Properties

Label 231.2.c.a.76.9
Level $231$
Weight $2$
Character 231.76
Analytic conductor $1.845$
Analytic rank $0$
Dimension $16$
Inner twists $4$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [231,2,Mod(76,231)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(231, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 1, 1]))
 
N = Newforms(chi, 2, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("231.76");
 
S:= CuspForms(chi, 2);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 231 = 3 \cdot 7 \cdot 11 \)
Weight: \( k \) \(=\) \( 2 \)
Character orbit: \([\chi]\) \(=\) 231.c (of order \(2\), degree \(1\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(1.84454428669\)
Analytic rank: \(0\)
Dimension: \(16\)
Coefficient field: \(\mathbb{Q}[x]/(x^{16} + \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{16} + x^{14} - 4x^{12} - 49x^{10} + 11x^{8} + 395x^{6} + 900x^{4} + 1125x^{2} + 625 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{11}]\)
Coefficient ring index: \( 2^{13} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 76.9
Root \(-0.644389 + 0.983224i\) of defining polynomial
Character \(\chi\) \(=\) 231.76
Dual form 231.2.c.a.76.8

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+0.183172i q^{2} -1.00000i q^{3} +1.96645 q^{4} -1.83337i q^{5} +0.183172 q^{6} +(1.47195 + 2.19849i) q^{7} +0.726543i q^{8} -1.00000 q^{9} +O(q^{10})\) \(q+0.183172i q^{2} -1.00000i q^{3} +1.96645 q^{4} -1.83337i q^{5} +0.183172 q^{6} +(1.47195 + 2.19849i) q^{7} +0.726543i q^{8} -1.00000 q^{9} +0.335821 q^{10} +(-1.23607 - 3.07768i) q^{11} -1.96645i q^{12} -0.879192 q^{13} +(-0.402702 + 0.269620i) q^{14} -1.83337 q^{15} +3.79981 q^{16} +3.57781 q^{17} -0.183172i q^{18} -5.64252 q^{19} -3.60522i q^{20} +(2.19849 - 1.47195i) q^{21} +(0.563746 - 0.226413i) q^{22} +0.539240 q^{23} +0.726543 q^{24} +1.63877 q^{25} -0.161043i q^{26} +1.00000i q^{27} +(2.89451 + 4.32322i) q^{28} +3.82309i q^{29} -0.335821i q^{30} +5.59963i q^{31} +2.14910i q^{32} +(-3.07768 + 1.23607i) q^{33} +0.655355i q^{34} +(4.03064 - 2.69862i) q^{35} -1.96645 q^{36} -2.63877 q^{37} -1.03355i q^{38} +0.879192i q^{39} +1.33202 q^{40} -10.5524 q^{41} +(0.269620 + 0.402702i) q^{42} -6.21641i q^{43} +(-2.43066 - 6.05210i) q^{44} +1.83337i q^{45} +0.0987737i q^{46} +5.29413i q^{47} -3.79981i q^{48} +(-2.66673 + 6.47214i) q^{49} +0.300177i q^{50} -3.57781i q^{51} -1.72889 q^{52} -3.93290 q^{53} -0.183172 q^{54} +(-5.64252 + 2.26616i) q^{55} +(-1.59730 + 1.06943i) q^{56} +5.64252i q^{57} -0.700283 q^{58} +10.2384i q^{59} -3.60522 q^{60} +0.732688 q^{61} -1.02570 q^{62} +(-1.47195 - 2.19849i) q^{63} +7.20597 q^{64} +1.61188i q^{65} +(-0.226413 - 0.563746i) q^{66} -1.62739 q^{67} +7.03558 q^{68} -0.539240i q^{69} +(0.494312 + 0.738301i) q^{70} -10.1389 q^{71} -0.726543i q^{72} +14.3377 q^{73} -0.483349i q^{74} -1.63877i q^{75} -11.0957 q^{76} +(4.94683 - 7.24768i) q^{77} -0.161043 q^{78} +11.3105i q^{79} -6.96645i q^{80} +1.00000 q^{81} -1.93290i q^{82} -10.1983 q^{83} +(4.32322 - 2.89451i) q^{84} -6.55944i q^{85} +1.13867 q^{86} +3.82309 q^{87} +(2.23607 - 0.898056i) q^{88} -2.80540i q^{89} -0.335821 q^{90} +(-1.29413 - 1.93290i) q^{91} +1.06039 q^{92} +5.59963 q^{93} -0.969736 q^{94} +10.3448i q^{95} +2.14910 q^{96} -13.4654i q^{97} +(-1.18551 - 0.488471i) q^{98} +(1.23607 + 3.07768i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 16 q - 12 q^{4} - 16 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 16 q - 12 q^{4} - 16 q^{9} + 16 q^{11} + 8 q^{14} - 8 q^{15} - 4 q^{16} - 20 q^{22} + 24 q^{23} - 24 q^{25} + 12 q^{36} + 8 q^{37} + 12 q^{42} - 32 q^{44} + 24 q^{53} - 40 q^{56} - 12 q^{58} + 36 q^{60} + 88 q^{64} - 32 q^{67} + 36 q^{70} - 48 q^{71} + 12 q^{78} + 16 q^{81} + 32 q^{86} + 16 q^{91} - 128 q^{92} - 40 q^{93} - 16 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/231\mathbb{Z}\right)^\times\).

\(n\) \(155\) \(199\) \(211\)
\(\chi(n)\) \(1\) \(-1\) \(-1\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 0.183172i 0.129522i 0.997901 + 0.0647611i \(0.0206285\pi\)
−0.997901 + 0.0647611i \(0.979371\pi\)
\(3\) 1.00000i 0.577350i
\(4\) 1.96645 0.983224
\(5\) 1.83337i 0.819906i −0.912107 0.409953i \(-0.865545\pi\)
0.912107 0.409953i \(-0.134455\pi\)
\(6\) 0.183172 0.0747797
\(7\) 1.47195 + 2.19849i 0.556344 + 0.830952i
\(8\) 0.726543i 0.256872i
\(9\) −1.00000 −0.333333
\(10\) 0.335821 0.106196
\(11\) −1.23607 3.07768i −0.372689 0.927957i
\(12\) 1.96645i 0.567665i
\(13\) −0.879192 −0.243844 −0.121922 0.992540i \(-0.538906\pi\)
−0.121922 + 0.992540i \(0.538906\pi\)
\(14\) −0.402702 + 0.269620i −0.107627 + 0.0720590i
\(15\) −1.83337 −0.473373
\(16\) 3.79981 0.949953
\(17\) 3.57781 0.867747 0.433874 0.900974i \(-0.357146\pi\)
0.433874 + 0.900974i \(0.357146\pi\)
\(18\) 0.183172i 0.0431741i
\(19\) −5.64252 −1.29448 −0.647241 0.762285i \(-0.724077\pi\)
−0.647241 + 0.762285i \(0.724077\pi\)
\(20\) 3.60522i 0.806151i
\(21\) 2.19849 1.47195i 0.479750 0.321206i
\(22\) 0.563746 0.226413i 0.120191 0.0482714i
\(23\) 0.539240 0.112439 0.0562197 0.998418i \(-0.482095\pi\)
0.0562197 + 0.998418i \(0.482095\pi\)
\(24\) 0.726543 0.148305
\(25\) 1.63877 0.327754
\(26\) 0.161043i 0.0315832i
\(27\) 1.00000i 0.192450i
\(28\) 2.89451 + 4.32322i 0.547011 + 0.817012i
\(29\) 3.82309i 0.709930i 0.934880 + 0.354965i \(0.115507\pi\)
−0.934880 + 0.354965i \(0.884493\pi\)
\(30\) 0.335821i 0.0613123i
\(31\) 5.59963i 1.00572i 0.864367 + 0.502861i \(0.167719\pi\)
−0.864367 + 0.502861i \(0.832281\pi\)
\(32\) 2.14910i 0.379912i
\(33\) −3.07768 + 1.23607i −0.535756 + 0.215172i
\(34\) 0.655355i 0.112393i
\(35\) 4.03064 2.69862i 0.681302 0.456150i
\(36\) −1.96645 −0.327741
\(37\) −2.63877 −0.433811 −0.216906 0.976193i \(-0.569596\pi\)
−0.216906 + 0.976193i \(0.569596\pi\)
\(38\) 1.03355i 0.167664i
\(39\) 0.879192i 0.140783i
\(40\) 1.33202 0.210611
\(41\) −10.5524 −1.64800 −0.824000 0.566590i \(-0.808263\pi\)
−0.824000 + 0.566590i \(0.808263\pi\)
\(42\) 0.269620 + 0.402702i 0.0416033 + 0.0621383i
\(43\) 6.21641i 0.947994i −0.880526 0.473997i \(-0.842811\pi\)
0.880526 0.473997i \(-0.157189\pi\)
\(44\) −2.43066 6.05210i −0.366436 0.912389i
\(45\) 1.83337i 0.273302i
\(46\) 0.0987737i 0.0145634i
\(47\) 5.29413i 0.772228i 0.922451 + 0.386114i \(0.126183\pi\)
−0.922451 + 0.386114i \(0.873817\pi\)
\(48\) 3.79981i 0.548456i
\(49\) −2.66673 + 6.47214i −0.380962 + 0.924591i
\(50\) 0.300177i 0.0424514i
\(51\) 3.57781i 0.500994i
\(52\) −1.72889 −0.239753
\(53\) −3.93290 −0.540225 −0.270112 0.962829i \(-0.587061\pi\)
−0.270112 + 0.962829i \(0.587061\pi\)
\(54\) −0.183172 −0.0249266
\(55\) −5.64252 + 2.26616i −0.760837 + 0.305570i
\(56\) −1.59730 + 1.06943i −0.213448 + 0.142909i
\(57\) 5.64252i 0.747370i
\(58\) −0.700283 −0.0919517
\(59\) 10.2384i 1.33293i 0.745538 + 0.666463i \(0.232193\pi\)
−0.745538 + 0.666463i \(0.767807\pi\)
\(60\) −3.60522 −0.465432
\(61\) 0.732688 0.0938111 0.0469056 0.998899i \(-0.485064\pi\)
0.0469056 + 0.998899i \(0.485064\pi\)
\(62\) −1.02570 −0.130263
\(63\) −1.47195 2.19849i −0.185448 0.276984i
\(64\) 7.20597 0.900746
\(65\) 1.61188i 0.199929i
\(66\) −0.226413 0.563746i −0.0278695 0.0693923i
\(67\) −1.62739 −0.198818 −0.0994089 0.995047i \(-0.531695\pi\)
−0.0994089 + 0.995047i \(0.531695\pi\)
\(68\) 7.03558 0.853190
\(69\) 0.539240i 0.0649169i
\(70\) 0.494312 + 0.738301i 0.0590816 + 0.0882438i
\(71\) −10.1389 −1.20326 −0.601631 0.798774i \(-0.705482\pi\)
−0.601631 + 0.798774i \(0.705482\pi\)
\(72\) 0.726543i 0.0856239i
\(73\) 14.3377 1.67810 0.839051 0.544053i \(-0.183111\pi\)
0.839051 + 0.544053i \(0.183111\pi\)
\(74\) 0.483349i 0.0561882i
\(75\) 1.63877i 0.189229i
\(76\) −11.0957 −1.27277
\(77\) 4.94683 7.24768i 0.563744 0.825950i
\(78\) −0.161043 −0.0182346
\(79\) 11.3105i 1.27253i 0.771471 + 0.636264i \(0.219521\pi\)
−0.771471 + 0.636264i \(0.780479\pi\)
\(80\) 6.96645i 0.778873i
\(81\) 1.00000 0.111111
\(82\) 1.93290i 0.213453i
\(83\) −10.1983 −1.11941 −0.559704 0.828692i \(-0.689085\pi\)
−0.559704 + 0.828692i \(0.689085\pi\)
\(84\) 4.32322 2.89451i 0.471702 0.315817i
\(85\) 6.55944i 0.711471i
\(86\) 1.13867 0.122786
\(87\) 3.82309 0.409878
\(88\) 2.23607 0.898056i 0.238366 0.0957331i
\(89\) 2.80540i 0.297372i −0.988884 0.148686i \(-0.952496\pi\)
0.988884 0.148686i \(-0.0475044\pi\)
\(90\) −0.335821 −0.0353987
\(91\) −1.29413 1.93290i −0.135661 0.202623i
\(92\) 1.06039 0.110553
\(93\) 5.59963 0.580654
\(94\) −0.969736 −0.100021
\(95\) 10.3448i 1.06135i
\(96\) 2.14910 0.219342
\(97\) 13.4654i 1.36721i −0.729854 0.683603i \(-0.760412\pi\)
0.729854 0.683603i \(-0.239588\pi\)
\(98\) −1.18551 0.488471i −0.119755 0.0493430i
\(99\) 1.23607 + 3.07768i 0.124230 + 0.309319i
\(100\) 3.22256 0.322256
\(101\) 17.1118 1.70269 0.851343 0.524609i \(-0.175788\pi\)
0.851343 + 0.524609i \(0.175788\pi\)
\(102\) 0.655355 0.0648899
\(103\) 5.27754i 0.520012i −0.965607 0.260006i \(-0.916276\pi\)
0.965607 0.260006i \(-0.0837245\pi\)
\(104\) 0.638770i 0.0626366i
\(105\) −2.69862 4.03064i −0.263358 0.393350i
\(106\) 0.720397i 0.0699711i
\(107\) 7.58616i 0.733382i −0.930343 0.366691i \(-0.880491\pi\)
0.930343 0.366691i \(-0.119509\pi\)
\(108\) 1.96645i 0.189222i
\(109\) 11.2240i 1.07506i −0.843243 0.537532i \(-0.819357\pi\)
0.843243 0.537532i \(-0.180643\pi\)
\(110\) −0.415098 1.03355i −0.0395780 0.0985453i
\(111\) 2.63877i 0.250461i
\(112\) 5.59313 + 8.35386i 0.528501 + 0.789365i
\(113\) 9.33346 0.878018 0.439009 0.898483i \(-0.355330\pi\)
0.439009 + 0.898483i \(0.355330\pi\)
\(114\) −1.03355 −0.0968010
\(115\) 0.988624i 0.0921897i
\(116\) 7.51791i 0.698020i
\(117\) 0.879192 0.0812813
\(118\) −1.87539 −0.172644
\(119\) 5.26636 + 7.86579i 0.482766 + 0.721056i
\(120\) 1.33202i 0.121596i
\(121\) −7.94427 + 7.60845i −0.722207 + 0.691677i
\(122\) 0.134208i 0.0121506i
\(123\) 10.5524i 0.951473i
\(124\) 11.0114i 0.988851i
\(125\) 12.1713i 1.08863i
\(126\) 0.402702 0.269620i 0.0358756 0.0240197i
\(127\) 2.57755i 0.228721i −0.993439 0.114360i \(-0.963518\pi\)
0.993439 0.114360i \(-0.0364819\pi\)
\(128\) 5.61814i 0.496578i
\(129\) −6.21641 −0.547325
\(130\) −0.295251 −0.0258953
\(131\) −7.64618 −0.668050 −0.334025 0.942564i \(-0.608407\pi\)
−0.334025 + 0.942564i \(0.608407\pi\)
\(132\) −6.05210 + 2.43066i −0.526768 + 0.211562i
\(133\) −8.30550 12.4050i −0.720178 1.07565i
\(134\) 0.298093i 0.0257513i
\(135\) 1.83337 0.157791
\(136\) 2.59943i 0.222900i
\(137\) 19.4654 1.66304 0.831522 0.555493i \(-0.187470\pi\)
0.831522 + 0.555493i \(0.187470\pi\)
\(138\) 0.0987737 0.00840818
\(139\) 6.58276 0.558342 0.279171 0.960241i \(-0.409940\pi\)
0.279171 + 0.960241i \(0.409940\pi\)
\(140\) 7.92604 5.30670i 0.669873 0.448498i
\(141\) 5.29413 0.445846
\(142\) 1.85716i 0.155849i
\(143\) 1.08674 + 2.70587i 0.0908778 + 0.226277i
\(144\) −3.79981 −0.316651
\(145\) 7.00912 0.582076
\(146\) 2.62627i 0.217352i
\(147\) 6.47214 + 2.66673i 0.533813 + 0.219948i
\(148\) −5.18900 −0.426534
\(149\) 5.70356i 0.467254i 0.972326 + 0.233627i \(0.0750595\pi\)
−0.972326 + 0.233627i \(0.924940\pi\)
\(150\) 0.300177 0.0245093
\(151\) 13.1299i 1.06850i −0.845328 0.534248i \(-0.820595\pi\)
0.845328 0.534248i \(-0.179405\pi\)
\(152\) 4.09953i 0.332516i
\(153\) −3.57781 −0.289249
\(154\) 1.32757 + 0.906122i 0.106979 + 0.0730174i
\(155\) 10.2662 0.824598
\(156\) 1.72889i 0.138422i
\(157\) 22.4540i 1.79203i −0.444026 0.896014i \(-0.646450\pi\)
0.444026 0.896014i \(-0.353550\pi\)
\(158\) −2.07176 −0.164821
\(159\) 3.93290i 0.311899i
\(160\) 3.94010 0.311492
\(161\) 0.793734 + 1.18551i 0.0625550 + 0.0934316i
\(162\) 0.183172i 0.0143914i
\(163\) −17.5719 −1.37633 −0.688167 0.725552i \(-0.741584\pi\)
−0.688167 + 0.725552i \(0.741584\pi\)
\(164\) −20.7506 −1.62035
\(165\) 2.26616 + 5.64252i 0.176421 + 0.439270i
\(166\) 1.86804i 0.144988i
\(167\) 14.6207 1.13139 0.565693 0.824616i \(-0.308609\pi\)
0.565693 + 0.824616i \(0.308609\pi\)
\(168\) 1.06943 + 1.59730i 0.0825086 + 0.123234i
\(169\) −12.2270 −0.940540
\(170\) 1.20151 0.0921513
\(171\) 5.64252 0.431494
\(172\) 12.2243i 0.932090i
\(173\) −10.6744 −0.811563 −0.405781 0.913970i \(-0.633001\pi\)
−0.405781 + 0.913970i \(0.633001\pi\)
\(174\) 0.700283i 0.0530883i
\(175\) 2.41219 + 3.60282i 0.182344 + 0.272348i
\(176\) −4.69683 11.6946i −0.354037 0.881515i
\(177\) 10.2384 0.769565
\(178\) 0.513872 0.0385163
\(179\) −18.0047 −1.34573 −0.672866 0.739765i \(-0.734937\pi\)
−0.672866 + 0.739765i \(0.734937\pi\)
\(180\) 3.60522i 0.268717i
\(181\) 13.2664i 0.986081i −0.870006 0.493040i \(-0.835885\pi\)
0.870006 0.493040i \(-0.164115\pi\)
\(182\) 0.354053 0.237048i 0.0262441 0.0175711i
\(183\) 0.732688i 0.0541619i
\(184\) 0.391781i 0.0288825i
\(185\) 4.83783i 0.355684i
\(186\) 1.02570i 0.0752076i
\(187\) −4.42242 11.0114i −0.323399 0.805232i
\(188\) 10.4106i 0.759273i
\(189\) −2.19849 + 1.47195i −0.159917 + 0.107069i
\(190\) −1.89488 −0.137469
\(191\) 9.81678 0.710317 0.355159 0.934806i \(-0.384427\pi\)
0.355159 + 0.934806i \(0.384427\pi\)
\(192\) 7.20597i 0.520046i
\(193\) 23.6568i 1.70286i −0.524472 0.851428i \(-0.675737\pi\)
0.524472 0.851428i \(-0.324263\pi\)
\(194\) 2.46649 0.177084
\(195\) 1.61188 0.115429
\(196\) −5.24399 + 12.7271i −0.374571 + 0.909080i
\(197\) 17.1351i 1.22083i 0.792083 + 0.610413i \(0.208996\pi\)
−0.792083 + 0.610413i \(0.791004\pi\)
\(198\) −0.563746 + 0.226413i −0.0400637 + 0.0160905i
\(199\) 14.2662i 1.01130i 0.862738 + 0.505651i \(0.168748\pi\)
−0.862738 + 0.505651i \(0.831252\pi\)
\(200\) 1.19064i 0.0841907i
\(201\) 1.62739i 0.114788i
\(202\) 3.13440i 0.220536i
\(203\) −8.40503 + 5.62739i −0.589918 + 0.394966i
\(204\) 7.03558i 0.492589i
\(205\) 19.3463i 1.35121i
\(206\) 0.966698 0.0673530
\(207\) −0.539240 −0.0374798
\(208\) −3.34077 −0.231640
\(209\) 6.97454 + 17.3659i 0.482439 + 1.20122i
\(210\) 0.738301 0.494312i 0.0509476 0.0341108i
\(211\) 7.79371i 0.536541i 0.963344 + 0.268270i \(0.0864521\pi\)
−0.963344 + 0.268270i \(0.913548\pi\)
\(212\) −7.73384 −0.531162
\(213\) 10.1389i 0.694704i
\(214\) 1.38957 0.0949892
\(215\) −11.3970 −0.777266
\(216\) −0.726543 −0.0494350
\(217\) −12.3107 + 8.24237i −0.835707 + 0.559528i
\(218\) 2.05592 0.139245
\(219\) 14.3377i 0.968853i
\(220\) −11.0957 + 4.45629i −0.748073 + 0.300443i
\(221\) −3.14558 −0.211595
\(222\) −0.483349 −0.0324403
\(223\) 23.8103i 1.59445i 0.603680 + 0.797226i \(0.293700\pi\)
−0.603680 + 0.797226i \(0.706300\pi\)
\(224\) −4.72479 + 3.16337i −0.315688 + 0.211362i
\(225\) −1.63877 −0.109251
\(226\) 1.70963i 0.113723i
\(227\) −3.63886 −0.241520 −0.120760 0.992682i \(-0.538533\pi\)
−0.120760 + 0.992682i \(0.538533\pi\)
\(228\) 11.0957i 0.734832i
\(229\) 0.322087i 0.0212841i −0.999943 0.0106420i \(-0.996612\pi\)
0.999943 0.0106420i \(-0.00338753\pi\)
\(230\) 0.181088 0.0119406
\(231\) −7.24768 4.94683i −0.476862 0.325478i
\(232\) −2.77764 −0.182361
\(233\) 25.9291i 1.69867i −0.527854 0.849335i \(-0.677003\pi\)
0.527854 0.849335i \(-0.322997\pi\)
\(234\) 0.161043i 0.0105277i
\(235\) 9.70607 0.633154
\(236\) 20.1333i 1.31056i
\(237\) 11.3105 0.734694
\(238\) −1.44079 + 0.964650i −0.0933928 + 0.0625290i
\(239\) 15.8896i 1.02781i −0.857847 0.513905i \(-0.828198\pi\)
0.857847 0.513905i \(-0.171802\pi\)
\(240\) −6.96645 −0.449682
\(241\) 6.76699 0.435900 0.217950 0.975960i \(-0.430063\pi\)
0.217950 + 0.975960i \(0.430063\pi\)
\(242\) −1.39366 1.45517i −0.0895876 0.0935418i
\(243\) 1.00000i 0.0641500i
\(244\) 1.44079 0.0922374
\(245\) 11.8658 + 4.88909i 0.758078 + 0.312353i
\(246\) −1.93290 −0.123237
\(247\) 4.96086 0.315652
\(248\) −4.06837 −0.258342
\(249\) 10.1983i 0.646291i
\(250\) 2.22944 0.141002
\(251\) 4.21565i 0.266089i −0.991110 0.133045i \(-0.957525\pi\)
0.991110 0.133045i \(-0.0424754\pi\)
\(252\) −2.89451 4.32322i −0.182337 0.272337i
\(253\) −0.666537 1.65961i −0.0419048 0.104339i
\(254\) 0.472136 0.0296244
\(255\) −6.55944 −0.410768
\(256\) 13.3829 0.836428
\(257\) 11.7774i 0.734657i −0.930091 0.367328i \(-0.880273\pi\)
0.930091 0.367328i \(-0.119727\pi\)
\(258\) 1.13867i 0.0708907i
\(259\) −3.88414 5.80131i −0.241348 0.360476i
\(260\) 3.16968i 0.196575i
\(261\) 3.82309i 0.236643i
\(262\) 1.40057i 0.0865273i
\(263\) 15.6474i 0.964862i 0.875934 + 0.482431i \(0.160246\pi\)
−0.875934 + 0.482431i \(0.839754\pi\)
\(264\) −0.898056 2.23607i −0.0552715 0.137620i
\(265\) 7.21044i 0.442934i
\(266\) 2.27226 1.52134i 0.139321 0.0932791i
\(267\) −2.80540 −0.171688
\(268\) −3.20019 −0.195482
\(269\) 18.1389i 1.10595i −0.833199 0.552973i \(-0.813493\pi\)
0.833199 0.552973i \(-0.186507\pi\)
\(270\) 0.335821i 0.0204374i
\(271\) −12.5051 −0.759633 −0.379817 0.925062i \(-0.624013\pi\)
−0.379817 + 0.925062i \(0.624013\pi\)
\(272\) 13.5950 0.824319
\(273\) −1.93290 + 1.29413i −0.116984 + 0.0783241i
\(274\) 3.56552i 0.215401i
\(275\) −2.02563 5.04362i −0.122150 0.304142i
\(276\) 1.06039i 0.0638278i
\(277\) 1.51625i 0.0911026i −0.998962 0.0455513i \(-0.985496\pi\)
0.998962 0.0455513i \(-0.0145045\pi\)
\(278\) 1.20578i 0.0723177i
\(279\) 5.59963i 0.335241i
\(280\) 1.96066 + 2.92843i 0.117172 + 0.175007i
\(281\) 23.2895i 1.38933i 0.719332 + 0.694666i \(0.244448\pi\)
−0.719332 + 0.694666i \(0.755552\pi\)
\(282\) 0.969736i 0.0577469i
\(283\) −2.12575 −0.126363 −0.0631814 0.998002i \(-0.520125\pi\)
−0.0631814 + 0.998002i \(0.520125\pi\)
\(284\) −19.9376 −1.18308
\(285\) 10.3448 0.612773
\(286\) −0.495641 + 0.199061i −0.0293078 + 0.0117707i
\(287\) −15.5325 23.1993i −0.916856 1.36941i
\(288\) 2.14910i 0.126637i
\(289\) −4.19925 −0.247015
\(290\) 1.28388i 0.0753918i
\(291\) −13.4654 −0.789357
\(292\) 28.1944 1.64995
\(293\) 13.7761 0.804809 0.402404 0.915462i \(-0.368175\pi\)
0.402404 + 0.915462i \(0.368175\pi\)
\(294\) −0.488471 + 1.18551i −0.0284882 + 0.0691406i
\(295\) 18.7707 1.09287
\(296\) 1.91718i 0.111434i
\(297\) 3.07768 1.23607i 0.178585 0.0717239i
\(298\) −1.04473 −0.0605198
\(299\) −0.474095 −0.0274176
\(300\) 3.22256i 0.186054i
\(301\) 13.6667 9.15024i 0.787737 0.527411i
\(302\) 2.40503 0.138394
\(303\) 17.1118i 0.983047i
\(304\) −21.4405 −1.22970
\(305\) 1.34329i 0.0769163i
\(306\) 0.655355i 0.0374642i
\(307\) 32.1099 1.83261 0.916304 0.400484i \(-0.131158\pi\)
0.916304 + 0.400484i \(0.131158\pi\)
\(308\) 9.72769 14.2522i 0.554287 0.812094i
\(309\) −5.27754 −0.300229
\(310\) 1.88047i 0.106804i
\(311\) 29.4766i 1.67146i −0.549137 0.835732i \(-0.685043\pi\)
0.549137 0.835732i \(-0.314957\pi\)
\(312\) −0.638770 −0.0361632
\(313\) 13.9329i 0.787534i 0.919210 + 0.393767i \(0.128828\pi\)
−0.919210 + 0.393767i \(0.871172\pi\)
\(314\) 4.11295 0.232107
\(315\) −4.03064 + 2.69862i −0.227101 + 0.152050i
\(316\) 22.2415i 1.25118i
\(317\) 26.3869 1.48204 0.741019 0.671484i \(-0.234343\pi\)
0.741019 + 0.671484i \(0.234343\pi\)
\(318\) −0.720397 −0.0403978
\(319\) 11.7663 4.72560i 0.658784 0.264583i
\(320\) 13.2112i 0.738527i
\(321\) −7.58616 −0.423418
\(322\) −0.217153 + 0.145390i −0.0121015 + 0.00810226i
\(323\) −20.1879 −1.12328
\(324\) 1.96645 0.109247
\(325\) −1.44079 −0.0799208
\(326\) 3.21867i 0.178266i
\(327\) −11.2240 −0.620688
\(328\) 7.66673i 0.423324i
\(329\) −11.6391 + 7.79268i −0.641684 + 0.429625i
\(330\) −1.03355 + 0.415098i −0.0568952 + 0.0228504i
\(331\) 14.7873 0.812784 0.406392 0.913699i \(-0.366787\pi\)
0.406392 + 0.913699i \(0.366787\pi\)
\(332\) −20.0544 −1.10063
\(333\) 2.63877 0.144604
\(334\) 2.67811i 0.146540i
\(335\) 2.98361i 0.163012i
\(336\) 8.35386 5.59313i 0.455740 0.305130i
\(337\) 1.37975i 0.0751597i −0.999294 0.0375798i \(-0.988035\pi\)
0.999294 0.0375798i \(-0.0119648\pi\)
\(338\) 2.23965i 0.121821i
\(339\) 9.33346i 0.506924i
\(340\) 12.8988i 0.699535i
\(341\) 17.2339 6.92152i 0.933267 0.374821i
\(342\) 1.03355i 0.0558881i
\(343\) −18.1542 + 3.66387i −0.980236 + 0.197830i
\(344\) 4.51649 0.243513
\(345\) −0.988624 −0.0532257
\(346\) 1.95526i 0.105115i
\(347\) 30.8989i 1.65874i 0.558699 + 0.829371i \(0.311301\pi\)
−0.558699 + 0.829371i \(0.688699\pi\)
\(348\) 7.51791 0.403002
\(349\) 2.34457 0.125502 0.0627509 0.998029i \(-0.480013\pi\)
0.0627509 + 0.998029i \(0.480013\pi\)
\(350\) −0.659937 + 0.441845i −0.0352751 + 0.0236176i
\(351\) 0.879192i 0.0469278i
\(352\) 6.61426 2.65644i 0.352541 0.141589i
\(353\) 34.6434i 1.84388i 0.387328 + 0.921942i \(0.373398\pi\)
−0.387328 + 0.921942i \(0.626602\pi\)
\(354\) 1.87539i 0.0996758i
\(355\) 18.5883i 0.986562i
\(356\) 5.51668i 0.292384i
\(357\) 7.86579 5.26636i 0.416302 0.278725i
\(358\) 3.29795i 0.174302i
\(359\) 20.6642i 1.09061i −0.838237 0.545306i \(-0.816413\pi\)
0.838237 0.545306i \(-0.183587\pi\)
\(360\) −1.33202 −0.0702035
\(361\) 12.8380 0.675686
\(362\) 2.43003 0.127719
\(363\) 7.60845 + 7.94427i 0.399340 + 0.416966i
\(364\) −2.54483 3.80094i −0.133385 0.199223i
\(365\) 26.2863i 1.37589i
\(366\) 0.134208 0.00701517
\(367\) 1.84304i 0.0962059i 0.998842 + 0.0481030i \(0.0153176\pi\)
−0.998842 + 0.0481030i \(0.984682\pi\)
\(368\) 2.04901 0.106812
\(369\) 10.5524 0.549333
\(370\) −0.886156 −0.0460690
\(371\) −5.78902 8.64644i −0.300551 0.448901i
\(372\) 11.0114 0.570913
\(373\) 26.4409i 1.36906i 0.728986 + 0.684529i \(0.239992\pi\)
−0.728986 + 0.684529i \(0.760008\pi\)
\(374\) 2.01698 0.810064i 0.104295 0.0418874i
\(375\) −12.1713 −0.628523
\(376\) −3.84641 −0.198363
\(377\) 3.36123i 0.173112i
\(378\) −0.269620 0.402702i −0.0138678 0.0207128i
\(379\) −2.70587 −0.138991 −0.0694957 0.997582i \(-0.522139\pi\)
−0.0694957 + 0.997582i \(0.522139\pi\)
\(380\) 20.3425i 1.04355i
\(381\) −2.57755 −0.132052
\(382\) 1.79816i 0.0920019i
\(383\) 7.05573i 0.360531i 0.983618 + 0.180265i \(0.0576957\pi\)
−0.983618 + 0.180265i \(0.942304\pi\)
\(384\) 5.61814 0.286700
\(385\) −13.2876 9.06935i −0.677201 0.462217i
\(386\) 4.33327 0.220558
\(387\) 6.21641i 0.315998i
\(388\) 26.4790i 1.34427i
\(389\) 14.8101 0.750900 0.375450 0.926843i \(-0.377488\pi\)
0.375450 + 0.926843i \(0.377488\pi\)
\(390\) 0.295251i 0.0149506i
\(391\) 1.92930 0.0975689
\(392\) −4.70228 1.93749i −0.237501 0.0978582i
\(393\) 7.64618i 0.385699i
\(394\) −3.13867 −0.158124
\(395\) 20.7362 1.04335
\(396\) 2.43066 + 6.05210i 0.122145 + 0.304130i
\(397\) 10.4652i 0.525235i −0.964900 0.262617i \(-0.915414\pi\)
0.964900 0.262617i \(-0.0845857\pi\)
\(398\) −2.61316 −0.130986
\(399\) −12.4050 + 8.30550i −0.621028 + 0.415795i
\(400\) 6.22702 0.311351
\(401\) −18.1879 −0.908259 −0.454130 0.890936i \(-0.650050\pi\)
−0.454130 + 0.890936i \(0.650050\pi\)
\(402\) −0.298093 −0.0148675
\(403\) 4.92315i 0.245239i
\(404\) 33.6494 1.67412
\(405\) 1.83337i 0.0911007i
\(406\) −1.03078 1.53957i −0.0511568 0.0764074i
\(407\) 3.26170 + 8.12130i 0.161676 + 0.402558i
\(408\) 2.59943 0.128691
\(409\) −18.3961 −0.909628 −0.454814 0.890587i \(-0.650294\pi\)
−0.454814 + 0.890587i \(0.650294\pi\)
\(410\) −3.54371 −0.175011
\(411\) 19.4654i 0.960158i
\(412\) 10.3780i 0.511288i
\(413\) −22.5090 + 15.0704i −1.10760 + 0.741566i
\(414\) 0.0987737i 0.00485446i
\(415\) 18.6972i 0.917810i
\(416\) 1.88948i 0.0926392i
\(417\) 6.58276i 0.322359i
\(418\) −3.18095 + 1.27754i −0.155585 + 0.0624866i
\(419\) 3.54911i 0.173385i 0.996235 + 0.0866926i \(0.0276298\pi\)
−0.996235 + 0.0866926i \(0.972370\pi\)
\(420\) −5.30670 7.92604i −0.258940 0.386751i
\(421\) 14.5832 0.710743 0.355372 0.934725i \(-0.384354\pi\)
0.355372 + 0.934725i \(0.384354\pi\)
\(422\) −1.42759 −0.0694940
\(423\) 5.29413i 0.257409i
\(424\) 2.85742i 0.138768i
\(425\) 5.86321 0.284408
\(426\) −1.85716 −0.0899796
\(427\) 1.07848 + 1.61081i 0.0521913 + 0.0779525i
\(428\) 14.9178i 0.721078i
\(429\) 2.70587 1.08674i 0.130641 0.0524683i
\(430\) 2.08760i 0.100673i
\(431\) 25.7338i 1.23955i −0.784778 0.619777i \(-0.787223\pi\)
0.784778 0.619777i \(-0.212777\pi\)
\(432\) 3.79981i 0.182819i
\(433\) 30.1994i 1.45129i 0.688068 + 0.725646i \(0.258459\pi\)
−0.688068 + 0.725646i \(0.741541\pi\)
\(434\) −1.50977 2.25498i −0.0724713 0.108243i
\(435\) 7.00912i 0.336062i
\(436\) 22.0714i 1.05703i
\(437\) −3.04267 −0.145551
\(438\) 2.62627 0.125488
\(439\) 18.3238 0.874546 0.437273 0.899329i \(-0.355944\pi\)
0.437273 + 0.899329i \(0.355944\pi\)
\(440\) −1.64646 4.09953i −0.0784921 0.195437i
\(441\) 2.66673 6.47214i 0.126987 0.308197i
\(442\) 0.576183i 0.0274062i
\(443\) −6.19440 −0.294305 −0.147152 0.989114i \(-0.547011\pi\)
−0.147152 + 0.989114i \(0.547011\pi\)
\(444\) 5.18900i 0.246259i
\(445\) −5.14333 −0.243817
\(446\) −4.36137 −0.206517
\(447\) 5.70356 0.269769
\(448\) 10.6068 + 15.8423i 0.501125 + 0.748477i
\(449\) −31.1210 −1.46869 −0.734345 0.678777i \(-0.762510\pi\)
−0.734345 + 0.678777i \(0.762510\pi\)
\(450\) 0.300177i 0.0141505i
\(451\) 13.0434 + 32.4768i 0.614191 + 1.52927i
\(452\) 18.3538 0.863289
\(453\) −13.1299 −0.616897
\(454\) 0.666537i 0.0312821i
\(455\) −3.54371 + 2.37261i −0.166131 + 0.111229i
\(456\) −4.09953 −0.191978
\(457\) 7.94936i 0.371855i −0.982563 0.185928i \(-0.940471\pi\)
0.982563 0.185928i \(-0.0595290\pi\)
\(458\) 0.0589973 0.00275676
\(459\) 3.57781i 0.166998i
\(460\) 1.94408i 0.0906431i
\(461\) −6.62048 −0.308347 −0.154173 0.988044i \(-0.549271\pi\)
−0.154173 + 0.988044i \(0.549271\pi\)
\(462\) 0.906122 1.32757i 0.0421566 0.0617643i
\(463\) 10.9836 0.510452 0.255226 0.966881i \(-0.417850\pi\)
0.255226 + 0.966881i \(0.417850\pi\)
\(464\) 14.5270i 0.674400i
\(465\) 10.2662i 0.476082i
\(466\) 4.74948 0.220016
\(467\) 2.29393i 0.106150i 0.998591 + 0.0530752i \(0.0169023\pi\)
−0.998591 + 0.0530752i \(0.983098\pi\)
\(468\) 1.72889 0.0799177
\(469\) −2.39544 3.57781i −0.110611 0.165208i
\(470\) 1.77788i 0.0820075i
\(471\) −22.4540 −1.03463
\(472\) −7.43863 −0.342391
\(473\) −19.1322 + 7.68391i −0.879697 + 0.353306i
\(474\) 2.07176i 0.0951592i
\(475\) −9.24679 −0.424272
\(476\) 10.3560 + 15.4677i 0.474667 + 0.708960i
\(477\) 3.93290 0.180075
\(478\) 2.91053 0.133124
\(479\) −36.1405 −1.65130 −0.825651 0.564181i \(-0.809192\pi\)
−0.825651 + 0.564181i \(0.809192\pi\)
\(480\) 3.94010i 0.179840i
\(481\) 2.31999 0.105782
\(482\) 1.23952i 0.0564587i
\(483\) 1.18551 0.793734i 0.0539428 0.0361161i
\(484\) −15.6220 + 14.9616i −0.710091 + 0.680074i
\(485\) −24.6870 −1.12098
\(486\) 0.183172 0.00830885
\(487\) −4.54615 −0.206006 −0.103003 0.994681i \(-0.532845\pi\)
−0.103003 + 0.994681i \(0.532845\pi\)
\(488\) 0.532329i 0.0240974i
\(489\) 17.5719i 0.794627i
\(490\) −0.895545 + 2.17348i −0.0404566 + 0.0981879i
\(491\) 18.1385i 0.818579i −0.912404 0.409290i \(-0.865777\pi\)
0.912404 0.409290i \(-0.134223\pi\)
\(492\) 20.7506i 0.935511i
\(493\) 13.6783i 0.616040i
\(494\) 0.908691i 0.0408839i
\(495\) 5.64252 2.26616i 0.253612 0.101857i
\(496\) 21.2775i 0.955390i
\(497\) −14.9239 22.2902i −0.669428 0.999853i
\(498\) −1.86804 −0.0837090
\(499\) −15.1827 −0.679670 −0.339835 0.940485i \(-0.610371\pi\)
−0.339835 + 0.940485i \(0.610371\pi\)
\(500\) 23.9342i 1.07037i
\(501\) 14.6207i 0.653206i
\(502\) 0.772189 0.0344645
\(503\) 36.2097 1.61451 0.807255 0.590203i \(-0.200952\pi\)
0.807255 + 0.590203i \(0.200952\pi\)
\(504\) 1.59730 1.06943i 0.0711493 0.0476364i
\(505\) 31.3722i 1.39604i
\(506\) 0.303994 0.122091i 0.0135142 0.00542761i
\(507\) 12.2270i 0.543021i
\(508\) 5.06863i 0.224884i
\(509\) 35.6155i 1.57863i 0.613990 + 0.789314i \(0.289564\pi\)
−0.613990 + 0.789314i \(0.710436\pi\)
\(510\) 1.20151i 0.0532036i
\(511\) 21.1044 + 31.5213i 0.933603 + 1.39442i
\(512\) 13.6877i 0.604914i
\(513\) 5.64252i 0.249123i
\(514\) 2.15730 0.0951544
\(515\) −9.67566 −0.426361
\(516\) −12.2243 −0.538143
\(517\) 16.2936 6.54390i 0.716594 0.287800i
\(518\) 1.06264 0.711465i 0.0466897 0.0312600i
\(519\) 10.6744i 0.468556i
\(520\) −1.17110 −0.0513561
\(521\) 22.7776i 0.997906i 0.866629 + 0.498953i \(0.166282\pi\)
−0.866629 + 0.498953i \(0.833718\pi\)
\(522\) 0.700283 0.0306506
\(523\) −37.4196 −1.63625 −0.818123 0.575044i \(-0.804985\pi\)
−0.818123 + 0.575044i \(0.804985\pi\)
\(524\) −15.0358 −0.656843
\(525\) 3.60282 2.41219i 0.157240 0.105276i
\(526\) −2.86617 −0.124971
\(527\) 20.0344i 0.872713i
\(528\) −11.6946 + 4.69683i −0.508943 + 0.204403i
\(529\) −22.7092 −0.987357
\(530\) −1.32075 −0.0573697
\(531\) 10.2384i 0.444309i
\(532\) −16.3323 24.3939i −0.708097 1.05761i
\(533\) 9.27754 0.401855
\(534\) 0.513872i 0.0222374i
\(535\) −13.9082 −0.601304
\(536\) 1.18237i 0.0510707i
\(537\) 18.0047i 0.776958i
\(538\) 3.32253 0.143245
\(539\) 23.2154 + 0.207355i 0.999960 + 0.00893142i
\(540\) 3.60522 0.155144
\(541\) 2.29352i 0.0986063i 0.998784 + 0.0493032i \(0.0157000\pi\)
−0.998784 + 0.0493032i \(0.984300\pi\)
\(542\) 2.29059i 0.0983894i
\(543\) −13.2664 −0.569314
\(544\) 7.68910i 0.329667i
\(545\) −20.5777 −0.881451
\(546\) −0.237048 0.354053i −0.0101447 0.0151521i
\(547\) 5.86236i 0.250656i −0.992115 0.125328i \(-0.960002\pi\)
0.992115 0.125328i \(-0.0399984\pi\)
\(548\) 38.2777 1.63514
\(549\) −0.732688 −0.0312704
\(550\) 0.923850 0.371039i 0.0393931 0.0158212i
\(551\) 21.5719i 0.918992i
\(552\) 0.391781 0.0166753
\(553\) −24.8660 + 16.6484i −1.05741 + 0.707964i
\(554\) 0.277735 0.0117998
\(555\) 4.83783 0.205354
\(556\) 12.9446 0.548975
\(557\) 21.2135i 0.898844i −0.893320 0.449422i \(-0.851630\pi\)
0.893320 0.449422i \(-0.148370\pi\)
\(558\) 1.02570 0.0434211
\(559\) 5.46542i 0.231163i
\(560\) 15.3157 10.2543i 0.647206 0.433321i
\(561\) −11.0114 + 4.42242i −0.464901 + 0.186715i
\(562\) −4.26598 −0.179949
\(563\) 13.1553 0.554432 0.277216 0.960808i \(-0.410588\pi\)
0.277216 + 0.960808i \(0.410588\pi\)
\(564\) 10.4106 0.438366
\(565\) 17.1117i 0.719893i
\(566\) 0.389378i 0.0163668i
\(567\) 1.47195 + 2.19849i 0.0618161 + 0.0923280i
\(568\) 7.36632i 0.309084i
\(569\) 2.09117i 0.0876663i 0.999039 + 0.0438331i \(0.0139570\pi\)
−0.999039 + 0.0438331i \(0.986043\pi\)
\(570\) 1.89488i 0.0793677i
\(571\) 35.0529i 1.46692i 0.679733 + 0.733460i \(0.262096\pi\)
−0.679733 + 0.733460i \(0.737904\pi\)
\(572\) 2.13702 + 5.32096i 0.0893533 + 0.222481i
\(573\) 9.81678i 0.410102i
\(574\) 4.24946 2.84512i 0.177369 0.118753i
\(575\) 0.883690 0.0368524
\(576\) −7.20597 −0.300249
\(577\) 21.7338i 0.904791i −0.891817 0.452396i \(-0.850569\pi\)
0.891817 0.452396i \(-0.149431\pi\)
\(578\) 0.769186i 0.0319939i
\(579\) −23.6568 −0.983144
\(580\) 13.7831 0.572311
\(581\) −15.0114 22.4209i −0.622777 0.930175i
\(582\) 2.46649i 0.102239i
\(583\) 4.86133 + 12.1042i 0.201336 + 0.501305i
\(584\) 10.4170i 0.431057i
\(585\) 1.61188i 0.0666430i
\(586\) 2.52340i 0.104241i
\(587\) 18.9049i 0.780290i 0.920753 + 0.390145i \(0.127575\pi\)
−0.920753 + 0.390145i \(0.872425\pi\)
\(588\) 12.7271 + 5.24399i 0.524858 + 0.216258i
\(589\) 31.5960i 1.30189i
\(590\) 3.43827i 0.141551i
\(591\) 17.1351 0.704844
\(592\) −10.0268 −0.412100
\(593\) −11.6026 −0.476463 −0.238231 0.971208i \(-0.576568\pi\)
−0.238231 + 0.971208i \(0.576568\pi\)
\(594\) 0.226413 + 0.563746i 0.00928984 + 0.0231308i
\(595\) 14.4209 9.65516i 0.591198 0.395823i
\(596\) 11.2158i 0.459416i
\(597\) 14.2662 0.583875
\(598\) 0.0868410i 0.00355119i
\(599\) 25.4585 1.04021 0.520103 0.854103i \(-0.325893\pi\)
0.520103 + 0.854103i \(0.325893\pi\)
\(600\) 1.19064 0.0486075
\(601\) −12.0421 −0.491209 −0.245605 0.969370i \(-0.578986\pi\)
−0.245605 + 0.969370i \(0.578986\pi\)
\(602\) 1.67607 + 2.50336i 0.0683115 + 0.102029i
\(603\) 1.62739 0.0662726
\(604\) 25.8193i 1.05057i
\(605\) 13.9491 + 14.5648i 0.567111 + 0.592142i
\(606\) 3.13440 0.127326
\(607\) −35.2991 −1.43274 −0.716372 0.697718i \(-0.754199\pi\)
−0.716372 + 0.697718i \(0.754199\pi\)
\(608\) 12.1264i 0.491789i
\(609\) 5.62739 + 8.40503i 0.228034 + 0.340589i
\(610\) 0.246052 0.00996237
\(611\) 4.65455i 0.188303i
\(612\) −7.03558 −0.284397
\(613\) 24.5604i 0.991986i 0.868326 + 0.495993i \(0.165196\pi\)
−0.868326 + 0.495993i \(0.834804\pi\)
\(614\) 5.88163i 0.237363i
\(615\) 19.3463 0.780119
\(616\) 5.26575 + 3.59408i 0.212163 + 0.144810i
\(617\) 29.9445 1.20552 0.602759 0.797923i \(-0.294068\pi\)
0.602759 + 0.797923i \(0.294068\pi\)
\(618\) 0.966698i 0.0388863i
\(619\) 38.2106i 1.53581i −0.640561 0.767907i \(-0.721298\pi\)
0.640561 0.767907i \(-0.278702\pi\)
\(620\) 20.1879 0.810765
\(621\) 0.539240i 0.0216390i
\(622\) 5.39929 0.216492
\(623\) 6.16766 4.12941i 0.247102 0.165441i
\(624\) 3.34077i 0.133738i
\(625\) −14.1206 −0.564823
\(626\) −2.55212 −0.102003
\(627\) 17.3659 6.97454i 0.693527 0.278536i
\(628\) 44.1547i 1.76196i
\(629\) −9.44103 −0.376438
\(630\) −0.494312 0.738301i −0.0196939 0.0294146i
\(631\) 17.0423 0.678443 0.339222 0.940707i \(-0.389836\pi\)
0.339222 + 0.940707i \(0.389836\pi\)
\(632\) −8.21754 −0.326876
\(633\) 7.79371 0.309772
\(634\) 4.83335i 0.191957i
\(635\) −4.72560 −0.187530
\(636\) 7.73384i 0.306667i
\(637\) 2.34457 5.69025i 0.0928952 0.225456i
\(638\) 0.865598 + 2.15525i 0.0342693 + 0.0853272i
\(639\) 10.1389 0.401087
\(640\) 10.3001 0.407148
\(641\) −7.52095 −0.297060 −0.148530 0.988908i \(-0.547454\pi\)
−0.148530 + 0.988908i \(0.547454\pi\)
\(642\) 1.38957i 0.0548421i
\(643\) 26.9558i 1.06303i −0.847047 0.531517i \(-0.821622\pi\)
0.847047 0.531517i \(-0.178378\pi\)
\(644\) 1.56084 + 2.33125i 0.0615056 + 0.0918642i
\(645\) 11.3970i 0.448755i
\(646\) 3.69786i 0.145490i
\(647\) 21.0257i 0.826606i −0.910594 0.413303i \(-0.864375\pi\)
0.910594 0.413303i \(-0.135625\pi\)
\(648\) 0.726543i 0.0285413i
\(649\) 31.5105 12.6554i 1.23690 0.496766i
\(650\) 0.263913i 0.0103515i
\(651\) 8.24237 + 12.3107i 0.323044 + 0.482496i
\(652\) −34.5541 −1.35324
\(653\) 22.1991 0.868716 0.434358 0.900740i \(-0.356975\pi\)
0.434358 + 0.900740i \(0.356975\pi\)
\(654\) 2.05592i 0.0803929i
\(655\) 14.0182i 0.547738i
\(656\) −40.0970 −1.56552
\(657\) −14.3377 −0.559367
\(658\) −1.42740 2.13196i −0.0556459 0.0831123i
\(659\) 40.5356i 1.57904i 0.613722 + 0.789522i \(0.289671\pi\)
−0.613722 + 0.789522i \(0.710329\pi\)
\(660\) 4.45629 + 11.0957i 0.173461 + 0.431900i
\(661\) 32.2889i 1.25589i 0.778256 + 0.627947i \(0.216104\pi\)
−0.778256 + 0.627947i \(0.783896\pi\)
\(662\) 2.70862i 0.105274i
\(663\) 3.14558i 0.122164i
\(664\) 7.40950i 0.287544i
\(665\) −22.7430 + 15.2270i −0.881934 + 0.590479i
\(666\) 0.483349i 0.0187294i
\(667\) 2.06156i 0.0798240i
\(668\) 28.7509 1.11240
\(669\) 23.8103 0.920558
\(670\) −0.546514 −0.0211137
\(671\) −0.905653 2.25498i −0.0349623 0.0870526i
\(672\) 3.16337 + 4.72479i 0.122030 + 0.182263i
\(673\) 19.7250i 0.760341i −0.924916 0.380171i \(-0.875865\pi\)
0.924916 0.380171i \(-0.124135\pi\)
\(674\) 0.252731 0.00973485
\(675\) 1.63877i 0.0630763i
\(676\) −24.0438 −0.924762
\(677\) 19.1734 0.736892 0.368446 0.929649i \(-0.379890\pi\)
0.368446 + 0.929649i \(0.379890\pi\)
\(678\) 1.70963 0.0656579
\(679\) 29.6036 19.8204i 1.13608 0.760638i
\(680\) 4.76571 0.182757
\(681\) 3.63886i 0.139441i
\(682\) 1.26783 + 3.15677i 0.0485477 + 0.120879i
\(683\) 13.9935 0.535446 0.267723 0.963496i \(-0.413729\pi\)
0.267723 + 0.963496i \(0.413729\pi\)
\(684\) 11.0957 0.424255
\(685\) 35.6872i 1.36354i
\(686\) −0.671118 3.32535i −0.0256234 0.126962i
\(687\) −0.322087 −0.0122884
\(688\) 23.6212i 0.900550i
\(689\) 3.45777 0.131731
\(690\) 0.181088i 0.00689391i
\(691\) 2.11146i 0.0803236i 0.999193 + 0.0401618i \(0.0127873\pi\)
−0.999193 + 0.0401618i \(0.987213\pi\)
\(692\) −20.9907 −0.797948
\(693\) −4.94683 + 7.24768i −0.187915 + 0.275317i
\(694\) −5.65982 −0.214844
\(695\) 12.0686i 0.457788i
\(696\) 2.77764i 0.105286i
\(697\) −37.7543 −1.43005
\(698\) 0.429459i 0.0162553i
\(699\) −25.9291 −0.980728
\(700\) 4.74344 + 7.08476i 0.179285 + 0.267779i
\(701\) 35.9909i 1.35936i 0.733510 + 0.679678i \(0.237881\pi\)
−0.733510 + 0.679678i \(0.762119\pi\)
\(702\) 0.161043 0.00607819
\(703\) 14.8893 0.561561
\(704\) −8.90707 22.1777i −0.335698 0.835853i
\(705\) 9.70607i 0.365552i
\(706\) −6.34571 −0.238824
\(707\) 25.1877 + 37.6201i 0.947280 + 1.41485i
\(708\) 20.1333 0.756655
\(709\) −27.9950 −1.05137 −0.525687 0.850678i \(-0.676192\pi\)
−0.525687 + 0.850678i \(0.676192\pi\)
\(710\) −3.40485 −0.127782
\(711\) 11.3105i 0.424176i
\(712\) 2.03825 0.0763865
\(713\) 3.01954i 0.113083i
\(714\) 0.964650 + 1.44079i 0.0361011 + 0.0539203i
\(715\) 4.96086 1.99239i 0.185526 0.0745113i
\(716\) −35.4052 −1.32316
\(717\) −15.8896 −0.593407
\(718\) 3.78510 0.141259
\(719\) 23.2158i 0.865805i −0.901441 0.432902i \(-0.857489\pi\)
0.901441 0.432902i \(-0.142511\pi\)
\(720\) 6.96645i 0.259624i
\(721\) 11.6026 7.76827i 0.432104 0.289306i
\(722\) 2.35157i 0.0875163i
\(723\) 6.76699i 0.251667i
\(724\) 26.0876i 0.969538i
\(725\) 6.26517i 0.232682i
\(726\) −1.45517 + 1.39366i −0.0540064 + 0.0517234i
\(727\) 1.52095i 0.0564090i −0.999602 0.0282045i \(-0.991021\pi\)
0.999602 0.0282045i \(-0.00897897\pi\)
\(728\) 1.40433 0.940237i 0.0520480 0.0348475i
\(729\) −1.00000 −0.0370370
\(730\) 4.81491 0.178208
\(731\) 22.2412i 0.822619i
\(732\) 1.44079i 0.0532533i
\(733\) 20.3720 0.752457 0.376229 0.926527i \(-0.377221\pi\)
0.376229 + 0.926527i \(0.377221\pi\)
\(734\) −0.337593 −0.0124608
\(735\) 4.88909 11.8658i 0.180337 0.437676i
\(736\) 1.15888i 0.0427170i
\(737\) 2.01157 + 5.00860i 0.0740971 + 0.184494i
\(738\) 1.93290i 0.0711509i
\(739\) 16.2336i 0.597163i 0.954384 + 0.298582i \(0.0965135\pi\)
−0.954384 + 0.298582i \(0.903486\pi\)
\(740\) 9.51334i 0.349717i
\(741\) 4.96086i 0.182242i
\(742\) 1.58379 1.06039i 0.0581426 0.0389280i
\(743\) 32.9403i 1.20846i −0.796809 0.604231i \(-0.793480\pi\)
0.796809 0.604231i \(-0.206520\pi\)
\(744\) 4.06837i 0.149154i
\(745\) 10.4567 0.383105
\(746\) −4.84323 −0.177323
\(747\) 10.1983 0.373136
\(748\) −8.69646 21.6533i −0.317974 0.791723i
\(749\) 16.6781 11.1664i 0.609405 0.408013i
\(750\) 2.22944i 0.0814077i
\(751\) 51.1603 1.86687 0.933433 0.358752i \(-0.116798\pi\)
0.933433 + 0.358752i \(0.116798\pi\)
\(752\) 20.1167i 0.733580i
\(753\) −4.21565 −0.153627
\(754\) 0.615683 0.0224219
\(755\) −24.0719 −0.876067
\(756\) −4.32322 + 2.89451i −0.157234 + 0.105272i
\(757\) −12.0282 −0.437171 −0.218585 0.975818i \(-0.570144\pi\)
−0.218585 + 0.975818i \(0.570144\pi\)
\(758\) 0.495641i 0.0180025i
\(759\) −1.65961 + 0.666537i −0.0602400 + 0.0241938i
\(760\) −7.51594 −0.272632
\(761\) 8.25678 0.299308 0.149654 0.988738i \(-0.452184\pi\)
0.149654 + 0.988738i \(0.452184\pi\)
\(762\) 0.472136i 0.0171037i
\(763\) 24.6759 16.5211i 0.893326 0.598106i
\(764\) 19.3042 0.698401
\(765\) 6.55944i 0.237157i
\(766\) −1.29241 −0.0466968
\(767\) 9.00152i 0.325026i
\(768\) 13.3829i 0.482912i
\(769\) −39.6473 −1.42972 −0.714859 0.699269i \(-0.753509\pi\)
−0.714859 + 0.699269i \(0.753509\pi\)
\(770\) 1.66125 2.43393i 0.0598674 0.0877126i
\(771\) −11.7774 −0.424154
\(772\) 46.5199i 1.67429i
\(773\) 23.4773i 0.844421i −0.906498 0.422211i \(-0.861254\pi\)
0.906498 0.422211i \(-0.138746\pi\)
\(774\) −1.13867 −0.0409288
\(775\) 9.17650i 0.329630i
\(776\) 9.78320 0.351196
\(777\) −5.80131 + 3.88414i −0.208121 + 0.139343i
\(778\) 2.71279i 0.0972582i
\(779\) 59.5418 2.13331
\(780\) 3.16968 0.113493
\(781\) 12.5323 + 31.2042i 0.448442 + 1.11657i
\(782\) 0.353394i 0.0126373i
\(783\) −3.82309 −0.136626
\(784\) −10.1331 + 24.5929i −0.361896 + 0.878318i
\(785\) −41.1665 −1.46929
\(786\) −1.40057 −0.0499566
\(787\) 30.3861 1.08315 0.541573 0.840653i \(-0.317829\pi\)
0.541573 + 0.840653i \(0.317829\pi\)
\(788\) 33.6953i 1.20035i
\(789\) 15.6474 0.557064
\(790\) 3.79830i 0.135137i
\(791\) 13.7384 + 20.5195i 0.488481 + 0.729591i
\(792\) −2.23607 + 0.898056i −0.0794552 + 0.0319110i
\(793\) −0.644174 −0.0228753
\(794\) 1.91694 0.0680296
\(795\) 7.21044 0.255728
\(796\) 28.0537i 0.994336i
\(797\) 14.1666i 0.501808i 0.968012 + 0.250904i \(0.0807278\pi\)
−0.968012 + 0.250904i \(0.919272\pi\)
\(798\) −1.52134 2.27226i −0.0538547 0.0804370i
\(799\) 18.9414i 0.670098i
\(800\) 3.52189i 0.124518i
\(801\) 2.80540i 0.0991241i
\(802\) 3.33151i 0.117640i
\(803\) −17.7224 44.1269i −0.625409 1.55721i
\(804\) 3.20019i 0.112862i
\(805\) 2.17348 1.45520i 0.0766052 0.0512892i
\(806\) 0.901783 0.0317640
\(807\) −18.1389 −0.638518
\(808\) 12.4324i 0.437372i
\(809\) 34.9896i 1.23017i −0.788461 0.615084i \(-0.789122\pi\)
0.788461 0.615084i \(-0.210878\pi\)
\(810\) 0.335821 0.0117996
\(811\) −26.9648 −0.946861 −0.473431 0.880831i \(-0.656985\pi\)
−0.473431 + 0.880831i \(0.656985\pi\)
\(812\) −16.5281 + 11.0660i −0.580021 + 0.388340i
\(813\) 12.5051i 0.438574i
\(814\) −1.48760 + 0.597452i −0.0521402 + 0.0209407i
\(815\) 32.2156i 1.12846i
\(816\) 13.5950i 0.475921i
\(817\) 35.0762i 1.22716i
\(818\) 3.36965i 0.117817i
\(819\) 1.29413 + 1.93290i 0.0452204 + 0.0675409i
\(820\) 38.0435i 1.32854i
\(821\) 16.4514i 0.574158i 0.957907 + 0.287079i \(0.0926843\pi\)
−0.957907 + 0.287079i \(0.907316\pi\)
\(822\) 3.56552 0.124362
\(823\) 26.1042 0.909935 0.454967 0.890508i \(-0.349651\pi\)
0.454967 + 0.890508i \(0.349651\pi\)
\(824\) 3.83436 0.133576
\(825\) −5.04362 + 2.02563i −0.175596 + 0.0705234i
\(826\) −2.76048 4.12303i −0.0960493 0.143458i
\(827\) 9.87968i 0.343550i −0.985136 0.171775i \(-0.945050\pi\)
0.985136 0.171775i \(-0.0549502\pi\)
\(828\) −1.06039 −0.0368510
\(829\) 2.53272i 0.0879649i −0.999032 0.0439825i \(-0.985995\pi\)
0.999032 0.0439825i \(-0.0140046\pi\)
\(830\) −3.42481 −0.118877
\(831\) −1.51625 −0.0525981
\(832\) −6.33543 −0.219642
\(833\) −9.54107 + 23.1561i −0.330578 + 0.802311i
\(834\) 1.20578 0.0417527
\(835\) 26.8051i 0.927630i
\(836\) 13.7151 + 34.1491i 0.474345 + 1.18107i
\(837\) −5.59963 −0.193551
\(838\) −0.650098 −0.0224572
\(839\) 52.3036i 1.80572i −0.429932 0.902861i \(-0.641463\pi\)
0.429932 0.902861i \(-0.358537\pi\)
\(840\) 2.92843 1.96066i 0.101040 0.0676493i
\(841\) 14.3840 0.495999
\(842\) 2.67124i 0.0920571i
\(843\) 23.2895 0.802131
\(844\) 15.3259i 0.527540i
\(845\) 22.4166i 0.771155i
\(846\) 0.969736 0.0333402
\(847\) −28.4207 6.26616i −0.976546 0.215308i
\(848\) −14.9443 −0.513188
\(849\) 2.12575i 0.0729556i
\(850\) 1.07398i 0.0368371i
\(851\) −1.42293 −0.0487774
\(852\) 19.9376i 0.683049i
\(853\) −16.1471 −0.552868 −0.276434 0.961033i \(-0.589153\pi\)
−0.276434 + 0.961033i \(0.589153\pi\)
\(854\) −0.295055 + 0.197547i −0.0100966 + 0.00675993i
\(855\) 10.3448i 0.353785i
\(856\) 5.51167 0.188385
\(857\) 13.3610 0.456403 0.228202 0.973614i \(-0.426715\pi\)
0.228202 + 0.973614i \(0.426715\pi\)
\(858\) 0.199061 + 0.495641i 0.00679582 + 0.0169209i
\(859\) 6.98637i 0.238372i −0.992872 0.119186i \(-0.961972\pi\)
0.992872 0.119186i \(-0.0380285\pi\)
\(860\) −22.4115 −0.764227
\(861\) −23.1993 + 15.5325i −0.790628 + 0.529347i
\(862\) 4.71372 0.160550
\(863\) −20.1366 −0.685458 −0.342729 0.939434i \(-0.611351\pi\)
−0.342729 + 0.939434i \(0.611351\pi\)
\(864\) −2.14910 −0.0731140
\(865\) 19.5702i 0.665405i
\(866\) −5.53170 −0.187975
\(867\) 4.19925i 0.142614i
\(868\) −24.2084 + 16.2082i −0.821687 + 0.550142i
\(869\) 34.8101 13.9805i 1.18085 0.474257i
\(870\) 1.28388 0.0435275
\(871\) 1.43079 0.0484805
\(872\) 8.15471 0.276153
\(873\) 13.4654i 0.455735i
\(874\) 0.557333i 0.0188521i
\(875\) 26.7585 17.9155i 0.904602 0.605655i
\(876\) 28.1944i 0.952599i
\(877\) 34.7587i 1.17372i −0.809689 0.586859i \(-0.800364\pi\)
0.809689 0.586859i \(-0.199636\pi\)
\(878\) 3.35640i 0.113273i
\(879\) 13.7761i 0.464657i
\(880\) −21.4405 + 8.61100i −0.722760 + 0.290277i
\(881\) 28.7780i 0.969556i −0.874637 0.484778i \(-0.838900\pi\)
0.874637 0.484778i \(-0.161100\pi\)
\(882\) 1.18551 + 0.488471i 0.0399184 + 0.0164477i
\(883\) −5.92749 −0.199476 −0.0997380 0.995014i \(-0.531800\pi\)
−0.0997380 + 0.995014i \(0.531800\pi\)
\(884\) −6.18563 −0.208045
\(885\) 18.7707i 0.630971i
\(886\) 1.13464i 0.0381190i
\(887\) −2.64758 −0.0888969 −0.0444485 0.999012i \(-0.514153\pi\)
−0.0444485 + 0.999012i \(0.514153\pi\)
\(888\) −1.91718 −0.0643363
\(889\) 5.66673 3.79403i 0.190056 0.127248i
\(890\) 0.942115i 0.0315798i
\(891\) −1.23607 3.07768i −0.0414098 0.103106i
\(892\) 46.8216i 1.56770i
\(893\) 29.8722i 0.999635i
\(894\) 1.04473i 0.0349411i
\(895\) 33.0091i 1.10337i
\(896\) −12.3514 + 8.26962i −0.412633 + 0.276269i
\(897\) 0.474095i 0.0158296i
\(898\) 5.70049i 0.190228i
\(899\) −21.4079 −0.713993
\(900\) −3.22256 −0.107419
\(901\) −14.0712 −0.468779
\(902\) −5.94884 + 2.38919i −0.198075 + 0.0795514i
\(903\) −9.15024 13.6667i −0.304501 0.454800i
\(904\) 6.78116i 0.225538i
\(905\) −24.3221 −0.808494
\(906\) 2.40503i 0.0799018i
\(907\) −12.1435 −0.403219 −0.201610 0.979466i \(-0.564617\pi\)
−0.201610 + 0.979466i \(0.564617\pi\)
\(908\) −7.15563 −0.237468
\(909\) −17.1118 −0.567562
\(910\) −0.434595 0.649108i −0.0144067 0.0215177i
\(911\) −59.7590 −1.97990 −0.989952 0.141404i \(-0.954838\pi\)
−0.989952 + 0.141404i \(0.954838\pi\)
\(912\) 21.4405i 0.709967i
\(913\) 12.6058 + 31.3871i 0.417191 + 1.03876i
\(914\) 1.45610 0.0481635
\(915\) −1.34329 −0.0444077
\(916\) 0.633367i 0.0209270i
\(917\) −11.2548 16.8101i −0.371666 0.555117i
\(918\) −0.655355 −0.0216300
\(919\) 21.0628i 0.694798i 0.937717 + 0.347399i \(0.112935\pi\)
−0.937717 + 0.347399i \(0.887065\pi\)
\(920\) 0.718277 0.0236809
\(921\) 32.1099i 1.05806i
\(922\) 1.21269i 0.0399378i
\(923\) 8.91401 0.293408
\(924\) −14.2522 9.72769i −0.468862 0.320017i
\(925\) −4.32434 −0.142183
\(926\) 2.01189i 0.0661148i
\(927\) 5.27754i 0.173337i
\(928\) −8.21622 −0.269711
\(929\) 31.8006i 1.04334i 0.853146 + 0.521672i \(0.174691\pi\)
−0.853146 + 0.521672i \(0.825309\pi\)
\(930\) 1.88047 0.0616632
\(931\) 15.0471 36.5192i 0.493148 1.19687i
\(932\) 50.9882i 1.67017i
\(933\) −29.4766 −0.965021
\(934\) −0.420184 −0.0137488
\(935\) −20.1879 + 8.10791i −0.660214 + 0.265157i
\(936\) 0.638770i 0.0208789i
\(937\) −40.5711 −1.32540 −0.662699 0.748886i \(-0.730589\pi\)
−0.662699 + 0.748886i \(0.730589\pi\)
\(938\) 0.655355 0.438778i 0.0213981 0.0143266i
\(939\) 13.9329 0.454683
\(940\) 19.0865 0.622532
\(941\) 36.6392 1.19440 0.597202 0.802091i \(-0.296279\pi\)
0.597202 + 0.802091i \(0.296279\pi\)
\(942\) 4.11295i 0.134007i
\(943\) −5.69025 −0.185300
\(944\) 38.9040i 1.26622i
\(945\) 2.69862 + 4.03064i 0.0877861 + 0.131117i
\(946\) −1.40748 3.50448i −0.0457610 0.113940i
\(947\) −42.1814 −1.37071 −0.685355 0.728209i \(-0.740353\pi\)
−0.685355 + 0.728209i \(0.740353\pi\)
\(948\) 22.2415 0.722369
\(949\) −12.6056 −0.409195
\(950\) 1.69375i 0.0549526i
\(951\) 26.3869i 0.855655i
\(952\) −5.71483 + 3.82623i −0.185219 + 0.124009i
\(953\) 14.1313i 0.457756i 0.973455 + 0.228878i \(0.0735057\pi\)
−0.973455 + 0.228878i \(0.926494\pi\)
\(954\) 0.720397i 0.0233237i
\(955\) 17.9977i 0.582393i
\(956\) 31.2460i 1.01057i
\(957\) −4.72560 11.7663i −0.152757 0.380349i
\(958\) 6.61993i 0.213880i
\(959\) 28.6521 + 42.7946i 0.925225 + 1.38191i
\(960\) −13.2112 −0.426389
\(961\) −0.355826 −0.0114783
\(962\) 0.424957i 0.0137011i
\(963\) 7.58616i 0.244461i
\(964\) 13.3069 0.428587
\(965\) −43.3716 −1.39618
\(966\) 0.145390 + 0.217153i 0.00467784 + 0.00698679i
\(967\) 53.3978i 1.71716i 0.512682 + 0.858579i \(0.328652\pi\)
−0.512682 + 0.858579i \(0.671348\pi\)
\(968\) −5.52786 5.77185i −0.177672 0.185514i
\(969\) 20.1879i 0.648528i
\(970\) 4.52198i 0.145192i
\(971\) 2.84940i 0.0914416i −0.998954 0.0457208i \(-0.985442\pi\)
0.998954 0.0457208i \(-0.0145585\pi\)
\(972\) 1.96645i 0.0630738i
\(973\) 9.68948 + 14.4721i 0.310631 + 0.463955i
\(974\) 0.832728i 0.0266823i
\(975\) 1.44079i 0.0461423i
\(976\) 2.78408 0.0891162
\(977\) 11.8680 0.379692 0.189846 0.981814i \(-0.439201\pi\)
0.189846 + 0.981814i \(0.439201\pi\)
\(978\) −3.21867 −0.102922
\(979\) −8.63415 + 3.46767i −0.275949 + 0.110827i
\(980\) 23.3335 + 9.61415i 0.745360 + 0.307113i
\(981\) 11.2240i 0.358355i
\(982\) 3.32247 0.106024
\(983\) 13.4766i 0.429837i −0.976632 0.214918i \(-0.931051\pi\)
0.976632 0.214918i \(-0.0689486\pi\)
\(984\) −7.66673 −0.244406
\(985\) 31.4149 1.00096
\(986\) −2.50548 −0.0797908
\(987\) 7.79268 + 11.6391i 0.248044 + 0.370476i
\(988\) 9.75527 0.310356
\(989\) 3.35214i 0.106592i
\(990\) 0.415098 + 1.03355i 0.0131927 + 0.0328484i
\(991\) 25.6922 0.816141 0.408071 0.912950i \(-0.366202\pi\)
0.408071 + 0.912950i \(0.366202\pi\)
\(992\) −12.0342 −0.382086
\(993\) 14.7873i 0.469261i
\(994\) 4.08295 2.73364i 0.129503 0.0867058i
\(995\) 26.1551 0.829172
\(996\) 20.0544i 0.635449i
\(997\) 13.7007 0.433904 0.216952 0.976182i \(-0.430388\pi\)
0.216952 + 0.976182i \(0.430388\pi\)
\(998\) 2.78104i 0.0880323i
\(999\) 2.63877i 0.0834870i
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 231.2.c.a.76.9 yes 16
3.2 odd 2 693.2.c.e.307.8 16
4.3 odd 2 3696.2.q.e.769.11 16
7.6 odd 2 inner 231.2.c.a.76.10 yes 16
11.10 odd 2 inner 231.2.c.a.76.7 16
21.20 even 2 693.2.c.e.307.7 16
28.27 even 2 3696.2.q.e.769.6 16
33.32 even 2 693.2.c.e.307.10 16
44.43 even 2 3696.2.q.e.769.12 16
77.76 even 2 inner 231.2.c.a.76.8 yes 16
231.230 odd 2 693.2.c.e.307.9 16
308.307 odd 2 3696.2.q.e.769.5 16
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
231.2.c.a.76.7 16 11.10 odd 2 inner
231.2.c.a.76.8 yes 16 77.76 even 2 inner
231.2.c.a.76.9 yes 16 1.1 even 1 trivial
231.2.c.a.76.10 yes 16 7.6 odd 2 inner
693.2.c.e.307.7 16 21.20 even 2
693.2.c.e.307.8 16 3.2 odd 2
693.2.c.e.307.9 16 231.230 odd 2
693.2.c.e.307.10 16 33.32 even 2
3696.2.q.e.769.5 16 308.307 odd 2
3696.2.q.e.769.6 16 28.27 even 2
3696.2.q.e.769.11 16 4.3 odd 2
3696.2.q.e.769.12 16 44.43 even 2