3 + 26042.6i 0.890188 + 1.22361i
\(769\) 26755.6i 1.25466i 0.778755 + 0.627328i \(0.215851\pi\)
−0.778755 + 0.627328i \(0.784149\pi\)
\(770\) −997.900 954.282i −0.0467037 0.0446623i
\(771\) 21575.4i 1.00780i
\(772\) −316.316 + 8083.43i −0.0147467 + 0.376851i
\(773\) −6155.27 + 6155.27i −0.286403 + 0.286403i −0.835656 0.549253i \(-0.814912\pi\)
0.549253 + 0.835656i \(0.314912\pi\)
\(774\) 3735.61 8542.16i 0.173480 0.396694i
\(775\) 15397.5 18221.0i 0.713670 0.844540i
\(776\) 33772.1 11720.1i 1.56231 0.542176i
\(777\) 640.775 + 640.775i 0.0295852 + 0.0295852i
\(778\) −157.729 402.902i −0.00726848 0.0185665i
\(779\) 4068.25 0.187112
\(780\) 37149.7 15509.2i 1.70535 0.711947i
\(781\) −4254.76 −0.194939
\(782\) 4112.92 + 10506.0i 0.188079 + 0.480425i
\(783\) −2483.43 2483.43i −0.113347 0.113347i
\(784\) 21718.4 + 1702.35i 0.989361 + 0.0775489i
\(785\) −10467.1 22549.1i −0.475909 1.02524i
\(786\) −15572.2 + 35608.7i −0.706670 + 1.61593i
\(787\) −11524.6 + 11524.6i −0.521993 + 0.521993i −0.918173 0.396180i \(-0.870336\pi\)
0.396180 + 0.918173i \(0.370336\pi\)
\(788\) 3086.01 + 120.760i 0.139511 + 0.00545925i
\(789\) 11174.3i 0.504202i
\(790\) 1760.25 39.3294i 0.0792744 0.00177124i
\(791\) 1582.58i 0.0711378i
\(792\) −9291.31 + 19167.6i −0.416859 + 0.859962i
\(793\) −7607.89 + 7607.89i −0.340686 + 0.340686i
\(794\) −14012.2 6127.74i −0.626290 0.273886i
\(795\) 28036.6 + 10259.7i 1.25076 + 0.457704i
\(796\) 26749.9 24735.2i 1.19111 1.10140i
\(797\) 656.794 + 656.794i 0.0291905 + 0.0291905i 0.721551 0.692361i \(-0.243429\pi\)
−0.692361 + 0.721551i \(0.743429\pi\)
\(798\) −1902.47 + 744.785i −0.0843942 + 0.0330390i
\(799\) −24884.9 −1.10183
\(800\) −8950.71 + 20781.8i −0.395569 + 0.918436i
\(801\) −5525.62 −0.243743
\(802\) −28813.5 + 11280.0i −1.26863 + 0.496648i
\(803\) −4882.87 4882.87i −0.214586 0.214586i
\(804\) 37648.2 34812.7i 1.65143 1.52705i
\(805\) −1318.57 482.517i −0.0577310 0.0211261i
\(806\) 28311.0 + 12380.8i 1.23724 + 0.541062i
\(807\) −36665.9 + 36665.9i −1.59938 + 1.59938i
\(808\) −7775.37 + 16040.2i −0.338535 + 0.698383i
\(809\) 14179.8i 0.616238i 0.951348 + 0.308119i \(0.0996994\pi\)
−0.951348 + 0.308119i \(0.900301\pi\)
\(810\) 14438.1 322.592i 0.626301 0.0139935i
\(811\) 29366.2i 1.27150i 0.771896 + 0.635749i \(0.219309\pi\)
−0.771896 + 0.635749i \(0.780691\pi\)
\(812\) −737.417 28.8561i −0.0318698 0.00124711i
\(813\) 26583.7 26583.7i 1.14678 1.14678i
\(814\) 2186.41 4999.63i 0.0941445 0.215279i
\(815\) −9700.92 20898.4i −0.416943 0.898209i
\(816\) 25734.8 + 2017.16i 1.10404 + 0.0865378i
\(817\) −3807.63 3807.63i −0.163050 0.163050i
\(818\) −3075.37 7855.67i −0.131452 0.335779i
\(819\) 3219.24 0.137350
\(820\) 5903.14 2464.44i 0.251398 0.104953i
\(821\) 8845.67 0.376025 0.188012 0.982167i \(-0.439796\pi\)
0.188012 + 0.982167i \(0.439796\pi\)
\(822\) 1424.99 + 3639.96i 0.0604649 + 0.154450i
\(823\) −16257.0 16257.0i −0.688559 0.688559i 0.273355 0.961913i \(-0.411867\pi\)
−0.961913 + 0.273355i \(0.911867\pi\)
\(824\) −15794.5 + 5481.26i −0.667751 + 0.231734i
\(825\) −26477.5 + 2223.76i −1.11737 + 0.0938440i
\(826\) −1351.15 + 3089.66i −0.0569160 + 0.130149i
\(827\) 19183.3 19183.3i 0.806612 0.806612i −0.177507 0.984119i \(-0.556803\pi\)
0.984119 + 0.177507i \(0.0568034\pi\)
\(828\) −846.970 + 21644.3i −0.0355486 + 0.908442i
\(829\) 27097.5i 1.13527i 0.823282 + 0.567633i \(0.192141\pi\)
−0.823282 + 0.567633i \(0.807859\pi\)
\(830\) −27751.1 26538.1i −1.16055 1.10982i
\(831\) 61048.5i 2.54844i
\(832\) −29107.5 3431.07i −1.21289 0.142970i
\(833\) 12347.2 12347.2i 0.513571 0.513571i
\(834\) 200.470 + 87.6685i 0.00832340 + 0.00363994i
\(835\) −11491.0 + 5334.06i −0.476244 + 0.221069i
\(836\) 8352.47 + 9032.78i 0.345546 + 0.373691i
\(837\) −8297.83 8297.83i −0.342670 0.342670i
\(838\) 7448.93 2916.14i 0.307063 0.120210i
\(839\) 13726.1 0.564814 0.282407 0.959295i \(-0.408867\pi\)
0.282407 + 0.959295i \(0.408867\pi\)
\(840\) −2309.36 + 2233.17i −0.0948578 + 0.0917281i
\(841\) 21126.6 0.866235
\(842\) −1948.86 + 762.948i −0.0797651 + 0.0312268i
\(843\) −16936.5 16936.5i −0.691961 0.691961i
\(844\) −23088.0 24968.6i −0.941615 1.01831i
\(845\) −4149.13 + 11338.3i −0.168916 + 0.461596i
\(846\) −43773.4 19142.8i −1.77891 0.777945i
\(847\) 685.334 685.334i 0.0278021 0.0278021i
\(848\) −14121.5 16523.5i −0.571855 0.669127i
\(849\) 65139.8i 2.63320i
\(850\) 8001.90 + 16276.1i 0.322898 + 0.656783i
\(851\) 5549.03i 0.223523i
\(852\) −387.078 + 9891.74i −0.0155646 + 0.397753i
\(853\) −20720.5 + 20720.5i −0.831720 + 0.831720i −0.987752 0.156032i \(-0.950130\pi\)
0.156032 + 0.987752i \(0.450130\pi\)
\(854\) 344.012 786.648i 0.0137844 0.0315205i
\(855\) −7610.13 + 20796.1i −0.304399 + 0.831827i
\(856\) −6455.07 18600.6i −0.257745 0.742704i
\(857\) 26011.0 + 26011.0i 1.03678 + 1.03678i 0.999297 + 0.0374797i \(0.0119329\pi\)
0.0374797 + 0.999297i \(0.488067\pi\)
\(858\) −12546.4 32048.3i −0.499216 1.27519i
\(859\) −4857.84 −0.192954 −0.0964769 0.995335i \(-0.530757\pi\)
−0.0964769 + 0.995335i \(0.530757\pi\)
\(860\) −7831.54 3218.42i −0.310527 0.127613i
\(861\) 908.196 0.0359480
\(862\) −7294.37 18632.6i −0.288222 0.736229i
\(863\) 23423.0 + 23423.0i 0.923904 + 0.923904i 0.997303 0.0733988i \(-0.0233846\pi\)
−0.0733988 + 0.997303i \(0.523385\pi\)
\(864\) 9818.53 + 5243.11i 0.386612 + 0.206452i
\(865\) 16931.6 7859.52i 0.665539 0.308939i
\(866\) −4239.25 + 9693.81i −0.166346 + 0.380380i
\(867\) −12684.3 + 12684.3i −0.496863 + 0.496863i
\(868\) −2463.91 96.4163i −0.0963486 0.00377025i
\(869\) 1505.25i 0.0587596i
\(870\) −9815.15 + 10263.8i −0.382488 + 0.399971i
\(871\) 46665.5i 1.81539i
\(872\) 8121.66 + 3936.90i 0.315406 + 0.152890i
\(873\) 38898.8 38898.8i 1.50805 1.50805i
\(874\) 11462.4 + 5012.69i 0.443619 + 0.194001i
\(875\) −2177.12 595.543i −0.0841145 0.0230092i
\(876\) −11796.2 + 10907.8i −0.454975 + 0.420708i
\(877\) −19062.6 19062.6i −0.733976 0.733976i 0.237429 0.971405i \(-0.423695\pi\)
−0.971405 + 0.237429i \(0.923695\pi\)
\(878\) 33984.9 13304.5i 1.30630 0.511396i
\(879\) 59723.6 2.29173
\(880\) 17591.5 + 8047.11i 0.673874 + 0.308259i
\(881\) −6538.78 −0.250053 −0.125027 0.992153i \(-0.539902\pi\)
−0.125027 + 0.992153i \(0.539902\pi\)
\(882\) 31217.3 12221.1i 1.19177 0.466558i
\(883\) 23546.4 + 23546.4i 0.897395 + 0.897395i 0.995205 0.0978097i \(-0.0311836\pi\)
−0.0978097 + 0.995205i \(0.531184\pi\)
\(884\) −17248.4 + 15949.3i −0.656252 + 0.606826i
\(885\) 27322.8 + 58860.8i 1.03779 + 2.23569i
\(886\) −7728.22 3379.66i −0.293041 0.128151i
\(887\) −13448.5 + 13448.5i −0.509082 + 0.509082i −0.914245 0.405162i \(-0.867215\pi\)
0.405162 + 0.914245i \(0.367215\pi\)
\(888\) −11424.5 5537.95i −0.431737 0.209281i
\(889\) 1138.89i 0.0429663i
\(890\) 112.094 + 5016.92i 0.00422178 + 0.188952i
\(891\) 12346.5i 0.464225i
\(892\) −2925.13 114.465i −0.109799 0.00429659i
\(893\) −19511.8 + 19511.8i −0.731175 + 0.731175i
\(894\) −25309.6 + 57875.1i −0.946845 + 2.16514i
\(895\) 39104.1 + 14309.8i 1.46045 + 0.534439i
\(896\) 2262.74 591.795i 0.0843671 0.0220653i
\(897\) −24747.6 24747.6i −0.921179 0.921179i
\(898\) −140.359 358.531i −0.00521585 0.0133233i
\(899\) −10900.5 −0.404397
\(900\) 1555.22 + 34785.7i 0.0576007 + 1.28836i
\(901\) −17422.0 −0.644186
\(902\) −1993.64 5092.53i −0.0735932 0.187985i
\(903\) −850.016 850.016i −0.0313253 0.0313253i
\(904\) 7269.33 + 20946.9i 0.267449 + 0.770667i
\(905\) −5731.17 2097.27i −0.210509 0.0770337i
\(906\) 25961.3 59365.2i 0.951992 2.17690i
\(907\) 200.288 200.288i 0.00733237 0.00733237i −0.703431 0.710763i \(-0.748350\pi\)
0.710763 + 0.703431i \(0.248350\pi\)
\(908\) 941.202 24052.4i 0.0343997 0.879081i
\(909\) 27430.9i 1.00091i
\(910\) −65.3061 2922.88i −0.00237899 0.106475i
\(911\) 7662.84i 0.278684i 0.990244 + 0.139342i \(0.0444987\pi\)
−0.990244 + 0.139342i \(0.955501\pi\)
\(912\) 21759.9 18596.6i 0.790067 0.675214i
\(913\) −23212.3 + 23212.3i −0.841417 + 0.841417i
\(914\) 24409.8 + 10674.8i 0.883375 + 0.386313i
\(915\) −6956.57 14986.4i −0.251341 0.541458i
\(916\) −25282.8 27342.1i −0.911973 0.986253i
\(917\) 1995.81 + 1995.81i 0.0718727 + 0.0718727i
\(918\) 8307.79 3252.37i 0.298691 0.116933i
\(919\) −17176.1 −0.616527 −0.308263 0.951301i \(-0.599748\pi\)
−0.308263 + 0.951301i \(0.599748\pi\)
\(920\) 19668.9 + 329.918i 0.704851 + 0.0118229i
\(921\) 16287.2 0.582715
\(922\) −25169.9 + 9853.62i −0.899054 + 0.351965i
\(923\) −6370.38 6370.38i −0.227176 0.227176i
\(924\) 1864.60 + 2016.48i 0.0663863 + 0.0717935i
\(925\) −746.555 8888.95i −0.0265368 0.315964i
\(926\) 3351.95 + 1465.85i 0.118954 + 0.0520205i
\(927\) −18192.1 + 18192.1i −0.644561 + 0.644561i
\(928\) 9892.94 3005.27i 0.349948 0.106307i
\(929\) 27097.0i 0.956968i −0.878096 0.478484i \(-0.841186\pi\)
0.878096 0.478484i \(-0.158814\pi\)
\(930\) −32795.1 + 34294.1i −1.15634 + 1.20919i
\(931\) 19362.5i 0.681611i
\(932\) 1500.80 38352.7i 0.0527470 1.34795i
\(933\) −7679.20 + 7679.20i −0.269460 + 0.269460i
\(934\) 868.376 1985.70i 0.0304220 0.0695654i
\(935\) 14064.1 6528.47i 0.491921 0.228346i
\(936\) −42609.6 + 14787.1i −1.48797 + 0.516379i
\(937\) −4000.15 4000.15i −0.139465 0.139465i 0.633927 0.773393i \(-0.281442\pi\)
−0.773393 + 0.633927i \(0.781442\pi\)
\(938\) −1357.52 3467.64i −0.0472545 0.120706i
\(939\) 22127.0 0.768996
\(940\) −16492.5 + 40132.0i −0.572261 + 1.39251i
\(941\) 37957.6 1.31496 0.657482 0.753470i \(-0.271621\pi\)
0.657482 + 0.753470i \(0.271621\pi\)
\(942\) 18026.4 + 46046.3i 0.623495 + 1.59264i
\(943\) −3932.43 3932.43i −0.135798 0.135798i
\(944\) 3691.89 47100.8i 0.127289 1.62394i
\(945\) −381.559 + 1042.68i −0.0131345 + 0.0358926i
\(946\) −2900.37 + 6632.22i −0.0996819 + 0.227941i
\(947\) −13560.7 + 13560.7i −0.465327 + 0.465327i −0.900397 0.435070i \(-0.856724\pi\)
0.435070 + 0.900397i \(0.356724\pi\)
\(948\) −3499.50 136.940i −0.119893 0.00469158i
\(949\) 14621.6i 0.500145i
\(950\) 19036.0 + 6487.66i 0.650115 + 0.221566i
\(951\) 23115.4i 0.788189i
\(952\) 817.726 1686.93i 0.0278389 0.0574305i
\(953\) 15366.0 15366.0i 0.522302 0.522302i −0.395964 0.918266i \(-0.629589\pi\)
0.918266 + 0.395964i \(0.129589\pi\)
\(954\) −30646.0 13401.9i −1.04004 0.454826i
\(955\) 14095.4 38518.2i 0.477607 1.30515i
\(956\) 8424.81 7790.29i 0.285019 0.263552i
\(957\) 8585.10 + 8585.10i 0.289986 + 0.289986i
\(958\) 50984.6 19959.6i 1.71945 0.673138i
\(959\) 283.881 0.00955892
\(960\) 20308.8 40165.7i 0.682776 1.35036i
\(961\) −6630.66 −0.222573
\(962\) 10759.2 4212.05i 0.360593 0.141166i
\(963\) −21424.2 21424.2i −0.716911 0.716911i
\(964\) −37818.6 + 34970.3i −1.26354 + 1.16838i
\(965\) 10254.6 4760.13i 0.342081 0.158792i
\(966\) 2558.87 + 1119.03i 0.0852281 + 0.0372715i
\(967\) 14792.8 14792.8i 0.491939 0.491939i −0.416978 0.908917i \(-0.636911\pi\)
0.908917 + 0.416978i \(0.136911\pi\)
\(968\) −5923.06 + 12219.0i −0.196668 + 0.405717i
\(969\) 22943.1i 0.760619i
\(970\) −36106.9 34528.7i −1.19518 1.14294i
\(971\) 14139.9i 0.467322i 0.972318 + 0.233661i \(0.0750706\pi\)
−0.972318 + 0.233661i \(0.924929\pi\)
\(972\) −41975.6 1642.56i −1.38515 0.0542029i
\(973\) 11.2360 11.2360i 0.000370205 0.000370205i
\(974\) 226.247 517.355i 0.00744294 0.0170196i
\(975\) −42972.5 36313.5i −1.41151 1.19278i
\(976\) −939.980 + 11992.2i −0.0308279 + 0.393299i
\(977\) 2288.77 + 2288.77i 0.0749481 + 0.0749481i 0.743587 0.668639i \(-0.233123\pi\)
−0.668639 + 0.743587i \(0.733123\pi\)
\(978\) 16706.8 + 42675.6i 0.546242 + 1.39531i
\(979\) 4290.15 0.140055
\(980\) −11729.3 28095.5i −0.382324 0.915793i
\(981\) 13889.1 0.452033
\(982\) −958.755 2449.03i −0.0311559 0.0795842i
\(983\) −6757.28 6757.28i −0.219251 0.219251i 0.588932 0.808183i \(-0.299549\pi\)
−0.808183 + 0.588932i \(0.799549\pi\)
\(984\) −12020.8 + 4171.65i −0.389440 + 0.135150i
\(985\) −1817.27 3914.91i −0.0587849 0.126639i
\(986\) 3320.56 7593.06i 0.107250 0.245246i
\(987\) −4355.82 + 4355.82i −0.140473 + 0.140473i
\(988\) −1018.58 + 26029.8i −0.0327990 + 0.838177i
\(989\) 7361.03i 0.236670i
\(990\) 29761.4 664.961i 0.955432 0.0213473i
\(991\) 18118.1i 0.580767i −0.956910 0.290384i \(-0.906217\pi\)
0.956910 0.290384i \(-0.0937829\pi\)
\(992\) 33055.0 10041.4i 1.05796 0.321387i
\(993\) −48002.2 + 48002.2i −1.53404 + 1.53404i
\(994\) 658.690 + 288.055i 0.0210185 + 0.00919169i
\(995\) −47816.1 17497.8i −1.52349 0.557505i
\(996\) 51853.6 + 56077.1i 1.64964 + 1.78401i
\(997\) 18211.2 + 18211.2i 0.578491 + 0.578491i 0.934487 0.355996i \(-0.115858\pi\)
−0.355996 + 0.934487i \(0.615858\pi\)
\(998\) −35626.2 + 13947.1i −1.12999 + 0.442372i
\(999\) −4388.00 −0.138969
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 20.4.e.b.7.2 yes 12
3.2 odd 2 180.4.k.e.127.5 12
4.3 odd 2 inner 20.4.e.b.7.5 yes 12
5.2 odd 4 100.4.e.e.43.2 12
5.3 odd 4 inner 20.4.e.b.3.5 yes 12
5.4 even 2 100.4.e.e.7.5 12
8.3 odd 2 320.4.n.k.127.1 12
8.5 even 2 320.4.n.k.127.6 12
12.11 even 2 180.4.k.e.127.2 12
15.8 even 4 180.4.k.e.163.2 12
20.3 even 4 inner 20.4.e.b.3.2 12
20.7 even 4 100.4.e.e.43.5 12
20.19 odd 2 100.4.e.e.7.2 12
40.3 even 4 320.4.n.k.63.6 12
40.13 odd 4 320.4.n.k.63.1 12
60.23 odd 4 180.4.k.e.163.5 12
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
20.4.e.b.3.2 12 20.3 even 4 inner
20.4.e.b.3.5 yes 12 5.3 odd 4 inner
20.4.e.b.7.2 yes 12 1.1 even 1 trivial
20.4.e.b.7.5 yes 12 4.3 odd 2 inner
100.4.e.e.7.2 12 20.19 odd 2
100.4.e.e.7.5 12 5.4 even 2
100.4.e.e.43.2 12 5.2 odd 4
100.4.e.e.43.5 12 20.7 even 4
180.4.k.e.127.2 12 12.11 even 2
180.4.k.e.127.5 12 3.2 odd 2
180.4.k.e.163.2 12 15.8 even 4
180.4.k.e.163.5 12 60.23 odd 4
320.4.n.k.63.1 12 40.13 odd 4
320.4.n.k.63.6 12 40.3 even 4
320.4.n.k.127.1 12 8.3 odd 2
320.4.n.k.127.6 12 8.5 even 2