Properties

Label 354.4.c.b.353.9
Level $354$
Weight $4$
Character 354.353
Analytic conductor $20.887$
Analytic rank $0$
Dimension $30$
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] = [354,4,Mod(353,354)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(354, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([1, 1]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("354.353");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 354 = 2 \cdot 3 \cdot 59 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 354.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: \(20.8866761420\)
Analytic rank: \(0\)
Dimension: \(30\)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 353.9
Character \(\chi\) \(=\) 354.353
Dual form 354.4.c.b.353.10

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+2.00000 q^{2} +(-3.04040 - 4.21378i) q^{3} +4.00000 q^{4} +12.5447i q^{5} +(-6.08081 - 8.42756i) q^{6} -33.4405 q^{7} +8.00000 q^{8} +(-8.51188 + 25.6232i) q^{9} +O(q^{10})\) \(q+2.00000 q^{2} +(-3.04040 - 4.21378i) q^{3} +4.00000 q^{4} +12.5447i q^{5} +(-6.08081 - 8.42756i) q^{6} -33.4405 q^{7} +8.00000 q^{8} +(-8.51188 + 25.6232i) q^{9} +25.0894i q^{10} +55.6576 q^{11} +(-12.1616 - 16.8551i) q^{12} -53.4865i q^{13} -66.8811 q^{14} +(52.8606 - 38.1410i) q^{15} +16.0000 q^{16} -114.641i q^{17} +(-17.0238 + 51.2464i) q^{18} +78.3915 q^{19} +50.1788i q^{20} +(101.673 + 140.911i) q^{21} +111.315 q^{22} +163.867 q^{23} +(-24.3232 - 33.7102i) q^{24} -32.3697 q^{25} -106.973i q^{26} +(133.850 - 42.0377i) q^{27} -133.762 q^{28} +76.0732i q^{29} +(105.721 - 76.2820i) q^{30} -160.914i q^{31} +32.0000 q^{32} +(-169.222 - 234.529i) q^{33} -229.283i q^{34} -419.502i q^{35} +(-34.0475 + 102.493i) q^{36} -83.0925i q^{37} +156.783 q^{38} +(-225.380 + 162.621i) q^{39} +100.358i q^{40} +70.9020i q^{41} +(203.346 + 281.822i) q^{42} +257.980i q^{43} +222.631 q^{44} +(-321.435 - 106.779i) q^{45} +327.733 q^{46} -497.485 q^{47} +(-48.6465 - 67.4205i) q^{48} +775.270 q^{49} -64.7393 q^{50} +(-483.073 + 348.556i) q^{51} -213.946i q^{52} -500.411i q^{53} +(267.700 - 84.0753i) q^{54} +698.209i q^{55} -267.524 q^{56} +(-238.342 - 330.324i) q^{57} +152.146i q^{58} +(453.067 - 10.4364i) q^{59} +(211.443 - 152.564i) q^{60} +32.9911i q^{61} -321.828i q^{62} +(284.642 - 856.853i) q^{63} +64.0000 q^{64} +670.972 q^{65} +(-338.443 - 469.058i) q^{66} +1052.72i q^{67} -458.565i q^{68} +(-498.221 - 690.498i) q^{69} -839.004i q^{70} -470.752i q^{71} +(-68.0951 + 204.986i) q^{72} -912.066i q^{73} -166.185i q^{74} +(98.4169 + 136.399i) q^{75} +313.566 q^{76} -1861.22 q^{77} +(-450.761 + 325.241i) q^{78} +674.923 q^{79} +200.715i q^{80} +(-584.096 - 436.203i) q^{81} +141.804i q^{82} +483.590 q^{83} +(406.691 + 563.644i) q^{84} +1438.14 q^{85} +515.960i q^{86} +(320.556 - 231.293i) q^{87} +445.261 q^{88} +70.2848 q^{89} +(-642.871 - 213.558i) q^{90} +1788.62i q^{91} +655.467 q^{92} +(-678.055 + 489.243i) q^{93} -994.970 q^{94} +983.398i q^{95} +(-97.2929 - 134.841i) q^{96} -549.167i q^{97} +1550.54 q^{98} +(-473.751 + 1426.13i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 30 q + 60 q^{2} + 5 q^{3} + 120 q^{4} + 10 q^{6} + 6 q^{7} + 240 q^{8} + 27 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 30 q + 60 q^{2} + 5 q^{3} + 120 q^{4} + 10 q^{6} + 6 q^{7} + 240 q^{8} + 27 q^{9} + 60 q^{11} + 20 q^{12} + 12 q^{14} + 20 q^{15} + 480 q^{16} + 54 q^{18} + 90 q^{19} + 132 q^{21} + 120 q^{22} - 24 q^{23} + 40 q^{24} - 1080 q^{25} - 55 q^{27} + 24 q^{28} + 40 q^{30} + 960 q^{32} - 336 q^{33} + 108 q^{36} + 180 q^{38} - 652 q^{39} + 264 q^{42} + 240 q^{44} - 878 q^{45} - 48 q^{46} - 792 q^{47} + 80 q^{48} + 2016 q^{49} - 2160 q^{50} + 650 q^{51} - 110 q^{54} + 48 q^{56} + 846 q^{57} + 480 q^{59} + 80 q^{60} + 887 q^{63} + 1920 q^{64} + 1416 q^{65} - 672 q^{66} + 590 q^{69} + 216 q^{72} - 952 q^{75} + 360 q^{76} - 864 q^{77} - 1304 q^{78} + 738 q^{79} - 1217 q^{81} - 876 q^{83} + 528 q^{84} + 1176 q^{85} + 534 q^{87} + 480 q^{88} + 300 q^{89} - 1756 q^{90} - 96 q^{92} - 1684 q^{93} - 1584 q^{94} + 160 q^{96} + 4032 q^{98} - 730 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/354\mathbb{Z}\right)^\times\).

\(n\) \(61\) \(119\)
\(\chi(n)\) \(-1\) \(-1\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 2.00000 0.707107
\(3\) −3.04040 4.21378i −0.585126 0.810942i
\(4\) 4.00000 0.500000
\(5\) 12.5447i 1.12203i 0.827805 + 0.561016i \(0.189590\pi\)
−0.827805 + 0.561016i \(0.810410\pi\)
\(6\) −6.08081 8.42756i −0.413747 0.573423i
\(7\) −33.4405 −1.80562 −0.902810 0.430040i \(-0.858499\pi\)
−0.902810 + 0.430040i \(0.858499\pi\)
\(8\) 8.00000 0.353553
\(9\) −8.51188 + 25.6232i −0.315255 + 0.949007i
\(10\) 25.0894i 0.793397i
\(11\) 55.6576 1.52558 0.762791 0.646645i \(-0.223828\pi\)
0.762791 + 0.646645i \(0.223828\pi\)
\(12\) −12.1616 16.8551i −0.292563 0.405471i
\(13\) 53.4865i 1.14111i −0.821258 0.570557i \(-0.806727\pi\)
0.821258 0.570557i \(-0.193273\pi\)
\(14\) −66.8811 −1.27677
\(15\) 52.8606 38.1410i 0.909904 0.656531i
\(16\) 16.0000 0.250000
\(17\) 114.641i 1.63556i −0.575528 0.817782i \(-0.695203\pi\)
0.575528 0.817782i \(-0.304797\pi\)
\(18\) −17.0238 + 51.2464i −0.222919 + 0.671049i
\(19\) 78.3915 0.946539 0.473269 0.880918i \(-0.343074\pi\)
0.473269 + 0.880918i \(0.343074\pi\)
\(20\) 50.1788i 0.561016i
\(21\) 101.673 + 140.911i 1.05652 + 1.46425i
\(22\) 111.315 1.07875
\(23\) 163.867 1.48559 0.742795 0.669519i \(-0.233500\pi\)
0.742795 + 0.669519i \(0.233500\pi\)
\(24\) −24.3232 33.7102i −0.206873 0.286711i
\(25\) −32.3697 −0.258957
\(26\) 106.973i 0.806889i
\(27\) 133.850 42.0377i 0.954054 0.299635i
\(28\) −133.762 −0.902810
\(29\) 76.0732i 0.487119i 0.969886 + 0.243559i \(0.0783151\pi\)
−0.969886 + 0.243559i \(0.921685\pi\)
\(30\) 105.721 76.2820i 0.643399 0.464237i
\(31\) 160.914i 0.932289i −0.884708 0.466145i \(-0.845643\pi\)
0.884708 0.466145i \(-0.154357\pi\)
\(32\) 32.0000 0.176777
\(33\) −169.222 234.529i −0.892658 1.23716i
\(34\) 229.283i 1.15652i
\(35\) 419.502i 2.02596i
\(36\) −34.0475 + 102.493i −0.157627 + 0.474504i
\(37\) 83.0925i 0.369198i −0.982814 0.184599i \(-0.940901\pi\)
0.982814 0.184599i \(-0.0590986\pi\)
\(38\) 156.783 0.669304
\(39\) −225.380 + 162.621i −0.925378 + 0.667696i
\(40\) 100.358i 0.396698i
\(41\) 70.9020i 0.270074i 0.990841 + 0.135037i \(0.0431153\pi\)
−0.990841 + 0.135037i \(0.956885\pi\)
\(42\) 203.346 + 281.822i 0.747069 + 1.03538i
\(43\) 257.980i 0.914920i 0.889230 + 0.457460i \(0.151241\pi\)
−0.889230 + 0.457460i \(0.848759\pi\)
\(44\) 222.631 0.762791
\(45\) −321.435 106.779i −1.06482 0.353726i
\(46\) 327.733 1.05047
\(47\) −497.485 −1.54395 −0.771975 0.635653i \(-0.780731\pi\)
−0.771975 + 0.635653i \(0.780731\pi\)
\(48\) −48.6465 67.4205i −0.146282 0.202736i
\(49\) 775.270 2.26026
\(50\) −64.7393 −0.183110
\(51\) −483.073 + 348.556i −1.32635 + 0.957012i
\(52\) 213.946i 0.570557i
\(53\) 500.411i 1.29692i −0.761249 0.648459i \(-0.775414\pi\)
0.761249 0.648459i \(-0.224586\pi\)
\(54\) 267.700 84.0753i 0.674618 0.211874i
\(55\) 698.209i 1.71175i
\(56\) −267.524 −0.638383
\(57\) −238.342 330.324i −0.553844 0.767588i
\(58\) 152.146i 0.344445i
\(59\) 453.067 10.4364i 0.999735 0.0230290i
\(60\) 211.443 152.564i 0.454952 0.328265i
\(61\) 32.9911i 0.0692472i 0.999400 + 0.0346236i \(0.0110232\pi\)
−0.999400 + 0.0346236i \(0.988977\pi\)
\(62\) 321.828i 0.659228i
\(63\) 284.642 856.853i 0.569230 1.71355i
\(64\) 64.0000 0.125000
\(65\) 670.972 1.28037
\(66\) −338.443 469.058i −0.631205 0.874804i
\(67\) 1052.72i 1.91956i 0.280760 + 0.959778i \(0.409414\pi\)
−0.280760 + 0.959778i \(0.590586\pi\)
\(68\) 458.565i 0.817782i
\(69\) −498.221 690.498i −0.869257 1.20473i
\(70\) 839.004i 1.43257i
\(71\) 470.752i 0.786873i −0.919352 0.393437i \(-0.871286\pi\)
0.919352 0.393437i \(-0.128714\pi\)
\(72\) −68.0951 + 204.986i −0.111459 + 0.335525i
\(73\) 912.066i 1.46232i −0.682207 0.731159i \(-0.738980\pi\)
0.682207 0.731159i \(-0.261020\pi\)
\(74\) 166.185i 0.261062i
\(75\) 98.4169 + 136.399i 0.151523 + 0.209999i
\(76\) 313.566 0.473269
\(77\) −1861.22 −2.75462
\(78\) −450.761 + 325.241i −0.654341 + 0.472132i
\(79\) 674.923 0.961199 0.480600 0.876940i \(-0.340419\pi\)
0.480600 + 0.876940i \(0.340419\pi\)
\(80\) 200.715i 0.280508i
\(81\) −584.096 436.203i −0.801229 0.598358i
\(82\) 141.804i 0.190971i
\(83\) 483.590 0.639528 0.319764 0.947497i \(-0.396396\pi\)
0.319764 + 0.947497i \(0.396396\pi\)
\(84\) 406.691 + 563.644i 0.528258 + 0.732127i
\(85\) 1438.14 1.83516
\(86\) 515.960i 0.646946i
\(87\) 320.556 231.293i 0.395025 0.285026i
\(88\) 445.261 0.539375
\(89\) 70.2848 0.0837098 0.0418549 0.999124i \(-0.486673\pi\)
0.0418549 + 0.999124i \(0.486673\pi\)
\(90\) −642.871 213.558i −0.752939 0.250122i
\(91\) 1788.62i 2.06042i
\(92\) 655.467 0.742795
\(93\) −678.055 + 489.243i −0.756033 + 0.545507i
\(94\) −994.970 −1.09174
\(95\) 983.398i 1.06205i
\(96\) −97.2929 134.841i −0.103437 0.143356i
\(97\) 549.167i 0.574840i −0.957805 0.287420i \(-0.907203\pi\)
0.957805 0.287420i \(-0.0927975\pi\)
\(98\) 1550.54 1.59825
\(99\) −473.751 + 1426.13i −0.480947 + 1.44779i
\(100\) −129.479 −0.129479
\(101\) 1282.30 1.26330 0.631652 0.775252i \(-0.282377\pi\)
0.631652 + 0.775252i \(0.282377\pi\)
\(102\) −966.146 + 697.112i −0.937870 + 0.676709i
\(103\) 1210.94i 1.15842i −0.815177 0.579212i \(-0.803360\pi\)
0.815177 0.579212i \(-0.196640\pi\)
\(104\) 427.892i 0.403445i
\(105\) −1767.69 + 1275.46i −1.64294 + 1.18544i
\(106\) 1000.82i 0.917060i
\(107\) 618.091i 0.558440i 0.960227 + 0.279220i \(0.0900759\pi\)
−0.960227 + 0.279220i \(0.909924\pi\)
\(108\) 535.400 168.151i 0.477027 0.149818i
\(109\) 14.7828i 0.0129902i −0.999979 0.00649512i \(-0.997933\pi\)
0.999979 0.00649512i \(-0.00206748\pi\)
\(110\) 1396.42i 1.21039i
\(111\) −350.133 + 252.635i −0.299398 + 0.216027i
\(112\) −535.049 −0.451405
\(113\) −759.245 −0.632068 −0.316034 0.948748i \(-0.602351\pi\)
−0.316034 + 0.948748i \(0.602351\pi\)
\(114\) −476.683 660.649i −0.391627 0.542767i
\(115\) 2055.66i 1.66688i
\(116\) 304.293i 0.243559i
\(117\) 1370.49 + 455.271i 1.08293 + 0.359742i
\(118\) 906.135 20.8729i 0.706919 0.0162839i
\(119\) 3833.67i 2.95321i
\(120\) 422.885 305.128i 0.321700 0.232119i
\(121\) 1766.77 1.32740
\(122\) 65.9823i 0.0489652i
\(123\) 298.765 215.571i 0.219014 0.158027i
\(124\) 643.655i 0.466145i
\(125\) 1162.02i 0.831474i
\(126\) 569.284 1713.71i 0.402507 1.21166i
\(127\) −1634.61 −1.14211 −0.571055 0.820912i \(-0.693466\pi\)
−0.571055 + 0.820912i \(0.693466\pi\)
\(128\) 128.000 0.0883883
\(129\) 1087.07 784.363i 0.741947 0.535344i
\(130\) 1341.94 0.905356
\(131\) −1341.04 −0.894403 −0.447201 0.894433i \(-0.647579\pi\)
−0.447201 + 0.894433i \(0.647579\pi\)
\(132\) −676.887 938.116i −0.446329 0.618580i
\(133\) −2621.45 −1.70909
\(134\) 2105.44i 1.35733i
\(135\) 527.350 + 1679.11i 0.336201 + 1.07048i
\(136\) 917.130i 0.578259i
\(137\) 2577.02i 1.60708i −0.595251 0.803540i \(-0.702947\pi\)
0.595251 0.803540i \(-0.297053\pi\)
\(138\) −996.442 1381.00i −0.614658 0.851871i
\(139\) −280.345 −0.171069 −0.0855344 0.996335i \(-0.527260\pi\)
−0.0855344 + 0.996335i \(0.527260\pi\)
\(140\) 1678.01i 1.01298i
\(141\) 1512.56 + 2096.29i 0.903406 + 1.25205i
\(142\) 941.504i 0.556403i
\(143\) 2976.93i 1.74086i
\(144\) −136.190 + 409.971i −0.0788137 + 0.237252i
\(145\) −954.316 −0.546563
\(146\) 1824.13i 1.03402i
\(147\) −2357.13 3266.82i −1.32254 1.83294i
\(148\) 332.370i 0.184599i
\(149\) −2428.29 −1.33512 −0.667562 0.744554i \(-0.732662\pi\)
−0.667562 + 0.744554i \(0.732662\pi\)
\(150\) 196.834 + 272.797i 0.107143 + 0.148492i
\(151\) 477.528i 0.257355i 0.991686 + 0.128678i \(0.0410733\pi\)
−0.991686 + 0.128678i \(0.958927\pi\)
\(152\) 627.132 0.334652
\(153\) 2937.48 + 975.813i 1.55216 + 0.515620i
\(154\) −3722.44 −1.94781
\(155\) 2018.62 1.04606
\(156\) −901.521 + 650.482i −0.462689 + 0.333848i
\(157\) 1193.03i 0.606460i 0.952917 + 0.303230i \(0.0980650\pi\)
−0.952917 + 0.303230i \(0.901935\pi\)
\(158\) 1349.85 0.679671
\(159\) −2108.62 + 1521.45i −1.05173 + 0.758861i
\(160\) 401.431i 0.198349i
\(161\) −5479.79 −2.68241
\(162\) −1168.19 872.406i −0.566554 0.423103i
\(163\) −325.353 −0.156341 −0.0781707 0.996940i \(-0.524908\pi\)
−0.0781707 + 0.996940i \(0.524908\pi\)
\(164\) 283.608i 0.135037i
\(165\) 2942.10 2122.84i 1.38813 1.00159i
\(166\) 967.179 0.452215
\(167\) 266.183i 0.123340i 0.998097 + 0.0616701i \(0.0196427\pi\)
−0.998097 + 0.0616701i \(0.980357\pi\)
\(168\) 813.382 + 1127.29i 0.373535 + 0.517692i
\(169\) −663.804 −0.302141
\(170\) 2876.28 1.29765
\(171\) −667.259 + 2008.64i −0.298401 + 0.898272i
\(172\) 1031.92i 0.457460i
\(173\) −286.319 −0.125829 −0.0629144 0.998019i \(-0.520040\pi\)
−0.0629144 + 0.998019i \(0.520040\pi\)
\(174\) 641.112 462.587i 0.279325 0.201544i
\(175\) 1082.46 0.467578
\(176\) 890.522 0.381396
\(177\) −1421.49 1877.40i −0.603646 0.797252i
\(178\) 140.570 0.0591918
\(179\) 2828.27 1.18098 0.590489 0.807046i \(-0.298935\pi\)
0.590489 + 0.807046i \(0.298935\pi\)
\(180\) −1285.74 427.116i −0.532408 0.176863i
\(181\) 746.946 0.306741 0.153370 0.988169i \(-0.450987\pi\)
0.153370 + 0.988169i \(0.450987\pi\)
\(182\) 3577.23i 1.45694i
\(183\) 139.017 100.306i 0.0561555 0.0405184i
\(184\) 1310.93 0.525235
\(185\) 1042.37 0.414252
\(186\) −1356.11 + 978.486i −0.534596 + 0.385732i
\(187\) 6380.66i 2.49519i
\(188\) −1989.94 −0.771975
\(189\) −4476.02 + 1405.76i −1.72266 + 0.541027i
\(190\) 1966.80i 0.750981i
\(191\) −769.440 −0.291491 −0.145745 0.989322i \(-0.546558\pi\)
−0.145745 + 0.989322i \(0.546558\pi\)
\(192\) −194.586 269.682i −0.0731408 0.101368i
\(193\) 4249.52 1.58491 0.792453 0.609933i \(-0.208804\pi\)
0.792453 + 0.609933i \(0.208804\pi\)
\(194\) 1098.33i 0.406473i
\(195\) −2040.03 2827.33i −0.749176 1.03830i
\(196\) 3101.08 1.13013
\(197\) 2929.88i 1.05962i 0.848116 + 0.529810i \(0.177737\pi\)
−0.848116 + 0.529810i \(0.822263\pi\)
\(198\) −947.502 + 2852.25i −0.340081 + 1.02374i
\(199\) 1773.01 0.631583 0.315792 0.948829i \(-0.397730\pi\)
0.315792 + 0.948829i \(0.397730\pi\)
\(200\) −258.957 −0.0915552
\(201\) 4435.93 3200.70i 1.55665 1.12318i
\(202\) 2564.60 0.893291
\(203\) 2543.93i 0.879551i
\(204\) −1932.29 + 1394.22i −0.663174 + 0.478506i
\(205\) −889.445 −0.303032
\(206\) 2421.88i 0.819129i
\(207\) −1394.81 + 4198.79i −0.468339 + 1.40984i
\(208\) 855.784i 0.285278i
\(209\) 4363.08 1.44402
\(210\) −3535.38 + 2550.91i −1.16173 + 0.838236i
\(211\) 796.189i 0.259772i −0.991529 0.129886i \(-0.958539\pi\)
0.991529 0.129886i \(-0.0414611\pi\)
\(212\) 2001.64i 0.648459i
\(213\) −1983.65 + 1431.28i −0.638109 + 0.460420i
\(214\) 1236.18i 0.394877i
\(215\) −3236.28 −1.02657
\(216\) 1070.80 336.301i 0.337309 0.105937i
\(217\) 5381.05i 1.68336i
\(218\) 29.5656i 0.00918549i
\(219\) −3843.25 + 2773.05i −1.18586 + 0.855641i
\(220\) 2792.83i 0.855877i
\(221\) −6131.76 −1.86637
\(222\) −700.267 + 505.269i −0.211706 + 0.152754i
\(223\) 4107.19 1.23335 0.616677 0.787217i \(-0.288479\pi\)
0.616677 + 0.787217i \(0.288479\pi\)
\(224\) −1070.10 −0.319191
\(225\) 275.527 829.414i 0.0816376 0.245752i
\(226\) −1518.49 −0.446940
\(227\) −1090.69 −0.318907 −0.159454 0.987205i \(-0.550973\pi\)
−0.159454 + 0.987205i \(0.550973\pi\)
\(228\) −953.367 1321.30i −0.276922 0.383794i
\(229\) 4974.89i 1.43559i −0.696254 0.717795i \(-0.745151\pi\)
0.696254 0.717795i \(-0.254849\pi\)
\(230\) 4111.32i 1.17866i
\(231\) 5658.87 + 7842.78i 1.61180 + 2.23384i
\(232\) 608.586i 0.172222i
\(233\) −434.162 −0.122072 −0.0610362 0.998136i \(-0.519441\pi\)
−0.0610362 + 0.998136i \(0.519441\pi\)
\(234\) 2740.99 + 910.541i 0.765744 + 0.254376i
\(235\) 6240.81i 1.73236i
\(236\) 1812.27 41.7457i 0.499867 0.0115145i
\(237\) −2052.04 2843.98i −0.562423 0.779477i
\(238\) 7667.33i 2.08823i
\(239\) 2563.30i 0.693748i −0.937912 0.346874i \(-0.887243\pi\)
0.937912 0.346874i \(-0.112757\pi\)
\(240\) 845.770 610.256i 0.227476 0.164133i
\(241\) −3436.16 −0.918434 −0.459217 0.888324i \(-0.651870\pi\)
−0.459217 + 0.888324i \(0.651870\pi\)
\(242\) 3533.54 0.938615
\(243\) −62.1768 + 3787.48i −0.0164142 + 0.999865i
\(244\) 131.965i 0.0346236i
\(245\) 9725.54i 2.53609i
\(246\) 597.531 431.141i 0.154867 0.111742i
\(247\) 4192.88i 1.08011i
\(248\) 1287.31i 0.329614i
\(249\) −1470.31 2037.74i −0.374205 0.518621i
\(250\) 2324.04i 0.587941i
\(251\) 4517.63i 1.13606i 0.823009 + 0.568029i \(0.192294\pi\)
−0.823009 + 0.568029i \(0.807706\pi\)
\(252\) 1138.57 3427.41i 0.284615 0.856773i
\(253\) 9120.43 2.26639
\(254\) −3269.21 −0.807594
\(255\) −4372.53 6060.01i −1.07380 1.48821i
\(256\) 256.000 0.0625000
\(257\) 6867.44i 1.66685i −0.552636 0.833423i \(-0.686378\pi\)
0.552636 0.833423i \(-0.313622\pi\)
\(258\) 2174.14 1568.73i 0.524636 0.378545i
\(259\) 2778.66i 0.666631i
\(260\) 2683.89 0.640184
\(261\) −1949.24 647.526i −0.462279 0.153567i
\(262\) −2682.07 −0.632438
\(263\) 2.40574i 0.000564048i 1.00000 0.000282024i \(8.97710e-5\pi\)
−1.00000 0.000282024i \(0.999910\pi\)
\(264\) −1353.77 1876.23i −0.315602 0.437402i
\(265\) 6277.50 1.45518
\(266\) −5242.91 −1.20851
\(267\) −213.694 296.165i −0.0489808 0.0678838i
\(268\) 4210.88i 0.959778i
\(269\) −827.485 −0.187556 −0.0937781 0.995593i \(-0.529894\pi\)
−0.0937781 + 0.995593i \(0.529894\pi\)
\(270\) 1054.70 + 3358.22i 0.237730 + 0.756943i
\(271\) 2974.52 0.666750 0.333375 0.942794i \(-0.391812\pi\)
0.333375 + 0.942794i \(0.391812\pi\)
\(272\) 1834.26i 0.408891i
\(273\) 7536.84 5438.12i 1.67088 1.20560i
\(274\) 5154.04i 1.13638i
\(275\) −1801.62 −0.395061
\(276\) −1992.88 2761.99i −0.434629 0.602364i
\(277\) −5038.87 −1.09298 −0.546491 0.837465i \(-0.684037\pi\)
−0.546491 + 0.837465i \(0.684037\pi\)
\(278\) −560.690 −0.120964
\(279\) 4123.13 + 1369.68i 0.884749 + 0.293909i
\(280\) 3356.01i 0.716287i
\(281\) 2614.62i 0.555073i 0.960715 + 0.277536i \(0.0895179\pi\)
−0.960715 + 0.277536i \(0.910482\pi\)
\(282\) 3025.11 + 4192.59i 0.638804 + 0.885336i
\(283\) 8910.03i 1.87154i 0.352610 + 0.935770i \(0.385294\pi\)
−0.352610 + 0.935770i \(0.614706\pi\)
\(284\) 1883.01i 0.393437i
\(285\) 4143.82 2989.93i 0.861259 0.621432i
\(286\) 5953.86i 1.23098i
\(287\) 2371.00i 0.487651i
\(288\) −272.380 + 819.942i −0.0557297 + 0.167762i
\(289\) −8229.63 −1.67507
\(290\) −1908.63 −0.386478
\(291\) −2314.07 + 1669.69i −0.466162 + 0.336354i
\(292\) 3648.26i 0.731159i
\(293\) 1455.27i 0.290162i 0.989420 + 0.145081i \(0.0463443\pi\)
−0.989420 + 0.145081i \(0.953656\pi\)
\(294\) −4714.27 6533.63i −0.935176 1.29609i
\(295\) 130.922 + 5683.60i 0.0258392 + 1.12174i
\(296\) 664.740i 0.130531i
\(297\) 7449.78 2339.72i 1.45549 0.457118i
\(298\) −4856.58 −0.944075
\(299\) 8764.65i 1.69523i
\(300\) 393.667 + 545.595i 0.0757613 + 0.105000i
\(301\) 8626.99i 1.65200i
\(302\) 955.056i 0.181978i
\(303\) −3898.71 5403.33i −0.739192 1.02447i
\(304\) 1254.26 0.236635
\(305\) −413.864 −0.0776977
\(306\) 5874.95 + 1951.63i 1.09754 + 0.364598i
\(307\) 4945.35 0.919369 0.459684 0.888082i \(-0.347963\pi\)
0.459684 + 0.888082i \(0.347963\pi\)
\(308\) −7444.89 −1.37731
\(309\) −5102.64 + 3681.75i −0.939414 + 0.677824i
\(310\) 4037.23 0.739676
\(311\) 6782.57i 1.23667i 0.785915 + 0.618335i \(0.212192\pi\)
−0.785915 + 0.618335i \(0.787808\pi\)
\(312\) −1803.04 + 1300.96i −0.327170 + 0.236066i
\(313\) 10189.2i 1.84002i 0.391891 + 0.920012i \(0.371821\pi\)
−0.391891 + 0.920012i \(0.628179\pi\)
\(314\) 2386.06i 0.428832i
\(315\) 10749.0 + 3570.75i 1.92265 + 0.638695i
\(316\) 2699.69 0.480600
\(317\) 7339.51i 1.30040i −0.759762 0.650202i \(-0.774684\pi\)
0.759762 0.650202i \(-0.225316\pi\)
\(318\) −4217.24 + 3042.90i −0.743683 + 0.536596i
\(319\) 4234.06i 0.743140i
\(320\) 802.861i 0.140254i
\(321\) 2604.50 1879.25i 0.452863 0.326758i
\(322\) −10959.6 −1.89675
\(323\) 8986.90i 1.54813i
\(324\) −2336.38 1744.81i −0.400614 0.299179i
\(325\) 1731.34i 0.295500i
\(326\) −650.707 −0.110550
\(327\) −62.2915 + 44.9457i −0.0105343 + 0.00760093i
\(328\) 567.216i 0.0954855i
\(329\) 16636.2 2.78779
\(330\) 5884.20 4245.67i 0.981558 0.708232i
\(331\) −1887.25 −0.313391 −0.156696 0.987647i \(-0.550084\pi\)
−0.156696 + 0.987647i \(0.550084\pi\)
\(332\) 1934.36 0.319764
\(333\) 2129.09 + 707.273i 0.350371 + 0.116391i
\(334\) 532.365i 0.0872147i
\(335\) −13206.1 −2.15380
\(336\) 1626.76 + 2254.58i 0.264129 + 0.366063i
\(337\) 2949.58i 0.476778i −0.971170 0.238389i \(-0.923381\pi\)
0.971170 0.238389i \(-0.0766193\pi\)
\(338\) −1327.61 −0.213646
\(339\) 2308.41 + 3199.29i 0.369840 + 0.512571i
\(340\) 5752.57 0.917578
\(341\) 8956.08i 1.42228i
\(342\) −1334.52 + 4017.28i −0.211001 + 0.635174i
\(343\) −14455.3 −2.27556
\(344\) 2063.84i 0.323473i
\(345\) 8662.10 6250.04i 1.35174 0.975335i
\(346\) −572.637 −0.0889744
\(347\) 4174.20 0.645771 0.322886 0.946438i \(-0.395347\pi\)
0.322886 + 0.946438i \(0.395347\pi\)
\(348\) 1282.22 925.173i 0.197513 0.142513i
\(349\) 5532.72i 0.848595i −0.905523 0.424297i \(-0.860521\pi\)
0.905523 0.424297i \(-0.139479\pi\)
\(350\) 2164.92 0.330628
\(351\) −2248.45 7159.17i −0.341918 1.08868i
\(352\) 1781.04 0.269687
\(353\) −1343.96 −0.202640 −0.101320 0.994854i \(-0.532307\pi\)
−0.101320 + 0.994854i \(0.532307\pi\)
\(354\) −2842.97 3754.79i −0.426842 0.563743i
\(355\) 5905.45 0.882897
\(356\) 281.139 0.0418549
\(357\) 16154.2 11655.9i 2.39488 1.72800i
\(358\) 5656.54 0.835077
\(359\) 1042.10i 0.153204i −0.997062 0.0766019i \(-0.975593\pi\)
0.997062 0.0766019i \(-0.0244071\pi\)
\(360\) −2571.48 854.232i −0.376470 0.125061i
\(361\) −713.780 −0.104065
\(362\) 1493.89 0.216898
\(363\) −5371.70 7444.79i −0.776698 1.07645i
\(364\) 7154.47i 1.03021i
\(365\) 11441.6 1.64077
\(366\) 278.035 200.613i 0.0397079 0.0286508i
\(367\) 3839.73i 0.546137i 0.961995 + 0.273069i \(0.0880386\pi\)
−0.961995 + 0.273069i \(0.911961\pi\)
\(368\) 2621.87 0.371397
\(369\) −1816.73 603.509i −0.256302 0.0851421i
\(370\) 2084.74 0.292920
\(371\) 16734.0i 2.34174i
\(372\) −2712.22 + 1956.97i −0.378016 + 0.272753i
\(373\) −4156.50 −0.576985 −0.288492 0.957482i \(-0.593154\pi\)
−0.288492 + 0.957482i \(0.593154\pi\)
\(374\) 12761.3i 1.76436i
\(375\) 4896.50 3533.01i 0.674278 0.486517i
\(376\) −3979.88 −0.545869
\(377\) 4068.89 0.555858
\(378\) −8952.04 + 2811.52i −1.21810 + 0.382564i
\(379\) 4195.10 0.568570 0.284285 0.958740i \(-0.408244\pi\)
0.284285 + 0.958740i \(0.408244\pi\)
\(380\) 3933.59i 0.531024i
\(381\) 4969.87 + 6887.87i 0.668278 + 0.926185i
\(382\) −1538.88 −0.206115
\(383\) 7774.39i 1.03721i −0.855013 0.518607i \(-0.826451\pi\)
0.855013 0.518607i \(-0.173549\pi\)
\(384\) −389.172 539.364i −0.0517183 0.0716779i
\(385\) 23348.5i 3.09078i
\(386\) 8499.03 1.12070
\(387\) −6610.27 2195.89i −0.868266 0.288433i
\(388\) 2196.67i 0.287420i
\(389\) 4113.36i 0.536133i −0.963400 0.268066i \(-0.913615\pi\)
0.963400 0.268066i \(-0.0863846\pi\)
\(390\) −4080.05 5654.66i −0.529748 0.734192i
\(391\) 18785.9i 2.42978i
\(392\) 6202.16 0.799124
\(393\) 4077.29 + 5650.83i 0.523338 + 0.725309i
\(394\) 5859.76i 0.749265i
\(395\) 8466.71i 1.07850i
\(396\) −1895.00 + 5704.50i −0.240474 + 0.723894i
\(397\) 856.145i 0.108233i −0.998535 0.0541167i \(-0.982766\pi\)
0.998535 0.0541167i \(-0.0172343\pi\)
\(398\) 3546.01 0.446597
\(399\) 7970.28 + 11046.2i 1.00003 + 1.38597i
\(400\) −517.915 −0.0647393
\(401\) −7604.09 −0.946958 −0.473479 0.880805i \(-0.657002\pi\)
−0.473479 + 0.880805i \(0.657002\pi\)
\(402\) 8871.86 6401.39i 1.10072 0.794210i
\(403\) −8606.71 −1.06385
\(404\) 5129.20 0.631652
\(405\) 5472.04 7327.31i 0.671377 0.899005i
\(406\) 5087.86i 0.621937i
\(407\) 4624.73i 0.563242i
\(408\) −3864.59 + 2788.45i −0.468935 + 0.338355i
\(409\) 8859.06i 1.07103i 0.844525 + 0.535516i \(0.179883\pi\)
−0.844525 + 0.535516i \(0.820117\pi\)
\(410\) −1778.89 −0.214276
\(411\) −10859.0 + 7835.19i −1.30325 + 0.940344i
\(412\) 4843.77i 0.579212i
\(413\) −15150.8 + 349.000i −1.80514 + 0.0415815i
\(414\) −2789.63 + 8397.58i −0.331166 + 0.996904i
\(415\) 6066.49i 0.717572i
\(416\) 1711.57i 0.201722i
\(417\) 852.362 + 1181.31i 0.100097 + 0.138727i
\(418\) 8726.17 1.02108
\(419\) 5885.62 0.686232 0.343116 0.939293i \(-0.388518\pi\)
0.343116 + 0.939293i \(0.388518\pi\)
\(420\) −7070.75 + 5101.82i −0.821470 + 0.592722i
\(421\) 9980.94i 1.15544i 0.816234 + 0.577721i \(0.196058\pi\)
−0.816234 + 0.577721i \(0.803942\pi\)
\(422\) 1592.38i 0.183687i
\(423\) 4234.53 12747.2i 0.486738 1.46522i
\(424\) 4003.28i 0.458530i
\(425\) 3710.90i 0.423541i
\(426\) −3967.29 + 2862.55i −0.451211 + 0.325566i
\(427\) 1103.24i 0.125034i
\(428\) 2472.36i 0.279220i
\(429\) −12544.1 + 9051.07i −1.41174 + 1.01862i
\(430\) −6472.56 −0.725895
\(431\) −9150.70 −1.02268 −0.511339 0.859379i \(-0.670850\pi\)
−0.511339 + 0.859379i \(0.670850\pi\)
\(432\) 2141.60 672.603i 0.238513 0.0749088i
\(433\) −7782.99 −0.863803 −0.431902 0.901921i \(-0.642157\pi\)
−0.431902 + 0.901921i \(0.642157\pi\)
\(434\) 10762.1i 1.19032i
\(435\) 2901.51 + 4021.28i 0.319808 + 0.443231i
\(436\) 59.1312i 0.00649512i
\(437\) 12845.7 1.40617
\(438\) −7686.49 + 5546.10i −0.838527 + 0.605030i
\(439\) −6307.27 −0.685717 −0.342858 0.939387i \(-0.611395\pi\)
−0.342858 + 0.939387i \(0.611395\pi\)
\(440\) 5585.67i 0.605196i
\(441\) −6599.01 + 19864.9i −0.712559 + 2.14501i
\(442\) −12263.5 −1.31972
\(443\) 2388.29 0.256142 0.128071 0.991765i \(-0.459121\pi\)
0.128071 + 0.991765i \(0.459121\pi\)
\(444\) −1400.53 + 1010.54i −0.149699 + 0.108014i
\(445\) 881.702i 0.0939251i
\(446\) 8214.38 0.872112
\(447\) 7382.99 + 10232.3i 0.781216 + 1.08271i
\(448\) −2140.19 −0.225702
\(449\) 804.443i 0.0845523i 0.999106 + 0.0422762i \(0.0134609\pi\)
−0.999106 + 0.0422762i \(0.986539\pi\)
\(450\) 551.053 1658.83i 0.0577265 0.173773i
\(451\) 3946.24i 0.412020i
\(452\) −3036.98 −0.316034
\(453\) 2012.20 1451.88i 0.208700 0.150585i
\(454\) −2181.39 −0.225501
\(455\) −22437.7 −2.31186
\(456\) −1906.73 2642.59i −0.195814 0.271383i
\(457\) 7628.94i 0.780890i 0.920626 + 0.390445i \(0.127679\pi\)
−0.920626 + 0.390445i \(0.872321\pi\)
\(458\) 9949.79i 1.01512i
\(459\) −4819.25 15344.7i −0.490073 1.56042i
\(460\) 8222.64i 0.833440i
\(461\) 1278.14i 0.129130i 0.997913 + 0.0645651i \(0.0205660\pi\)
−0.997913 + 0.0645651i \(0.979434\pi\)
\(462\) 11317.7 + 15685.6i 1.13972 + 1.57956i
\(463\) 7402.48i 0.743029i 0.928427 + 0.371514i \(0.121161\pi\)
−0.928427 + 0.371514i \(0.878839\pi\)
\(464\) 1217.17i 0.121780i
\(465\) −6137.41 8506.01i −0.612077 0.848294i
\(466\) −868.323 −0.0863182
\(467\) −12702.0 −1.25862 −0.629312 0.777153i \(-0.716663\pi\)
−0.629312 + 0.777153i \(0.716663\pi\)
\(468\) 5481.98 + 1821.08i 0.541463 + 0.179871i
\(469\) 35203.5i 3.46599i
\(470\) 12481.6i 1.22497i
\(471\) 5027.17 3627.29i 0.491804 0.354855i
\(472\) 3624.54 83.4915i 0.353460 0.00814197i
\(473\) 14358.6i 1.39579i
\(474\) −4104.08 5687.95i −0.397693 0.551174i
\(475\) −2537.50 −0.245113
\(476\) 15334.7i 1.47660i
\(477\) 12822.1 + 4259.44i 1.23078 + 0.408860i
\(478\) 5126.59i 0.490554i
\(479\) 2126.89i 0.202881i 0.994842 + 0.101441i \(0.0323452\pi\)
−0.994842 + 0.101441i \(0.967655\pi\)
\(480\) 1691.54 1220.51i 0.160850 0.116059i
\(481\) −4444.32 −0.421297
\(482\) −6872.32 −0.649431
\(483\) 16660.8 + 23090.6i 1.56955 + 2.17528i
\(484\) 7067.09 0.663701
\(485\) 6889.14 0.644989
\(486\) −124.354 + 7574.97i −0.0116066 + 0.707012i
\(487\) −15234.4 −1.41753 −0.708764 0.705446i \(-0.750747\pi\)
−0.708764 + 0.705446i \(0.750747\pi\)
\(488\) 263.929i 0.0244826i
\(489\) 989.206 + 1370.97i 0.0914794 + 0.126784i
\(490\) 19451.1i 1.79329i
\(491\) 1651.33i 0.151779i −0.997116 0.0758895i \(-0.975820\pi\)
0.997116 0.0758895i \(-0.0241796\pi\)
\(492\) 1195.06 862.283i 0.109507 0.0790136i
\(493\) 8721.13 0.796714
\(494\) 8385.77i 0.763752i
\(495\) −17890.3 5943.07i −1.62447 0.539639i
\(496\) 2574.62i 0.233072i
\(497\) 15742.2i 1.42079i
\(498\) −2940.62 4075.48i −0.264603 0.366720i
\(499\) 4317.55 0.387335 0.193667 0.981067i \(-0.437962\pi\)
0.193667 + 0.981067i \(0.437962\pi\)
\(500\) 4648.08i 0.415737i
\(501\) 1121.63 809.303i 0.100022 0.0721696i
\(502\) 9035.27i 0.803314i
\(503\) −8677.03 −0.769164 −0.384582 0.923091i \(-0.625654\pi\)
−0.384582 + 0.923091i \(0.625654\pi\)
\(504\) 2277.14 6854.83i 0.201253 0.605830i
\(505\) 16086.1i 1.41747i
\(506\) 18240.9 1.60258
\(507\) 2018.23 + 2797.12i 0.176791 + 0.245019i
\(508\) −6538.43 −0.571055
\(509\) −12695.8 −1.10557 −0.552783 0.833325i \(-0.686434\pi\)
−0.552783 + 0.833325i \(0.686434\pi\)
\(510\) −8745.06 12120.0i −0.759290 1.05232i
\(511\) 30500.0i 2.64039i
\(512\) 512.000 0.0441942
\(513\) 10492.7 3295.39i 0.903049 0.283616i
\(514\) 13734.9i 1.17864i
\(515\) 15190.9 1.29979
\(516\) 4348.28 3137.45i 0.370974 0.267672i
\(517\) −27688.8 −2.35542
\(518\) 5557.31i 0.471379i
\(519\) 870.524 + 1206.48i 0.0736258 + 0.102040i
\(520\) 5367.78 0.452678
\(521\) 12284.8i 1.03303i −0.856279 0.516513i \(-0.827230\pi\)
0.856279 0.516513i \(-0.172770\pi\)
\(522\) −3898.48 1295.05i −0.326881 0.108588i
\(523\) 17854.6 1.49279 0.746395 0.665503i \(-0.231783\pi\)
0.746395 + 0.665503i \(0.231783\pi\)
\(524\) −5364.14 −0.447201
\(525\) −3291.11 4561.24i −0.273592 0.379179i
\(526\) 4.81149i 0.000398842i
\(527\) −18447.4 −1.52482
\(528\) −2707.55 3752.46i −0.223165 0.309290i
\(529\) 14685.3 1.20698
\(530\) 12555.0 1.02897
\(531\) −3589.04 + 11697.9i −0.293317 + 0.956015i
\(532\) −10485.8 −0.854544
\(533\) 3792.30 0.308185
\(534\) −427.388 592.329i −0.0346347 0.0480011i
\(535\) −7753.77 −0.626588
\(536\) 8421.76i 0.678666i
\(537\) −8599.09 11917.7i −0.691021 0.957704i
\(538\) −1654.97 −0.132622
\(539\) 43149.7 3.44822
\(540\) 2109.40 + 6716.44i 0.168100 + 0.535240i
\(541\) 6201.21i 0.492811i 0.969167 + 0.246405i \(0.0792495\pi\)
−0.969167 + 0.246405i \(0.920751\pi\)
\(542\) 5949.04 0.471463
\(543\) −2271.02 3147.47i −0.179482 0.248749i
\(544\) 3668.52i 0.289130i
\(545\) 185.446 0.0145755
\(546\) 15073.7 10876.2i 1.18149 0.852491i
\(547\) 17428.0 1.36228 0.681142 0.732151i \(-0.261484\pi\)
0.681142 + 0.732151i \(0.261484\pi\)
\(548\) 10308.1i 0.803540i
\(549\) −845.338 280.817i −0.0657161 0.0218305i
\(550\) −3603.24 −0.279350
\(551\) 5963.49i 0.461077i
\(552\) −3985.77 5523.99i −0.307329 0.425936i
\(553\) −22569.8 −1.73556
\(554\) −10077.7 −0.772856
\(555\) −3169.23 4392.32i −0.242390 0.335934i
\(556\) −1121.38 −0.0855344
\(557\) 5117.71i 0.389308i −0.980872 0.194654i \(-0.937642\pi\)
0.980872 0.194654i \(-0.0623584\pi\)
\(558\) 8246.25 + 2739.36i 0.625612 + 0.207825i
\(559\) 13798.4 1.04403
\(560\) 6712.03i 0.506491i
\(561\) −26886.7 + 19399.8i −2.02345 + 1.46000i
\(562\) 5229.25i 0.392496i
\(563\) −5851.37 −0.438021 −0.219010 0.975723i \(-0.570283\pi\)
−0.219010 + 0.975723i \(0.570283\pi\)
\(564\) 6050.22 + 8385.17i 0.451703 + 0.626027i
\(565\) 9524.50i 0.709201i
\(566\) 17820.1i 1.32338i
\(567\) 19532.5 + 14586.9i 1.44671 + 1.08041i
\(568\) 3766.02i 0.278202i
\(569\) 19207.5 1.41515 0.707576 0.706637i \(-0.249789\pi\)
0.707576 + 0.706637i \(0.249789\pi\)
\(570\) 8287.64 5979.85i 0.609002 0.439418i
\(571\) 449.899i 0.0329732i 0.999864 + 0.0164866i \(0.00524808\pi\)
−0.999864 + 0.0164866i \(0.994752\pi\)
\(572\) 11907.7i 0.870432i
\(573\) 2339.41 + 3242.25i 0.170559 + 0.236382i
\(574\) 4742.00i 0.344821i
\(575\) −5304.31 −0.384704
\(576\) −544.760 + 1639.88i −0.0394069 + 0.118626i
\(577\) −4649.13 −0.335435 −0.167717 0.985835i \(-0.553640\pi\)
−0.167717 + 0.985835i \(0.553640\pi\)
\(578\) −16459.3 −1.18445
\(579\) −12920.2 17906.5i −0.927370 1.28527i
\(580\) −3817.26 −0.273282
\(581\) −16171.5 −1.15475
\(582\) −4628.14 + 3339.38i −0.329626 + 0.237838i
\(583\) 27851.7i 1.97856i
\(584\) 7296.53i 0.517008i
\(585\) −5711.24 + 17192.4i −0.403642 + 1.21508i
\(586\) 2910.53i 0.205176i
\(587\) 13192.8 0.927641 0.463820 0.885929i \(-0.346478\pi\)
0.463820 + 0.885929i \(0.346478\pi\)
\(588\) −9428.54 13067.3i −0.661269 0.916471i
\(589\) 12614.3i 0.882448i
\(590\) 261.844 + 11367.2i 0.0182711 + 0.793186i
\(591\) 12345.9 8908.02i 0.859291 0.620012i
\(592\) 1329.48i 0.0922994i
\(593\) 9442.45i 0.653887i 0.945044 + 0.326944i \(0.106019\pi\)
−0.945044 + 0.326944i \(0.893981\pi\)
\(594\) 14899.6 4679.43i 1.02919 0.323231i
\(595\) −48092.2 −3.31360
\(596\) −9713.17 −0.667562
\(597\) −5390.66 7471.06i −0.369556 0.512178i
\(598\) 17529.3i 1.19871i
\(599\) 2266.84i 0.154625i −0.997007 0.0773127i \(-0.975366\pi\)
0.997007 0.0773127i \(-0.0246340\pi\)
\(600\) 787.335 + 1091.19i 0.0535714 + 0.0742460i
\(601\) 28113.0i 1.90807i 0.299689 + 0.954037i \(0.403117\pi\)
−0.299689 + 0.954037i \(0.596883\pi\)
\(602\) 17254.0i 1.16814i
\(603\) −26974.1 8960.63i −1.82167 0.605149i
\(604\) 1910.11i 0.128678i
\(605\) 22163.6i 1.48939i
\(606\) −7797.42 10806.7i −0.522688 0.724407i
\(607\) −22442.7 −1.50069 −0.750345 0.661046i \(-0.770113\pi\)
−0.750345 + 0.661046i \(0.770113\pi\)
\(608\) 2508.53 0.167326
\(609\) −10719.6 + 7734.58i −0.713265 + 0.514648i
\(610\) −827.728 −0.0549405
\(611\) 26608.7i 1.76182i
\(612\) 11749.9 + 3903.25i 0.776081 + 0.257810i
\(613\) 22313.5i 1.47020i 0.677958 + 0.735100i \(0.262865\pi\)
−0.677958 + 0.735100i \(0.737135\pi\)
\(614\) 9890.70 0.650092
\(615\) 2704.27 + 3747.92i 0.177312 + 0.245741i
\(616\) −14889.8 −0.973906
\(617\) 13469.4i 0.878861i −0.898277 0.439431i \(-0.855180\pi\)
0.898277 0.439431i \(-0.144820\pi\)
\(618\) −10205.3 + 7363.50i −0.664266 + 0.479294i
\(619\) 2388.74 0.155108 0.0775538 0.996988i \(-0.475289\pi\)
0.0775538 + 0.996988i \(0.475289\pi\)
\(620\) 8074.47 0.523030
\(621\) 21933.6 6888.57i 1.41733 0.445135i
\(622\) 13565.1i 0.874457i
\(623\) −2350.36 −0.151148
\(624\) −3606.08 + 2601.93i −0.231344 + 0.166924i
\(625\) −18623.4 −1.19190
\(626\) 20378.4i 1.30109i
\(627\) −13265.5 18385.1i −0.844935 1.17102i
\(628\) 4772.12i 0.303230i
\(629\) −9525.83 −0.603847
\(630\) 21498.0 + 7141.50i 1.35952 + 0.451626i
\(631\) −17418.9 −1.09895 −0.549474 0.835511i \(-0.685172\pi\)
−0.549474 + 0.835511i \(0.685172\pi\)
\(632\) 5399.38 0.339835
\(633\) −3354.96 + 2420.74i −0.210660 + 0.151999i
\(634\) 14679.0i 0.919524i
\(635\) 20505.7i 1.28148i
\(636\) −8434.48 + 6085.80i −0.525863 + 0.379430i
\(637\) 41466.5i 2.57922i
\(638\) 8468.11i 0.525479i
\(639\) 12062.2 + 4006.99i 0.746748 + 0.248066i
\(640\) 1605.72i 0.0991746i
\(641\) 21873.3i 1.34780i −0.738821 0.673902i \(-0.764617\pi\)
0.738821 0.673902i \(-0.235383\pi\)
\(642\) 5209.00 3758.49i 0.320222 0.231053i
\(643\) 19302.9 1.18388 0.591939 0.805983i \(-0.298363\pi\)
0.591939 + 0.805983i \(0.298363\pi\)
\(644\) −21919.2 −1.34121
\(645\) 9839.61 + 13637.0i 0.600673 + 0.832489i
\(646\) 17973.8i 1.09469i
\(647\) 5086.48i 0.309073i −0.987987 0.154537i \(-0.950612\pi\)
0.987987 0.154537i \(-0.0493884\pi\)
\(648\) −4672.77 3489.63i −0.283277 0.211552i
\(649\) 25216.7 580.867i 1.52518 0.0351326i
\(650\) 3462.68i 0.208950i
\(651\) 22674.5 16360.6i 1.36511 0.984978i
\(652\) −1301.41 −0.0781707
\(653\) 8037.99i 0.481701i 0.970562 + 0.240851i \(0.0774264\pi\)
−0.970562 + 0.240851i \(0.922574\pi\)
\(654\) −124.583 + 89.8914i −0.00744890 + 0.00537467i
\(655\) 16822.9i 1.00355i
\(656\) 1134.43i 0.0675185i
\(657\) 23370.0 + 7763.40i 1.38775 + 0.461003i
\(658\) 33272.3 1.97126
\(659\) 10316.1 0.609798 0.304899 0.952385i \(-0.401377\pi\)
0.304899 + 0.952385i \(0.401377\pi\)
\(660\) 11768.4 8491.35i 0.694067 0.500796i
\(661\) 18597.1 1.09432 0.547160 0.837028i \(-0.315709\pi\)
0.547160 + 0.837028i \(0.315709\pi\)
\(662\) −3774.50 −0.221601
\(663\) 18643.0 + 25837.9i 1.09206 + 1.51351i
\(664\) 3868.72 0.226107
\(665\) 32885.4i 1.91765i
\(666\) 4258.19 + 1414.55i 0.247750 + 0.0823011i
\(667\) 12465.9i 0.723659i
\(668\) 1064.73i 0.0616701i
\(669\) −12487.5 17306.8i −0.721667 1.00018i
\(670\) −26412.1 −1.52297
\(671\) 1836.21i 0.105642i
\(672\) 3253.53 + 4509.16i 0.186767 + 0.258846i
\(673\) 8336.73i 0.477500i −0.971081 0.238750i \(-0.923262\pi\)
0.971081 0.238750i \(-0.0767376\pi\)
\(674\) 5899.17i 0.337133i
\(675\) −4332.68 + 1360.74i −0.247059 + 0.0775927i
\(676\) −2655.22 −0.151071
\(677\) 324.448i 0.0184188i 0.999958 + 0.00920942i \(0.00293149\pi\)
−0.999958 + 0.00920942i \(0.997069\pi\)
\(678\) 4616.82 + 6398.58i 0.261516 + 0.362442i
\(679\) 18364.4i 1.03794i
\(680\) 11505.1 0.648826
\(681\) 3316.15 + 4595.95i 0.186601 + 0.258615i
\(682\) 17912.2i 1.00571i
\(683\) 21486.8 1.20376 0.601882 0.798585i \(-0.294418\pi\)
0.601882 + 0.798585i \(0.294418\pi\)
\(684\) −2669.04 + 8034.56i −0.149200 + 0.449136i
\(685\) 32328.0 1.80320
\(686\) −28910.7 −1.60906
\(687\) −20963.1 + 15125.7i −1.16418 + 0.840002i
\(688\) 4127.68i 0.228730i
\(689\) −26765.2 −1.47993
\(690\) 17324.2 12500.1i 0.955827 0.689666i
\(691\) 23522.7i 1.29500i 0.762064 + 0.647501i \(0.224186\pi\)
−0.762064 + 0.647501i \(0.775814\pi\)
\(692\) −1145.27 −0.0629144
\(693\) 15842.5 47690.4i 0.868408 2.61416i
\(694\) 8348.39 0.456629
\(695\) 3516.85i 0.191945i
\(696\) 2564.45 1850.35i 0.139662 0.100772i
\(697\) 8128.29 0.441723
\(698\) 11065.4i 0.600047i
\(699\) 1320.03 + 1829.46i 0.0714278 + 0.0989937i
\(700\) 4329.84 0.233789
\(701\) 4275.19 0.230345 0.115172 0.993346i \(-0.463258\pi\)
0.115172 + 0.993346i \(0.463258\pi\)
\(702\) −4496.89 14318.3i −0.241773 0.769816i
\(703\) 6513.74i 0.349460i
\(704\) 3562.09 0.190698
\(705\) −26297.4 + 18974.6i −1.40485 + 1.01365i
\(706\) −2687.92 −0.143288
\(707\) −42880.8 −2.28105
\(708\) −5685.94 7509.58i −0.301823 0.398626i
\(709\) −3259.59 −0.172661 −0.0863305 0.996267i \(-0.527514\pi\)
−0.0863305 + 0.996267i \(0.527514\pi\)
\(710\) 11810.9 0.624303
\(711\) −5744.86 + 17293.7i −0.303023 + 0.912185i
\(712\) 562.278 0.0295959
\(713\) 26368.4i 1.38500i
\(714\) 32308.5 23311.8i 1.69344 1.22188i
\(715\) 37344.7 1.95331
\(716\) 11313.1 0.590489
\(717\) −10801.2 + 7793.45i −0.562590 + 0.405930i
\(718\) 2084.21i 0.108332i
\(719\) −14322.0 −0.742865 −0.371433 0.928460i \(-0.621133\pi\)
−0.371433 + 0.928460i \(0.621133\pi\)
\(720\) −5142.97 1708.46i −0.266204 0.0884316i
\(721\) 40494.5i 2.09167i
\(722\) −1427.56 −0.0735848
\(723\) 10447.3 + 14479.2i 0.537400 + 0.744797i
\(724\) 2987.78 0.153370
\(725\) 2462.46i 0.126143i
\(726\) −10743.4 14889.6i −0.549208 0.761163i
\(727\) 27243.3 1.38982 0.694909 0.719098i \(-0.255445\pi\)
0.694909 + 0.719098i \(0.255445\pi\)
\(728\) 14308.9i 0.728468i
\(729\) 16148.7 11253.5i 0.820437 0.571736i
\(730\) 22883.2 1.16020
\(731\) 29575.1 1.49641
\(732\) 556.070 401.226i 0.0280778 0.0202592i
\(733\) 20545.8 1.03530 0.517652 0.855591i \(-0.326806\pi\)
0.517652 + 0.855591i \(0.326806\pi\)
\(734\) 7679.47i 0.386178i
\(735\) 40981.3 29569.6i 2.05662 1.48393i
\(736\) 5243.73 0.262618
\(737\) 58591.9i 2.92844i
\(738\) −3633.47 1207.02i −0.181233 0.0602046i
\(739\) 3615.91i 0.179991i −0.995942 0.0899956i \(-0.971315\pi\)
0.995942 0.0899956i \(-0.0286853\pi\)
\(740\) 4169.48 0.207126
\(741\) −17667.9 + 12748.1i −0.875906 + 0.632000i
\(742\) 33468.0i 1.65586i
\(743\) 36180.7i 1.78646i 0.449600 + 0.893230i \(0.351566\pi\)
−0.449600 + 0.893230i \(0.648434\pi\)
\(744\) −5424.44 + 3913.94i −0.267298 + 0.192866i
\(745\) 30462.2i 1.49805i
\(746\) −8313.00 −0.407990
\(747\) −4116.26 + 12391.1i −0.201614 + 0.606917i
\(748\) 25522.7i 1.24759i
\(749\) 20669.3i 1.00833i
\(750\) 9793.00 7066.02i 0.476786 0.344020i
\(751\) 13254.4i 0.644019i 0.946736 + 0.322009i \(0.104358\pi\)
−0.946736 + 0.322009i \(0.895642\pi\)
\(752\) −7959.76 −0.385988
\(753\) 19036.3 13735.4i 0.921277 0.664737i
\(754\) 8137.78 0.393051
\(755\) −5990.45 −0.288761
\(756\) −17904.1 + 5623.05i −0.861329 + 0.270514i
\(757\) −19347.1 −0.928904 −0.464452 0.885598i \(-0.653749\pi\)
−0.464452 + 0.885598i \(0.653749\pi\)
\(758\) 8390.20 0.402039
\(759\) −27729.8 38431.5i −1.32612 1.83791i
\(760\) 7867.18i 0.375490i
\(761\) 24236.4i 1.15449i 0.816570 + 0.577247i \(0.195873\pi\)
−0.816570 + 0.577247i \(0.804127\pi\)
\(762\) 9939.73 + 13775.7i 0.472544 + 0.654912i
\(763\) 494.345i 0.0234554i
\(764\) −3077.76 −0.145745
\(765\) −12241.3 + 36849.8i −0.578542 + 1.74158i
\(766\) 15548.8i 0.733421i
\(767\) −558.208 24233.0i −0.0262787 1.14081i
\(768\) −778.344 1078.73i −0.0365704 0.0506839i
\(769\) 23437.6i 1.09907i 0.835472 + 0.549533i \(0.185195\pi\)
−0.835472 + 0.549533i \(0.814805\pi\)
\(770\) 46697.0i 2.18551i
\(771\) −28937.9 + 20879.8i −1.35172 + 0.975315i
\(772\) 16998.1 0.792453
\(773\) 2034.21 0.0946514 0.0473257 0.998880i \(-0.484930\pi\)
0.0473257 + 0.998880i \(0.484930\pi\)
\(774\) −13220.5 4391.79i −0.613957 0.203953i
\(775\) 5208.73i 0.241423i
\(776\) 4393.33i 0.203236i
\(777\) 11708.6 8448.24i 0.540599 0.390063i
\(778\) 8226.72i 0.379103i
\(779\) 5558.11i 0.255635i
\(780\) −8160.11 11309.3i −0.374588 0.519152i
\(781\) 26200.9i 1.20044i
\(782\) 37571.8i 1.71811i
\(783\) 3197.94 + 10182.4i 0.145958 + 0.464737i
\(784\) 12404.3 0.565066
\(785\) −14966.2 −0.680468
\(786\) 8154.58 + 11301.7i 0.370056 + 0.512871i
\(787\) −23012.9 −1.04234 −0.521170 0.853453i \(-0.674504\pi\)
−0.521170 + 0.853453i \(0.674504\pi\)
\(788\) 11719.5i 0.529810i
\(789\) 10.1373 7.31443i 0.000457410 0.000330039i
\(790\) 16933.4i 0.762613i
\(791\) 25389.6 1.14128
\(792\) −3790.01 + 11409.0i −0.170041 + 0.511871i
\(793\) 1764.58 0.0790190
\(794\) 1712.29i 0.0765326i
\(795\) −19086.1 26452.0i −0.851467 1.18007i
\(796\) 7092.03 0.315792
\(797\) 8204.42 0.364637 0.182318 0.983240i \(-0.441640\pi\)
0.182318 + 0.983240i \(0.441640\pi\)
\(798\) 15940.6 + 22092.5i 0.707130 + 0.980030i
\(799\) 57032.3i 2.52523i
\(800\) −1035.83 −0.0457776
\(801\) −598.256 + 1800.92i −0.0263899 + 0.0794412i
\(802\) −15208.2 −0.669600
\(803\) 50763.4i 2.23089i
\(804\) 17743.7 12802.8i 0.778325 0.561591i
\(805\) 68742.4i 3.00975i
\(806\) −17213.4 −0.752254
\(807\) 2515.89 + 3486.84i 0.109744 + 0.152097i
\(808\) 10258.4 0.446645
\(809\) −17732.7 −0.770640 −0.385320 0.922783i \(-0.625909\pi\)
−0.385320 + 0.922783i \(0.625909\pi\)
\(810\) 10944.1 14654.6i 0.474736 0.635692i
\(811\) 13848.3i 0.599604i −0.954001 0.299802i \(-0.903079\pi\)
0.954001 0.299802i \(-0.0969206\pi\)
\(812\) 10175.7i 0.439776i
\(813\) −9043.74 12534.0i −0.390133 0.540696i
\(814\) 9249.46i 0.398272i
\(815\) 4081.46i 0.175420i
\(816\) −7729.17 + 5576.89i −0.331587 + 0.239253i
\(817\) 20223.4i 0.866007i
\(818\) 17718.1i 0.757335i
\(819\) −45830.1 15224.5i −1.95535 0.649557i
\(820\) −3557.78 −0.151516
\(821\) 16741.1 0.711653 0.355827 0.934552i \(-0.384199\pi\)
0.355827 + 0.934552i \(0.384199\pi\)
\(822\) −21718.0 + 15670.4i −0.921536 + 0.664924i
\(823\) 25986.4i 1.10064i 0.834953 + 0.550322i \(0.185495\pi\)
−0.834953 + 0.550322i \(0.814505\pi\)
\(824\) 9687.53i 0.409564i
\(825\) 5477.65 + 7591.62i 0.231160 + 0.320371i
\(826\) −30301.6 + 698.000i −1.27643 + 0.0294026i
\(827\) 36797.3i 1.54724i 0.633649 + 0.773620i \(0.281556\pi\)
−0.633649 + 0.773620i \(0.718444\pi\)
\(828\) −5579.26 + 16795.2i −0.234170 + 0.704918i
\(829\) −4459.84 −0.186848 −0.0934238 0.995626i \(-0.529781\pi\)
−0.0934238 + 0.995626i \(0.529781\pi\)
\(830\) 12133.0i 0.507400i
\(831\) 15320.2 + 21232.7i 0.639533 + 0.886346i
\(832\) 3423.14i 0.142639i
\(833\) 88878.0i 3.69681i
\(834\) 1704.72 + 2362.62i 0.0707791 + 0.0980947i
\(835\) −3339.18 −0.138392
\(836\) 17452.3 0.722011
\(837\) −6764.44 21538.3i −0.279347 0.889454i
\(838\) 11771.2 0.485240
\(839\) −236.762 −0.00974249 −0.00487124 0.999988i \(-0.501551\pi\)
−0.00487124 + 0.999988i \(0.501551\pi\)
\(840\) −14141.5 + 10203.6i −0.580867 + 0.419118i
\(841\) 18601.9 0.762715
\(842\) 19961.9i 0.817021i
\(843\) 11017.5 7949.52i 0.450132 0.324788i
\(844\) 3184.76i 0.129886i
\(845\) 8327.23i 0.339012i
\(846\) 8469.07 25494.3i 0.344176 1.03607i
\(847\) −59081.8 −2.39678
\(848\) 8006.57i 0.324230i
\(849\) 37544.9 27090.1i 1.51771 1.09509i
\(850\) 7421.80i 0.299489i
\(851\) 13616.1i 0.548476i
\(852\) −7934.58 + 5725.11i −0.319054 + 0.230210i
\(853\) 23034.2 0.924590 0.462295 0.886726i \(-0.347026\pi\)
0.462295 + 0.886726i \(0.347026\pi\)
\(854\) 2206.48i 0.0884125i
\(855\) −25197.8 8370.57i −1.00789 0.334816i
\(856\) 4944.73i 0.197438i
\(857\) 31941.4 1.27316 0.636579 0.771211i \(-0.280349\pi\)
0.636579 + 0.771211i \(0.280349\pi\)
\(858\) −25088.3 + 18102.1i −0.998251 + 0.720276i
\(859\) 48871.3i 1.94117i −0.240757 0.970585i \(-0.577396\pi\)
0.240757 0.970585i \(-0.422604\pi\)
\(860\) −12945.1 −0.513285
\(861\) −9990.88 + 7208.80i −0.395457 + 0.285337i
\(862\) −18301.4 −0.723142
\(863\) −5868.09 −0.231463 −0.115731 0.993281i \(-0.536921\pi\)
−0.115731 + 0.993281i \(0.536921\pi\)
\(864\) 4283.20 1345.21i 0.168654 0.0529685i
\(865\) 3591.78i 0.141184i
\(866\) −15566.0 −0.610801
\(867\) 25021.4 + 34677.8i 0.980128 + 1.35839i
\(868\) 21524.2i 0.841680i
\(869\) 37564.6 1.46639
\(870\) 5803.01 + 8042.56i 0.226139 + 0.313412i
\(871\) 56306.3 2.19043
\(872\) 118.262i 0.00459274i
\(873\) 14071.4 + 4674.44i 0.545527 + 0.181221i
\(874\) 25691.5 0.994311
\(875\) 38858.6i 1.50133i
\(876\) −15373.0 + 11092.2i −0.592928 + 0.427820i
\(877\) 17315.4 0.666705 0.333353 0.942802i \(-0.391820\pi\)
0.333353 + 0.942802i \(0.391820\pi\)
\(878\) −12614.5 −0.484875
\(879\) 6132.17 4424.60i 0.235305 0.169782i
\(880\) 11171.3i 0.427938i
\(881\) −31653.0 −1.21046 −0.605231 0.796050i \(-0.706919\pi\)
−0.605231 + 0.796050i \(0.706919\pi\)
\(882\) −13198.0 + 39729.8i −0.503855 + 1.51675i
\(883\) −32748.3 −1.24810 −0.624048 0.781386i \(-0.714513\pi\)
−0.624048 + 0.781386i \(0.714513\pi\)
\(884\) −24527.0 −0.933183
\(885\) 23551.4 17832.1i 0.894543 0.677311i
\(886\) 4776.58 0.181120
\(887\) −24272.6 −0.918823 −0.459411 0.888224i \(-0.651940\pi\)
−0.459411 + 0.888224i \(0.651940\pi\)
\(888\) −2801.07 + 2021.08i −0.105853 + 0.0763772i
\(889\) 54662.2 2.06222
\(890\) 1763.40i 0.0664151i
\(891\) −32509.4 24278.0i −1.22234 0.912845i
\(892\) 16428.8 0.616677
\(893\) −38998.6 −1.46141
\(894\) 14766.0 + 20464.6i 0.552403 + 0.765590i
\(895\) 35479.8i 1.32510i
\(896\) −4280.39 −0.159596
\(897\) −36932.3 + 26648.1i −1.37473 + 0.991922i
\(898\) 1608.89i 0.0597875i
\(899\) 12241.2 0.454136
\(900\) 1102.11 3317.66i 0.0408188 0.122876i
\(901\) −57367.7 −2.12119
\(902\) 7892.47i 0.291342i
\(903\) −36352.2 + 26229.5i −1.33967 + 0.966627i
\(904\) −6073.96 −0.223470
\(905\) 9370.22i 0.344173i
\(906\) 4024.40 2903.76i 0.147573 0.106480i
\(907\) −24434.5 −0.894524 −0.447262 0.894403i \(-0.647601\pi\)
−0.447262 + 0.894403i \(0.647601\pi\)
\(908\) −4362.78 −0.159454
\(909\) −10914.8 + 32856.6i −0.398263 + 1.19888i
\(910\) −44875.4 −1.63473
\(911\) 27512.4i 1.00058i −0.865859 0.500289i \(-0.833227\pi\)
0.865859 0.500289i \(-0.166773\pi\)
\(912\) −3813.47 5285.19i −0.138461 0.191897i
\(913\) 26915.5 0.975653
\(914\) 15257.9i 0.552173i
\(915\) 1258.31 + 1743.93i 0.0454629 + 0.0630083i
\(916\) 19899.6i 0.717795i
\(917\) 44844.9 1.61495
\(918\) −9638.50 30689.5i −0.346534 1.10338i
\(919\) 6767.64i 0.242920i 0.992596 + 0.121460i \(0.0387577\pi\)
−0.992596 + 0.121460i \(0.961242\pi\)
\(920\) 16445.3i 0.589331i
\(921\) −15035.9 20838.6i −0.537947 0.745555i
\(922\) 2556.29i 0.0913089i
\(923\) −25178.9 −0.897912
\(924\) 22635.5 + 31371.1i 0.805901 + 1.11692i
\(925\) 2689.67i 0.0956064i
\(926\) 14805.0i 0.525401i
\(927\) 31028.2 + 10307.4i 1.09935 + 0.365199i
\(928\) 2434.34i 0.0861112i
\(929\) −47152.2 −1.66525 −0.832623 0.553841i \(-0.813162\pi\)
−0.832623 + 0.553841i \(0.813162\pi\)
\(930\) −12274.8 17012.0i −0.432803 0.599834i
\(931\) 60774.6 2.13943
\(932\) −1736.65 −0.0610362
\(933\) 28580.2 20621.7i 1.00287 0.723607i
\(934\) −25403.9 −0.889981
\(935\) 80043.5 2.79968
\(936\) 10964.0 + 3642.17i 0.382872 + 0.127188i
\(937\) 21544.1i 0.751136i −0.926795 0.375568i \(-0.877448\pi\)
0.926795 0.375568i \(-0.122552\pi\)
\(938\) 70407.1i 2.45082i
\(939\) 42935.0 30979.3i 1.49215 1.07665i
\(940\) 24963.2i 0.866181i
\(941\) 3628.62 0.125706 0.0628532 0.998023i \(-0.479980\pi\)
0.0628532 + 0.998023i \(0.479980\pi\)
\(942\) 10054.3 7254.59i 0.347758 0.250921i
\(943\) 11618.5i 0.401219i
\(944\) 7249.08 166.983i 0.249934 0.00575724i
\(945\) −17634.9 56150.3i −0.607050 1.93288i
\(946\) 28717.1i 0.986970i
\(947\) 34650.5i 1.18901i 0.804093 + 0.594503i \(0.202651\pi\)
−0.804093 + 0.594503i \(0.797349\pi\)
\(948\) −8208.15 11375.9i −0.281211 0.389739i
\(949\) −48783.2 −1.66867
\(950\) −5075.01 −0.173321
\(951\) −30927.1 + 22315.1i −1.05455 + 0.760900i
\(952\) 30669.3i 1.04412i
\(953\) 29717.0i 1.01010i 0.863089 + 0.505052i \(0.168527\pi\)
−0.863089 + 0.505052i \(0.831473\pi\)
\(954\) 25644.2 + 8518.87i 0.870296 + 0.289108i
\(955\) 9652.40i 0.327062i
\(956\) 10253.2i 0.346874i
\(957\) 17841.4 12873.2i 0.602643 0.434830i
\(958\) 4253.78i 0.143459i
\(959\) 86177.0i 2.90177i
\(960\) 3383.08 2441.02i 0.113738 0.0820663i
\(961\) 3897.75 0.130836
\(962\) −8888.65 −0.297902
\(963\) −15837.5 5261.12i −0.529964 0.176051i
\(964\) −13744.6 −0.459217
\(965\) 53308.9i 1.77832i
\(966\) 33321.6 + 46181.3i 1.10984 + 1.53816i
\(967\) 4345.44i 0.144509i −0.997386 0.0722544i \(-0.976981\pi\)
0.997386 0.0722544i \(-0.0230193\pi\)
\(968\) 14134.2 0.469308
\(969\) −37868.8 + 27323.8i −1.25544 + 0.905848i
\(970\) 13778.3 0.456076
\(971\) 46728.5i 1.54438i −0.635394 0.772188i \(-0.719162\pi\)
0.635394 0.772188i \(-0.280838\pi\)
\(972\) −248.707 + 15149.9i −0.00820708 + 0.499933i
\(973\) 9374.89 0.308885
\(974\) −30468.8 −1.00234
\(975\) 7295.48 5263.97i 0.239633 0.172905i
\(976\) 527.858i 0.0173118i
\(977\) 23068.5 0.755399 0.377700 0.925928i \(-0.376715\pi\)
0.377700 + 0.925928i \(0.376715\pi\)
\(978\) 1978.41 + 2741.93i 0.0646857 + 0.0896497i
\(979\) 3911.89 0.127706
\(980\) 38902.1i 1.26804i
\(981\) 378.783 + 125.830i 0.0123278 + 0.00409524i
\(982\) 3302.66i 0.107324i
\(983\) 9487.51 0.307838 0.153919 0.988083i \(-0.450811\pi\)
0.153919 + 0.988083i \(0.450811\pi\)
\(984\) 2390.12 1724.57i 0.0774333 0.0558711i
\(985\) −36754.5 −1.18893
\(986\) 17442.3 0.563362
\(987\) −50580.7 70101.2i −1.63121 2.26073i
\(988\) 16771.5i 0.540054i
\(989\) 42274.3i 1.35920i
\(990\) −35780.7 11886.1i −1.14867 0.381582i
\(991\) 24894.2i 0.797973i −0.916957 0.398987i \(-0.869362\pi\)
0.916957 0.398987i \(-0.130638\pi\)
\(992\) 5149.24i 0.164807i
\(993\) 5738.00 + 7952.45i 0.183373 + 0.254142i
\(994\) 31484.4i 1.00465i
\(995\) 22241.8i 0.708657i
\(996\) −5881.23 8150.96i −0.187102 0.259310i
\(997\) 43927.8 1.39540 0.697698 0.716392i \(-0.254208\pi\)
0.697698 + 0.716392i \(0.254208\pi\)
\(998\) 8635.09 0.273887
\(999\) −3493.01 11121.9i −0.110625 0.352234i
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 354.4.c.b.353.9 yes 30
3.2 odd 2 354.4.c.a.353.10 yes 30
59.58 odd 2 354.4.c.a.353.9 30
177.176 even 2 inner 354.4.c.b.353.10 yes 30
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
354.4.c.a.353.9 30 59.58 odd 2
354.4.c.a.353.10 yes 30 3.2 odd 2
354.4.c.b.353.9 yes 30 1.1 even 1 trivial
354.4.c.b.353.10 yes 30 177.176 even 2 inner