Properties

Label 105.4.s.a.26.3
Level $105$
Weight $4$
Character 105.26
Analytic conductor $6.195$
Analytic rank $0$
Dimension $32$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [105,4,Mod(26,105)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(105, base_ring=CyclotomicField(6))
 
chi = DirichletCharacter(H, H._module([3, 0, 5]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("105.26");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 105 = 3 \cdot 5 \cdot 7 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 105.s (of order \(6\), 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: \(6.19520055060\)
Analytic rank: \(0\)
Dimension: \(32\)
Relative dimension: \(16\) over \(\Q(\zeta_{6})\)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{6}]$

Embedding invariants

Embedding label 26.3
Character \(\chi\) \(=\) 105.26
Dual form 105.4.s.a.101.3

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-3.31734 - 1.91526i) q^{2} +(4.42611 + 2.72205i) q^{3} +(3.33648 + 5.77895i) q^{4} +(-2.50000 + 4.33013i) q^{5} +(-9.46943 - 17.5071i) q^{6} +(8.94735 - 16.2156i) q^{7} +5.08329i q^{8} +(12.1808 + 24.0962i) q^{9} +O(q^{10})\) \(q+(-3.31734 - 1.91526i) q^{2} +(4.42611 + 2.72205i) q^{3} +(3.33648 + 5.77895i) q^{4} +(-2.50000 + 4.33013i) q^{5} +(-9.46943 - 17.5071i) q^{6} +(8.94735 - 16.2156i) q^{7} +5.08329i q^{8} +(12.1808 + 24.0962i) q^{9} +(16.5867 - 9.57632i) q^{10} +(-12.9526 + 7.47816i) q^{11} +(-0.963005 + 34.6603i) q^{12} +63.8636i q^{13} +(-60.7385 + 36.6560i) q^{14} +(-22.8521 + 12.3605i) q^{15} +(36.4277 - 63.0946i) q^{16} +(-11.0025 - 19.0569i) q^{17} +(5.74267 - 103.265i) q^{18} +(137.229 + 79.2293i) q^{19} -33.3648 q^{20} +(83.7416 - 47.4167i) q^{21} +57.2906 q^{22} +(162.564 + 93.8566i) q^{23} +(-13.8370 + 22.4992i) q^{24} +(-12.5000 - 21.6506i) q^{25} +(122.316 - 211.857i) q^{26} +(-11.6775 + 139.809i) q^{27} +(123.562 - 2.39660i) q^{28} -179.589i q^{29} +(99.4817 + 2.76401i) q^{30} +(64.0984 - 37.0072i) q^{31} +(-206.467 + 119.204i) q^{32} +(-77.6854 - 2.15842i) q^{33} +84.2908i q^{34} +(47.8471 + 79.2821i) q^{35} +(-98.6096 + 150.789i) q^{36} +(-182.983 + 316.935i) q^{37} +(-303.490 - 525.660i) q^{38} +(-173.840 + 282.667i) q^{39} +(-22.0113 - 12.7082i) q^{40} +168.976 q^{41} +(-368.615 - 3.09031i) q^{42} -60.4265 q^{43} +(-86.4318 - 49.9014i) q^{44} +(-134.792 - 7.49592i) q^{45} +(-359.521 - 622.708i) q^{46} +(-5.05040 + 8.74755i) q^{47} +(332.979 - 180.105i) q^{48} +(-182.890 - 290.173i) q^{49} +95.7632i q^{50} +(3.17564 - 114.297i) q^{51} +(-369.064 + 213.079i) q^{52} +(-467.597 + 269.967i) q^{53} +(306.510 - 441.429i) q^{54} -74.7816i q^{55} +(82.4284 + 45.4820i) q^{56} +(391.724 + 724.222i) q^{57} +(-343.961 + 595.757i) q^{58} +(-165.592 - 286.813i) q^{59} +(-147.676 - 90.8207i) q^{60} +(-15.5603 - 8.98375i) q^{61} -283.515 q^{62} +(499.720 + 18.0779i) q^{63} +330.387 q^{64} +(-276.537 - 159.659i) q^{65} +(253.574 + 155.948i) q^{66} +(-111.665 - 193.410i) q^{67} +(73.4192 - 127.166i) q^{68} +(464.045 + 857.929i) q^{69} +(-6.87870 - 354.645i) q^{70} -563.097i q^{71} +(-122.488 + 61.9187i) q^{72} +(525.173 - 303.209i) q^{73} +(1214.03 - 700.920i) q^{74} +(3.60787 - 129.854i) q^{75} +1057.39i q^{76} +(5.37159 + 276.943i) q^{77} +(1118.07 - 604.751i) q^{78} +(88.0028 - 152.425i) q^{79} +(182.138 + 315.473i) q^{80} +(-432.254 + 587.024i) q^{81} +(-560.551 - 323.634i) q^{82} -635.008 q^{83} +(553.421 + 325.734i) q^{84} +110.025 q^{85} +(200.455 + 115.733i) q^{86} +(488.851 - 794.880i) q^{87} +(-38.0136 - 65.8416i) q^{88} +(388.869 - 673.540i) q^{89} +(432.793 + 283.028i) q^{90} +(1035.58 + 571.410i) q^{91} +1252.60i q^{92} +(384.442 + 10.6814i) q^{93} +(33.5077 - 19.3457i) q^{94} +(-686.146 + 396.146i) q^{95} +(-1238.33 - 34.4058i) q^{96} -1032.16i q^{97} +(50.9485 + 1312.88i) q^{98} +(-337.968 - 221.017i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 32 q - 2 q^{3} + 64 q^{4} - 80 q^{5} - 28 q^{6} + 46 q^{7} + 100 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 32 q - 2 q^{3} + 64 q^{4} - 80 q^{5} - 28 q^{6} + 46 q^{7} + 100 q^{9} + 36 q^{11} + 246 q^{12} + 18 q^{14} + 20 q^{15} - 376 q^{16} - 72 q^{17} - 442 q^{18} - 198 q^{19} - 640 q^{20} - 218 q^{21} + 204 q^{22} + 72 q^{23} - 50 q^{24} - 400 q^{25} - 312 q^{26} + 508 q^{27} + 350 q^{28} + 40 q^{30} + 510 q^{31} + 810 q^{32} + 290 q^{33} - 70 q^{35} - 612 q^{36} - 658 q^{37} - 192 q^{38} - 648 q^{39} - 1404 q^{41} + 1892 q^{42} + 332 q^{43} + 2034 q^{44} - 490 q^{45} - 468 q^{46} + 408 q^{47} + 2810 q^{48} + 980 q^{49} - 888 q^{51} + 3378 q^{52} + 1152 q^{53} + 2714 q^{54} - 3354 q^{56} - 816 q^{57} - 1080 q^{58} - 48 q^{59} - 420 q^{60} - 1662 q^{61} - 2076 q^{62} + 874 q^{63} - 1952 q^{64} + 870 q^{65} - 1892 q^{66} - 1298 q^{67} + 1182 q^{68} + 2450 q^{69} - 450 q^{70} - 2708 q^{72} + 378 q^{73} + 2898 q^{74} - 50 q^{75} - 3528 q^{77} - 1896 q^{78} - 326 q^{79} - 1880 q^{80} - 3308 q^{81} - 2916 q^{82} - 1536 q^{83} + 1380 q^{84} + 720 q^{85} + 5202 q^{86} - 1090 q^{87} + 1668 q^{88} - 1590 q^{89} + 910 q^{90} + 2082 q^{91} - 4950 q^{93} - 1152 q^{94} + 990 q^{95} + 7416 q^{96} - 7830 q^{98} + 3128 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/105\mathbb{Z}\right)^\times\).

\(n\) \(22\) \(31\) \(71\)
\(\chi(n)\) \(1\) \(e\left(\frac{5}{6}\right)\) \(-1\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −3.31734 1.91526i −1.17286 0.677148i −0.218504 0.975836i \(-0.570118\pi\)
−0.954351 + 0.298688i \(0.903451\pi\)
\(3\) 4.42611 + 2.72205i 0.851805 + 0.523860i
\(4\) 3.33648 + 5.77895i 0.417060 + 0.722368i
\(5\) −2.50000 + 4.33013i −0.223607 + 0.387298i
\(6\) −9.46943 17.5071i −0.644313 1.19121i
\(7\) 8.94735 16.2156i 0.483112 0.875559i
\(8\) 5.08329i 0.224652i
\(9\) 12.1808 + 24.0962i 0.451142 + 0.892452i
\(10\) 16.5867 9.57632i 0.524517 0.302830i
\(11\) −12.9526 + 7.47816i −0.355031 + 0.204977i −0.666899 0.745148i \(-0.732379\pi\)
0.311868 + 0.950126i \(0.399045\pi\)
\(12\) −0.963005 + 34.6603i −0.0231663 + 0.833798i
\(13\) 63.8636i 1.36251i 0.732048 + 0.681253i \(0.238564\pi\)
−0.732048 + 0.681253i \(0.761436\pi\)
\(14\) −60.7385 + 36.6560i −1.15950 + 0.699765i
\(15\) −22.8521 + 12.3605i −0.393359 + 0.212764i
\(16\) 36.4277 63.0946i 0.569182 0.985852i
\(17\) −11.0025 19.0569i −0.156970 0.271881i 0.776804 0.629742i \(-0.216839\pi\)
−0.933775 + 0.357861i \(0.883506\pi\)
\(18\) 5.74267 103.265i 0.0751978 1.35221i
\(19\) 137.229 + 79.2293i 1.65697 + 0.956655i 0.974099 + 0.226120i \(0.0726041\pi\)
0.682875 + 0.730535i \(0.260729\pi\)
\(20\) −33.3648 −0.373029
\(21\) 83.7416 47.4167i 0.870187 0.492722i
\(22\) 57.2906 0.555200
\(23\) 162.564 + 93.8566i 1.47378 + 0.850889i 0.999564 0.0295172i \(-0.00939700\pi\)
0.474219 + 0.880407i \(0.342730\pi\)
\(24\) −13.8370 + 22.4992i −0.117686 + 0.191359i
\(25\) −12.5000 21.6506i −0.100000 0.173205i
\(26\) 122.316 211.857i 0.922618 1.59802i
\(27\) −11.6775 + 139.809i −0.0832344 + 0.996530i
\(28\) 123.562 2.39660i 0.833962 0.0161755i
\(29\) 179.589i 1.14996i −0.818167 0.574980i \(-0.805010\pi\)
0.818167 0.574980i \(-0.194990\pi\)
\(30\) 99.4817 + 2.76401i 0.605426 + 0.0168212i
\(31\) 64.0984 37.0072i 0.371368 0.214410i −0.302688 0.953090i \(-0.597884\pi\)
0.674056 + 0.738680i \(0.264551\pi\)
\(32\) −206.467 + 119.204i −1.14058 + 0.658516i
\(33\) −77.6854 2.15842i −0.409796 0.0113858i
\(34\) 84.2908i 0.425169i
\(35\) 47.8471 + 79.2821i 0.231075 + 0.382889i
\(36\) −98.6096 + 150.789i −0.456526 + 0.698097i
\(37\) −182.983 + 316.935i −0.813031 + 1.40821i 0.0977017 + 0.995216i \(0.468851\pi\)
−0.910733 + 0.412996i \(0.864482\pi\)
\(38\) −303.490 525.660i −1.29559 2.24404i
\(39\) −173.840 + 282.667i −0.713761 + 1.16059i
\(40\) −22.0113 12.7082i −0.0870072 0.0502336i
\(41\) 168.976 0.643650 0.321825 0.946799i \(-0.395704\pi\)
0.321825 + 0.946799i \(0.395704\pi\)
\(42\) −368.615 3.09031i −1.35425 0.0113534i
\(43\) −60.4265 −0.214301 −0.107151 0.994243i \(-0.534173\pi\)
−0.107151 + 0.994243i \(0.534173\pi\)
\(44\) −86.4318 49.9014i −0.296138 0.170976i
\(45\) −134.792 7.49592i −0.446524 0.0248317i
\(46\) −359.521 622.708i −1.15236 1.99594i
\(47\) −5.05040 + 8.74755i −0.0156740 + 0.0271481i −0.873756 0.486365i \(-0.838323\pi\)
0.858082 + 0.513513i \(0.171656\pi\)
\(48\) 332.979 180.105i 1.00128 0.541582i
\(49\) −182.890 290.173i −0.533206 0.845985i
\(50\) 95.7632i 0.270859i
\(51\) 3.17564 114.297i 0.00871920 0.313820i
\(52\) −369.064 + 213.079i −0.984231 + 0.568246i
\(53\) −467.597 + 269.967i −1.21188 + 0.699676i −0.963168 0.268902i \(-0.913339\pi\)
−0.248708 + 0.968579i \(0.580006\pi\)
\(54\) 306.510 441.429i 0.772421 1.11242i
\(55\) 74.7816i 0.183337i
\(56\) 82.4284 + 45.4820i 0.196696 + 0.108532i
\(57\) 391.724 + 724.222i 0.910266 + 1.68291i
\(58\) −343.961 + 595.757i −0.778694 + 1.34874i
\(59\) −165.592 286.813i −0.365393 0.632879i 0.623446 0.781866i \(-0.285732\pi\)
−0.988839 + 0.148987i \(0.952399\pi\)
\(60\) −147.676 90.8207i −0.317748 0.195415i
\(61\) −15.5603 8.98375i −0.0326606 0.0188566i 0.483581 0.875300i \(-0.339336\pi\)
−0.516241 + 0.856443i \(0.672669\pi\)
\(62\) −283.515 −0.580748
\(63\) 499.720 + 18.0779i 0.999346 + 0.0361524i
\(64\) 330.387 0.645287
\(65\) −276.537 159.659i −0.527696 0.304665i
\(66\) 253.574 + 155.948i 0.472922 + 0.290847i
\(67\) −111.665 193.410i −0.203613 0.352668i 0.746077 0.665860i \(-0.231935\pi\)
−0.949690 + 0.313192i \(0.898602\pi\)
\(68\) 73.4192 127.166i 0.130932 0.226781i
\(69\) 464.045 + 857.929i 0.809629 + 1.49685i
\(70\) −6.87870 354.645i −0.0117452 0.605546i
\(71\) 563.097i 0.941230i −0.882339 0.470615i \(-0.844032\pi\)
0.882339 0.470615i \(-0.155968\pi\)
\(72\) −122.488 + 61.9187i −0.200491 + 0.101350i
\(73\) 525.173 303.209i 0.842012 0.486136i −0.0159358 0.999873i \(-0.505073\pi\)
0.857948 + 0.513737i \(0.171739\pi\)
\(74\) 1214.03 700.920i 1.90714 1.10109i
\(75\) 3.60787 129.854i 0.00555468 0.199923i
\(76\) 1057.39i 1.59593i
\(77\) 5.37159 + 276.943i 0.00794999 + 0.409878i
\(78\) 1118.07 604.751i 1.62303 0.877880i
\(79\) 88.0028 152.425i 0.125330 0.217078i −0.796532 0.604597i \(-0.793334\pi\)
0.921862 + 0.387518i \(0.126668\pi\)
\(80\) 182.138 + 315.473i 0.254546 + 0.440887i
\(81\) −432.254 + 587.024i −0.592941 + 0.805246i
\(82\) −560.551 323.634i −0.754908 0.435847i
\(83\) −635.008 −0.839773 −0.419887 0.907577i \(-0.637930\pi\)
−0.419887 + 0.907577i \(0.637930\pi\)
\(84\) 553.421 + 325.734i 0.718847 + 0.423101i
\(85\) 110.025 0.140399
\(86\) 200.455 + 115.733i 0.251344 + 0.145114i
\(87\) 488.851 794.880i 0.602418 0.979542i
\(88\) −38.0136 65.8416i −0.0460485 0.0797583i
\(89\) 388.869 673.540i 0.463146 0.802193i −0.535970 0.844237i \(-0.680054\pi\)
0.999116 + 0.0420446i \(0.0133872\pi\)
\(90\) 432.793 + 283.028i 0.506893 + 0.331487i
\(91\) 1035.58 + 571.410i 1.19295 + 0.658242i
\(92\) 1252.60i 1.41949i
\(93\) 384.442 + 10.6814i 0.428654 + 0.0119098i
\(94\) 33.5077 19.3457i 0.0367666 0.0212272i
\(95\) −686.146 + 396.146i −0.741022 + 0.427829i
\(96\) −1238.33 34.4058i −1.31652 0.0365784i
\(97\) 1032.16i 1.08041i −0.841533 0.540206i \(-0.818346\pi\)
0.841533 0.540206i \(-0.181654\pi\)
\(98\) 50.9485 + 1312.88i 0.0525161 + 1.35328i
\(99\) −337.968 221.017i −0.343102 0.224374i
\(100\) 83.4119 144.474i 0.0834119 0.144474i
\(101\) 16.5291 + 28.6292i 0.0162842 + 0.0282050i 0.874053 0.485831i \(-0.161483\pi\)
−0.857768 + 0.514036i \(0.828150\pi\)
\(102\) −229.444 + 373.080i −0.222729 + 0.362161i
\(103\) −814.812 470.432i −0.779474 0.450030i 0.0567697 0.998387i \(-0.481920\pi\)
−0.836244 + 0.548358i \(0.815253\pi\)
\(104\) −324.637 −0.306089
\(105\) −4.03379 + 481.154i −0.00374912 + 0.447198i
\(106\) 2068.23 1.89514
\(107\) 374.880 + 216.437i 0.338701 + 0.195549i 0.659697 0.751531i \(-0.270684\pi\)
−0.320997 + 0.947080i \(0.604018\pi\)
\(108\) −846.912 + 398.987i −0.754576 + 0.355487i
\(109\) −389.652 674.896i −0.342402 0.593058i 0.642476 0.766306i \(-0.277907\pi\)
−0.984878 + 0.173248i \(0.944574\pi\)
\(110\) −143.227 + 248.076i −0.124147 + 0.215028i
\(111\) −1672.62 + 904.700i −1.43025 + 0.773607i
\(112\) −697.183 1155.22i −0.588193 0.974629i
\(113\) 489.634i 0.407619i 0.979011 + 0.203809i \(0.0653323\pi\)
−0.979011 + 0.203809i \(0.934668\pi\)
\(114\) 87.5961 3152.74i 0.0719661 2.59019i
\(115\) −812.822 + 469.283i −0.659096 + 0.380529i
\(116\) 1037.84 599.195i 0.830695 0.479602i
\(117\) −1538.87 + 777.912i −1.21597 + 0.614684i
\(118\) 1268.61i 0.989701i
\(119\) −407.462 + 7.90313i −0.313882 + 0.00608805i
\(120\) −62.8318 116.164i −0.0477978 0.0883688i
\(121\) −553.654 + 958.957i −0.415969 + 0.720479i
\(122\) 34.4125 + 59.6042i 0.0255374 + 0.0442321i
\(123\) 747.907 + 459.962i 0.548264 + 0.337182i
\(124\) 427.726 + 246.948i 0.309765 + 0.178843i
\(125\) 125.000 0.0894427
\(126\) −1623.12 1017.07i −1.14761 0.719107i
\(127\) 435.222 0.304092 0.152046 0.988373i \(-0.451414\pi\)
0.152046 + 0.988373i \(0.451414\pi\)
\(128\) 555.736 + 320.854i 0.383755 + 0.221561i
\(129\) −267.454 164.484i −0.182543 0.112264i
\(130\) 611.578 + 1059.28i 0.412607 + 0.714657i
\(131\) 16.9758 29.4029i 0.0113220 0.0196103i −0.860309 0.509773i \(-0.829729\pi\)
0.871631 + 0.490163i \(0.163063\pi\)
\(132\) −246.722 456.141i −0.162685 0.300773i
\(133\) 2512.59 1516.36i 1.63811 0.988608i
\(134\) 855.474i 0.551505i
\(135\) −576.198 400.088i −0.367343 0.255067i
\(136\) 96.8716 55.9289i 0.0610785 0.0352637i
\(137\) 2721.27 1571.13i 1.69704 0.979784i 0.748488 0.663149i \(-0.230780\pi\)
0.948547 0.316635i \(-0.102553\pi\)
\(138\) 103.768 3734.81i 0.0640097 2.30382i
\(139\) 2399.79i 1.46437i 0.681106 + 0.732185i \(0.261499\pi\)
−0.681106 + 0.732185i \(0.738501\pi\)
\(140\) −298.526 + 541.029i −0.180215 + 0.326609i
\(141\) −46.1649 + 24.9701i −0.0275730 + 0.0149139i
\(142\) −1078.48 + 1867.98i −0.637352 + 1.10393i
\(143\) −477.582 827.196i −0.279283 0.483732i
\(144\) 1964.06 + 109.224i 1.13661 + 0.0632080i
\(145\) 777.643 + 448.973i 0.445378 + 0.257139i
\(146\) −2322.90 −1.31674
\(147\) −19.6229 1782.17i −0.0110100 0.999939i
\(148\) −2442.07 −1.35633
\(149\) 687.647 + 397.013i 0.378082 + 0.218286i 0.676984 0.735998i \(-0.263287\pi\)
−0.298901 + 0.954284i \(0.596620\pi\)
\(150\) −260.673 + 423.858i −0.141892 + 0.230719i
\(151\) −288.851 500.304i −0.155671 0.269630i 0.777632 0.628720i \(-0.216421\pi\)
−0.933303 + 0.359089i \(0.883087\pi\)
\(152\) −402.745 + 697.575i −0.214914 + 0.372242i
\(153\) 325.179 497.247i 0.171825 0.262746i
\(154\) 512.600 929.000i 0.268224 0.486110i
\(155\) 370.072i 0.191774i
\(156\) −2213.53 61.5010i −1.13605 0.0315642i
\(157\) −1228.62 + 709.343i −0.624550 + 0.360584i −0.778638 0.627473i \(-0.784089\pi\)
0.154088 + 0.988057i \(0.450756\pi\)
\(158\) −583.870 + 337.097i −0.293989 + 0.169734i
\(159\) −2804.50 77.9205i −1.39881 0.0388648i
\(160\) 1192.04i 0.588994i
\(161\) 2976.46 1796.31i 1.45701 0.879310i
\(162\) 2558.24 1119.47i 1.24071 0.542928i
\(163\) 1060.60 1837.02i 0.509649 0.882737i −0.490289 0.871560i \(-0.663109\pi\)
0.999938 0.0111775i \(-0.00355797\pi\)
\(164\) 563.785 + 976.505i 0.268440 + 0.464953i
\(165\) 203.560 330.991i 0.0960430 0.156168i
\(166\) 2106.53 + 1216.21i 0.984932 + 0.568651i
\(167\) 2298.28 1.06495 0.532473 0.846447i \(-0.321263\pi\)
0.532473 + 0.846447i \(0.321263\pi\)
\(168\) 241.033 + 425.683i 0.110691 + 0.195489i
\(169\) −1881.56 −0.856421
\(170\) −364.990 210.727i −0.164667 0.0950707i
\(171\) −237.558 + 4271.78i −0.106237 + 1.91036i
\(172\) −201.612 349.202i −0.0893764 0.154804i
\(173\) −602.351 + 1043.30i −0.264716 + 0.458502i −0.967489 0.252912i \(-0.918612\pi\)
0.702773 + 0.711414i \(0.251945\pi\)
\(174\) −3144.09 + 1700.61i −1.36984 + 0.740934i
\(175\) −462.919 + 8.97879i −0.199962 + 0.00387847i
\(176\) 1089.65i 0.466678i
\(177\) 47.7946 1720.21i 0.0202964 0.730504i
\(178\) −2580.02 + 1489.57i −1.08641 + 0.627237i
\(179\) 956.963 552.503i 0.399591 0.230704i −0.286716 0.958015i \(-0.592564\pi\)
0.686308 + 0.727311i \(0.259230\pi\)
\(180\) −406.411 803.964i −0.168289 0.332911i
\(181\) 2923.49i 1.20056i −0.799789 0.600281i \(-0.795056\pi\)
0.799789 0.600281i \(-0.204944\pi\)
\(182\) −2340.98 3878.98i −0.953434 1.57983i
\(183\) −44.4173 82.1191i −0.0179422 0.0331717i
\(184\) −477.100 + 826.362i −0.191154 + 0.331088i
\(185\) −914.913 1584.68i −0.363599 0.629771i
\(186\) −1254.87 771.742i −0.494684 0.304231i
\(187\) 285.021 + 164.557i 0.111459 + 0.0643508i
\(188\) −67.4022 −0.0261479
\(189\) 2162.61 + 1440.28i 0.832309 + 0.554312i
\(190\) 3034.90 1.15881
\(191\) 832.436 + 480.607i 0.315356 + 0.182071i 0.649321 0.760515i \(-0.275053\pi\)
−0.333965 + 0.942586i \(0.608387\pi\)
\(192\) 1462.33 + 899.331i 0.549658 + 0.338040i
\(193\) −590.830 1023.35i −0.220357 0.381669i 0.734560 0.678544i \(-0.237389\pi\)
−0.954916 + 0.296875i \(0.904055\pi\)
\(194\) −1976.86 + 3424.02i −0.731599 + 1.26717i
\(195\) −789.384 1459.42i −0.289892 0.535954i
\(196\) 1066.69 2025.07i 0.388734 0.737998i
\(197\) 3727.40i 1.34805i 0.738708 + 0.674025i \(0.235436\pi\)
−0.738708 + 0.674025i \(0.764564\pi\)
\(198\) 697.848 + 1380.49i 0.250474 + 0.495490i
\(199\) −2229.58 + 1287.25i −0.794225 + 0.458546i −0.841448 0.540339i \(-0.818296\pi\)
0.0472231 + 0.998884i \(0.484963\pi\)
\(200\) 110.056 63.5411i 0.0389108 0.0224652i
\(201\) 32.2299 1160.01i 0.0113100 0.407069i
\(202\) 126.630i 0.0441072i
\(203\) −2912.14 1606.85i −1.00686 0.555559i
\(204\) 671.113 362.998i 0.230330 0.124583i
\(205\) −422.441 + 731.689i −0.143925 + 0.249285i
\(206\) 1802.00 + 3121.16i 0.609474 + 1.05564i
\(207\) −281.417 + 5060.44i −0.0944918 + 1.69915i
\(208\) 4029.44 + 2326.40i 1.34323 + 0.775514i
\(209\) −2369.96 −0.784370
\(210\) 934.918 1588.42i 0.307216 0.521960i
\(211\) −1310.06 −0.427434 −0.213717 0.976896i \(-0.568557\pi\)
−0.213717 + 0.976896i \(0.568557\pi\)
\(212\) −3120.25 1801.48i −1.01085 0.583614i
\(213\) 1532.78 2492.33i 0.493072 0.801744i
\(214\) −829.068 1435.99i −0.264831 0.458701i
\(215\) 151.066 261.654i 0.0479192 0.0829985i
\(216\) −710.691 59.3599i −0.223872 0.0186988i
\(217\) −26.5824 1370.51i −0.00831581 0.428738i
\(218\) 2985.14i 0.927429i
\(219\) 3149.82 + 87.5150i 0.971896 + 0.0270033i
\(220\) 432.159 249.507i 0.132437 0.0764626i
\(221\) 1217.04 702.659i 0.370439 0.213873i
\(222\) 7281.37 + 202.306i 2.20132 + 0.0611617i
\(223\) 1484.59i 0.445809i −0.974840 0.222904i \(-0.928446\pi\)
0.974840 0.222904i \(-0.0715538\pi\)
\(224\) 85.6246 + 4414.55i 0.0255403 + 1.31678i
\(225\) 369.438 564.926i 0.109463 0.167385i
\(226\) 937.779 1624.28i 0.276018 0.478078i
\(227\) −1387.78 2403.71i −0.405773 0.702819i 0.588638 0.808397i \(-0.299664\pi\)
−0.994411 + 0.105577i \(0.966331\pi\)
\(228\) −2878.26 + 4680.11i −0.836042 + 1.35942i
\(229\) −3258.94 1881.55i −0.940422 0.542953i −0.0503294 0.998733i \(-0.516027\pi\)
−0.890093 + 0.455780i \(0.849360\pi\)
\(230\) 3595.21 1.03070
\(231\) −730.078 + 1240.40i −0.207946 + 0.353300i
\(232\) 912.903 0.258341
\(233\) 3132.07 + 1808.30i 0.880640 + 0.508438i 0.870869 0.491515i \(-0.163557\pi\)
0.00977035 + 0.999952i \(0.496890\pi\)
\(234\) 6594.86 + 366.747i 1.84239 + 0.102457i
\(235\) −25.2520 43.7378i −0.00700961 0.0121410i
\(236\) 1104.98 1913.89i 0.304781 0.527897i
\(237\) 804.420 435.103i 0.220476 0.119253i
\(238\) 1366.82 + 754.179i 0.372261 + 0.205404i
\(239\) 4715.60i 1.27626i −0.769928 0.638131i \(-0.779708\pi\)
0.769928 0.638131i \(-0.220292\pi\)
\(240\) −52.5705 + 1892.11i −0.0141392 + 0.508896i
\(241\) 6330.88 3655.14i 1.69215 0.976963i 0.739369 0.673300i \(-0.235124\pi\)
0.952780 0.303662i \(-0.0982095\pi\)
\(242\) 3673.31 2120.79i 0.975742 0.563345i
\(243\) −3511.11 + 1421.61i −0.926906 + 0.375294i
\(244\) 119.896i 0.0314573i
\(245\) 1713.71 66.5033i 0.446877 0.0173418i
\(246\) −1600.11 2958.29i −0.414712 0.766722i
\(247\) −5059.86 + 8763.94i −1.30345 + 2.25764i
\(248\) 188.118 + 325.831i 0.0481675 + 0.0834285i
\(249\) −2810.61 1728.53i −0.715323 0.439923i
\(250\) −414.667 239.408i −0.104903 0.0605660i
\(251\) 2817.02 0.708402 0.354201 0.935169i \(-0.384753\pi\)
0.354201 + 0.935169i \(0.384753\pi\)
\(252\) 1562.83 + 2948.17i 0.390672 + 0.736974i
\(253\) −2807.50 −0.697652
\(254\) −1443.78 833.565i −0.356656 0.205916i
\(255\) 486.982 + 299.494i 0.119592 + 0.0735492i
\(256\) −2550.59 4417.75i −0.622702 1.07855i
\(257\) 1583.48 2742.67i 0.384338 0.665693i −0.607339 0.794443i \(-0.707763\pi\)
0.991677 + 0.128750i \(0.0410965\pi\)
\(258\) 572.204 + 1057.89i 0.138077 + 0.255278i
\(259\) 3502.08 + 5802.90i 0.840187 + 1.39218i
\(260\) 2130.79i 0.508255i
\(261\) 4327.41 2187.55i 1.02628 0.518796i
\(262\) −112.629 + 65.0263i −0.0265581 + 0.0153333i
\(263\) −4281.12 + 2471.71i −1.00375 + 0.579513i −0.909355 0.416022i \(-0.863424\pi\)
−0.0943917 + 0.995535i \(0.530091\pi\)
\(264\) 10.9719 394.897i 0.00255784 0.0920615i
\(265\) 2699.67i 0.625810i
\(266\) −11239.3 + 217.998i −2.59070 + 0.0502493i
\(267\) 3554.59 1922.64i 0.814746 0.440688i
\(268\) 745.137 1290.61i 0.169838 0.294167i
\(269\) −2686.98 4653.99i −0.609026 1.05486i −0.991401 0.130857i \(-0.958227\pi\)
0.382375 0.924007i \(-0.375106\pi\)
\(270\) 1145.17 + 2430.80i 0.258121 + 0.547903i
\(271\) 3808.34 + 2198.74i 0.853653 + 0.492857i 0.861882 0.507109i \(-0.169286\pi\)
−0.00822876 + 0.999966i \(0.502619\pi\)
\(272\) −1603.18 −0.357379
\(273\) 3028.20 + 5348.04i 0.671337 + 1.18563i
\(274\) −12036.5 −2.65384
\(275\) 323.814 + 186.954i 0.0710062 + 0.0409955i
\(276\) −3409.65 + 5544.15i −0.743612 + 1.20913i
\(277\) 1386.56 + 2401.60i 0.300760 + 0.520931i 0.976308 0.216384i \(-0.0694264\pi\)
−0.675548 + 0.737316i \(0.736093\pi\)
\(278\) 4596.23 7960.90i 0.991596 1.71749i
\(279\) 1672.51 + 1093.75i 0.358890 + 0.234699i
\(280\) −403.014 + 243.221i −0.0860167 + 0.0519115i
\(281\) 2638.82i 0.560208i 0.959970 + 0.280104i \(0.0903690\pi\)
−0.959970 + 0.280104i \(0.909631\pi\)
\(282\) 200.969 + 5.58374i 0.0424380 + 0.00117910i
\(283\) −6563.91 + 3789.67i −1.37874 + 0.796017i −0.992008 0.126175i \(-0.959730\pi\)
−0.386733 + 0.922192i \(0.626397\pi\)
\(284\) 3254.11 1878.76i 0.679915 0.392549i
\(285\) −4115.29 114.339i −0.855328 0.0237645i
\(286\) 3658.78i 0.756463i
\(287\) 1511.89 2740.05i 0.310955 0.563553i
\(288\) −5387.31 3523.08i −1.10226 0.720831i
\(289\) 2214.39 3835.44i 0.450721 0.780671i
\(290\) −1719.80 2978.79i −0.348242 0.603174i
\(291\) 2809.60 4568.45i 0.565984 0.920300i
\(292\) 3504.46 + 2023.30i 0.702338 + 0.405495i
\(293\) −116.449 −0.0232186 −0.0116093 0.999933i \(-0.503695\pi\)
−0.0116093 + 0.999933i \(0.503695\pi\)
\(294\) −3348.24 + 5949.65i −0.664194 + 1.18024i
\(295\) 1655.92 0.326817
\(296\) −1611.07 930.153i −0.316357 0.182649i
\(297\) −894.263 1898.21i −0.174715 0.370860i
\(298\) −1520.77 2634.05i −0.295624 0.512036i
\(299\) −5994.02 + 10381.9i −1.15934 + 2.00804i
\(300\) 762.455 412.404i 0.146735 0.0793672i
\(301\) −540.657 + 979.850i −0.103531 + 0.187633i
\(302\) 2212.90i 0.421650i
\(303\) −4.77077 + 171.709i −0.000904533 + 0.0325558i
\(304\) 9997.87 5772.27i 1.88624 1.08902i
\(305\) 77.8016 44.9188i 0.0146062 0.00843292i
\(306\) −2031.09 + 1026.73i −0.379443 + 0.191812i
\(307\) 7885.43i 1.46595i −0.680258 0.732973i \(-0.738132\pi\)
0.680258 0.732973i \(-0.261868\pi\)
\(308\) −1582.52 + 955.056i −0.292767 + 0.176686i
\(309\) −2325.90 4300.15i −0.428207 0.791672i
\(310\) 708.787 1227.65i 0.129859 0.224923i
\(311\) −4926.79 8533.45i −0.898304 1.55591i −0.829662 0.558266i \(-0.811467\pi\)
−0.0686420 0.997641i \(-0.521867\pi\)
\(312\) −1436.88 883.679i −0.260728 0.160348i
\(313\) 4182.59 + 2414.82i 0.755316 + 0.436082i 0.827612 0.561301i \(-0.189699\pi\)
−0.0722952 + 0.997383i \(0.523032\pi\)
\(314\) 5434.32 0.976676
\(315\) −1327.58 + 2118.66i −0.237462 + 0.378961i
\(316\) 1174.48 0.209081
\(317\) −1492.49 861.692i −0.264438 0.152673i 0.361919 0.932209i \(-0.382122\pi\)
−0.626357 + 0.779536i \(0.715455\pi\)
\(318\) 9154.23 + 5629.85i 1.61429 + 0.992787i
\(319\) 1343.00 + 2326.14i 0.235716 + 0.408272i
\(320\) −825.967 + 1430.62i −0.144290 + 0.249918i
\(321\) 1070.10 + 1978.42i 0.186067 + 0.344001i
\(322\) −13314.3 + 258.245i −2.30428 + 0.0446938i
\(323\) 3486.88i 0.600666i
\(324\) −4834.59 539.382i −0.828976 0.0924866i
\(325\) 1382.69 798.295i 0.235993 0.136251i
\(326\) −7036.74 + 4062.67i −1.19549 + 0.690216i
\(327\) 112.465 4047.82i 0.0190193 0.684541i
\(328\) 858.955i 0.144597i
\(329\) 96.6588 + 160.163i 0.0161975 + 0.0268391i
\(330\) −1309.21 + 708.139i −0.218393 + 0.118127i
\(331\) −2957.83 + 5123.10i −0.491168 + 0.850729i −0.999948 0.0101679i \(-0.996763\pi\)
0.508780 + 0.860897i \(0.330097\pi\)
\(332\) −2118.69 3669.68i −0.350235 0.606626i
\(333\) −9865.82 548.649i −1.62355 0.0902876i
\(334\) −7624.15 4401.81i −1.24903 0.721126i
\(335\) 1116.65 0.182117
\(336\) 58.7765 7010.92i 0.00954322 1.13832i
\(337\) 10105.7 1.63350 0.816752 0.576989i \(-0.195773\pi\)
0.816752 + 0.576989i \(0.195773\pi\)
\(338\) 6241.75 + 3603.68i 1.00446 + 0.579924i
\(339\) −1332.81 + 2167.17i −0.213535 + 0.347212i
\(340\) 367.096 + 635.829i 0.0585546 + 0.101420i
\(341\) −553.492 + 958.677i −0.0878982 + 0.152244i
\(342\) 8969.65 13715.9i 1.41820 2.16864i
\(343\) −6341.70 + 369.382i −0.998308 + 0.0581479i
\(344\) 307.165i 0.0481431i
\(345\) −4875.05 135.449i −0.760765 0.0211372i
\(346\) 3996.40 2307.32i 0.620947 0.358504i
\(347\) −7526.30 + 4345.31i −1.16436 + 0.672244i −0.952345 0.305023i \(-0.901336\pi\)
−0.212015 + 0.977266i \(0.568003\pi\)
\(348\) 6224.61 + 172.945i 0.958834 + 0.0266403i
\(349\) 1429.22i 0.219210i 0.993975 + 0.109605i \(0.0349586\pi\)
−0.993975 + 0.109605i \(0.965041\pi\)
\(350\) 1552.86 + 856.828i 0.237153 + 0.130855i
\(351\) −8928.72 745.765i −1.35778 0.113407i
\(352\) 1782.85 3087.99i 0.269962 0.467587i
\(353\) −4132.48 7157.66i −0.623087 1.07922i −0.988907 0.148533i \(-0.952545\pi\)
0.365821 0.930685i \(-0.380788\pi\)
\(354\) −3453.22 + 5614.99i −0.518464 + 0.843032i
\(355\) 2438.28 + 1407.74i 0.364537 + 0.210465i
\(356\) 5189.81 0.772638
\(357\) −1824.98 1074.15i −0.270555 0.159244i
\(358\) −4232.76 −0.624883
\(359\) 256.265 + 147.955i 0.0376745 + 0.0217514i 0.518719 0.854945i \(-0.326409\pi\)
−0.481044 + 0.876696i \(0.659742\pi\)
\(360\) 38.1039 685.185i 0.00557848 0.100312i
\(361\) 9125.06 + 15805.1i 1.33038 + 2.30428i
\(362\) −5599.26 + 9698.21i −0.812958 + 1.40808i
\(363\) −5060.87 + 2737.37i −0.731754 + 0.395798i
\(364\) 153.056 + 7891.09i 0.0220393 + 1.13628i
\(365\) 3032.09i 0.434813i
\(366\) −9.93246 + 357.487i −0.00141852 + 0.0510551i
\(367\) −2372.36 + 1369.68i −0.337428 + 0.194814i −0.659134 0.752025i \(-0.729077\pi\)
0.321706 + 0.946840i \(0.395744\pi\)
\(368\) 11843.7 6837.95i 1.67770 0.968622i
\(369\) 2058.27 + 4071.69i 0.290378 + 0.574427i
\(370\) 7009.20i 0.984841i
\(371\) 193.918 + 9997.85i 0.0271368 + 1.39909i
\(372\) 1220.96 + 2257.31i 0.170171 + 0.314613i
\(373\) 3659.18 6337.88i 0.507949 0.879793i −0.492009 0.870590i \(-0.663737\pi\)
0.999958 0.00920295i \(-0.00292943\pi\)
\(374\) −630.340 1091.78i −0.0871500 0.150948i
\(375\) 553.263 + 340.257i 0.0761877 + 0.0468554i
\(376\) −44.4663 25.6726i −0.00609887 0.00352118i
\(377\) 11469.2 1.56683
\(378\) −4415.57 8919.85i −0.600827 1.21372i
\(379\) 6215.46 0.842392 0.421196 0.906970i \(-0.361610\pi\)
0.421196 + 0.906970i \(0.361610\pi\)
\(380\) −4578.62 2643.47i −0.618100 0.356860i
\(381\) 1926.34 + 1184.70i 0.259027 + 0.159302i
\(382\) −1840.98 3188.67i −0.246578 0.427085i
\(383\) 3384.88 5862.78i 0.451590 0.782177i −0.546895 0.837201i \(-0.684190\pi\)
0.998485 + 0.0550240i \(0.0175235\pi\)
\(384\) 1586.36 + 2932.88i 0.210817 + 0.389760i
\(385\) −1212.63 669.098i −0.160523 0.0885724i
\(386\) 4526.38i 0.596857i
\(387\) −736.046 1456.05i −0.0966804 0.191254i
\(388\) 5964.80 3443.78i 0.780456 0.450596i
\(389\) 6822.93 3939.22i 0.889297 0.513436i 0.0155842 0.999879i \(-0.495039\pi\)
0.873712 + 0.486443i \(0.161706\pi\)
\(390\) −176.519 + 6353.26i −0.0229190 + 0.824896i
\(391\) 4130.63i 0.534258i
\(392\) 1475.03 929.681i 0.190052 0.119786i
\(393\) 155.173 83.9315i 0.0199172 0.0107730i
\(394\) 7138.95 12365.0i 0.912830 1.58107i
\(395\) 440.014 + 762.127i 0.0560494 + 0.0970804i
\(396\) 149.623 2690.52i 0.0189869 0.341424i
\(397\) −6608.87 3815.63i −0.835490 0.482370i 0.0202386 0.999795i \(-0.493557\pi\)
−0.855729 + 0.517425i \(0.826891\pi\)
\(398\) 9861.68 1.24201
\(399\) 15248.6 + 127.838i 1.91324 + 0.0160398i
\(400\) −1821.38 −0.227673
\(401\) 13358.9 + 7712.79i 1.66363 + 0.960495i 0.970962 + 0.239234i \(0.0768963\pi\)
0.692664 + 0.721261i \(0.256437\pi\)
\(402\) −2328.65 + 3786.42i −0.288911 + 0.469774i
\(403\) 2363.41 + 4093.55i 0.292134 + 0.505991i
\(404\) −110.298 + 191.041i −0.0135829 + 0.0235264i
\(405\) −1461.25 3339.28i −0.179285 0.409704i
\(406\) 6583.01 + 10908.0i 0.804702 + 1.33338i
\(407\) 5473.49i 0.666612i
\(408\) 581.006 + 16.1427i 0.0705002 + 0.00195878i
\(409\) 157.429 90.8918i 0.0190327 0.0109885i −0.490453 0.871467i \(-0.663169\pi\)
0.509486 + 0.860479i \(0.329836\pi\)
\(410\) 2802.75 1618.17i 0.337605 0.194917i
\(411\) 16321.3 + 453.473i 1.95881 + 0.0544238i
\(412\) 6278.34i 0.750757i
\(413\) −6132.44 + 118.945i −0.730649 + 0.0141717i
\(414\) 10625.6 16248.2i 1.26140 1.92888i
\(415\) 1587.52 2749.66i 0.187779 0.325243i
\(416\) −7612.80 13185.8i −0.897231 1.55405i
\(417\) −6532.36 + 10621.7i −0.767124 + 1.24736i
\(418\) 7861.94 + 4539.10i 0.919953 + 0.531135i
\(419\) −7479.61 −0.872084 −0.436042 0.899926i \(-0.643620\pi\)
−0.436042 + 0.899926i \(0.643620\pi\)
\(420\) −2794.02 + 1582.05i −0.324605 + 0.183800i
\(421\) −9069.56 −1.04994 −0.524968 0.851122i \(-0.675923\pi\)
−0.524968 + 0.851122i \(0.675923\pi\)
\(422\) 4345.92 + 2509.12i 0.501318 + 0.289436i
\(423\) −272.301 15.1430i −0.0312996 0.00174060i
\(424\) −1372.32 2376.93i −0.157184 0.272250i
\(425\) −275.062 + 476.422i −0.0313941 + 0.0543762i
\(426\) −9858.21 + 5332.20i −1.12120 + 0.606446i
\(427\) −284.900 + 171.939i −0.0322887 + 0.0194864i
\(428\) 2888.55i 0.326222i
\(429\) 137.844 4961.26i 0.0155132 0.558350i
\(430\) −1002.27 + 578.664i −0.112405 + 0.0648968i
\(431\) −7258.46 + 4190.67i −0.811201 + 0.468347i −0.847373 0.530998i \(-0.821817\pi\)
0.0361715 + 0.999346i \(0.488484\pi\)
\(432\) 8395.82 + 5829.71i 0.935056 + 0.649264i
\(433\) 5640.66i 0.626034i −0.949747 0.313017i \(-0.898660\pi\)
0.949747 0.313017i \(-0.101340\pi\)
\(434\) −2536.71 + 4597.35i −0.280566 + 0.508479i
\(435\) 2219.80 + 4103.99i 0.244670 + 0.452348i
\(436\) 2600.13 4503.55i 0.285604 0.494681i
\(437\) 14872.4 + 25759.7i 1.62802 + 2.81980i
\(438\) −10281.4 6323.06i −1.12161 0.689789i
\(439\) 1828.10 + 1055.45i 0.198748 + 0.114747i 0.596071 0.802931i \(-0.296727\pi\)
−0.397323 + 0.917679i \(0.630061\pi\)
\(440\) 380.136 0.0411870
\(441\) 4764.32 7941.50i 0.514449 0.857521i
\(442\) −5383.11 −0.579295
\(443\) 825.998 + 476.890i 0.0885877 + 0.0511462i 0.543639 0.839319i \(-0.317046\pi\)
−0.455052 + 0.890465i \(0.650379\pi\)
\(444\) −10808.9 6647.44i −1.15533 0.710526i
\(445\) 1944.34 + 3367.70i 0.207125 + 0.358751i
\(446\) −2843.38 + 4924.88i −0.301879 + 0.522869i
\(447\) 1962.91 + 3629.04i 0.207701 + 0.383999i
\(448\) 2956.09 5357.41i 0.311745 0.564986i
\(449\) 3666.11i 0.385332i −0.981264 0.192666i \(-0.938287\pi\)
0.981264 0.192666i \(-0.0617135\pi\)
\(450\) −2307.53 + 1166.48i −0.241729 + 0.122196i
\(451\) −2188.67 + 1263.63i −0.228516 + 0.131934i
\(452\) −2829.57 + 1633.65i −0.294451 + 0.170001i
\(453\) 83.3708 3000.67i 0.00864702 0.311222i
\(454\) 10631.9i 1.09907i
\(455\) −5063.24 + 3055.69i −0.521689 + 0.314841i
\(456\) −3681.43 + 1991.25i −0.378068 + 0.204493i
\(457\) −4313.23 + 7470.73i −0.441497 + 0.764696i −0.997801 0.0662833i \(-0.978886\pi\)
0.556303 + 0.830979i \(0.312219\pi\)
\(458\) 7207.33 + 12483.5i 0.735319 + 1.27361i
\(459\) 2792.81 1315.72i 0.284003 0.133796i
\(460\) −5423.92 3131.50i −0.549765 0.317407i
\(461\) −7189.28 −0.726330 −0.363165 0.931725i \(-0.618304\pi\)
−0.363165 + 0.931725i \(0.618304\pi\)
\(462\) 4797.61 2716.53i 0.483128 0.273559i
\(463\) −2282.41 −0.229099 −0.114549 0.993418i \(-0.536542\pi\)
−0.114549 + 0.993418i \(0.536542\pi\)
\(464\) −11331.1 6542.01i −1.13369 0.654537i
\(465\) −1007.36 + 1637.98i −0.100463 + 0.163354i
\(466\) −6926.76 11997.5i −0.688575 1.19265i
\(467\) −3228.56 + 5592.04i −0.319915 + 0.554108i −0.980470 0.196669i \(-0.936988\pi\)
0.660555 + 0.750777i \(0.270321\pi\)
\(468\) −9629.92 6297.56i −0.951160 0.622019i
\(469\) −4135.36 + 80.2094i −0.407150 + 0.00789707i
\(470\) 193.457i 0.0189862i
\(471\) −7368.86 204.737i −0.720890 0.0200293i
\(472\) 1457.95 841.750i 0.142177 0.0820862i
\(473\) 782.677 451.879i 0.0760836 0.0439269i
\(474\) −3501.87 97.2962i −0.339338 0.00942819i
\(475\) 3961.46i 0.382662i
\(476\) −1405.16 2328.33i −0.135305 0.224199i
\(477\) −12200.9 7978.88i −1.17116 0.765887i
\(478\) −9031.62 + 15643.2i −0.864219 + 1.49687i
\(479\) 6881.73 + 11919.5i 0.656439 + 1.13699i 0.981531 + 0.191303i \(0.0612715\pi\)
−0.325092 + 0.945682i \(0.605395\pi\)
\(480\) 3244.80 5276.10i 0.308550 0.501708i
\(481\) −20240.6 11685.9i −1.91870 1.10776i
\(482\) −28002.2 −2.64619
\(483\) 18063.8 + 151.439i 1.70172 + 0.0142665i
\(484\) −7389.02 −0.693935
\(485\) 4469.38 + 2580.40i 0.418442 + 0.241587i
\(486\) 14370.3 + 2008.75i 1.34126 + 0.187487i
\(487\) −3315.76 5743.07i −0.308525 0.534380i 0.669515 0.742798i \(-0.266502\pi\)
−0.978040 + 0.208418i \(0.933169\pi\)
\(488\) 45.6670 79.0975i 0.00423616 0.00733725i
\(489\) 9694.79 5243.81i 0.896552 0.484936i
\(490\) −5812.32 3061.59i −0.535865 0.282263i
\(491\) 1848.57i 0.169908i −0.996385 0.0849540i \(-0.972926\pi\)
0.996385 0.0849540i \(-0.0270743\pi\)
\(492\) −162.725 + 5856.77i −0.0149110 + 0.536674i
\(493\) −3422.41 + 1975.93i −0.312652 + 0.180510i
\(494\) 33570.5 19382.0i 3.05751 1.76525i
\(495\) 1801.95 910.903i 0.163620 0.0827112i
\(496\) 5392.35i 0.488152i
\(497\) −9130.94 5038.23i −0.824102 0.454719i
\(498\) 6013.16 + 11117.2i 0.541077 + 1.00035i
\(499\) 6454.39 11179.3i 0.579034 1.00292i −0.416556 0.909110i \(-0.636763\pi\)
0.995590 0.0938066i \(-0.0299035\pi\)
\(500\) 417.060 + 722.368i 0.0373029 + 0.0646106i
\(501\) 10172.4 + 6256.03i 0.907126 + 0.557882i
\(502\) −9345.00 5395.34i −0.830853 0.479693i
\(503\) −16082.5 −1.42562 −0.712808 0.701359i \(-0.752577\pi\)
−0.712808 + 0.701359i \(0.752577\pi\)
\(504\) −91.8953 + 2540.22i −0.00812171 + 0.224505i
\(505\) −165.291 −0.0145650
\(506\) 9313.42 + 5377.10i 0.818245 + 0.472414i
\(507\) −8327.97 5121.70i −0.729503 0.448644i
\(508\) 1452.11 + 2515.13i 0.126825 + 0.219667i
\(509\) 4553.38 7886.69i 0.396513 0.686781i −0.596780 0.802405i \(-0.703554\pi\)
0.993293 + 0.115624i \(0.0368869\pi\)
\(510\) −1041.87 1926.22i −0.0904607 0.167244i
\(511\) −217.796 11228.9i −0.0188546 0.972089i
\(512\) 14406.5i 1.24353i
\(513\) −12679.5 + 18260.7i −1.09125 + 1.57160i
\(514\) −10505.9 + 6065.57i −0.901545 + 0.520507i
\(515\) 4074.06 2352.16i 0.348591 0.201259i
\(516\) 58.1910 2094.40i 0.00496457 0.178684i
\(517\) 151.071i 0.0128512i
\(518\) −503.473 25957.6i −0.0427053 2.20176i
\(519\) −5505.99 + 2978.14i −0.465677 + 0.251880i
\(520\) 811.592 1405.72i 0.0684436 0.118548i
\(521\) −2366.98 4099.73i −0.199039 0.344745i 0.749178 0.662368i \(-0.230449\pi\)
−0.948217 + 0.317623i \(0.897115\pi\)
\(522\) −18545.2 1031.32i −1.55498 0.0864744i
\(523\) −1342.45 775.065i −0.112240 0.0648016i 0.442829 0.896606i \(-0.353975\pi\)
−0.555069 + 0.831804i \(0.687308\pi\)
\(524\) 226.557 0.0188878
\(525\) −2073.37 1220.35i −0.172361 0.101449i
\(526\) 18935.9 1.56967
\(527\) −1410.49 814.344i −0.116588 0.0673119i
\(528\) −2966.08 + 4822.90i −0.244474 + 0.397518i
\(529\) 11534.6 + 19978.6i 0.948026 + 1.64203i
\(530\) −5170.59 + 8955.72i −0.423766 + 0.733984i
\(531\) 4894.06 7483.75i 0.399970 0.611614i
\(532\) 17146.1 + 9460.81i 1.39733 + 0.771012i
\(533\) 10791.4i 0.876977i
\(534\) −15474.1 429.935i −1.25399 0.0348410i
\(535\) −1874.40 + 1082.18i −0.151472 + 0.0874522i
\(536\) 983.158 567.626i 0.0792275 0.0457420i
\(537\) 5739.57 + 159.469i 0.461230 + 0.0128149i
\(538\) 20585.1i 1.64960i
\(539\) 4538.85 + 2390.80i 0.362713 + 0.191056i
\(540\) 389.616 4664.70i 0.0310489 0.371735i
\(541\) −4421.27 + 7657.86i −0.351359 + 0.608571i −0.986488 0.163835i \(-0.947614\pi\)
0.635129 + 0.772406i \(0.280947\pi\)
\(542\) −8422.35 14587.9i −0.667474 1.15610i
\(543\) 7957.91 12939.7i 0.628926 1.02264i
\(544\) 4543.32 + 2623.08i 0.358076 + 0.206735i
\(545\) 3896.52 0.306254
\(546\) 197.358 23541.0i 0.0154691 1.84517i
\(547\) 14918.7 1.16614 0.583068 0.812423i \(-0.301852\pi\)
0.583068 + 0.812423i \(0.301852\pi\)
\(548\) 18158.9 + 10484.1i 1.41553 + 0.817256i
\(549\) 26.9366 484.374i 0.00209404 0.0376550i
\(550\) −716.133 1240.38i −0.0555200 0.0961635i
\(551\) 14228.7 24644.8i 1.10012 1.90546i
\(552\) −4361.10 + 2358.87i −0.336269 + 0.181885i
\(553\) −1684.27 2790.82i −0.129516 0.214607i
\(554\) 10622.5i 0.814636i
\(555\) 264.071 9504.39i 0.0201967 0.726917i
\(556\) −13868.3 + 8006.84i −1.05781 + 0.610730i
\(557\) 15459.3 8925.46i 1.17600 0.678966i 0.220916 0.975293i \(-0.429095\pi\)
0.955087 + 0.296327i \(0.0957618\pi\)
\(558\) −3453.45 6831.63i −0.262000 0.518290i
\(559\) 3859.05i 0.291987i
\(560\) 6745.23 130.830i 0.508996 0.00987249i
\(561\) 813.600 + 1504.19i 0.0612304 + 0.113203i
\(562\) 5054.03 8753.84i 0.379344 0.657043i
\(563\) 2584.61 + 4476.68i 0.193478 + 0.335114i 0.946401 0.322995i \(-0.104690\pi\)
−0.752922 + 0.658109i \(0.771356\pi\)
\(564\) −298.329 183.472i −0.0222729 0.0136978i
\(565\) −2120.18 1224.09i −0.157870 0.0911463i
\(566\) 29032.9 2.15609
\(567\) 5651.40 + 12261.6i 0.418583 + 0.908179i
\(568\) 2862.38 0.211449
\(569\) −16171.2 9336.43i −1.19144 0.687880i −0.232809 0.972522i \(-0.574792\pi\)
−0.958634 + 0.284643i \(0.908125\pi\)
\(570\) 13432.8 + 8261.16i 0.987084 + 0.607056i
\(571\) 1206.49 + 2089.71i 0.0884242 + 0.153155i 0.906845 0.421464i \(-0.138484\pi\)
−0.818421 + 0.574619i \(0.805150\pi\)
\(572\) 3186.88 5519.84i 0.232955 0.403490i
\(573\) 2376.21 + 4393.15i 0.173242 + 0.320291i
\(574\) −10263.4 + 6193.99i −0.746314 + 0.450404i
\(575\) 4692.83i 0.340356i
\(576\) 4024.39 + 7961.07i 0.291116 + 0.575887i
\(577\) −13459.4 + 7770.80i −0.971097 + 0.560663i −0.899570 0.436776i \(-0.856120\pi\)
−0.0715262 + 0.997439i \(0.522787\pi\)
\(578\) −14691.7 + 8482.29i −1.05726 + 0.610409i
\(579\) 170.531 6137.71i 0.0122401 0.440543i
\(580\) 5991.95i 0.428969i
\(581\) −5681.64 + 10297.0i −0.405704 + 0.735271i
\(582\) −18070.2 + 9773.97i −1.28700 + 0.696124i
\(583\) 4037.72 6993.53i 0.286836 0.496814i
\(584\) 1541.30 + 2669.61i 0.109211 + 0.189159i
\(585\) 478.716 8608.28i 0.0338333 0.608391i
\(586\) 386.302 + 223.032i 0.0272321 + 0.0157224i
\(587\) −998.851 −0.0702334 −0.0351167 0.999383i \(-0.511180\pi\)
−0.0351167 + 0.999383i \(0.511180\pi\)
\(588\) 10233.6 6059.58i 0.717733 0.424988i
\(589\) 11728.2 0.820464
\(590\) −5493.23 3171.52i −0.383310 0.221304i
\(591\) −10146.2 + 16497.9i −0.706189 + 1.14828i
\(592\) 13331.3 + 23090.4i 0.925526 + 1.60306i
\(593\) −1608.16 + 2785.42i −0.111365 + 0.192889i −0.916321 0.400445i \(-0.868855\pi\)
0.804956 + 0.593334i \(0.202189\pi\)
\(594\) −669.010 + 8009.76i −0.0462118 + 0.553274i
\(595\) 984.433 1784.12i 0.0678282 0.122927i
\(596\) 5298.50i 0.364153i
\(597\) −13372.3 371.538i −0.916738 0.0254707i
\(598\) 39768.3 22960.3i 2.71948 1.57009i
\(599\) −14726.7 + 8502.49i −1.00454 + 0.579970i −0.909588 0.415512i \(-0.863603\pi\)
−0.0949504 + 0.995482i \(0.530269\pi\)
\(600\) 660.084 + 18.3398i 0.0449130 + 0.00124787i
\(601\) 19431.1i 1.31882i −0.751782 0.659412i \(-0.770805\pi\)
0.751782 0.659412i \(-0.229195\pi\)
\(602\) 3670.21 2214.99i 0.248483 0.149961i
\(603\) 3300.27 5046.60i 0.222881 0.340818i
\(604\) 1927.49 3338.51i 0.129848 0.224904i
\(605\) −2768.27 4794.79i −0.186027 0.322208i
\(606\) 344.694 560.478i 0.0231060 0.0375707i
\(607\) −6767.31 3907.11i −0.452515 0.261260i 0.256377 0.966577i \(-0.417471\pi\)
−0.708892 + 0.705317i \(0.750805\pi\)
\(608\) −37777.8 −2.51989
\(609\) −8515.52 15039.1i −0.566611 1.00068i
\(610\) −344.125 −0.0228413
\(611\) −558.650 322.537i −0.0369894 0.0213559i
\(612\) 3958.52 + 220.138i 0.261460 + 0.0145401i
\(613\) −9304.17 16115.3i −0.613038 1.06181i −0.990725 0.135879i \(-0.956614\pi\)
0.377688 0.925933i \(-0.376719\pi\)
\(614\) −15102.7 + 26158.6i −0.992663 + 1.71934i
\(615\) −3861.46 + 2088.63i −0.253186 + 0.136946i
\(616\) −1407.78 + 27.3053i −0.0920797 + 0.00178598i
\(617\) 25699.5i 1.67686i 0.545011 + 0.838429i \(0.316525\pi\)
−0.545011 + 0.838429i \(0.683475\pi\)
\(618\) −520.111 + 18719.8i −0.0338543 + 1.21848i
\(619\) 2647.00 1528.25i 0.171877 0.0992334i −0.411593 0.911368i \(-0.635028\pi\)
0.583471 + 0.812134i \(0.301694\pi\)
\(620\) −2138.63 + 1234.74i −0.138531 + 0.0799811i
\(621\) −15020.4 + 21632.0i −0.970606 + 1.39785i
\(622\) 37744.4i 2.43314i
\(623\) −7442.50 12332.1i −0.478615 0.793060i
\(624\) 11502.2 + 21265.3i 0.737909 + 1.36425i
\(625\) −312.500 + 541.266i −0.0200000 + 0.0346410i
\(626\) −9250.04 16021.5i −0.590585 1.02292i
\(627\) −10489.7 6451.15i −0.668130 0.410900i
\(628\) −8198.51 4733.41i −0.520949 0.300770i
\(629\) 8053.06 0.510488
\(630\) 8461.82 4485.63i 0.535122 0.283669i
\(631\) 4012.52 0.253147 0.126574 0.991957i \(-0.459602\pi\)
0.126574 + 0.991957i \(0.459602\pi\)
\(632\) 774.822 + 447.344i 0.0487670 + 0.0281557i
\(633\) −5798.48 3566.06i −0.364090 0.223915i
\(634\) 3300.74 + 5717.04i 0.206765 + 0.358127i
\(635\) −1088.06 + 1884.57i −0.0679971 + 0.117774i
\(636\) −8906.85 16467.0i −0.555314 1.02667i
\(637\) 18531.5 11680.0i 1.15266 0.726496i
\(638\) 10288.8i 0.638458i
\(639\) 13568.5 6858.99i 0.840002 0.424628i
\(640\) −2778.68 + 1604.27i −0.171620 + 0.0990850i
\(641\) −15938.5 + 9202.09i −0.982110 + 0.567021i −0.902906 0.429837i \(-0.858571\pi\)
−0.0792033 + 0.996858i \(0.525238\pi\)
\(642\) 239.293 8612.60i 0.0147105 0.529458i
\(643\) 18685.2i 1.14599i −0.819558 0.572996i \(-0.805781\pi\)
0.819558 0.572996i \(-0.194219\pi\)
\(644\) 20311.7 + 11207.5i 1.24284 + 0.685771i
\(645\) 1380.87 746.900i 0.0842974 0.0455956i
\(646\) −6678.30 + 11567.2i −0.406740 + 0.704495i
\(647\) −106.007 183.609i −0.00644134 0.0111567i 0.862787 0.505568i \(-0.168717\pi\)
−0.869228 + 0.494411i \(0.835384\pi\)
\(648\) −2984.01 2197.27i −0.180900 0.133205i
\(649\) 4289.67 + 2476.64i 0.259452 + 0.149795i
\(650\) −6115.78 −0.369047
\(651\) 3612.94 6138.38i 0.217515 0.369558i
\(652\) 14154.7 0.850216
\(653\) −888.276 512.847i −0.0532327 0.0307339i 0.473147 0.880983i \(-0.343118\pi\)
−0.526380 + 0.850249i \(0.676451\pi\)
\(654\) −8125.72 + 13212.6i −0.485842 + 0.789988i
\(655\) 84.8790 + 147.015i 0.00506335 + 0.00876998i
\(656\) 6155.41 10661.5i 0.366354 0.634544i
\(657\) 13703.2 + 8961.34i 0.813720 + 0.532139i
\(658\) −13.8961 716.440i −0.000823291 0.0424464i
\(659\) 16866.8i 0.997024i 0.866883 + 0.498512i \(0.166120\pi\)
−0.866883 + 0.498512i \(0.833880\pi\)
\(660\) 2591.95 + 72.0151i 0.152866 + 0.00424725i
\(661\) 1890.14 1091.27i 0.111222 0.0642141i −0.443357 0.896345i \(-0.646213\pi\)
0.554579 + 0.832131i \(0.312879\pi\)
\(662\) 19624.2 11330.0i 1.15214 0.665188i
\(663\) 7299.43 + 202.808i 0.427581 + 0.0118800i
\(664\) 3227.93i 0.188656i
\(665\) 284.553 + 14670.7i 0.0165932 + 0.855497i
\(666\) 31677.4 + 20715.7i 1.84306 + 1.20528i
\(667\) 16855.6 29194.8i 0.978489 1.69479i
\(668\) 7668.14 + 13281.6i 0.444146 + 0.769283i
\(669\) 4041.13 6570.94i 0.233541 0.379742i
\(670\) −3704.31 2138.68i −0.213597 0.123320i
\(671\) 268.728 0.0154607
\(672\) −11637.7 + 19772.3i −0.668054 + 1.13502i
\(673\) 15734.2 0.901203 0.450601 0.892725i \(-0.351210\pi\)
0.450601 + 0.892725i \(0.351210\pi\)
\(674\) −33523.9 19355.0i −1.91586 1.10612i
\(675\) 3172.93 1494.79i 0.180928 0.0852364i
\(676\) −6277.77 10873.4i −0.357178 0.618651i
\(677\) 12363.2 21413.8i 0.701858 1.21565i −0.265955 0.963985i \(-0.585687\pi\)
0.967813 0.251669i \(-0.0809793\pi\)
\(678\) 8572.09 4636.56i 0.485559 0.262634i
\(679\) −16737.1 9235.10i −0.945964 0.521960i
\(680\) 559.289i 0.0315408i
\(681\) 400.555 14416.7i 0.0225394 0.811232i
\(682\) 3672.24 2120.17i 0.206184 0.119040i
\(683\) −561.677 + 324.284i −0.0314670 + 0.0181675i −0.515651 0.856799i \(-0.672450\pi\)
0.484184 + 0.874966i \(0.339117\pi\)
\(684\) −25479.0 + 12879.9i −1.42429 + 0.719991i
\(685\) 15711.3i 0.876345i
\(686\) 21745.0 + 10920.7i 1.21025 + 0.607803i
\(687\) −9302.73 17198.9i −0.516625 0.955139i
\(688\) −2201.20 + 3812.58i −0.121976 + 0.211269i
\(689\) −17241.1 29862.4i −0.953313 1.65119i
\(690\) 15912.8 + 9786.34i 0.877954 + 0.539942i
\(691\) 5917.06 + 3416.22i 0.325754 + 0.188074i 0.653954 0.756534i \(-0.273109\pi\)
−0.328201 + 0.944608i \(0.606442\pi\)
\(692\) −8038.92 −0.441610
\(693\) −6607.84 + 3502.83i −0.362209 + 0.192008i
\(694\) 33289.7 1.82084
\(695\) −10391.4 5999.47i −0.567148 0.327443i
\(696\) 4040.61 + 2484.97i 0.220056 + 0.135334i
\(697\) −1859.16 3220.16i −0.101034 0.174996i
\(698\) 2737.33 4741.20i 0.148438 0.257102i
\(699\) 8940.59 + 16529.4i 0.483783 + 0.894421i
\(700\) −1596.41 2645.23i −0.0861979 0.142829i
\(701\) 18697.9i 1.00743i −0.863869 0.503717i \(-0.831965\pi\)
0.863869 0.503717i \(-0.168035\pi\)
\(702\) 28191.2 + 19574.8i 1.51568 + 1.05243i
\(703\) −50221.1 + 28995.2i −2.69434 + 1.55558i
\(704\) −4279.35 + 2470.69i −0.229097 + 0.132269i
\(705\) 7.28847 262.325i 0.000389361 0.0140138i
\(706\) 31659.2i 1.68769i
\(707\) 612.130 11.8729i 0.0325622 0.000631577i
\(708\) 10100.5 5463.25i 0.536158 0.290002i
\(709\) −6566.08 + 11372.8i −0.347806 + 0.602417i −0.985859 0.167575i \(-0.946406\pi\)
0.638054 + 0.769992i \(0.279740\pi\)
\(710\) −5392.40 9339.91i −0.285032 0.493691i
\(711\) 4744.82 + 263.865i 0.250274 + 0.0139180i
\(712\) 3423.80 + 1976.73i 0.180214 + 0.104047i
\(713\) 13893.5 0.729755
\(714\) 3996.79 + 7058.65i 0.209490 + 0.369976i
\(715\) 4775.82 0.249798
\(716\) 6385.77 + 3686.83i 0.333307 + 0.192435i
\(717\) 12836.1 20871.7i 0.668582 1.08713i
\(718\) −566.745 981.631i −0.0294578 0.0510225i
\(719\) −9575.52 + 16585.3i −0.496671 + 0.860259i −0.999993 0.00383968i \(-0.998778\pi\)
0.503322 + 0.864099i \(0.332111\pi\)
\(720\) −5383.10 + 8231.57i −0.278634 + 0.426073i
\(721\) −14918.7 + 9003.53i −0.770600 + 0.465061i
\(722\) 69907.6i 3.60345i
\(723\) 37970.6 + 1054.98i 1.95317 + 0.0542671i
\(724\) 16894.7 9754.17i 0.867248 0.500706i
\(725\) −3888.22 + 2244.86i −0.199179 + 0.114996i
\(726\) 22031.4 + 612.122i 1.12626 + 0.0312920i
\(727\) 21313.6i 1.08731i 0.839307 + 0.543657i \(0.182961\pi\)
−0.839307 + 0.543657i \(0.817039\pi\)
\(728\) −2904.64 + 5264.17i −0.147875 + 0.267999i
\(729\) −19410.3 3265.24i −0.986144 0.165891i
\(730\) 5807.25 10058.5i 0.294433 0.509973i
\(731\) 664.842 + 1151.54i 0.0336390 + 0.0582644i
\(732\) 326.364 530.674i 0.0164792 0.0267955i
\(733\) 15935.6 + 9200.45i 0.802996 + 0.463610i 0.844518 0.535528i \(-0.179887\pi\)
−0.0415215 + 0.999138i \(0.513221\pi\)
\(734\) 10493.2 0.527672
\(735\) 7766.09 + 4370.46i 0.389737 + 0.219329i
\(736\) −44752.4 −2.24130
\(737\) 2892.70 + 1670.10i 0.144578 + 0.0834721i
\(738\) 970.374 17449.3i 0.0484010 0.870348i
\(739\) 1609.97 + 2788.55i 0.0801404 + 0.138807i 0.903310 0.428988i \(-0.141130\pi\)
−0.823170 + 0.567795i \(0.807796\pi\)
\(740\) 6105.17 10574.5i 0.303285 0.525304i
\(741\) −46251.4 + 25016.9i −2.29297 + 1.24024i
\(742\) 18505.2 33537.6i 0.915564 1.65931i
\(743\) 36940.2i 1.82396i 0.410229 + 0.911982i \(0.365449\pi\)
−0.410229 + 0.911982i \(0.634551\pi\)
\(744\) −54.2965 + 1954.23i −0.00267555 + 0.0962978i
\(745\) −3438.24 + 1985.07i −0.169084 + 0.0976204i
\(746\) −24277.4 + 14016.6i −1.19150 + 0.687913i
\(747\) −7734.93 15301.3i −0.378857 0.749457i
\(748\) 2196.16i 0.107352i
\(749\) 6863.83 4142.35i 0.334845 0.202080i
\(750\) −1183.68 2188.39i −0.0576291 0.106545i
\(751\) 568.670 984.966i 0.0276313 0.0478587i −0.851879 0.523738i \(-0.824537\pi\)
0.879510 + 0.475880i \(0.157870\pi\)
\(752\) 367.949 + 637.306i 0.0178427 + 0.0309044i
\(753\) 12468.4 + 7668.08i 0.603420 + 0.371103i
\(754\) −38047.2 21966.6i −1.83766 1.06097i
\(755\) 2888.51 0.139236
\(756\) −1107.82 + 17303.0i −0.0532950 + 0.832415i
\(757\) −24998.2 −1.20023 −0.600117 0.799912i \(-0.704879\pi\)
−0.600117 + 0.799912i \(0.704879\pi\)
\(758\) −20618.8 11904.2i −0.988004 0.570424i
\(759\) −12426.3 7642.17i −0.594263 0.365472i
\(760\) −2013.73 3487.88i −0.0961125 0.166472i
\(761\) 16387.5 28383.9i 0.780611 1.35206i −0.150976 0.988537i \(-0.548242\pi\)
0.931586 0.363520i \(-0.118425\pi\)
\(762\) −4121.30 7619.49i −0.195931 0.362238i
\(763\) −14430.2 + 279.888i −0.684676 + 0.0132800i
\(764\) 6414.14i 0.303737i
\(765\) 1340.20 + 2651.18i 0.0633398 + 0.125299i
\(766\) −22457.5 + 12965.9i −1.05930 + 0.611587i
\(767\) 18316.9 10575.3i 0.862301 0.497850i
\(768\) 736.175 26496.3i 0.0345891 1.24492i
\(769\) 15999.0i 0.750244i −0.926976 0.375122i \(-0.877601\pi\)
0.926976 0.375122i \(-0.122399\pi\)
\(770\) 2741.19 + 4542.12i 0.128293 + 0.212580i
\(771\) 14474.3 7829.03i 0.676110 0.365701i
\(772\) 3942.58 6828.75i 0.183804 0.318357i
\(773\) −2048.20 3547.59i −0.0953024 0.165069i 0.814432 0.580259i \(-0.197048\pi\)
−0.909735 + 0.415190i \(0.863715\pi\)
\(774\) −347.009 + 6239.93i −0.0161150 + 0.289780i
\(775\) −1602.46 925.181i −0.0742736 0.0428819i
\(776\) 5246.77 0.242716
\(777\) −295.245 + 35217.1i −0.0136317 + 1.62601i
\(778\) −30178.6 −1.39069
\(779\) 23188.5 + 13387.9i 1.06651 + 0.615751i
\(780\) 5800.14 9431.12i 0.266254 0.432934i
\(781\) 4210.93 + 7293.54i 0.192931 + 0.334166i
\(782\) −7911.25 + 13702.7i −0.361772 + 0.626607i
\(783\) 25108.2 + 2097.15i 1.14597 + 0.0957163i
\(784\) −24970.6 + 969.023i −1.13751 + 0.0441428i
\(785\) 7093.43i 0.322516i
\(786\) −675.512 18.7685i −0.0306549 0.000851718i
\(787\) 36383.7 21006.2i 1.64795 0.951447i 0.670071 0.742297i \(-0.266264\pi\)
0.977884 0.209149i \(-0.0670695\pi\)
\(788\) −21540.4 + 12436.4i −0.973789 + 0.562218i
\(789\) −25676.8 713.407i −1.15858 0.0321901i
\(790\) 3370.97i 0.151815i
\(791\) 7939.70 + 4380.93i 0.356894 + 0.196925i
\(792\) 1123.49 1717.99i 0.0504061 0.0770784i
\(793\) 573.734 993.737i 0.0256922 0.0445002i
\(794\) 14615.9 + 25315.5i 0.653273 + 1.13150i
\(795\) 7348.65 11949.0i 0.327836 0.533068i
\(796\) −14877.9 8589.75i −0.662478 0.382482i
\(797\) −5478.00 −0.243464 −0.121732 0.992563i \(-0.538845\pi\)
−0.121732 + 0.992563i \(0.538845\pi\)
\(798\) −50339.8 29629.1i −2.23310 1.31436i
\(799\) 222.268 0.00984140
\(800\) 5161.69 + 2980.10i 0.228116 + 0.131703i
\(801\) 20966.5 + 1165.97i 0.924863 + 0.0514327i
\(802\) −29544.1 51171.8i −1.30079 2.25304i
\(803\) −4534.89 + 7854.66i −0.199294 + 0.345187i
\(804\) 6811.18 3684.10i 0.298771 0.161602i
\(805\) 337.087 + 17379.2i 0.0147587 + 0.760916i
\(806\) 18106.3i 0.791273i
\(807\) 775.542 27913.2i 0.0338294 1.21758i
\(808\) −145.530 + 84.0219i −0.00633631 + 0.00365827i
\(809\) −6862.81 + 3962.25i −0.298249 + 0.172194i −0.641656 0.766992i \(-0.721752\pi\)
0.343407 + 0.939187i \(0.388419\pi\)
\(810\) −1548.13 + 13876.2i −0.0671552 + 0.601925i
\(811\) 17180.9i 0.743899i 0.928253 + 0.371949i \(0.121311\pi\)
−0.928253 + 0.371949i \(0.878689\pi\)
\(812\) −430.403 22190.3i −0.0186012 0.959024i
\(813\) 10871.0 + 20098.4i 0.468958 + 0.867012i
\(814\) −10483.2 + 18157.4i −0.451395 + 0.781839i
\(815\) 5303.01 + 9185.08i 0.227922 + 0.394772i
\(816\) −7095.85 4363.95i −0.304417 0.187216i
\(817\) −8292.27 4787.55i −0.355092 0.205012i
\(818\) −696.327 −0.0297635
\(819\) −1154.52 + 31913.9i −0.0492579 + 1.36161i
\(820\) −5637.85 −0.240100
\(821\) −14693.9 8483.55i −0.624631 0.360631i 0.154039 0.988065i \(-0.450772\pi\)
−0.778670 + 0.627434i \(0.784105\pi\)
\(822\) −53274.8 32764.0i −2.26055 1.39024i
\(823\) −12711.3 22016.6i −0.538381 0.932504i −0.998991 0.0449014i \(-0.985703\pi\)
0.460610 0.887603i \(-0.347631\pi\)
\(824\) 2391.34 4141.93i 0.101100 0.175110i
\(825\) 924.336 + 1708.92i 0.0390076 + 0.0721174i
\(826\) 20571.2 + 11350.7i 0.866541 + 0.478136i
\(827\) 1688.52i 0.0709984i −0.999370 0.0354992i \(-0.988698\pi\)
0.999370 0.0354992i \(-0.0113021\pi\)
\(828\) −30182.9 + 15257.7i −1.26682 + 0.640390i
\(829\) 2085.14 1203.86i 0.0873582 0.0504363i −0.455685 0.890141i \(-0.650605\pi\)
0.543043 + 0.839705i \(0.317272\pi\)
\(830\) −10532.7 + 6081.04i −0.440475 + 0.254308i
\(831\) −400.203 + 14404.0i −0.0167062 + 0.601288i
\(832\) 21099.7i 0.879206i
\(833\) −3517.55 + 6677.94i −0.146310 + 0.277763i
\(834\) 42013.4 22724.6i 1.74437 0.943513i
\(835\) −5745.69 + 9951.83i −0.238129 + 0.412452i
\(836\) −7907.31 13695.9i −0.327129 0.566604i
\(837\) 4425.45 + 9393.70i 0.182755 + 0.387926i
\(838\) 24812.4 + 14325.4i 1.02283 + 0.590530i
\(839\) 12915.1 0.531442 0.265721 0.964050i \(-0.414390\pi\)
0.265721 + 0.964050i \(0.414390\pi\)
\(840\) −2445.84 20.5049i −0.100464 0.000842245i
\(841\) −7863.23 −0.322409
\(842\) 30086.8 + 17370.6i 1.23142 + 0.710962i
\(843\) −7183.00 + 11679.7i −0.293471 + 0.477188i
\(844\) −4371.00 7570.79i −0.178265 0.308765i
\(845\) 4703.89 8147.38i 0.191501 0.331690i
\(846\) 874.311 + 571.763i 0.0355312 + 0.0232359i
\(847\) 10596.3 + 17558.0i 0.429862 + 0.712277i
\(848\) 39337.1i 1.59297i
\(849\) −39368.3 1093.81i −1.59142 0.0442161i
\(850\) 1824.95 1053.63i 0.0736415 0.0425169i
\(851\) −59492.9 + 34348.3i −2.39646 + 1.38360i
\(852\) 19517.1 + 542.265i 0.784795 + 0.0218048i
\(853\) 16815.4i 0.674968i 0.941331 + 0.337484i \(0.109576\pi\)
−0.941331 + 0.337484i \(0.890424\pi\)
\(854\) 1274.42 24.7186i 0.0510652 0.000990461i
\(855\) −17903.5 11708.1i −0.716123 0.468315i
\(856\) −1100.21 + 1905.62i −0.0439304 + 0.0760897i
\(857\) 11067.3 + 19169.2i 0.441135 + 0.764069i 0.997774 0.0666857i \(-0.0212425\pi\)
−0.556639 + 0.830755i \(0.687909\pi\)
\(858\) −9959.41 + 16194.2i −0.396280 + 0.644359i
\(859\) 27724.8 + 16006.9i 1.10123 + 0.635798i 0.936545 0.350548i \(-0.114005\pi\)
0.164689 + 0.986346i \(0.447338\pi\)
\(860\) 2016.12 0.0799407
\(861\) 14150.3 8012.29i 0.560096 0.317141i
\(862\) 32105.0 1.26856
\(863\) −3035.49 1752.54i −0.119733 0.0691277i 0.438938 0.898518i \(-0.355355\pi\)
−0.558670 + 0.829390i \(0.688688\pi\)
\(864\) −14254.8 30258.1i −0.561295 1.19144i
\(865\) −3011.75 5216.51i −0.118385 0.205048i
\(866\) −10803.4 + 18712.0i −0.423918 + 0.734248i
\(867\) 20241.4 10948.4i 0.792888 0.428865i
\(868\) 7831.41 4726.29i 0.306239 0.184817i
\(869\) 2632.40i 0.102759i
\(870\) 496.386 17865.8i 0.0193437 0.696216i
\(871\) 12351.8 7131.34i 0.480512 0.277424i
\(872\) 3430.69 1980.71i 0.133232 0.0769213i
\(873\) 24871.1 12572.6i 0.964216 0.487420i
\(874\) 113938.i 4.40963i
\(875\) 1118.42 2026.95i 0.0432108 0.0783124i
\(876\) 10003.6 + 18494.7i 0.385832 + 0.713329i
\(877\) −22418.6 + 38830.1i −0.863194 + 1.49510i 0.00563608 + 0.999984i \(0.498206\pi\)
−0.868830 + 0.495111i \(0.835127\pi\)
\(878\) −4042.95 7002.59i −0.155402 0.269164i
\(879\) −515.418 316.982i −0.0197777 0.0121633i
\(880\) −4718.31 2724.12i −0.180744 0.104352i
\(881\) 34786.1 1.33028 0.665138 0.746720i \(-0.268373\pi\)
0.665138 + 0.746720i \(0.268373\pi\)
\(882\) −31014.9 + 17219.7i −1.18404 + 0.657389i
\(883\) 41449.1 1.57970 0.789848 0.613302i \(-0.210159\pi\)
0.789848 + 0.613302i \(0.210159\pi\)
\(884\) 8121.26 + 4688.81i 0.308990 + 0.178396i
\(885\) 7329.26 + 4507.49i 0.278385 + 0.171206i
\(886\) −1826.74 3164.01i −0.0692671 0.119974i
\(887\) 5361.62 9286.60i 0.202960 0.351537i −0.746521 0.665362i \(-0.768277\pi\)
0.949481 + 0.313825i \(0.101611\pi\)
\(888\) −4598.85 8502.39i −0.173792 0.321308i
\(889\) 3894.09 7057.37i 0.146910 0.266251i
\(890\) 14895.7i 0.561018i
\(891\) 1208.93 10835.9i 0.0454555 0.407427i
\(892\) 8579.35 4953.29i 0.322038 0.185929i
\(893\) −1386.12 + 800.279i −0.0519428 + 0.0299892i
\(894\) 438.939 15798.2i 0.0164209 0.591020i
\(895\) 5525.03i 0.206348i
\(896\) 10175.2 6140.78i 0.379386 0.228961i
\(897\) −54790.4 + 29635.6i −2.03946 + 1.10312i
\(898\) −7021.56 + 12161.7i −0.260927 + 0.451939i
\(899\) −6646.09 11511.4i −0.246562 0.427059i
\(900\) 4497.30 + 250.100i 0.166566 + 0.00926295i
\(901\) 10289.5 + 5940.63i 0.380457 + 0.219657i
\(902\) 9680.76 0.357355
\(903\) −5060.21 + 2865.22i −0.186482 + 0.105591i
\(904\) −2488.95 −0.0915722
\(905\) 12659.1 + 7308.74i 0.464975 + 0.268454i
\(906\) −6023.64 + 9794.54i −0.220885 + 0.359163i
\(907\) 18339.4 + 31764.8i 0.671389 + 1.16288i 0.977510 + 0.210887i \(0.0676353\pi\)
−0.306122 + 0.951992i \(0.599031\pi\)
\(908\) 9260.61 16039.9i 0.338463 0.586235i
\(909\) −488.516 + 747.015i −0.0178252 + 0.0272573i
\(910\) 22648.9 439.298i 0.825060 0.0160029i
\(911\) 13062.2i 0.475051i 0.971381 + 0.237525i \(0.0763363\pi\)
−0.971381 + 0.237525i \(0.923664\pi\)
\(912\) 59964.1 + 1666.05i 2.17720 + 0.0604916i
\(913\) 8224.97 4748.69i 0.298146 0.172134i
\(914\) 28616.9 16521.9i 1.03563 0.597918i
\(915\) 466.629 + 12.9649i 0.0168593 + 0.000468421i
\(916\) 25111.0i 0.905775i
\(917\) −324.897 538.351i −0.0117002 0.0193870i
\(918\) −11784.6 984.303i −0.423694 0.0353887i
\(919\) −19593.8 + 33937.5i −0.703309 + 1.21817i 0.263990 + 0.964525i \(0.414961\pi\)
−0.967299 + 0.253641i \(0.918372\pi\)
\(920\) −2385.50 4131.81i −0.0854866 0.148067i
\(921\) 21464.6 34901.8i 0.767950 1.24870i
\(922\) 23849.3 + 13769.4i 0.851880 + 0.491833i
\(923\) 35961.4 1.28243
\(924\) −9604.10 80.5167i −0.341939 0.00286667i
\(925\) 9149.13 0.325213
\(926\) 7571.52 + 4371.42i 0.268699 + 0.155134i
\(927\) 1410.53 25364.1i 0.0499761 0.898671i
\(928\) 21407.7 + 37079.3i 0.757267 + 1.31162i
\(929\) −15873.1 + 27493.1i −0.560582 + 0.970956i 0.436864 + 0.899528i \(0.356089\pi\)
−0.997446 + 0.0714285i \(0.977244\pi\)
\(930\) 6478.91 3504.37i 0.228443 0.123562i
\(931\) −2107.60 54310.4i −0.0741932 1.91187i
\(932\) 24133.5i 0.848195i
\(933\) 1422.02 51180.9i 0.0498979 1.79591i
\(934\) 21420.5 12367.1i 0.750427 0.433259i
\(935\) −1425.10 + 822.785i −0.0498459 + 0.0287785i
\(936\) −3954.35 7822.52i −0.138090 0.273170i
\(937\) 16884.3i 0.588674i 0.955702 + 0.294337i \(0.0950988\pi\)
−0.955702 + 0.294337i \(0.904901\pi\)
\(938\) 13872.0 + 7654.23i 0.482875 + 0.266439i
\(939\) 11939.3 + 22073.5i 0.414936 + 0.767137i
\(940\) 168.505 291.860i 0.00584685 0.0101270i
\(941\) 22301.8 + 38627.9i 0.772603 + 1.33819i 0.936132 + 0.351649i \(0.114379\pi\)
−0.163529 + 0.986539i \(0.552288\pi\)
\(942\) 24052.9 + 14792.5i 0.831937 + 0.511641i
\(943\) 27469.5 + 15859.5i 0.948601 + 0.547675i
\(944\) −24128.5 −0.831901
\(945\) −11643.1 + 5763.66i −0.400794 + 0.198404i
\(946\) −3461.87 −0.118980
\(947\) −47658.4 27515.6i −1.63537 0.944179i −0.982400 0.186791i \(-0.940191\pi\)
−0.652966 0.757387i \(-0.726476\pi\)
\(948\) 5198.36 + 3196.99i 0.178096 + 0.109529i
\(949\) 19364.0 + 33539.4i 0.662362 + 1.14725i
\(950\) −7587.25 + 13141.5i −0.259119 + 0.448807i
\(951\) −4260.37 7876.59i −0.145270 0.268576i
\(952\) −40.1739 2071.24i −0.00136769 0.0705141i
\(953\) 44397.5i 1.50910i −0.656240 0.754552i \(-0.727854\pi\)
0.656240 0.754552i \(-0.272146\pi\)
\(954\) 25192.8 + 49836.6i 0.854977 + 1.69132i
\(955\) −4162.18 + 2403.03i −0.141031 + 0.0814245i
\(956\) 27251.2 15733.5i 0.921932 0.532278i
\(957\) −387.628 + 13951.4i −0.0130932 + 0.471250i
\(958\) 52721.3i 1.77803i
\(959\) −1128.54 58184.4i −0.0380006 1.95920i
\(960\) −7550.03 + 4083.73i −0.253829 + 0.137294i
\(961\) −12156.4 + 21055.6i −0.408057 + 0.706776i
\(962\) 44763.3 + 77532.3i 1.50023 + 2.59848i
\(963\) −648.957 + 11669.6i −0.0217158 + 0.390495i
\(964\) 42245.7 + 24390.6i 1.41145 + 0.814903i
\(965\) 5908.30 0.197093
\(966\) −59633.6 35099.3i −1.98621 1.16905i
\(967\) −42649.0 −1.41830 −0.709151 0.705057i \(-0.750922\pi\)
−0.709151 + 0.705057i \(0.750922\pi\)
\(968\) −4874.66 2814.38i −0.161857 0.0934481i
\(969\) 9491.48 15433.3i 0.314665 0.511650i
\(970\) −9884.30 17120.1i −0.327181 0.566694i
\(971\) −6546.89 + 11339.6i −0.216375 + 0.374772i −0.953697 0.300769i \(-0.902757\pi\)
0.737322 + 0.675541i \(0.236090\pi\)
\(972\) −19930.2 15547.4i −0.657676 0.513048i
\(973\) 38914.0 + 21471.8i 1.28214 + 0.707454i
\(974\) 25402.2i 0.835668i
\(975\) 8292.92 + 230.411i 0.272396 + 0.00756827i
\(976\) −1133.65 + 654.514i −0.0371796 + 0.0214657i
\(977\) −13101.1 + 7563.95i −0.429010 + 0.247689i −0.698925 0.715195i \(-0.746338\pi\)
0.269915 + 0.962884i \(0.413004\pi\)
\(978\) −42204.2 1172.60i −1.37990 0.0383392i
\(979\) 11632.1i 0.379738i
\(980\) 6102.07 + 9681.55i 0.198902 + 0.315577i
\(981\) 11516.2 17609.9i 0.374804 0.573131i
\(982\) −3540.50 + 6132.33i −0.115053 + 0.199277i
\(983\) 9102.04 + 15765.2i 0.295330 + 0.511527i 0.975062 0.221934i \(-0.0712369\pi\)
−0.679731 + 0.733461i \(0.737904\pi\)
\(984\) −2338.12 + 3801.83i −0.0757486 + 0.123168i
\(985\) −16140.1 9318.49i −0.522098 0.301433i
\(986\) 15137.7 0.488928
\(987\) −8.14889 + 972.007i −0.000262799 + 0.0313468i
\(988\) −67528.5 −2.17446
\(989\) −9823.20 5671.43i −0.315834 0.182347i
\(990\) −7722.30 429.446i −0.247910 0.0137866i
\(991\) −22984.4 39810.1i −0.736754 1.27610i −0.953950 0.299967i \(-0.903024\pi\)
0.217196 0.976128i \(-0.430309\pi\)
\(992\) −8822.83 + 15281.6i −0.282384 + 0.489104i
\(993\) −27037.0 + 14624.0i −0.864042 + 0.467351i
\(994\) 20640.9 + 34201.7i 0.658640 + 1.09136i
\(995\) 12872.5i 0.410136i
\(996\) 611.516 22009.6i 0.0194544 0.700201i
\(997\) 23332.0 13470.8i 0.741156 0.427907i −0.0813334 0.996687i \(-0.525918\pi\)
0.822490 + 0.568780i \(0.192585\pi\)
\(998\) −42822.7 + 24723.7i −1.35825 + 0.784184i
\(999\) −42173.7 29283.7i −1.33565 0.927422i
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 105.4.s.a.26.3 32
3.2 odd 2 105.4.s.b.26.14 yes 32
7.3 odd 6 105.4.s.b.101.14 yes 32
21.17 even 6 inner 105.4.s.a.101.3 yes 32
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
105.4.s.a.26.3 32 1.1 even 1 trivial
105.4.s.a.101.3 yes 32 21.17 even 6 inner
105.4.s.b.26.14 yes 32 3.2 odd 2
105.4.s.b.101.14 yes 32 7.3 odd 6