Properties

Label 147.4.c.a.146.8
Level $147$
Weight $4$
Character 147.146
Analytic conductor $8.673$
Analytic rank $0$
Dimension $12$
CM no
Inner twists $4$

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Newspace parameters

Level: \( N \) \(=\) \( 147 = 3 \cdot 7^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 147.c (of order \(2\), degree \(1\), minimal)

Newform invariants

Self dual: no
Analytic conductor: \(8.67328077084\)
Analytic rank: \(0\)
Dimension: \(12\)
Coefficient field: \(\mathbb{Q}[x]/(x^{12} - \cdots)\)
Defining polynomial: \(x^{12} - x^{11} - 29 x^{9} + 6 x^{8} - 49 x^{7} + 1564 x^{6} - 441 x^{5} + 486 x^{4} - 21141 x^{3} - 59049 x + 531441\)
Coefficient ring: \(\Z[a_1, \ldots, a_{13}]\)
Coefficient ring index: \( 2^{6}\cdot 3^{3} \)
Twist minimal: no (minimal twist has level 21)
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 146.8
Root \(2.85284 - 0.928053i\) of defining polynomial
Character \(\chi\) \(=\) 147.146
Dual form 147.4.c.a.146.6

$q$-expansion

\(f(q)\) \(=\) \(q+1.90883i q^{2} +(5.08298 - 1.07856i) q^{3} +4.35636 q^{4} -1.24741 q^{5} +(2.05878 + 9.70256i) q^{6} +23.5862i q^{8} +(24.6734 - 10.9646i) q^{9} +O(q^{10})\) \(q+1.90883i q^{2} +(5.08298 - 1.07856i) q^{3} +4.35636 q^{4} -1.24741 q^{5} +(2.05878 + 9.70256i) q^{6} +23.5862i q^{8} +(24.6734 - 10.9646i) q^{9} -2.38110i q^{10} +40.6907i q^{11} +(22.1433 - 4.69858i) q^{12} -19.5973i q^{13} +(-6.34057 + 1.34540i) q^{15} -10.1712 q^{16} +104.718 q^{17} +(20.9295 + 47.0974i) q^{18} -40.4544i q^{19} -5.43418 q^{20} -77.6716 q^{22} -80.4045i q^{23} +(25.4391 + 119.888i) q^{24} -123.444 q^{25} +37.4079 q^{26} +(113.589 - 82.3444i) q^{27} +211.712i q^{29} +(-2.56815 - 12.1031i) q^{30} -100.025i q^{31} +169.275i q^{32} +(43.8872 + 206.830i) q^{33} +199.890i q^{34} +(107.486 - 47.7656i) q^{36} -189.975 q^{37} +77.2206 q^{38} +(-21.1368 - 99.6127i) q^{39} -29.4217i q^{40} -186.753 q^{41} +158.618 q^{43} +177.263i q^{44} +(-30.7779 + 13.6773i) q^{45} +153.479 q^{46} -358.069 q^{47} +(-51.6999 + 10.9702i) q^{48} -235.634i q^{50} +(532.282 - 112.945i) q^{51} -85.3729i q^{52} -423.152i q^{53} +(157.182 + 216.822i) q^{54} -50.7580i q^{55} +(-43.6323 - 205.629i) q^{57} -404.123 q^{58} -625.562 q^{59} +(-27.6218 + 5.86106i) q^{60} -807.799i q^{61} +190.931 q^{62} -404.486 q^{64} +24.4459i q^{65} +(-394.804 + 83.7732i) q^{66} +298.544 q^{67} +456.192 q^{68} +(-86.7208 - 408.695i) q^{69} -455.386i q^{71} +(258.613 + 581.953i) q^{72} -501.679i q^{73} -362.630i q^{74} +(-627.464 + 133.141i) q^{75} -176.234i q^{76} +(190.144 - 40.3465i) q^{78} -61.9122 q^{79} +12.6876 q^{80} +(488.557 - 541.067i) q^{81} -356.479i q^{82} -73.1180 q^{83} -130.627 q^{85} +302.775i q^{86} +(228.343 + 1076.13i) q^{87} -959.739 q^{88} -114.745 q^{89} +(-26.1077 - 58.7498i) q^{90} -350.271i q^{92} +(-107.883 - 508.425i) q^{93} -683.493i q^{94} +50.4633i q^{95} +(182.572 + 860.420i) q^{96} +1416.51i q^{97} +(446.156 + 1003.98i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 12q - 28q^{4} + 6q^{9} + O(q^{10}) \) \( 12q - 28q^{4} + 6q^{9} + 6q^{15} - 268q^{16} - 132q^{18} - 268q^{22} + 84q^{25} + 1644q^{30} + 852q^{36} - 1528q^{37} + 852q^{39} - 1012q^{43} - 1216q^{46} + 2682q^{51} + 270q^{57} - 5740q^{58} + 1836q^{60} - 548q^{64} - 1584q^{67} + 5424q^{72} + 4296q^{78} - 3348q^{79} - 1674q^{81} + 348q^{85} + 1108q^{88} + 2958q^{93} - 3354q^{99} + O(q^{100}) \)

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/147\mathbb{Z}\right)^\times\).

\(n\) \(50\) \(52\)
\(\chi(n)\) \(-1\) \(-1\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 1.90883i 0.674874i 0.941348 + 0.337437i \(0.109560\pi\)
−0.941348 + 0.337437i \(0.890440\pi\)
\(3\) 5.08298 1.07856i 0.978221 0.207568i
\(4\) 4.35636 0.544546
\(5\) −1.24741 −0.111572 −0.0557859 0.998443i \(-0.517766\pi\)
−0.0557859 + 0.998443i \(0.517766\pi\)
\(6\) 2.05878 + 9.70256i 0.140082 + 0.660175i
\(7\) 0 0
\(8\) 23.5862i 1.04237i
\(9\) 24.6734 10.9646i 0.913831 0.406095i
\(10\) 2.38110i 0.0752969i
\(11\) 40.6907i 1.11534i 0.830064 + 0.557668i \(0.188304\pi\)
−0.830064 + 0.557668i \(0.811696\pi\)
\(12\) 22.1433 4.69858i 0.532686 0.113030i
\(13\) 19.5973i 0.418101i −0.977905 0.209050i \(-0.932963\pi\)
0.977905 0.209050i \(-0.0670373\pi\)
\(14\) 0 0
\(15\) −6.34057 + 1.34540i −0.109142 + 0.0231588i
\(16\) −10.1712 −0.158925
\(17\) 104.718 1.49400 0.746999 0.664825i \(-0.231494\pi\)
0.746999 + 0.664825i \(0.231494\pi\)
\(18\) 20.9295 + 47.0974i 0.274063 + 0.616720i
\(19\) 40.4544i 0.488467i −0.969716 0.244234i \(-0.921464\pi\)
0.969716 0.244234i \(-0.0785364\pi\)
\(20\) −5.43418 −0.0607559
\(21\) 0 0
\(22\) −77.6716 −0.752711
\(23\) 80.4045i 0.728935i −0.931216 0.364467i \(-0.881251\pi\)
0.931216 0.364467i \(-0.118749\pi\)
\(24\) 25.4391 + 119.888i 0.216364 + 1.01967i
\(25\) −123.444 −0.987552
\(26\) 37.4079 0.282165
\(27\) 113.589 82.3444i 0.809636 0.586933i
\(28\) 0 0
\(29\) 211.712i 1.35565i 0.735222 + 0.677827i \(0.237078\pi\)
−0.735222 + 0.677827i \(0.762922\pi\)
\(30\) −2.56815 12.1031i −0.0156292 0.0736570i
\(31\) 100.025i 0.579517i −0.957100 0.289758i \(-0.906425\pi\)
0.957100 0.289758i \(-0.0935749\pi\)
\(32\) 169.275i 0.935119i
\(33\) 43.8872 + 206.830i 0.231508 + 1.09105i
\(34\) 199.890i 1.00826i
\(35\) 0 0
\(36\) 107.486 47.7656i 0.497622 0.221137i
\(37\) −189.975 −0.844100 −0.422050 0.906572i \(-0.638689\pi\)
−0.422050 + 0.906572i \(0.638689\pi\)
\(38\) 77.2206 0.329654
\(39\) −21.1368 99.6127i −0.0867844 0.408995i
\(40\) 29.4217i 0.116299i
\(41\) −186.753 −0.711362 −0.355681 0.934607i \(-0.615751\pi\)
−0.355681 + 0.934607i \(0.615751\pi\)
\(42\) 0 0
\(43\) 158.618 0.562536 0.281268 0.959629i \(-0.409245\pi\)
0.281268 + 0.959629i \(0.409245\pi\)
\(44\) 177.263i 0.607352i
\(45\) −30.7779 + 13.6773i −0.101958 + 0.0453088i
\(46\) 153.479 0.491939
\(47\) −358.069 −1.11127 −0.555635 0.831426i \(-0.687525\pi\)
−0.555635 + 0.831426i \(0.687525\pi\)
\(48\) −51.6999 + 10.9702i −0.155463 + 0.0329877i
\(49\) 0 0
\(50\) 235.634i 0.666473i
\(51\) 532.282 112.945i 1.46146 0.310106i
\(52\) 85.3729i 0.227675i
\(53\) 423.152i 1.09669i −0.836254 0.548343i \(-0.815259\pi\)
0.836254 0.548343i \(-0.184741\pi\)
\(54\) 157.182 + 216.822i 0.396105 + 0.546402i
\(55\) 50.7580i 0.124440i
\(56\) 0 0
\(57\) −43.6323 205.629i −0.101390 0.477829i
\(58\) −404.123 −0.914895
\(59\) −625.562 −1.38036 −0.690180 0.723638i \(-0.742469\pi\)
−0.690180 + 0.723638i \(0.742469\pi\)
\(60\) −27.6218 + 5.86106i −0.0594327 + 0.0126110i
\(61\) 807.799i 1.69554i −0.530362 0.847772i \(-0.677944\pi\)
0.530362 0.847772i \(-0.322056\pi\)
\(62\) 190.931 0.391101
\(63\) 0 0
\(64\) −404.486 −0.790012
\(65\) 24.4459i 0.0466483i
\(66\) −394.804 + 83.7732i −0.736318 + 0.156239i
\(67\) 298.544 0.544373 0.272187 0.962245i \(-0.412253\pi\)
0.272187 + 0.962245i \(0.412253\pi\)
\(68\) 456.192 0.813550
\(69\) −86.7208 408.695i −0.151304 0.713059i
\(70\) 0 0
\(71\) 455.386i 0.761189i −0.924742 0.380594i \(-0.875719\pi\)
0.924742 0.380594i \(-0.124281\pi\)
\(72\) 258.613 + 581.953i 0.423302 + 0.952553i
\(73\) 501.679i 0.804344i −0.915564 0.402172i \(-0.868255\pi\)
0.915564 0.402172i \(-0.131745\pi\)
\(74\) 362.630i 0.569661i
\(75\) −627.464 + 133.141i −0.966043 + 0.204984i
\(76\) 176.234i 0.265993i
\(77\) 0 0
\(78\) 190.144 40.3465i 0.276020 0.0585685i
\(79\) −61.9122 −0.0881731 −0.0440865 0.999028i \(-0.514038\pi\)
−0.0440865 + 0.999028i \(0.514038\pi\)
\(80\) 12.6876 0.0177315
\(81\) 488.557 541.067i 0.670174 0.742204i
\(82\) 356.479i 0.480080i
\(83\) −73.1180 −0.0966957 −0.0483478 0.998831i \(-0.515396\pi\)
−0.0483478 + 0.998831i \(0.515396\pi\)
\(84\) 0 0
\(85\) −130.627 −0.166688
\(86\) 302.775i 0.379641i
\(87\) 228.343 + 1076.13i 0.281391 + 1.32613i
\(88\) −959.739 −1.16260
\(89\) −114.745 −0.136662 −0.0683309 0.997663i \(-0.521767\pi\)
−0.0683309 + 0.997663i \(0.521767\pi\)
\(90\) −26.1077 58.7498i −0.0305777 0.0688086i
\(91\) 0 0
\(92\) 350.271i 0.396938i
\(93\) −107.883 508.425i −0.120289 0.566895i
\(94\) 683.493i 0.749967i
\(95\) 50.4633i 0.0544992i
\(96\) 182.572 + 860.420i 0.194101 + 0.914753i
\(97\) 1416.51i 1.48273i 0.671101 + 0.741366i \(0.265822\pi\)
−0.671101 + 0.741366i \(0.734178\pi\)
\(98\) 0 0
\(99\) 446.156 + 1003.98i 0.452933 + 1.01923i
\(100\) −537.767 −0.537767
\(101\) −240.811 −0.237244 −0.118622 0.992940i \(-0.537848\pi\)
−0.118622 + 0.992940i \(0.537848\pi\)
\(102\) 215.592 + 1016.04i 0.209283 + 0.986300i
\(103\) 1109.04i 1.06094i 0.847705 + 0.530469i \(0.177984\pi\)
−0.847705 + 0.530469i \(0.822016\pi\)
\(104\) 462.226 0.435817
\(105\) 0 0
\(106\) 807.725 0.740124
\(107\) 1067.69i 0.964646i −0.875993 0.482323i \(-0.839793\pi\)
0.875993 0.482323i \(-0.160207\pi\)
\(108\) 494.834 358.722i 0.440883 0.319612i
\(109\) 10.0875 0.00886430 0.00443215 0.999990i \(-0.498589\pi\)
0.00443215 + 0.999990i \(0.498589\pi\)
\(110\) 96.8885 0.0839814
\(111\) −965.640 + 204.899i −0.825716 + 0.175208i
\(112\) 0 0
\(113\) 884.294i 0.736171i 0.929792 + 0.368086i \(0.119987\pi\)
−0.929792 + 0.368086i \(0.880013\pi\)
\(114\) 392.511 83.2868i 0.322474 0.0684256i
\(115\) 100.297i 0.0813286i
\(116\) 922.295i 0.738215i
\(117\) −214.876 483.532i −0.169789 0.382073i
\(118\) 1194.09i 0.931569i
\(119\) 0 0
\(120\) −31.7330 149.550i −0.0241401 0.113767i
\(121\) −324.732 −0.243976
\(122\) 1541.95 1.14428
\(123\) −949.260 + 201.423i −0.695869 + 0.147656i
\(124\) 435.745i 0.315573i
\(125\) 309.912 0.221755
\(126\) 0 0
\(127\) −840.132 −0.587005 −0.293503 0.955958i \(-0.594821\pi\)
−0.293503 + 0.955958i \(0.594821\pi\)
\(128\) 582.101i 0.401961i
\(129\) 806.254 171.079i 0.550284 0.116765i
\(130\) −46.6631 −0.0314817
\(131\) 517.902 0.345415 0.172707 0.984973i \(-0.444748\pi\)
0.172707 + 0.984973i \(0.444748\pi\)
\(132\) 191.189 + 901.027i 0.126067 + 0.594124i
\(133\) 0 0
\(134\) 569.871i 0.367383i
\(135\) −141.692 + 102.717i −0.0903325 + 0.0654852i
\(136\) 2469.91i 1.55730i
\(137\) 1098.07i 0.684777i 0.939558 + 0.342389i \(0.111236\pi\)
−0.939558 + 0.342389i \(0.888764\pi\)
\(138\) 780.129 165.535i 0.481225 0.102111i
\(139\) 828.268i 0.505416i −0.967543 0.252708i \(-0.918679\pi\)
0.967543 0.252708i \(-0.0813212\pi\)
\(140\) 0 0
\(141\) −1820.06 + 386.197i −1.08707 + 0.230664i
\(142\) 869.255 0.513706
\(143\) 797.427 0.466323
\(144\) −250.958 + 111.523i −0.145230 + 0.0645385i
\(145\) 264.092i 0.151253i
\(146\) 957.621 0.542830
\(147\) 0 0
\(148\) −827.601 −0.459651
\(149\) 892.592i 0.490765i −0.969426 0.245382i \(-0.921086\pi\)
0.969426 0.245382i \(-0.0789135\pi\)
\(150\) −254.144 1197.72i −0.138339 0.651957i
\(151\) 1425.04 0.767999 0.383999 0.923333i \(-0.374546\pi\)
0.383999 + 0.923333i \(0.374546\pi\)
\(152\) 954.166 0.509165
\(153\) 2583.76 1148.19i 1.36526 0.606705i
\(154\) 0 0
\(155\) 124.772i 0.0646577i
\(156\) −92.0795 433.949i −0.0472581 0.222716i
\(157\) 282.754i 0.143734i −0.997414 0.0718670i \(-0.977104\pi\)
0.997414 0.0718670i \(-0.0228957\pi\)
\(158\) 118.180i 0.0595057i
\(159\) −456.393 2150.87i −0.227637 1.07280i
\(160\) 211.155i 0.104333i
\(161\) 0 0
\(162\) 1032.81 + 932.572i 0.500894 + 0.452283i
\(163\) 2316.13 1.11297 0.556484 0.830859i \(-0.312150\pi\)
0.556484 + 0.830859i \(0.312150\pi\)
\(164\) −813.562 −0.387369
\(165\) −54.7454 258.002i −0.0258298 0.121730i
\(166\) 139.570i 0.0652574i
\(167\) −2344.70 −1.08646 −0.543229 0.839585i \(-0.682798\pi\)
−0.543229 + 0.839585i \(0.682798\pi\)
\(168\) 0 0
\(169\) 1812.95 0.825192
\(170\) 249.345i 0.112493i
\(171\) −443.565 998.149i −0.198364 0.446376i
\(172\) 690.999 0.306327
\(173\) −1033.80 −0.454326 −0.227163 0.973857i \(-0.572945\pi\)
−0.227163 + 0.973857i \(0.572945\pi\)
\(174\) −2054.15 + 435.869i −0.894969 + 0.189903i
\(175\) 0 0
\(176\) 413.872i 0.177255i
\(177\) −3179.72 + 674.704i −1.35030 + 0.286519i
\(178\) 219.028i 0.0922294i
\(179\) 144.882i 0.0604973i −0.999542 0.0302486i \(-0.990370\pi\)
0.999542 0.0302486i \(-0.00962991\pi\)
\(180\) −134.080 + 59.5834i −0.0555207 + 0.0246727i
\(181\) 2057.17i 0.844797i 0.906410 + 0.422398i \(0.138812\pi\)
−0.906410 + 0.422398i \(0.861188\pi\)
\(182\) 0 0
\(183\) −871.257 4106.03i −0.351941 1.65862i
\(184\) 1896.44 0.759822
\(185\) 236.977 0.0941778
\(186\) 970.498 205.930i 0.382583 0.0811800i
\(187\) 4261.07i 1.66631i
\(188\) −1559.88 −0.605137
\(189\) 0 0
\(190\) −96.3259 −0.0367801
\(191\) 2948.72i 1.11708i 0.829479 + 0.558538i \(0.188638\pi\)
−0.829479 + 0.558538i \(0.811362\pi\)
\(192\) −2056.00 + 436.261i −0.772806 + 0.163981i
\(193\) −2270.80 −0.846920 −0.423460 0.905915i \(-0.639185\pi\)
−0.423460 + 0.905915i \(0.639185\pi\)
\(194\) −2703.88 −1.00066
\(195\) 26.3662 + 124.258i 0.00968270 + 0.0456323i
\(196\) 0 0
\(197\) 495.849i 0.179329i 0.995972 + 0.0896645i \(0.0285795\pi\)
−0.995972 + 0.0896645i \(0.971421\pi\)
\(198\) −1916.43 + 851.636i −0.687851 + 0.305672i
\(199\) 839.706i 0.299121i 0.988753 + 0.149561i \(0.0477859\pi\)
−0.988753 + 0.149561i \(0.952214\pi\)
\(200\) 2911.58i 1.02940i
\(201\) 1517.50 321.997i 0.532517 0.112995i
\(202\) 459.668i 0.160109i
\(203\) 0 0
\(204\) 2318.81 492.028i 0.795831 0.168867i
\(205\) 232.957 0.0793680
\(206\) −2116.96 −0.715999
\(207\) −881.601 1983.86i −0.296017 0.666123i
\(208\) 199.328i 0.0664465i
\(209\) 1646.12 0.544805
\(210\) 0 0
\(211\) 4001.71 1.30564 0.652818 0.757514i \(-0.273586\pi\)
0.652818 + 0.757514i \(0.273586\pi\)
\(212\) 1843.40i 0.597195i
\(213\) −491.160 2314.72i −0.157999 0.744611i
\(214\) 2038.03 0.651014
\(215\) −197.862 −0.0627632
\(216\) 1942.19 + 2679.13i 0.611803 + 0.843943i
\(217\) 0 0
\(218\) 19.2554i 0.00598228i
\(219\) −541.089 2550.03i −0.166956 0.786826i
\(220\) 221.120i 0.0677633i
\(221\) 2052.20i 0.624642i
\(222\) −391.117 1843.24i −0.118244 0.557254i
\(223\) 3040.54i 0.913047i −0.889711 0.456523i \(-0.849095\pi\)
0.889711 0.456523i \(-0.150905\pi\)
\(224\) 0 0
\(225\) −3045.79 + 1353.51i −0.902455 + 0.401040i
\(226\) −1687.97 −0.496823
\(227\) −4396.47 −1.28548 −0.642741 0.766084i \(-0.722203\pi\)
−0.642741 + 0.766084i \(0.722203\pi\)
\(228\) −190.078 895.795i −0.0552116 0.260199i
\(229\) 1983.56i 0.572389i 0.958172 + 0.286194i \(0.0923903\pi\)
−0.958172 + 0.286194i \(0.907610\pi\)
\(230\) −191.451 −0.0548865
\(231\) 0 0
\(232\) −4993.49 −1.41310
\(233\) 4373.75i 1.22976i 0.788621 + 0.614879i \(0.210795\pi\)
−0.788621 + 0.614879i \(0.789205\pi\)
\(234\) 922.982 410.162i 0.257851 0.114586i
\(235\) 446.659 0.123986
\(236\) −2725.18 −0.751669
\(237\) −314.699 + 66.7758i −0.0862527 + 0.0183019i
\(238\) 0 0
\(239\) 3826.41i 1.03561i −0.855500 0.517803i \(-0.826750\pi\)
0.855500 0.517803i \(-0.173250\pi\)
\(240\) 64.4911 13.6843i 0.0173453 0.00368050i
\(241\) 3439.89i 0.919430i 0.888066 + 0.459715i \(0.152048\pi\)
−0.888066 + 0.459715i \(0.847952\pi\)
\(242\) 619.858i 0.164653i
\(243\) 1899.75 3277.17i 0.501520 0.865146i
\(244\) 3519.07i 0.923300i
\(245\) 0 0
\(246\) −384.483 1811.98i −0.0996493 0.469624i
\(247\) −792.797 −0.204229
\(248\) 2359.21 0.604073
\(249\) −371.657 + 78.8618i −0.0945897 + 0.0200709i
\(250\) 591.569i 0.149656i
\(251\) −2046.61 −0.514664 −0.257332 0.966323i \(-0.582843\pi\)
−0.257332 + 0.966323i \(0.582843\pi\)
\(252\) 0 0
\(253\) 3271.72 0.813008
\(254\) 1603.67i 0.396154i
\(255\) −663.975 + 140.889i −0.163058 + 0.0345991i
\(256\) −4347.02 −1.06128
\(257\) 6051.14 1.46871 0.734357 0.678763i \(-0.237484\pi\)
0.734357 + 0.678763i \(0.237484\pi\)
\(258\) 326.560 + 1539.00i 0.0788014 + 0.371372i
\(259\) 0 0
\(260\) 106.495i 0.0254021i
\(261\) 2321.33 + 5223.66i 0.550524 + 1.23884i
\(262\) 988.588i 0.233111i
\(263\) 6274.28i 1.47106i 0.677492 + 0.735530i \(0.263067\pi\)
−0.677492 + 0.735530i \(0.736933\pi\)
\(264\) −4878.34 + 1035.13i −1.13728 + 0.241318i
\(265\) 527.844i 0.122359i
\(266\) 0 0
\(267\) −583.245 + 123.758i −0.133685 + 0.0283666i
\(268\) 1300.57 0.296436
\(269\) 3336.35 0.756212 0.378106 0.925762i \(-0.376575\pi\)
0.378106 + 0.925762i \(0.376575\pi\)
\(270\) −196.070 270.466i −0.0441942 0.0609631i
\(271\) 2843.17i 0.637308i −0.947871 0.318654i \(-0.896769\pi\)
0.947871 0.318654i \(-0.103231\pi\)
\(272\) −1065.11 −0.237433
\(273\) 0 0
\(274\) −2096.03 −0.462138
\(275\) 5023.02i 1.10145i
\(276\) −377.787 1780.42i −0.0823918 0.388293i
\(277\) 6348.34 1.37702 0.688510 0.725226i \(-0.258265\pi\)
0.688510 + 0.725226i \(0.258265\pi\)
\(278\) 1581.02 0.341092
\(279\) −1096.73 2467.96i −0.235339 0.529580i
\(280\) 0 0
\(281\) 3735.88i 0.793110i 0.918011 + 0.396555i \(0.129794\pi\)
−0.918011 + 0.396555i \(0.870206\pi\)
\(282\) −737.185 3474.18i −0.155669 0.733633i
\(283\) 5517.12i 1.15886i −0.815021 0.579432i \(-0.803274\pi\)
0.815021 0.579432i \(-0.196726\pi\)
\(284\) 1983.83i 0.414502i
\(285\) 54.4275 + 256.504i 0.0113123 + 0.0533122i
\(286\) 1522.15i 0.314709i
\(287\) 0 0
\(288\) 1856.02 + 4176.59i 0.379747 + 0.854541i
\(289\) 6052.96 1.23203
\(290\) 504.107 0.102077
\(291\) 1527.79 + 7200.11i 0.307768 + 1.45044i
\(292\) 2185.50i 0.438002i
\(293\) 7574.50 1.51026 0.755131 0.655574i \(-0.227573\pi\)
0.755131 + 0.655574i \(0.227573\pi\)
\(294\) 0 0
\(295\) 780.333 0.154009
\(296\) 4480.79i 0.879868i
\(297\) 3350.65 + 4622.00i 0.654628 + 0.903016i
\(298\) 1703.81 0.331204
\(299\) −1575.71 −0.304768
\(300\) −2733.46 + 580.012i −0.526055 + 0.111623i
\(301\) 0 0
\(302\) 2720.15i 0.518302i
\(303\) −1224.04 + 259.728i −0.232077 + 0.0492442i
\(304\) 411.469i 0.0776295i
\(305\) 1007.66i 0.189175i
\(306\) 2191.71 + 4931.97i 0.409449 + 0.921379i
\(307\) 10635.6i 1.97723i 0.150480 + 0.988613i \(0.451918\pi\)
−0.150480 + 0.988613i \(0.548082\pi\)
\(308\) 0 0
\(309\) 1196.16 + 5637.21i 0.220217 + 1.03783i
\(310\) −238.169 −0.0436358
\(311\) 5771.19 1.05226 0.526132 0.850403i \(-0.323642\pi\)
0.526132 + 0.850403i \(0.323642\pi\)
\(312\) 2349.49 498.536i 0.426325 0.0904618i
\(313\) 2344.52i 0.423387i 0.977336 + 0.211694i \(0.0678979\pi\)
−0.977336 + 0.211694i \(0.932102\pi\)
\(314\) 539.730 0.0970023
\(315\) 0 0
\(316\) −269.712 −0.0480142
\(317\) 7912.13i 1.40186i 0.713231 + 0.700929i \(0.247231\pi\)
−0.713231 + 0.700929i \(0.752769\pi\)
\(318\) 4105.65 871.177i 0.724005 0.153626i
\(319\) −8614.71 −1.51201
\(320\) 504.560 0.0881431
\(321\) −1151.56 5427.03i −0.200230 0.943637i
\(322\) 0 0
\(323\) 4236.32i 0.729769i
\(324\) 2128.33 2357.08i 0.364940 0.404164i
\(325\) 2419.17i 0.412896i
\(326\) 4421.11i 0.751112i
\(327\) 51.2747 10.8800i 0.00867124 0.00183995i
\(328\) 4404.78i 0.741505i
\(329\) 0 0
\(330\) 492.482 104.500i 0.0821523 0.0174319i
\(331\) −4880.03 −0.810365 −0.405182 0.914236i \(-0.632792\pi\)
−0.405182 + 0.914236i \(0.632792\pi\)
\(332\) −318.528 −0.0526552
\(333\) −4687.34 + 2082.99i −0.771365 + 0.342785i
\(334\) 4475.64i 0.733222i
\(335\) −372.407 −0.0607367
\(336\) 0 0
\(337\) −4136.39 −0.668616 −0.334308 0.942464i \(-0.608503\pi\)
−0.334308 + 0.942464i \(0.608503\pi\)
\(338\) 3460.61i 0.556900i
\(339\) 953.760 + 4494.85i 0.152806 + 0.720138i
\(340\) −569.059 −0.0907692
\(341\) 4070.09 0.646356
\(342\) 1905.30 846.691i 0.301248 0.133871i
\(343\) 0 0
\(344\) 3741.20i 0.586373i
\(345\) 108.176 + 509.810i 0.0168812 + 0.0795573i
\(346\) 1973.35i 0.306613i
\(347\) 2320.76i 0.359034i 0.983755 + 0.179517i \(0.0574535\pi\)
−0.983755 + 0.179517i \(0.942547\pi\)
\(348\) 994.747 + 4688.01i 0.153230 + 0.722137i
\(349\) 226.795i 0.0347853i 0.999849 + 0.0173926i \(0.00553653\pi\)
−0.999849 + 0.0173926i \(0.994463\pi\)
\(350\) 0 0
\(351\) −1613.73 2226.03i −0.245397 0.338509i
\(352\) −6887.90 −1.04297
\(353\) −1485.71 −0.224012 −0.112006 0.993708i \(-0.535728\pi\)
−0.112006 + 0.993708i \(0.535728\pi\)
\(354\) −1287.90 6069.55i −0.193364 0.911280i
\(355\) 568.054i 0.0849272i
\(356\) −499.869 −0.0744185
\(357\) 0 0
\(358\) 276.556 0.0408280
\(359\) 10877.2i 1.59910i −0.600599 0.799550i \(-0.705071\pi\)
0.600599 0.799550i \(-0.294929\pi\)
\(360\) −322.596 725.934i −0.0472286 0.106278i
\(361\) 5222.44 0.761400
\(362\) −3926.79 −0.570131
\(363\) −1650.61 + 350.241i −0.238662 + 0.0506416i
\(364\) 0 0
\(365\) 625.800i 0.0897421i
\(366\) 7837.72 1663.08i 1.11936 0.237516i
\(367\) 3810.15i 0.541930i −0.962589 0.270965i \(-0.912657\pi\)
0.962589 0.270965i \(-0.0873428\pi\)
\(368\) 817.809i 0.115846i
\(369\) −4607.83 + 2047.66i −0.650065 + 0.288881i
\(370\) 452.349i 0.0635581i
\(371\) 0 0
\(372\) −469.976 2214.89i −0.0655030 0.308700i
\(373\) −9739.09 −1.35193 −0.675967 0.736932i \(-0.736274\pi\)
−0.675967 + 0.736932i \(0.736274\pi\)
\(374\) −8133.66 −1.12455
\(375\) 1575.28 334.257i 0.216925 0.0460292i
\(376\) 8445.48i 1.15836i
\(377\) 4148.98 0.566800
\(378\) 0 0
\(379\) 320.171 0.0433933 0.0216967 0.999765i \(-0.493093\pi\)
0.0216967 + 0.999765i \(0.493093\pi\)
\(380\) 219.836i 0.0296773i
\(381\) −4270.38 + 906.129i −0.574220 + 0.121844i
\(382\) −5628.60 −0.753886
\(383\) 4370.26 0.583054 0.291527 0.956563i \(-0.405837\pi\)
0.291527 + 0.956563i \(0.405837\pi\)
\(384\) 627.829 + 2958.81i 0.0834343 + 0.393206i
\(385\) 0 0
\(386\) 4334.57i 0.571564i
\(387\) 3913.66 1739.18i 0.514063 0.228443i
\(388\) 6170.84i 0.807415i
\(389\) 13714.8i 1.78758i −0.448483 0.893791i \(-0.648036\pi\)
0.448483 0.893791i \(-0.351964\pi\)
\(390\) −237.187 + 50.3287i −0.0307960 + 0.00653460i
\(391\) 8419.84i 1.08903i
\(392\) 0 0
\(393\) 2632.49 558.587i 0.337892 0.0716971i
\(394\) −946.493 −0.121024
\(395\) 77.2300 0.00983763
\(396\) 1943.62 + 4373.70i 0.246642 + 0.555017i
\(397\) 2519.10i 0.318464i 0.987241 + 0.159232i \(0.0509018\pi\)
−0.987241 + 0.159232i \(0.949098\pi\)
\(398\) −1602.86 −0.201869
\(399\) 0 0
\(400\) 1255.57 0.156946
\(401\) 2619.97i 0.326272i 0.986604 + 0.163136i \(0.0521609\pi\)
−0.986604 + 0.163136i \(0.947839\pi\)
\(402\) 614.637 + 2896.64i 0.0762570 + 0.359382i
\(403\) −1960.22 −0.242296
\(404\) −1049.06 −0.129190
\(405\) −609.431 + 674.933i −0.0747725 + 0.0828091i
\(406\) 0 0
\(407\) 7730.22i 0.941456i
\(408\) 2663.94 + 12554.5i 0.323247 + 1.52339i
\(409\) 13924.2i 1.68339i −0.539954 0.841694i \(-0.681558\pi\)
0.539954 0.841694i \(-0.318442\pi\)
\(410\) 444.676i 0.0535634i
\(411\) 1184.33 + 5581.47i 0.142138 + 0.669863i
\(412\) 4831.36i 0.577729i
\(413\) 0 0
\(414\) 3786.85 1682.83i 0.449549 0.199774i
\(415\) 91.2082 0.0107885
\(416\) 3317.32 0.390974
\(417\) −893.334 4210.07i −0.104908 0.494408i
\(418\) 3142.16i 0.367675i
\(419\) −15171.1 −1.76887 −0.884433 0.466666i \(-0.845455\pi\)
−0.884433 + 0.466666i \(0.845455\pi\)
\(420\) 0 0
\(421\) −1052.53 −0.121846 −0.0609228 0.998142i \(-0.519404\pi\)
−0.0609228 + 0.998142i \(0.519404\pi\)
\(422\) 7638.60i 0.881140i
\(423\) −8834.78 + 3926.07i −1.01551 + 0.451281i
\(424\) 9980.54 1.14316
\(425\) −12926.9 −1.47540
\(426\) 4418.41 937.541i 0.502518 0.106629i
\(427\) 0 0
\(428\) 4651.23i 0.525294i
\(429\) 4053.31 860.070i 0.456167 0.0967939i
\(430\) 377.685i 0.0423572i
\(431\) 7994.67i 0.893479i −0.894664 0.446740i \(-0.852585\pi\)
0.894664 0.446740i \(-0.147415\pi\)
\(432\) −1155.33 + 837.540i −0.128671 + 0.0932781i
\(433\) 12889.4i 1.43055i 0.698845 + 0.715273i \(0.253697\pi\)
−0.698845 + 0.715273i \(0.746303\pi\)
\(434\) 0 0
\(435\) −284.838 1342.38i −0.0313953 0.147959i
\(436\) 43.9449 0.00482701
\(437\) −3252.72 −0.356061
\(438\) 4867.57 1032.85i 0.531008 0.112674i
\(439\) 14383.8i 1.56378i −0.623415 0.781891i \(-0.714255\pi\)
0.623415 0.781891i \(-0.285745\pi\)
\(440\) 1197.19 0.129713
\(441\) 0 0
\(442\) 3917.30 0.421554
\(443\) 3963.12i 0.425042i 0.977157 + 0.212521i \(0.0681674\pi\)
−0.977157 + 0.212521i \(0.931833\pi\)
\(444\) −4206.68 + 892.614i −0.449640 + 0.0954089i
\(445\) 143.134 0.0152476
\(446\) 5803.87 0.616191
\(447\) −962.710 4537.03i −0.101867 0.480076i
\(448\) 0 0
\(449\) 13479.1i 1.41675i 0.705838 + 0.708373i \(0.250570\pi\)
−0.705838 + 0.708373i \(0.749430\pi\)
\(450\) −2583.62 5813.89i −0.270651 0.609043i
\(451\) 7599.09i 0.793408i
\(452\) 3852.31i 0.400879i
\(453\) 7243.44 1536.98i 0.751272 0.159412i
\(454\) 8392.13i 0.867538i
\(455\) 0 0
\(456\) 4850.01 1029.12i 0.498076 0.105686i
\(457\) 3979.58 0.407346 0.203673 0.979039i \(-0.434712\pi\)
0.203673 + 0.979039i \(0.434712\pi\)
\(458\) −3786.27 −0.386290
\(459\) 11894.8 8622.98i 1.20959 0.876876i
\(460\) 436.932i 0.0442871i
\(461\) 9053.72 0.914694 0.457347 0.889288i \(-0.348800\pi\)
0.457347 + 0.889288i \(0.348800\pi\)
\(462\) 0 0
\(463\) −5736.10 −0.575764 −0.287882 0.957666i \(-0.592951\pi\)
−0.287882 + 0.957666i \(0.592951\pi\)
\(464\) 2153.36i 0.215447i
\(465\) 134.574 + 634.215i 0.0134209 + 0.0632495i
\(466\) −8348.75 −0.829932
\(467\) −12392.6 −1.22797 −0.613984 0.789318i \(-0.710434\pi\)
−0.613984 + 0.789318i \(0.710434\pi\)
\(468\) −936.077 2106.44i −0.0924576 0.208056i
\(469\) 0 0
\(470\) 852.596i 0.0836752i
\(471\) −304.966 1437.23i −0.0298346 0.140604i
\(472\) 14754.6i 1.43885i
\(473\) 6454.28i 0.627417i
\(474\) −127.464 600.707i −0.0123515 0.0582097i
\(475\) 4993.85i 0.482387i
\(476\) 0 0
\(477\) −4639.67 10440.6i −0.445359 1.00219i
\(478\) 7303.97 0.698903
\(479\) −8267.73 −0.788648 −0.394324 0.918972i \(-0.629021\pi\)
−0.394324 + 0.918972i \(0.629021\pi\)
\(480\) −227.743 1073.30i −0.0216562 0.102061i
\(481\) 3723.00i 0.352919i
\(482\) −6566.17 −0.620499
\(483\) 0 0
\(484\) −1414.65 −0.132856
\(485\) 1766.97i 0.165431i
\(486\) 6255.56 + 3626.31i 0.583864 + 0.338462i
\(487\) 940.150 0.0874790 0.0437395 0.999043i \(-0.486073\pi\)
0.0437395 + 0.999043i \(0.486073\pi\)
\(488\) 19052.9 1.76739
\(489\) 11772.9 2498.08i 1.08873 0.231017i
\(490\) 0 0
\(491\) 1057.30i 0.0971801i −0.998819 0.0485900i \(-0.984527\pi\)
0.998819 0.0485900i \(-0.0154728\pi\)
\(492\) −4135.32 + 877.472i −0.378932 + 0.0804055i
\(493\) 22170.2i 2.02534i
\(494\) 1513.32i 0.137828i
\(495\) −556.539 1252.37i −0.0505345 0.113717i
\(496\) 1017.37i 0.0920995i
\(497\) 0 0
\(498\) −150.534 709.431i −0.0135454 0.0638361i
\(499\) −6173.30 −0.553817 −0.276909 0.960896i \(-0.589310\pi\)
−0.276909 + 0.960896i \(0.589310\pi\)
\(500\) 1350.09 0.120756
\(501\) −11918.1 + 2528.89i −1.06280 + 0.225514i
\(502\) 3906.63i 0.347333i
\(503\) −4284.28 −0.379775 −0.189887 0.981806i \(-0.560812\pi\)
−0.189887 + 0.981806i \(0.560812\pi\)
\(504\) 0 0
\(505\) 300.390 0.0264697
\(506\) 6245.15i 0.548678i
\(507\) 9215.17 1955.36i 0.807219 0.171284i
\(508\) −3659.92 −0.319651
\(509\) −15101.0 −1.31501 −0.657507 0.753449i \(-0.728389\pi\)
−0.657507 + 0.753449i \(0.728389\pi\)
\(510\) −268.932 1267.42i −0.0233500 0.110043i
\(511\) 0 0
\(512\) 3640.92i 0.314272i
\(513\) −3331.19 4595.17i −0.286697 0.395481i
\(514\) 11550.6i 0.991197i
\(515\) 1383.42i 0.118371i
\(516\) 3512.34 745.281i 0.299655 0.0635837i
\(517\) 14570.1i 1.23944i
\(518\) 0 0
\(519\) −5254.79 + 1115.01i −0.444431 + 0.0943037i
\(520\) −576.586 −0.0486249
\(521\) 13788.0 1.15943 0.579715 0.814819i \(-0.303164\pi\)
0.579715 + 0.814819i \(0.303164\pi\)
\(522\) −9971.09 + 4431.03i −0.836059 + 0.371534i
\(523\) 961.304i 0.0803726i 0.999192 + 0.0401863i \(0.0127951\pi\)
−0.999192 + 0.0401863i \(0.987205\pi\)
\(524\) 2256.17 0.188094
\(525\) 0 0
\(526\) −11976.5 −0.992780
\(527\) 10474.5i 0.865797i
\(528\) −446.384 2103.71i −0.0367924 0.173394i
\(529\) 5702.11 0.468654
\(530\) −1007.57 −0.0825770
\(531\) −15434.8 + 6859.02i −1.26142 + 0.560557i
\(532\) 0 0
\(533\) 3659.84i 0.297421i
\(534\) −236.234 1113.32i −0.0191439 0.0902207i
\(535\) 1331.84i 0.107627i
\(536\) 7041.53i 0.567440i
\(537\) −156.264 736.434i −0.0125573 0.0591797i
\(538\) 6368.54i 0.510348i
\(539\) 0 0
\(540\) −617.261 + 447.474i −0.0491902 + 0.0356596i
\(541\) −1195.69 −0.0950218 −0.0475109 0.998871i \(-0.515129\pi\)
−0.0475109 + 0.998871i \(0.515129\pi\)
\(542\) 5427.14 0.430102
\(543\) 2218.77 + 10456.6i 0.175353 + 0.826397i
\(544\) 17726.2i 1.39707i
\(545\) −12.5833 −0.000989006
\(546\) 0 0
\(547\) 18601.8 1.45403 0.727014 0.686622i \(-0.240907\pi\)
0.727014 + 0.686622i \(0.240907\pi\)
\(548\) 4783.59i 0.372892i
\(549\) −8857.17 19931.2i −0.688552 1.54944i
\(550\) 9588.10 0.743341
\(551\) 8564.69 0.662192
\(552\) 9639.56 2045.41i 0.743274 0.157715i
\(553\) 0 0
\(554\) 12117.9i 0.929315i
\(555\) 1204.55 255.593i 0.0921267 0.0195483i
\(556\) 3608.24i 0.275222i
\(557\) 6822.07i 0.518959i 0.965749 + 0.259480i \(0.0835511\pi\)
−0.965749 + 0.259480i \(0.916449\pi\)
\(558\) 4710.92 2093.47i 0.357400 0.158824i
\(559\) 3108.49i 0.235197i
\(560\) 0 0
\(561\) 4595.80 + 21658.9i 0.345873 + 1.63002i
\(562\) −7131.16 −0.535249
\(563\) 11359.6 0.850356 0.425178 0.905110i \(-0.360211\pi\)
0.425178 + 0.905110i \(0.360211\pi\)
\(564\) −7928.83 + 1682.42i −0.591957 + 0.125607i
\(565\) 1103.08i 0.0821360i
\(566\) 10531.2 0.782087
\(567\) 0 0
\(568\) 10740.8 0.793443
\(569\) 21324.1i 1.57110i −0.618800 0.785549i \(-0.712381\pi\)
0.618800 0.785549i \(-0.287619\pi\)
\(570\) −489.623 + 103.893i −0.0359790 + 0.00763437i
\(571\) −14768.0 −1.08235 −0.541175 0.840910i \(-0.682020\pi\)
−0.541175 + 0.840910i \(0.682020\pi\)
\(572\) 3473.88 0.253934
\(573\) 3180.36 + 14988.3i 0.231870 + 1.09275i
\(574\) 0 0
\(575\) 9925.45i 0.719861i
\(576\) −9980.06 + 4435.01i −0.721937 + 0.320820i
\(577\) 19304.9i 1.39285i 0.717631 + 0.696424i \(0.245227\pi\)
−0.717631 + 0.696424i \(0.754773\pi\)
\(578\) 11554.1i 0.831464i
\(579\) −11542.4 + 2449.18i −0.828475 + 0.175794i
\(580\) 1150.48i 0.0823640i
\(581\) 0 0
\(582\) −13743.8 + 2916.29i −0.978863 + 0.207705i
\(583\) 17218.3 1.22317
\(584\) 11832.7 0.838426
\(585\) 268.038 + 603.164i 0.0189436 + 0.0426286i
\(586\) 14458.4i 1.01924i
\(587\) 4397.46 0.309204 0.154602 0.987977i \(-0.450590\pi\)
0.154602 + 0.987977i \(0.450590\pi\)
\(588\) 0 0
\(589\) −4046.45 −0.283075
\(590\) 1489.52i 0.103937i
\(591\) 534.801 + 2520.39i 0.0372230 + 0.175423i
\(592\) 1932.27 0.134148
\(593\) 21940.2 1.51935 0.759677 0.650301i \(-0.225357\pi\)
0.759677 + 0.650301i \(0.225357\pi\)
\(594\) −8822.62 + 6395.82i −0.609422 + 0.441791i
\(595\) 0 0
\(596\) 3888.46i 0.267244i
\(597\) 905.670 + 4268.21i 0.0620881 + 0.292607i
\(598\) 3007.77i 0.205680i
\(599\) 5502.23i 0.375317i −0.982234 0.187659i \(-0.939910\pi\)
0.982234 0.187659i \(-0.0600899\pi\)
\(600\) −3140.30 14799.5i −0.213670 1.00698i
\(601\) 5814.58i 0.394645i 0.980339 + 0.197322i \(0.0632246\pi\)
−0.980339 + 0.197322i \(0.936775\pi\)
\(602\) 0 0
\(603\) 7366.11 3273.41i 0.497465 0.221067i
\(604\) 6207.98 0.418210
\(605\) 405.074 0.0272208
\(606\) −495.777 2336.48i −0.0332336 0.156622i
\(607\) 13291.4i 0.888765i 0.895837 + 0.444382i \(0.146577\pi\)
−0.895837 + 0.444382i \(0.853423\pi\)
\(608\) 6847.90 0.456775
\(609\) 0 0
\(610\) −1923.45 −0.127669
\(611\) 7017.18i 0.464623i
\(612\) 11255.8 5001.94i 0.743447 0.330378i
\(613\) 19594.3 1.29104 0.645520 0.763743i \(-0.276641\pi\)
0.645520 + 0.763743i \(0.276641\pi\)
\(614\) −20301.7 −1.33438
\(615\) 1184.12 251.257i 0.0776394 0.0164743i
\(616\) 0 0
\(617\) 348.388i 0.0227319i −0.999935 0.0113660i \(-0.996382\pi\)
0.999935 0.0113660i \(-0.00361797\pi\)
\(618\) −10760.5 + 2283.26i −0.700405 + 0.148619i
\(619\) 6775.41i 0.439946i 0.975506 + 0.219973i \(0.0705970\pi\)
−0.975506 + 0.219973i \(0.929403\pi\)
\(620\) 543.553i 0.0352091i
\(621\) −6620.86 9133.05i −0.427836 0.590172i
\(622\) 11016.2i 0.710145i
\(623\) 0 0
\(624\) 214.986 + 1013.18i 0.0137922 + 0.0649994i
\(625\) 15043.9 0.962810
\(626\) −4475.29 −0.285733
\(627\) 8367.19 1775.43i 0.532940 0.113084i
\(628\) 1231.78i 0.0782697i
\(629\) −19893.9 −1.26108
\(630\) 0 0
\(631\) −7326.82 −0.462244 −0.231122 0.972925i \(-0.574240\pi\)
−0.231122 + 0.972925i \(0.574240\pi\)
\(632\) 1460.28i 0.0919092i
\(633\) 20340.6 4316.07i 1.27720 0.271009i
\(634\) −15102.9 −0.946078
\(635\) 1047.99 0.0654932
\(636\) −1988.21 9369.98i −0.123959 0.584189i
\(637\) 0 0
\(638\) 16444.0i 1.02042i
\(639\) −4993.11 11235.9i −0.309115 0.695598i
\(640\) 726.120i 0.0448475i
\(641\) 2809.82i 0.173138i −0.996246 0.0865689i \(-0.972410\pi\)
0.996246 0.0865689i \(-0.0275903\pi\)
\(642\) 10359.3 2198.13i 0.636836 0.135130i
\(643\) 27485.5i 1.68573i −0.538128 0.842863i \(-0.680868\pi\)
0.538128 0.842863i \(-0.319132\pi\)
\(644\) 0 0
\(645\) −1005.73 + 213.405i −0.0613962 + 0.0130276i
\(646\) 8086.43 0.492502
\(647\) −29319.8 −1.78158 −0.890790 0.454416i \(-0.849848\pi\)
−0.890790 + 0.454416i \(0.849848\pi\)
\(648\) 12761.7 + 11523.2i 0.773654 + 0.698571i
\(649\) 25454.5i 1.53957i
\(650\) −4617.78 −0.278653
\(651\) 0 0
\(652\) 10089.9 0.606061
\(653\) 16743.8i 1.00343i 0.865034 + 0.501713i \(0.167296\pi\)
−0.865034 + 0.501713i \(0.832704\pi\)
\(654\) 20.7680 + 97.8747i 0.00124173 + 0.00585199i
\(655\) −646.037 −0.0385386
\(656\) 1899.49 0.113053
\(657\) −5500.69 12378.1i −0.326640 0.735034i
\(658\) 0 0
\(659\) 9520.47i 0.562769i −0.959595 0.281385i \(-0.909206\pi\)
0.959595 0.281385i \(-0.0907937\pi\)
\(660\) −238.491 1123.95i −0.0140655 0.0662875i
\(661\) 23345.1i 1.37371i −0.726797 0.686853i \(-0.758992\pi\)
0.726797 0.686853i \(-0.241008\pi\)
\(662\) 9315.16i 0.546894i
\(663\) −2213.41 10431.3i −0.129656 0.611037i
\(664\) 1724.58i 0.100793i
\(665\) 0 0
\(666\) −3976.08 8947.34i −0.231337 0.520574i
\(667\) 17022.6 0.988183
\(668\) −10214.4 −0.591626
\(669\) −3279.39 15455.0i −0.189519 0.893161i
\(670\) 710.863i 0.0409896i
\(671\) 32869.9 1.89110
\(672\) 0 0
\(673\) −12283.5 −0.703559 −0.351780 0.936083i \(-0.614423\pi\)
−0.351780 + 0.936083i \(0.614423\pi\)
\(674\) 7895.67i 0.451231i
\(675\) −14021.8 + 10164.9i −0.799557 + 0.579626i
\(676\) 7897.85 0.449354
\(677\) 12991.8 0.737538 0.368769 0.929521i \(-0.379779\pi\)
0.368769 + 0.929521i \(0.379779\pi\)
\(678\) −8579.91 + 1820.57i −0.486002 + 0.103125i
\(679\) 0 0
\(680\) 3081.00i 0.173751i
\(681\) −22347.2 + 4741.84i −1.25748 + 0.266825i
\(682\) 7769.11i 0.436209i
\(683\) 8506.24i 0.476548i 0.971198 + 0.238274i \(0.0765816\pi\)
−0.971198 + 0.238274i \(0.923418\pi\)
\(684\) −1932.33 4348.30i −0.108018 0.243072i
\(685\) 1369.74i 0.0764018i
\(686\) 0 0
\(687\) 2139.38 + 10082.4i 0.118810 + 0.559923i
\(688\) −1613.33 −0.0894009
\(689\) −8292.63 −0.458525
\(690\) −973.142 + 206.491i −0.0536911 + 0.0113927i
\(691\) 25832.9i 1.42219i 0.703097 + 0.711093i \(0.251800\pi\)
−0.703097 + 0.711093i \(0.748200\pi\)
\(692\) −4503.61 −0.247401
\(693\) 0 0
\(694\) −4429.93 −0.242303
\(695\) 1033.19i 0.0563902i
\(696\) −25381.8 + 5385.76i −1.38232 + 0.293314i
\(697\) −19556.4 −1.06277
\(698\) −432.913 −0.0234757
\(699\) 4717.33 + 22231.7i 0.255259 + 1.20298i
\(700\) 0 0
\(701\) 22607.8i 1.21810i −0.793134 0.609048i \(-0.791552\pi\)
0.793134 0.609048i \(-0.208448\pi\)
\(702\) 4249.12 3080.33i 0.228451 0.165612i
\(703\) 7685.33i 0.412315i
\(704\) 16458.8i 0.881129i
\(705\) 2270.36 481.747i 0.121286 0.0257356i
\(706\) 2835.96i 0.151180i
\(707\) 0 0
\(708\) −13852.0 + 2939.26i −0.735298 + 0.156023i
\(709\) −10944.8 −0.579748 −0.289874 0.957065i \(-0.593613\pi\)
−0.289874 + 0.957065i \(0.593613\pi\)
\(710\) −1084.32 −0.0573152
\(711\) −1527.59 + 678.841i −0.0805753 + 0.0358066i
\(712\) 2706.39i 0.142453i
\(713\) −8042.46 −0.422430
\(714\) 0 0
\(715\) −994.720 −0.0520285
\(716\) 631.160i 0.0329435i
\(717\) −4127.00 19449.6i −0.214959 1.01305i
\(718\) 20762.8 1.07919
\(719\) −25770.5 −1.33669 −0.668344 0.743852i \(-0.732997\pi\)
−0.668344 + 0.743852i \(0.732997\pi\)
\(720\) 313.048 139.114i 0.0162036 0.00720068i
\(721\) 0 0
\(722\) 9968.76i 0.513849i
\(723\) 3710.11 + 17484.9i 0.190844 + 0.899405i
\(724\) 8961.78i 0.460030i
\(725\) 26134.6i 1.33878i
\(726\) −668.552 3150.73i −0.0341767 0.161067i
\(727\) 15593.1i 0.795485i −0.917497 0.397742i \(-0.869794\pi\)
0.917497 0.397742i \(-0.130206\pi\)
\(728\) 0 0
\(729\) 6121.81 18706.8i 0.311020 0.950403i
\(730\) −1194.55 −0.0605646
\(731\) 16610.3 0.840428
\(732\) −3795.51 17887.4i −0.191648 0.903191i
\(733\) 800.044i 0.0403142i −0.999797 0.0201571i \(-0.993583\pi\)
0.999797 0.0201571i \(-0.00641664\pi\)
\(734\) 7272.94 0.365734
\(735\) 0 0
\(736\) 13610.4 0.681641
\(737\) 12148.0i 0.607159i
\(738\) −3908.64 8795.56i −0.194958 0.438712i
\(739\) −908.890 −0.0452423 −0.0226211 0.999744i \(-0.507201\pi\)
−0.0226211 + 0.999744i \(0.507201\pi\)
\(740\) 1032.36 0.0512841
\(741\) −4029.77 + 855.076i −0.199781 + 0.0423914i
\(742\) 0 0
\(743\) 8109.00i 0.400391i −0.979756 0.200195i \(-0.935842\pi\)
0.979756 0.200195i \(-0.0641577\pi\)
\(744\) 11991.8 2544.54i 0.590916 0.125386i
\(745\) 1113.43i 0.0547555i
\(746\) 18590.3i 0.912384i
\(747\) −1804.07 + 801.707i −0.0883635 + 0.0392676i
\(748\) 18562.8i 0.907382i
\(749\) 0 0
\(750\) 638.041 + 3006.94i 0.0310639 + 0.146397i
\(751\) −20764.4 −1.00893 −0.504463 0.863433i \(-0.668310\pi\)
−0.504463 + 0.863433i \(0.668310\pi\)
\(752\) 3641.98 0.176608
\(753\) −10402.9 + 2207.38i −0.503455 + 0.106828i
\(754\) 7919.71i 0.382518i
\(755\) −1777.61 −0.0856870
\(756\) 0 0
\(757\) 23295.6 1.11848 0.559242 0.829005i \(-0.311092\pi\)
0.559242 + 0.829005i \(0.311092\pi\)
\(758\) 611.152i 0.0292850i
\(759\) 16630.1 3528.73i 0.795301 0.168755i
\(760\) −1190.24 −0.0568085
\(761\) −10028.8 −0.477717 −0.238858 0.971054i \(-0.576773\pi\)
−0.238858 + 0.971054i \(0.576773\pi\)
\(762\) −1729.65 8151.43i −0.0822290 0.387526i
\(763\) 0 0
\(764\) 12845.7i 0.608299i
\(765\) −3223.02 + 1432.27i −0.152325 + 0.0676912i
\(766\) 8342.08i 0.393488i
\(767\) 12259.3i 0.577130i
\(768\) −22095.8 + 4688.51i −1.03817 + 0.220289i
\(769\) 13500.3i 0.633074i 0.948580 + 0.316537i \(0.102520\pi\)
−0.948580 + 0.316537i \(0.897480\pi\)
\(770\) 0 0
\(771\) 30757.8 6526.49i 1.43673 0.304858i
\(772\) −9892.42 −0.461187
\(773\) −23289.7 −1.08367 −0.541833 0.840486i \(-0.682269\pi\)
−0.541833 + 0.840486i \(0.682269\pi\)
\(774\) 3319.80 + 7470.51i 0.154170 + 0.346928i
\(775\) 12347.5i 0.572303i
\(776\) −33410.2 −1.54556
\(777\) 0 0
\(778\) 26179.3 1.20639
\(779\) 7554.96i 0.347477i
\(780\) 114.861 + 541.313i 0.00527267 + 0.0248489i
\(781\) 18530.0 0.848982
\(782\) 16072.0 0.734956
\(783\) 17433.3 + 24048.1i 0.795677 + 1.09759i
\(784\) 0 0
\(785\) 352.711i 0.0160367i
\(786\) 1066.25 + 5024.98i 0.0483865 + 0.228034i