Properties

Label 165.6.c.a.34.23
Level $165$
Weight $6$
Character 165.34
Analytic conductor $26.463$
Analytic rank $0$
Dimension $26$
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [165,6,Mod(34,165)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(165, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 1, 0]))
 
N = Newforms(chi, 6, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("165.34");
 
S:= CuspForms(chi, 6);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 165 = 3 \cdot 5 \cdot 11 \)
Weight: \( k \) \(=\) \( 6 \)
Character orbit: \([\chi]\) \(=\) 165.c (of order \(2\), degree \(1\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(26.4633302691\)
Analytic rank: \(0\)
Dimension: \(26\)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 34.23
Character \(\chi\) \(=\) 165.34
Dual form 165.6.c.a.34.4

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+8.30687i q^{2} -9.00000i q^{3} -37.0041 q^{4} +(41.8926 - 37.0137i) q^{5} +74.7618 q^{6} -54.6353i q^{7} -41.5686i q^{8} -81.0000 q^{9} +(307.468 + 347.996i) q^{10} -121.000 q^{11} +333.037i q^{12} +175.063i q^{13} +453.849 q^{14} +(-333.123 - 377.033i) q^{15} -838.827 q^{16} -1248.20i q^{17} -672.857i q^{18} -1248.23 q^{19} +(-1550.20 + 1369.66i) q^{20} -491.718 q^{21} -1005.13i q^{22} -2563.30i q^{23} -374.117 q^{24} +(384.972 - 3101.20i) q^{25} -1454.23 q^{26} +729.000i q^{27} +2021.73i q^{28} -3450.78 q^{29} +(3131.96 - 2767.21i) q^{30} +3171.29 q^{31} -8298.22i q^{32} +1089.00i q^{33} +10368.6 q^{34} +(-2022.26 - 2288.81i) q^{35} +2997.33 q^{36} -15357.2i q^{37} -10368.9i q^{38} +1575.57 q^{39} +(-1538.61 - 1741.41i) q^{40} -14538.0 q^{41} -4084.64i q^{42} +7671.37i q^{43} +4477.50 q^{44} +(-3393.30 + 2998.11i) q^{45} +21293.0 q^{46} -21772.6i q^{47} +7549.44i q^{48} +13822.0 q^{49} +(25761.2 + 3197.92i) q^{50} -11233.8 q^{51} -6478.06i q^{52} +38910.5i q^{53} -6055.71 q^{54} +(-5069.00 + 4478.66i) q^{55} -2271.11 q^{56} +11234.1i q^{57} -28665.2i q^{58} +4608.63 q^{59} +(12326.9 + 13951.8i) q^{60} -5627.67 q^{61} +26343.5i q^{62} +4425.46i q^{63} +42089.8 q^{64} +(6479.73 + 7333.84i) q^{65} -9046.18 q^{66} -35573.8i q^{67} +46188.5i q^{68} -23069.7 q^{69} +(19012.9 - 16798.6i) q^{70} +33448.0 q^{71} +3367.05i q^{72} -18523.8i q^{73} +127571. q^{74} +(-27910.8 - 3464.75i) q^{75} +46189.6 q^{76} +6610.88i q^{77} +13088.0i q^{78} -15606.1 q^{79} +(-35140.6 + 31048.1i) q^{80} +6561.00 q^{81} -120765. i q^{82} -76298.1i q^{83} +18195.6 q^{84} +(-46200.4 - 52290.2i) q^{85} -63725.1 q^{86} +31057.0i q^{87} +5029.80i q^{88} +59295.1 q^{89} +(-24904.9 - 28187.7i) q^{90} +9564.63 q^{91} +94852.8i q^{92} -28541.6i q^{93} +180863. q^{94} +(-52291.5 + 46201.6i) q^{95} -74684.0 q^{96} -77264.9i q^{97} +114817. i q^{98} +9801.00 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 26 q - 458 q^{4} - 98 q^{5} - 54 q^{6} - 2106 q^{9} - 1944 q^{10} - 3146 q^{11} + 5516 q^{14} + 8282 q^{16} + 620 q^{19} + 1594 q^{20} - 5112 q^{21} + 6642 q^{24} + 10778 q^{25} + 4560 q^{26} + 9696 q^{29}+ \cdots + 254826 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/165\mathbb{Z}\right)^\times\).

\(n\) \(46\) \(56\) \(67\)
\(\chi(n)\) \(1\) \(1\) \(-1\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 8.30687i 1.46846i 0.678900 + 0.734231i \(0.262457\pi\)
−0.678900 + 0.734231i \(0.737543\pi\)
\(3\) 9.00000i 0.577350i
\(4\) −37.0041 −1.15638
\(5\) 41.8926 37.0137i 0.749397 0.662121i
\(6\) 74.7618 0.847817
\(7\) 54.6353i 0.421433i −0.977547 0.210717i \(-0.932420\pi\)
0.977547 0.210717i \(-0.0675797\pi\)
\(8\) 41.5686i 0.229636i
\(9\) −81.0000 −0.333333
\(10\) 307.468 + 347.996i 0.972299 + 1.10046i
\(11\) −121.000 −0.301511
\(12\) 333.037i 0.667636i
\(13\) 175.063i 0.287300i 0.989629 + 0.143650i \(0.0458840\pi\)
−0.989629 + 0.143650i \(0.954116\pi\)
\(14\) 453.849 0.618858
\(15\) −333.123 377.033i −0.382276 0.432664i
\(16\) −838.827 −0.819167
\(17\) 1248.20i 1.04752i −0.851867 0.523758i \(-0.824529\pi\)
0.851867 0.523758i \(-0.175471\pi\)
\(18\) 672.857i 0.489487i
\(19\) −1248.23 −0.793251 −0.396625 0.917981i \(-0.629819\pi\)
−0.396625 + 0.917981i \(0.629819\pi\)
\(20\) −1550.20 + 1369.66i −0.866587 + 0.765663i
\(21\) −491.718 −0.243314
\(22\) 1005.13i 0.442758i
\(23\) 2563.30i 1.01037i −0.863011 0.505185i \(-0.831424\pi\)
0.863011 0.505185i \(-0.168576\pi\)
\(24\) −374.117 −0.132580
\(25\) 384.972 3101.20i 0.123191 0.992383i
\(26\) −1454.23 −0.421890
\(27\) 729.000i 0.192450i
\(28\) 2021.73i 0.487336i
\(29\) −3450.78 −0.761943 −0.380972 0.924587i \(-0.624410\pi\)
−0.380972 + 0.924587i \(0.624410\pi\)
\(30\) 3131.96 2767.21i 0.635351 0.561357i
\(31\) 3171.29 0.592695 0.296348 0.955080i \(-0.404231\pi\)
0.296348 + 0.955080i \(0.404231\pi\)
\(32\) 8298.22i 1.43255i
\(33\) 1089.00i 0.174078i
\(34\) 10368.6 1.53824
\(35\) −2022.26 2288.81i −0.279040 0.315821i
\(36\) 2997.33 0.385460
\(37\) 15357.2i 1.84420i −0.386947 0.922102i \(-0.626470\pi\)
0.386947 0.922102i \(-0.373530\pi\)
\(38\) 10368.9i 1.16486i
\(39\) 1575.57 0.165873
\(40\) −1538.61 1741.41i −0.152047 0.172089i
\(41\) −14538.0 −1.35066 −0.675329 0.737517i \(-0.735998\pi\)
−0.675329 + 0.737517i \(0.735998\pi\)
\(42\) 4084.64i 0.357298i
\(43\) 7671.37i 0.632706i 0.948642 + 0.316353i \(0.102458\pi\)
−0.948642 + 0.316353i \(0.897542\pi\)
\(44\) 4477.50 0.348661
\(45\) −3393.30 + 2998.11i −0.249799 + 0.220707i
\(46\) 21293.0 1.48369
\(47\) 21772.6i 1.43769i −0.695168 0.718847i \(-0.744670\pi\)
0.695168 0.718847i \(-0.255330\pi\)
\(48\) 7549.44i 0.472946i
\(49\) 13822.0 0.822394
\(50\) 25761.2 + 3197.92i 1.45728 + 0.180901i
\(51\) −11233.8 −0.604784
\(52\) 6478.06i 0.332228i
\(53\) 38910.5i 1.90273i 0.308070 + 0.951364i \(0.400317\pi\)
−0.308070 + 0.951364i \(0.599683\pi\)
\(54\) −6055.71 −0.282606
\(55\) −5069.00 + 4478.66i −0.225952 + 0.199637i
\(56\) −2271.11 −0.0967762
\(57\) 11234.1i 0.457984i
\(58\) 28665.2i 1.11888i
\(59\) 4608.63 0.172362 0.0861810 0.996279i \(-0.472534\pi\)
0.0861810 + 0.996279i \(0.472534\pi\)
\(60\) 12326.9 + 13951.8i 0.442056 + 0.500324i
\(61\) −5627.67 −0.193644 −0.0968220 0.995302i \(-0.530868\pi\)
−0.0968220 + 0.995302i \(0.530868\pi\)
\(62\) 26343.5i 0.870350i
\(63\) 4425.46i 0.140478i
\(64\) 42089.8 1.28448
\(65\) 6479.73 + 7333.84i 0.190228 + 0.215302i
\(66\) −9046.18 −0.255626
\(67\) 35573.8i 0.968150i −0.875026 0.484075i \(-0.839156\pi\)
0.875026 0.484075i \(-0.160844\pi\)
\(68\) 46188.5i 1.21133i
\(69\) −23069.7 −0.583338
\(70\) 19012.9 16798.6i 0.463770 0.409759i
\(71\) 33448.0 0.787453 0.393727 0.919228i \(-0.371186\pi\)
0.393727 + 0.919228i \(0.371186\pi\)
\(72\) 3367.05i 0.0765454i
\(73\) 18523.8i 0.406839i −0.979092 0.203420i \(-0.934794\pi\)
0.979092 0.203420i \(-0.0652056\pi\)
\(74\) 127571. 2.70814
\(75\) −27910.8 3464.75i −0.572953 0.0711245i
\(76\) 46189.6 0.917298
\(77\) 6610.88i 0.127067i
\(78\) 13088.0i 0.243578i
\(79\) −15606.1 −0.281336 −0.140668 0.990057i \(-0.544925\pi\)
−0.140668 + 0.990057i \(0.544925\pi\)
\(80\) −35140.6 + 31048.1i −0.613881 + 0.542388i
\(81\) 6561.00 0.111111
\(82\) 120765.i 1.98339i
\(83\) 76298.1i 1.21568i −0.794060 0.607839i \(-0.792037\pi\)
0.794060 0.607839i \(-0.207963\pi\)
\(84\) 18195.6 0.281364
\(85\) −46200.4 52290.2i −0.693583 0.785006i
\(86\) −63725.1 −0.929104
\(87\) 31057.0i 0.439908i
\(88\) 5029.80i 0.0692379i
\(89\) 59295.1 0.793494 0.396747 0.917928i \(-0.370139\pi\)
0.396747 + 0.917928i \(0.370139\pi\)
\(90\) −24904.9 28187.7i −0.324100 0.366820i
\(91\) 9564.63 0.121078
\(92\) 94852.8i 1.16837i
\(93\) 28541.6i 0.342193i
\(94\) 180863. 2.11120
\(95\) −52291.5 + 46201.6i −0.594460 + 0.525228i
\(96\) −74684.0 −0.827084
\(97\) 77264.9i 0.833783i −0.908956 0.416891i \(-0.863120\pi\)
0.908956 0.416891i \(-0.136880\pi\)
\(98\) 114817.i 1.20765i
\(99\) 9801.00 0.100504
\(100\) −14245.6 + 114757.i −0.142456 + 1.14757i
\(101\) −143856. −1.40322 −0.701609 0.712562i \(-0.747535\pi\)
−0.701609 + 0.712562i \(0.747535\pi\)
\(102\) 93317.6i 0.888102i
\(103\) 84193.3i 0.781960i −0.920399 0.390980i \(-0.872136\pi\)
0.920399 0.390980i \(-0.127864\pi\)
\(104\) 7277.12 0.0659746
\(105\) −20599.3 + 18200.3i −0.182339 + 0.161104i
\(106\) −323224. −2.79408
\(107\) 148939.i 1.25762i 0.777560 + 0.628808i \(0.216457\pi\)
−0.777560 + 0.628808i \(0.783543\pi\)
\(108\) 26976.0i 0.222545i
\(109\) −88621.2 −0.714449 −0.357225 0.934018i \(-0.616277\pi\)
−0.357225 + 0.934018i \(0.616277\pi\)
\(110\) −37203.6 42107.5i −0.293159 0.331801i
\(111\) −138215. −1.06475
\(112\) 45829.6i 0.345224i
\(113\) 76122.3i 0.560810i 0.959882 + 0.280405i \(0.0904687\pi\)
−0.959882 + 0.280405i \(0.909531\pi\)
\(114\) −93320.0 −0.672531
\(115\) −94877.4 107383.i −0.668987 0.757168i
\(116\) 127693. 0.881095
\(117\) 14180.1i 0.0957668i
\(118\) 38283.3i 0.253107i
\(119\) −68195.7 −0.441458
\(120\) −15672.7 + 13847.5i −0.0993554 + 0.0877843i
\(121\) 14641.0 0.0909091
\(122\) 46748.3i 0.284359i
\(123\) 130842.i 0.779803i
\(124\) −117351. −0.685380
\(125\) −98659.3 144166.i −0.564759 0.825256i
\(126\) −36761.8 −0.206286
\(127\) 133153.i 0.732559i −0.930505 0.366280i \(-0.880631\pi\)
0.930505 0.366280i \(-0.119369\pi\)
\(128\) 84091.5i 0.453657i
\(129\) 69042.3 0.365293
\(130\) −60921.3 + 53826.3i −0.316163 + 0.279342i
\(131\) −128189. −0.652639 −0.326319 0.945260i \(-0.605808\pi\)
−0.326319 + 0.945260i \(0.605808\pi\)
\(132\) 40297.5i 0.201300i
\(133\) 68197.5i 0.334302i
\(134\) 295507. 1.42169
\(135\) 26983.0 + 30539.7i 0.127425 + 0.144221i
\(136\) −51885.8 −0.240548
\(137\) 221707.i 1.00920i 0.863353 + 0.504601i \(0.168360\pi\)
−0.863353 + 0.504601i \(0.831640\pi\)
\(138\) 191637.i 0.856609i
\(139\) −105276. −0.462160 −0.231080 0.972935i \(-0.574226\pi\)
−0.231080 + 0.972935i \(0.574226\pi\)
\(140\) 74831.8 + 84695.5i 0.322676 + 0.365208i
\(141\) −195954. −0.830053
\(142\) 277849.i 1.15634i
\(143\) 21182.6i 0.0866243i
\(144\) 67945.0 0.273056
\(145\) −144562. + 127726.i −0.570998 + 0.504499i
\(146\) 153875. 0.597428
\(147\) 124398.i 0.474810i
\(148\) 568281.i 2.13260i
\(149\) 408871. 1.50876 0.754381 0.656437i \(-0.227937\pi\)
0.754381 + 0.656437i \(0.227937\pi\)
\(150\) 28781.2 231851.i 0.104444 0.841359i
\(151\) 382934. 1.36673 0.683364 0.730078i \(-0.260516\pi\)
0.683364 + 0.730078i \(0.260516\pi\)
\(152\) 51887.1i 0.182159i
\(153\) 101104.i 0.349172i
\(154\) −54915.7 −0.186593
\(155\) 132853. 117381.i 0.444164 0.392436i
\(156\) −58302.5 −0.191812
\(157\) 367155.i 1.18878i 0.804178 + 0.594389i \(0.202606\pi\)
−0.804178 + 0.594389i \(0.797394\pi\)
\(158\) 129637.i 0.413131i
\(159\) 350194. 1.09854
\(160\) −307148. 347634.i −0.948522 1.07355i
\(161\) −140047. −0.425803
\(162\) 54501.4i 0.163162i
\(163\) 32509.1i 0.0958377i −0.998851 0.0479188i \(-0.984741\pi\)
0.998851 0.0479188i \(-0.0152589\pi\)
\(164\) 537966. 1.56187
\(165\) 40307.9 + 45621.0i 0.115260 + 0.130453i
\(166\) 633799. 1.78518
\(167\) 526634.i 1.46123i 0.682791 + 0.730613i \(0.260766\pi\)
−0.682791 + 0.730613i \(0.739234\pi\)
\(168\) 20440.0i 0.0558738i
\(169\) 340646. 0.917458
\(170\) 434368. 383781.i 1.15275 1.01850i
\(171\) 101107. 0.264417
\(172\) 283872.i 0.731648i
\(173\) 162431.i 0.412623i 0.978486 + 0.206312i \(0.0661461\pi\)
−0.978486 + 0.206312i \(0.933854\pi\)
\(174\) −257987. −0.645988
\(175\) −169435. 21033.1i −0.418223 0.0519168i
\(176\) 101498. 0.246988
\(177\) 41477.6i 0.0995132i
\(178\) 492557.i 1.16522i
\(179\) −632163. −1.47468 −0.737338 0.675524i \(-0.763918\pi\)
−0.737338 + 0.675524i \(0.763918\pi\)
\(180\) 125566. 110942.i 0.288862 0.255221i
\(181\) −447428. −1.01514 −0.507571 0.861610i \(-0.669456\pi\)
−0.507571 + 0.861610i \(0.669456\pi\)
\(182\) 79452.2i 0.177798i
\(183\) 50649.0i 0.111800i
\(184\) −106553. −0.232017
\(185\) −568428. 643354.i −1.22109 1.38204i
\(186\) 237091. 0.502497
\(187\) 151032.i 0.315838i
\(188\) 805677.i 1.66252i
\(189\) 39829.2 0.0811048
\(190\) −383791. 434379.i −0.771277 0.872941i
\(191\) −79686.3 −0.158052 −0.0790261 0.996873i \(-0.525181\pi\)
−0.0790261 + 0.996873i \(0.525181\pi\)
\(192\) 378808.i 0.741594i
\(193\) 115133.i 0.222488i 0.993793 + 0.111244i \(0.0354835\pi\)
−0.993793 + 0.111244i \(0.964516\pi\)
\(194\) 641830. 1.22438
\(195\) 66004.6 58317.6i 0.124305 0.109828i
\(196\) −511470. −0.950999
\(197\) 359835.i 0.660600i 0.943876 + 0.330300i \(0.107150\pi\)
−0.943876 + 0.330300i \(0.892850\pi\)
\(198\) 81415.7i 0.147586i
\(199\) 281811. 0.504459 0.252229 0.967667i \(-0.418836\pi\)
0.252229 + 0.967667i \(0.418836\pi\)
\(200\) −128912. 16002.8i −0.227887 0.0282891i
\(201\) −320164. −0.558962
\(202\) 1.19500e6i 2.06057i
\(203\) 188535.i 0.321108i
\(204\) 415696. 0.699360
\(205\) −609034. + 538105.i −1.01218 + 0.894299i
\(206\) 699383. 1.14828
\(207\) 207628.i 0.336790i
\(208\) 146848.i 0.235347i
\(209\) 151036. 0.239174
\(210\) −151188. 171116.i −0.236574 0.267758i
\(211\) 791279. 1.22356 0.611778 0.791030i \(-0.290455\pi\)
0.611778 + 0.791030i \(0.290455\pi\)
\(212\) 1.43985e6i 2.20027i
\(213\) 301032.i 0.454636i
\(214\) −1.23722e6 −1.84676
\(215\) 283946. + 321373.i 0.418928 + 0.474148i
\(216\) 30303.5 0.0441935
\(217\) 173264.i 0.249781i
\(218\) 736165.i 1.04914i
\(219\) −166714. −0.234889
\(220\) 187574. 165729.i 0.261286 0.230856i
\(221\) 218513. 0.300952
\(222\) 1.14814e6i 1.56355i
\(223\) 80187.6i 0.107980i −0.998541 0.0539902i \(-0.982806\pi\)
0.998541 0.0539902i \(-0.0171940\pi\)
\(224\) −453376. −0.603724
\(225\) −31182.8 + 251197.i −0.0410637 + 0.330794i
\(226\) −632338. −0.823528
\(227\) 538847.i 0.694066i −0.937853 0.347033i \(-0.887189\pi\)
0.937853 0.347033i \(-0.112811\pi\)
\(228\) 415707.i 0.529602i
\(229\) −431400. −0.543616 −0.271808 0.962352i \(-0.587621\pi\)
−0.271808 + 0.962352i \(0.587621\pi\)
\(230\) 892020. 788134.i 1.11187 0.982382i
\(231\) 59497.9 0.0733621
\(232\) 143444.i 0.174970i
\(233\) 1.56748e6i 1.89152i 0.324866 + 0.945760i \(0.394681\pi\)
−0.324866 + 0.945760i \(0.605319\pi\)
\(234\) 117792. 0.140630
\(235\) −805886. 912111.i −0.951927 1.07740i
\(236\) −170538. −0.199316
\(237\) 140454.i 0.162429i
\(238\) 566493.i 0.648264i
\(239\) 402820. 0.456159 0.228079 0.973643i \(-0.426755\pi\)
0.228079 + 0.973643i \(0.426755\pi\)
\(240\) 279433. + 316265.i 0.313148 + 0.354424i
\(241\) 1.08492e6 1.20325 0.601625 0.798779i \(-0.294520\pi\)
0.601625 + 0.798779i \(0.294520\pi\)
\(242\) 121621.i 0.133496i
\(243\) 59049.0i 0.0641500i
\(244\) 208247. 0.223926
\(245\) 579038. 511603.i 0.616300 0.544525i
\(246\) −1.08689e6 −1.14511
\(247\) 218519.i 0.227901i
\(248\) 131826.i 0.136104i
\(249\) −686683. −0.701872
\(250\) 1.19757e6 819550.i 1.21186 0.829326i
\(251\) 705007. 0.706332 0.353166 0.935561i \(-0.385105\pi\)
0.353166 + 0.935561i \(0.385105\pi\)
\(252\) 163760.i 0.162445i
\(253\) 310160.i 0.304638i
\(254\) 1.10609e6 1.07573
\(255\) −470612. + 415804.i −0.453223 + 0.400440i
\(256\) 648336. 0.618302
\(257\) 247273.i 0.233530i 0.993160 + 0.116765i \(0.0372525\pi\)
−0.993160 + 0.116765i \(0.962748\pi\)
\(258\) 573526.i 0.536418i
\(259\) −839048. −0.777209
\(260\) −239777. 271382.i −0.219975 0.248971i
\(261\) 279513. 0.253981
\(262\) 1.06485e6i 0.958375i
\(263\) 270166.i 0.240847i 0.992723 + 0.120423i \(0.0384252\pi\)
−0.992723 + 0.120423i \(0.961575\pi\)
\(264\) 45268.2 0.0399745
\(265\) 1.44022e6 + 1.63006e6i 1.25984 + 1.42590i
\(266\) −566507. −0.490910
\(267\) 533656.i 0.458124i
\(268\) 1.31638e6i 1.11955i
\(269\) −838616. −0.706614 −0.353307 0.935507i \(-0.614943\pi\)
−0.353307 + 0.935507i \(0.614943\pi\)
\(270\) −253689. + 224144.i −0.211784 + 0.187119i
\(271\) 1.01547e6 0.839930 0.419965 0.907540i \(-0.362042\pi\)
0.419965 + 0.907540i \(0.362042\pi\)
\(272\) 1.04702e6i 0.858091i
\(273\) 86081.7i 0.0699044i
\(274\) −1.84169e6 −1.48197
\(275\) −46581.7 + 375245.i −0.0371435 + 0.299215i
\(276\) 853675. 0.674559
\(277\) 688627.i 0.539243i −0.962966 0.269622i \(-0.913101\pi\)
0.962966 0.269622i \(-0.0868986\pi\)
\(278\) 874514.i 0.678664i
\(279\) −256874. −0.197565
\(280\) −95142.7 + 84062.3i −0.0725238 + 0.0640776i
\(281\) −14371.5 −0.0108577 −0.00542885 0.999985i \(-0.501728\pi\)
−0.00542885 + 0.999985i \(0.501728\pi\)
\(282\) 1.62776e6i 1.21890i
\(283\) 1.23554e6i 0.917044i 0.888683 + 0.458522i \(0.151621\pi\)
−0.888683 + 0.458522i \(0.848379\pi\)
\(284\) −1.23772e6 −0.910594
\(285\) 415814. + 470624.i 0.303241 + 0.343211i
\(286\) 175961. 0.127205
\(287\) 794289.i 0.569212i
\(288\) 672156.i 0.477517i
\(289\) −138140. −0.0972918
\(290\) −1.06101e6 1.20086e6i −0.740837 0.838488i
\(291\) −695384. −0.481385
\(292\) 685457.i 0.470460i
\(293\) 794280.i 0.540511i −0.962789 0.270256i \(-0.912892\pi\)
0.962789 0.270256i \(-0.0871082\pi\)
\(294\) 1.03336e6 0.697239
\(295\) 193067. 170582.i 0.129168 0.114125i
\(296\) −638379. −0.423496
\(297\) 88209.0i 0.0580259i
\(298\) 3.39644e6i 2.21556i
\(299\) 448740. 0.290280
\(300\) 1.03281e6 + 128210.i 0.662550 + 0.0822468i
\(301\) 419128. 0.266643
\(302\) 3.18099e6i 2.00699i
\(303\) 1.29471e6i 0.810148i
\(304\) 1.04705e6 0.649805
\(305\) −235758. + 208301.i −0.145116 + 0.128216i
\(306\) −839858. −0.512746
\(307\) 2.78716e6i 1.68778i −0.536516 0.843890i \(-0.680260\pi\)
0.536516 0.843890i \(-0.319740\pi\)
\(308\) 244630.i 0.146937i
\(309\) −757740. −0.451465
\(310\) 975069. + 1.10360e6i 0.576277 + 0.652237i
\(311\) −2.91123e6 −1.70677 −0.853386 0.521280i \(-0.825455\pi\)
−0.853386 + 0.521280i \(0.825455\pi\)
\(312\) 65494.1i 0.0380904i
\(313\) 563042.i 0.324848i 0.986721 + 0.162424i \(0.0519312\pi\)
−0.986721 + 0.162424i \(0.948069\pi\)
\(314\) −3.04991e6 −1.74567
\(315\) 163803. + 185394.i 0.0930132 + 0.105274i
\(316\) 577488. 0.325331
\(317\) 442425.i 0.247282i 0.992327 + 0.123641i \(0.0394571\pi\)
−0.992327 + 0.123641i \(0.960543\pi\)
\(318\) 2.90902e6i 1.61316i
\(319\) 417545. 0.229735
\(320\) 1.76325e6 1.55790e6i 0.962584 0.850481i
\(321\) 1.34045e6 0.726085
\(322\) 1.16335e6i 0.625276i
\(323\) 1.55804e6i 0.830944i
\(324\) −242784. −0.128487
\(325\) 542905. + 67394.5i 0.285112 + 0.0353929i
\(326\) 270049. 0.140734
\(327\) 797591.i 0.412487i
\(328\) 604324.i 0.310160i
\(329\) −1.18956e6 −0.605892
\(330\) −378968. + 334833.i −0.191566 + 0.169256i
\(331\) 3.35851e6 1.68491 0.842454 0.538768i \(-0.181110\pi\)
0.842454 + 0.538768i \(0.181110\pi\)
\(332\) 2.82335e6i 1.40578i
\(333\) 1.24394e6i 0.614735i
\(334\) −4.37468e6 −2.14576
\(335\) −1.31672e6 1.49028e6i −0.641033 0.725529i
\(336\) 412466. 0.199315
\(337\) 460497.i 0.220878i −0.993883 0.110439i \(-0.964774\pi\)
0.993883 0.110439i \(-0.0352256\pi\)
\(338\) 2.82970e6i 1.34725i
\(339\) 685100. 0.323784
\(340\) 1.70961e6 + 1.93495e6i 0.802045 + 0.907764i
\(341\) −383726. −0.178704
\(342\) 839880.i 0.388286i
\(343\) 1.67342e6i 0.768017i
\(344\) 318888. 0.145292
\(345\) −966450. + 853896.i −0.437151 + 0.386240i
\(346\) −1.34929e6 −0.605922
\(347\) 115478.i 0.0514846i −0.999669 0.0257423i \(-0.991805\pi\)
0.999669 0.0257423i \(-0.00819493\pi\)
\(348\) 1.14924e6i 0.508700i
\(349\) 3.65056e6 1.60434 0.802168 0.597098i \(-0.203680\pi\)
0.802168 + 0.597098i \(0.203680\pi\)
\(350\) 174719. 1.40747e6i 0.0762379 0.614144i
\(351\) −127621. −0.0552910
\(352\) 1.00408e6i 0.431930i
\(353\) 2.90387e6i 1.24034i −0.784467 0.620170i \(-0.787064\pi\)
0.784467 0.620170i \(-0.212936\pi\)
\(354\) 344549. 0.146131
\(355\) 1.40122e6 1.23804e6i 0.590115 0.521390i
\(356\) −2.19416e6 −0.917580
\(357\) 613761.i 0.254876i
\(358\) 5.25130e6i 2.16551i
\(359\) −4.14381e6 −1.69693 −0.848464 0.529254i \(-0.822472\pi\)
−0.848464 + 0.529254i \(0.822472\pi\)
\(360\) 124627. + 141055.i 0.0506823 + 0.0573628i
\(361\) −918022. −0.370753
\(362\) 3.71673e6i 1.49070i
\(363\) 131769.i 0.0524864i
\(364\) −353931. −0.140012
\(365\) −685634. 776009.i −0.269377 0.304884i
\(366\) −420735. −0.164175
\(367\) 527417.i 0.204404i −0.994764 0.102202i \(-0.967411\pi\)
0.994764 0.102202i \(-0.0325888\pi\)
\(368\) 2.15017e6i 0.827662i
\(369\) 1.17758e6 0.450219
\(370\) 5.34426e6 4.72186e6i 2.02947 1.79312i
\(371\) 2.12589e6 0.801872
\(372\) 1.05616e6i 0.395704i
\(373\) 2.76612e6i 1.02944i 0.857360 + 0.514718i \(0.172103\pi\)
−0.857360 + 0.514718i \(0.827897\pi\)
\(374\) −1.25460e6 −0.463796
\(375\) −1.29750e6 + 887934.i −0.476462 + 0.326064i
\(376\) −905057. −0.330146
\(377\) 604105.i 0.218907i
\(378\) 330856.i 0.119099i
\(379\) −2.05750e6 −0.735769 −0.367884 0.929872i \(-0.619918\pi\)
−0.367884 + 0.929872i \(0.619918\pi\)
\(380\) 1.93500e6 1.70965e6i 0.687420 0.607363i
\(381\) −1.19838e6 −0.422943
\(382\) 661944.i 0.232093i
\(383\) 4.97186e6i 1.73190i −0.500133 0.865949i \(-0.666715\pi\)
0.500133 0.865949i \(-0.333285\pi\)
\(384\) 756824. 0.261919
\(385\) 244693. + 276947.i 0.0841336 + 0.0952235i
\(386\) −956396. −0.326715
\(387\) 621381.i 0.210902i
\(388\) 2.85912e6i 0.964169i
\(389\) −4.75117e6 −1.59194 −0.795970 0.605336i \(-0.793039\pi\)
−0.795970 + 0.605336i \(0.793039\pi\)
\(390\) 484437. + 548292.i 0.161278 + 0.182537i
\(391\) −3.19951e6 −1.05838
\(392\) 574560.i 0.188851i
\(393\) 1.15370e6i 0.376801i
\(394\) −2.98911e6 −0.970065
\(395\) −653777. + 577638.i −0.210832 + 0.186279i
\(396\) −362677. −0.116220
\(397\) 405.982i 0.000129280i −1.00000 6.46398e-5i \(-0.999979\pi\)
1.00000 6.46398e-5i \(-2.05755e-5\pi\)
\(398\) 2.34097e6i 0.740778i
\(399\) 613777. 0.193009
\(400\) −322925. + 2.60137e6i −0.100914 + 0.812927i
\(401\) 21666.1 0.00672851 0.00336426 0.999994i \(-0.498929\pi\)
0.00336426 + 0.999994i \(0.498929\pi\)
\(402\) 2.65956e6i 0.820814i
\(403\) 555175.i 0.170282i
\(404\) 5.32327e6 1.62265
\(405\) 274857. 242847.i 0.0832663 0.0735690i
\(406\) −1.56613e6 −0.471535
\(407\) 1.85823e6i 0.556049i
\(408\) 466972.i 0.138880i
\(409\) −142989. −0.0422664 −0.0211332 0.999777i \(-0.506727\pi\)
−0.0211332 + 0.999777i \(0.506727\pi\)
\(410\) −4.46997e6 5.05917e6i −1.31324 1.48635i
\(411\) 1.99536e6 0.582663
\(412\) 3.11550e6i 0.904242i
\(413\) 251794.i 0.0726390i
\(414\) −1.72474e6 −0.494563
\(415\) −2.82408e6 3.19632e6i −0.804926 0.911026i
\(416\) 1.45271e6 0.411573
\(417\) 947484.i 0.266828i
\(418\) 1.25463e6i 0.351218i
\(419\) 454799. 0.126557 0.0632783 0.997996i \(-0.479844\pi\)
0.0632783 + 0.997996i \(0.479844\pi\)
\(420\) 762260. 673486.i 0.210853 0.186297i
\(421\) 3.37870e6 0.929062 0.464531 0.885557i \(-0.346223\pi\)
0.464531 + 0.885557i \(0.346223\pi\)
\(422\) 6.57305e6i 1.79674i
\(423\) 1.76358e6i 0.479231i
\(424\) 1.61745e6 0.436935
\(425\) −3.87091e6 480522.i −1.03954 0.129045i
\(426\) 2.50064e6 0.667616
\(427\) 307470.i 0.0816080i
\(428\) 5.51135e6i 1.45428i
\(429\) −190644. −0.0500126
\(430\) −2.66961e6 + 2.35870e6i −0.696268 + 0.615179i
\(431\) −5.68143e6 −1.47321 −0.736604 0.676324i \(-0.763572\pi\)
−0.736604 + 0.676324i \(0.763572\pi\)
\(432\) 611505.i 0.157649i
\(433\) 1.86171e6i 0.477191i −0.971119 0.238596i \(-0.923313\pi\)
0.971119 0.238596i \(-0.0766870\pi\)
\(434\) 1.43928e6 0.366794
\(435\) 1.14954e6 + 1.30106e6i 0.291272 + 0.329666i
\(436\) 3.27935e6 0.826174
\(437\) 3.19959e6i 0.801477i
\(438\) 1.38487e6i 0.344925i
\(439\) 801463. 0.198482 0.0992412 0.995063i \(-0.468358\pi\)
0.0992412 + 0.995063i \(0.468358\pi\)
\(440\) 186171. + 210711.i 0.0458439 + 0.0518866i
\(441\) −1.11958e6 −0.274131
\(442\) 1.81516e6i 0.441937i
\(443\) 2.24766e6i 0.544154i −0.962275 0.272077i \(-0.912289\pi\)
0.962275 0.272077i \(-0.0877106\pi\)
\(444\) 5.11453e6 1.23126
\(445\) 2.48402e6 2.19473e6i 0.594642 0.525389i
\(446\) 666108. 0.158565
\(447\) 3.67984e6i 0.871084i
\(448\) 2.29959e6i 0.541322i
\(449\) 4.10754e6 0.961537 0.480769 0.876848i \(-0.340358\pi\)
0.480769 + 0.876848i \(0.340358\pi\)
\(450\) −2.08666e6 259031.i −0.485759 0.0603005i
\(451\) 1.75910e6 0.407239
\(452\) 2.81684e6i 0.648509i
\(453\) 3.44641e6i 0.789081i
\(454\) 4.47613e6 1.01921
\(455\) 400687. 354022.i 0.0907354 0.0801682i
\(456\) 466984. 0.105170
\(457\) 7.14569e6i 1.60049i −0.599672 0.800246i \(-0.704702\pi\)
0.599672 0.800246i \(-0.295298\pi\)
\(458\) 3.58359e6i 0.798278i
\(459\) 909936. 0.201595
\(460\) 3.51085e6 + 3.97363e6i 0.773603 + 0.875573i
\(461\) 4.42326e6 0.969372 0.484686 0.874688i \(-0.338934\pi\)
0.484686 + 0.874688i \(0.338934\pi\)
\(462\) 494241.i 0.107729i
\(463\) 2.72107e6i 0.589912i 0.955511 + 0.294956i \(0.0953050\pi\)
−0.955511 + 0.294956i \(0.904695\pi\)
\(464\) 2.89461e6 0.624159
\(465\) −1.05643e6 1.19568e6i −0.226573 0.256438i
\(466\) −1.30208e7 −2.77762
\(467\) 2.07874e6i 0.441070i −0.975379 0.220535i \(-0.929220\pi\)
0.975379 0.220535i \(-0.0707803\pi\)
\(468\) 524723.i 0.110743i
\(469\) −1.94358e6 −0.408010
\(470\) 7.57679e6 6.69439e6i 1.58212 1.39787i
\(471\) 3.30440e6 0.686341
\(472\) 191574.i 0.0395805i
\(473\) 928236.i 0.190768i
\(474\) −1.16674e6 −0.238521
\(475\) −480534. + 3.87101e6i −0.0977215 + 0.787209i
\(476\) 2.52352e6 0.510493
\(477\) 3.15175e6i 0.634243i
\(478\) 3.34617e6i 0.669851i
\(479\) 7.38214e6 1.47009 0.735044 0.678019i \(-0.237161\pi\)
0.735044 + 0.678019i \(0.237161\pi\)
\(480\) −3.12870e6 + 2.76433e6i −0.619814 + 0.547630i
\(481\) 2.68849e6 0.529841
\(482\) 9.01230e6i 1.76693i
\(483\) 1.26042e6i 0.245838i
\(484\) −541777. −0.105125
\(485\) −2.85986e6 3.23682e6i −0.552065 0.624834i
\(486\) 490512. 0.0942018
\(487\) 4.25158e6i 0.812321i −0.913802 0.406161i \(-0.866867\pi\)
0.913802 0.406161i \(-0.133133\pi\)
\(488\) 233934.i 0.0444677i
\(489\) −292582. −0.0553319
\(490\) 4.24982e6 + 4.80999e6i 0.799613 + 0.905012i
\(491\) 5.75275e6 1.07689 0.538446 0.842660i \(-0.319012\pi\)
0.538446 + 0.842660i \(0.319012\pi\)
\(492\) 4.84170e6i 0.901747i
\(493\) 4.30726e6i 0.798148i
\(494\) 1.81521e6 0.334664
\(495\) 410589. 362771.i 0.0753172 0.0665457i
\(496\) −2.66016e6 −0.485516
\(497\) 1.82745e6i 0.331859i
\(498\) 5.70419e6i 1.03067i
\(499\) 7.53164e6 1.35406 0.677031 0.735955i \(-0.263266\pi\)
0.677031 + 0.735955i \(0.263266\pi\)
\(500\) 3.65080e6 + 5.33475e6i 0.653075 + 0.954309i
\(501\) 4.73971e6 0.843640
\(502\) 5.85640e6i 1.03722i
\(503\) 6.85977e6i 1.20890i −0.796644 0.604449i \(-0.793393\pi\)
0.796644 0.604449i \(-0.206607\pi\)
\(504\) 183960. 0.0322587
\(505\) −6.02651e6 + 5.32465e6i −1.05157 + 0.929101i
\(506\) −2.57646e6 −0.447349
\(507\) 3.06581e6i 0.529695i
\(508\) 4.92722e6i 0.847116i
\(509\) 3.43084e6 0.586956 0.293478 0.955966i \(-0.405187\pi\)
0.293478 + 0.955966i \(0.405187\pi\)
\(510\) −3.45403e6 3.90931e6i −0.588031 0.665541i
\(511\) −1.01205e6 −0.171455
\(512\) 8.07658e6i 1.36161i
\(513\) 909959.i 0.152661i
\(514\) −2.05406e6 −0.342930
\(515\) −3.11631e6 3.52707e6i −0.517752 0.585998i
\(516\) −2.55485e6 −0.422417
\(517\) 2.63449e6i 0.433481i
\(518\) 6.96987e6i 1.14130i
\(519\) 1.46188e6 0.238228
\(520\) 304857. 269353.i 0.0494411 0.0436831i
\(521\) 7.81233e6 1.26092 0.630458 0.776223i \(-0.282867\pi\)
0.630458 + 0.776223i \(0.282867\pi\)
\(522\) 2.32188e6i 0.372961i
\(523\) 9.26985e6i 1.48190i −0.671561 0.740949i \(-0.734376\pi\)
0.671561 0.740949i \(-0.265624\pi\)
\(524\) 4.74352e6 0.754698
\(525\) −189298. + 1.52491e6i −0.0299742 + 0.241461i
\(526\) −2.24423e6 −0.353674
\(527\) 3.95839e6i 0.620858i
\(528\) 913483.i 0.142599i
\(529\) −134185. −0.0208480
\(530\) −1.35407e7 + 1.19637e7i −2.09388 + 1.85002i
\(531\) −373299. −0.0574540
\(532\) 2.52359e6i 0.386580i
\(533\) 2.54507e6i 0.388045i
\(534\) 4.43301e6 0.672737
\(535\) 5.51277e6 + 6.23943e6i 0.832695 + 0.942454i
\(536\) −1.47875e6 −0.222322
\(537\) 5.68947e6i 0.851405i
\(538\) 6.96627e6i 1.03764i
\(539\) −1.67246e6 −0.247961
\(540\) −998482. 1.13009e6i −0.147352 0.166775i
\(541\) −8.86597e6 −1.30237 −0.651183 0.758921i \(-0.725727\pi\)
−0.651183 + 0.758921i \(0.725727\pi\)
\(542\) 8.43537e6i 1.23341i
\(543\) 4.02685e6i 0.586092i
\(544\) −1.03578e7 −1.50062
\(545\) −3.71257e6 + 3.28020e6i −0.535406 + 0.473052i
\(546\) 715070. 0.102652
\(547\) 9.18782e6i 1.31294i −0.754353 0.656469i \(-0.772049\pi\)
0.754353 0.656469i \(-0.227951\pi\)
\(548\) 8.20407e6i 1.16702i
\(549\) 455841. 0.0645480
\(550\) −3.11711e6 386948.i −0.439385 0.0545438i
\(551\) 4.30737e6 0.604412
\(552\) 958976.i 0.133955i
\(553\) 852642.i 0.118564i
\(554\) 5.72034e6 0.791858
\(555\) −5.79019e6 + 5.11586e6i −0.797922 + 0.704995i
\(556\) 3.89565e6 0.534432
\(557\) 5.08584e6i 0.694584i 0.937757 + 0.347292i \(0.112899\pi\)
−0.937757 + 0.347292i \(0.887101\pi\)
\(558\) 2.13382e6i 0.290117i
\(559\) −1.34297e6 −0.181777
\(560\) 1.69632e6 + 1.91992e6i 0.228580 + 0.258710i
\(561\) 1.35929e6 0.182349
\(562\) 119383.i 0.0159441i
\(563\) 9.69174e6i 1.28864i 0.764757 + 0.644319i \(0.222859\pi\)
−0.764757 + 0.644319i \(0.777141\pi\)
\(564\) 7.25110e6 0.959855
\(565\) 2.81757e6 + 3.18896e6i 0.371324 + 0.420269i
\(566\) −1.02635e7 −1.34664
\(567\) 358462.i 0.0468259i
\(568\) 1.39039e6i 0.180828i
\(569\) −1.19915e6 −0.155271 −0.0776357 0.996982i \(-0.524737\pi\)
−0.0776357 + 0.996982i \(0.524737\pi\)
\(570\) −3.90941e6 + 3.45412e6i −0.503993 + 0.445297i
\(571\) 2.76815e6 0.355303 0.177652 0.984093i \(-0.443150\pi\)
0.177652 + 0.984093i \(0.443150\pi\)
\(572\) 783845.i 0.100171i
\(573\) 717177.i 0.0912515i
\(574\) −6.59806e6 −0.835865
\(575\) −7.94931e6 986801.i −1.00267 0.124469i
\(576\) −3.40927e6 −0.428160
\(577\) 1.52867e7i 1.91150i 0.294186 + 0.955748i \(0.404951\pi\)
−0.294186 + 0.955748i \(0.595049\pi\)
\(578\) 1.14751e6i 0.142869i
\(579\) 1.03620e6 0.128454
\(580\) 5.34939e6 4.72640e6i 0.660290 0.583392i
\(581\) −4.16857e6 −0.512327
\(582\) 5.77647e6i 0.706895i
\(583\) 4.70817e6i 0.573694i
\(584\) −770008. −0.0934250
\(585\) −524858. 594041.i −0.0634092 0.0717674i
\(586\) 6.59798e6 0.793720
\(587\) 1.19628e7i 1.43298i −0.697599 0.716489i \(-0.745748\pi\)
0.697599 0.716489i \(-0.254252\pi\)
\(588\) 4.60323e6i 0.549060i
\(589\) −3.95849e6 −0.470156
\(590\) 1.41701e6 + 1.60378e6i 0.167587 + 0.189677i
\(591\) 3.23852e6 0.381397
\(592\) 1.28821e7i 1.51071i
\(593\) 5.73684e6i 0.669940i 0.942229 + 0.334970i \(0.108726\pi\)
−0.942229 + 0.334970i \(0.891274\pi\)
\(594\) 732741. 0.0852088
\(595\) −2.85689e6 + 2.52418e6i −0.330827 + 0.292299i
\(596\) −1.51299e7 −1.74470
\(597\) 2.53630e6i 0.291249i
\(598\) 3.72763e6i 0.426265i
\(599\) −3.70905e6 −0.422373 −0.211186 0.977446i \(-0.567733\pi\)
−0.211186 + 0.977446i \(0.567733\pi\)
\(600\) −144025. + 1.16021e6i −0.0163327 + 0.131571i
\(601\) −128805. −0.0145461 −0.00727306 0.999974i \(-0.502315\pi\)
−0.00727306 + 0.999974i \(0.502315\pi\)
\(602\) 3.48164e6i 0.391555i
\(603\) 2.88147e6i 0.322717i
\(604\) −1.41702e7 −1.58046
\(605\) 613349. 541918.i 0.0681270 0.0601928i
\(606\) −1.07550e7 −1.18967
\(607\) 1.63065e7i 1.79635i −0.439642 0.898173i \(-0.644895\pi\)
0.439642 0.898173i \(-0.355105\pi\)
\(608\) 1.03581e7i 1.13637i
\(609\) 1.69681e6 0.185392
\(610\) −1.73033e6 1.95841e6i −0.188280 0.213098i
\(611\) 3.81159e6 0.413050
\(612\) 3.74126e6i 0.403775i
\(613\) 1.05148e6i 0.113019i −0.998402 0.0565094i \(-0.982003\pi\)
0.998402 0.0565094i \(-0.0179971\pi\)
\(614\) 2.31526e7 2.47844
\(615\) 4.84295e6 + 5.48131e6i 0.516324 + 0.584382i
\(616\) 274805. 0.0291791
\(617\) 1.47566e7i 1.56053i −0.625449 0.780265i \(-0.715084\pi\)
0.625449 0.780265i \(-0.284916\pi\)
\(618\) 6.29445e6i 0.662959i
\(619\) 3.16617e6 0.332130 0.166065 0.986115i \(-0.446894\pi\)
0.166065 + 0.986115i \(0.446894\pi\)
\(620\) −4.91612e6 + 4.34358e6i −0.513622 + 0.453805i
\(621\) 1.86865e6 0.194446
\(622\) 2.41832e7i 2.50633i
\(623\) 3.23961e6i 0.334405i
\(624\) −1.32163e6 −0.135878
\(625\) −9.46922e6 2.38775e6i −0.969648 0.244506i
\(626\) −4.67712e6 −0.477027
\(627\) 1.35932e6i 0.138087i
\(628\) 1.35863e7i 1.37468i
\(629\) −1.91689e7 −1.93184
\(630\) −1.54004e6 + 1.36069e6i −0.154590 + 0.136586i
\(631\) 1.74306e7 1.74276 0.871382 0.490605i \(-0.163224\pi\)
0.871382 + 0.490605i \(0.163224\pi\)
\(632\) 648721.i 0.0646049i
\(633\) 7.12151e6i 0.706420i
\(634\) −3.67517e6 −0.363123
\(635\) −4.92850e6 5.57813e6i −0.485043 0.548977i
\(636\) −1.29586e7 −1.27033
\(637\) 2.41972e6i 0.236274i
\(638\) 3.46849e6i 0.337356i
\(639\) −2.70929e6 −0.262484
\(640\) 3.11254e6 + 3.52281e6i 0.300376 + 0.339969i
\(641\) 1.80105e6 0.173134 0.0865669 0.996246i \(-0.472410\pi\)
0.0865669 + 0.996246i \(0.472410\pi\)
\(642\) 1.11349e7i 1.06623i
\(643\) 4.35963e6i 0.415836i −0.978146 0.207918i \(-0.933331\pi\)
0.978146 0.207918i \(-0.0666687\pi\)
\(644\) 5.18232e6 0.492390
\(645\) 2.89236e6 2.55551e6i 0.273749 0.241868i
\(646\) −1.29424e7 −1.22021
\(647\) 1.51638e7i 1.42412i 0.702117 + 0.712061i \(0.252238\pi\)
−0.702117 + 0.712061i \(0.747762\pi\)
\(648\) 272731.i 0.0255151i
\(649\) −557644. −0.0519691
\(650\) −559837. + 4.50984e6i −0.0519731 + 0.418676i
\(651\) −1.55938e6 −0.144211
\(652\) 1.20297e6i 0.110825i
\(653\) 9.42837e6i 0.865274i 0.901568 + 0.432637i \(0.142417\pi\)
−0.901568 + 0.432637i \(0.857583\pi\)
\(654\) −6.62548e6 −0.605722
\(655\) −5.37017e6 + 4.74475e6i −0.489085 + 0.432126i
\(656\) 1.21949e7 1.10641
\(657\) 1.50043e6i 0.135613i
\(658\) 9.88149e6i 0.889728i
\(659\) 1.78022e7 1.59683 0.798415 0.602107i \(-0.205672\pi\)
0.798415 + 0.602107i \(0.205672\pi\)
\(660\) −1.49156e6 1.68816e6i −0.133285 0.150853i
\(661\) −1.63561e6 −0.145605 −0.0728027 0.997346i \(-0.523194\pi\)
−0.0728027 + 0.997346i \(0.523194\pi\)
\(662\) 2.78987e7i 2.47422i
\(663\) 1.96662e6i 0.173755i
\(664\) −3.17160e6 −0.279164
\(665\) 2.52424e6 + 2.85697e6i 0.221348 + 0.250525i
\(666\) −1.03332e7 −0.902714
\(667\) 8.84541e6i 0.769845i
\(668\) 1.94876e7i 1.68973i
\(669\) −721688. −0.0623425
\(670\) 1.23795e7 1.09378e7i 1.06541 0.941332i
\(671\) 680948. 0.0583859
\(672\) 4.08039e6i 0.348560i
\(673\) 9.45334e6i 0.804540i 0.915521 + 0.402270i \(0.131779\pi\)
−0.915521 + 0.402270i \(0.868221\pi\)
\(674\) 3.82529e6 0.324350
\(675\) 2.26077e6 + 280645.i 0.190984 + 0.0237082i
\(676\) −1.26053e7 −1.06093
\(677\) 1.41485e7i 1.18642i −0.805047 0.593212i \(-0.797860\pi\)
0.805047 0.593212i \(-0.202140\pi\)
\(678\) 5.69104e6i 0.475464i
\(679\) −4.22139e6 −0.351384
\(680\) −2.17363e6 + 1.92049e6i −0.180266 + 0.159272i
\(681\) −4.84962e6 −0.400719
\(682\) 3.18756e6i 0.262420i
\(683\) 1.45731e6i 0.119536i 0.998212 + 0.0597681i \(0.0190361\pi\)
−0.998212 + 0.0597681i \(0.980964\pi\)
\(684\) −3.74136e6 −0.305766
\(685\) 8.20619e6 + 9.28787e6i 0.668214 + 0.756292i
\(686\) 1.39009e7 1.12780
\(687\) 3.88260e6i 0.313857i
\(688\) 6.43495e6i 0.518292i
\(689\) −6.81179e6 −0.546655
\(690\) −7.09321e6 8.02818e6i −0.567179 0.641940i
\(691\) 1.64861e7 1.31348 0.656740 0.754117i \(-0.271935\pi\)
0.656740 + 0.754117i \(0.271935\pi\)
\(692\) 6.01062e6i 0.477149i
\(693\) 535481.i 0.0423556i
\(694\) 959264. 0.0756031
\(695\) −4.41028e6 + 3.89665e6i −0.346341 + 0.306006i
\(696\) 1.29100e6 0.101019
\(697\) 1.81463e7i 1.41484i
\(698\) 3.03247e7i 2.35591i
\(699\) 1.41073e7 1.09207
\(700\) 6.26979e6 + 778311.i 0.483624 + 0.0600355i
\(701\) −1.82652e7 −1.40388 −0.701939 0.712237i \(-0.747682\pi\)
−0.701939 + 0.712237i \(0.747682\pi\)
\(702\) 1.06013e6i 0.0811927i
\(703\) 1.91694e7i 1.46292i
\(704\) −5.09287e6 −0.387285
\(705\) −8.20900e6 + 7.25297e6i −0.622039 + 0.549596i
\(706\) 2.41221e7 1.82139
\(707\) 7.85963e6i 0.591363i
\(708\) 1.53484e6i 0.115075i
\(709\) −2.53273e7 −1.89223 −0.946115 0.323830i \(-0.895030\pi\)
−0.946115 + 0.323830i \(0.895030\pi\)
\(710\) 1.02842e7 + 1.16398e7i 0.765640 + 0.866561i
\(711\) 1.26409e6 0.0937787
\(712\) 2.46481e6i 0.182215i
\(713\) 8.12897e6i 0.598841i
\(714\) −5.09844e6 −0.374276
\(715\) −784048. 887395.i −0.0573558 0.0649160i
\(716\) 2.33926e7 1.70528
\(717\) 3.62538e6i 0.263363i
\(718\) 3.44221e7i 2.49187i
\(719\) 1.50245e7 1.08387 0.541937 0.840419i \(-0.317691\pi\)
0.541937 + 0.840419i \(0.317691\pi\)
\(720\) 2.84639e6 2.51490e6i 0.204627 0.180796i
\(721\) −4.59993e6 −0.329544
\(722\) 7.62589e6i 0.544437i
\(723\) 9.76429e6i 0.694697i
\(724\) 1.65567e7 1.17389
\(725\) −1.32846e6 + 1.07016e7i −0.0938647 + 0.756139i
\(726\) 1.09459e6 0.0770742
\(727\) 1.17483e7i 0.824401i −0.911093 0.412200i \(-0.864760\pi\)
0.911093 0.412200i \(-0.135240\pi\)
\(728\) 397588.i 0.0278039i
\(729\) −531441. −0.0370370
\(730\) 6.44621e6 5.69547e6i 0.447710 0.395569i
\(731\) 9.57539e6 0.662770
\(732\) 1.87422e6i 0.129284i
\(733\) 9.57778e6i 0.658423i −0.944256 0.329211i \(-0.893217\pi\)
0.944256 0.329211i \(-0.106783\pi\)
\(734\) 4.38119e6 0.300159
\(735\) −4.60442e6 5.21134e6i −0.314381 0.355821i
\(736\) −2.12709e7 −1.44741
\(737\) 4.30442e6i 0.291908i
\(738\) 9.78200e6i 0.661130i
\(739\) 1.95084e7 1.31405 0.657023 0.753871i \(-0.271816\pi\)
0.657023 + 0.753871i \(0.271816\pi\)
\(740\) 2.10342e7 + 2.38068e7i 1.41204 + 1.59816i
\(741\) −1.96667e6 −0.131579
\(742\) 1.76595e7i 1.17752i
\(743\) 1.16476e6i 0.0774039i −0.999251 0.0387019i \(-0.987678\pi\)
0.999251 0.0387019i \(-0.0123223\pi\)
\(744\) −1.18643e6 −0.0785798
\(745\) 1.71287e7 1.51338e7i 1.13066 0.998983i
\(746\) −2.29778e7 −1.51169
\(747\) 6.18015e6i 0.405226i
\(748\) 5.58880e6i 0.365229i
\(749\) 8.13732e6 0.530001
\(750\) −7.37595e6 1.07781e7i −0.478812 0.699666i
\(751\) 2.66259e7 1.72268 0.861340 0.508029i \(-0.169626\pi\)
0.861340 + 0.508029i \(0.169626\pi\)
\(752\) 1.82635e7i 1.17771i
\(753\) 6.34506e6i 0.407801i
\(754\) 5.01822e6 0.321456
\(755\) 1.60421e7 1.41738e7i 1.02422 0.904939i
\(756\) −1.47384e6 −0.0937879
\(757\) 2.27792e7i 1.44477i 0.691491 + 0.722385i \(0.256954\pi\)
−0.691491 + 0.722385i \(0.743046\pi\)
\(758\) 1.70914e7i 1.08045i
\(759\) 2.79144e6 0.175883
\(760\) 1.92053e6 + 2.17368e6i 0.120611 + 0.136509i
\(761\) −2.05310e7 −1.28513 −0.642567 0.766229i \(-0.722131\pi\)
−0.642567 + 0.766229i \(0.722131\pi\)
\(762\) 9.95479e6i 0.621076i
\(763\) 4.84185e6i 0.301093i
\(764\) 2.94872e6 0.182768
\(765\) 3.74223e6 + 4.23551e6i 0.231194 + 0.261669i
\(766\) 4.13006e7 2.54322
\(767\) 806801.i 0.0495197i
\(768\) 5.83503e6i 0.356977i
\(769\) −2.16009e7 −1.31721 −0.658606 0.752488i \(-0.728854\pi\)
−0.658606 + 0.752488i \(0.728854\pi\)
\(770\) −2.30056e6 + 2.03263e6i −0.139832 + 0.123547i
\(771\) 2.22545e6 0.134829
\(772\) 4.26040e6i 0.257281i
\(773\) 2.83324e7i 1.70543i 0.522373 + 0.852717i \(0.325047\pi\)
−0.522373 + 0.852717i \(0.674953\pi\)
\(774\) 5.16173e6 0.309701
\(775\) 1.22086e6 9.83478e6i 0.0730148 0.588180i
\(776\) −3.21179e6 −0.191467
\(777\) 7.55144e6i 0.448722i
\(778\) 3.94674e7i 2.33770i
\(779\) 1.81468e7 1.07141
\(780\) −2.44244e6 + 2.15799e6i −0.143743 + 0.127003i
\(781\) −4.04721e6 −0.237426
\(782\) 2.65779e7i 1.55419i
\(783\) 2.51562e6i 0.146636i
\(784\) −1.15942e7 −0.673678
\(785\) 1.35898e7 + 1.53811e7i 0.787115 + 0.890866i
\(786\) −9.58365e6 −0.553318
\(787\) 1.78605e7i 1.02791i 0.857816 + 0.513956i \(0.171821\pi\)
−0.857816 + 0.513956i \(0.828179\pi\)
\(788\) 1.33154e7i 0.763903i
\(789\) 2.43149e6 0.139053
\(790\) −4.79836e6 5.43085e6i −0.273543 0.309599i
\(791\) 4.15897e6 0.236344
\(792\) 407414.i 0.0230793i
\(793\) 985198.i 0.0556340i
\(794\) 3372.44 0.000189842
\(795\) 1.46705e7 1.29620e7i 0.823243 0.727367i
\(796\) −1.04282e7 −0.583345
\(797\) 2.12249e7i 1.18359i −0.806090 0.591793i \(-0.798420\pi\)
0.806090 0.591793i \(-0.201580\pi\)
\(798\) 5.09857e6i 0.283427i
\(799\) −2.71766e7 −1.50601
\(800\) −2.57344e7 3.19459e6i −1.42164 0.176478i
\(801\) −4.80290e6 −0.264498
\(802\) 179977.i 0.00988056i
\(803\) 2.24138e6i 0.122667i
\(804\) 1.18474e7 0.646371
\(805\) −5.86693e6 + 5.18366e6i −0.319096 + 0.281933i
\(806\) −4.61177e6 −0.250052
\(807\) 7.54754e6i 0.407964i
\(808\) 5.97990e6i 0.322230i
\(809\) −2.98029e7 −1.60098 −0.800492 0.599343i \(-0.795428\pi\)
−0.800492 + 0.599343i \(0.795428\pi\)
\(810\) 2.01730e6 + 2.28320e6i 0.108033 + 0.122273i
\(811\) 2.84229e6 0.151745 0.0758727 0.997118i \(-0.475826\pi\)
0.0758727 + 0.997118i \(0.475826\pi\)
\(812\) 6.97656e6i 0.371323i
\(813\) 9.13922e6i 0.484934i
\(814\) −1.54361e7 −0.816536
\(815\) −1.20328e6 1.36189e6i −0.0634561 0.0718204i
\(816\) 9.42320e6 0.495419
\(817\) 9.57563e6i 0.501894i
\(818\) 1.18779e6i 0.0620665i
\(819\) −774735. −0.0403593
\(820\) 2.25368e7 1.99121e7i 1.17046 1.03415i
\(821\) 3.04342e7 1.57581 0.787906 0.615795i \(-0.211165\pi\)
0.787906 + 0.615795i \(0.211165\pi\)
\(822\) 1.65752e7i 0.855618i
\(823\) 8.37626e6i 0.431073i −0.976496 0.215536i \(-0.930850\pi\)
0.976496 0.215536i \(-0.0691500\pi\)
\(824\) −3.49980e6 −0.179566
\(825\) 3.37720e6 + 419235.i 0.172752 + 0.0214448i
\(826\) 2.09162e6 0.106668
\(827\) 1.58227e7i 0.804482i −0.915534 0.402241i \(-0.868231\pi\)
0.915534 0.402241i \(-0.131769\pi\)
\(828\) 7.68308e6i 0.389457i
\(829\) −1.41878e7 −0.717016 −0.358508 0.933527i \(-0.616714\pi\)
−0.358508 + 0.933527i \(0.616714\pi\)
\(830\) 2.65515e7 2.34592e7i 1.33781 1.18200i
\(831\) −6.19765e6 −0.311332
\(832\) 7.36837e6i 0.369031i
\(833\) 1.72526e7i 0.861472i
\(834\) −7.87063e6 −0.391827
\(835\) 1.94927e7 + 2.20620e7i 0.967509 + 1.09504i
\(836\) −5.58895e6 −0.276576
\(837\) 2.31187e6i 0.114064i
\(838\) 3.77796e6i 0.185843i
\(839\) −3.30757e7 −1.62220 −0.811099 0.584908i \(-0.801131\pi\)
−0.811099 + 0.584908i \(0.801131\pi\)
\(840\) 756561. + 856285.i 0.0369952 + 0.0418716i
\(841\) −8.60325e6 −0.419442
\(842\) 2.80665e7i 1.36429i
\(843\) 129344.i 0.00626869i
\(844\) −2.92806e7 −1.41489
\(845\) 1.42705e7 1.26086e7i 0.687540 0.607469i
\(846\) −1.46499e7 −0.703733
\(847\) 799916.i 0.0383121i
\(848\) 3.26391e7i 1.55865i
\(849\) 1.11198e7 0.529456
\(850\) 3.99163e6 3.21551e7i 0.189497 1.52652i
\(851\) −3.93653e7 −1.86333
\(852\) 1.11394e7i 0.525732i
\(853\) 1.36981e7i 0.644596i 0.946638 + 0.322298i \(0.104455\pi\)
−0.946638 + 0.322298i \(0.895545\pi\)
\(854\) −2.55411e6 −0.119838
\(855\) 4.23561e6 3.74233e6i 0.198153 0.175076i
\(856\) 6.19117e6 0.288794
\(857\) 3.02670e7i 1.40773i −0.710336 0.703863i \(-0.751457\pi\)
0.710336 0.703863i \(-0.248543\pi\)
\(858\) 1.58365e6i 0.0734416i
\(859\) −3.84178e7 −1.77643 −0.888217 0.459424i \(-0.848056\pi\)
−0.888217 + 0.459424i \(0.848056\pi\)
\(860\) −1.05072e7 1.18921e7i −0.484439 0.548294i
\(861\) 7.14860e6 0.328635
\(862\) 4.71949e7i 2.16335i
\(863\) 4.21231e7i 1.92528i −0.270793 0.962638i \(-0.587286\pi\)
0.270793 0.962638i \(-0.412714\pi\)
\(864\) 6.04940e6 0.275695
\(865\) 6.01217e6 + 6.80465e6i 0.273207 + 0.309219i
\(866\) 1.54650e7 0.700737
\(867\) 1.24326e6i 0.0561714i
\(868\) 6.41149e6i 0.288842i
\(869\) 1.88833e6 0.0848260
\(870\) −1.08077e7 + 9.54905e6i −0.484101 + 0.427722i
\(871\) 6.22765e6 0.278150
\(872\) 3.68386e6i 0.164063i
\(873\) 6.25846e6i 0.277928i
\(874\) −2.65786e7 −1.17694
\(875\) −7.87658e6 + 5.39028e6i −0.347790 + 0.238008i
\(876\) 6.16911e6 0.271620
\(877\) 2.52548e7i 1.10878i 0.832257 + 0.554391i \(0.187049\pi\)
−0.832257 + 0.554391i \(0.812951\pi\)
\(878\) 6.65765e6i 0.291464i
\(879\) −7.14852e6 −0.312064
\(880\) 4.25201e6 3.75682e6i 0.185092 0.163536i
\(881\) −1.22164e7 −0.530279 −0.265139 0.964210i \(-0.585418\pi\)
−0.265139 + 0.964210i \(0.585418\pi\)
\(882\) 9.30021e6i 0.402551i
\(883\) 1.53042e7i 0.660554i −0.943884 0.330277i \(-0.892858\pi\)
0.943884 0.330277i \(-0.107142\pi\)
\(884\) −8.08590e6 −0.348015
\(885\) −1.53524e6 1.73760e6i −0.0658898 0.0745749i
\(886\) 1.86711e7 0.799070
\(887\) 4.48803e7i 1.91534i −0.287861 0.957672i \(-0.592944\pi\)
0.287861 0.957672i \(-0.407056\pi\)
\(888\) 5.74541e6i 0.244505i
\(889\) −7.27488e6 −0.308725
\(890\) 1.82313e7 + 2.06345e7i 0.771514 + 0.873209i
\(891\) −793881. −0.0335013
\(892\) 2.96727e6i 0.124866i
\(893\) 2.71773e7i 1.14045i
\(894\) 3.05680e7 1.27915
\(895\) −2.64829e7 + 2.33987e7i −1.10512 + 0.976414i
\(896\) 4.59437e6 0.191186
\(897\) 4.03866e6i 0.167593i
\(898\) 3.41208e7i 1.41198i
\(899\) −1.09434e7 −0.451600
\(900\) 1.15389e6 9.29532e6i 0.0474852 0.382524i
\(901\) 4.85679e7 1.99314
\(902\) 1.46126e7i 0.598014i
\(903\) 3.77215e6i 0.153946i
\(904\) 3.16429e6 0.128782
\(905\) −1.87439e7 + 1.65610e7i −0.760744 + 0.672147i
\(906\) 2.86289e7 1.15873
\(907\) 898531.i 0.0362673i −0.999836 0.0181336i \(-0.994228\pi\)
0.999836 0.0181336i \(-0.00577243\pi\)
\(908\) 1.99396e7i 0.802604i
\(909\) 1.16524e7 0.467739
\(910\) 2.94082e6 + 3.32846e6i 0.117724 + 0.133241i
\(911\) 1.67133e7 0.667217 0.333609 0.942712i \(-0.391734\pi\)
0.333609 + 0.942712i \(0.391734\pi\)
\(912\) 9.42344e6i 0.375165i
\(913\) 9.23207e6i 0.366541i
\(914\) 5.93583e7 2.35026
\(915\) 1.87471e6 + 2.12182e6i 0.0740254 + 0.0837829i
\(916\) 1.59636e7 0.628625
\(917\) 7.00366e6i 0.275044i
\(918\) 7.55872e6i 0.296034i
\(919\) −1.70008e7 −0.664019 −0.332009 0.943276i \(-0.607727\pi\)
−0.332009 + 0.943276i \(0.607727\pi\)
\(920\) −4.46377e6 + 3.94392e6i −0.173873 + 0.153624i
\(921\) −2.50844e7 −0.974440
\(922\) 3.67435e7i 1.42349i
\(923\) 5.85552e6i 0.226236i
\(924\) −2.20167e6 −0.0848343
\(925\) −4.76258e7 5.91212e6i −1.83016 0.227190i
\(926\) −2.26036e7 −0.866263
\(927\) 6.81966e6i 0.260653i
\(928\) 2.86354e7i 1.09152i
\(929\) −4.86778e7 −1.85051 −0.925255 0.379345i \(-0.876149\pi\)
−0.925255 + 0.379345i \(0.876149\pi\)
\(930\) 9.93236e6 8.77562e6i 0.376569 0.332714i
\(931\) −1.72530e7 −0.652365
\(932\) 5.80030e7i 2.18731i
\(933\) 2.62011e7i 0.985405i
\(934\) 1.72678e7 0.647694
\(935\) 5.59025e6 + 6.32711e6i 0.209123 + 0.236688i
\(936\) −589447. −0.0219915
\(937\) 2.95283e6i 0.109873i 0.998490 + 0.0549363i \(0.0174956\pi\)
−0.998490 + 0.0549363i \(0.982504\pi\)
\(938\) 1.61451e7i 0.599148i
\(939\) 5.06738e6 0.187551
\(940\) 2.98211e7 + 3.37519e7i 1.10079 + 1.24589i
\(941\) −2.28430e7 −0.840969 −0.420484 0.907300i \(-0.638140\pi\)
−0.420484 + 0.907300i \(0.638140\pi\)
\(942\) 2.74492e7i 1.00787i
\(943\) 3.72653e7i 1.36466i
\(944\) −3.86584e6 −0.141193
\(945\) 1.66855e6 1.47422e6i 0.0607797 0.0537012i
\(946\) 7.71074e6 0.280135
\(947\) 2.08580e7i 0.755783i −0.925850 0.377892i \(-0.876649\pi\)
0.925850 0.377892i \(-0.123351\pi\)
\(948\) 5.19739e6i 0.187830i
\(949\) 3.24283e6 0.116885
\(950\) −3.21559e7 3.99173e6i −1.15599 0.143500i
\(951\) 3.98183e6 0.142768
\(952\) 2.83480e6i 0.101375i
\(953\) 4.73251e7i 1.68795i 0.536384 + 0.843974i \(0.319790\pi\)
−0.536384 + 0.843974i \(0.680210\pi\)
\(954\) 2.61812e7 0.931361
\(955\) −3.33826e6 + 2.94949e6i −0.118444 + 0.104650i
\(956\) −1.49060e7 −0.527492
\(957\) 3.75790e6i 0.132637i
\(958\) 6.13225e7i 2.15877i
\(959\) 1.21130e7 0.425311
\(960\) −1.40211e7 1.58692e7i −0.491025 0.555748i
\(961\) −1.85721e7 −0.648713
\(962\) 2.23329e7i 0.778051i
\(963\) 1.20640e7i 0.419206i
\(964\) −4.01466e7 −1.39141
\(965\) 4.26150e6 + 4.82322e6i 0.147314 + 0.166732i
\(966\) −1.04702e7 −0.361003
\(967\) 2.72981e6i 0.0938785i 0.998898 + 0.0469393i \(0.0149467\pi\)
−0.998898 + 0.0469393i \(0.985053\pi\)
\(968\) 608605.i 0.0208760i
\(969\) 1.40223e7 0.479746
\(970\) 2.68879e7 2.37565e7i 0.917545 0.810686i
\(971\) −1.09369e6 −0.0372260 −0.0186130 0.999827i \(-0.505925\pi\)
−0.0186130 + 0.999827i \(0.505925\pi\)
\(972\) 2.18506e6i 0.0741817i
\(973\) 5.75179e6i 0.194770i
\(974\) 3.53173e7 1.19286
\(975\) 606550. 4.88615e6i 0.0204341 0.164610i
\(976\) 4.72064e6 0.158627
\(977\) 5.19943e7i 1.74269i −0.490675 0.871343i \(-0.663250\pi\)
0.490675 0.871343i \(-0.336750\pi\)
\(978\) 2.43044e6i 0.0812528i
\(979\) −7.17471e6 −0.239247
\(980\) −2.14268e7 + 1.89314e7i −0.712676 + 0.629677i
\(981\) 7.17832e6 0.238150
\(982\) 4.77874e7i 1.58137i
\(983\) 3.13653e7i 1.03530i 0.855593 + 0.517649i \(0.173193\pi\)
−0.855593 + 0.517649i \(0.826807\pi\)
\(984\) 5.43892e6 0.179071
\(985\) 1.33188e7 + 1.50744e7i 0.437397 + 0.495051i
\(986\) −3.57798e7 −1.17205
\(987\) 1.07060e7i 0.349812i
\(988\) 8.08610e6i 0.263540i
\(989\) 1.96641e7 0.639267
\(990\) 3.01349e6 + 3.41071e6i 0.0977198 + 0.110600i
\(991\) −2.56995e7 −0.831266 −0.415633 0.909532i \(-0.636440\pi\)
−0.415633 + 0.909532i \(0.636440\pi\)
\(992\) 2.63160e7i 0.849066i
\(993\) 3.02266e7i 0.972782i
\(994\) 1.51804e7 0.487322
\(995\) 1.18058e7 1.04309e7i 0.378040 0.334013i
\(996\) 2.54101e7 0.811630
\(997\) 3.33461e7i 1.06245i −0.847231 0.531224i \(-0.821732\pi\)
0.847231 0.531224i \(-0.178268\pi\)
\(998\) 6.25644e7i 1.98839i
\(999\) 1.11954e7 0.354917
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 165.6.c.a.34.23 yes 26
5.2 odd 4 825.6.a.x.1.2 13
5.3 odd 4 825.6.a.w.1.12 13
5.4 even 2 inner 165.6.c.a.34.4 26
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
165.6.c.a.34.4 26 5.4 even 2 inner
165.6.c.a.34.23 yes 26 1.1 even 1 trivial
825.6.a.w.1.12 13 5.3 odd 4
825.6.a.x.1.2 13 5.2 odd 4