Properties

Label 58.3.f.b.15.2
Level $58$
Weight $3$
Character 58.15
Analytic conductor $1.580$
Analytic rank $0$
Dimension $36$
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] = [58,3,Mod(3,58)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(58, base_ring=CyclotomicField(28))
 
chi = DirichletCharacter(H, H._module([5]))
 
N = Newforms(chi, 3, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("58.3");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 58 = 2 \cdot 29 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 58.f (of order \(28\), degree \(12\), 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: \(1.58038553329\)
Analytic rank: \(0\)
Dimension: \(36\)
Relative dimension: \(3\) over \(\Q(\zeta_{28})\)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{28}]$

Embedding invariants

Embedding label 15.2
Character \(\chi\) \(=\) 58.15
Dual form 58.3.f.b.31.2

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-1.40532 + 0.158342i) q^{2} +(-1.32900 + 0.835065i) q^{3} +(1.94986 - 0.445042i) q^{4} +(2.32581 + 1.85477i) q^{5} +(1.73544 - 1.38397i) q^{6} +(-2.63944 + 11.5641i) q^{7} +(-2.66971 + 0.934170i) q^{8} +(-2.83605 + 5.88912i) q^{9} +O(q^{10})\) \(q+(-1.40532 + 0.158342i) q^{2} +(-1.32900 + 0.835065i) q^{3} +(1.94986 - 0.445042i) q^{4} +(2.32581 + 1.85477i) q^{5} +(1.73544 - 1.38397i) q^{6} +(-2.63944 + 11.5641i) q^{7} +(-2.66971 + 0.934170i) q^{8} +(-2.83605 + 5.88912i) q^{9} +(-3.56220 - 2.23828i) q^{10} +(18.1316 + 6.34453i) q^{11} +(-2.21972 + 2.21972i) q^{12} +(-10.7691 - 22.3623i) q^{13} +(1.87818 - 16.6693i) q^{14} +(-4.63986 - 0.522786i) q^{15} +(3.60388 - 1.73553i) q^{16} +(3.75395 + 3.75395i) q^{17} +(3.05307 - 8.72517i) q^{18} +(-0.452402 + 0.719994i) q^{19} +(5.36045 + 2.58146i) q^{20} +(-6.14900 - 17.5728i) q^{21} +(-26.4854 - 6.04511i) q^{22} +(-0.288432 - 0.361682i) q^{23} +(2.76794 - 3.47089i) q^{24} +(-3.59381 - 15.7455i) q^{25} +(18.6750 + 29.7210i) q^{26} +(-2.73032 - 24.2323i) q^{27} +23.7231i q^{28} +(20.4193 + 20.5925i) q^{29} +6.60327 q^{30} +(11.7286 - 1.32149i) q^{31} +(-4.78980 + 3.00963i) q^{32} +(-29.3950 + 6.70922i) q^{33} +(-5.86991 - 4.68109i) q^{34} +(-27.5877 + 22.0005i) q^{35} +(-2.90898 + 12.7451i) q^{36} +(14.2179 - 4.97507i) q^{37} +(0.521765 - 1.08346i) q^{38} +(32.9861 + 20.7266i) q^{39} +(-7.94190 - 2.77899i) q^{40} +(21.5061 - 21.5061i) q^{41} +(11.4238 + 23.7218i) q^{42} +(-7.83188 + 69.5099i) q^{43} +(38.1776 + 4.30159i) q^{44} +(-17.5191 + 8.43675i) q^{45} +(0.462609 + 0.462609i) q^{46} +(14.3747 - 41.0805i) q^{47} +(-3.34026 + 5.31599i) q^{48} +(-82.6154 - 39.7855i) q^{49} +(7.54362 + 21.5584i) q^{50} +(-8.12378 - 1.85420i) q^{51} +(-30.9504 - 38.8106i) q^{52} +(20.9084 - 26.2183i) q^{53} +(7.67396 + 33.6218i) q^{54} +(30.4031 + 48.3862i) q^{55} +(-3.75635 - 33.3386i) q^{56} -1.33466i q^{57} +(-31.9564 - 25.7058i) q^{58} +39.3295 q^{59} +(-9.27971 + 1.04557i) q^{60} +(24.2812 - 15.2569i) q^{61} +(-16.2732 + 3.71425i) q^{62} +(-60.6171 - 48.3405i) q^{63} +(6.25465 - 4.98792i) q^{64} +(16.4301 - 71.9848i) q^{65} +(40.2471 - 14.0831i) q^{66} +(-1.14556 + 2.37877i) q^{67} +(8.99032 + 5.64899i) q^{68} +(0.685354 + 0.239816i) q^{69} +(35.2860 - 35.2860i) q^{70} +(-18.1835 - 37.7584i) q^{71} +(2.06998 - 18.3716i) q^{72} +(74.1297 + 8.35241i) q^{73} +(-19.1930 + 9.24286i) q^{74} +(17.9247 + 17.9247i) q^{75} +(-0.561691 + 1.60522i) q^{76} +(-121.226 + 192.931i) q^{77} +(-49.6380 - 23.9044i) q^{78} +(-16.5130 - 47.1914i) q^{79} +(11.6010 + 2.64784i) q^{80} +(-12.8144 - 16.0688i) q^{81} +(-26.8176 + 33.6283i) q^{82} +(25.4785 + 111.629i) q^{83} +(-19.8103 - 31.5279i) q^{84} +(1.76825 + 15.6937i) q^{85} -98.9238i q^{86} +(-44.3333 - 10.3159i) q^{87} -54.3330 q^{88} +(-13.2266 + 1.49028i) q^{89} +(23.2841 - 14.6304i) q^{90} +(287.025 - 65.5117i) q^{91} +(-0.723364 - 0.576864i) q^{92} +(-14.4837 + 11.5504i) q^{93} +(-13.6963 + 60.0074i) q^{94} +(-2.38763 + 0.835467i) q^{95} +(3.85240 - 7.99958i) q^{96} +(26.8818 + 16.8909i) q^{97} +(122.401 + 42.8299i) q^{98} +(-88.7859 + 88.7859i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 36 q + 6 q^{2} + 4 q^{3} - 28 q^{5} - 34 q^{7} - 12 q^{8}+O(q^{10}) \) Copy content Toggle raw display \( 36 q + 6 q^{2} + 4 q^{3} - 28 q^{5} - 34 q^{7} - 12 q^{8} - 4 q^{10} + 68 q^{11} - 8 q^{12} + 20 q^{14} + 62 q^{15} + 24 q^{16} + 14 q^{17} - 14 q^{18} + 28 q^{19} - 76 q^{20} - 264 q^{21} - 84 q^{22} - 184 q^{23} - 40 q^{24} + 26 q^{25} + 30 q^{26} - 188 q^{27} + 32 q^{29} + 184 q^{30} + 46 q^{31} - 24 q^{32} + 322 q^{33} + 126 q^{34} + 196 q^{35} + 140 q^{36} + 348 q^{37} + 114 q^{39} + 76 q^{40} - 30 q^{41} - 308 q^{42} - 36 q^{43} - 24 q^{44} - 258 q^{45} - 40 q^{46} + 110 q^{47} - 16 q^{48} - 514 q^{49} + 86 q^{50} + 126 q^{51} - 88 q^{52} - 86 q^{53} + 208 q^{54} - 332 q^{55} - 40 q^{56} + 142 q^{58} + 40 q^{59} + 124 q^{60} - 18 q^{61} + 56 q^{62} + 644 q^{63} + 40 q^{65} - 36 q^{66} + 70 q^{67} - 28 q^{68} + 1128 q^{69} - 208 q^{70} - 854 q^{71} + 28 q^{72} + 482 q^{73} - 360 q^{74} - 1164 q^{75} - 84 q^{76} - 1002 q^{77} - 732 q^{78} - 218 q^{79} - 898 q^{81} - 220 q^{82} + 624 q^{83} + 52 q^{84} - 260 q^{85} - 202 q^{87} + 48 q^{88} - 16 q^{89} - 148 q^{90} + 1022 q^{91} + 392 q^{92} - 644 q^{93} - 80 q^{94} + 1090 q^{95} - 52 q^{97} + 906 q^{98} + 588 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/58\mathbb{Z}\right)^\times\).

\(n\) \(31\)
\(\chi(n)\) \(e\left(\frac{27}{28}\right)\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −1.40532 + 0.158342i −0.702661 + 0.0791708i
\(3\) −1.32900 + 0.835065i −0.442999 + 0.278355i −0.735005 0.678062i \(-0.762820\pi\)
0.292006 + 0.956417i \(0.405677\pi\)
\(4\) 1.94986 0.445042i 0.487464 0.111260i
\(5\) 2.32581 + 1.85477i 0.465162 + 0.370955i 0.827844 0.560959i \(-0.189567\pi\)
−0.362682 + 0.931913i \(0.618139\pi\)
\(6\) 1.73544 1.38397i 0.289241 0.230662i
\(7\) −2.63944 + 11.5641i −0.377063 + 1.65202i 0.329340 + 0.944211i \(0.393174\pi\)
−0.706403 + 0.707810i \(0.749683\pi\)
\(8\) −2.66971 + 0.934170i −0.333713 + 0.116771i
\(9\) −2.83605 + 5.88912i −0.315117 + 0.654347i
\(10\) −3.56220 2.23828i −0.356220 0.223828i
\(11\) 18.1316 + 6.34453i 1.64833 + 0.576776i 0.985152 0.171686i \(-0.0549215\pi\)
0.663178 + 0.748462i \(0.269207\pi\)
\(12\) −2.21972 + 2.21972i −0.184976 + 0.184976i
\(13\) −10.7691 22.3623i −0.828394 1.72018i −0.682511 0.730875i \(-0.739112\pi\)
−0.145883 0.989302i \(-0.546602\pi\)
\(14\) 1.87818 16.6693i 0.134155 1.19066i
\(15\) −4.63986 0.522786i −0.309324 0.0348524i
\(16\) 3.60388 1.73553i 0.225242 0.108471i
\(17\) 3.75395 + 3.75395i 0.220820 + 0.220820i 0.808844 0.588023i \(-0.200094\pi\)
−0.588023 + 0.808844i \(0.700094\pi\)
\(18\) 3.05307 8.72517i 0.169615 0.484732i
\(19\) −0.452402 + 0.719994i −0.0238106 + 0.0378944i −0.858417 0.512952i \(-0.828552\pi\)
0.834607 + 0.550846i \(0.185695\pi\)
\(20\) 5.36045 + 2.58146i 0.268022 + 0.129073i
\(21\) −6.14900 17.5728i −0.292810 0.836802i
\(22\) −26.4854 6.04511i −1.20388 0.274778i
\(23\) −0.288432 0.361682i −0.0125405 0.0157253i 0.775522 0.631321i \(-0.217487\pi\)
−0.788062 + 0.615596i \(0.788915\pi\)
\(24\) 2.76794 3.47089i 0.115331 0.144620i
\(25\) −3.59381 15.7455i −0.143752 0.629820i
\(26\) 18.6750 + 29.7210i 0.718267 + 1.14312i
\(27\) −2.73032 24.2323i −0.101123 0.897492i
\(28\) 23.7231i 0.847253i
\(29\) 20.4193 + 20.5925i 0.704115 + 0.710086i
\(30\) 6.60327 0.220109
\(31\) 11.7286 1.32149i 0.378341 0.0426288i 0.0792537 0.996854i \(-0.474746\pi\)
0.299088 + 0.954226i \(0.403318\pi\)
\(32\) −4.78980 + 3.00963i −0.149681 + 0.0940509i
\(33\) −29.3950 + 6.70922i −0.890758 + 0.203310i
\(34\) −5.86991 4.68109i −0.172644 0.137679i
\(35\) −27.5877 + 22.0005i −0.788220 + 0.628585i
\(36\) −2.90898 + 12.7451i −0.0808051 + 0.354030i
\(37\) 14.2179 4.97507i 0.384268 0.134461i −0.131230 0.991352i \(-0.541893\pi\)
0.515498 + 0.856891i \(0.327607\pi\)
\(38\) 0.521765 1.08346i 0.0137307 0.0285120i
\(39\) 32.9861 + 20.7266i 0.845798 + 0.531450i
\(40\) −7.94190 2.77899i −0.198548 0.0694748i
\(41\) 21.5061 21.5061i 0.524539 0.524539i −0.394400 0.918939i \(-0.629048\pi\)
0.918939 + 0.394400i \(0.129048\pi\)
\(42\) 11.4238 + 23.7218i 0.271996 + 0.564806i
\(43\) −7.83188 + 69.5099i −0.182137 + 1.61651i 0.487022 + 0.873390i \(0.338083\pi\)
−0.669159 + 0.743119i \(0.733346\pi\)
\(44\) 38.1776 + 4.30159i 0.867674 + 0.0977633i
\(45\) −17.5191 + 8.43675i −0.389313 + 0.187483i
\(46\) 0.462609 + 0.462609i 0.0100567 + 0.0100567i
\(47\) 14.3747 41.0805i 0.305844 0.874053i −0.683692 0.729770i \(-0.739627\pi\)
0.989537 0.144282i \(-0.0460873\pi\)
\(48\) −3.34026 + 5.31599i −0.0695888 + 0.110750i
\(49\) −82.6154 39.7855i −1.68603 0.811948i
\(50\) 7.54362 + 21.5584i 0.150872 + 0.431169i
\(51\) −8.12378 1.85420i −0.159290 0.0363569i
\(52\) −30.9504 38.8106i −0.595200 0.746357i
\(53\) 20.9084 26.2183i 0.394498 0.494685i −0.544426 0.838809i \(-0.683252\pi\)
0.938924 + 0.344124i \(0.111824\pi\)
\(54\) 7.67396 + 33.6218i 0.142110 + 0.622626i
\(55\) 30.4031 + 48.3862i 0.552783 + 0.879750i
\(56\) −3.75635 33.3386i −0.0670777 0.595331i
\(57\) 1.33466i 0.0234150i
\(58\) −31.9564 25.7058i −0.550972 0.443204i
\(59\) 39.3295 0.666602 0.333301 0.942820i \(-0.391837\pi\)
0.333301 + 0.942820i \(0.391837\pi\)
\(60\) −9.27971 + 1.04557i −0.154662 + 0.0174262i
\(61\) 24.2812 15.2569i 0.398052 0.250113i −0.318100 0.948057i \(-0.603045\pi\)
0.716152 + 0.697944i \(0.245902\pi\)
\(62\) −16.2732 + 3.71425i −0.262471 + 0.0599072i
\(63\) −60.6171 48.3405i −0.962175 0.767309i
\(64\) 6.25465 4.98792i 0.0977289 0.0779362i
\(65\) 16.4301 71.9848i 0.252770 1.10746i
\(66\) 40.2471 14.0831i 0.609804 0.213380i
\(67\) −1.14556 + 2.37877i −0.0170979 + 0.0355041i −0.909343 0.416047i \(-0.863415\pi\)
0.892245 + 0.451552i \(0.149129\pi\)
\(68\) 8.99032 + 5.64899i 0.132211 + 0.0830734i
\(69\) 0.685354 + 0.239816i 0.00993266 + 0.00347559i
\(70\) 35.2860 35.2860i 0.504086 0.504086i
\(71\) −18.1835 37.7584i −0.256106 0.531809i 0.732784 0.680461i \(-0.238221\pi\)
−0.988889 + 0.148653i \(0.952506\pi\)
\(72\) 2.06998 18.3716i 0.0287497 0.255161i
\(73\) 74.1297 + 8.35241i 1.01548 + 0.114417i 0.603983 0.796997i \(-0.293579\pi\)
0.411492 + 0.911414i \(0.365008\pi\)
\(74\) −19.1930 + 9.24286i −0.259365 + 0.124904i
\(75\) 17.9247 + 17.9247i 0.238996 + 0.238996i
\(76\) −0.561691 + 1.60522i −0.00739068 + 0.0211213i
\(77\) −121.226 + 192.931i −1.57437 + 2.50559i
\(78\) −49.6380 23.9044i −0.636384 0.306467i
\(79\) −16.5130 47.1914i −0.209025 0.597360i 0.790868 0.611987i \(-0.209630\pi\)
−0.999893 + 0.0146272i \(0.995344\pi\)
\(80\) 11.6010 + 2.64784i 0.145012 + 0.0330980i
\(81\) −12.8144 16.0688i −0.158203 0.198380i
\(82\) −26.8176 + 33.6283i −0.327044 + 0.410101i
\(83\) 25.4785 + 111.629i 0.306970 + 1.34492i 0.859375 + 0.511346i \(0.170853\pi\)
−0.552405 + 0.833576i \(0.686290\pi\)
\(84\) −19.8103 31.5279i −0.235837 0.375333i
\(85\) 1.76825 + 15.6937i 0.0208030 + 0.184632i
\(86\) 98.9238i 1.15028i
\(87\) −44.3333 10.3159i −0.509579 0.118574i
\(88\) −54.3330 −0.617420
\(89\) −13.2266 + 1.49028i −0.148614 + 0.0167447i −0.185958 0.982558i \(-0.559539\pi\)
0.0373441 + 0.999302i \(0.488110\pi\)
\(90\) 23.2841 14.6304i 0.258712 0.162559i
\(91\) 287.025 65.5117i 3.15413 0.719909i
\(92\) −0.723364 0.576864i −0.00786265 0.00627026i
\(93\) −14.4837 + 11.5504i −0.155739 + 0.124198i
\(94\) −13.6963 + 60.0074i −0.145705 + 0.638376i
\(95\) −2.38763 + 0.835467i −0.0251329 + 0.00879439i
\(96\) 3.85240 7.99958i 0.0401291 0.0833290i
\(97\) 26.8818 + 16.8909i 0.277132 + 0.174133i 0.663425 0.748242i \(-0.269102\pi\)
−0.386294 + 0.922376i \(0.626245\pi\)
\(98\) 122.401 + 42.8299i 1.24899 + 0.437040i
\(99\) −88.7859 + 88.7859i −0.896827 + 0.896827i
\(100\) −14.0148 29.1020i −0.140148 0.291020i
\(101\) 4.41432 39.1782i 0.0437061 0.387903i −0.952748 0.303762i \(-0.901757\pi\)
0.996454 0.0841402i \(-0.0268144\pi\)
\(102\) 11.7101 + 1.31941i 0.114805 + 0.0129354i
\(103\) −99.2499 + 47.7962i −0.963591 + 0.464041i −0.848431 0.529306i \(-0.822452\pi\)
−0.115160 + 0.993347i \(0.536738\pi\)
\(104\) 49.6406 + 49.6406i 0.477313 + 0.477313i
\(105\) 18.2922 52.2761i 0.174211 0.497868i
\(106\) −25.2316 + 40.1558i −0.238034 + 0.378829i
\(107\) −77.1443 37.1507i −0.720974 0.347203i 0.0371528 0.999310i \(-0.488171\pi\)
−0.758127 + 0.652107i \(0.773885\pi\)
\(108\) −16.1081 46.0344i −0.149149 0.426244i
\(109\) −109.875 25.0782i −1.00803 0.230075i −0.313535 0.949577i \(-0.601513\pi\)
−0.694491 + 0.719501i \(0.744370\pi\)
\(110\) −50.3877 63.1841i −0.458070 0.574401i
\(111\) −14.7411 + 18.4848i −0.132803 + 0.166529i
\(112\) 10.5578 + 46.2566i 0.0942658 + 0.413005i
\(113\) 53.6097 + 85.3194i 0.474422 + 0.755039i 0.995117 0.0987043i \(-0.0314698\pi\)
−0.520694 + 0.853743i \(0.674327\pi\)
\(114\) 0.211332 + 1.87562i 0.00185379 + 0.0164528i
\(115\) 1.37618i 0.0119668i
\(116\) 48.9793 + 31.0649i 0.422235 + 0.267801i
\(117\) 162.236 1.38663
\(118\) −55.2706 + 6.22750i −0.468395 + 0.0527754i
\(119\) −53.3195 + 33.5029i −0.448063 + 0.281537i
\(120\) 12.8754 2.93873i 0.107295 0.0244894i
\(121\) 193.901 + 154.631i 1.60249 + 1.27794i
\(122\) −31.7071 + 25.2856i −0.259894 + 0.207259i
\(123\) −10.6226 + 46.5405i −0.0863624 + 0.378378i
\(124\) 22.2809 7.79643i 0.179685 0.0628745i
\(125\) 53.1140 110.292i 0.424912 0.882339i
\(126\) 92.8408 + 58.3357i 0.736831 + 0.462982i
\(127\) −161.792 56.6133i −1.27395 0.445774i −0.393242 0.919435i \(-0.628647\pi\)
−0.880707 + 0.473661i \(0.842932\pi\)
\(128\) −8.00000 + 8.00000i −0.0625000 + 0.0625000i
\(129\) −47.6367 98.9187i −0.369277 0.766811i
\(130\) −11.6913 + 103.763i −0.0899332 + 0.798179i
\(131\) −30.3973 3.42495i −0.232040 0.0261447i −0.00482147 0.999988i \(-0.501535\pi\)
−0.227219 + 0.973844i \(0.572963\pi\)
\(132\) −54.3301 + 26.1640i −0.411592 + 0.198212i
\(133\) −7.13203 7.13203i −0.0536243 0.0536243i
\(134\) 1.23322 3.52433i 0.00920310 0.0263010i
\(135\) 38.5952 61.4239i 0.285890 0.454992i
\(136\) −13.5288 6.51511i −0.0994762 0.0479052i
\(137\) −35.0755 100.240i −0.256026 0.731679i −0.998115 0.0613778i \(-0.980451\pi\)
0.742089 0.670301i \(-0.233835\pi\)
\(138\) −1.00111 0.228498i −0.00725445 0.00165578i
\(139\) −30.4716 38.2102i −0.219220 0.274894i 0.660045 0.751226i \(-0.270537\pi\)
−0.879265 + 0.476333i \(0.841966\pi\)
\(140\) −44.0009 + 55.1754i −0.314292 + 0.394110i
\(141\) 15.2009 + 66.5997i 0.107808 + 0.472338i
\(142\) 31.5324 + 50.1835i 0.222059 + 0.353405i
\(143\) −53.3833 473.790i −0.373310 3.31322i
\(144\) 26.1457i 0.181567i
\(145\) 9.29717 + 85.7675i 0.0641184 + 0.591500i
\(146\) −105.499 −0.722593
\(147\) 143.019 16.1144i 0.972920 0.109622i
\(148\) 25.5088 16.0282i 0.172357 0.108299i
\(149\) −202.542 + 46.2288i −1.35934 + 0.310261i −0.839201 0.543821i \(-0.816977\pi\)
−0.520139 + 0.854082i \(0.674120\pi\)
\(150\) −28.0282 22.3517i −0.186854 0.149011i
\(151\) 37.3710 29.8024i 0.247490 0.197367i −0.491886 0.870660i \(-0.663692\pi\)
0.739376 + 0.673293i \(0.235121\pi\)
\(152\) 0.535183 2.34479i 0.00352094 0.0154263i
\(153\) −32.7538 + 11.4611i −0.214077 + 0.0749089i
\(154\) 139.813 290.325i 0.907877 1.88523i
\(155\) 29.7295 + 18.6803i 0.191804 + 0.120518i
\(156\) 73.5424 + 25.7336i 0.471425 + 0.164959i
\(157\) 180.129 180.129i 1.14732 1.14732i 0.160237 0.987079i \(-0.448774\pi\)
0.987079 0.160237i \(-0.0512260\pi\)
\(158\) 30.6784 + 63.7044i 0.194167 + 0.403193i
\(159\) −5.89325 + 52.3040i −0.0370644 + 0.328956i
\(160\) −16.7223 1.88415i −0.104515 0.0117760i
\(161\) 4.94384 2.38083i 0.0307071 0.0147878i
\(162\) 20.5528 + 20.5528i 0.126869 + 0.126869i
\(163\) 71.9843 205.719i 0.441621 1.26208i −0.481118 0.876656i \(-0.659769\pi\)
0.922739 0.385425i \(-0.125945\pi\)
\(164\) 32.3626 51.5049i 0.197333 0.314054i
\(165\) −80.8113 38.9167i −0.489765 0.235859i
\(166\) −53.4809 152.840i −0.322174 0.920721i
\(167\) −186.519 42.5717i −1.11688 0.254920i −0.376040 0.926604i \(-0.622714\pi\)
−0.740838 + 0.671683i \(0.765572\pi\)
\(168\) 32.8320 + 41.1701i 0.195429 + 0.245060i
\(169\) −278.729 + 349.515i −1.64928 + 2.06814i
\(170\) −4.96993 21.7747i −0.0292349 0.128086i
\(171\) −2.95709 4.70619i −0.0172929 0.0275216i
\(172\) 15.6638 + 139.020i 0.0910684 + 0.808254i
\(173\) 125.755i 0.726906i 0.931613 + 0.363453i \(0.118402\pi\)
−0.931613 + 0.363453i \(0.881598\pi\)
\(174\) 63.9360 + 7.47733i 0.367448 + 0.0429732i
\(175\) 191.569 1.09468
\(176\) 76.3553 8.60317i 0.433837 0.0488817i
\(177\) −52.2689 + 32.8427i −0.295304 + 0.185552i
\(178\) 18.3517 4.18865i 0.103099 0.0235317i
\(179\) 116.275 + 92.7262i 0.649581 + 0.518023i 0.891935 0.452165i \(-0.149348\pi\)
−0.242354 + 0.970188i \(0.577919\pi\)
\(180\) −30.4050 + 24.2472i −0.168917 + 0.134707i
\(181\) −9.95754 + 43.6268i −0.0550140 + 0.241032i −0.994957 0.100298i \(-0.968020\pi\)
0.939943 + 0.341330i \(0.110877\pi\)
\(182\) −392.990 + 137.513i −2.15928 + 0.755566i
\(183\) −19.5292 + 40.5528i −0.106717 + 0.221600i
\(184\) 1.10790 + 0.696140i 0.00602120 + 0.00378337i
\(185\) 42.2959 + 14.8000i 0.228626 + 0.0799998i
\(186\) 18.5254 18.5254i 0.0995989 0.0995989i
\(187\) 44.2481 + 91.8822i 0.236621 + 0.491349i
\(188\) 9.74602 86.4983i 0.0518405 0.460098i
\(189\) 287.432 + 32.3858i 1.52081 + 0.171354i
\(190\) 3.22309 1.55216i 0.0169637 0.00816926i
\(191\) 67.3686 + 67.3686i 0.352715 + 0.352715i 0.861119 0.508404i \(-0.169764\pi\)
−0.508404 + 0.861119i \(0.669764\pi\)
\(192\) −4.14719 + 11.8520i −0.0215999 + 0.0617290i
\(193\) −62.2446 + 99.0617i −0.322511 + 0.513273i −0.968150 0.250369i \(-0.919448\pi\)
0.645640 + 0.763642i \(0.276591\pi\)
\(194\) −40.4521 19.4807i −0.208516 0.100416i
\(195\) 38.2765 + 109.388i 0.196289 + 0.560963i
\(196\) −178.794 40.8086i −0.912216 0.208207i
\(197\) 130.030 + 163.053i 0.660052 + 0.827678i 0.993349 0.115143i \(-0.0367327\pi\)
−0.333297 + 0.942822i \(0.608161\pi\)
\(198\) 110.714 138.831i 0.559163 0.701168i
\(199\) −17.6707 77.4204i −0.0887975 0.389047i 0.910926 0.412570i \(-0.135369\pi\)
−0.999723 + 0.0235230i \(0.992512\pi\)
\(200\) 24.3034 + 38.6786i 0.121517 + 0.193393i
\(201\) −0.463987 4.11800i −0.00230839 0.0204876i
\(202\) 55.7569i 0.276024i
\(203\) −292.030 + 181.780i −1.43857 + 0.895466i
\(204\) −16.6654 −0.0816931
\(205\) 89.9080 10.1302i 0.438575 0.0494156i
\(206\) 131.910 82.8844i 0.640339 0.402352i
\(207\) 2.94800 0.672861i 0.0142415 0.00325054i
\(208\) −77.6211 61.9008i −0.373178 0.297600i
\(209\) −12.7708 + 10.1844i −0.0611043 + 0.0487291i
\(210\) −17.4289 + 76.3612i −0.0829949 + 0.363625i
\(211\) −70.4696 + 24.6584i −0.333979 + 0.116864i −0.492059 0.870562i \(-0.663755\pi\)
0.158079 + 0.987426i \(0.449470\pi\)
\(212\) 29.1001 60.4271i 0.137265 0.285033i
\(213\) 55.6966 + 34.9965i 0.261486 + 0.164303i
\(214\) 114.295 + 39.9935i 0.534089 + 0.186886i
\(215\) −147.141 + 147.141i −0.684374 + 0.684374i
\(216\) 29.9262 + 62.1425i 0.138547 + 0.287697i
\(217\) −15.6750 + 139.119i −0.0722348 + 0.641102i
\(218\) 158.380 + 17.8452i 0.726515 + 0.0818586i
\(219\) −105.493 + 50.8028i −0.481703 + 0.231976i
\(220\) 80.8155 + 80.8155i 0.367343 + 0.367343i
\(221\) 43.5202 124.374i 0.196924 0.562776i
\(222\) 17.7891 28.3112i 0.0801310 0.127528i
\(223\) −61.0893 29.4190i −0.273943 0.131924i 0.291869 0.956458i \(-0.405723\pi\)
−0.565812 + 0.824534i \(0.691437\pi\)
\(224\) −22.1614 63.3336i −0.0989348 0.282739i
\(225\) 102.919 + 23.4907i 0.457419 + 0.104403i
\(226\) −88.8485 111.412i −0.393135 0.492976i
\(227\) 43.1105 54.0589i 0.189914 0.238145i −0.677754 0.735289i \(-0.737047\pi\)
0.867668 + 0.497144i \(0.165618\pi\)
\(228\) −0.593978 2.60239i −0.00260517 0.0114140i
\(229\) −176.471 280.852i −0.770615 1.22643i −0.969183 0.246340i \(-0.920772\pi\)
0.198568 0.980087i \(-0.436371\pi\)
\(230\) 0.217907 + 1.93397i 0.000947420 + 0.00840859i
\(231\) 357.637i 1.54821i
\(232\) −73.7505 35.9007i −0.317890 0.154744i
\(233\) 223.956 0.961185 0.480593 0.876944i \(-0.340422\pi\)
0.480593 + 0.876944i \(0.340422\pi\)
\(234\) −227.994 + 25.6887i −0.974332 + 0.109781i
\(235\) 109.628 68.8837i 0.466501 0.293122i
\(236\) 76.6869 17.5033i 0.324944 0.0741665i
\(237\) 61.3537 + 48.9279i 0.258876 + 0.206447i
\(238\) 69.6261 55.5250i 0.292547 0.233298i
\(239\) 6.52527 28.5891i 0.0273024 0.119620i −0.959440 0.281912i \(-0.909032\pi\)
0.986743 + 0.162292i \(0.0518887\pi\)
\(240\) −17.6288 + 6.16858i −0.0734532 + 0.0257024i
\(241\) 49.4995 102.787i 0.205392 0.426502i −0.772672 0.634806i \(-0.781080\pi\)
0.978064 + 0.208304i \(0.0667944\pi\)
\(242\) −296.978 186.604i −1.22718 0.771090i
\(243\) 237.603 + 83.1410i 0.977792 + 0.342144i
\(244\) 40.5549 40.5549i 0.166209 0.166209i
\(245\) −118.355 245.766i −0.483081 1.00313i
\(246\) 7.55882 67.0864i 0.0307269 0.272709i
\(247\) 20.9727 + 2.36305i 0.0849097 + 0.00956702i
\(248\) −30.0774 + 14.4845i −0.121280 + 0.0584052i
\(249\) −127.078 127.078i −0.510353 0.510353i
\(250\) −57.1784 + 163.406i −0.228713 + 0.653625i
\(251\) −157.759 + 251.073i −0.628523 + 1.00029i 0.368964 + 0.929444i \(0.379713\pi\)
−0.997487 + 0.0708453i \(0.977430\pi\)
\(252\) −139.708 67.2799i −0.554397 0.266984i
\(253\) −2.93504 8.38785i −0.0116009 0.0331536i
\(254\) 236.333 + 53.9415i 0.930446 + 0.212368i
\(255\) −15.4553 19.3803i −0.0606089 0.0760011i
\(256\) 9.97584 12.5093i 0.0389681 0.0488645i
\(257\) −79.2758 347.330i −0.308466 1.35148i −0.856985 0.515341i \(-0.827665\pi\)
0.548519 0.836138i \(-0.315192\pi\)
\(258\) 82.6078 + 131.470i 0.320185 + 0.509572i
\(259\) 20.0050 + 177.550i 0.0772396 + 0.685520i
\(260\) 147.672i 0.567969i
\(261\) −179.182 + 61.8506i −0.686521 + 0.236976i
\(262\) 43.2603 0.165116
\(263\) 1.93623 0.218161i 0.00736211 0.000829510i −0.108283 0.994120i \(-0.534535\pi\)
0.115645 + 0.993291i \(0.463107\pi\)
\(264\) 72.2084 45.3716i 0.273517 0.171862i
\(265\) 97.2581 22.1985i 0.367012 0.0837680i
\(266\) 11.1521 + 8.89349i 0.0419251 + 0.0334342i
\(267\) 16.3337 13.0257i 0.0611748 0.0487853i
\(268\) −1.17502 + 5.14808i −0.00438439 + 0.0192093i
\(269\) 219.680 76.8694i 0.816655 0.285760i 0.110553 0.993870i \(-0.464738\pi\)
0.706102 + 0.708110i \(0.250452\pi\)
\(270\) −44.5127 + 92.4315i −0.164862 + 0.342339i
\(271\) −264.614 166.268i −0.976435 0.613535i −0.0535318 0.998566i \(-0.517048\pi\)
−0.922904 + 0.385031i \(0.874191\pi\)
\(272\) 20.0439 + 7.01365i 0.0736907 + 0.0257855i
\(273\) −326.750 + 326.750i −1.19689 + 1.19689i
\(274\) 65.1645 + 135.316i 0.237827 + 0.493852i
\(275\) 34.7362 308.292i 0.126314 1.12106i
\(276\) 1.44307 + 0.162595i 0.00522851 + 0.000589112i
\(277\) −268.027 + 129.075i −0.967605 + 0.465974i −0.849825 0.527066i \(-0.823292\pi\)
−0.117780 + 0.993040i \(0.537578\pi\)
\(278\) 48.8727 + 48.8727i 0.175801 + 0.175801i
\(279\) −25.4804 + 72.8189i −0.0913277 + 0.260999i
\(280\) 53.0989 84.5064i 0.189639 0.301808i
\(281\) 152.077 + 73.2366i 0.541201 + 0.260629i 0.684452 0.729058i \(-0.260041\pi\)
−0.143251 + 0.989686i \(0.545756\pi\)
\(282\) −31.9077 91.1870i −0.113148 0.323358i
\(283\) 510.978 + 116.627i 1.80558 + 0.412111i 0.986792 0.161991i \(-0.0517914\pi\)
0.818784 + 0.574102i \(0.194649\pi\)
\(284\) −52.2593 65.5310i −0.184011 0.230743i
\(285\) 2.47548 3.10416i 0.00868591 0.0108918i
\(286\) 150.041 + 657.374i 0.524620 + 2.29851i
\(287\) 191.935 + 305.463i 0.668765 + 1.06433i
\(288\) −4.13996 36.7431i −0.0143749 0.127580i
\(289\) 260.816i 0.902477i
\(290\) −26.6461 119.059i −0.0918830 0.410547i
\(291\) −49.8309 −0.171240
\(292\) 148.259 16.7048i 0.507738 0.0572083i
\(293\) −9.65247 + 6.06505i −0.0329436 + 0.0206998i −0.548403 0.836214i \(-0.684764\pi\)
0.515460 + 0.856914i \(0.327621\pi\)
\(294\) −198.436 + 45.2918i −0.674953 + 0.154054i
\(295\) 91.4730 + 72.9473i 0.310078 + 0.247279i
\(296\) −33.3101 + 26.5639i −0.112534 + 0.0897430i
\(297\) 104.237 456.693i 0.350967 1.53769i
\(298\) 277.316 97.0371i 0.930591 0.325628i
\(299\) −4.98189 + 10.3450i −0.0166618 + 0.0345987i
\(300\) 42.9278 + 26.9733i 0.143093 + 0.0899110i
\(301\) −783.151 274.036i −2.60183 0.910419i
\(302\) −47.7993 + 47.7993i −0.158276 + 0.158276i
\(303\) 26.8497 + 55.7540i 0.0886129 + 0.184006i
\(304\) −0.380826 + 3.37993i −0.00125272 + 0.0111182i
\(305\) 84.7715 + 9.55146i 0.277939 + 0.0313163i
\(306\) 44.2149 21.2928i 0.144493 0.0695842i
\(307\) 29.6577 + 29.6577i 0.0966048 + 0.0966048i 0.753757 0.657153i \(-0.228239\pi\)
−0.657153 + 0.753757i \(0.728239\pi\)
\(308\) −150.512 + 430.138i −0.488675 + 1.39655i
\(309\) 91.9900 146.401i 0.297702 0.473790i
\(310\) −44.7374 21.5444i −0.144314 0.0694981i
\(311\) −19.9784 57.0949i −0.0642391 0.183585i 0.907290 0.420506i \(-0.138147\pi\)
−0.971529 + 0.236921i \(0.923862\pi\)
\(312\) −107.425 24.5191i −0.344312 0.0785870i
\(313\) −97.6181 122.409i −0.311879 0.391084i 0.601044 0.799216i \(-0.294752\pi\)
−0.912923 + 0.408132i \(0.866180\pi\)
\(314\) −224.617 + 281.660i −0.715340 + 0.897008i
\(315\) −51.3232 224.862i −0.162931 0.713847i
\(316\) −53.2001 84.6675i −0.168355 0.267935i
\(317\) 29.0400 + 257.737i 0.0916089 + 0.813052i 0.952557 + 0.304359i \(0.0984424\pi\)
−0.860948 + 0.508692i \(0.830129\pi\)
\(318\) 74.4371i 0.234079i
\(319\) 239.586 + 502.926i 0.751054 + 1.57657i
\(320\) 23.7986 0.0743706
\(321\) 133.548 15.0472i 0.416037 0.0468761i
\(322\) −6.57070 + 4.12865i −0.0204059 + 0.0128219i
\(323\) −4.40111 + 1.00453i −0.0136257 + 0.00310998i
\(324\) −32.1376 25.6289i −0.0991901 0.0791015i
\(325\) −313.403 + 249.931i −0.964318 + 0.769018i
\(326\) −68.5871 + 300.500i −0.210390 + 0.921778i
\(327\) 166.965 58.4237i 0.510598 0.178666i
\(328\) −37.3246 + 77.5052i −0.113794 + 0.236296i
\(329\) 437.120 + 274.660i 1.32863 + 0.834834i
\(330\) 119.728 + 41.8946i 0.362812 + 0.126953i
\(331\) −145.440 + 145.440i −0.439397 + 0.439397i −0.891809 0.452412i \(-0.850564\pi\)
0.452412 + 0.891809i \(0.350564\pi\)
\(332\) 99.3588 + 206.321i 0.299273 + 0.621448i
\(333\) −11.0240 + 97.8407i −0.0331051 + 0.293816i
\(334\) 268.859 + 30.2932i 0.804968 + 0.0906982i
\(335\) −7.07643 + 3.40783i −0.0211237 + 0.0101726i
\(336\) −52.6585 52.6585i −0.156722 0.156722i
\(337\) 128.857 368.253i 0.382366 1.09274i −0.578489 0.815690i \(-0.696357\pi\)
0.960855 0.277050i \(-0.0893568\pi\)
\(338\) 336.361 535.315i 0.995151 1.58377i
\(339\) −142.494 68.6217i −0.420338 0.202424i
\(340\) 10.4322 + 29.8135i 0.0306829 + 0.0876867i
\(341\) 221.043 + 50.4515i 0.648219 + 0.147952i
\(342\) 4.90085 + 6.14548i 0.0143300 + 0.0179692i
\(343\) 315.762 395.952i 0.920588 1.15438i
\(344\) −44.0252 192.887i −0.127980 0.560719i
\(345\) 1.14920 + 1.82894i 0.00333101 + 0.00530128i
\(346\) −19.9122 176.726i −0.0575497 0.510768i
\(347\) 668.511i 1.92654i 0.268528 + 0.963272i \(0.413463\pi\)
−0.268528 + 0.963272i \(0.586537\pi\)
\(348\) −91.0346 0.384317i −0.261594 0.00110436i
\(349\) −214.407 −0.614346 −0.307173 0.951654i \(-0.599383\pi\)
−0.307173 + 0.951654i \(0.599383\pi\)
\(350\) −269.216 + 30.3333i −0.769188 + 0.0866667i
\(351\) −512.487 + 322.017i −1.46008 + 0.917426i
\(352\) −105.941 + 24.1804i −0.300970 + 0.0686945i
\(353\) −464.550 370.466i −1.31601 1.04948i −0.994734 0.102492i \(-0.967318\pi\)
−0.321271 0.946987i \(-0.604110\pi\)
\(354\) 68.2542 54.4309i 0.192808 0.153760i
\(355\) 27.7419 121.545i 0.0781462 0.342381i
\(356\) −25.1268 + 8.79224i −0.0705808 + 0.0246973i
\(357\) 42.8845 89.0505i 0.120125 0.249441i
\(358\) −178.086 111.899i −0.497447 0.312567i
\(359\) 14.3728 + 5.02927i 0.0400357 + 0.0140091i 0.350223 0.936666i \(-0.386106\pi\)
−0.310187 + 0.950676i \(0.600392\pi\)
\(360\) 38.8895 38.8895i 0.108026 0.108026i
\(361\) 156.318 + 324.598i 0.433015 + 0.899164i
\(362\) 7.08560 62.8864i 0.0195735 0.173719i
\(363\) −386.821 43.5843i −1.06562 0.120067i
\(364\) 530.503 255.477i 1.45743 0.701859i
\(365\) 156.920 + 156.920i 0.429917 + 0.429917i
\(366\) 21.0236 60.0819i 0.0574415 0.164158i
\(367\) 9.34089 14.8659i 0.0254520 0.0405067i −0.833756 0.552133i \(-0.813814\pi\)
0.859208 + 0.511627i \(0.170957\pi\)
\(368\) −1.66718 0.802874i −0.00453039 0.00218172i
\(369\) 65.6595 + 187.644i 0.177939 + 0.508521i
\(370\) −61.7827 14.1015i −0.166980 0.0381122i
\(371\) 248.006 + 310.990i 0.668480 + 0.838247i
\(372\) −23.1008 + 28.9675i −0.0620989 + 0.0778696i
\(373\) −41.5299 181.955i −0.111340 0.487814i −0.999595 0.0284623i \(-0.990939\pi\)
0.888255 0.459352i \(-0.151918\pi\)
\(374\) −76.7316 122.118i −0.205165 0.326518i
\(375\) 21.5129 + 190.932i 0.0573677 + 0.509152i
\(376\) 123.101i 0.327397i
\(377\) 240.597 678.386i 0.638188 1.79943i
\(378\) −409.063 −1.08218
\(379\) 247.224 27.8554i 0.652306 0.0734972i 0.220391 0.975412i \(-0.429267\pi\)
0.431915 + 0.901914i \(0.357838\pi\)
\(380\) −4.28371 + 2.69163i −0.0112729 + 0.00708325i
\(381\) 262.297 59.8675i 0.688442 0.157132i
\(382\) −105.342 84.0073i −0.275764 0.219914i
\(383\) 160.925 128.333i 0.420169 0.335073i −0.390475 0.920614i \(-0.627689\pi\)
0.810643 + 0.585540i \(0.199118\pi\)
\(384\) 3.95147 17.3125i 0.0102903 0.0450847i
\(385\) −639.793 + 223.873i −1.66180 + 0.581489i
\(386\) 71.7880 149.069i 0.185979 0.386190i
\(387\) −387.140 243.256i −1.00036 0.628569i
\(388\) 59.9327 + 20.9714i 0.154466 + 0.0540499i
\(389\) 453.847 453.847i 1.16670 1.16670i 0.183723 0.982978i \(-0.441185\pi\)
0.982978 0.183723i \(-0.0588149\pi\)
\(390\) −71.1114 147.664i −0.182337 0.378626i
\(391\) 0.274978 2.44049i 0.000703267 0.00624167i
\(392\) 257.725 + 29.0386i 0.657462 + 0.0740782i
\(393\) 43.2580 20.8320i 0.110071 0.0530075i
\(394\) −208.552 208.552i −0.529320 0.529320i
\(395\) 49.1233 140.386i 0.124363 0.355408i
\(396\) −133.606 + 212.633i −0.337390 + 0.536952i
\(397\) 447.326 + 215.421i 1.12677 + 0.542622i 0.901977 0.431785i \(-0.142116\pi\)
0.224790 + 0.974407i \(0.427830\pi\)
\(398\) 37.0919 + 106.003i 0.0931957 + 0.266338i
\(399\) 15.4342 + 3.52275i 0.0386821 + 0.00882894i
\(400\) −40.2785 50.5076i −0.100696 0.126269i
\(401\) −267.726 + 335.717i −0.667645 + 0.837200i −0.994151 0.107995i \(-0.965557\pi\)
0.326507 + 0.945195i \(0.394128\pi\)
\(402\) 1.30410 + 5.71364i 0.00324403 + 0.0142130i
\(403\) −155.858 248.047i −0.386745 0.615501i
\(404\) −8.82864 78.3563i −0.0218531 0.193951i
\(405\) 61.1409i 0.150965i
\(406\) 381.613 301.699i 0.939933 0.743102i
\(407\) 289.359 0.710955
\(408\) 23.4202 2.63883i 0.0574025 0.00646771i
\(409\) −428.165 + 269.034i −1.04686 + 0.657785i −0.941625 0.336663i \(-0.890702\pi\)
−0.105233 + 0.994448i \(0.533559\pi\)
\(410\) −124.746 + 28.4724i −0.304257 + 0.0694448i
\(411\) 130.322 + 103.929i 0.317086 + 0.252868i
\(412\) −172.252 + 137.366i −0.418087 + 0.333413i
\(413\) −103.808 + 454.812i −0.251351 + 1.10124i
\(414\) −4.03634 + 1.41238i −0.00974961 + 0.00341154i
\(415\) −147.787 + 306.884i −0.356114 + 0.739479i
\(416\) 118.884 + 74.6998i 0.285779 + 0.179567i
\(417\) 72.4048 + 25.3355i 0.173633 + 0.0607567i
\(418\) 16.3345 16.3345i 0.0390777 0.0390777i
\(419\) −343.054 712.358i −0.818744 1.70014i −0.707913 0.706299i \(-0.750363\pi\)
−0.110830 0.993839i \(-0.535351\pi\)
\(420\) 12.4021 110.072i 0.0295288 0.262075i
\(421\) −574.810 64.7656i −1.36535 0.153837i −0.601312 0.799014i \(-0.705355\pi\)
−0.764033 + 0.645177i \(0.776784\pi\)
\(422\) 95.1280 45.8112i 0.225422 0.108557i
\(423\) 201.161 + 201.161i 0.475557 + 0.475557i
\(424\) −31.3269 + 89.5272i −0.0738843 + 0.211149i
\(425\) 45.6168 72.5987i 0.107334 0.170820i
\(426\) −83.8130 40.3622i −0.196744 0.0947469i
\(427\) 112.344 + 321.061i 0.263101 + 0.751899i
\(428\) −166.954 38.1061i −0.390079 0.0890330i
\(429\) 466.592 + 585.088i 1.08763 + 1.36384i
\(430\) 183.481 230.078i 0.426700 0.535065i
\(431\) −116.481 510.336i −0.270257 1.18407i −0.909710 0.415244i \(-0.863696\pi\)
0.639453 0.768830i \(-0.279161\pi\)
\(432\) −51.8957 82.5916i −0.120129 0.191184i
\(433\) −60.9877 541.280i −0.140849 1.25007i −0.842950 0.537993i \(-0.819183\pi\)
0.702101 0.712078i \(-0.252246\pi\)
\(434\) 197.989i 0.456196i
\(435\) −83.9774 106.221i −0.193051 0.244186i
\(436\) −225.401 −0.516975
\(437\) 0.390896 0.0440434i 0.000894499 0.000100786i
\(438\) 140.207 88.0982i 0.320108 0.201137i
\(439\) −645.501 + 147.331i −1.47039 + 0.335607i −0.881337 0.472488i \(-0.843356\pi\)
−0.589053 + 0.808095i \(0.700499\pi\)
\(440\) −126.368 100.775i −0.287201 0.229035i
\(441\) 468.603 373.698i 1.06259 0.847388i
\(442\) −41.4663 + 181.676i −0.0938153 + 0.411031i
\(443\) 130.279 45.5865i 0.294083 0.102904i −0.179205 0.983812i \(-0.557353\pi\)
0.473288 + 0.880908i \(0.343067\pi\)
\(444\) −20.5165 + 42.6030i −0.0462084 + 0.0959528i
\(445\) −33.5268 21.0663i −0.0753410 0.0473399i
\(446\) 90.5083 + 31.6702i 0.202933 + 0.0710095i
\(447\) 230.574 230.574i 0.515825 0.515825i
\(448\) 41.1722 + 85.4950i 0.0919023 + 0.190837i
\(449\) −58.4450 + 518.714i −0.130167 + 1.15526i 0.743498 + 0.668738i \(0.233165\pi\)
−0.873665 + 0.486527i \(0.838263\pi\)
\(450\) −148.354 16.7155i −0.329676 0.0371456i
\(451\) 526.386 253.494i 1.16715 0.562071i
\(452\) 142.502 + 142.502i 0.315270 + 0.315270i
\(453\) −24.7791 + 70.8145i −0.0546999 + 0.156323i
\(454\) −52.0244 + 82.7963i −0.114591 + 0.182371i
\(455\) 789.076 + 379.999i 1.73423 + 0.835163i
\(456\) 1.24680 + 3.56314i 0.00273420 + 0.00781390i
\(457\) −57.1128 13.0356i −0.124973 0.0285244i 0.159577 0.987186i \(-0.448987\pi\)
−0.284550 + 0.958661i \(0.591844\pi\)
\(458\) 292.469 + 366.744i 0.638578 + 0.800752i
\(459\) 80.7172 101.216i 0.175855 0.220515i
\(460\) −0.612458 2.68335i −0.00133143 0.00583337i
\(461\) −70.8891 112.819i −0.153772 0.244727i 0.760950 0.648811i \(-0.224733\pi\)
−0.914722 + 0.404084i \(0.867591\pi\)
\(462\) 56.6288 + 502.594i 0.122573 + 1.08787i
\(463\) 134.255i 0.289967i −0.989434 0.144984i \(-0.953687\pi\)
0.989434 0.144984i \(-0.0463130\pi\)
\(464\) 109.328 + 38.7743i 0.235620 + 0.0835652i
\(465\) −55.1098 −0.118516
\(466\) −314.730 + 35.4616i −0.675387 + 0.0760978i
\(467\) 240.865 151.346i 0.515771 0.324080i −0.248870 0.968537i \(-0.580059\pi\)
0.764641 + 0.644457i \(0.222916\pi\)
\(468\) 316.337 72.2018i 0.675933 0.154277i
\(469\) −24.4848 19.5260i −0.0522065 0.0416333i
\(470\) −143.155 + 114.162i −0.304585 + 0.242899i
\(471\) −88.9715 + 389.810i −0.188899 + 0.827622i
\(472\) −104.998 + 36.7405i −0.222454 + 0.0778400i
\(473\) −583.012 + 1210.64i −1.23258 + 2.55949i
\(474\) −93.9689 59.0446i −0.198247 0.124567i
\(475\) 12.9625 + 4.53578i 0.0272895 + 0.00954900i
\(476\) −89.0552 + 89.0552i −0.187091 + 0.187091i
\(477\) 95.1055 + 197.489i 0.199383 + 0.414022i
\(478\) −4.64326 + 41.2100i −0.00971393 + 0.0862135i
\(479\) −623.117 70.2085i −1.30087 0.146573i −0.565788 0.824550i \(-0.691428\pi\)
−0.735083 + 0.677977i \(0.762857\pi\)
\(480\) 23.7974 11.4602i 0.0495778 0.0238754i
\(481\) −264.369 264.369i −0.549623 0.549623i
\(482\) −53.2873 + 152.286i −0.110555 + 0.315947i
\(483\) −4.58221 + 7.29255i −0.00948698 + 0.0150984i
\(484\) 446.897 + 215.214i 0.923340 + 0.444657i
\(485\) 31.1931 + 89.1447i 0.0643156 + 0.183803i
\(486\) −347.074 79.2174i −0.714144 0.162999i
\(487\) −493.377 618.675i −1.01309 1.27038i −0.962392 0.271665i \(-0.912426\pi\)
−0.0507018 0.998714i \(-0.516146\pi\)
\(488\) −50.5711 + 63.4142i −0.103629 + 0.129947i
\(489\) 76.1219 + 333.512i 0.155669 + 0.682029i
\(490\) 205.242 + 326.640i 0.418860 + 0.666612i
\(491\) 45.1469 + 400.690i 0.0919489 + 0.816069i 0.952049 + 0.305944i \(0.0989721\pi\)
−0.860101 + 0.510125i \(0.829599\pi\)
\(492\) 95.4748i 0.194054i
\(493\) −0.649950 + 153.956i −0.00131836 + 0.312284i
\(494\) −29.8475 −0.0604201
\(495\) −371.177 + 41.8216i −0.749852 + 0.0844881i
\(496\) 39.9749 25.1179i 0.0805945 0.0506409i
\(497\) 484.638 110.615i 0.975127 0.222566i
\(498\) 198.707 + 158.464i 0.399010 + 0.318200i
\(499\) −221.922 + 176.977i −0.444734 + 0.354663i −0.820107 0.572210i \(-0.806086\pi\)
0.375373 + 0.926874i \(0.377515\pi\)
\(500\) 54.4799 238.692i 0.108960 0.477384i
\(501\) 283.433 99.1775i 0.565735 0.197959i
\(502\) 181.947 377.817i 0.362445 0.752624i
\(503\) 464.435 + 291.824i 0.923331 + 0.580167i 0.907658 0.419710i \(-0.137868\pi\)
0.0156724 + 0.999877i \(0.495011\pi\)
\(504\) 206.988 + 72.4282i 0.410690 + 0.143707i
\(505\) 82.9335 82.9335i 0.164225 0.164225i
\(506\) 5.45281 + 11.3229i 0.0107763 + 0.0223772i
\(507\) 78.5625 697.262i 0.154956 1.37527i
\(508\) −340.666 38.3838i −0.670601 0.0755586i
\(509\) 418.324 201.454i 0.821854 0.395784i 0.0248003 0.999692i \(-0.492105\pi\)
0.797054 + 0.603908i \(0.206391\pi\)
\(510\) 24.7883 + 24.7883i 0.0486045 + 0.0486045i
\(511\) −292.249 + 835.201i −0.571917 + 1.63444i
\(512\) −12.0385 + 19.1592i −0.0235127 + 0.0374203i
\(513\) 18.6823 + 8.99692i 0.0364177 + 0.0175379i
\(514\) 166.405 + 475.558i 0.323745 + 0.925209i
\(515\) −319.488 72.9210i −0.620364 0.141594i
\(516\) −136.908 171.677i −0.265325 0.332707i
\(517\) 521.273 653.655i 1.00826 1.26432i
\(518\) −56.2270 246.347i −0.108546 0.475573i
\(519\) −105.013 167.128i −0.202338 0.322019i
\(520\) 23.3826 + 207.527i 0.0449666 + 0.399090i
\(521\) 41.0306i 0.0787536i −0.999224 0.0393768i \(-0.987463\pi\)
0.999224 0.0393768i \(-0.0125373\pi\)
\(522\) 242.015 115.292i 0.463629 0.220866i
\(523\) 29.5333 0.0564690 0.0282345 0.999601i \(-0.491011\pi\)
0.0282345 + 0.999601i \(0.491011\pi\)
\(524\) −60.7946 + 6.84990i −0.116020 + 0.0130723i
\(525\) −254.595 + 159.972i −0.484942 + 0.304709i
\(526\) −2.68649 + 0.613173i −0.00510739 + 0.00116573i
\(527\) 48.9893 + 39.0677i 0.0929588 + 0.0741322i
\(528\) −94.2918 + 75.1952i −0.178583 + 0.142415i
\(529\) 117.666 515.528i 0.222431 0.974534i
\(530\) −133.164 + 46.5961i −0.251253 + 0.0879171i
\(531\) −111.540 + 231.616i −0.210057 + 0.436189i
\(532\) −17.0805 10.7324i −0.0321062 0.0201736i
\(533\) −712.527 249.324i −1.33682 0.467775i
\(534\) −20.8916 + 20.8916i −0.0391228 + 0.0391228i
\(535\) −110.517 229.491i −0.206574 0.428954i
\(536\) 0.836120 7.42077i 0.00155992 0.0138447i
\(537\) −231.962 26.1358i −0.431958 0.0486700i
\(538\) −296.550 + 142.811i −0.551207 + 0.265447i
\(539\) −1245.53 1245.53i −2.31082 2.31082i
\(540\) 47.9188 136.944i 0.0887386 0.253600i
\(541\) 356.034 566.625i 0.658104 1.04737i −0.336304 0.941754i \(-0.609177\pi\)
0.994407 0.105613i \(-0.0336803\pi\)
\(542\) 398.195 + 191.761i 0.734677 + 0.353802i
\(543\) −23.1977 66.2952i −0.0427213 0.122091i
\(544\) −29.2786 6.68265i −0.0538210 0.0122843i
\(545\) −209.034 262.120i −0.383548 0.480954i
\(546\) 407.450 510.927i 0.746246 0.935763i
\(547\) 70.3831 + 308.369i 0.128671 + 0.563745i 0.997627 + 0.0688550i \(0.0219346\pi\)
−0.868956 + 0.494890i \(0.835208\pi\)
\(548\) −113.003 179.844i −0.206210 0.328182i
\(549\) 20.9869 + 186.264i 0.0382276 + 0.339279i
\(550\) 438.750i 0.797728i
\(551\) −24.0642 + 5.38572i −0.0436737 + 0.00977445i
\(552\) −2.05372 −0.00372051
\(553\) 589.314 66.3997i 1.06567 0.120072i
\(554\) 356.226 223.831i 0.643006 0.404028i
\(555\) −68.5701 + 15.6507i −0.123550 + 0.0281994i
\(556\) −76.4205 60.9433i −0.137447 0.109610i
\(557\) 697.831 556.501i 1.25284 0.999105i 0.253341 0.967377i \(-0.418470\pi\)
0.999497 0.0317279i \(-0.0101010\pi\)
\(558\) 24.2779 106.368i 0.0435088 0.190625i
\(559\) 1638.74 573.421i 2.93156 1.02580i
\(560\) −61.2401 + 127.166i −0.109357 + 0.227083i
\(561\) −135.533 85.1612i −0.241592 0.151803i
\(562\) −225.314 78.8408i −0.400915 0.140286i
\(563\) −124.163 + 124.163i −0.220538 + 0.220538i −0.808725 0.588187i \(-0.799842\pi\)
0.588187 + 0.808725i \(0.299842\pi\)
\(564\) 59.2793 + 123.095i 0.105105 + 0.218253i
\(565\) −33.5620 + 297.871i −0.0594017 + 0.527205i
\(566\) −736.555 82.9899i −1.30133 0.146625i
\(567\) 219.645 105.775i 0.387381 0.186553i
\(568\) 83.8173 + 83.8173i 0.147566 + 0.147566i
\(569\) −41.8735 + 119.668i −0.0735915 + 0.210312i −0.974803 0.223067i \(-0.928393\pi\)
0.901212 + 0.433379i \(0.142679\pi\)
\(570\) −2.98733 + 4.75431i −0.00524093 + 0.00834090i
\(571\) −246.859 118.881i −0.432327 0.208198i 0.205047 0.978752i \(-0.434265\pi\)
−0.637374 + 0.770554i \(0.719980\pi\)
\(572\) −314.946 900.064i −0.550605 1.57354i
\(573\) −145.790 33.2756i −0.254433 0.0580726i
\(574\) −318.099 398.883i −0.554179 0.694918i
\(575\) −4.65830 + 5.84132i −0.00810138 + 0.0101588i
\(576\) 11.6359 + 50.9804i 0.0202013 + 0.0885076i
\(577\) 159.535 + 253.898i 0.276490 + 0.440032i 0.955885 0.293741i \(-0.0949005\pi\)
−0.679395 + 0.733773i \(0.737758\pi\)
\(578\) 41.2980 + 366.530i 0.0714498 + 0.634135i
\(579\) 183.631i 0.317152i
\(580\) 56.2983 + 163.097i 0.0970660 + 0.281201i
\(581\) −1358.14 −2.33759
\(582\) 70.0284 7.89030i 0.120324 0.0135572i
\(583\) 545.447 342.727i 0.935586 0.587868i
\(584\) −205.707 + 46.9513i −0.352238 + 0.0803960i
\(585\) 377.330 + 300.911i 0.645009 + 0.514378i
\(586\) 12.6045 10.0517i 0.0215093 0.0171531i
\(587\) 145.112 635.776i 0.247209 1.08309i −0.687081 0.726581i \(-0.741108\pi\)
0.934290 0.356513i \(-0.116035\pi\)
\(588\) 271.695 95.0703i 0.462067 0.161684i
\(589\) −4.35457 + 9.04235i −0.00739316 + 0.0153520i
\(590\) −140.100 88.0304i −0.237457 0.149204i
\(591\) −308.969 108.113i −0.522791 0.182932i
\(592\) 42.6053 42.6053i 0.0719683 0.0719683i
\(593\) 219.375 + 455.537i 0.369941 + 0.768191i 0.999965 0.00838515i \(-0.00266911\pi\)
−0.630024 + 0.776576i \(0.716955\pi\)
\(594\) −74.1733 + 658.306i −0.124871 + 1.10826i
\(595\) −186.151 20.9742i −0.312859 0.0352508i
\(596\) −374.353 + 180.279i −0.628110 + 0.302482i
\(597\) 88.1354 + 88.1354i 0.147631 + 0.147631i
\(598\) 5.36311 15.3269i 0.00896841 0.0256302i
\(599\) −215.059 + 342.264i −0.359030 + 0.571392i −0.976584 0.215136i \(-0.930981\pi\)
0.617554 + 0.786528i \(0.288124\pi\)
\(600\) −64.5983 31.1089i −0.107664 0.0518482i
\(601\) 359.815 + 1028.29i 0.598694 + 1.71097i 0.698172 + 0.715931i \(0.253997\pi\)
−0.0994771 + 0.995040i \(0.531717\pi\)
\(602\) 1143.97 + 261.104i 1.90028 + 0.433727i
\(603\) −10.7600 13.4926i −0.0178441 0.0223758i
\(604\) 59.6047 74.7419i 0.0986833 0.123745i
\(605\) 164.172 + 719.285i 0.271359 + 1.18890i
\(606\) −46.5606 74.1008i −0.0768327 0.122279i
\(607\) 93.1298 + 826.550i 0.153426 + 1.36170i 0.800529 + 0.599294i \(0.204552\pi\)
−0.647103 + 0.762403i \(0.724020\pi\)
\(608\) 4.81018i 0.00791149i
\(609\) 236.310 485.449i 0.388029 0.797125i
\(610\) −120.644 −0.197776
\(611\) −1073.46 + 120.950i −1.75688 + 0.197953i
\(612\) −58.7646 + 36.9242i −0.0960206 + 0.0603337i
\(613\) −1017.21 + 232.171i −1.65939 + 0.378746i −0.946545 0.322572i \(-0.895453\pi\)
−0.712849 + 0.701318i \(0.752596\pi\)
\(614\) −46.3746 36.9825i −0.0755287 0.0602321i
\(615\) −111.028 + 88.5420i −0.180534 + 0.143971i
\(616\) 143.409 628.314i 0.232806 1.01999i
\(617\) −602.539 + 210.837i −0.976562 + 0.341714i −0.770933 0.636916i \(-0.780210\pi\)
−0.205629 + 0.978630i \(0.565924\pi\)
\(618\) −106.094 + 220.307i −0.171673 + 0.356483i
\(619\) 555.634 + 349.128i 0.897631 + 0.564019i 0.899957 0.435978i \(-0.143598\pi\)
−0.00232594 + 0.999997i \(0.500740\pi\)
\(620\) 66.2818 + 23.1930i 0.106906 + 0.0374081i
\(621\) −7.97687 + 7.97687i −0.0128452 + 0.0128452i
\(622\) 37.1165 + 77.0733i 0.0596729 + 0.123912i
\(623\) 17.6770 156.888i 0.0283741 0.251827i
\(624\) 154.850 + 17.4474i 0.248156 + 0.0279605i
\(625\) −35.6752 + 17.1803i −0.0570804 + 0.0274885i
\(626\) 156.567 + 156.567i 0.250107 + 0.250107i
\(627\) 8.46777 24.1995i 0.0135052 0.0385957i
\(628\) 271.060 431.390i 0.431624 0.686926i
\(629\) 72.0495 + 34.6972i 0.114546 + 0.0551625i
\(630\) 107.731 + 307.876i 0.171001 + 0.488693i
\(631\) 856.906 + 195.583i 1.35801 + 0.309958i 0.838685 0.544617i \(-0.183325\pi\)
0.519329 + 0.854575i \(0.326182\pi\)
\(632\) 88.1697 + 110.561i 0.139509 + 0.174939i
\(633\) 73.0627 91.6177i 0.115423 0.144736i
\(634\) −81.6212 357.606i −0.128740 0.564047i
\(635\) −271.292 431.758i −0.427231 0.679935i
\(636\) 11.7865 + 104.608i 0.0185322 + 0.164478i
\(637\) 2275.92i 3.57288i
\(638\) −416.330 668.837i −0.652555 1.04833i
\(639\) 273.933 0.428690
\(640\) −33.4447 + 3.76831i −0.0522573 + 0.00588798i
\(641\) 681.402 428.153i 1.06303 0.667946i 0.117365 0.993089i \(-0.462555\pi\)
0.945665 + 0.325143i \(0.105412\pi\)
\(642\) −185.295 + 42.2924i −0.288622 + 0.0658760i
\(643\) −414.994 330.946i −0.645402 0.514691i 0.245201 0.969472i \(-0.421146\pi\)
−0.890603 + 0.454781i \(0.849717\pi\)
\(644\) 8.58021 6.84249i 0.0133233 0.0106250i
\(645\) 72.6776 318.421i 0.112678 0.493677i
\(646\) 6.02592 2.10856i 0.00932805 0.00326402i
\(647\) −209.179 + 434.364i −0.323306 + 0.671351i −0.997755 0.0669701i \(-0.978667\pi\)
0.674449 + 0.738321i \(0.264381\pi\)
\(648\) 49.2218 + 30.9281i 0.0759595 + 0.0477285i
\(649\) 713.108 + 249.527i 1.09878 + 0.384480i
\(650\) 400.858 400.858i 0.616705 0.616705i
\(651\) −95.3415 197.979i −0.146454 0.304115i
\(652\) 48.8053 433.159i 0.0748547 0.664354i
\(653\) 829.571 + 93.4701i 1.27040 + 0.143140i 0.721303 0.692620i \(-0.243544\pi\)
0.549096 + 0.835759i \(0.314972\pi\)
\(654\) −225.389 + 108.542i −0.344632 + 0.165966i
\(655\) −64.3459 64.3459i −0.0982380 0.0982380i
\(656\) 40.1807 114.830i 0.0612510 0.175045i
\(657\) −259.424 + 412.871i −0.394861 + 0.628418i
\(658\) −657.784 316.772i −0.999671 0.481416i
\(659\) 41.3441 + 118.155i 0.0627377 + 0.179294i 0.970985 0.239139i \(-0.0768652\pi\)
−0.908248 + 0.418433i \(0.862579\pi\)
\(660\) −174.890 39.9175i −0.264985 0.0604810i
\(661\) 531.820 + 666.881i 0.804569 + 1.00890i 0.999605 + 0.0281010i \(0.00894602\pi\)
−0.195037 + 0.980796i \(0.562483\pi\)
\(662\) 181.361 227.420i 0.273959 0.343534i
\(663\) 46.0218 + 201.635i 0.0694144 + 0.304124i
\(664\) −172.300 274.214i −0.259488 0.412973i
\(665\) −3.35946 29.8160i −0.00505182 0.0448361i
\(666\) 139.243i 0.209074i
\(667\) 1.55834 13.3248i 0.00233635 0.0199773i
\(668\) −382.631 −0.572800
\(669\) 105.754 11.9157i 0.158078 0.0178111i
\(670\) 9.40506 5.90959i 0.0140374 0.00882028i
\(671\) 537.055 122.579i 0.800381 0.182682i
\(672\) 82.3402 + 65.6641i 0.122530 + 0.0977144i
\(673\) 329.271 262.584i 0.489258 0.390170i −0.347555 0.937660i \(-0.612988\pi\)
0.836812 + 0.547490i \(0.184416\pi\)
\(674\) −122.776 + 537.918i −0.182161 + 0.798098i
\(675\) −371.737 + 130.076i −0.550722 + 0.192706i
\(676\) −387.932 + 805.550i −0.573865 + 1.19164i
\(677\) −749.742 471.094i −1.10745 0.695855i −0.151226 0.988499i \(-0.548322\pi\)
−0.956222 + 0.292644i \(0.905465\pi\)
\(678\) 211.116 + 73.8728i 0.311381 + 0.108957i
\(679\) −266.282 + 266.282i −0.392168 + 0.392168i
\(680\) −19.3813 40.2457i −0.0285019 0.0591848i
\(681\) −12.1511 + 107.844i −0.0178431 + 0.158362i
\(682\) −318.624 35.9003i −0.467191 0.0526398i
\(683\) −245.345 + 118.152i −0.359217 + 0.172990i −0.604783 0.796390i \(-0.706740\pi\)
0.245566 + 0.969380i \(0.421026\pi\)
\(684\) −7.86036 7.86036i −0.0114918 0.0114918i
\(685\) 104.343 298.197i 0.152326 0.435323i
\(686\) −381.051 + 606.439i −0.555467 + 0.884021i
\(687\) 469.059 + 225.887i 0.682764 + 0.328802i
\(688\) 92.4117 + 264.097i 0.134319 + 0.383863i
\(689\) −811.467 185.212i −1.17775 0.268813i
\(690\) −1.90459 2.38828i −0.00276028 0.00346128i
\(691\) −0.354395 + 0.444397i −0.000512872 + 0.000643121i −0.782088 0.623168i \(-0.785845\pi\)
0.781575 + 0.623811i \(0.214417\pi\)
\(692\) 55.9661 + 245.204i 0.0808759 + 0.354340i
\(693\) −792.388 1261.08i −1.14342 1.81974i
\(694\) −105.853 939.472i −0.152526 1.35371i
\(695\) 145.388i 0.209191i
\(696\) 127.994 13.8745i 0.183899 0.0199346i
\(697\) 161.465 0.231658
\(698\) 301.310 33.9495i 0.431677 0.0486383i
\(699\) −297.637 + 187.018i −0.425805 + 0.267551i
\(700\) 373.532 85.2562i 0.533617 0.121795i
\(701\) −527.785 420.894i −0.752903 0.600420i 0.170004 0.985443i \(-0.445622\pi\)
−0.922907 + 0.385024i \(0.874193\pi\)
\(702\) 669.220 533.685i 0.953304 0.760235i
\(703\) −2.85020 + 12.4876i −0.00405434 + 0.0177632i
\(704\) 145.053 50.7562i 0.206041 0.0720969i
\(705\) −88.1728 + 183.093i −0.125068 + 0.259706i
\(706\) 711.502 + 447.066i 1.00779 + 0.633238i
\(707\) 441.411 + 154.456i 0.624343 + 0.218467i
\(708\) −87.3004 + 87.3004i −0.123306 + 0.123306i
\(709\) 314.808 + 653.705i 0.444017 + 0.922011i 0.996101 + 0.0882220i \(0.0281185\pi\)
−0.552084 + 0.833789i \(0.686167\pi\)
\(710\) −19.7406 + 175.203i −0.0278037 + 0.246764i
\(711\) 324.748 + 36.5903i 0.456748 + 0.0514631i
\(712\) 33.9190 16.3345i 0.0476391 0.0229418i
\(713\) −3.86086 3.86086i −0.00541495 0.00541495i
\(714\) −46.1661 + 131.935i −0.0646583 + 0.184783i
\(715\) 754.613 1200.96i 1.05540 1.67966i
\(716\) 267.986 + 129.055i 0.374283 + 0.180245i
\(717\) 15.2017 + 43.4439i 0.0212018 + 0.0605911i
\(718\) −20.9948 4.79192i −0.0292406 0.00667398i
\(719\) 328.707 + 412.185i 0.457172 + 0.573276i 0.955978 0.293438i \(-0.0947993\pi\)
−0.498806 + 0.866714i \(0.666228\pi\)
\(720\) −48.4944 + 60.8100i −0.0673533 + 0.0844583i
\(721\) −290.758 1273.90i −0.403271 1.76685i
\(722\) −271.075 431.413i −0.375450 0.597525i
\(723\) 20.0489 + 177.939i 0.0277302 + 0.246112i
\(724\) 89.4976i 0.123615i
\(725\) 250.856 395.518i 0.346008 0.545542i
\(726\) 550.510 0.758278
\(727\) −1080.16 + 121.705i −1.48578 + 0.167407i −0.817251 0.576282i \(-0.804503\pi\)
−0.668526 + 0.743689i \(0.733074\pi\)
\(728\) −705.074 + 443.027i −0.968509 + 0.608554i
\(729\) −204.866 + 46.7592i −0.281023 + 0.0641416i
\(730\) −245.370 195.676i −0.336123 0.268049i
\(731\) −290.337 + 231.536i −0.397178 + 0.316739i
\(732\) −20.0314 + 87.7633i −0.0273653 + 0.119895i
\(733\) 513.723 179.759i 0.700849 0.245238i 0.0437509 0.999042i \(-0.486069\pi\)
0.657099 + 0.753805i \(0.271784\pi\)
\(734\) −10.7731 + 22.3705i −0.0146772 + 0.0304775i
\(735\) 362.524 + 227.789i 0.493230 + 0.309917i
\(736\) 2.47006 + 0.864311i 0.00335606 + 0.00117434i
\(737\) −35.8630 + 35.8630i −0.0486608 + 0.0486608i
\(738\) −121.985 253.304i −0.165291 0.343230i
\(739\) 55.7860 495.114i 0.0754884 0.669978i −0.897802 0.440400i \(-0.854837\pi\)
0.973290 0.229579i \(-0.0737348\pi\)
\(740\) 89.0574 + 10.0344i 0.120348 + 0.0135599i
\(741\) −29.8460 + 14.3731i −0.0402780 + 0.0193969i
\(742\) −397.771 397.771i −0.536079 0.536079i
\(743\) −373.461 + 1067.29i −0.502640 + 1.43646i 0.361101 + 0.932527i \(0.382401\pi\)
−0.863741 + 0.503936i \(0.831885\pi\)
\(744\) 27.8773 44.3664i 0.0374695 0.0596323i
\(745\) −556.818 268.149i −0.747406 0.359932i
\(746\) 87.1739 + 249.129i 0.116855 + 0.333953i
\(747\) −729.652 166.538i −0.976777 0.222943i
\(748\) 127.169 + 159.465i 0.170012 + 0.213188i
\(749\) 633.234 794.051i 0.845439 1.06015i
\(750\) −60.4650 264.914i −0.0806200 0.353219i
\(751\) 401.988 + 639.760i 0.535270 + 0.851878i 0.999426 0.0338756i \(-0.0107850\pi\)
−0.464156 + 0.885754i \(0.653642\pi\)
\(752\) −19.4920 172.997i −0.0259203 0.230049i
\(753\) 465.414i 0.618080i
\(754\) −230.699 + 991.447i −0.305967 + 1.31492i
\(755\) 142.194 0.188337
\(756\) 574.864 64.7717i 0.760403 0.0856768i
\(757\) −251.061 + 157.752i −0.331652 + 0.208391i −0.687555 0.726132i \(-0.741316\pi\)
0.355903 + 0.934523i \(0.384173\pi\)
\(758\) −343.018 + 78.2917i −0.452531 + 0.103287i
\(759\) 10.9051 + 8.69649i 0.0143677 + 0.0114578i
\(760\) 5.59379 4.46090i 0.00736025 0.00586961i
\(761\) 145.196 636.146i 0.190797 0.835935i −0.785390 0.619002i \(-0.787537\pi\)
0.976186 0.216933i \(-0.0696054\pi\)
\(762\) −359.131 + 125.666i −0.471301 + 0.164915i
\(763\) 580.016 1204.42i 0.760179 1.57853i
\(764\) 161.341 + 101.377i 0.211179 + 0.132693i
\(765\) −97.4369 34.0946i −0.127368 0.0445682i
\(766\) −205.830 + 205.830i −0.268708 + 0.268708i
\(767\) −423.544 879.499i −0.552209 1.14667i
\(768\) −2.81179 + 24.9553i −0.00366118 + 0.0324939i
\(769\) −1081.20 121.822i −1.40599 0.158417i −0.623860 0.781536i \(-0.714436\pi\)
−0.782127 + 0.623120i \(0.785865\pi\)
\(770\) 863.666 415.920i 1.12164 0.540155i
\(771\) 395.401 + 395.401i 0.512841 + 0.512841i
\(772\) −77.2814 + 220.857i −0.100105 + 0.286085i
\(773\) −500.314 + 796.246i −0.647237 + 1.03007i 0.348453 + 0.937326i \(0.386707\pi\)
−0.995690 + 0.0927457i \(0.970436\pi\)
\(774\) 582.574 + 280.553i 0.752680 + 0.362471i
\(775\) −62.9578 179.923i −0.0812359 0.232159i
\(776\) −87.5454 19.9817i −0.112816 0.0257496i
\(777\) −174.852 219.258i −0.225035 0.282185i
\(778\) −565.938 + 709.663i −0.727426 + 0.912164i
\(779\) 5.75485 + 25.2136i 0.00738748 + 0.0323667i
\(780\) 123.316 + 196.256i 0.158097 + 0.251610i
\(781\) −90.1369 799.987i −0.115412 1.02431i
\(782\) 3.47322i 0.00444145i
\(783\) 443.251 551.031i 0.566094 0.703744i
\(784\) −366.785 −0.467838
\(785\) 753.043 84.8475i 0.959290 0.108086i
\(786\) −57.4928 + 36.1251i −0.0731461 + 0.0459607i
\(787\) 764.270 174.440i 0.971118 0.221651i 0.292600 0.956235i \(-0.405480\pi\)
0.678518 + 0.734583i \(0.262622\pi\)
\(788\) 326.105 + 260.060i 0.413839 + 0.330026i
\(789\) −2.39107 + 1.90682i −0.00303051 + 0.00241675i
\(790\) −46.8050 + 205.066i −0.0592468 + 0.259577i
\(791\) −1128.15 + 394.755i −1.42623 + 0.499058i
\(792\) 154.091 319.973i 0.194559 0.404007i
\(793\) −602.666 378.680i −0.759983 0.477529i
\(794\) −662.747 231.905i −0.834695 0.292072i
\(795\) −110.719 + 110.719i −0.139269 + 0.139269i
\(796\) −68.9106 143.094i −0.0865712 0.179767i
\(797\) 56.2842 499.536i 0.0706201 0.626771i −0.907692 0.419636i \(-0.862158\pi\)
0.978312 0.207135i \(-0.0664138\pi\)
\(798\) −22.2477 2.50672i −0.0278794 0.00314125i
\(799\) 208.176 100.252i 0.260545 0.125472i
\(800\) 64.6017 + 64.6017i 0.0807521 + 0.0807521i
\(801\) 28.7349 82.1197i 0.0358738 0.102521i
\(802\) 323.082 514.183i 0.402846 0.641126i
\(803\) 1291.10 + 621.761i 1.60784 + 0.774297i
\(804\) −2.73739 7.82301i −0.00340471 0.00973011i
\(805\) 15.9143 + 3.63235i 0.0197694 + 0.00451223i
\(806\) 258.307 + 323.907i 0.320480 + 0.401869i
\(807\) −227.764 + 285.607i −0.282235 + 0.353911i
\(808\) 24.8141 + 108.718i 0.0307106 + 0.134552i
\(809\) 683.670 + 1088.05i 0.845080 + 1.34494i 0.937057 + 0.349177i \(0.113539\pi\)
−0.0919765 + 0.995761i \(0.529318\pi\)
\(810\) 9.68115 + 85.9226i 0.0119520 + 0.106077i
\(811\) 343.444i 0.423482i −0.977326 0.211741i \(-0.932087\pi\)
0.977326 0.211741i \(-0.0679133\pi\)
\(812\) −488.517 + 484.410i −0.601622 + 0.596564i
\(813\) 490.516 0.603341
\(814\) −406.642 + 45.8176i −0.499560 + 0.0562869i
\(815\) 548.984 344.950i 0.673600 0.423251i
\(816\) −32.4951 + 7.41680i −0.0398224 + 0.00908921i
\(817\) −46.5035 37.0853i −0.0569199 0.0453921i
\(818\) 559.110 445.876i 0.683509 0.545080i
\(819\) −428.212 + 1876.12i −0.522848 + 2.29075i
\(820\) 170.799 59.7652i 0.208292 0.0728844i
\(821\) 302.188 627.501i 0.368074 0.764313i −0.631869 0.775076i \(-0.717712\pi\)
0.999942 + 0.0107630i \(0.00342605\pi\)
\(822\) −199.601 125.418i −0.242823 0.152576i
\(823\) 526.997 + 184.404i 0.640336 + 0.224063i 0.630866 0.775892i \(-0.282700\pi\)
0.00947029 + 0.999955i \(0.496985\pi\)
\(824\) 220.318 220.318i 0.267376 0.267376i
\(825\) 211.280 + 438.727i 0.256097 + 0.531791i
\(826\) 73.8678 655.595i 0.0894283 0.793698i
\(827\) −1064.02 119.887i −1.28661 0.144966i −0.557967 0.829863i \(-0.688418\pi\)
−0.728639 + 0.684898i \(0.759847\pi\)
\(828\) 5.44872 2.62396i 0.00658058 0.00316904i
\(829\) 398.328 + 398.328i 0.480492 + 0.480492i 0.905289 0.424796i \(-0.139654\pi\)
−0.424796 + 0.905289i \(0.639654\pi\)
\(830\) 159.096 454.671i 0.191682 0.547797i
\(831\) 248.421 395.360i 0.298942 0.475764i
\(832\) −178.898 86.1529i −0.215022 0.103549i
\(833\) −160.781 459.486i −0.193015 0.551604i
\(834\) −105.764 24.1399i −0.126815 0.0289447i
\(835\) −354.846 444.963i −0.424966 0.532890i
\(836\) −20.3688 + 25.5416i −0.0243645 + 0.0305522i
\(837\) −64.0456 280.602i −0.0765181 0.335248i
\(838\) 594.896 + 946.772i 0.709900 + 1.12980i
\(839\) −116.907 1037.58i −0.139341 1.23668i −0.847563 0.530694i \(-0.821931\pi\)
0.708223 0.705989i \(-0.249497\pi\)
\(840\) 156.650i 0.186488i
\(841\) −7.10070 + 840.970i −0.00844316 + 0.999964i
\(842\) 818.048 0.971554
\(843\) −263.268 + 29.6632i −0.312299 + 0.0351876i
\(844\) −126.432 + 79.4422i −0.149800 + 0.0941259i
\(845\) −1296.54 + 295.927i −1.53437 + 0.350210i
\(846\) −314.547 250.843i −0.371805 0.296505i
\(847\) −2299.97 + 1834.16i −2.71543 + 2.16548i
\(848\) 29.8485 130.775i 0.0351987 0.154216i
\(849\) −776.481 + 271.702i −0.914583 + 0.320026i
\(850\) −52.6108 + 109.248i −0.0618951 + 0.128527i
\(851\) −5.90030 3.70740i −0.00693337 0.00435653i
\(852\) 124.175 + 43.4508i 0.145745 + 0.0509986i
\(853\) 598.042 598.042i 0.701104 0.701104i −0.263543 0.964648i \(-0.584891\pi\)
0.964648 + 0.263543i \(0.0848912\pi\)
\(854\) −208.717 433.405i −0.244399 0.507500i
\(855\) 1.85127 16.4304i 0.00216522 0.0192169i
\(856\) 240.658 + 27.1156i 0.281142 + 0.0316771i
\(857\) −295.385 + 142.250i −0.344673 + 0.165986i −0.598209 0.801340i \(-0.704121\pi\)
0.253536 + 0.967326i \(0.418406\pi\)
\(858\) −748.355 748.355i −0.872209 0.872209i
\(859\) −198.560 + 567.450i −0.231152 + 0.660594i 0.768630 + 0.639694i \(0.220939\pi\)
−0.999782 + 0.0209002i \(0.993347\pi\)
\(860\) −221.419 + 352.386i −0.257464 + 0.409752i
\(861\) −510.164 245.682i −0.592525 0.285345i
\(862\) 244.500 + 698.742i 0.283643 + 0.810606i
\(863\) 1561.21 + 356.337i 1.80905 + 0.412905i 0.987551 0.157299i \(-0.0502785\pi\)
0.821504 + 0.570203i \(0.193136\pi\)
\(864\) 86.0078 + 107.850i 0.0995461 + 0.124827i
\(865\) −233.246 + 292.482i −0.269649 + 0.338129i
\(866\) 171.415 + 751.016i 0.197938 + 0.867224i
\(867\) 217.798 + 346.624i 0.251209 + 0.399797i
\(868\) 31.3499 + 278.238i 0.0361174 + 0.320551i
\(869\) 960.425i 1.10521i
\(870\) 134.834 + 135.978i 0.154982 + 0.156296i
\(871\) 65.5315 0.0752370
\(872\) 316.761 35.6904i 0.363258 0.0409293i
\(873\) −175.711 + 110.406i −0.201272 + 0.126468i
\(874\) −0.542361 + 0.123790i −0.000620550 + 0.000141636i
\(875\) 1135.25 + 905.328i 1.29742 + 1.03466i
\(876\) −183.087 + 146.007i −0.209003 + 0.166675i
\(877\) −87.6616 + 384.071i −0.0999563 + 0.437937i 0.900041 + 0.435804i \(0.143536\pi\)
−0.999998 + 0.00213273i \(0.999321\pi\)
\(878\) 883.808 309.258i 1.00661 0.352230i
\(879\) 7.76341 16.1209i 0.00883209 0.0183400i
\(880\) 193.545 + 121.612i 0.219937 + 0.138196i
\(881\) 631.831 + 221.087i 0.717175 + 0.250950i 0.664104 0.747640i \(-0.268813\pi\)
0.0530713 + 0.998591i \(0.483099\pi\)
\(882\) −599.365 + 599.365i −0.679553 + 0.679553i
\(883\) 70.9956 + 147.424i 0.0804028 + 0.166958i 0.937295 0.348538i \(-0.113322\pi\)
−0.856892 + 0.515496i \(0.827608\pi\)
\(884\) 29.5067 261.879i 0.0333786 0.296243i
\(885\) −182.483 20.5609i −0.206196 0.0232327i
\(886\) −175.865 + 84.6922i −0.198493 + 0.0955894i
\(887\) 644.065 + 644.065i 0.726117 + 0.726117i 0.969844 0.243727i \(-0.0783702\pi\)
−0.243727 + 0.969844i \(0.578370\pi\)
\(888\) 22.0865 63.1196i 0.0248722 0.0710806i
\(889\) 1081.72 1721.55i 1.21679 1.93651i
\(890\) 50.4515 + 24.2962i 0.0566871 + 0.0272991i
\(891\) −130.398 372.655i −0.146350 0.418244i
\(892\) −132.208 30.1756i −0.148215 0.0338292i
\(893\) 23.0746 + 28.9346i 0.0258394 + 0.0324015i
\(894\) −287.521 + 360.539i −0.321611 + 0.403288i
\(895\) 98.4476 + 431.327i 0.109997 + 0.481930i
\(896\) −71.3976 113.629i −0.0796849 0.126818i
\(897\) −2.01782 17.9087i −0.00224953 0.0199651i
\(898\) 738.214i 0.822065i
\(899\) 266.703 + 214.537i 0.296666 + 0.238639i
\(900\) 211.132 0.234591
\(901\) 176.911 19.9331i 0.196350 0.0221233i
\(902\) −699.603 + 439.590i −0.775613 + 0.487350i
\(903\) 1269.64 289.788i 1.40603 0.320917i
\(904\) −222.825 177.697i −0.246488 0.196567i
\(905\) −104.077 + 82.9988i −0.115002 + 0.0917114i
\(906\) 23.6097 103.441i 0.0260592 0.114173i
\(907\) 632.513 221.326i 0.697369 0.244020i 0.0417677 0.999127i \(-0.486701\pi\)
0.655601 + 0.755107i \(0.272415\pi\)
\(908\) 60.0008 124.593i 0.0660802 0.137217i
\(909\) 218.206 + 137.108i 0.240050 + 0.150834i
\(910\) −1169.08 409.077i −1.28470 0.449535i
\(911\) −263.433 + 263.433i −0.289169 + 0.289169i −0.836752 0.547583i \(-0.815548\pi\)
0.547583 + 0.836752i \(0.315548\pi\)
\(912\) −2.31634 4.80993i −0.00253985 0.00527405i
\(913\) −246.264 + 2185.66i −0.269731 + 2.39393i
\(914\) 82.3260 + 9.27591i 0.0900722 + 0.0101487i
\(915\) −120.637 + 58.0959i −0.131844 + 0.0634928i
\(916\) −469.084 469.084i −0.512100 0.512100i
\(917\) 119.839 342.479i 0.130685 0.373477i
\(918\) −97.4069 + 155.022i −0.106108 + 0.168869i
\(919\) −512.091 246.610i −0.557227 0.268346i 0.134004 0.990981i \(-0.457217\pi\)
−0.691230 + 0.722635i \(0.742931\pi\)
\(920\) 1.28559 + 3.67399i 0.00139738 + 0.00399347i
\(921\) −64.1811 14.6489i −0.0696863 0.0159054i
\(922\) 117.486 + 147.323i 0.127425 + 0.159786i
\(923\) −648.545 + 813.250i −0.702649 + 0.881094i
\(924\) −159.163 697.340i −0.172255 0.754697i
\(925\) −129.431 205.989i −0.139926 0.222691i
\(926\) 21.2581 + 188.671i 0.0229570 + 0.203749i
\(927\) 720.047i 0.776750i
\(928\) −159.780 37.1791i −0.172177 0.0400637i
\(929\) −1273.82 −1.37117 −0.685584 0.727993i \(-0.740453\pi\)
−0.685584 + 0.727993i \(0.740453\pi\)
\(930\) 77.4470 8.72618i 0.0832763 0.00938299i
\(931\) 66.0207 41.4835i 0.0709137 0.0445580i
\(932\) 436.682 99.6699i 0.468543 0.106942i
\(933\) 74.2292 + 59.1958i 0.0795597 + 0.0634467i
\(934\) −314.528 + 250.828i −0.336754 + 0.268553i
\(935\) −67.5078 + 295.771i −0.0722008 + 0.316332i
\(936\) −433.122 + 151.556i −0.462738 + 0.161919i
\(937\) 436.480 906.360i 0.465827 0.967299i −0.527236 0.849719i \(-0.676772\pi\)
0.993063 0.117581i \(-0.0375139\pi\)
\(938\) 37.5009 + 23.5634i 0.0399796 + 0.0251208i
\(939\) 231.954 + 81.1642i 0.247022 + 0.0864368i
\(940\) 183.102 183.102i 0.194790 0.194790i
\(941\) 530.421 + 1101.43i 0.563678 + 1.17049i 0.966845 + 0.255363i \(0.0821949\pi\)
−0.403168 + 0.915126i \(0.632091\pi\)
\(942\) 63.3105 561.896i 0.0672086 0.596492i
\(943\) −13.9814 1.57533i −0.0148265 0.00167055i
\(944\) 141.739 68.2578i 0.150147 0.0723069i
\(945\) 608.445 + 608.445i 0.643857 + 0.643857i
\(946\) 627.625 1793.65i 0.663452 1.89604i
\(947\) −711.284 + 1132.00i −0.751092 + 1.19536i 0.224223 + 0.974538i \(0.428016\pi\)
−0.975315 + 0.220818i \(0.929127\pi\)
\(948\) 141.406 + 68.0974i 0.149162 + 0.0718327i
\(949\) −611.532 1747.66i −0.644396 1.84158i
\(950\) −18.9347 4.32172i −0.0199312 0.00454918i
\(951\) −253.822 318.282i −0.266900 0.334682i
\(952\) 111.050 139.252i 0.116649 0.146273i
\(953\) 108.911 + 477.168i 0.114282 + 0.500701i 0.999377 + 0.0352914i \(0.0112359\pi\)
−0.885095 + 0.465410i \(0.845907\pi\)
\(954\) −164.925 262.476i −0.172877 0.275132i
\(955\) 31.7332 + 281.640i 0.0332285 + 0.294911i
\(956\) 58.6486i 0.0613479i
\(957\) −738.386 468.318i −0.771563 0.489361i
\(958\) 886.797 0.925675
\(959\) 1251.77 141.041i 1.30529 0.147071i
\(960\) −31.6283 + 19.8734i −0.0329461 + 0.0207014i
\(961\) −801.092 + 182.844i −0.833603 + 0.190264i
\(962\) 413.383 + 329.662i 0.429712 + 0.342684i
\(963\) 437.570 348.950i 0.454382 0.362358i
\(964\) 50.7725 222.449i 0.0526686 0.230756i
\(965\) −328.506 + 114.949i −0.340421 + 0.119118i
\(966\) 5.28477 10.9739i 0.00547077 0.0113602i
\(967\) −1207.67 758.832i −1.24889 0.784728i −0.265127 0.964213i \(-0.585414\pi\)
−0.983761 + 0.179485i \(0.942557\pi\)
\(968\) −662.111 231.683i −0.683999 0.239342i
\(969\) 5.01023 5.01023i 0.00517051 0.00517051i
\(970\) −57.9516 120.338i −0.0597439 0.124060i
\(971\) 109.738 973.956i 0.113016 1.00304i −0.801361 0.598181i \(-0.795891\pi\)
0.914377 0.404863i \(-0.132681\pi\)
\(972\) 500.294 + 56.3696i 0.514705 + 0.0579934i
\(973\) 522.297 251.525i 0.536790 0.258505i
\(974\) 791.315 + 791.315i 0.812438 + 0.812438i
\(975\) 207.804 593.870i 0.213132 0.609097i
\(976\) 61.0275 97.1248i 0.0625282 0.0995131i
\(977\) −1605.12 772.986i −1.64291 0.791183i −0.999674 0.0255126i \(-0.991878\pi\)
−0.643233 0.765670i \(-0.722408\pi\)
\(978\) −159.785 456.638i −0.163379 0.466910i
\(979\) −249.275 56.8955i −0.254622 0.0581159i
\(980\) −340.151 426.536i −0.347093 0.435241i
\(981\) 459.299 575.943i 0.468195 0.587098i
\(982\) −126.892 555.949i −0.129218 0.566140i
\(983\) −472.777 752.421i −0.480954 0.765433i 0.514818 0.857300i \(-0.327860\pi\)
−0.995771 + 0.0918663i \(0.970717\pi\)
\(984\) −15.1176 134.173i −0.0153635 0.136354i
\(985\) 620.406i 0.629854i
\(986\) −23.4643 216.461i −0.0237975 0.219534i
\(987\) −810.291 −0.820963
\(988\) 41.9454 4.72611i 0.0424548 0.00478351i
\(989\) 27.3994 17.2162i 0.0277042 0.0174077i
\(990\) 515.001 117.546i 0.520203 0.118733i
\(991\) −485.813 387.423i −0.490225 0.390942i 0.346944 0.937886i \(-0.387220\pi\)
−0.837169 + 0.546944i \(0.815791\pi\)
\(992\) −52.2003 + 41.6284i −0.0526213 + 0.0419641i
\(993\) 71.8378 314.742i 0.0723442 0.316961i
\(994\) −663.557 + 232.189i −0.667563 + 0.233590i
\(995\) 102.499 212.840i 0.103014 0.213910i
\(996\) −304.339 191.229i −0.305561 0.191997i
\(997\) 250.287 + 87.5793i 0.251040 + 0.0878428i 0.452866 0.891579i \(-0.350402\pi\)
−0.201825 + 0.979421i \(0.564687\pi\)
\(998\) 283.849 283.849i 0.284418 0.284418i
\(999\) −159.377 330.949i −0.159536 0.331281i
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 58.3.f.b.15.2 36
29.2 odd 28 inner 58.3.f.b.31.2 yes 36
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
58.3.f.b.15.2 36 1.1 even 1 trivial
58.3.f.b.31.2 yes 36 29.2 odd 28 inner