Properties

Label 230.3.f.a.47.10
Level $230$
Weight $3$
Character 230.47
Analytic conductor $6.267$
Analytic rank $0$
Dimension $20$
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] = [230,3,Mod(47,230)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(230, base_ring=CyclotomicField(4))
 
chi = DirichletCharacter(H, H._module([1, 0]))
 
N = Newforms(chi, 3, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("230.47");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 230 = 2 \cdot 5 \cdot 23 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 230.f (of order \(4\), degree \(2\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(6.26704608029\)
Analytic rank: \(0\)
Dimension: \(20\)
Relative dimension: \(10\) over \(\Q(i)\)
Coefficient field: \(\mathbb{Q}[x]/(x^{20} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{20} - 52 x^{17} + 1020 x^{16} - 1316 x^{15} + 1352 x^{14} - 18724 x^{13} + 250686 x^{12} + \cdots + 88804 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{7}]\)
Coefficient ring index: \( 2^{2} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{4}]$

Embedding invariants

Embedding label 47.10
Root \(2.93330 - 2.93330i\) of defining polynomial
Character \(\chi\) \(=\) 230.47
Dual form 230.3.f.a.93.10

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-1.00000 - 1.00000i) q^{2} +(2.93330 - 2.93330i) q^{3} +2.00000i q^{4} +(0.390531 + 4.98473i) q^{5} -5.86660 q^{6} +(1.49862 + 1.49862i) q^{7} +(2.00000 - 2.00000i) q^{8} -8.20851i q^{9} +O(q^{10})\) \(q+(-1.00000 - 1.00000i) q^{2} +(2.93330 - 2.93330i) q^{3} +2.00000i q^{4} +(0.390531 + 4.98473i) q^{5} -5.86660 q^{6} +(1.49862 + 1.49862i) q^{7} +(2.00000 - 2.00000i) q^{8} -8.20851i q^{9} +(4.59419 - 5.37526i) q^{10} +8.24701 q^{11} +(5.86660 + 5.86660i) q^{12} +(14.8761 - 14.8761i) q^{13} -2.99725i q^{14} +(15.7672 + 13.4762i) q^{15} -4.00000 q^{16} +(8.86691 + 8.86691i) q^{17} +(-8.20851 + 8.20851i) q^{18} -8.33032i q^{19} +(-9.96945 + 0.781063i) q^{20} +8.79183 q^{21} +(-8.24701 - 8.24701i) q^{22} +(3.39116 - 3.39116i) q^{23} -11.7332i q^{24} +(-24.6950 + 3.89338i) q^{25} -29.7522 q^{26} +(2.32167 + 2.32167i) q^{27} +(-2.99725 + 2.99725i) q^{28} -21.2393i q^{29} +(-2.29109 - 29.2434i) q^{30} -38.0320 q^{31} +(4.00000 + 4.00000i) q^{32} +(24.1910 - 24.1910i) q^{33} -17.7338i q^{34} +(-6.88496 + 8.05548i) q^{35} +16.4170 q^{36} +(18.9398 + 18.9398i) q^{37} +(-8.33032 + 8.33032i) q^{38} -87.2722i q^{39} +(10.7505 + 9.18839i) q^{40} +42.1499 q^{41} +(-8.79183 - 8.79183i) q^{42} +(-52.2044 + 52.2044i) q^{43} +16.4940i q^{44} +(40.9172 - 3.20568i) q^{45} -6.78233 q^{46} +(-15.0827 - 15.0827i) q^{47} +(-11.7332 + 11.7332i) q^{48} -44.5083i q^{49} +(28.5884 + 20.8016i) q^{50} +52.0186 q^{51} +(29.7522 + 29.7522i) q^{52} +(27.3408 - 27.3408i) q^{53} -4.64334i q^{54} +(3.22072 + 41.1091i) q^{55} +5.99449 q^{56} +(-24.4354 - 24.4354i) q^{57} +(-21.2393 + 21.2393i) q^{58} +40.1813i q^{59} +(-26.9523 + 31.5345i) q^{60} +9.06197 q^{61} +(38.0320 + 38.0320i) q^{62} +(12.3015 - 12.3015i) q^{63} -8.00000i q^{64} +(79.9629 + 68.3437i) q^{65} -48.3819 q^{66} +(-8.60705 - 8.60705i) q^{67} +(-17.7338 + 17.7338i) q^{68} -19.8946i q^{69} +(14.9404 - 1.17052i) q^{70} -124.620 q^{71} +(-16.4170 - 16.4170i) q^{72} +(-98.5165 + 98.5165i) q^{73} -37.8797i q^{74} +(-61.0173 + 83.8583i) q^{75} +16.6606 q^{76} +(12.3592 + 12.3592i) q^{77} +(-87.2722 + 87.2722i) q^{78} -13.6410i q^{79} +(-1.56213 - 19.9389i) q^{80} +87.4969 q^{81} +(-42.1499 - 42.1499i) q^{82} +(-0.140105 + 0.140105i) q^{83} +17.5837i q^{84} +(-40.7363 + 47.6619i) q^{85} +104.409 q^{86} +(-62.3013 - 62.3013i) q^{87} +(16.4940 - 16.4940i) q^{88} +134.007i q^{89} +(-44.1229 - 37.7115i) q^{90} +44.5873 q^{91} +(6.78233 + 6.78233i) q^{92} +(-111.559 + 111.559i) q^{93} +30.1654i q^{94} +(41.5244 - 3.25325i) q^{95} +23.4664 q^{96} +(-82.0061 - 82.0061i) q^{97} +(-44.5083 + 44.5083i) q^{98} -67.6957i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 20 q - 20 q^{2} + 4 q^{5} + 8 q^{7} + 40 q^{8}+O(q^{10}) \) Copy content Toggle raw display \( 20 q - 20 q^{2} + 4 q^{5} + 8 q^{7} + 40 q^{8} + 4 q^{10} + 56 q^{11} - 4 q^{13} - 48 q^{15} - 80 q^{16} - 72 q^{17} - 28 q^{18} - 16 q^{20} + 8 q^{21} - 56 q^{22} + 36 q^{25} + 8 q^{26} + 156 q^{27} - 16 q^{28} + 84 q^{30} - 212 q^{31} + 80 q^{32} - 100 q^{33} + 56 q^{36} + 72 q^{37} + 88 q^{38} + 24 q^{40} - 12 q^{41} - 8 q^{42} + 120 q^{43} - 32 q^{45} + 8 q^{47} - 28 q^{50} + 64 q^{51} - 8 q^{52} - 244 q^{53} + 68 q^{55} + 32 q^{56} - 384 q^{57} - 188 q^{58} - 72 q^{60} + 328 q^{61} + 212 q^{62} + 172 q^{63} + 20 q^{65} + 200 q^{66} + 56 q^{67} + 144 q^{68} - 28 q^{70} - 92 q^{71} - 56 q^{72} + 144 q^{73} - 124 q^{75} - 176 q^{76} + 292 q^{77} - 208 q^{78} - 16 q^{80} - 84 q^{81} + 12 q^{82} - 72 q^{83} - 20 q^{85} - 240 q^{86} - 208 q^{87} + 112 q^{88} - 56 q^{90} - 192 q^{91} + 256 q^{93} - 96 q^{95} - 276 q^{97} + 104 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/230\mathbb{Z}\right)^\times\).

\(n\) \(47\) \(51\)
\(\chi(n)\) \(e\left(\frac{1}{4}\right)\) \(1\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −1.00000 1.00000i −0.500000 0.500000i
\(3\) 2.93330 2.93330i 0.977767 0.977767i −0.0219911 0.999758i \(-0.507001\pi\)
0.999758 + 0.0219911i \(0.00700054\pi\)
\(4\) 2.00000i 0.500000i
\(5\) 0.390531 + 4.98473i 0.0781063 + 0.996945i
\(6\) −5.86660 −0.977767
\(7\) 1.49862 + 1.49862i 0.214089 + 0.214089i 0.806002 0.591913i \(-0.201627\pi\)
−0.591913 + 0.806002i \(0.701627\pi\)
\(8\) 2.00000 2.00000i 0.250000 0.250000i
\(9\) 8.20851i 0.912057i
\(10\) 4.59419 5.37526i 0.459419 0.537526i
\(11\) 8.24701 0.749728 0.374864 0.927080i \(-0.377689\pi\)
0.374864 + 0.927080i \(0.377689\pi\)
\(12\) 5.86660 + 5.86660i 0.488884 + 0.488884i
\(13\) 14.8761 14.8761i 1.14432 1.14432i 0.156664 0.987652i \(-0.449926\pi\)
0.987652 0.156664i \(-0.0500739\pi\)
\(14\) 2.99725i 0.214089i
\(15\) 15.7672 + 13.4762i 1.05115 + 0.898410i
\(16\) −4.00000 −0.250000
\(17\) 8.86691 + 8.86691i 0.521583 + 0.521583i 0.918049 0.396466i \(-0.129764\pi\)
−0.396466 + 0.918049i \(0.629764\pi\)
\(18\) −8.20851 + 8.20851i −0.456028 + 0.456028i
\(19\) 8.33032i 0.438438i −0.975676 0.219219i \(-0.929649\pi\)
0.975676 0.219219i \(-0.0703509\pi\)
\(20\) −9.96945 + 0.781063i −0.498473 + 0.0390531i
\(21\) 8.79183 0.418658
\(22\) −8.24701 8.24701i −0.374864 0.374864i
\(23\) 3.39116 3.39116i 0.147442 0.147442i
\(24\) 11.7332i 0.488884i
\(25\) −24.6950 + 3.89338i −0.987799 + 0.155735i
\(26\) −29.7522 −1.14432
\(27\) 2.32167 + 2.32167i 0.0859878 + 0.0859878i
\(28\) −2.99725 + 2.99725i −0.107045 + 0.107045i
\(29\) 21.2393i 0.732390i −0.930538 0.366195i \(-0.880660\pi\)
0.930538 0.366195i \(-0.119340\pi\)
\(30\) −2.29109 29.2434i −0.0763698 0.974780i
\(31\) −38.0320 −1.22684 −0.613419 0.789758i \(-0.710206\pi\)
−0.613419 + 0.789758i \(0.710206\pi\)
\(32\) 4.00000 + 4.00000i 0.125000 + 0.125000i
\(33\) 24.1910 24.1910i 0.733059 0.733059i
\(34\) 17.7338i 0.521583i
\(35\) −6.88496 + 8.05548i −0.196713 + 0.230157i
\(36\) 16.4170 0.456028
\(37\) 18.9398 + 18.9398i 0.511888 + 0.511888i 0.915104 0.403217i \(-0.132108\pi\)
−0.403217 + 0.915104i \(0.632108\pi\)
\(38\) −8.33032 + 8.33032i −0.219219 + 0.219219i
\(39\) 87.2722i 2.23775i
\(40\) 10.7505 + 9.18839i 0.268763 + 0.229710i
\(41\) 42.1499 1.02805 0.514023 0.857776i \(-0.328154\pi\)
0.514023 + 0.857776i \(0.328154\pi\)
\(42\) −8.79183 8.79183i −0.209329 0.209329i
\(43\) −52.2044 + 52.2044i −1.21406 + 1.21406i −0.244374 + 0.969681i \(0.578582\pi\)
−0.969681 + 0.244374i \(0.921418\pi\)
\(44\) 16.4940i 0.374864i
\(45\) 40.9172 3.20568i 0.909271 0.0712374i
\(46\) −6.78233 −0.147442
\(47\) −15.0827 15.0827i −0.320908 0.320908i 0.528207 0.849115i \(-0.322864\pi\)
−0.849115 + 0.528207i \(0.822864\pi\)
\(48\) −11.7332 + 11.7332i −0.244442 + 0.244442i
\(49\) 44.5083i 0.908332i
\(50\) 28.5884 + 20.8016i 0.571767 + 0.416032i
\(51\) 52.0186 1.01997
\(52\) 29.7522 + 29.7522i 0.572158 + 0.572158i
\(53\) 27.3408 27.3408i 0.515865 0.515865i −0.400453 0.916317i \(-0.631147\pi\)
0.916317 + 0.400453i \(0.131147\pi\)
\(54\) 4.64334i 0.0859878i
\(55\) 3.22072 + 41.1091i 0.0585585 + 0.747438i
\(56\) 5.99449 0.107045
\(57\) −24.4354 24.4354i −0.428690 0.428690i
\(58\) −21.2393 + 21.2393i −0.366195 + 0.366195i
\(59\) 40.1813i 0.681038i 0.940238 + 0.340519i \(0.110603\pi\)
−0.940238 + 0.340519i \(0.889397\pi\)
\(60\) −26.9523 + 31.5345i −0.449205 + 0.525575i
\(61\) 9.06197 0.148557 0.0742784 0.997238i \(-0.476335\pi\)
0.0742784 + 0.997238i \(0.476335\pi\)
\(62\) 38.0320 + 38.0320i 0.613419 + 0.613419i
\(63\) 12.3015 12.3015i 0.195261 0.195261i
\(64\) 8.00000i 0.125000i
\(65\) 79.9629 + 68.3437i 1.23020 + 1.05144i
\(66\) −48.3819 −0.733059
\(67\) −8.60705 8.60705i −0.128463 0.128463i 0.639952 0.768415i \(-0.278954\pi\)
−0.768415 + 0.639952i \(0.778954\pi\)
\(68\) −17.7338 + 17.7338i −0.260791 + 0.260791i
\(69\) 19.8946i 0.288328i
\(70\) 14.9404 1.17052i 0.213435 0.0167217i
\(71\) −124.620 −1.75521 −0.877603 0.479389i \(-0.840858\pi\)
−0.877603 + 0.479389i \(0.840858\pi\)
\(72\) −16.4170 16.4170i −0.228014 0.228014i
\(73\) −98.5165 + 98.5165i −1.34954 + 1.34954i −0.463382 + 0.886159i \(0.653364\pi\)
−0.886159 + 0.463382i \(0.846636\pi\)
\(74\) 37.8797i 0.511888i
\(75\) −61.0173 + 83.8583i −0.813564 + 1.11811i
\(76\) 16.6606 0.219219
\(77\) 12.3592 + 12.3592i 0.160509 + 0.160509i
\(78\) −87.2722 + 87.2722i −1.11887 + 1.11887i
\(79\) 13.6410i 0.172671i −0.996266 0.0863353i \(-0.972484\pi\)
0.996266 0.0863353i \(-0.0275156\pi\)
\(80\) −1.56213 19.9389i −0.0195266 0.249236i
\(81\) 87.4969 1.08021
\(82\) −42.1499 42.1499i −0.514023 0.514023i
\(83\) −0.140105 + 0.140105i −0.00168801 + 0.00168801i −0.707950 0.706262i \(-0.750380\pi\)
0.706262 + 0.707950i \(0.250380\pi\)
\(84\) 17.5837i 0.209329i
\(85\) −40.7363 + 47.6619i −0.479251 + 0.560728i
\(86\) 104.409 1.21406
\(87\) −62.3013 62.3013i −0.716107 0.716107i
\(88\) 16.4940 16.4940i 0.187432 0.187432i
\(89\) 134.007i 1.50570i 0.658193 + 0.752849i \(0.271321\pi\)
−0.658193 + 0.752849i \(0.728679\pi\)
\(90\) −44.1229 37.7115i −0.490254 0.419017i
\(91\) 44.5873 0.489971
\(92\) 6.78233 + 6.78233i 0.0737210 + 0.0737210i
\(93\) −111.559 + 111.559i −1.19956 + 1.19956i
\(94\) 30.1654i 0.320908i
\(95\) 41.5244 3.25325i 0.437099 0.0342448i
\(96\) 23.4664 0.244442
\(97\) −82.0061 82.0061i −0.845423 0.845423i 0.144135 0.989558i \(-0.453960\pi\)
−0.989558 + 0.144135i \(0.953960\pi\)
\(98\) −44.5083 + 44.5083i −0.454166 + 0.454166i
\(99\) 67.6957i 0.683795i
\(100\) −7.78677 49.3899i −0.0778677 0.493899i
\(101\) 40.5100 0.401089 0.200544 0.979685i \(-0.435729\pi\)
0.200544 + 0.979685i \(0.435729\pi\)
\(102\) −52.0186 52.0186i −0.509987 0.509987i
\(103\) −21.6172 + 21.6172i −0.209876 + 0.209876i −0.804215 0.594339i \(-0.797414\pi\)
0.594339 + 0.804215i \(0.297414\pi\)
\(104\) 59.5044i 0.572158i
\(105\) 3.43348 + 43.8248i 0.0326999 + 0.417379i
\(106\) −54.6816 −0.515865
\(107\) 34.6070 + 34.6070i 0.323430 + 0.323430i 0.850081 0.526651i \(-0.176553\pi\)
−0.526651 + 0.850081i \(0.676553\pi\)
\(108\) −4.64334 + 4.64334i −0.0429939 + 0.0429939i
\(109\) 34.5054i 0.316563i −0.987394 0.158282i \(-0.949405\pi\)
0.987394 0.158282i \(-0.0505954\pi\)
\(110\) 37.8884 44.3298i 0.344440 0.402998i
\(111\) 111.113 1.00101
\(112\) −5.99449 5.99449i −0.0535223 0.0535223i
\(113\) −18.9252 + 18.9252i −0.167479 + 0.167479i −0.785870 0.618391i \(-0.787785\pi\)
0.618391 + 0.785870i \(0.287785\pi\)
\(114\) 48.8707i 0.428690i
\(115\) 18.2284 + 15.5797i 0.158508 + 0.135475i
\(116\) 42.4786 0.366195
\(117\) −122.111 122.111i −1.04368 1.04368i
\(118\) 40.1813 40.1813i 0.340519 0.340519i
\(119\) 26.5763i 0.223330i
\(120\) 58.4868 4.58219i 0.487390 0.0381849i
\(121\) −52.9869 −0.437908
\(122\) −9.06197 9.06197i −0.0742784 0.0742784i
\(123\) 123.638 123.638i 1.00519 1.00519i
\(124\) 76.0640i 0.613419i
\(125\) −29.0516 121.577i −0.232413 0.972617i
\(126\) −24.6029 −0.195261
\(127\) 8.99058 + 8.99058i 0.0707920 + 0.0707920i 0.741616 0.670824i \(-0.234060\pi\)
−0.670824 + 0.741616i \(0.734060\pi\)
\(128\) −8.00000 + 8.00000i −0.0625000 + 0.0625000i
\(129\) 306.262i 2.37413i
\(130\) −11.6192 148.307i −0.0893783 1.14082i
\(131\) 211.736 1.61631 0.808154 0.588972i \(-0.200467\pi\)
0.808154 + 0.588972i \(0.200467\pi\)
\(132\) 48.3819 + 48.3819i 0.366530 + 0.366530i
\(133\) 12.4840 12.4840i 0.0938648 0.0938648i
\(134\) 17.2141i 0.128463i
\(135\) −10.6662 + 12.4796i −0.0790089 + 0.0924413i
\(136\) 35.4676 0.260791
\(137\) 147.657 + 147.657i 1.07779 + 1.07779i 0.996707 + 0.0810837i \(0.0258381\pi\)
0.0810837 + 0.996707i \(0.474162\pi\)
\(138\) −19.8946 + 19.8946i −0.144164 + 0.144164i
\(139\) 71.3041i 0.512979i −0.966547 0.256489i \(-0.917434\pi\)
0.966547 0.256489i \(-0.0825659\pi\)
\(140\) −16.1110 13.7699i −0.115078 0.0983566i
\(141\) −88.4841 −0.627547
\(142\) 124.620 + 124.620i 0.877603 + 0.877603i
\(143\) 122.683 122.683i 0.857926 0.857926i
\(144\) 32.8341i 0.228014i
\(145\) 105.872 8.29462i 0.730153 0.0572043i
\(146\) 197.033 1.34954
\(147\) −130.556 130.556i −0.888137 0.888137i
\(148\) −37.8797 + 37.8797i −0.255944 + 0.255944i
\(149\) 210.967i 1.41589i −0.706268 0.707944i \(-0.749623\pi\)
0.706268 0.707944i \(-0.250377\pi\)
\(150\) 144.876 22.8409i 0.965837 0.152273i
\(151\) −270.221 −1.78954 −0.894772 0.446523i \(-0.852662\pi\)
−0.894772 + 0.446523i \(0.852662\pi\)
\(152\) −16.6606 16.6606i −0.109610 0.109610i
\(153\) 72.7841 72.7841i 0.475713 0.475713i
\(154\) 24.7183i 0.160509i
\(155\) −14.8527 189.579i −0.0958238 1.22309i
\(156\) 174.544 1.11887
\(157\) −66.2348 66.2348i −0.421878 0.421878i 0.463972 0.885850i \(-0.346424\pi\)
−0.885850 + 0.463972i \(0.846424\pi\)
\(158\) −13.6410 + 13.6410i −0.0863353 + 0.0863353i
\(159\) 160.398i 1.00879i
\(160\) −18.3768 + 21.5010i −0.114855 + 0.134381i
\(161\) 10.1642 0.0631314
\(162\) −87.4969 87.4969i −0.540105 0.540105i
\(163\) −10.1464 + 10.1464i −0.0622481 + 0.0622481i −0.737546 0.675297i \(-0.764015\pi\)
0.675297 + 0.737546i \(0.264015\pi\)
\(164\) 84.2998i 0.514023i
\(165\) 130.033 + 111.138i 0.788076 + 0.673563i
\(166\) 0.280210 0.00168801
\(167\) −110.018 110.018i −0.658788 0.658788i 0.296305 0.955093i \(-0.404245\pi\)
−0.955093 + 0.296305i \(0.904245\pi\)
\(168\) 17.5837 17.5837i 0.104665 0.104665i
\(169\) 273.597i 1.61892i
\(170\) 88.3982 6.92561i 0.519989 0.0407389i
\(171\) −68.3796 −0.399881
\(172\) −104.409 104.409i −0.607028 0.607028i
\(173\) −186.569 + 186.569i −1.07844 + 1.07844i −0.0817855 + 0.996650i \(0.526062\pi\)
−0.996650 + 0.0817855i \(0.973938\pi\)
\(174\) 124.603i 0.716107i
\(175\) −42.8432 31.1737i −0.244818 0.178136i
\(176\) −32.9880 −0.187432
\(177\) 117.864 + 117.864i 0.665897 + 0.665897i
\(178\) 134.007 134.007i 0.752849 0.752849i
\(179\) 115.306i 0.644170i −0.946711 0.322085i \(-0.895616\pi\)
0.946711 0.322085i \(-0.104384\pi\)
\(180\) 6.41136 + 81.8344i 0.0356187 + 0.454635i
\(181\) −233.419 −1.28961 −0.644803 0.764349i \(-0.723061\pi\)
−0.644803 + 0.764349i \(0.723061\pi\)
\(182\) −44.5873 44.5873i −0.244985 0.244985i
\(183\) 26.5815 26.5815i 0.145254 0.145254i
\(184\) 13.5647i 0.0737210i
\(185\) −87.0133 + 101.807i −0.470342 + 0.550305i
\(186\) 223.119 1.19956
\(187\) 73.1255 + 73.1255i 0.391045 + 0.391045i
\(188\) 30.1654 30.1654i 0.160454 0.160454i
\(189\) 6.95862i 0.0368181i
\(190\) −44.7776 38.2711i −0.235672 0.201427i
\(191\) −196.087 −1.02664 −0.513318 0.858199i \(-0.671584\pi\)
−0.513318 + 0.858199i \(0.671584\pi\)
\(192\) −23.4664 23.4664i −0.122221 0.122221i
\(193\) −178.951 + 178.951i −0.927205 + 0.927205i −0.997524 0.0703198i \(-0.977598\pi\)
0.0703198 + 0.997524i \(0.477598\pi\)
\(194\) 164.012i 0.845423i
\(195\) 435.028 34.0825i 2.23091 0.174782i
\(196\) 89.0165 0.454166
\(197\) 131.643 + 131.643i 0.668240 + 0.668240i 0.957308 0.289068i \(-0.0933455\pi\)
−0.289068 + 0.957308i \(0.593345\pi\)
\(198\) −67.6957 + 67.6957i −0.341897 + 0.341897i
\(199\) 11.2591i 0.0565782i −0.999600 0.0282891i \(-0.990994\pi\)
0.999600 0.0282891i \(-0.00900591\pi\)
\(200\) −41.6032 + 57.1767i −0.208016 + 0.285884i
\(201\) −50.4941 −0.251215
\(202\) −40.5100 40.5100i −0.200544 0.200544i
\(203\) 31.8297 31.8297i 0.156797 0.156797i
\(204\) 104.037i 0.509987i
\(205\) 16.4609 + 210.106i 0.0802969 + 1.02491i
\(206\) 43.2344 0.209876
\(207\) −27.8364 27.8364i −0.134475 0.134475i
\(208\) −59.5044 + 59.5044i −0.286079 + 0.286079i
\(209\) 68.7003i 0.328709i
\(210\) 40.3914 47.2583i 0.192340 0.225040i
\(211\) −279.820 −1.32616 −0.663080 0.748549i \(-0.730751\pi\)
−0.663080 + 0.748549i \(0.730751\pi\)
\(212\) 54.6816 + 54.6816i 0.257932 + 0.257932i
\(213\) −365.547 + 365.547i −1.71618 + 1.71618i
\(214\) 69.2141i 0.323430i
\(215\) −280.612 239.837i −1.30517 1.11552i
\(216\) 9.28668 0.0429939
\(217\) −56.9956 56.9956i −0.262653 0.262653i
\(218\) −34.5054 + 34.5054i −0.158282 + 0.158282i
\(219\) 577.957i 2.63907i
\(220\) −82.2181 + 6.44143i −0.373719 + 0.0292792i
\(221\) 263.810 1.19371
\(222\) −111.113 111.113i −0.500507 0.500507i
\(223\) 213.744 213.744i 0.958495 0.958495i −0.0406776 0.999172i \(-0.512952\pi\)
0.999172 + 0.0406776i \(0.0129517\pi\)
\(224\) 11.9890i 0.0535223i
\(225\) 31.9589 + 202.709i 0.142040 + 0.900929i
\(226\) 37.8503 0.167479
\(227\) 84.5320 + 84.5320i 0.372388 + 0.372388i 0.868346 0.495959i \(-0.165183\pi\)
−0.495959 + 0.868346i \(0.665183\pi\)
\(228\) 48.8707 48.8707i 0.214345 0.214345i
\(229\) 146.588i 0.640121i −0.947397 0.320060i \(-0.896297\pi\)
0.947397 0.320060i \(-0.103703\pi\)
\(230\) −2.64871 33.8081i −0.0115161 0.146992i
\(231\) 72.5063 0.313880
\(232\) −42.4786 42.4786i −0.183098 0.183098i
\(233\) −39.9824 + 39.9824i −0.171598 + 0.171598i −0.787681 0.616083i \(-0.788719\pi\)
0.616083 + 0.787681i \(0.288719\pi\)
\(234\) 244.221i 1.04368i
\(235\) 69.2927 81.0733i 0.294863 0.344993i
\(236\) −80.3625 −0.340519
\(237\) −40.0131 40.0131i −0.168832 0.168832i
\(238\) 26.5763 26.5763i 0.111665 0.111665i
\(239\) 181.320i 0.758659i −0.925262 0.379330i \(-0.876155\pi\)
0.925262 0.379330i \(-0.123845\pi\)
\(240\) −63.0690 53.9046i −0.262787 0.224603i
\(241\) 193.662 0.803578 0.401789 0.915732i \(-0.368389\pi\)
0.401789 + 0.915732i \(0.368389\pi\)
\(242\) 52.9869 + 52.9869i 0.218954 + 0.218954i
\(243\) 235.760 235.760i 0.970205 0.970205i
\(244\) 18.1239i 0.0742784i
\(245\) 221.861 17.3819i 0.905557 0.0709464i
\(246\) −247.277 −1.00519
\(247\) −123.923 123.923i −0.501712 0.501712i
\(248\) −76.0640 + 76.0640i −0.306710 + 0.306710i
\(249\) 0.821942i 0.00330097i
\(250\) −92.5255 + 150.629i −0.370102 + 0.602515i
\(251\) −390.386 −1.55532 −0.777661 0.628684i \(-0.783594\pi\)
−0.777661 + 0.628684i \(0.783594\pi\)
\(252\) 24.6029 + 24.6029i 0.0976307 + 0.0976307i
\(253\) 27.9670 27.9670i 0.110541 0.110541i
\(254\) 17.9812i 0.0707920i
\(255\) 20.3149 + 259.299i 0.0796663 + 1.01686i
\(256\) 16.0000 0.0625000
\(257\) 243.584 + 243.584i 0.947799 + 0.947799i 0.998704 0.0509047i \(-0.0162105\pi\)
−0.0509047 + 0.998704i \(0.516210\pi\)
\(258\) 306.262 306.262i 1.18706 1.18706i
\(259\) 56.7674i 0.219179i
\(260\) −136.687 + 159.926i −0.525721 + 0.615099i
\(261\) −174.343 −0.667981
\(262\) −211.736 211.736i −0.808154 0.808154i
\(263\) 207.770 207.770i 0.789999 0.789999i −0.191495 0.981494i \(-0.561333\pi\)
0.981494 + 0.191495i \(0.0613335\pi\)
\(264\) 96.7638i 0.366530i
\(265\) 146.964 + 125.609i 0.554581 + 0.473996i
\(266\) −24.9680 −0.0938648
\(267\) 393.083 + 393.083i 1.47222 + 1.47222i
\(268\) 17.2141 17.2141i 0.0642317 0.0642317i
\(269\) 98.1410i 0.364837i −0.983221 0.182418i \(-0.941607\pi\)
0.983221 0.182418i \(-0.0583925\pi\)
\(270\) 23.1458 1.81337i 0.0857251 0.00671619i
\(271\) 79.9374 0.294972 0.147486 0.989064i \(-0.452882\pi\)
0.147486 + 0.989064i \(0.452882\pi\)
\(272\) −35.4676 35.4676i −0.130396 0.130396i
\(273\) 130.788 130.788i 0.479077 0.479077i
\(274\) 295.315i 1.07779i
\(275\) −203.660 + 32.1088i −0.740580 + 0.116759i
\(276\) 39.7892 0.144164
\(277\) 192.748 + 192.748i 0.695839 + 0.695839i 0.963510 0.267671i \(-0.0862540\pi\)
−0.267671 + 0.963510i \(0.586254\pi\)
\(278\) −71.3041 + 71.3041i −0.256489 + 0.256489i
\(279\) 312.186i 1.11895i
\(280\) 2.34104 + 29.8809i 0.00836085 + 0.106717i
\(281\) −108.185 −0.385002 −0.192501 0.981297i \(-0.561660\pi\)
−0.192501 + 0.981297i \(0.561660\pi\)
\(282\) 88.4841 + 88.4841i 0.313773 + 0.313773i
\(283\) 144.938 144.938i 0.512149 0.512149i −0.403035 0.915184i \(-0.632045\pi\)
0.915184 + 0.403035i \(0.132045\pi\)
\(284\) 249.239i 0.877603i
\(285\) 112.261 131.346i 0.393897 0.460864i
\(286\) −245.367 −0.857926
\(287\) 63.1668 + 63.1668i 0.220093 + 0.220093i
\(288\) 32.8341 32.8341i 0.114007 0.114007i
\(289\) 131.756i 0.455903i
\(290\) −114.167 97.5775i −0.393678 0.336474i
\(291\) −481.097 −1.65325
\(292\) −197.033 197.033i −0.674770 0.674770i
\(293\) −284.139 + 284.139i −0.969758 + 0.969758i −0.999556 0.0297984i \(-0.990513\pi\)
0.0297984 + 0.999556i \(0.490513\pi\)
\(294\) 261.112i 0.888137i
\(295\) −200.293 + 15.6920i −0.678958 + 0.0531934i
\(296\) 75.7594 0.255944
\(297\) 19.1468 + 19.1468i 0.0644675 + 0.0644675i
\(298\) −210.967 + 210.967i −0.707944 + 0.707944i
\(299\) 100.895i 0.337440i
\(300\) −167.717 122.035i −0.559055 0.406782i
\(301\) −156.469 −0.519832
\(302\) 270.221 + 270.221i 0.894772 + 0.894772i
\(303\) 118.828 118.828i 0.392172 0.392172i
\(304\) 33.3213i 0.109610i
\(305\) 3.53898 + 45.1714i 0.0116032 + 0.148103i
\(306\) −145.568 −0.475713
\(307\) 79.7400 + 79.7400i 0.259739 + 0.259739i 0.824948 0.565209i \(-0.191204\pi\)
−0.565209 + 0.824948i \(0.691204\pi\)
\(308\) −24.7183 + 24.7183i −0.0802543 + 0.0802543i
\(309\) 126.819i 0.410419i
\(310\) −174.726 + 204.432i −0.563633 + 0.659457i
\(311\) −347.931 −1.11875 −0.559374 0.828915i \(-0.688958\pi\)
−0.559374 + 0.828915i \(0.688958\pi\)
\(312\) −174.544 174.544i −0.559437 0.559437i
\(313\) 417.790 417.790i 1.33479 1.33479i 0.433767 0.901025i \(-0.357184\pi\)
0.901025 0.433767i \(-0.142816\pi\)
\(314\) 132.470i 0.421878i
\(315\) 66.1235 + 56.5153i 0.209916 + 0.179414i
\(316\) 27.2820 0.0863353
\(317\) 318.942 + 318.942i 1.00613 + 1.00613i 0.999981 + 0.00614481i \(0.00195597\pi\)
0.00614481 + 0.999981i \(0.498044\pi\)
\(318\) −160.398 + 160.398i −0.504395 + 0.504395i
\(319\) 175.161i 0.549093i
\(320\) 39.8778 3.12425i 0.124618 0.00976329i
\(321\) 203.026 0.632479
\(322\) −10.1642 10.1642i −0.0315657 0.0315657i
\(323\) 73.8642 73.8642i 0.228682 0.228682i
\(324\) 174.994i 0.540105i
\(325\) −309.447 + 425.283i −0.952143 + 1.30856i
\(326\) 20.2929 0.0622481
\(327\) −101.215 101.215i −0.309525 0.309525i
\(328\) 84.2998 84.2998i 0.257012 0.257012i
\(329\) 45.2065i 0.137406i
\(330\) −18.8947 241.171i −0.0572565 0.730820i
\(331\) 125.989 0.380632 0.190316 0.981723i \(-0.439049\pi\)
0.190316 + 0.981723i \(0.439049\pi\)
\(332\) −0.280210 0.280210i −0.000844007 0.000844007i
\(333\) 155.468 155.468i 0.466871 0.466871i
\(334\) 220.035i 0.658788i
\(335\) 39.5424 46.2651i 0.118037 0.138105i
\(336\) −35.1673 −0.104665
\(337\) −419.196 419.196i −1.24390 1.24390i −0.958368 0.285536i \(-0.907828\pi\)
−0.285536 0.958368i \(-0.592172\pi\)
\(338\) −273.597 + 273.597i −0.809458 + 0.809458i
\(339\) 111.026i 0.327511i
\(340\) −95.3238 81.4726i −0.280364 0.239625i
\(341\) −313.650 −0.919795
\(342\) 68.3796 + 68.3796i 0.199940 + 0.199940i
\(343\) 140.134 140.134i 0.408553 0.408553i
\(344\) 208.817i 0.607028i
\(345\) 99.1692 7.76947i 0.287447 0.0225202i
\(346\) 373.139 1.07844
\(347\) −364.181 364.181i −1.04951 1.04951i −0.998709 0.0508046i \(-0.983821\pi\)
−0.0508046 0.998709i \(-0.516179\pi\)
\(348\) 124.603 124.603i 0.358053 0.358053i
\(349\) 3.69442i 0.0105857i 0.999986 + 0.00529286i \(0.00168478\pi\)
−0.999986 + 0.00529286i \(0.998315\pi\)
\(350\) 11.6694 + 74.0169i 0.0333412 + 0.211477i
\(351\) 69.0748 0.196794
\(352\) 32.9880 + 32.9880i 0.0937160 + 0.0937160i
\(353\) 67.2124 67.2124i 0.190403 0.190403i −0.605467 0.795870i \(-0.707014\pi\)
0.795870 + 0.605467i \(0.207014\pi\)
\(354\) 235.727i 0.665897i
\(355\) −48.6679 621.194i −0.137093 1.74984i
\(356\) −268.014 −0.752849
\(357\) 77.9563 + 77.9563i 0.218365 + 0.218365i
\(358\) −115.306 + 115.306i −0.322085 + 0.322085i
\(359\) 616.956i 1.71854i 0.511523 + 0.859270i \(0.329082\pi\)
−0.511523 + 0.859270i \(0.670918\pi\)
\(360\) 75.4230 88.2457i 0.209508 0.245127i
\(361\) 291.606 0.807772
\(362\) 233.419 + 233.419i 0.644803 + 0.644803i
\(363\) −155.426 + 155.426i −0.428172 + 0.428172i
\(364\) 89.1747i 0.244985i
\(365\) −529.551 452.604i −1.45083 1.24001i
\(366\) −53.1629 −0.145254
\(367\) 387.637 + 387.637i 1.05623 + 1.05623i 0.998322 + 0.0579085i \(0.0184432\pi\)
0.0579085 + 0.998322i \(0.481557\pi\)
\(368\) −13.5647 + 13.5647i −0.0368605 + 0.0368605i
\(369\) 345.988i 0.937637i
\(370\) 188.820 14.7932i 0.510324 0.0399816i
\(371\) 81.9472 0.220882
\(372\) −223.119 223.119i −0.599781 0.599781i
\(373\) 186.795 186.795i 0.500792 0.500792i −0.410892 0.911684i \(-0.634783\pi\)
0.911684 + 0.410892i \(0.134783\pi\)
\(374\) 146.251i 0.391045i
\(375\) −441.840 271.405i −1.17824 0.723747i
\(376\) −60.3307 −0.160454
\(377\) −315.958 315.958i −0.838085 0.838085i
\(378\) 6.95862 6.95862i 0.0184090 0.0184090i
\(379\) 539.217i 1.42274i 0.702819 + 0.711369i \(0.251924\pi\)
−0.702819 + 0.711369i \(0.748076\pi\)
\(380\) 6.50651 + 83.0488i 0.0171224 + 0.218549i
\(381\) 52.7442 0.138436
\(382\) 196.087 + 196.087i 0.513318 + 0.513318i
\(383\) 20.4243 20.4243i 0.0533271 0.0533271i −0.679940 0.733267i \(-0.737994\pi\)
0.733267 + 0.679940i \(0.237994\pi\)
\(384\) 46.9328i 0.122221i
\(385\) −56.7804 + 66.4336i −0.147481 + 0.172555i
\(386\) 357.901 0.927205
\(387\) 428.520 + 428.520i 1.10729 + 1.10729i
\(388\) 164.012 164.012i 0.422712 0.422712i
\(389\) 706.906i 1.81724i −0.417624 0.908620i \(-0.637137\pi\)
0.417624 0.908620i \(-0.362863\pi\)
\(390\) −469.110 400.945i −1.20285 1.02806i
\(391\) 60.1383 0.153806
\(392\) −89.0165 89.0165i −0.227083 0.227083i
\(393\) 621.086 621.086i 1.58037 1.58037i
\(394\) 263.287i 0.668240i
\(395\) 67.9965 5.32723i 0.172143 0.0134867i
\(396\) 135.391 0.341897
\(397\) 427.282 + 427.282i 1.07628 + 1.07628i 0.996840 + 0.0794382i \(0.0253126\pi\)
0.0794382 + 0.996840i \(0.474687\pi\)
\(398\) −11.2591 + 11.2591i −0.0282891 + 0.0282891i
\(399\) 73.2388i 0.183556i
\(400\) 98.7799 15.5735i 0.246950 0.0389338i
\(401\) 587.689 1.46556 0.732779 0.680467i \(-0.238223\pi\)
0.732779 + 0.680467i \(0.238223\pi\)
\(402\) 50.4941 + 50.4941i 0.125607 + 0.125607i
\(403\) −565.768 + 565.768i −1.40389 + 1.40389i
\(404\) 81.0200i 0.200544i
\(405\) 34.1703 + 436.148i 0.0843711 + 1.07691i
\(406\) −63.6594 −0.156797
\(407\) 156.197 + 156.197i 0.383776 + 0.383776i
\(408\) 104.037 104.037i 0.254993 0.254993i
\(409\) 667.696i 1.63251i 0.577694 + 0.816254i \(0.303953\pi\)
−0.577694 + 0.816254i \(0.696047\pi\)
\(410\) 193.645 226.567i 0.472305 0.552601i
\(411\) 866.247 2.10766
\(412\) −43.2344 43.2344i −0.104938 0.104938i
\(413\) −60.2166 + 60.2166i −0.145803 + 0.145803i
\(414\) 55.6728i 0.134475i
\(415\) −0.753102 0.643671i −0.00181470 0.00155101i
\(416\) 119.009 0.286079
\(417\) −209.156 209.156i −0.501574 0.501574i
\(418\) −68.7003 + 68.7003i −0.164355 + 0.164355i
\(419\) 393.072i 0.938120i 0.883166 + 0.469060i \(0.155407\pi\)
−0.883166 + 0.469060i \(0.844593\pi\)
\(420\) −87.6497 + 6.86697i −0.208690 + 0.0163499i
\(421\) −67.3773 −0.160041 −0.0800205 0.996793i \(-0.525499\pi\)
−0.0800205 + 0.996793i \(0.525499\pi\)
\(422\) 279.820 + 279.820i 0.663080 + 0.663080i
\(423\) −123.806 + 123.806i −0.292686 + 0.292686i
\(424\) 109.363i 0.257932i
\(425\) −253.490 184.446i −0.596448 0.433990i
\(426\) 731.093 1.71618
\(427\) 13.5805 + 13.5805i 0.0318044 + 0.0318044i
\(428\) −69.2141 + 69.2141i −0.161715 + 0.161715i
\(429\) 719.734i 1.67770i
\(430\) 40.7749 + 520.449i 0.0948253 + 1.21035i
\(431\) 235.521 0.546453 0.273227 0.961950i \(-0.411909\pi\)
0.273227 + 0.961950i \(0.411909\pi\)
\(432\) −9.28668 9.28668i −0.0214969 0.0214969i
\(433\) 391.171 391.171i 0.903398 0.903398i −0.0923301 0.995728i \(-0.529432\pi\)
0.995728 + 0.0923301i \(0.0294315\pi\)
\(434\) 113.991i 0.262653i
\(435\) 286.224 334.885i 0.657987 0.769852i
\(436\) 69.0108 0.158282
\(437\) −28.2495 28.2495i −0.0646442 0.0646442i
\(438\) 577.957 577.957i 1.31954 1.31954i
\(439\) 202.665i 0.461652i 0.972995 + 0.230826i \(0.0741429\pi\)
−0.972995 + 0.230826i \(0.925857\pi\)
\(440\) 88.6596 + 75.7767i 0.201499 + 0.172220i
\(441\) −365.347 −0.828450
\(442\) −263.810 263.810i −0.596855 0.596855i
\(443\) 456.611 456.611i 1.03072 1.03072i 0.0312111 0.999513i \(-0.490064\pi\)
0.999513 0.0312111i \(-0.00993641\pi\)
\(444\) 222.225i 0.500507i
\(445\) −667.989 + 52.3340i −1.50110 + 0.117605i
\(446\) −427.489 −0.958495
\(447\) −618.831 618.831i −1.38441 1.38441i
\(448\) 11.9890 11.9890i 0.0267611 0.0267611i
\(449\) 709.974i 1.58123i −0.612312 0.790616i \(-0.709760\pi\)
0.612312 0.790616i \(-0.290240\pi\)
\(450\) 170.750 234.668i 0.379445 0.521484i
\(451\) 347.611 0.770755
\(452\) −37.8503 37.8503i −0.0837396 0.0837396i
\(453\) −792.640 + 792.640i −1.74976 + 1.74976i
\(454\) 169.064i 0.372388i
\(455\) 17.4128 + 222.256i 0.0382698 + 0.488474i
\(456\) −97.7414 −0.214345
\(457\) 432.714 + 432.714i 0.946859 + 0.946859i 0.998658 0.0517988i \(-0.0164955\pi\)
−0.0517988 + 0.998658i \(0.516495\pi\)
\(458\) −146.588 + 146.588i −0.320060 + 0.320060i
\(459\) 41.1721i 0.0896995i
\(460\) −31.1593 + 36.4568i −0.0677377 + 0.0792538i
\(461\) 561.628 1.21828 0.609141 0.793062i \(-0.291514\pi\)
0.609141 + 0.793062i \(0.291514\pi\)
\(462\) −72.5063 72.5063i −0.156940 0.156940i
\(463\) 82.5073 82.5073i 0.178201 0.178201i −0.612370 0.790571i \(-0.709784\pi\)
0.790571 + 0.612370i \(0.209784\pi\)
\(464\) 84.9572i 0.183098i
\(465\) −599.660 512.525i −1.28959 1.10220i
\(466\) 79.9648 0.171598
\(467\) 535.526 + 535.526i 1.14674 + 1.14674i 0.987190 + 0.159546i \(0.0510031\pi\)
0.159546 + 0.987190i \(0.448997\pi\)
\(468\) 244.221 244.221i 0.521841 0.521841i
\(469\) 25.7974i 0.0550052i
\(470\) −150.366 + 11.7805i −0.319928 + 0.0250649i
\(471\) −388.573 −0.824997
\(472\) 80.3625 + 80.3625i 0.170260 + 0.170260i
\(473\) −430.530 + 430.530i −0.910211 + 0.910211i
\(474\) 80.0262i 0.168832i
\(475\) 32.4331 + 205.717i 0.0682803 + 0.433089i
\(476\) −53.1526 −0.111665
\(477\) −224.427 224.427i −0.470498 0.470498i
\(478\) −181.320 + 181.320i −0.379330 + 0.379330i
\(479\) 310.478i 0.648180i −0.946026 0.324090i \(-0.894942\pi\)
0.946026 0.324090i \(-0.105058\pi\)
\(480\) 9.16437 + 116.974i 0.0190924 + 0.243695i
\(481\) 563.502 1.17152
\(482\) −193.662 193.662i −0.401789 0.401789i
\(483\) 29.8145 29.8145i 0.0617278 0.0617278i
\(484\) 105.974i 0.218954i
\(485\) 376.752 440.804i 0.776808 0.908873i
\(486\) −471.520 −0.970205
\(487\) −2.90625 2.90625i −0.00596766 0.00596766i 0.704117 0.710084i \(-0.251343\pi\)
−0.710084 + 0.704117i \(0.751343\pi\)
\(488\) 18.1239 18.1239i 0.0371392 0.0371392i
\(489\) 59.5252i 0.121728i
\(490\) −239.243 204.480i −0.488252 0.417305i
\(491\) −518.684 −1.05638 −0.528192 0.849125i \(-0.677130\pi\)
−0.528192 + 0.849125i \(0.677130\pi\)
\(492\) 247.277 + 247.277i 0.502595 + 0.502595i
\(493\) 188.327 188.327i 0.382002 0.382002i
\(494\) 247.846i 0.501712i
\(495\) 337.444 26.4373i 0.681706 0.0534087i
\(496\) 152.128 0.306710
\(497\) −186.758 186.758i −0.375770 0.375770i
\(498\) 0.821942 0.821942i 0.00165049 0.00165049i
\(499\) 707.530i 1.41790i −0.705261 0.708948i \(-0.749170\pi\)
0.705261 0.708948i \(-0.250830\pi\)
\(500\) 243.154 58.1032i 0.486309 0.116206i
\(501\) −645.429 −1.28828
\(502\) 390.386 + 390.386i 0.777661 + 0.777661i
\(503\) 123.616 123.616i 0.245758 0.245758i −0.573469 0.819227i \(-0.694403\pi\)
0.819227 + 0.573469i \(0.194403\pi\)
\(504\) 49.2059i 0.0976307i
\(505\) 15.8204 + 201.931i 0.0313276 + 0.399864i
\(506\) −55.9339 −0.110541
\(507\) −802.542 802.542i −1.58292 1.58292i
\(508\) −17.9812 + 17.9812i −0.0353960 + 0.0353960i
\(509\) 453.051i 0.890080i 0.895511 + 0.445040i \(0.146811\pi\)
−0.895511 + 0.445040i \(0.853189\pi\)
\(510\) 238.984 279.613i 0.468595 0.548262i
\(511\) −295.278 −0.577844
\(512\) −16.0000 16.0000i −0.0312500 0.0312500i
\(513\) 19.3403 19.3403i 0.0377003 0.0377003i
\(514\) 487.169i 0.947799i
\(515\) −116.198 99.3136i −0.225627 0.192842i
\(516\) −612.525 −1.18706
\(517\) −124.387 124.387i −0.240594 0.240594i
\(518\) 56.7674 56.7674i 0.109590 0.109590i
\(519\) 1094.53i 2.10892i
\(520\) 296.613 23.2383i 0.570410 0.0446891i
\(521\) −157.780 −0.302841 −0.151421 0.988469i \(-0.548385\pi\)
−0.151421 + 0.988469i \(0.548385\pi\)
\(522\) 174.343 + 174.343i 0.333991 + 0.333991i
\(523\) −670.116 + 670.116i −1.28129 + 1.28129i −0.341358 + 0.939933i \(0.610887\pi\)
−0.939933 + 0.341358i \(0.889113\pi\)
\(524\) 423.473i 0.808154i
\(525\) −217.114 + 34.2300i −0.413550 + 0.0651999i
\(526\) −415.539 −0.789999
\(527\) −337.226 337.226i −0.639898 0.639898i
\(528\) −96.7638 + 96.7638i −0.183265 + 0.183265i
\(529\) 23.0000i 0.0434783i
\(530\) −21.3549 272.573i −0.0402923 0.514289i
\(531\) 329.828 0.621146
\(532\) 24.9680 + 24.9680i 0.0469324 + 0.0469324i
\(533\) 627.027 627.027i 1.17641 1.17641i
\(534\) 786.167i 1.47222i
\(535\) −158.991 + 186.022i −0.297180 + 0.347704i
\(536\) −34.4282 −0.0642317
\(537\) −338.228 338.228i −0.629848 0.629848i
\(538\) −98.1410 + 98.1410i −0.182418 + 0.182418i
\(539\) 367.060i 0.681002i
\(540\) −24.9591 21.3324i −0.0462206 0.0395045i
\(541\) 132.733 0.245347 0.122673 0.992447i \(-0.460853\pi\)
0.122673 + 0.992447i \(0.460853\pi\)
\(542\) −79.9374 79.9374i −0.147486 0.147486i
\(543\) −684.687 + 684.687i −1.26093 + 1.26093i
\(544\) 70.9353i 0.130396i
\(545\) 172.000 13.4755i 0.315596 0.0247256i
\(546\) −261.576 −0.479077
\(547\) 195.456 + 195.456i 0.357324 + 0.357324i 0.862826 0.505501i \(-0.168692\pi\)
−0.505501 + 0.862826i \(0.668692\pi\)
\(548\) −295.315 + 295.315i −0.538896 + 0.538896i
\(549\) 74.3853i 0.135492i
\(550\) 235.768 + 171.551i 0.428670 + 0.311911i
\(551\) −176.930 −0.321108
\(552\) −39.7892 39.7892i −0.0720819 0.0720819i
\(553\) 20.4427 20.4427i 0.0369669 0.0369669i
\(554\) 385.495i 0.695839i
\(555\) 43.3929 + 553.865i 0.0781855 + 0.997956i
\(556\) 142.608 0.256489
\(557\) 123.892 + 123.892i 0.222428 + 0.222428i 0.809520 0.587092i \(-0.199727\pi\)
−0.587092 + 0.809520i \(0.699727\pi\)
\(558\) 312.186 312.186i 0.559473 0.559473i
\(559\) 1553.20i 2.77852i
\(560\) 27.5399 32.2219i 0.0491783 0.0575392i
\(561\) 428.998 0.764702
\(562\) 108.185 + 108.185i 0.192501 + 0.192501i
\(563\) −354.739 + 354.739i −0.630088 + 0.630088i −0.948090 0.318002i \(-0.896988\pi\)
0.318002 + 0.948090i \(0.396988\pi\)
\(564\) 176.968i 0.313773i
\(565\) −101.728 86.9458i −0.180049 0.153886i
\(566\) −289.876 −0.512149
\(567\) 131.125 + 131.125i 0.231261 + 0.231261i
\(568\) −249.239 + 249.239i −0.438801 + 0.438801i
\(569\) 882.599i 1.55114i 0.631261 + 0.775571i \(0.282538\pi\)
−0.631261 + 0.775571i \(0.717462\pi\)
\(570\) −243.607 + 19.0855i −0.427381 + 0.0334834i
\(571\) −833.010 −1.45886 −0.729431 0.684054i \(-0.760215\pi\)
−0.729431 + 0.684054i \(0.760215\pi\)
\(572\) 245.367 + 245.367i 0.428963 + 0.428963i
\(573\) −575.184 + 575.184i −1.00381 + 1.00381i
\(574\) 126.334i 0.220093i
\(575\) −70.5416 + 96.9478i −0.122681 + 0.168605i
\(576\) −65.6681 −0.114007
\(577\) −298.867 298.867i −0.517966 0.517966i 0.398989 0.916956i \(-0.369361\pi\)
−0.916956 + 0.398989i \(0.869361\pi\)
\(578\) −131.756 + 131.756i −0.227951 + 0.227951i
\(579\) 1049.83i 1.81318i
\(580\) 16.5892 + 211.744i 0.0286021 + 0.365076i
\(581\) −0.419930 −0.000722771
\(582\) 481.097 + 481.097i 0.826627 + 0.826627i
\(583\) 225.480 225.480i 0.386758 0.386758i
\(584\) 394.066i 0.674770i
\(585\) 561.000 656.376i 0.958975 1.12201i
\(586\) 568.278 0.969758
\(587\) 43.0985 + 43.0985i 0.0734217 + 0.0734217i 0.742864 0.669442i \(-0.233467\pi\)
−0.669442 + 0.742864i \(0.733467\pi\)
\(588\) 261.112 261.112i 0.444068 0.444068i
\(589\) 316.819i 0.537893i
\(590\) 215.985 + 184.600i 0.366076 + 0.312882i
\(591\) 772.299 1.30677
\(592\) −75.7594 75.7594i −0.127972 0.127972i
\(593\) 60.5028 60.5028i 0.102028 0.102028i −0.654250 0.756278i \(-0.727016\pi\)
0.756278 + 0.654250i \(0.227016\pi\)
\(594\) 38.2937i 0.0644675i
\(595\) −132.476 + 10.3789i −0.222648 + 0.0174435i
\(596\) 421.935 0.707944
\(597\) −33.0262 33.0262i −0.0553203 0.0553203i
\(598\) −100.895 + 100.895i −0.168720 + 0.168720i
\(599\) 518.210i 0.865126i −0.901604 0.432563i \(-0.857609\pi\)
0.901604 0.432563i \(-0.142391\pi\)
\(600\) 45.6819 + 289.751i 0.0761365 + 0.482919i
\(601\) 283.917 0.472408 0.236204 0.971704i \(-0.424097\pi\)
0.236204 + 0.971704i \(0.424097\pi\)
\(602\) 156.469 + 156.469i 0.259916 + 0.259916i
\(603\) −70.6511 + 70.6511i −0.117166 + 0.117166i
\(604\) 540.442i 0.894772i
\(605\) −20.6930 264.125i −0.0342034 0.436570i
\(606\) −237.656 −0.392172
\(607\) 458.034 + 458.034i 0.754587 + 0.754587i 0.975332 0.220745i \(-0.0708488\pi\)
−0.220745 + 0.975332i \(0.570849\pi\)
\(608\) 33.3213 33.3213i 0.0548048 0.0548048i
\(609\) 186.732i 0.306621i
\(610\) 41.6324 48.7104i 0.0682499 0.0798531i
\(611\) −448.743 −0.734440
\(612\) 145.568 + 145.568i 0.237857 + 0.237857i
\(613\) −91.5983 + 91.5983i −0.149426 + 0.149426i −0.777862 0.628435i \(-0.783696\pi\)
0.628435 + 0.777862i \(0.283696\pi\)
\(614\) 159.480i 0.259739i
\(615\) 664.588 + 568.019i 1.08063 + 0.923608i
\(616\) 49.4366 0.0802543
\(617\) 196.492 + 196.492i 0.318463 + 0.318463i 0.848176 0.529714i \(-0.177701\pi\)
−0.529714 + 0.848176i \(0.677701\pi\)
\(618\) 126.819 126.819i 0.205210 0.205210i
\(619\) 1132.52i 1.82960i −0.403908 0.914800i \(-0.632348\pi\)
0.403908 0.914800i \(-0.367652\pi\)
\(620\) 379.158 29.7054i 0.611545 0.0479119i
\(621\) 15.7463 0.0253564
\(622\) 347.931 + 347.931i 0.559374 + 0.559374i
\(623\) −200.826 + 200.826i −0.322354 + 0.322354i
\(624\) 349.089i 0.559437i
\(625\) 594.683 192.294i 0.951493 0.307670i
\(626\) −835.580 −1.33479
\(627\) −201.519 201.519i −0.321401 0.321401i
\(628\) 132.470 132.470i 0.210939 0.210939i
\(629\) 335.876i 0.533984i
\(630\) −9.60822 122.639i −0.0152511 0.194665i
\(631\) 241.839 0.383263 0.191631 0.981467i \(-0.438622\pi\)
0.191631 + 0.981467i \(0.438622\pi\)
\(632\) −27.2820 27.2820i −0.0431676 0.0431676i
\(633\) −820.795 + 820.795i −1.29668 + 1.29668i
\(634\) 637.884i 1.00613i
\(635\) −41.3045 + 48.3267i −0.0650464 + 0.0761050i
\(636\) 320.795 0.504395
\(637\) −662.109 662.109i −1.03942 1.03942i
\(638\) −175.161 + 175.161i −0.274547 + 0.274547i
\(639\) 1022.94i 1.60085i
\(640\) −43.0021 36.7536i −0.0671907 0.0574274i
\(641\) 284.139 0.443275 0.221638 0.975129i \(-0.428860\pi\)
0.221638 + 0.975129i \(0.428860\pi\)
\(642\) −203.026 203.026i −0.316239 0.316239i
\(643\) 851.911 851.911i 1.32490 1.32490i 0.415145 0.909755i \(-0.363731\pi\)
0.909755 0.415145i \(-0.136269\pi\)
\(644\) 20.3283i 0.0315657i
\(645\) −1526.63 + 119.605i −2.36687 + 0.185434i
\(646\) −147.728 −0.228682
\(647\) −476.225 476.225i −0.736052 0.736052i 0.235760 0.971811i \(-0.424242\pi\)
−0.971811 + 0.235760i \(0.924242\pi\)
\(648\) 174.994 174.994i 0.270052 0.270052i
\(649\) 331.375i 0.510593i
\(650\) 734.730 115.837i 1.13035 0.178210i
\(651\) −334.371 −0.513626
\(652\) −20.2929 20.2929i −0.0311241 0.0311241i
\(653\) 248.523 248.523i 0.380587 0.380587i −0.490727 0.871313i \(-0.663269\pi\)
0.871313 + 0.490727i \(0.163269\pi\)
\(654\) 202.430i 0.309525i
\(655\) 82.6897 + 1055.45i 0.126244 + 1.61137i
\(656\) −168.600 −0.257012
\(657\) 808.674 + 808.674i 1.23086 + 1.23086i
\(658\) −45.2065 + 45.2065i −0.0687029 + 0.0687029i
\(659\) 390.353i 0.592341i −0.955135 0.296171i \(-0.904290\pi\)
0.955135 0.296171i \(-0.0957097\pi\)
\(660\) −222.276 + 260.065i −0.336782 + 0.394038i
\(661\) −384.050 −0.581013 −0.290507 0.956873i \(-0.593824\pi\)
−0.290507 + 0.956873i \(0.593824\pi\)
\(662\) −125.989 125.989i −0.190316 0.190316i
\(663\) 773.835 773.835i 1.16717 1.16717i
\(664\) 0.560421i 0.000844007i
\(665\) 67.1048 + 57.3540i 0.100909 + 0.0862466i
\(666\) −310.936 −0.466871
\(667\) −72.0260 72.0260i −0.107985 0.107985i
\(668\) 220.035 220.035i 0.329394 0.329394i
\(669\) 1253.95i 1.87437i
\(670\) −85.8075 + 6.72264i −0.128071 + 0.0100338i
\(671\) 74.7341 0.111377
\(672\) 35.1673 + 35.1673i 0.0523323 + 0.0523323i
\(673\) 220.835 220.835i 0.328136 0.328136i −0.523741 0.851877i \(-0.675464\pi\)
0.851877 + 0.523741i \(0.175464\pi\)
\(674\) 838.392i 1.24390i
\(675\) −66.3727 48.2944i −0.0983300 0.0715473i
\(676\) 547.194 0.809458
\(677\) −485.028 485.028i −0.716437 0.716437i 0.251437 0.967874i \(-0.419097\pi\)
−0.967874 + 0.251437i \(0.919097\pi\)
\(678\) 111.026 111.026i 0.163756 0.163756i
\(679\) 245.792i 0.361992i
\(680\) 13.8512 + 176.796i 0.0203695 + 0.259995i
\(681\) 495.916 0.728217
\(682\) 313.650 + 313.650i 0.459898 + 0.459898i
\(683\) −565.497 + 565.497i −0.827960 + 0.827960i −0.987234 0.159275i \(-0.949084\pi\)
0.159275 + 0.987234i \(0.449084\pi\)
\(684\) 136.759i 0.199940i
\(685\) −678.367 + 793.696i −0.990316 + 1.15868i
\(686\) −280.267 −0.408553
\(687\) −429.986 429.986i −0.625889 0.625889i
\(688\) 208.817 208.817i 0.303514 0.303514i
\(689\) 813.450i 1.18062i
\(690\) −106.939 91.3997i −0.154984 0.132463i
\(691\) −797.253 −1.15377 −0.576884 0.816826i \(-0.695731\pi\)
−0.576884 + 0.816826i \(0.695731\pi\)
\(692\) −373.139 373.139i −0.539218 0.539218i
\(693\) 101.450 101.450i 0.146393 0.146393i
\(694\) 728.362i 1.04951i
\(695\) 355.431 27.8465i 0.511412 0.0400669i
\(696\) −249.205 −0.358053
\(697\) 373.739 + 373.739i 0.536212 + 0.536212i
\(698\) 3.69442 3.69442i 0.00529286 0.00529286i
\(699\) 234.561i 0.335566i
\(700\) 62.3475 85.6863i 0.0890678 0.122409i
\(701\) −285.085 −0.406684 −0.203342 0.979108i \(-0.565180\pi\)
−0.203342 + 0.979108i \(0.565180\pi\)
\(702\) −69.0748 69.0748i −0.0983972 0.0983972i
\(703\) 157.775 157.775i 0.224431 0.224431i
\(704\) 65.9761i 0.0937160i
\(705\) −34.5558 441.069i −0.0490153 0.625629i
\(706\) −134.425 −0.190403
\(707\) 60.7092 + 60.7092i 0.0858687 + 0.0858687i
\(708\) −235.727 + 235.727i −0.332948 + 0.332948i
\(709\) 704.449i 0.993581i 0.867870 + 0.496791i \(0.165488\pi\)
−0.867870 + 0.496791i \(0.834512\pi\)
\(710\) −572.526 + 669.862i −0.806375 + 0.943468i
\(711\) −111.972 −0.157485
\(712\) 268.014 + 268.014i 0.376425 + 0.376425i
\(713\) −128.973 + 128.973i −0.180887 + 0.180887i
\(714\) 155.913i 0.218365i
\(715\) 659.454 + 563.631i 0.922314 + 0.788295i
\(716\) 230.613 0.322085
\(717\) −531.865 531.865i −0.741792 0.741792i
\(718\) 616.956 616.956i 0.859270 0.859270i
\(719\) 221.172i 0.307610i −0.988101 0.153805i \(-0.950847\pi\)
0.988101 0.153805i \(-0.0491528\pi\)
\(720\) −163.669 + 12.8227i −0.227318 + 0.0178093i
\(721\) −64.7921 −0.0898642
\(722\) −291.606 291.606i −0.403886 0.403886i
\(723\) 568.070 568.070i 0.785712 0.785712i
\(724\) 466.837i 0.644803i
\(725\) 82.6928 + 524.504i 0.114059 + 0.723454i
\(726\) 310.853 0.428172
\(727\) −682.913 682.913i −0.939358 0.939358i 0.0589058 0.998264i \(-0.481239\pi\)
−0.998264 + 0.0589058i \(0.981239\pi\)
\(728\) 89.1747 89.1747i 0.122493 0.122493i
\(729\) 595.637i 0.817060i
\(730\) 76.9475 + 982.155i 0.105408 + 1.34542i
\(731\) −925.783 −1.26646
\(732\) 53.1629 + 53.1629i 0.0726270 + 0.0726270i
\(733\) 771.576 771.576i 1.05263 1.05263i 0.0540913 0.998536i \(-0.482774\pi\)
0.998536 0.0540913i \(-0.0172262\pi\)
\(734\) 775.273i 1.05623i
\(735\) 599.800 701.773i 0.816055 0.954793i
\(736\) 27.1293 0.0368605
\(737\) −70.9824 70.9824i −0.0963126 0.0963126i
\(738\) −345.988 + 345.988i −0.468819 + 0.468819i
\(739\) 437.300i 0.591746i 0.955227 + 0.295873i \(0.0956105\pi\)
−0.955227 + 0.295873i \(0.904389\pi\)
\(740\) −203.613 174.027i −0.275153 0.235171i
\(741\) −727.006 −0.981114
\(742\) −81.9472 81.9472i −0.110441 0.110441i
\(743\) 98.9510 98.9510i 0.133178 0.133178i −0.637376 0.770553i \(-0.719980\pi\)
0.770553 + 0.637376i \(0.219980\pi\)
\(744\) 446.237i 0.599781i
\(745\) 1051.61 82.3894i 1.41156 0.110590i
\(746\) −373.591 −0.500792
\(747\) 1.15006 + 1.15006i 0.00153957 + 0.00153957i
\(748\) −146.251 + 146.251i −0.195523 + 0.195523i
\(749\) 103.726i 0.138486i
\(750\) 170.434 + 713.245i 0.227246 + 0.950993i
\(751\) 1215.87 1.61900 0.809500 0.587120i \(-0.199738\pi\)
0.809500 + 0.587120i \(0.199738\pi\)
\(752\) 60.3307 + 60.3307i 0.0802270 + 0.0802270i
\(753\) −1145.12 + 1145.12i −1.52074 + 1.52074i
\(754\) 631.916i 0.838085i
\(755\) −105.530 1346.98i −0.139775 1.78408i
\(756\) −13.9172 −0.0184090
\(757\) −350.412 350.412i −0.462896 0.462896i 0.436707 0.899604i \(-0.356145\pi\)
−0.899604 + 0.436707i \(0.856145\pi\)
\(758\) 539.217 539.217i 0.711369 0.711369i
\(759\) 164.071i 0.216167i
\(760\) 76.5422 89.5553i 0.100713 0.117836i
\(761\) 442.067 0.580903 0.290451 0.956890i \(-0.406195\pi\)
0.290451 + 0.956890i \(0.406195\pi\)
\(762\) −52.7442 52.7442i −0.0692181 0.0692181i
\(763\) 51.7106 51.7106i 0.0677728 0.0677728i
\(764\) 392.175i 0.513318i
\(765\) 391.233 + 334.384i 0.511416 + 0.437104i
\(766\) −40.8486 −0.0533271
\(767\) 597.741 + 597.741i 0.779323 + 0.779323i
\(768\) 46.9328 46.9328i 0.0611104 0.0611104i
\(769\) 176.509i 0.229531i −0.993393 0.114766i \(-0.963388\pi\)
0.993393 0.114766i \(-0.0366117\pi\)
\(770\) 123.214 9.65328i 0.160018 0.0125367i
\(771\) 1429.01 1.85345
\(772\) −357.901 357.901i −0.463602 0.463602i
\(773\) −687.163 + 687.163i −0.888956 + 0.888956i −0.994423 0.105467i \(-0.966366\pi\)
0.105467 + 0.994423i \(0.466366\pi\)
\(774\) 857.040i 1.10729i
\(775\) 939.199 148.073i 1.21187 0.191062i
\(776\) −328.024 −0.422712
\(777\) 166.516 + 166.516i 0.214306 + 0.214306i
\(778\) −706.906 + 706.906i −0.908620 + 0.908620i
\(779\) 351.122i 0.450735i
\(780\) 68.1651 + 870.056i 0.0873911 + 1.11546i
\(781\) −1027.74 −1.31593
\(782\) −60.1383 60.1383i −0.0769032 0.0769032i
\(783\) 49.3107 49.3107i 0.0629766 0.0629766i
\(784\) 178.033i 0.227083i
\(785\) 304.296 356.029i 0.387638 0.453540i
\(786\) −1242.17 −1.58037
\(787\) −988.378 988.378i −1.25588 1.25588i −0.953042 0.302839i \(-0.902065\pi\)
−0.302839 0.953042i \(-0.597935\pi\)
\(788\) −263.287 + 263.287i −0.334120 + 0.334120i
\(789\) 1218.90i 1.54487i
\(790\) −73.3237 62.6693i −0.0928149 0.0793282i
\(791\) −56.7233 −0.0717109
\(792\) −135.391 135.391i −0.170949 0.170949i
\(793\) 134.807 134.807i 0.169996 0.169996i
\(794\) 854.565i 1.07628i
\(795\) 799.539 62.6404i 1.00571 0.0787929i
\(796\) 22.5181 0.0282891
\(797\) 546.758 + 546.758i 0.686020 + 0.686020i 0.961350 0.275330i \(-0.0887870\pi\)
−0.275330 + 0.961350i \(0.588787\pi\)
\(798\) −73.2388 + 73.2388i −0.0917779 + 0.0917779i
\(799\) 267.473i 0.334760i
\(800\) −114.353 83.2063i −0.142942 0.104008i
\(801\) 1100.00 1.37328
\(802\) −587.689 587.689i −0.732779 0.732779i
\(803\) −812.466 + 812.466i −1.01179 + 1.01179i
\(804\) 100.988i 0.125607i
\(805\) 3.96942 + 50.6655i 0.00493096 + 0.0629385i
\(806\) 1131.54 1.40389
\(807\) −287.877 287.877i −0.356725 0.356725i
\(808\) 81.0200 81.0200i 0.100272 0.100272i
\(809\) 507.535i 0.627361i −0.949529 0.313680i \(-0.898438\pi\)
0.949529 0.313680i \(-0.101562\pi\)
\(810\) 401.978 470.318i 0.496269 0.580640i
\(811\) 425.796 0.525026 0.262513 0.964929i \(-0.415449\pi\)
0.262513 + 0.964929i \(0.415449\pi\)
\(812\) 63.6594 + 63.6594i 0.0783983 + 0.0783983i
\(813\) 234.481 234.481i 0.288414 0.288414i
\(814\) 312.394i 0.383776i
\(815\) −54.5398 46.6147i −0.0669199 0.0571960i
\(816\) −208.075 −0.254993
\(817\) 434.879 + 434.879i 0.532288 + 0.532288i
\(818\) 667.696 667.696i 0.816254 0.816254i
\(819\) 365.996i 0.446881i
\(820\) −420.211 + 32.9217i −0.512453 + 0.0401485i
\(821\) 699.302 0.851768 0.425884 0.904778i \(-0.359963\pi\)
0.425884 + 0.904778i \(0.359963\pi\)
\(822\) −866.247 866.247i −1.05383 1.05383i
\(823\) 1034.27 1034.27i 1.25671 1.25671i 0.304049 0.952656i \(-0.401661\pi\)
0.952656 0.304049i \(-0.0983386\pi\)
\(824\) 86.4688i 0.104938i
\(825\) −503.210 + 691.580i −0.609952 + 0.838278i
\(826\) 120.433 0.145803
\(827\) 1036.48 + 1036.48i 1.25330 + 1.25330i 0.954231 + 0.299071i \(0.0966766\pi\)
0.299071 + 0.954231i \(0.403323\pi\)
\(828\) 55.6728 55.6728i 0.0672377 0.0672377i
\(829\) 253.518i 0.305811i 0.988241 + 0.152906i \(0.0488631\pi\)
−0.988241 + 0.152906i \(0.951137\pi\)
\(830\) 0.109431 + 1.39677i 0.000131845 + 0.00168286i
\(831\) 1130.77 1.36074
\(832\) −119.009 119.009i −0.143039 0.143039i
\(833\) 394.651 394.651i 0.473770 0.473770i
\(834\) 418.313i 0.501574i
\(835\) 505.442 591.373i 0.605320 0.708231i
\(836\) 137.401 0.164355
\(837\) −88.2977 88.2977i −0.105493 0.105493i
\(838\) 393.072 393.072i 0.469060 0.469060i
\(839\) 803.555i 0.957754i −0.877882 0.478877i \(-0.841044\pi\)
0.877882 0.478877i \(-0.158956\pi\)
\(840\) 94.5166 + 80.7827i 0.112520 + 0.0961699i
\(841\) 389.892 0.463605
\(842\) 67.3773 + 67.3773i 0.0800205 + 0.0800205i
\(843\) −317.341 + 317.341i −0.376442 + 0.376442i
\(844\) 559.639i 0.663080i
\(845\) 1363.81 106.848i 1.61397 0.126448i
\(846\) 247.613 0.292686
\(847\) −79.4073 79.4073i −0.0937513 0.0937513i
\(848\) −109.363 + 109.363i −0.128966 + 0.128966i
\(849\) 850.295i 1.00152i
\(850\) 69.0446 + 437.936i 0.0812289 + 0.515219i
\(851\) 128.456 0.150947
\(852\) −731.093 731.093i −0.858091 0.858091i
\(853\) −217.664 + 217.664i −0.255175 + 0.255175i −0.823088 0.567914i \(-0.807751\pi\)
0.567914 + 0.823088i \(0.307751\pi\)
\(854\) 27.1609i 0.0318044i
\(855\) −26.7044 340.853i −0.0312332 0.398659i
\(856\) 138.428 0.161715
\(857\) 931.024 + 931.024i 1.08638 + 1.08638i 0.995899 + 0.0904773i \(0.0288392\pi\)
0.0904773 + 0.995899i \(0.471161\pi\)
\(858\) −719.734 + 719.734i −0.838851 + 0.838851i
\(859\) 197.133i 0.229492i 0.993395 + 0.114746i \(0.0366054\pi\)
−0.993395 + 0.114746i \(0.963395\pi\)
\(860\) 479.674 561.224i 0.557760 0.652586i
\(861\) 370.575 0.430400
\(862\) −235.521 235.521i −0.273227 0.273227i
\(863\) −584.780 + 584.780i −0.677613 + 0.677613i −0.959460 0.281846i \(-0.909053\pi\)
0.281846 + 0.959460i \(0.409053\pi\)
\(864\) 18.5734i 0.0214969i
\(865\) −1002.86 857.136i −1.15937 0.990908i
\(866\) −782.343 −0.903398
\(867\) −386.480 386.480i −0.445767 0.445767i
\(868\) 113.991 113.991i 0.131326 0.131326i
\(869\) 112.497i 0.129456i
\(870\) −621.110 + 48.6612i −0.713919 + 0.0559324i
\(871\) −256.079 −0.294005
\(872\) −69.0108 69.0108i −0.0791409 0.0791409i
\(873\) −673.148 + 673.148i −0.771074 + 0.771074i
\(874\) 56.4990i 0.0646442i
\(875\) 138.661 225.736i 0.158470 0.257984i
\(876\) −1155.91 −1.31954
\(877\) 429.031 + 429.031i 0.489203 + 0.489203i 0.908055 0.418852i \(-0.137567\pi\)
−0.418852 + 0.908055i \(0.637567\pi\)
\(878\) 202.665 202.665i 0.230826 0.230826i
\(879\) 1666.93i 1.89639i
\(880\) −12.8829 164.436i −0.0146396 0.186859i
\(881\) 651.488 0.739487 0.369743 0.929134i \(-0.379446\pi\)
0.369743 + 0.929134i \(0.379446\pi\)
\(882\) 365.347 + 365.347i 0.414225 + 0.414225i
\(883\) −1003.05 + 1003.05i −1.13596 + 1.13596i −0.146793 + 0.989167i \(0.546895\pi\)
−0.989167 + 0.146793i \(0.953105\pi\)
\(884\) 527.620i 0.596855i
\(885\) −541.489 + 633.548i −0.611852 + 0.715873i
\(886\) −913.221 −1.03072
\(887\) −615.433 615.433i −0.693836 0.693836i 0.269237 0.963074i \(-0.413228\pi\)
−0.963074 + 0.269237i \(0.913228\pi\)
\(888\) 222.225 222.225i 0.250253 0.250253i
\(889\) 26.9470i 0.0303116i
\(890\) 720.323 + 615.655i 0.809352 + 0.691747i
\(891\) 721.588 0.809863
\(892\) 427.489 + 427.489i 0.479247 + 0.479247i
\(893\) −125.644 + 125.644i −0.140698 + 0.140698i
\(894\) 1237.66i 1.38441i
\(895\) 574.771 45.0308i 0.642202 0.0503137i
\(896\) −23.9780 −0.0267611
\(897\) −295.954 295.954i −0.329938 0.329938i
\(898\) −709.974 + 709.974i −0.790616 + 0.790616i
\(899\) 807.773i 0.898524i
\(900\) −405.418 + 63.9178i −0.450464 + 0.0710198i
\(901\) 484.857 0.538132
\(902\) −347.611 347.611i −0.385378 0.385378i
\(903\) −458.972 + 458.972i −0.508274 + 0.508274i
\(904\) 75.7006i 0.0837396i
\(905\) −91.1573 1163.53i −0.100726 1.28567i
\(906\) 1585.28 1.74976
\(907\) 342.093 + 342.093i 0.377170 + 0.377170i 0.870080 0.492910i \(-0.164067\pi\)
−0.492910 + 0.870080i \(0.664067\pi\)
\(908\) −169.064 + 169.064i −0.186194 + 0.186194i
\(909\) 332.527i 0.365816i
\(910\) 204.843 239.668i 0.225102 0.263372i
\(911\) −191.082 −0.209749 −0.104875 0.994485i \(-0.533444\pi\)
−0.104875 + 0.994485i \(0.533444\pi\)
\(912\) 97.7414 + 97.7414i 0.107173 + 0.107173i
\(913\) −1.15545 + 1.15545i −0.00126555 + 0.00126555i
\(914\) 865.429i 0.946859i
\(915\) 142.882 + 122.120i 0.156155 + 0.133465i
\(916\) 293.175 0.320060
\(917\) 317.313 + 317.313i 0.346034 + 0.346034i
\(918\) 41.1721 41.1721i 0.0448498 0.0448498i
\(919\) 801.645i 0.872301i 0.899874 + 0.436151i \(0.143659\pi\)
−0.899874 + 0.436151i \(0.856341\pi\)
\(920\) 67.6161 5.29743i 0.0734958 0.00575807i
\(921\) 467.803 0.507929
\(922\) −561.628 561.628i −0.609141 0.609141i
\(923\) −1853.85 + 1853.85i −2.00851 + 2.00851i
\(924\) 145.013i 0.156940i
\(925\) −541.459 393.979i −0.585361 0.425923i
\(926\) −165.015 −0.178201
\(927\) 177.445 + 177.445i 0.191419 + 0.191419i
\(928\) 84.9572 84.9572i 0.0915488 0.0915488i
\(929\) 1361.18i 1.46521i −0.680655 0.732604i \(-0.738305\pi\)
0.680655 0.732604i \(-0.261695\pi\)
\(930\) 87.1348 + 1112.18i 0.0936933 + 1.19590i
\(931\) −370.768 −0.398247
\(932\) −79.9648 79.9648i −0.0857992 0.0857992i
\(933\) −1020.59 + 1020.59i −1.09388 + 1.09388i
\(934\) 1071.05i 1.14674i
\(935\) −335.953 + 393.068i −0.359308 + 0.420394i
\(936\) −488.443 −0.521841
\(937\) 177.056 + 177.056i 0.188960 + 0.188960i 0.795247 0.606286i \(-0.207341\pi\)
−0.606286 + 0.795247i \(0.707341\pi\)
\(938\) −25.7974 + 25.7974i −0.0275026 + 0.0275026i
\(939\) 2451.01i 2.61023i
\(940\) 162.147 + 138.585i 0.172496 + 0.147431i
\(941\) 657.970 0.699224 0.349612 0.936895i \(-0.386313\pi\)
0.349612 + 0.936895i \(0.386313\pi\)
\(942\) 388.573 + 388.573i 0.412498 + 0.412498i
\(943\) 142.937 142.937i 0.151577 0.151577i
\(944\) 160.725i 0.170260i
\(945\) −34.6868 + 2.71756i −0.0367056 + 0.00287572i
\(946\) 861.060 0.910211
\(947\) −427.809 427.809i −0.451752 0.451752i 0.444183 0.895936i \(-0.353494\pi\)
−0.895936 + 0.444183i \(0.853494\pi\)
\(948\) 80.0262 80.0262i 0.0844158 0.0844158i
\(949\) 2931.08i 3.08860i
\(950\) 173.284 238.150i 0.182404 0.250684i
\(951\) 1871.11 1.96751
\(952\) 53.1526 + 53.1526i 0.0558326 + 0.0558326i
\(953\) −383.309 + 383.309i −0.402213 + 0.402213i −0.879012 0.476799i \(-0.841797\pi\)
0.476799 + 0.879012i \(0.341797\pi\)
\(954\) 448.855i 0.470498i
\(955\) −76.5783 977.442i −0.0801867 1.02350i
\(956\) 362.639 0.379330
\(957\) −513.799 513.799i −0.536885 0.536885i
\(958\) −310.478 + 310.478i −0.324090 + 0.324090i
\(959\) 442.565i 0.461486i
\(960\) 107.809 126.138i 0.112301 0.131394i
\(961\) 485.432 0.505132
\(962\) −563.502 563.502i −0.585761 0.585761i
\(963\) 284.072 284.072i 0.294987 0.294987i
\(964\) 387.324i 0.401789i
\(965\) −961.905 822.133i −0.996793 0.851952i
\(966\) −59.6291 −0.0617278
\(967\) 1075.83 + 1075.83i 1.11255 + 1.11255i 0.992805 + 0.119742i \(0.0382068\pi\)
0.119742 + 0.992805i \(0.461793\pi\)
\(968\) −105.974 + 105.974i −0.109477 + 0.109477i
\(969\) 433.332i 0.447195i
\(970\) −817.555 + 64.0519i −0.842841 + 0.0660329i
\(971\) −1782.45 −1.83568 −0.917840 0.396951i \(-0.870068\pi\)
−0.917840 + 0.396951i \(0.870068\pi\)
\(972\) 471.520 + 471.520i 0.485103 + 0.485103i
\(973\) 106.858 106.858i 0.109823 0.109823i
\(974\) 5.81250i 0.00596766i
\(975\) 339.784 + 2155.18i 0.348497 + 2.21045i
\(976\) −36.2479 −0.0371392
\(977\) 702.040 + 702.040i 0.718567 + 0.718567i 0.968312 0.249744i \(-0.0803466\pi\)
−0.249744 + 0.968312i \(0.580347\pi\)
\(978\) 59.5252 59.5252i 0.0608642 0.0608642i
\(979\) 1105.16i 1.12886i
\(980\) 34.7637 + 443.723i 0.0354732 + 0.452778i
\(981\) −283.238 −0.288724
\(982\) 518.684 + 518.684i 0.528192 + 0.528192i
\(983\) 1002.66 1002.66i 1.02000 1.02000i 0.0202076 0.999796i \(-0.493567\pi\)
0.999796 0.0202076i \(-0.00643270\pi\)
\(984\) 494.554i 0.502595i
\(985\) −604.795 + 707.617i −0.614005 + 0.718393i
\(986\) −376.654 −0.382002
\(987\) −132.604 132.604i −0.134351 0.134351i
\(988\) 247.846 247.846i 0.250856 0.250856i
\(989\) 354.067i 0.358005i
\(990\) −363.882 311.007i −0.367557 0.314149i
\(991\) 190.889 0.192622 0.0963111 0.995351i \(-0.469296\pi\)
0.0963111 + 0.995351i \(0.469296\pi\)
\(992\) −152.128 152.128i −0.153355 0.153355i
\(993\) 369.565 369.565i 0.372170 0.372170i
\(994\) 373.515i 0.375770i
\(995\) 56.1234 4.39702i 0.0564054 0.00441912i
\(996\) −1.64388 −0.00165049
\(997\) −1085.66 1085.66i −1.08893 1.08893i −0.995639 0.0932882i \(-0.970262\pi\)
−0.0932882 0.995639i \(-0.529738\pi\)
\(998\) −707.530 + 707.530i −0.708948 + 0.708948i
\(999\) 87.9441i 0.0880322i
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 230.3.f.a.47.10 20
5.3 odd 4 inner 230.3.f.a.93.10 yes 20
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
230.3.f.a.47.10 20 1.1 even 1 trivial
230.3.f.a.93.10 yes 20 5.3 odd 4 inner