Properties

Label 49.4.c.e.30.1
Level $49$
Weight $4$
Character 49.30
Analytic conductor $2.891$
Analytic rank $0$
Dimension $8$
CM no
Inner twists $4$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [49,4,Mod(18,49)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(49, base_ring=CyclotomicField(6))
 
chi = DirichletCharacter(H, H._module([4]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("49.18");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 49 = 7^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 49.c (of order \(3\), degree \(2\), not 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: \(2.89109359028\)
Analytic rank: \(0\)
Dimension: \(8\)
Relative dimension: \(4\) over \(\Q(\zeta_{3})\)
Coefficient field: 8.0.5922408960000.19
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} - 4x^{7} - 54x^{6} + 176x^{5} + 1307x^{4} - 2912x^{3} - 15314x^{2} + 16800x + 86044 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{9}]\)
Coefficient ring index: \( 7^{2} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{3}]$

Embedding invariants

Embedding label 30.1
Root \(3.82402 - 1.22474i\) of defining polynomial
Character \(\chi\) \(=\) 49.30
Dual form 49.4.c.e.18.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-2.26556 + 3.92407i) q^{2} +(-1.78978 - 3.09999i) q^{3} +(-6.26556 - 10.8523i) q^{4} +(6.73953 - 11.6732i) q^{5} +16.2194 q^{6} +20.5311 q^{8} +(7.09339 - 12.2861i) q^{9} +O(q^{10})\) \(q+(-2.26556 + 3.92407i) q^{2} +(-1.78978 - 3.09999i) q^{3} +(-6.26556 - 10.8523i) q^{4} +(6.73953 - 11.6732i) q^{5} +16.2194 q^{6} +20.5311 q^{8} +(7.09339 - 12.2861i) q^{9} +(30.5377 + 52.8928i) q^{10} +(-0.406613 - 0.704275i) q^{11} +(-22.4279 + 38.8463i) q^{12} +34.9564 q^{13} -48.2490 q^{15} +(3.60992 - 6.25256i) q^{16} +(-58.8660 - 101.959i) q^{17} +(32.1410 + 55.6699i) q^{18} +(46.6457 - 80.7927i) q^{19} -168.908 q^{20} +3.68484 q^{22} +(-60.1245 + 104.139i) q^{23} +(-36.7462 - 63.6462i) q^{24} +(-28.3424 - 49.0905i) q^{25} +(-79.1960 + 137.171i) q^{26} -147.430 q^{27} +8.56420 q^{29} +(109.311 - 189.333i) q^{30} +(41.0535 + 71.1067i) q^{31} +(98.4815 + 170.575i) q^{32} +(-1.45550 + 2.52099i) q^{33} +533.458 q^{34} -177.776 q^{36} +(-14.4066 + 24.9530i) q^{37} +(211.358 + 366.082i) q^{38} +(-62.5642 - 108.364i) q^{39} +(138.370 - 239.664i) q^{40} -70.5291 q^{41} +417.179 q^{43} +(-5.09532 + 8.82536i) q^{44} +(-95.6121 - 165.605i) q^{45} +(-272.432 - 471.866i) q^{46} +(-169.131 + 292.943i) q^{47} -25.8438 q^{48} +256.846 q^{50} +(-210.714 + 364.967i) q^{51} +(-219.022 - 379.356i) q^{52} +(-74.5603 - 129.142i) q^{53} +(334.013 - 578.528i) q^{54} -10.9615 q^{55} -333.942 q^{57} +(-19.4027 + 33.6065i) q^{58} +(47.0914 + 81.5647i) q^{59} +(302.307 + 523.612i) q^{60} +(60.2623 - 104.377i) q^{61} -372.037 q^{62} -834.706 q^{64} +(235.590 - 408.053i) q^{65} +(-6.59504 - 11.4229i) q^{66} +(396.183 + 686.209i) q^{67} +(-737.657 + 1277.66i) q^{68} +430.438 q^{69} +449.128 q^{71} +(145.635 - 252.248i) q^{72} +(234.710 + 406.530i) q^{73} +(-65.2782 - 113.065i) q^{74} +(-101.453 + 175.722i) q^{75} -1169.05 q^{76} +566.973 q^{78} +(509.926 - 883.218i) q^{79} +(-48.6583 - 84.2786i) q^{80} +(72.3463 + 125.307i) q^{81} +(159.788 - 276.761i) q^{82} -104.253 q^{83} -1586.91 q^{85} +(-945.146 + 1637.04i) q^{86} +(-15.3280 - 26.5489i) q^{87} +(-8.34823 - 14.4596i) q^{88} +(786.460 - 1362.19i) q^{89} +866.462 q^{90} +1506.86 q^{92} +(146.953 - 254.530i) q^{93} +(-766.352 - 1327.36i) q^{94} +(-628.739 - 1089.01i) q^{95} +(352.520 - 610.583i) q^{96} +550.057 q^{97} -11.5371 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q - 2 q^{2} - 34 q^{4} + 132 q^{8} - 40 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q - 2 q^{2} - 34 q^{4} + 132 q^{8} - 40 q^{9} - 100 q^{11} - 128 q^{15} + 174 q^{16} + 370 q^{18} - 680 q^{22} - 352 q^{23} + 128 q^{25} + 520 q^{29} + 552 q^{30} + 30 q^{32} - 100 q^{36} - 212 q^{37} - 952 q^{39} + 1080 q^{43} - 460 q^{44} - 696 q^{46} + 2732 q^{50} - 428 q^{51} - 16 q^{53} - 3768 q^{57} + 780 q^{58} + 1064 q^{60} - 3356 q^{64} + 756 q^{65} + 1944 q^{67} + 4496 q^{71} - 270 q^{72} + 284 q^{74} - 2688 q^{78} + 1048 q^{79} + 1256 q^{81} - 6568 q^{85} - 4820 q^{86} - 1260 q^{88} + 7024 q^{92} + 5368 q^{93} - 2192 q^{95} + 6680 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/49\mathbb{Z}\right)^\times\).

\(n\) \(3\)
\(\chi(n)\) \(e\left(\frac{1}{3}\right)\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −2.26556 + 3.92407i −0.800998 + 1.38737i 0.117962 + 0.993018i \(0.462364\pi\)
−0.918960 + 0.394351i \(0.870969\pi\)
\(3\) −1.78978 3.09999i −0.344443 0.596593i 0.640809 0.767700i \(-0.278599\pi\)
−0.985252 + 0.171107i \(0.945266\pi\)
\(4\) −6.26556 10.8523i −0.783196 1.35653i
\(5\) 6.73953 11.6732i 0.602802 1.04408i −0.389593 0.920987i \(-0.627384\pi\)
0.992395 0.123096i \(-0.0392823\pi\)
\(6\) 16.2194 1.10359
\(7\) 0 0
\(8\) 20.5311 0.907356
\(9\) 7.09339 12.2861i 0.262718 0.455041i
\(10\) 30.5377 + 52.8928i 0.965686 + 1.67262i
\(11\) −0.406613 0.704275i −0.0111453 0.0193043i 0.860399 0.509621i \(-0.170214\pi\)
−0.871544 + 0.490317i \(0.836881\pi\)
\(12\) −22.4279 + 38.8463i −0.539532 + 0.934498i
\(13\) 34.9564 0.745781 0.372891 0.927875i \(-0.378367\pi\)
0.372891 + 0.927875i \(0.378367\pi\)
\(14\) 0 0
\(15\) −48.2490 −0.830523
\(16\) 3.60992 6.25256i 0.0564050 0.0976963i
\(17\) −58.8660 101.959i −0.839829 1.45463i −0.890037 0.455888i \(-0.849322\pi\)
0.0502085 0.998739i \(-0.484011\pi\)
\(18\) 32.1410 + 55.6699i 0.420873 + 0.728974i
\(19\) 46.6457 80.7927i 0.563224 0.975532i −0.433989 0.900918i \(-0.642894\pi\)
0.997213 0.0746138i \(-0.0237724\pi\)
\(20\) −168.908 −1.88845
\(21\) 0 0
\(22\) 3.68484 0.0357095
\(23\) −60.1245 + 104.139i −0.545079 + 0.944105i 0.453522 + 0.891245i \(0.350167\pi\)
−0.998602 + 0.0528605i \(0.983166\pi\)
\(24\) −36.7462 63.6462i −0.312533 0.541322i
\(25\) −28.3424 49.0905i −0.226739 0.392724i
\(26\) −79.1960 + 137.171i −0.597369 + 1.03467i
\(27\) −147.430 −1.05085
\(28\) 0 0
\(29\) 8.56420 0.0548390 0.0274195 0.999624i \(-0.491271\pi\)
0.0274195 + 0.999624i \(0.491271\pi\)
\(30\) 109.311 189.333i 0.665247 1.15224i
\(31\) 41.0535 + 71.1067i 0.237852 + 0.411972i 0.960098 0.279665i \(-0.0902232\pi\)
−0.722245 + 0.691637i \(0.756890\pi\)
\(32\) 98.4815 + 170.575i 0.544039 + 0.942303i
\(33\) −1.45550 + 2.52099i −0.00767786 + 0.0132984i
\(34\) 533.458 2.69080
\(35\) 0 0
\(36\) −177.776 −0.823038
\(37\) −14.4066 + 24.9530i −0.0640117 + 0.110872i −0.896255 0.443539i \(-0.853723\pi\)
0.832243 + 0.554410i \(0.187056\pi\)
\(38\) 211.358 + 366.082i 0.902282 + 1.56280i
\(39\) −62.5642 108.364i −0.256879 0.444928i
\(40\) 138.370 239.664i 0.546956 0.947355i
\(41\) −70.5291 −0.268654 −0.134327 0.990937i \(-0.542887\pi\)
−0.134327 + 0.990937i \(0.542887\pi\)
\(42\) 0 0
\(43\) 417.179 1.47952 0.739758 0.672873i \(-0.234940\pi\)
0.739758 + 0.672873i \(0.234940\pi\)
\(44\) −5.09532 + 8.82536i −0.0174579 + 0.0302380i
\(45\) −95.6121 165.605i −0.316734 0.548599i
\(46\) −272.432 471.866i −0.873215 1.51245i
\(47\) −169.131 + 292.943i −0.524899 + 0.909151i 0.474681 + 0.880158i \(0.342563\pi\)
−0.999580 + 0.0289931i \(0.990770\pi\)
\(48\) −25.8438 −0.0777132
\(49\) 0 0
\(50\) 256.846 0.726471
\(51\) −210.714 + 364.967i −0.578546 + 1.00207i
\(52\) −219.022 379.356i −0.584093 1.01168i
\(53\) −74.5603 129.142i −0.193239 0.334699i 0.753083 0.657925i \(-0.228566\pi\)
−0.946322 + 0.323226i \(0.895232\pi\)
\(54\) 334.013 578.528i 0.841730 1.45792i
\(55\) −10.9615 −0.0268737
\(56\) 0 0
\(57\) −333.942 −0.775994
\(58\) −19.4027 + 33.6065i −0.0439259 + 0.0760820i
\(59\) 47.0914 + 81.5647i 0.103911 + 0.179980i 0.913293 0.407303i \(-0.133531\pi\)
−0.809382 + 0.587283i \(0.800197\pi\)
\(60\) 302.307 + 523.612i 0.650462 + 1.12663i
\(61\) 60.2623 104.377i 0.126488 0.219084i −0.795825 0.605526i \(-0.792963\pi\)
0.922314 + 0.386442i \(0.126296\pi\)
\(62\) −372.037 −0.762077
\(63\) 0 0
\(64\) −834.706 −1.63029
\(65\) 235.590 408.053i 0.449558 0.778658i
\(66\) −6.59504 11.4229i −0.0122999 0.0213040i
\(67\) 396.183 + 686.209i 0.722410 + 1.25125i 0.960031 + 0.279892i \(0.0902988\pi\)
−0.237622 + 0.971358i \(0.576368\pi\)
\(68\) −737.657 + 1277.66i −1.31550 + 2.27851i
\(69\) 430.438 0.750995
\(70\) 0 0
\(71\) 449.128 0.750729 0.375364 0.926877i \(-0.377518\pi\)
0.375364 + 0.926877i \(0.377518\pi\)
\(72\) 145.635 252.248i 0.238379 0.412884i
\(73\) 234.710 + 406.530i 0.376311 + 0.651790i 0.990522 0.137352i \(-0.0438590\pi\)
−0.614211 + 0.789142i \(0.710526\pi\)
\(74\) −65.2782 113.065i −0.102546 0.177616i
\(75\) −101.453 + 175.722i −0.156198 + 0.270542i
\(76\) −1169.05 −1.76446
\(77\) 0 0
\(78\) 566.973 0.823039
\(79\) 509.926 883.218i 0.726217 1.25785i −0.232254 0.972655i \(-0.574610\pi\)
0.958471 0.285190i \(-0.0920567\pi\)
\(80\) −48.6583 84.2786i −0.0680020 0.117783i
\(81\) 72.3463 + 125.307i 0.0992405 + 0.171890i
\(82\) 159.788 276.761i 0.215191 0.372722i
\(83\) −104.253 −0.137870 −0.0689352 0.997621i \(-0.521960\pi\)
−0.0689352 + 0.997621i \(0.521960\pi\)
\(84\) 0 0
\(85\) −1586.91 −2.02500
\(86\) −945.146 + 1637.04i −1.18509 + 2.05264i
\(87\) −15.3280 26.5489i −0.0188889 0.0327166i
\(88\) −8.34823 14.4596i −0.0101128 0.0175158i
\(89\) 786.460 1362.19i 0.936680 1.62238i 0.165071 0.986282i \(-0.447215\pi\)
0.771610 0.636096i \(-0.219452\pi\)
\(90\) 866.462 1.01481
\(91\) 0 0
\(92\) 1506.86 1.70762
\(93\) 146.953 254.530i 0.163853 0.283802i
\(94\) −766.352 1327.36i −0.840885 1.45646i
\(95\) −628.739 1089.01i −0.679024 1.17610i
\(96\) 352.520 610.583i 0.374781 0.649139i
\(97\) 550.057 0.575772 0.287886 0.957665i \(-0.407048\pi\)
0.287886 + 0.957665i \(0.407048\pi\)
\(98\) 0 0
\(99\) −11.5371 −0.0117123
\(100\) −355.162 + 615.159i −0.355162 + 0.615159i
\(101\) 32.8585 + 56.9125i 0.0323717 + 0.0560694i 0.881757 0.471703i \(-0.156361\pi\)
−0.849386 + 0.527773i \(0.823027\pi\)
\(102\) −954.772 1653.71i −0.926829 1.60531i
\(103\) −914.674 + 1584.26i −0.875005 + 1.51555i −0.0182480 + 0.999833i \(0.505809\pi\)
−0.856757 + 0.515720i \(0.827524\pi\)
\(104\) 717.694 0.676689
\(105\) 0 0
\(106\) 675.685 0.619135
\(107\) −430.689 + 745.975i −0.389124 + 0.673982i −0.992332 0.123602i \(-0.960556\pi\)
0.603208 + 0.797584i \(0.293889\pi\)
\(108\) 923.735 + 1599.96i 0.823022 + 1.42552i
\(109\) 810.259 + 1403.41i 0.712007 + 1.23323i 0.964103 + 0.265529i \(0.0855467\pi\)
−0.252096 + 0.967702i \(0.581120\pi\)
\(110\) 24.8340 43.0138i 0.0215258 0.0372837i
\(111\) 103.139 0.0881935
\(112\) 0 0
\(113\) 380.409 0.316689 0.158344 0.987384i \(-0.449384\pi\)
0.158344 + 0.987384i \(0.449384\pi\)
\(114\) 756.566 1310.41i 0.621569 1.07659i
\(115\) 810.421 + 1403.69i 0.657149 + 1.13822i
\(116\) −53.6595 92.9410i −0.0429497 0.0743910i
\(117\) 247.959 429.478i 0.195930 0.339361i
\(118\) −426.754 −0.332931
\(119\) 0 0
\(120\) −990.607 −0.753580
\(121\) 665.169 1152.11i 0.499752 0.865595i
\(122\) 273.056 + 472.947i 0.202634 + 0.350972i
\(123\) 126.231 + 218.639i 0.0925358 + 0.160277i
\(124\) 514.446 891.047i 0.372570 0.645310i
\(125\) 920.824 0.658888
\(126\) 0 0
\(127\) 958.358 0.669610 0.334805 0.942287i \(-0.391329\pi\)
0.334805 + 0.942287i \(0.391329\pi\)
\(128\) 1103.23 1910.85i 0.761817 1.31951i
\(129\) −746.658 1293.25i −0.509609 0.882669i
\(130\) 1067.49 + 1848.94i 0.720190 + 1.24741i
\(131\) −576.079 + 997.798i −0.384216 + 0.665481i −0.991660 0.128881i \(-0.958861\pi\)
0.607444 + 0.794362i \(0.292195\pi\)
\(132\) 36.4780 0.0240531
\(133\) 0 0
\(134\) −3590.31 −2.31459
\(135\) −993.611 + 1720.98i −0.633455 + 1.09718i
\(136\) −1208.58 2093.33i −0.762024 1.31986i
\(137\) −178.689 309.498i −0.111434 0.193009i 0.804915 0.593390i \(-0.202211\pi\)
−0.916349 + 0.400382i \(0.868878\pi\)
\(138\) −975.186 + 1689.07i −0.601546 + 1.04191i
\(139\) −2736.29 −1.66970 −0.834852 0.550475i \(-0.814447\pi\)
−0.834852 + 0.550475i \(0.814447\pi\)
\(140\) 0 0
\(141\) 1210.83 0.723191
\(142\) −1017.53 + 1762.41i −0.601332 + 1.04154i
\(143\) −14.2137 24.6189i −0.00831197 0.0143968i
\(144\) −51.2131 88.7037i −0.0296372 0.0513332i
\(145\) 57.7186 99.9716i 0.0330570 0.0572565i
\(146\) −2127.00 −1.20570
\(147\) 0 0
\(148\) 361.062 0.200535
\(149\) −704.969 + 1221.04i −0.387606 + 0.671353i −0.992127 0.125236i \(-0.960031\pi\)
0.604521 + 0.796589i \(0.293365\pi\)
\(150\) −459.698 796.220i −0.250228 0.433407i
\(151\) −1176.18 2037.20i −0.633879 1.09791i −0.986751 0.162240i \(-0.948128\pi\)
0.352872 0.935672i \(-0.385205\pi\)
\(152\) 957.688 1658.76i 0.511045 0.885155i
\(153\) −1670.24 −0.882553
\(154\) 0 0
\(155\) 1106.72 0.573511
\(156\) −784.000 + 1357.93i −0.402373 + 0.696931i
\(157\) −606.911 1051.20i −0.308514 0.534363i 0.669523 0.742791i \(-0.266498\pi\)
−0.978038 + 0.208429i \(0.933165\pi\)
\(158\) 2310.54 + 4001.97i 1.16340 + 2.01506i
\(159\) −266.893 + 462.272i −0.133119 + 0.230570i
\(160\) 2654.88 1.31179
\(161\) 0 0
\(162\) −655.621 −0.317966
\(163\) 361.387 625.941i 0.173657 0.300782i −0.766039 0.642794i \(-0.777775\pi\)
0.939696 + 0.342012i \(0.111108\pi\)
\(164\) 441.905 + 765.401i 0.210408 + 0.364438i
\(165\) 19.6187 + 33.9806i 0.00925645 + 0.0160326i
\(166\) 236.192 409.096i 0.110434 0.191277i
\(167\) 753.016 0.348923 0.174462 0.984664i \(-0.444182\pi\)
0.174462 + 0.984664i \(0.444182\pi\)
\(168\) 0 0
\(169\) −975.051 −0.443810
\(170\) 3595.26 6227.17i 1.62202 2.80942i
\(171\) −661.751 1146.19i −0.295938 0.512580i
\(172\) −2613.86 4527.34i −1.15875 2.00702i
\(173\) 929.569 1610.06i 0.408519 0.707576i −0.586205 0.810163i \(-0.699379\pi\)
0.994724 + 0.102587i \(0.0327120\pi\)
\(174\) 138.906 0.0605199
\(175\) 0 0
\(176\) −5.87137 −0.00251461
\(177\) 168.566 291.965i 0.0715831 0.123986i
\(178\) 3563.55 + 6172.25i 1.50056 + 2.59904i
\(179\) 261.413 + 452.780i 0.109156 + 0.189063i 0.915429 0.402481i \(-0.131852\pi\)
−0.806273 + 0.591544i \(0.798519\pi\)
\(180\) −1198.13 + 2075.22i −0.496129 + 0.859320i
\(181\) 2901.38 1.19148 0.595740 0.803177i \(-0.296859\pi\)
0.595740 + 0.803177i \(0.296859\pi\)
\(182\) 0 0
\(183\) −431.424 −0.174272
\(184\) −1234.42 + 2138.09i −0.494581 + 0.856640i
\(185\) 194.187 + 336.343i 0.0771727 + 0.133667i
\(186\) 665.864 + 1153.31i 0.262492 + 0.454650i
\(187\) −47.8714 + 82.9156i −0.0187203 + 0.0324246i
\(188\) 4238.79 1.64439
\(189\) 0 0
\(190\) 5697.80 2.17559
\(191\) −1302.18 + 2255.43i −0.493309 + 0.854437i −0.999970 0.00770854i \(-0.997546\pi\)
0.506661 + 0.862145i \(0.330880\pi\)
\(192\) 1493.94 + 2587.58i 0.561541 + 0.972617i
\(193\) −338.123 585.646i −0.126107 0.218423i 0.796058 0.605220i \(-0.206915\pi\)
−0.922165 + 0.386797i \(0.873582\pi\)
\(194\) −1246.19 + 2158.47i −0.461192 + 0.798808i
\(195\) −1686.61 −0.619389
\(196\) 0 0
\(197\) −3685.99 −1.33308 −0.666538 0.745471i \(-0.732225\pi\)
−0.666538 + 0.745471i \(0.732225\pi\)
\(198\) 26.1380 45.2723i 0.00938154 0.0162493i
\(199\) 399.901 + 692.648i 0.142453 + 0.246736i 0.928420 0.371533i \(-0.121168\pi\)
−0.785967 + 0.618269i \(0.787834\pi\)
\(200\) −581.902 1007.88i −0.205733 0.356341i
\(201\) 1418.16 2456.32i 0.497658 0.861969i
\(202\) −297.772 −0.103719
\(203\) 0 0
\(204\) 5280.97 1.81246
\(205\) −475.333 + 823.300i −0.161945 + 0.280497i
\(206\) −4144.51 7178.50i −1.40175 2.42791i
\(207\) 852.973 + 1477.39i 0.286404 + 0.496067i
\(208\) 126.190 218.567i 0.0420658 0.0728601i
\(209\) −75.8670 −0.0251092
\(210\) 0 0
\(211\) −667.385 −0.217747 −0.108874 0.994056i \(-0.534724\pi\)
−0.108874 + 0.994056i \(0.534724\pi\)
\(212\) −934.325 + 1618.30i −0.302687 + 0.524270i
\(213\) −803.840 1392.29i −0.258583 0.447879i
\(214\) −1951.51 3380.11i −0.623375 1.07972i
\(215\) 2811.59 4869.81i 0.891855 1.54474i
\(216\) −3026.91 −0.953497
\(217\) 0 0
\(218\) −7342.77 −2.28126
\(219\) 840.158 1455.20i 0.259236 0.449009i
\(220\) 68.6801 + 118.957i 0.0210473 + 0.0364551i
\(221\) −2057.74 3564.11i −0.626329 1.08483i
\(222\) −233.667 + 404.723i −0.0706428 + 0.122357i
\(223\) 2646.82 0.794818 0.397409 0.917642i \(-0.369909\pi\)
0.397409 + 0.917642i \(0.369909\pi\)
\(224\) 0 0
\(225\) −804.175 −0.238274
\(226\) −861.840 + 1492.75i −0.253667 + 0.439364i
\(227\) −2060.56 3568.99i −0.602485 1.04353i −0.992444 0.122702i \(-0.960844\pi\)
0.389959 0.920832i \(-0.372489\pi\)
\(228\) 2092.33 + 3624.03i 0.607755 + 1.05266i
\(229\) −2033.46 + 3522.06i −0.586790 + 1.01635i 0.407860 + 0.913045i \(0.366275\pi\)
−0.994650 + 0.103306i \(0.967058\pi\)
\(230\) −7344.25 −2.10550
\(231\) 0 0
\(232\) 175.833 0.0497585
\(233\) 1952.33 3381.54i 0.548934 0.950782i −0.449414 0.893324i \(-0.648367\pi\)
0.998348 0.0574584i \(-0.0182996\pi\)
\(234\) 1123.54 + 1946.02i 0.313879 + 0.543655i
\(235\) 2279.72 + 3948.59i 0.632819 + 1.09608i
\(236\) 590.108 1022.10i 0.162766 0.281919i
\(237\) −3650.62 −1.00056
\(238\) 0 0
\(239\) 5425.12 1.46829 0.734146 0.678991i \(-0.237583\pi\)
0.734146 + 0.678991i \(0.237583\pi\)
\(240\) −174.175 + 301.680i −0.0468457 + 0.0811391i
\(241\) 801.446 + 1388.15i 0.214215 + 0.371030i 0.953029 0.302878i \(-0.0979475\pi\)
−0.738815 + 0.673909i \(0.764614\pi\)
\(242\) 3013.97 + 5220.35i 0.800600 + 1.38668i
\(243\) −1731.34 + 2998.77i −0.457060 + 0.791652i
\(244\) −1510.31 −0.396261
\(245\) 0 0
\(246\) −1143.94 −0.296484
\(247\) 1630.56 2824.22i 0.420042 0.727534i
\(248\) 842.874 + 1459.90i 0.215817 + 0.373806i
\(249\) 186.590 + 323.183i 0.0474885 + 0.0822524i
\(250\) −2086.19 + 3613.38i −0.527768 + 0.914121i
\(251\) 3805.93 0.957085 0.478542 0.878064i \(-0.341165\pi\)
0.478542 + 0.878064i \(0.341165\pi\)
\(252\) 0 0
\(253\) 97.7897 0.0243003
\(254\) −2171.22 + 3760.67i −0.536357 + 0.928997i
\(255\) 2840.23 + 4919.41i 0.697497 + 1.20810i
\(256\) 1660.05 + 2875.28i 0.405285 + 0.701974i
\(257\) −2294.67 + 3974.49i −0.556956 + 0.964676i 0.440792 + 0.897609i \(0.354697\pi\)
−0.997748 + 0.0670671i \(0.978636\pi\)
\(258\) 6766.41 1.63278
\(259\) 0 0
\(260\) −5904.41 −1.40837
\(261\) 60.7492 105.221i 0.0144072 0.0249540i
\(262\) −2610.29 4521.15i −0.615512 1.06610i
\(263\) −438.587 759.656i −0.102831 0.178108i 0.810019 0.586403i \(-0.199457\pi\)
−0.912850 + 0.408295i \(0.866123\pi\)
\(264\) −29.8830 + 51.7588i −0.00696655 + 0.0120664i
\(265\) −2010.00 −0.465938
\(266\) 0 0
\(267\) −5630.35 −1.29053
\(268\) 4964.62 8598.97i 1.13158 1.95995i
\(269\) 3061.78 + 5303.15i 0.693977 + 1.20200i 0.970524 + 0.241003i \(0.0774764\pi\)
−0.276547 + 0.961000i \(0.589190\pi\)
\(270\) −4502.18 7798.00i −1.01479 1.75767i
\(271\) 1744.88 3022.22i 0.391122 0.677443i −0.601476 0.798891i \(-0.705421\pi\)
0.992598 + 0.121448i \(0.0387538\pi\)
\(272\) −850.006 −0.189482
\(273\) 0 0
\(274\) 1619.32 0.357032
\(275\) −23.0488 + 39.9217i −0.00505417 + 0.00875407i
\(276\) −2696.94 4671.23i −0.588176 1.01875i
\(277\) 2445.85 + 4236.33i 0.530530 + 0.918905i 0.999365 + 0.0356193i \(0.0113404\pi\)
−0.468836 + 0.883285i \(0.655326\pi\)
\(278\) 6199.23 10737.4i 1.33743 2.31649i
\(279\) 1164.83 0.249952
\(280\) 0 0
\(281\) 6914.46 1.46791 0.733954 0.679199i \(-0.237673\pi\)
0.733954 + 0.679199i \(0.237673\pi\)
\(282\) −2743.20 + 4751.37i −0.579274 + 1.00333i
\(283\) −1779.92 3082.92i −0.373871 0.647564i 0.616286 0.787522i \(-0.288636\pi\)
−0.990157 + 0.139959i \(0.955303\pi\)
\(284\) −2814.04 4874.07i −0.587967 1.01839i
\(285\) −2250.61 + 3898.17i −0.467770 + 0.810202i
\(286\) 128.809 0.0266315
\(287\) 0 0
\(288\) 2794.27 0.571715
\(289\) −4473.90 + 7749.02i −0.910625 + 1.57725i
\(290\) 261.531 + 452.984i 0.0529572 + 0.0917246i
\(291\) −984.481 1705.17i −0.198321 0.343501i
\(292\) 2941.18 5094.27i 0.589451 1.02096i
\(293\) 3285.11 0.655011 0.327505 0.944849i \(-0.393792\pi\)
0.327505 + 0.944849i \(0.393792\pi\)
\(294\) 0 0
\(295\) 1269.49 0.250552
\(296\) −295.784 + 512.313i −0.0580814 + 0.100600i
\(297\) 59.9472 + 103.832i 0.0117121 + 0.0202859i
\(298\) −3194.31 5532.70i −0.620943 1.07551i
\(299\) −2101.74 + 3640.31i −0.406510 + 0.704096i
\(300\) 2542.65 0.489333
\(301\) 0 0
\(302\) 10658.8 2.03094
\(303\) 117.619 203.722i 0.0223004 0.0386254i
\(304\) −336.774 583.310i −0.0635373 0.110050i
\(305\) −812.278 1406.91i −0.152495 0.264129i
\(306\) 3784.03 6554.13i 0.706923 1.22443i
\(307\) −9094.65 −1.69075 −0.845373 0.534176i \(-0.820622\pi\)
−0.845373 + 0.534176i \(0.820622\pi\)
\(308\) 0 0
\(309\) 6548.26 1.20556
\(310\) −2507.35 + 4342.86i −0.459381 + 0.795671i
\(311\) 4081.53 + 7069.42i 0.744188 + 1.28897i 0.950573 + 0.310500i \(0.100497\pi\)
−0.206386 + 0.978471i \(0.566170\pi\)
\(312\) −1284.51 2224.84i −0.233081 0.403708i
\(313\) −1489.81 + 2580.42i −0.269038 + 0.465988i −0.968614 0.248571i \(-0.920039\pi\)
0.699576 + 0.714559i \(0.253372\pi\)
\(314\) 5499.98 0.988478
\(315\) 0 0
\(316\) −12779.9 −2.27508
\(317\) 1944.05 3367.20i 0.344445 0.596596i −0.640808 0.767701i \(-0.721401\pi\)
0.985253 + 0.171105i \(0.0547339\pi\)
\(318\) −1209.33 2094.61i −0.213257 0.369371i
\(319\) −3.48232 6.03155i −0.000611198 0.00105863i
\(320\) −5625.52 + 9743.69i −0.982739 + 1.70215i
\(321\) 3083.35 0.536124
\(322\) 0 0
\(323\) −10983.4 −1.89205
\(324\) 906.581 1570.24i 0.155449 0.269246i
\(325\) −990.749 1716.03i −0.169098 0.292886i
\(326\) 1637.49 + 2836.22i 0.278197 + 0.481852i
\(327\) 2900.37 5023.58i 0.490491 0.849556i
\(328\) −1448.04 −0.243764
\(329\) 0 0
\(330\) −177.790 −0.0296576
\(331\) 2446.52 4237.49i 0.406262 0.703666i −0.588206 0.808711i \(-0.700165\pi\)
0.994467 + 0.105045i \(0.0334988\pi\)
\(332\) 653.203 + 1131.38i 0.107979 + 0.187026i
\(333\) 204.383 + 354.002i 0.0336341 + 0.0582559i
\(334\) −1706.01 + 2954.89i −0.279487 + 0.484085i
\(335\) 10680.3 1.74188
\(336\) 0 0
\(337\) −1722.10 −0.278364 −0.139182 0.990267i \(-0.544447\pi\)
−0.139182 + 0.990267i \(0.544447\pi\)
\(338\) 2209.04 3826.17i 0.355491 0.615728i
\(339\) −680.847 1179.26i −0.109081 0.188934i
\(340\) 9942.91 + 17221.6i 1.58597 + 2.74698i
\(341\) 33.3858 57.8259i 0.00530188 0.00918313i
\(342\) 5996.96 0.948183
\(343\) 0 0
\(344\) 8565.16 1.34245
\(345\) 2900.95 5024.59i 0.452701 0.784101i
\(346\) 4212.00 + 7295.39i 0.654446 + 1.13353i
\(347\) 119.029 + 206.165i 0.0184145 + 0.0318948i 0.875086 0.483968i \(-0.160805\pi\)
−0.856671 + 0.515863i \(0.827471\pi\)
\(348\) −192.077 + 332.688i −0.0295874 + 0.0512469i
\(349\) −10053.1 −1.54192 −0.770959 0.636884i \(-0.780223\pi\)
−0.770959 + 0.636884i \(0.780223\pi\)
\(350\) 0 0
\(351\) −5153.63 −0.783706
\(352\) 80.0878 138.716i 0.0121270 0.0210045i
\(353\) 1735.08 + 3005.25i 0.261612 + 0.453125i 0.966670 0.256024i \(-0.0824126\pi\)
−0.705058 + 0.709149i \(0.749079\pi\)
\(354\) 763.795 + 1322.93i 0.114676 + 0.198624i
\(355\) 3026.91 5242.77i 0.452540 0.783823i
\(356\) −19710.5 −2.93442
\(357\) 0 0
\(358\) −2368.99 −0.349734
\(359\) −703.770 + 1218.97i −0.103464 + 0.179205i −0.913110 0.407714i \(-0.866326\pi\)
0.809646 + 0.586919i \(0.199659\pi\)
\(360\) −1963.02 3400.06i −0.287390 0.497775i
\(361\) −922.136 1597.19i −0.134442 0.232860i
\(362\) −6573.26 + 11385.2i −0.954373 + 1.65302i
\(363\) −4762.02 −0.688544
\(364\) 0 0
\(365\) 6327.34 0.907364
\(366\) 977.420 1692.94i 0.139592 0.241780i
\(367\) −5566.51 9641.48i −0.791742 1.37134i −0.924887 0.380242i \(-0.875841\pi\)
0.133145 0.991097i \(-0.457492\pi\)
\(368\) 434.089 + 751.865i 0.0614904 + 0.106505i
\(369\) −500.290 + 866.528i −0.0705801 + 0.122248i
\(370\) −1759.78 −0.247261
\(371\) 0 0
\(372\) −3682.98 −0.513316
\(373\) −4512.97 + 7816.69i −0.626468 + 1.08507i 0.361787 + 0.932261i \(0.382167\pi\)
−0.988255 + 0.152814i \(0.951166\pi\)
\(374\) −216.911 375.701i −0.0299899 0.0519440i
\(375\) −1648.07 2854.54i −0.226949 0.393088i
\(376\) −3472.44 + 6014.45i −0.476270 + 0.824924i
\(377\) 299.373 0.0408979
\(378\) 0 0
\(379\) −5855.75 −0.793640 −0.396820 0.917896i \(-0.629886\pi\)
−0.396820 + 0.917896i \(0.629886\pi\)
\(380\) −7878.81 + 13646.5i −1.06362 + 1.84224i
\(381\) −1715.25 2970.90i −0.230643 0.399485i
\(382\) −5900.32 10219.7i −0.790280 1.36880i
\(383\) 3894.01 6744.63i 0.519517 0.899829i −0.480226 0.877145i \(-0.659445\pi\)
0.999743 0.0226844i \(-0.00722130\pi\)
\(384\) −7898.14 −1.04961
\(385\) 0 0
\(386\) 3064.16 0.404045
\(387\) 2959.21 5125.51i 0.388696 0.673241i
\(388\) −3446.42 5969.38i −0.450942 0.781054i
\(389\) 1907.03 + 3303.07i 0.248560 + 0.430519i 0.963127 0.269048i \(-0.0867092\pi\)
−0.714566 + 0.699568i \(0.753376\pi\)
\(390\) 3821.13 6618.39i 0.496129 0.859321i
\(391\) 14157.1 1.83109
\(392\) 0 0
\(393\) 4124.21 0.529362
\(394\) 8350.85 14464.1i 1.06779 1.84947i
\(395\) −6873.32 11904.9i −0.875530 1.51646i
\(396\) 72.2862 + 125.203i 0.00917303 + 0.0158882i
\(397\) 5082.64 8803.39i 0.642545 1.11292i −0.342318 0.939584i \(-0.611212\pi\)
0.984863 0.173336i \(-0.0554547\pi\)
\(398\) −3624.00 −0.456419
\(399\) 0 0
\(400\) −409.255 −0.0511569
\(401\) −5751.27 + 9961.50i −0.716222 + 1.24053i 0.246265 + 0.969203i \(0.420797\pi\)
−0.962486 + 0.271330i \(0.912537\pi\)
\(402\) 6425.86 + 11129.9i 0.797246 + 1.38087i
\(403\) 1435.08 + 2485.63i 0.177386 + 0.307241i
\(404\) 411.754 713.178i 0.0507067 0.0878266i
\(405\) 1950.32 0.239289
\(406\) 0 0
\(407\) 23.4317 0.00285372
\(408\) −4326.20 + 7493.19i −0.524948 + 0.909236i
\(409\) −1633.14 2828.67i −0.197441 0.341978i 0.750257 0.661146i \(-0.229930\pi\)
−0.947698 + 0.319168i \(0.896596\pi\)
\(410\) −2153.79 3730.48i −0.259435 0.449354i
\(411\) −639.626 + 1107.87i −0.0767651 + 0.132961i
\(412\) 22923.8 2.74120
\(413\) 0 0
\(414\) −7729.86 −0.917637
\(415\) −702.615 + 1216.96i −0.0831084 + 0.143948i
\(416\) 3442.56 + 5962.69i 0.405734 + 0.702752i
\(417\) 4897.35 + 8482.45i 0.575118 + 0.996133i
\(418\) 171.882 297.708i 0.0201124 0.0348358i
\(419\) −6822.93 −0.795518 −0.397759 0.917490i \(-0.630212\pi\)
−0.397759 + 0.917490i \(0.630212\pi\)
\(420\) 0 0
\(421\) 1431.63 0.165733 0.0828665 0.996561i \(-0.473592\pi\)
0.0828665 + 0.996561i \(0.473592\pi\)
\(422\) 1512.00 2618.87i 0.174415 0.302096i
\(423\) 2399.42 + 4155.91i 0.275801 + 0.477701i
\(424\) −1530.81 2651.44i −0.175336 0.303691i
\(425\) −3336.81 + 5779.52i −0.380844 + 0.659642i
\(426\) 7284.61 0.828499
\(427\) 0 0
\(428\) 10794.0 1.21904
\(429\) −50.8789 + 88.1248i −0.00572600 + 0.00991773i
\(430\) 12739.7 + 22065.8i 1.42875 + 2.47466i
\(431\) −7571.10 13113.5i −0.846141 1.46556i −0.884626 0.466301i \(-0.845586\pi\)
0.0384849 0.999259i \(-0.487747\pi\)
\(432\) −532.212 + 921.818i −0.0592733 + 0.102664i
\(433\) −5475.65 −0.607721 −0.303860 0.952717i \(-0.598276\pi\)
−0.303860 + 0.952717i \(0.598276\pi\)
\(434\) 0 0
\(435\) −413.214 −0.0455451
\(436\) 10153.5 17586.3i 1.11528 1.93172i
\(437\) 5609.10 + 9715.24i 0.614003 + 1.06348i
\(438\) 3806.86 + 6593.68i 0.415294 + 0.719311i
\(439\) −890.272 + 1542.00i −0.0967890 + 0.167643i −0.910354 0.413831i \(-0.864191\pi\)
0.813565 + 0.581474i \(0.197524\pi\)
\(440\) −225.052 −0.0243840
\(441\) 0 0
\(442\) 18647.8 2.00675
\(443\) 1629.82 2822.93i 0.174797 0.302757i −0.765294 0.643681i \(-0.777406\pi\)
0.940091 + 0.340924i \(0.110740\pi\)
\(444\) −646.221 1119.29i −0.0690728 0.119638i
\(445\) −10600.7 18361.0i −1.12926 1.95594i
\(446\) −5996.55 + 10386.3i −0.636648 + 1.10271i
\(447\) 5046.95 0.534033
\(448\) 0 0
\(449\) −6826.19 −0.717478 −0.358739 0.933438i \(-0.616793\pi\)
−0.358739 + 0.933438i \(0.616793\pi\)
\(450\) 1821.91 3155.64i 0.190857 0.330574i
\(451\) 28.6781 + 49.6719i 0.00299423 + 0.00518616i
\(452\) −2383.48 4128.30i −0.248029 0.429599i
\(453\) −4210.19 + 7292.26i −0.436671 + 0.756336i
\(454\) 18673.3 1.93036
\(455\) 0 0
\(456\) −6856.20 −0.704103
\(457\) −1850.01 + 3204.32i −0.189365 + 0.327991i −0.945039 0.326958i \(-0.893976\pi\)
0.755673 + 0.654949i \(0.227310\pi\)
\(458\) −9213.88 15958.9i −0.940035 1.62819i
\(459\) 8678.63 + 15031.8i 0.882536 + 1.52860i
\(460\) 10155.5 17589.8i 1.02935 1.78289i
\(461\) −9400.80 −0.949759 −0.474880 0.880051i \(-0.657508\pi\)
−0.474880 + 0.880051i \(0.657508\pi\)
\(462\) 0 0
\(463\) 15483.9 1.55420 0.777102 0.629374i \(-0.216689\pi\)
0.777102 + 0.629374i \(0.216689\pi\)
\(464\) 30.9161 53.5482i 0.00309319 0.00535757i
\(465\) −1980.79 3430.83i −0.197542 0.342153i
\(466\) 8846.28 + 15322.2i 0.879391 + 1.52315i
\(467\) 1102.81 1910.12i 0.109276 0.189272i −0.806201 0.591642i \(-0.798480\pi\)
0.915477 + 0.402370i \(0.131813\pi\)
\(468\) −6214.42 −0.613807
\(469\) 0 0
\(470\) −20659.4 −2.02755
\(471\) −2172.47 + 3762.83i −0.212531 + 0.368115i
\(472\) 966.839 + 1674.61i 0.0942847 + 0.163306i
\(473\) −169.631 293.809i −0.0164897 0.0285610i
\(474\) 8270.71 14325.3i 0.801448 1.38815i
\(475\) −5288.20 −0.510820
\(476\) 0 0
\(477\) −2115.54 −0.203069
\(478\) −12291.0 + 21288.6i −1.17610 + 2.03706i
\(479\) −1174.66 2034.57i −0.112049 0.194075i 0.804547 0.593889i \(-0.202408\pi\)
−0.916596 + 0.399814i \(0.869075\pi\)
\(480\) −4751.64 8230.08i −0.451837 0.782604i
\(481\) −503.603 + 872.266i −0.0477387 + 0.0826859i
\(482\) −7262.91 −0.686342
\(483\) 0 0
\(484\) −16670.6 −1.56561
\(485\) 3707.13 6420.93i 0.347076 0.601154i
\(486\) −7844.94 13587.8i −0.732209 1.26822i
\(487\) −5197.14 9001.72i −0.483583 0.837591i 0.516239 0.856445i \(-0.327332\pi\)
−0.999822 + 0.0188537i \(0.993998\pi\)
\(488\) 1237.25 2142.98i 0.114770 0.198788i
\(489\) −2587.21 −0.239259
\(490\) 0 0
\(491\) 12586.7 1.15689 0.578444 0.815722i \(-0.303660\pi\)
0.578444 + 0.815722i \(0.303660\pi\)
\(492\) 1581.82 2739.80i 0.144947 0.251056i
\(493\) −504.140 873.195i −0.0460554 0.0797703i
\(494\) 7388.30 + 12796.9i 0.672905 + 1.16551i
\(495\) −77.7543 + 134.674i −0.00706020 + 0.0122286i
\(496\) 592.799 0.0536642
\(497\) 0 0
\(498\) −1690.92 −0.152153
\(499\) −5313.97 + 9204.06i −0.476725 + 0.825712i −0.999644 0.0266703i \(-0.991510\pi\)
0.522919 + 0.852382i \(0.324843\pi\)
\(500\) −5769.48 9993.03i −0.516038 0.893804i
\(501\) −1347.73 2334.34i −0.120184 0.208165i
\(502\) −8622.59 + 14934.8i −0.766623 + 1.32783i
\(503\) −6719.02 −0.595599 −0.297800 0.954628i \(-0.596253\pi\)
−0.297800 + 0.954628i \(0.596253\pi\)
\(504\) 0 0
\(505\) 885.802 0.0780548
\(506\) −221.549 + 383.734i −0.0194645 + 0.0337136i
\(507\) 1745.12 + 3022.64i 0.152867 + 0.264774i
\(508\) −6004.65 10400.4i −0.524436 0.908350i
\(509\) −1952.17 + 3381.25i −0.169997 + 0.294443i −0.938418 0.345501i \(-0.887709\pi\)
0.768422 + 0.639944i \(0.221042\pi\)
\(510\) −25738.9 −2.23478
\(511\) 0 0
\(512\) 2607.89 0.225105
\(513\) −6876.99 + 11911.3i −0.591864 + 1.02514i
\(514\) −10397.5 18008.9i −0.892241 1.54541i
\(515\) 12328.9 + 21354.4i 1.05491 + 1.82716i
\(516\) −9356.47 + 16205.9i −0.798247 + 1.38260i
\(517\) 275.083 0.0234007
\(518\) 0 0
\(519\) −6654.89 −0.562846
\(520\) 4836.92 8377.79i 0.407909 0.706520i
\(521\) 7849.85 + 13596.3i 0.660092 + 1.14331i 0.980591 + 0.196064i \(0.0628162\pi\)
−0.320499 + 0.947249i \(0.603850\pi\)
\(522\) 275.262 + 476.768i 0.0230803 + 0.0399762i
\(523\) −5076.03 + 8791.95i −0.424397 + 0.735077i −0.996364 0.0851998i \(-0.972847\pi\)
0.571967 + 0.820277i \(0.306180\pi\)
\(524\) 14437.8 1.20366
\(525\) 0 0
\(526\) 3974.59 0.329469
\(527\) 4833.30 8371.53i 0.399510 0.691972i
\(528\) 10.5084 + 18.2012i 0.000866139 + 0.00150020i
\(529\) −1146.41 1985.65i −0.0942233 0.163200i
\(530\) 4553.80 7887.41i 0.373216 0.646428i
\(531\) 1336.15 0.109198
\(532\) 0 0
\(533\) −2465.44 −0.200357
\(534\) 12755.9 22093.9i 1.03371 1.79044i
\(535\) 5805.28 + 10055.0i 0.469129 + 0.812555i
\(536\) 8134.08 + 14088.6i 0.655483 + 1.13533i
\(537\) 935.741 1620.75i 0.0751959 0.130243i
\(538\) −27746.6 −2.22350
\(539\) 0 0
\(540\) 24902.1 1.98448
\(541\) 9923.32 17187.7i 0.788608 1.36591i −0.138212 0.990403i \(-0.544136\pi\)
0.926820 0.375506i \(-0.122531\pi\)
\(542\) 7906.28 + 13694.1i 0.626575 + 1.08526i
\(543\) −5192.83 8994.24i −0.410397 0.710829i
\(544\) 11594.4 20082.1i 0.913799 1.58275i
\(545\) 21843.0 1.71679
\(546\) 0 0
\(547\) −22798.9 −1.78210 −0.891052 0.453901i \(-0.850032\pi\)
−0.891052 + 0.453901i \(0.850032\pi\)
\(548\) −2239.17 + 3878.36i −0.174549 + 0.302327i
\(549\) −854.927 1480.78i −0.0664616 0.115115i
\(550\) −104.437 180.890i −0.00809675 0.0140240i
\(551\) 399.483 691.924i 0.0308866 0.0534972i
\(552\) 8837.38 0.681420
\(553\) 0 0
\(554\) −22164.9 −1.69981
\(555\) 695.105 1203.96i 0.0531632 0.0920813i
\(556\) 17144.4 + 29694.9i 1.30770 + 2.26501i
\(557\) 8999.13 + 15586.9i 0.684570 + 1.18571i 0.973572 + 0.228381i \(0.0733432\pi\)
−0.289002 + 0.957328i \(0.593323\pi\)
\(558\) −2639.00 + 4570.89i −0.200211 + 0.346776i
\(559\) 14583.1 1.10340
\(560\) 0 0
\(561\) 342.717 0.0257923
\(562\) −15665.2 + 27132.8i −1.17579 + 2.03653i
\(563\) −97.8182 169.426i −0.00732246 0.0126829i 0.862341 0.506328i \(-0.168998\pi\)
−0.869663 + 0.493645i \(0.835664\pi\)
\(564\) −7586.50 13140.2i −0.566400 0.981033i
\(565\) 2563.77 4440.59i 0.190901 0.330649i
\(566\) 16130.1 1.19788
\(567\) 0 0
\(568\) 9221.11 0.681178
\(569\) 9830.21 17026.4i 0.724260 1.25445i −0.235018 0.971991i \(-0.575515\pi\)
0.959278 0.282464i \(-0.0911517\pi\)
\(570\) −10197.8 17663.1i −0.749366 1.29794i
\(571\) 7882.25 + 13652.5i 0.577691 + 1.00059i 0.995743 + 0.0921678i \(0.0293796\pi\)
−0.418052 + 0.908423i \(0.637287\pi\)
\(572\) −178.114 + 308.503i −0.0130198 + 0.0225510i
\(573\) 9322.42 0.679668
\(574\) 0 0
\(575\) 6816.30 0.494364
\(576\) −5920.89 + 10255.3i −0.428305 + 0.741847i
\(577\) −11153.2 19317.9i −0.804704 1.39379i −0.916490 0.400057i \(-0.868990\pi\)
0.111786 0.993732i \(-0.464343\pi\)
\(578\) −20271.8 35111.8i −1.45882 2.52675i
\(579\) −1210.33 + 2096.35i −0.0868732 + 0.150469i
\(580\) −1446.56 −0.103560
\(581\) 0 0
\(582\) 8921.62 0.635418
\(583\) −60.6344 + 105.022i −0.00430741 + 0.00746066i
\(584\) 4818.86 + 8346.51i 0.341448 + 0.591406i
\(585\) −3342.25 5788.96i −0.236214 0.409135i
\(586\) −7442.63 + 12891.0i −0.524662 + 0.908742i
\(587\) −15953.2 −1.12173 −0.560866 0.827906i \(-0.689532\pi\)
−0.560866 + 0.827906i \(0.689532\pi\)
\(588\) 0 0
\(589\) 7659.87 0.535856
\(590\) −2876.12 + 4981.59i −0.200692 + 0.347608i
\(591\) 6597.11 + 11426.5i 0.459169 + 0.795304i
\(592\) 104.013 + 180.157i 0.00722116 + 0.0125074i
\(593\) 1577.84 2732.90i 0.109265 0.189253i −0.806208 0.591633i \(-0.798484\pi\)
0.915473 + 0.402380i \(0.131817\pi\)
\(594\) −543.257 −0.0375254
\(595\) 0 0
\(596\) 17668.1 1.21429
\(597\) 1431.47 2479.37i 0.0981341 0.169973i
\(598\) −9523.24 16494.7i −0.651228 1.12796i
\(599\) −12728.2 22045.8i −0.868212 1.50379i −0.863823 0.503796i \(-0.831936\pi\)
−0.00438889 0.999990i \(-0.501397\pi\)
\(600\) −2082.95 + 3607.78i −0.141727 + 0.245478i
\(601\) 5580.96 0.378789 0.189395 0.981901i \(-0.439347\pi\)
0.189395 + 0.981901i \(0.439347\pi\)
\(602\) 0 0
\(603\) 11241.1 0.759160
\(604\) −14738.8 + 25528.4i −0.992903 + 1.71976i
\(605\) −8965.85 15529.3i −0.602502 1.04356i
\(606\) 532.945 + 923.089i 0.0357251 + 0.0618777i
\(607\) −190.566 + 330.071i −0.0127427 + 0.0220711i −0.872326 0.488924i \(-0.837390\pi\)
0.859584 + 0.510995i \(0.170723\pi\)
\(608\) 18374.9 1.22566
\(609\) 0 0
\(610\) 7361.07 0.488592
\(611\) −5912.20 + 10240.2i −0.391460 + 0.678028i
\(612\) 10465.0 + 18125.9i 0.691211 + 1.19721i
\(613\) 4117.99 + 7132.57i 0.271328 + 0.469954i 0.969202 0.246266i \(-0.0792038\pi\)
−0.697874 + 0.716220i \(0.745871\pi\)
\(614\) 20604.5 35688.1i 1.35428 2.34569i
\(615\) 3402.96 0.223123
\(616\) 0 0
\(617\) −27419.8 −1.78911 −0.894555 0.446958i \(-0.852507\pi\)
−0.894555 + 0.446958i \(0.852507\pi\)
\(618\) −14835.5 + 25695.8i −0.965649 + 1.67255i
\(619\) 8186.69 + 14179.8i 0.531585 + 0.920732i 0.999320 + 0.0368632i \(0.0117366\pi\)
−0.467736 + 0.883868i \(0.654930\pi\)
\(620\) −6934.25 12010.5i −0.449171 0.777987i
\(621\) 8864.18 15353.2i 0.572798 0.992115i
\(622\) −36987.9 −2.38437
\(623\) 0 0
\(624\) −903.407 −0.0579571
\(625\) 9748.72 16885.3i 0.623918 1.08066i
\(626\) −6750.51 11692.2i −0.430998 0.746510i
\(627\) 135.785 + 235.187i 0.00864870 + 0.0149800i
\(628\) −7605.28 + 13172.7i −0.483254 + 0.837021i
\(629\) 3392.24 0.215035
\(630\) 0 0
\(631\) 4059.60 0.256118 0.128059 0.991767i \(-0.459125\pi\)
0.128059 + 0.991767i \(0.459125\pi\)
\(632\) 10469.4 18133.5i 0.658938 1.14131i
\(633\) 1194.47 + 2068.89i 0.0750016 + 0.129906i
\(634\) 8808.76 + 15257.2i 0.551799 + 0.955744i
\(635\) 6458.88 11187.1i 0.403642 0.699129i
\(636\) 6688.94 0.417034
\(637\) 0 0
\(638\) 31.5577 0.00195827
\(639\) 3185.84 5518.04i 0.197230 0.341612i
\(640\) −14870.5 25756.4i −0.918449 1.59080i
\(641\) 3194.32 + 5532.72i 0.196830 + 0.340919i 0.947499 0.319759i \(-0.103602\pi\)
−0.750669 + 0.660678i \(0.770269\pi\)
\(642\) −6985.53 + 12099.3i −0.429434 + 0.743802i
\(643\) −18308.0 −1.12286 −0.561428 0.827525i \(-0.689748\pi\)
−0.561428 + 0.827525i \(0.689748\pi\)
\(644\) 0 0
\(645\) −20128.5 −1.22877
\(646\) 24883.5 43099.5i 1.51553 2.62497i
\(647\) −1651.95 2861.26i −0.100379 0.173861i 0.811462 0.584405i \(-0.198672\pi\)
−0.911841 + 0.410544i \(0.865339\pi\)
\(648\) 1485.35 + 2572.70i 0.0900465 + 0.155965i
\(649\) 38.2960 66.3306i 0.00231625 0.00401187i
\(650\) 8978.42 0.541789
\(651\) 0 0
\(652\) −9057.18 −0.544028
\(653\) −2185.63 + 3785.63i −0.130981 + 0.226865i −0.924055 0.382260i \(-0.875146\pi\)
0.793074 + 0.609125i \(0.208479\pi\)
\(654\) 13141.9 + 22762.5i 0.785765 + 1.36099i
\(655\) 7765.00 + 13449.4i 0.463211 + 0.802306i
\(656\) −254.604 + 440.988i −0.0151534 + 0.0262465i
\(657\) 6659.55 0.395455
\(658\) 0 0
\(659\) 6259.75 0.370023 0.185012 0.982736i \(-0.440768\pi\)
0.185012 + 0.982736i \(0.440768\pi\)
\(660\) 245.844 425.815i 0.0144992 0.0251134i
\(661\) 7422.87 + 12856.8i 0.436787 + 0.756537i 0.997440 0.0715138i \(-0.0227830\pi\)
−0.560653 + 0.828051i \(0.689450\pi\)
\(662\) 11085.5 + 19200.6i 0.650830 + 1.12727i
\(663\) −7365.80 + 12757.9i −0.431469 + 0.747327i
\(664\) −2140.43 −0.125098
\(665\) 0 0
\(666\) −1852.17 −0.107763
\(667\) −514.918 + 891.864i −0.0298916 + 0.0517738i
\(668\) −4718.07 8171.94i −0.273275 0.473326i
\(669\) −4737.23 8205.12i −0.273770 0.474183i
\(670\) −24197.0 + 41910.4i −1.39524 + 2.41663i
\(671\) −98.0138 −0.00563902
\(672\) 0 0
\(673\) 9409.13 0.538923 0.269462 0.963011i \(-0.413154\pi\)
0.269462 + 0.963011i \(0.413154\pi\)
\(674\) 3901.52 6757.64i 0.222969 0.386194i
\(675\) 4178.53 + 7237.43i 0.238269 + 0.412695i
\(676\) 6109.24 + 10581.5i 0.347590 + 0.602044i
\(677\) −1475.32 + 2555.32i −0.0837533 + 0.145065i −0.904859 0.425711i \(-0.860024\pi\)
0.821106 + 0.570776i \(0.193357\pi\)
\(678\) 6170.01 0.349495
\(679\) 0 0
\(680\) −32581.1 −1.83740
\(681\) −7375.88 + 12775.4i −0.415043 + 0.718876i
\(682\) 151.275 + 262.016i 0.00849359 + 0.0147113i
\(683\) −3140.42 5439.38i −0.175937 0.304732i 0.764548 0.644567i \(-0.222962\pi\)
−0.940485 + 0.339835i \(0.889629\pi\)
\(684\) −8292.49 + 14363.0i −0.463555 + 0.802900i
\(685\) −4817.11 −0.268689
\(686\) 0 0
\(687\) 14557.8 0.808463
\(688\) 1505.98 2608.44i 0.0834521 0.144543i
\(689\) −2606.36 4514.35i −0.144114 0.249612i
\(690\) 13144.6 + 22767.1i 0.725225 + 1.25613i
\(691\) −16381.6 + 28373.8i −0.901861 + 1.56207i −0.0767837 + 0.997048i \(0.524465\pi\)
−0.825077 + 0.565021i \(0.808868\pi\)
\(692\) −23297.1 −1.27980
\(693\) 0 0
\(694\) −1078.67 −0.0589998
\(695\) −18441.3 + 31941.2i −1.00650 + 1.74331i
\(696\) −314.701 545.079i −0.0171390 0.0296856i
\(697\) 4151.76 + 7191.06i 0.225623 + 0.390791i
\(698\) 22775.9 39449.1i 1.23507 2.13921i
\(699\) −13977.0 −0.756306
\(700\) 0 0
\(701\) −1775.97 −0.0956883 −0.0478442 0.998855i \(-0.515235\pi\)
−0.0478442 + 0.998855i \(0.515235\pi\)
\(702\) 11675.9 20223.2i 0.627747 1.08729i
\(703\) 1344.01 + 2327.90i 0.0721058 + 0.124891i
\(704\) 339.403 + 587.863i 0.0181701 + 0.0314715i
\(705\) 8160.39 14134.2i 0.435940 0.755071i
\(706\) −15723.7 −0.838203
\(707\) 0 0
\(708\) −4224.65 −0.224254
\(709\) −4431.22 + 7675.09i −0.234722 + 0.406550i −0.959192 0.282756i \(-0.908751\pi\)
0.724470 + 0.689306i \(0.242085\pi\)
\(710\) 13715.3 + 23755.6i 0.724968 + 1.25568i
\(711\) −7234.21 12530.0i −0.381581 0.660917i
\(712\) 16146.9 27967.3i 0.849903 1.47207i
\(713\) −9873.28 −0.518594
\(714\) 0 0
\(715\) −383.175 −0.0200419
\(716\) 3275.79 5673.84i 0.170981 0.296147i
\(717\) −9709.76 16817.8i −0.505743 0.875973i
\(718\) −3188.87 5523.29i −0.165749 0.287085i
\(719\) −13749.6 + 23815.0i −0.713177 + 1.23526i 0.250481 + 0.968121i \(0.419411\pi\)
−0.963658 + 0.267138i \(0.913922\pi\)
\(720\) −1380.61 −0.0714614
\(721\) 0 0
\(722\) 8356.64 0.430750
\(723\) 2868.82 4968.95i 0.147569 0.255598i
\(724\) −18178.8 31486.6i −0.933162 1.61628i
\(725\) −242.730 420.421i −0.0124342 0.0215366i
\(726\) 10788.7 18686.5i 0.551522 0.955264i
\(727\) 25434.9 1.29756 0.648781 0.760975i \(-0.275279\pi\)
0.648781 + 0.760975i \(0.275279\pi\)
\(728\) 0 0
\(729\) 16301.6 0.828206
\(730\) −14335.0 + 24828.9i −0.726797 + 1.25885i
\(731\) −24557.6 42535.1i −1.24254 2.15214i
\(732\) 2703.12 + 4681.94i 0.136489 + 0.236406i
\(733\) 12077.8 20919.4i 0.608600 1.05413i −0.382871 0.923802i \(-0.625065\pi\)
0.991471 0.130325i \(-0.0416020\pi\)
\(734\) 50445.2 2.53674
\(735\) 0 0
\(736\) −23684.6 −1.18618
\(737\) 322.187 558.043i 0.0161030 0.0278912i
\(738\) −2266.88 3926.35i −0.113069 0.195841i
\(739\) −13756.4 23826.9i −0.684762 1.18604i −0.973512 0.228638i \(-0.926573\pi\)
0.288750 0.957405i \(-0.406760\pi\)
\(740\) 2433.39 4214.75i 0.120883 0.209375i
\(741\) −11673.4 −0.578722
\(742\) 0 0
\(743\) 5995.09 0.296014 0.148007 0.988986i \(-0.452714\pi\)
0.148007 + 0.988986i \(0.452714\pi\)
\(744\) 3017.12 5225.80i 0.148673 0.257509i
\(745\) 9502.31 + 16458.5i 0.467299 + 0.809386i
\(746\) −20448.8 35418.4i −1.00360 1.73829i
\(747\) −739.506 + 1280.86i −0.0362210 + 0.0627366i
\(748\) 1199.76 0.0586467
\(749\) 0 0
\(750\) 14935.2 0.727144
\(751\) −772.544 + 1338.09i −0.0375373 + 0.0650166i −0.884184 0.467139i \(-0.845285\pi\)
0.846646 + 0.532156i \(0.178618\pi\)
\(752\) 1221.10 + 2115.00i 0.0592138 + 0.102561i
\(753\) −6811.78 11798.3i −0.329661 0.570990i
\(754\) −678.250 + 1174.76i −0.0327591 + 0.0567405i
\(755\) −31707.5 −1.52841
\(756\) 0 0
\(757\) −5157.82 −0.247641 −0.123820 0.992305i \(-0.539515\pi\)
−0.123820 + 0.992305i \(0.539515\pi\)
\(758\) 13266.6 22978.4i 0.635704 1.10107i
\(759\) −175.022 303.147i −0.00837008 0.0144974i
\(760\) −12908.7 22358.6i −0.616117 1.06715i
\(761\) 1644.98 2849.19i 0.0783581 0.135720i −0.824184 0.566323i \(-0.808366\pi\)
0.902542 + 0.430602i \(0.141699\pi\)
\(762\) 15544.0 0.738977
\(763\) 0 0
\(764\) 32635.4 1.54543
\(765\) −11256.6 + 19497.0i −0.532004 + 0.921458i
\(766\) 17644.3 + 30560.8i 0.832264 + 1.44152i
\(767\) 1646.14 + 2851.21i 0.0774952 + 0.134226i
\(768\) 5942.23 10292.2i 0.279195 0.483580i
\(769\) −11146.5 −0.522697 −0.261348 0.965245i \(-0.584167\pi\)
−0.261348 + 0.965245i \(0.584167\pi\)
\(770\) 0 0
\(771\) 16427.8 0.767358
\(772\) −4237.06 + 7338.80i −0.197533 + 0.342136i
\(773\) 7915.11 + 13709.4i 0.368288 + 0.637894i 0.989298 0.145909i \(-0.0466107\pi\)
−0.621010 + 0.783803i \(0.713277\pi\)
\(774\) 13408.6 + 23224.3i 0.622689 + 1.07853i
\(775\) 2327.11 4030.67i 0.107861 0.186821i
\(776\) 11293.3 0.522430
\(777\) 0 0
\(778\) −17282.0 −0.796386
\(779\) −3289.88 + 5698.23i −0.151312 + 0.262080i
\(780\) 10567.6 + 18303.6i 0.485102 + 0.840222i
\(781\) −182.622 316.310i −0.00836711 0.0144923i
\(782\) −32073.9 + 55553.7i −1.46670 + 2.54040i
\(783\) −1262.62 −0.0576277
\(784\) 0 0
\(785\) −16361.2 −0.743892
\(786\) −9343.67 + 16183.7i −0.424018 + 0.734420i
\(787\) 7581.72 + 13131.9i 0.343404 + 0.594794i 0.985063 0.172197i \(-0.0550865\pi\)
−0.641658 + 0.766991i \(0.721753\pi\)
\(788\) 23094.8 + 40001.4i 1.04406 + 1.80836i
\(789\) −1569.95 + 2719.23i −0.0708386 + 0.122696i
\(790\) 62287.8 2.80519
\(791\) 0 0
\(792\) −236.869 −0.0106272
\(793\) 2106.55 3648.65i 0.0943327 0.163389i
\(794\) 23030.1 + 39889.3i 1.02935 + 1.78289i
\(795\) 3597.46 + 6230.99i 0.160489 + 0.277975i
\(796\) 5011.21 8679.66i 0.223138 0.386486i
\(797\) 29398.3 1.30658 0.653289 0.757109i \(-0.273389\pi\)
0.653289 + 0.757109i \(0.273389\pi\)
\(798\) 0 0
\(799\) 39824.1 1.76330
\(800\) 5582.41 9669.02i 0.246710 0.427314i
\(801\) −11157.3 19325.1i −0.492166 0.852456i
\(802\) −26059.8 45136.8i −1.14738 1.98733i
\(803\) 190.872 330.601i 0.00838822 0.0145288i
\(804\) −35542.3 −1.55905
\(805\) 0 0
\(806\) −13005.1 −0.568343
\(807\) 10959.8 18982.9i 0.478071 0.828043i
\(808\) 674.621 + 1168.48i 0.0293726 + 0.0508749i
\(809\) 10356.4 + 17937.9i 0.450078 + 0.779557i 0.998390 0.0567160i \(-0.0180630\pi\)
−0.548313 + 0.836273i \(0.684730\pi\)
\(810\) −4418.57 + 7653.19i −0.191670 + 0.331982i
\(811\) 27369.9 1.18506 0.592532 0.805547i \(-0.298128\pi\)
0.592532 + 0.805547i \(0.298128\pi\)
\(812\) 0 0
\(813\) −12491.8 −0.538876
\(814\) −53.0860 + 91.9476i −0.00228583 + 0.00395917i
\(815\) −4871.16 8437.09i −0.209361 0.362624i
\(816\) 1521.32 + 2635.01i 0.0652658 + 0.113044i
\(817\) 19459.6 33705.0i 0.833299 1.44332i
\(818\) 14799.9 0.632600
\(819\) 0 0
\(820\) 11912.9 0.507338
\(821\) 17681.3 30625.0i 0.751623 1.30185i −0.195412 0.980721i \(-0.562604\pi\)
0.947036 0.321129i \(-0.104062\pi\)
\(822\) −2898.23 5019.88i −0.122977 0.213003i
\(823\) 14595.2 + 25279.6i 0.618174 + 1.07071i 0.989819 + 0.142333i \(0.0454605\pi\)
−0.371645 + 0.928375i \(0.621206\pi\)
\(824\) −18779.3 + 32526.7i −0.793941 + 1.37515i
\(825\) 165.009 0.00696349
\(826\) 0 0
\(827\) −7302.08 −0.307035 −0.153518 0.988146i \(-0.549060\pi\)
−0.153518 + 0.988146i \(0.549060\pi\)
\(828\) 10688.7 18513.4i 0.448621 0.777035i
\(829\) −2125.38 3681.27i −0.0890442 0.154229i 0.818063 0.575128i \(-0.195048\pi\)
−0.907107 + 0.420899i \(0.861715\pi\)
\(830\) −3183.64 5514.22i −0.133139 0.230604i
\(831\) 8755.05 15164.2i 0.365475 0.633021i
\(832\) −29178.3 −1.21584
\(833\) 0 0
\(834\) −44381.0 −1.84267
\(835\) 5074.97 8790.11i 0.210331 0.364305i
\(836\) 475.350 + 823.330i 0.0196654 + 0.0340615i
\(837\) −6052.53 10483.3i −0.249947 0.432922i
\(838\) 15457.8 26773.7i 0.637208 1.10368i
\(839\) −39527.7 −1.62652 −0.813258 0.581903i \(-0.802308\pi\)
−0.813258 + 0.581903i \(0.802308\pi\)
\(840\) 0 0
\(841\) −24315.7 −0.996993
\(842\) −3243.46 + 5617.84i −0.132752 + 0.229933i
\(843\) −12375.3 21434.7i −0.505611 0.875743i
\(844\) 4181.54 + 7242.65i 0.170539 + 0.295382i
\(845\) −6571.38 + 11382.0i −0.267529 + 0.463374i
\(846\) −21744.1 −0.883663
\(847\) 0 0
\(848\) −1076.63 −0.0435985
\(849\) −6371.34 + 11035.5i −0.257555 + 0.446098i
\(850\) −15119.5 26187.7i −0.610111 1.05674i
\(851\) −1732.38 3000.57i −0.0697829 0.120868i
\(852\) −10073.0 + 17447.0i −0.405042 + 0.701554i
\(853\) 31656.1 1.27067 0.635337 0.772235i \(-0.280861\pi\)
0.635337 + 0.772235i \(0.280861\pi\)
\(854\) 0 0
\(855\) −17839.6 −0.713568
\(856\) −8842.53 + 15315.7i −0.353074 + 0.611542i
\(857\) −596.579 1033.31i −0.0237792 0.0411867i 0.853891 0.520452i \(-0.174237\pi\)
−0.877670 + 0.479265i \(0.840903\pi\)
\(858\) −230.539 399.305i −0.00917303 0.0158882i
\(859\) −14530.0 + 25166.7i −0.577134 + 0.999625i 0.418673 + 0.908137i \(0.362495\pi\)
−0.995806 + 0.0914874i \(0.970838\pi\)
\(860\) −70464.8 −2.79399
\(861\) 0 0
\(862\) 68611.2 2.71103
\(863\) −11531.5 + 19973.1i −0.454851 + 0.787825i −0.998680 0.0513711i \(-0.983641\pi\)
0.543828 + 0.839196i \(0.316974\pi\)
\(864\) −14519.2 25147.9i −0.571704 0.990220i
\(865\) −12529.7 21702.1i −0.492512 0.853056i
\(866\) 12405.4 21486.9i 0.486783 0.843133i
\(867\) 32029.2 1.25463
\(868\) 0 0
\(869\) −829.371 −0.0323757
\(870\) 936.163 1621.48i 0.0364815 0.0631878i
\(871\) 13849.1 + 23987.4i 0.538760 + 0.933159i
\(872\) 16635.5 + 28813.6i 0.646044 + 1.11898i
\(873\) 3901.77 6758.06i 0.151266 0.262000i
\(874\) −50831.1 −1.96726
\(875\) 0 0
\(876\) −21056.2 −0.812129
\(877\) −16935.5 + 29333.2i −0.652077 + 1.12943i 0.330541 + 0.943792i \(0.392769\pi\)
−0.982618 + 0.185639i \(0.940565\pi\)
\(878\) −4033.94 6986.98i −0.155056 0.268564i
\(879\) −5879.62 10183.8i −0.225614 0.390775i
\(880\) −39.5702 + 68.5377i −0.00151581 + 0.00262546i
\(881\) −43331.1 −1.65705 −0.828525 0.559953i \(-0.810819\pi\)
−0.828525 + 0.559953i \(0.810819\pi\)
\(882\) 0 0
\(883\) −40897.3 −1.55867 −0.779334 0.626609i \(-0.784442\pi\)
−0.779334 + 0.626609i \(0.784442\pi\)
\(884\) −25785.8 + 44662.4i −0.981076 + 1.69927i
\(885\) −2272.11 3935.42i −0.0863008 0.149477i
\(886\) 7384.91 + 12791.0i 0.280024 + 0.485015i
\(887\) 22532.9 39028.1i 0.852965 1.47738i −0.0255550 0.999673i \(-0.508135\pi\)
0.878520 0.477705i \(-0.158531\pi\)
\(888\) 2117.55 0.0800229
\(889\) 0 0
\(890\) 96066.5 3.61816
\(891\) 58.8339 101.903i 0.00221213 0.00383153i
\(892\) −16583.9 28724.1i −0.622498 1.07820i
\(893\) 15778.4 + 27329.0i 0.591271 + 1.02411i
\(894\) −11434.2 + 19804.6i −0.427759 + 0.740901i
\(895\) 7047.19 0.263197
\(896\) 0 0
\(897\) 15046.6 0.560078
\(898\) 15465.2 26786.5i 0.574699 0.995407i
\(899\) 351.590 + 608.972i 0.0130436 + 0.0225922i
\(900\) 5038.61 + 8727.13i 0.186615 + 0.323227i
\(901\) −8778.13 + 15204.2i −0.324575 + 0.562180i
\(902\) −259.888 −0.00959349
\(903\) 0 0
\(904\) 7810.22 0.287350
\(905\) 19553.9 33868.4i 0.718226 1.24400i
\(906\) −19076.9 33042.1i −0.699545 1.21165i
\(907\) −12641.2 21895.3i −0.462785 0.801567i 0.536314 0.844019i \(-0.319816\pi\)
−0.999099 + 0.0424520i \(0.986483\pi\)
\(908\) −25821.1 + 44723.5i −0.943726 + 1.63458i
\(909\) 932.311 0.0340185
\(910\) 0 0
\(911\) −41646.1 −1.51460 −0.757298 0.653070i \(-0.773481\pi\)
−0.757298 + 0.653070i \(0.773481\pi\)
\(912\) −1205.50 + 2087.99i −0.0437699 + 0.0758117i
\(913\) 42.3906 + 73.4227i 0.00153661 + 0.00266149i
\(914\) −8382.65 14519.2i −0.303363 0.525440i
\(915\) −2907.60 + 5036.10i −0.105052 + 0.181955i
\(916\) 50963.1 1.83829
\(917\) 0 0
\(918\) −78648.0 −2.82764
\(919\) 13056.2 22614.1i 0.468646 0.811719i −0.530712 0.847552i \(-0.678075\pi\)
0.999358 + 0.0358337i \(0.0114087\pi\)
\(920\) 16638.9 + 28819.4i 0.596269 + 1.03277i
\(921\) 16277.4 + 28193.3i 0.582366 + 1.00869i
\(922\) 21298.1 36889.4i 0.760755 1.31767i
\(923\) 15699.9 0.559879
\(924\) 0 0
\(925\) 1633.27 0.0580559
\(926\) −35079.7 + 60759.9i −1.24491 + 2.15626i
\(927\) 12976.3 + 22475.6i 0.459759 + 0.796326i
\(928\) 843.415 + 1460.84i 0.0298345 + 0.0516749i
\(929\) −16178.5 + 28022.0i −0.571366 + 0.989636i 0.425060 + 0.905165i \(0.360253\pi\)
−0.996426 + 0.0844704i \(0.973080\pi\)
\(930\) 17950.4 0.632922
\(931\) 0 0
\(932\) −48929.9 −1.71969
\(933\) 14610.1 25305.4i 0.512660 0.887954i
\(934\) 4996.97 + 8655.01i 0.175060 + 0.303213i
\(935\) 645.261 + 1117.62i 0.0225693 + 0.0390911i
\(936\) 5090.88 8817.67i 0.177779 0.307921i
\(937\) 32947.0 1.14870 0.574350 0.818610i \(-0.305255\pi\)
0.574350 + 0.818610i \(0.305255\pi\)
\(938\) 0 0
\(939\) 10665.7 0.370673
\(940\) 28567.5 49480.3i 0.991243 1.71688i
\(941\) 250.801 + 434.400i 0.00868849 + 0.0150489i 0.870337 0.492457i \(-0.163901\pi\)
−0.861648 + 0.507506i \(0.830568\pi\)
\(942\) −9843.75 17049.9i −0.340474 0.589719i
\(943\) 4240.53 7344.81i 0.146438 0.253637i
\(944\) 679.984 0.0234445
\(945\) 0 0
\(946\) 1537.24 0.0528328
\(947\) 3218.45 5574.52i 0.110439 0.191286i −0.805508 0.592584i \(-0.798108\pi\)
0.915947 + 0.401299i \(0.131441\pi\)
\(948\) 22873.2 + 39617.5i 0.783636 + 1.35730i
\(949\) 8204.61 + 14210.8i 0.280646 + 0.486093i
\(950\) 11980.8 20751.3i 0.409166 0.708696i
\(951\) −13917.7 −0.474566
\(952\) 0 0
\(953\) 47511.2 1.61494 0.807470 0.589908i \(-0.200836\pi\)
0.807470 + 0.589908i \(0.200836\pi\)
\(954\) 4792.89 8301.54i 0.162658 0.281732i
\(955\) 17552.1 + 30401.1i 0.594735 + 1.03011i
\(956\) −33991.4 58874.9i −1.14996 1.99179i
\(957\) −12.4651 + 21.5903i −0.000421046 + 0.000729273i
\(958\) 10645.1 0.359004
\(959\) 0 0
\(960\) 40273.8 1.35399
\(961\) 11524.7 19961.4i 0.386853 0.670048i
\(962\) −2281.89 3952.35i −0.0764773 0.132462i
\(963\) 6110.08 + 10583.0i 0.204460 + 0.354135i
\(964\) 10043.0 17395.0i 0.335544 0.581179i
\(965\) −9115.15 −0.304069
\(966\) 0 0
\(967\) 7817.32 0.259967 0.129984 0.991516i \(-0.458508\pi\)
0.129984 + 0.991516i \(0.458508\pi\)
\(968\) 13656.7 23654.1i 0.453453 0.785403i
\(969\) 19657.8 + 34048.3i 0.651702 + 1.12878i
\(970\) 16797.5 + 29094.1i 0.556015 + 0.963046i
\(971\) −751.748 + 1302.07i −0.0248453 + 0.0430332i −0.878181 0.478329i \(-0.841243\pi\)
0.853335 + 0.521362i \(0.174576\pi\)
\(972\) 43391.4 1.43187
\(973\) 0 0
\(974\) 47097.9 1.54940
\(975\) −3546.44 + 6142.62i −0.116489 + 0.201765i
\(976\) −435.084 753.587i −0.0142692 0.0247149i
\(977\) −16694.6 28915.8i −0.546680 0.946877i −0.998499 0.0547675i \(-0.982558\pi\)
0.451819 0.892109i \(-0.350775\pi\)
\(978\) 5861.50 10152.4i 0.191646 0.331941i
\(979\) −1279.14 −0.0417584
\(980\) 0 0
\(981\) 22989.9 0.748228
\(982\) −28516.1 + 49391.3i −0.926665 + 1.60503i
\(983\) 2725.51 + 4720.73i 0.0884337 + 0.153172i 0.906849 0.421455i \(-0.138481\pi\)
−0.818416 + 0.574627i \(0.805147\pi\)
\(984\) 2591.67 + 4488.91i 0.0839630 + 0.145428i
\(985\) −24841.8 + 43027.3i −0.803581 + 1.39184i
\(986\) 4568.64 0.147561
\(987\) 0 0
\(988\) −40865.6 −1.31590
\(989\) −25082.7 + 43444.5i −0.806454 + 1.39682i
\(990\) −352.315 610.227i −0.0113104 0.0195902i
\(991\) 23265.0 + 40296.2i 0.745750 + 1.29168i 0.949844 + 0.312725i \(0.101242\pi\)
−0.204094 + 0.978951i \(0.565425\pi\)
\(992\) −8086.02 + 14005.4i −0.258802 + 0.448258i
\(993\) −17514.9 −0.559736
\(994\) 0 0
\(995\) 10780.6 0.343484
\(996\) 2338.18 4049.84i 0.0743855 0.128840i
\(997\) −5704.98 9881.31i −0.181222 0.313886i 0.761075 0.648664i \(-0.224672\pi\)
−0.942297 + 0.334778i \(0.891339\pi\)
\(998\) −24078.3 41704.8i −0.763711 1.32279i
\(999\) 2123.97 3678.83i 0.0672668 0.116509i
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 49.4.c.e.30.1 8
3.2 odd 2 441.4.e.y.226.3 8
7.2 even 3 49.4.a.e.1.4 yes 4
7.3 odd 6 inner 49.4.c.e.18.2 8
7.4 even 3 inner 49.4.c.e.18.1 8
7.5 odd 6 49.4.a.e.1.3 4
7.6 odd 2 inner 49.4.c.e.30.2 8
21.2 odd 6 441.4.a.u.1.2 4
21.5 even 6 441.4.a.u.1.1 4
21.11 odd 6 441.4.e.y.361.3 8
21.17 even 6 441.4.e.y.361.4 8
21.20 even 2 441.4.e.y.226.4 8
28.19 even 6 784.4.a.bf.1.3 4
28.23 odd 6 784.4.a.bf.1.2 4
35.9 even 6 1225.4.a.bb.1.1 4
35.19 odd 6 1225.4.a.bb.1.2 4
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
49.4.a.e.1.3 4 7.5 odd 6
49.4.a.e.1.4 yes 4 7.2 even 3
49.4.c.e.18.1 8 7.4 even 3 inner
49.4.c.e.18.2 8 7.3 odd 6 inner
49.4.c.e.30.1 8 1.1 even 1 trivial
49.4.c.e.30.2 8 7.6 odd 2 inner
441.4.a.u.1.1 4 21.5 even 6
441.4.a.u.1.2 4 21.2 odd 6
441.4.e.y.226.3 8 3.2 odd 2
441.4.e.y.226.4 8 21.20 even 2
441.4.e.y.361.3 8 21.11 odd 6
441.4.e.y.361.4 8 21.17 even 6
784.4.a.bf.1.2 4 28.23 odd 6
784.4.a.bf.1.3 4 28.19 even 6
1225.4.a.bb.1.1 4 35.9 even 6
1225.4.a.bb.1.2 4 35.19 odd 6