Properties

Label 299.2.a.g.1.9
Level $299$
Weight $2$
Character 299.1
Self dual yes
Analytic conductor $2.388$
Analytic rank $0$
Dimension $10$
CM no
Inner twists $1$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [299,2,Mod(1,299)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(299, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 0]))
 
N = Newforms(chi, 2, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("299.1");
 
S:= CuspForms(chi, 2);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 299 = 13 \cdot 23 \)
Weight: \( k \) \(=\) \( 2 \)
Character orbit: \([\chi]\) \(=\) 299.a (trivial)

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: yes
Analytic conductor: \(2.38752702044\)
Analytic rank: \(0\)
Dimension: \(10\)
Coefficient field: \(\mathbb{Q}[x]/(x^{10} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{10} - x^{9} - 19x^{8} + 18x^{7} + 127x^{6} - 109x^{5} - 357x^{4} + 252x^{3} + 400x^{2} - 192x - 128 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 2 \)
Twist minimal: yes
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.9
Root \(2.26436\) of defining polynomial
Character \(\chi\) \(=\) 299.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+2.26436 q^{2} +2.37123 q^{3} +3.12732 q^{4} -3.16568 q^{5} +5.36932 q^{6} +1.09348 q^{7} +2.55266 q^{8} +2.62273 q^{9} +O(q^{10})\) \(q+2.26436 q^{2} +2.37123 q^{3} +3.12732 q^{4} -3.16568 q^{5} +5.36932 q^{6} +1.09348 q^{7} +2.55266 q^{8} +2.62273 q^{9} -7.16824 q^{10} -5.61162 q^{11} +7.41560 q^{12} -1.00000 q^{13} +2.47604 q^{14} -7.50657 q^{15} -0.474506 q^{16} -0.216286 q^{17} +5.93881 q^{18} +6.03266 q^{19} -9.90011 q^{20} +2.59290 q^{21} -12.7067 q^{22} +1.00000 q^{23} +6.05294 q^{24} +5.02155 q^{25} -2.26436 q^{26} -0.894583 q^{27} +3.41967 q^{28} +9.11937 q^{29} -16.9976 q^{30} +8.04245 q^{31} -6.17977 q^{32} -13.3064 q^{33} -0.489750 q^{34} -3.46162 q^{35} +8.20213 q^{36} -2.55717 q^{37} +13.6601 q^{38} -2.37123 q^{39} -8.08091 q^{40} -7.13855 q^{41} +5.87126 q^{42} +4.22532 q^{43} -17.5493 q^{44} -8.30275 q^{45} +2.26436 q^{46} -1.07565 q^{47} -1.12516 q^{48} -5.80429 q^{49} +11.3706 q^{50} -0.512864 q^{51} -3.12732 q^{52} +0.577213 q^{53} -2.02566 q^{54} +17.7646 q^{55} +2.79129 q^{56} +14.3048 q^{57} +20.6495 q^{58} -4.96068 q^{59} -23.4754 q^{60} +8.94721 q^{61} +18.2110 q^{62} +2.86792 q^{63} -13.0442 q^{64} +3.16568 q^{65} -30.1306 q^{66} +7.26955 q^{67} -0.676396 q^{68} +2.37123 q^{69} -7.83835 q^{70} +8.41151 q^{71} +6.69495 q^{72} -9.27194 q^{73} -5.79035 q^{74} +11.9073 q^{75} +18.8661 q^{76} -6.13621 q^{77} -5.36932 q^{78} +4.24311 q^{79} +1.50214 q^{80} -9.98947 q^{81} -16.1642 q^{82} -6.74657 q^{83} +8.10883 q^{84} +0.684694 q^{85} +9.56764 q^{86} +21.6241 q^{87} -14.3246 q^{88} -15.0002 q^{89} -18.8004 q^{90} -1.09348 q^{91} +3.12732 q^{92} +19.0705 q^{93} -2.43566 q^{94} -19.0975 q^{95} -14.6537 q^{96} -15.7654 q^{97} -13.1430 q^{98} -14.7178 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 10 q + q^{2} + 3 q^{3} + 19 q^{4} + 3 q^{5} + q^{6} - 2 q^{7} + 17 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 10 q + q^{2} + 3 q^{3} + 19 q^{4} + 3 q^{5} + q^{6} - 2 q^{7} + 17 q^{9} + 6 q^{10} + 3 q^{11} + 10 q^{12} - 10 q^{13} - 15 q^{14} + 2 q^{15} + 25 q^{16} - 3 q^{17} + q^{18} + 2 q^{19} - 19 q^{20} + 21 q^{21} + 13 q^{22} + 10 q^{23} - 35 q^{24} + 33 q^{25} - q^{26} + 6 q^{27} - 19 q^{28} + 17 q^{29} - 47 q^{30} + 5 q^{31} - 9 q^{32} - 23 q^{33} + 23 q^{34} + 3 q^{35} + 48 q^{36} + 16 q^{37} + 5 q^{38} - 3 q^{39} + 13 q^{40} - 16 q^{41} - 65 q^{42} - 9 q^{43} + 18 q^{44} + 32 q^{45} + q^{46} - 11 q^{47} + 37 q^{48} + 40 q^{49} - 30 q^{50} - 31 q^{51} - 19 q^{52} + 8 q^{53} - 73 q^{54} - 14 q^{55} - 54 q^{56} - 35 q^{57} + 17 q^{58} + 2 q^{59} - 37 q^{60} + 48 q^{61} - 19 q^{62} - 15 q^{63} + 64 q^{64} - 3 q^{65} - 84 q^{66} - 6 q^{67} - 62 q^{68} + 3 q^{69} - 44 q^{70} + 24 q^{71} - 89 q^{72} - 33 q^{73} - 28 q^{74} - 22 q^{75} - 53 q^{76} + 15 q^{77} - q^{78} + 17 q^{79} - 94 q^{80} + 30 q^{81} + 35 q^{82} - 21 q^{83} + 92 q^{84} + 58 q^{85} - 7 q^{86} + 23 q^{87} + 9 q^{88} - 16 q^{89} + 67 q^{90} + 2 q^{91} + 19 q^{92} + 15 q^{93} + 12 q^{94} - 27 q^{95} - 22 q^{96} - 40 q^{97} - 34 q^{98} - 17 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 2.26436 1.60114 0.800572 0.599237i \(-0.204529\pi\)
0.800572 + 0.599237i \(0.204529\pi\)
\(3\) 2.37123 1.36903 0.684515 0.728998i \(-0.260014\pi\)
0.684515 + 0.728998i \(0.260014\pi\)
\(4\) 3.12732 1.56366
\(5\) −3.16568 −1.41574 −0.707868 0.706344i \(-0.750343\pi\)
−0.707868 + 0.706344i \(0.750343\pi\)
\(6\) 5.36932 2.19201
\(7\) 1.09348 0.413298 0.206649 0.978415i \(-0.433744\pi\)
0.206649 + 0.978415i \(0.433744\pi\)
\(8\) 2.55266 0.902501
\(9\) 2.62273 0.874245
\(10\) −7.16824 −2.26680
\(11\) −5.61162 −1.69197 −0.845984 0.533209i \(-0.820986\pi\)
−0.845984 + 0.533209i \(0.820986\pi\)
\(12\) 7.41560 2.14070
\(13\) −1.00000 −0.277350
\(14\) 2.47604 0.661749
\(15\) −7.50657 −1.93819
\(16\) −0.474506 −0.118627
\(17\) −0.216286 −0.0524571 −0.0262286 0.999656i \(-0.508350\pi\)
−0.0262286 + 0.999656i \(0.508350\pi\)
\(18\) 5.93881 1.39979
\(19\) 6.03266 1.38399 0.691994 0.721904i \(-0.256733\pi\)
0.691994 + 0.721904i \(0.256733\pi\)
\(20\) −9.90011 −2.21373
\(21\) 2.59290 0.565817
\(22\) −12.7067 −2.70908
\(23\) 1.00000 0.208514
\(24\) 6.05294 1.23555
\(25\) 5.02155 1.00431
\(26\) −2.26436 −0.444077
\(27\) −0.894583 −0.172163
\(28\) 3.41967 0.646257
\(29\) 9.11937 1.69342 0.846712 0.532051i \(-0.178578\pi\)
0.846712 + 0.532051i \(0.178578\pi\)
\(30\) −16.9976 −3.10332
\(31\) 8.04245 1.44447 0.722234 0.691649i \(-0.243115\pi\)
0.722234 + 0.691649i \(0.243115\pi\)
\(32\) −6.17977 −1.09244
\(33\) −13.3064 −2.31636
\(34\) −0.489750 −0.0839914
\(35\) −3.46162 −0.585121
\(36\) 8.20213 1.36702
\(37\) −2.55717 −0.420396 −0.210198 0.977659i \(-0.567411\pi\)
−0.210198 + 0.977659i \(0.567411\pi\)
\(38\) 13.6601 2.21596
\(39\) −2.37123 −0.379701
\(40\) −8.08091 −1.27770
\(41\) −7.13855 −1.11485 −0.557427 0.830226i \(-0.688211\pi\)
−0.557427 + 0.830226i \(0.688211\pi\)
\(42\) 5.87126 0.905955
\(43\) 4.22532 0.644355 0.322178 0.946679i \(-0.395585\pi\)
0.322178 + 0.946679i \(0.395585\pi\)
\(44\) −17.5493 −2.64566
\(45\) −8.30275 −1.23770
\(46\) 2.26436 0.333861
\(47\) −1.07565 −0.156900 −0.0784500 0.996918i \(-0.524997\pi\)
−0.0784500 + 0.996918i \(0.524997\pi\)
\(48\) −1.12516 −0.162403
\(49\) −5.80429 −0.829185
\(50\) 11.3706 1.60805
\(51\) −0.512864 −0.0718154
\(52\) −3.12732 −0.433681
\(53\) 0.577213 0.0792863 0.0396431 0.999214i \(-0.487378\pi\)
0.0396431 + 0.999214i \(0.487378\pi\)
\(54\) −2.02566 −0.275657
\(55\) 17.7646 2.39538
\(56\) 2.79129 0.373002
\(57\) 14.3048 1.89472
\(58\) 20.6495 2.71142
\(59\) −4.96068 −0.645825 −0.322913 0.946429i \(-0.604662\pi\)
−0.322913 + 0.946429i \(0.604662\pi\)
\(60\) −23.4754 −3.03067
\(61\) 8.94721 1.14557 0.572787 0.819704i \(-0.305862\pi\)
0.572787 + 0.819704i \(0.305862\pi\)
\(62\) 18.2110 2.31280
\(63\) 2.86792 0.361323
\(64\) −13.0442 −1.63053
\(65\) 3.16568 0.392655
\(66\) −30.1306 −3.70882
\(67\) 7.26955 0.888117 0.444059 0.895998i \(-0.353538\pi\)
0.444059 + 0.895998i \(0.353538\pi\)
\(68\) −0.676396 −0.0820251
\(69\) 2.37123 0.285463
\(70\) −7.83835 −0.936862
\(71\) 8.41151 0.998263 0.499131 0.866526i \(-0.333653\pi\)
0.499131 + 0.866526i \(0.333653\pi\)
\(72\) 6.69495 0.789007
\(73\) −9.27194 −1.08520 −0.542599 0.839992i \(-0.682560\pi\)
−0.542599 + 0.839992i \(0.682560\pi\)
\(74\) −5.79035 −0.673114
\(75\) 11.9073 1.37493
\(76\) 18.8661 2.16409
\(77\) −6.13621 −0.699286
\(78\) −5.36932 −0.607955
\(79\) 4.24311 0.477387 0.238693 0.971095i \(-0.423281\pi\)
0.238693 + 0.971095i \(0.423281\pi\)
\(80\) 1.50214 0.167944
\(81\) −9.98947 −1.10994
\(82\) −16.1642 −1.78504
\(83\) −6.74657 −0.740533 −0.370266 0.928926i \(-0.620734\pi\)
−0.370266 + 0.928926i \(0.620734\pi\)
\(84\) 8.10883 0.884746
\(85\) 0.684694 0.0742655
\(86\) 9.56764 1.03171
\(87\) 21.6241 2.31835
\(88\) −14.3246 −1.52700
\(89\) −15.0002 −1.59002 −0.795008 0.606599i \(-0.792534\pi\)
−0.795008 + 0.606599i \(0.792534\pi\)
\(90\) −18.8004 −1.98174
\(91\) −1.09348 −0.114628
\(92\) 3.12732 0.326046
\(93\) 19.0705 1.97752
\(94\) −2.43566 −0.251219
\(95\) −19.0975 −1.95936
\(96\) −14.6537 −1.49558
\(97\) −15.7654 −1.60073 −0.800366 0.599512i \(-0.795361\pi\)
−0.800366 + 0.599512i \(0.795361\pi\)
\(98\) −13.1430 −1.32764
\(99\) −14.7178 −1.47919
\(100\) 15.7040 1.57040
\(101\) 4.71172 0.468833 0.234417 0.972136i \(-0.424682\pi\)
0.234417 + 0.972136i \(0.424682\pi\)
\(102\) −1.16131 −0.114987
\(103\) −10.9592 −1.07984 −0.539921 0.841716i \(-0.681546\pi\)
−0.539921 + 0.841716i \(0.681546\pi\)
\(104\) −2.55266 −0.250309
\(105\) −8.20830 −0.801048
\(106\) 1.30702 0.126949
\(107\) 15.2331 1.47264 0.736319 0.676635i \(-0.236562\pi\)
0.736319 + 0.676635i \(0.236562\pi\)
\(108\) −2.79765 −0.269204
\(109\) 0.662195 0.0634268 0.0317134 0.999497i \(-0.489904\pi\)
0.0317134 + 0.999497i \(0.489904\pi\)
\(110\) 40.2255 3.83535
\(111\) −6.06364 −0.575535
\(112\) −0.518864 −0.0490281
\(113\) 4.97000 0.467538 0.233769 0.972292i \(-0.424894\pi\)
0.233769 + 0.972292i \(0.424894\pi\)
\(114\) 32.3913 3.03372
\(115\) −3.16568 −0.295202
\(116\) 28.5192 2.64794
\(117\) −2.62273 −0.242472
\(118\) −11.2328 −1.03406
\(119\) −0.236505 −0.0216804
\(120\) −19.1617 −1.74922
\(121\) 20.4903 1.86275
\(122\) 20.2597 1.83423
\(123\) −16.9271 −1.52627
\(124\) 25.1513 2.25866
\(125\) −0.0682287 −0.00610256
\(126\) 6.49399 0.578531
\(127\) −3.66248 −0.324992 −0.162496 0.986709i \(-0.551955\pi\)
−0.162496 + 0.986709i \(0.551955\pi\)
\(128\) −17.1772 −1.51827
\(129\) 10.0192 0.882142
\(130\) 7.16824 0.628697
\(131\) 9.96833 0.870937 0.435468 0.900204i \(-0.356583\pi\)
0.435468 + 0.900204i \(0.356583\pi\)
\(132\) −41.6135 −3.62199
\(133\) 6.59661 0.571999
\(134\) 16.4609 1.42200
\(135\) 2.83197 0.243737
\(136\) −0.552105 −0.0473426
\(137\) −1.03707 −0.0886028 −0.0443014 0.999018i \(-0.514106\pi\)
−0.0443014 + 0.999018i \(0.514106\pi\)
\(138\) 5.36932 0.457067
\(139\) −14.0681 −1.19324 −0.596620 0.802524i \(-0.703490\pi\)
−0.596620 + 0.802524i \(0.703490\pi\)
\(140\) −10.8256 −0.914930
\(141\) −2.55062 −0.214801
\(142\) 19.0467 1.59836
\(143\) 5.61162 0.469267
\(144\) −1.24450 −0.103709
\(145\) −28.8690 −2.39744
\(146\) −20.9950 −1.73756
\(147\) −13.7633 −1.13518
\(148\) −7.99709 −0.657356
\(149\) 4.42571 0.362568 0.181284 0.983431i \(-0.441975\pi\)
0.181284 + 0.983431i \(0.441975\pi\)
\(150\) 26.9623 2.20146
\(151\) −11.0342 −0.897950 −0.448975 0.893544i \(-0.648211\pi\)
−0.448975 + 0.893544i \(0.648211\pi\)
\(152\) 15.3993 1.24905
\(153\) −0.567261 −0.0458604
\(154\) −13.8946 −1.11966
\(155\) −25.4599 −2.04499
\(156\) −7.41560 −0.593723
\(157\) 6.92247 0.552473 0.276237 0.961090i \(-0.410913\pi\)
0.276237 + 0.961090i \(0.410913\pi\)
\(158\) 9.60792 0.764365
\(159\) 1.36870 0.108545
\(160\) 19.5632 1.54661
\(161\) 1.09348 0.0861785
\(162\) −22.6197 −1.77717
\(163\) 14.4924 1.13513 0.567566 0.823328i \(-0.307885\pi\)
0.567566 + 0.823328i \(0.307885\pi\)
\(164\) −22.3245 −1.74325
\(165\) 42.1240 3.27935
\(166\) −15.2767 −1.18570
\(167\) 0.492391 0.0381024 0.0190512 0.999819i \(-0.493935\pi\)
0.0190512 + 0.999819i \(0.493935\pi\)
\(168\) 6.61879 0.510651
\(169\) 1.00000 0.0769231
\(170\) 1.55039 0.118910
\(171\) 15.8221 1.20994
\(172\) 13.2139 1.00755
\(173\) −6.92186 −0.526259 −0.263129 0.964761i \(-0.584755\pi\)
−0.263129 + 0.964761i \(0.584755\pi\)
\(174\) 48.9648 3.71201
\(175\) 5.49098 0.415079
\(176\) 2.66275 0.200712
\(177\) −11.7629 −0.884154
\(178\) −33.9658 −2.54584
\(179\) 24.1437 1.80458 0.902292 0.431126i \(-0.141884\pi\)
0.902292 + 0.431126i \(0.141884\pi\)
\(180\) −25.9654 −1.93534
\(181\) 14.6257 1.08712 0.543560 0.839370i \(-0.317076\pi\)
0.543560 + 0.839370i \(0.317076\pi\)
\(182\) −2.47604 −0.183536
\(183\) 21.2159 1.56832
\(184\) 2.55266 0.188185
\(185\) 8.09519 0.595170
\(186\) 43.1825 3.16629
\(187\) 1.21372 0.0887557
\(188\) −3.36391 −0.245338
\(189\) −0.978212 −0.0711544
\(190\) −43.2436 −3.13722
\(191\) −21.7537 −1.57404 −0.787021 0.616927i \(-0.788377\pi\)
−0.787021 + 0.616927i \(0.788377\pi\)
\(192\) −30.9308 −2.23224
\(193\) 5.42681 0.390630 0.195315 0.980741i \(-0.437427\pi\)
0.195315 + 0.980741i \(0.437427\pi\)
\(194\) −35.6985 −2.56300
\(195\) 7.50657 0.537556
\(196\) −18.1519 −1.29656
\(197\) 19.1789 1.36644 0.683221 0.730211i \(-0.260578\pi\)
0.683221 + 0.730211i \(0.260578\pi\)
\(198\) −33.3264 −2.36840
\(199\) −15.0120 −1.06417 −0.532086 0.846690i \(-0.678592\pi\)
−0.532086 + 0.846690i \(0.678592\pi\)
\(200\) 12.8183 0.906391
\(201\) 17.2378 1.21586
\(202\) 10.6690 0.750669
\(203\) 9.97188 0.699889
\(204\) −1.60389 −0.112295
\(205\) 22.5984 1.57834
\(206\) −24.8156 −1.72898
\(207\) 2.62273 0.182293
\(208\) 0.474506 0.0329011
\(209\) −33.8530 −2.34166
\(210\) −18.5865 −1.28259
\(211\) −25.3580 −1.74571 −0.872857 0.487976i \(-0.837735\pi\)
−0.872857 + 0.487976i \(0.837735\pi\)
\(212\) 1.80513 0.123977
\(213\) 19.9456 1.36665
\(214\) 34.4932 2.35790
\(215\) −13.3760 −0.912238
\(216\) −2.28357 −0.155377
\(217\) 8.79429 0.596995
\(218\) 1.49945 0.101555
\(219\) −21.9859 −1.48567
\(220\) 55.5557 3.74556
\(221\) 0.216286 0.0145490
\(222\) −13.7302 −0.921514
\(223\) −8.19092 −0.548505 −0.274252 0.961658i \(-0.588430\pi\)
−0.274252 + 0.961658i \(0.588430\pi\)
\(224\) −6.75747 −0.451503
\(225\) 13.1702 0.878013
\(226\) 11.2539 0.748595
\(227\) 18.0533 1.19824 0.599120 0.800659i \(-0.295517\pi\)
0.599120 + 0.800659i \(0.295517\pi\)
\(228\) 44.7358 2.96270
\(229\) 3.12577 0.206557 0.103278 0.994652i \(-0.467067\pi\)
0.103278 + 0.994652i \(0.467067\pi\)
\(230\) −7.16824 −0.472660
\(231\) −14.5504 −0.957344
\(232\) 23.2786 1.52832
\(233\) 16.0182 1.04938 0.524692 0.851292i \(-0.324180\pi\)
0.524692 + 0.851292i \(0.324180\pi\)
\(234\) −5.93881 −0.388232
\(235\) 3.40517 0.222129
\(236\) −15.5136 −1.00985
\(237\) 10.0614 0.653557
\(238\) −0.535533 −0.0347134
\(239\) −22.1469 −1.43256 −0.716282 0.697811i \(-0.754157\pi\)
−0.716282 + 0.697811i \(0.754157\pi\)
\(240\) 3.56191 0.229920
\(241\) 29.1271 1.87624 0.938120 0.346309i \(-0.112565\pi\)
0.938120 + 0.346309i \(0.112565\pi\)
\(242\) 46.3974 2.98254
\(243\) −21.0036 −1.34738
\(244\) 27.9808 1.79129
\(245\) 18.3746 1.17391
\(246\) −38.3291 −2.44378
\(247\) −6.03266 −0.383849
\(248\) 20.5296 1.30363
\(249\) −15.9977 −1.01381
\(250\) −0.154494 −0.00977107
\(251\) −16.6635 −1.05179 −0.525895 0.850549i \(-0.676270\pi\)
−0.525895 + 0.850549i \(0.676270\pi\)
\(252\) 8.96889 0.564987
\(253\) −5.61162 −0.352800
\(254\) −8.29317 −0.520360
\(255\) 1.62357 0.101672
\(256\) −12.8070 −0.800436
\(257\) −20.0539 −1.25093 −0.625464 0.780253i \(-0.715090\pi\)
−0.625464 + 0.780253i \(0.715090\pi\)
\(258\) 22.6871 1.41244
\(259\) −2.79622 −0.173749
\(260\) 9.90011 0.613979
\(261\) 23.9177 1.48047
\(262\) 22.5719 1.39449
\(263\) −9.00900 −0.555519 −0.277759 0.960651i \(-0.589592\pi\)
−0.277759 + 0.960651i \(0.589592\pi\)
\(264\) −33.9668 −2.09051
\(265\) −1.82727 −0.112248
\(266\) 14.9371 0.915852
\(267\) −35.5689 −2.17678
\(268\) 22.7342 1.38871
\(269\) −19.1642 −1.16846 −0.584230 0.811588i \(-0.698603\pi\)
−0.584230 + 0.811588i \(0.698603\pi\)
\(270\) 6.41259 0.390258
\(271\) 15.6869 0.952911 0.476456 0.879199i \(-0.341921\pi\)
0.476456 + 0.879199i \(0.341921\pi\)
\(272\) 0.102629 0.00622281
\(273\) −2.59290 −0.156929
\(274\) −2.34830 −0.141866
\(275\) −28.1791 −1.69926
\(276\) 7.41560 0.446367
\(277\) 22.6425 1.36046 0.680229 0.733000i \(-0.261881\pi\)
0.680229 + 0.733000i \(0.261881\pi\)
\(278\) −31.8552 −1.91055
\(279\) 21.0932 1.26282
\(280\) −8.83634 −0.528072
\(281\) 30.3083 1.80804 0.904021 0.427488i \(-0.140601\pi\)
0.904021 + 0.427488i \(0.140601\pi\)
\(282\) −5.77552 −0.343927
\(283\) 4.31430 0.256459 0.128229 0.991745i \(-0.459071\pi\)
0.128229 + 0.991745i \(0.459071\pi\)
\(284\) 26.3055 1.56094
\(285\) −45.2846 −2.68243
\(286\) 12.7067 0.751364
\(287\) −7.80588 −0.460767
\(288\) −16.2079 −0.955059
\(289\) −16.9532 −0.997248
\(290\) −65.3699 −3.83865
\(291\) −37.3833 −2.19145
\(292\) −28.9963 −1.69688
\(293\) −26.1259 −1.52629 −0.763145 0.646228i \(-0.776346\pi\)
−0.763145 + 0.646228i \(0.776346\pi\)
\(294\) −31.1651 −1.81759
\(295\) 15.7039 0.914318
\(296\) −6.52758 −0.379408
\(297\) 5.02006 0.291294
\(298\) 10.0214 0.580524
\(299\) −1.00000 −0.0578315
\(300\) 37.2378 2.14993
\(301\) 4.62032 0.266311
\(302\) −24.9854 −1.43775
\(303\) 11.1726 0.641847
\(304\) −2.86253 −0.164178
\(305\) −28.3240 −1.62183
\(306\) −1.28448 −0.0734290
\(307\) −15.1631 −0.865404 −0.432702 0.901537i \(-0.642440\pi\)
−0.432702 + 0.901537i \(0.642440\pi\)
\(308\) −19.1899 −1.09345
\(309\) −25.9868 −1.47834
\(310\) −57.6503 −3.27432
\(311\) −7.65322 −0.433975 −0.216987 0.976174i \(-0.569623\pi\)
−0.216987 + 0.976174i \(0.569623\pi\)
\(312\) −6.05294 −0.342680
\(313\) 16.6191 0.939365 0.469683 0.882835i \(-0.344368\pi\)
0.469683 + 0.882835i \(0.344368\pi\)
\(314\) 15.6750 0.884589
\(315\) −9.07891 −0.511539
\(316\) 13.2696 0.746471
\(317\) −21.0679 −1.18329 −0.591646 0.806198i \(-0.701522\pi\)
−0.591646 + 0.806198i \(0.701522\pi\)
\(318\) 3.09924 0.173797
\(319\) −51.1745 −2.86522
\(320\) 41.2938 2.30839
\(321\) 36.1211 2.01609
\(322\) 2.47604 0.137984
\(323\) −1.30478 −0.0726000
\(324\) −31.2403 −1.73557
\(325\) −5.02155 −0.278546
\(326\) 32.8160 1.81751
\(327\) 1.57022 0.0868332
\(328\) −18.2223 −1.00616
\(329\) −1.17621 −0.0648464
\(330\) 95.3839 5.25071
\(331\) 22.6982 1.24761 0.623803 0.781581i \(-0.285587\pi\)
0.623803 + 0.781581i \(0.285587\pi\)
\(332\) −21.0987 −1.15794
\(333\) −6.70677 −0.367529
\(334\) 1.11495 0.0610074
\(335\) −23.0131 −1.25734
\(336\) −1.23035 −0.0671209
\(337\) −36.5071 −1.98867 −0.994334 0.106302i \(-0.966099\pi\)
−0.994334 + 0.106302i \(0.966099\pi\)
\(338\) 2.26436 0.123165
\(339\) 11.7850 0.640074
\(340\) 2.14126 0.116126
\(341\) −45.1312 −2.44399
\(342\) 35.8268 1.93729
\(343\) −14.0013 −0.755998
\(344\) 10.7858 0.581532
\(345\) −7.50657 −0.404140
\(346\) −15.6736 −0.842616
\(347\) 0.190187 0.0102098 0.00510488 0.999987i \(-0.498375\pi\)
0.00510488 + 0.999987i \(0.498375\pi\)
\(348\) 67.6256 3.62511
\(349\) 11.6025 0.621067 0.310533 0.950563i \(-0.399492\pi\)
0.310533 + 0.950563i \(0.399492\pi\)
\(350\) 12.4336 0.664601
\(351\) 0.894583 0.0477493
\(352\) 34.6785 1.84837
\(353\) 10.1717 0.541388 0.270694 0.962666i \(-0.412747\pi\)
0.270694 + 0.962666i \(0.412747\pi\)
\(354\) −26.6354 −1.41566
\(355\) −26.6282 −1.41328
\(356\) −46.9104 −2.48625
\(357\) −0.560809 −0.0296811
\(358\) 54.6700 2.88940
\(359\) −9.74914 −0.514540 −0.257270 0.966340i \(-0.582823\pi\)
−0.257270 + 0.966340i \(0.582823\pi\)
\(360\) −21.1941 −1.11703
\(361\) 17.3930 0.915420
\(362\) 33.1178 1.74064
\(363\) 48.5872 2.55017
\(364\) −3.41967 −0.179240
\(365\) 29.3520 1.53636
\(366\) 48.0404 2.51111
\(367\) 21.6515 1.13020 0.565101 0.825022i \(-0.308837\pi\)
0.565101 + 0.825022i \(0.308837\pi\)
\(368\) −0.474506 −0.0247353
\(369\) −18.7225 −0.974655
\(370\) 18.3304 0.952952
\(371\) 0.631172 0.0327688
\(372\) 59.6396 3.09217
\(373\) −4.61039 −0.238717 −0.119359 0.992851i \(-0.538084\pi\)
−0.119359 + 0.992851i \(0.538084\pi\)
\(374\) 2.74829 0.142111
\(375\) −0.161786 −0.00835459
\(376\) −2.74577 −0.141602
\(377\) −9.11937 −0.469672
\(378\) −2.21502 −0.113928
\(379\) −16.8903 −0.867594 −0.433797 0.901011i \(-0.642827\pi\)
−0.433797 + 0.901011i \(0.642827\pi\)
\(380\) −59.7240 −3.06378
\(381\) −8.68458 −0.444925
\(382\) −49.2581 −2.52027
\(383\) 21.1619 1.08132 0.540661 0.841240i \(-0.318174\pi\)
0.540661 + 0.841240i \(0.318174\pi\)
\(384\) −40.7311 −2.07855
\(385\) 19.4253 0.990005
\(386\) 12.2882 0.625455
\(387\) 11.0819 0.563324
\(388\) −49.3034 −2.50300
\(389\) −16.3200 −0.827455 −0.413727 0.910401i \(-0.635773\pi\)
−0.413727 + 0.910401i \(0.635773\pi\)
\(390\) 16.9976 0.860705
\(391\) −0.216286 −0.0109381
\(392\) −14.8164 −0.748340
\(393\) 23.6372 1.19234
\(394\) 43.4280 2.18787
\(395\) −13.4323 −0.675854
\(396\) −46.0273 −2.31296
\(397\) 8.97905 0.450646 0.225323 0.974284i \(-0.427656\pi\)
0.225323 + 0.974284i \(0.427656\pi\)
\(398\) −33.9925 −1.70389
\(399\) 15.6421 0.783084
\(400\) −2.38276 −0.119138
\(401\) 23.0991 1.15351 0.576757 0.816916i \(-0.304318\pi\)
0.576757 + 0.816916i \(0.304318\pi\)
\(402\) 39.0325 1.94677
\(403\) −8.04245 −0.400623
\(404\) 14.7350 0.733096
\(405\) 31.6235 1.57138
\(406\) 22.5799 1.12062
\(407\) 14.3499 0.711296
\(408\) −1.30917 −0.0648135
\(409\) 5.51078 0.272491 0.136245 0.990675i \(-0.456496\pi\)
0.136245 + 0.990675i \(0.456496\pi\)
\(410\) 51.1708 2.52715
\(411\) −2.45913 −0.121300
\(412\) −34.2729 −1.68851
\(413\) −5.42442 −0.266918
\(414\) 5.93881 0.291877
\(415\) 21.3575 1.04840
\(416\) 6.17977 0.302988
\(417\) −33.3587 −1.63358
\(418\) −76.6553 −3.74934
\(419\) 7.11440 0.347561 0.173781 0.984784i \(-0.444402\pi\)
0.173781 + 0.984784i \(0.444402\pi\)
\(420\) −25.6700 −1.25257
\(421\) −1.96792 −0.0959107 −0.0479554 0.998849i \(-0.515271\pi\)
−0.0479554 + 0.998849i \(0.515271\pi\)
\(422\) −57.4195 −2.79514
\(423\) −2.82115 −0.137169
\(424\) 1.47343 0.0715559
\(425\) −1.08609 −0.0526832
\(426\) 45.1641 2.18821
\(427\) 9.78363 0.473463
\(428\) 47.6387 2.30270
\(429\) 13.3064 0.642441
\(430\) −30.2881 −1.46062
\(431\) −1.92926 −0.0929293 −0.0464647 0.998920i \(-0.514795\pi\)
−0.0464647 + 0.998920i \(0.514795\pi\)
\(432\) 0.424485 0.0204231
\(433\) −16.8576 −0.810124 −0.405062 0.914289i \(-0.632750\pi\)
−0.405062 + 0.914289i \(0.632750\pi\)
\(434\) 19.9134 0.955875
\(435\) −68.4552 −3.28217
\(436\) 2.07090 0.0991780
\(437\) 6.03266 0.288581
\(438\) −49.7840 −2.37877
\(439\) 17.6365 0.841746 0.420873 0.907120i \(-0.361724\pi\)
0.420873 + 0.907120i \(0.361724\pi\)
\(440\) 45.3470 2.16183
\(441\) −15.2231 −0.724911
\(442\) 0.489750 0.0232950
\(443\) 21.6353 1.02792 0.513961 0.857813i \(-0.328178\pi\)
0.513961 + 0.857813i \(0.328178\pi\)
\(444\) −18.9629 −0.899941
\(445\) 47.4858 2.25104
\(446\) −18.5472 −0.878235
\(447\) 10.4944 0.496367
\(448\) −14.2636 −0.673893
\(449\) −14.4722 −0.682984 −0.341492 0.939885i \(-0.610932\pi\)
−0.341492 + 0.939885i \(0.610932\pi\)
\(450\) 29.8221 1.40583
\(451\) 40.0588 1.88630
\(452\) 15.5428 0.731070
\(453\) −26.1646 −1.22932
\(454\) 40.8791 1.91855
\(455\) 3.46162 0.162283
\(456\) 36.5153 1.70999
\(457\) −15.1384 −0.708143 −0.354071 0.935218i \(-0.615203\pi\)
−0.354071 + 0.935218i \(0.615203\pi\)
\(458\) 7.07787 0.330727
\(459\) 0.193486 0.00903115
\(460\) −9.90011 −0.461595
\(461\) −11.9706 −0.557524 −0.278762 0.960360i \(-0.589924\pi\)
−0.278762 + 0.960360i \(0.589924\pi\)
\(462\) −32.9473 −1.53285
\(463\) 17.4422 0.810608 0.405304 0.914182i \(-0.367166\pi\)
0.405304 + 0.914182i \(0.367166\pi\)
\(464\) −4.32720 −0.200885
\(465\) −60.3712 −2.79965
\(466\) 36.2709 1.68022
\(467\) 1.56771 0.0725450 0.0362725 0.999342i \(-0.488452\pi\)
0.0362725 + 0.999342i \(0.488452\pi\)
\(468\) −8.20213 −0.379144
\(469\) 7.94913 0.367057
\(470\) 7.71054 0.355660
\(471\) 16.4148 0.756353
\(472\) −12.6629 −0.582858
\(473\) −23.7109 −1.09023
\(474\) 22.7826 1.04644
\(475\) 30.2933 1.38995
\(476\) −0.739628 −0.0339008
\(477\) 1.51388 0.0693156
\(478\) −50.1485 −2.29374
\(479\) −12.2507 −0.559749 −0.279875 0.960037i \(-0.590293\pi\)
−0.279875 + 0.960037i \(0.590293\pi\)
\(480\) 46.3888 2.11735
\(481\) 2.55717 0.116597
\(482\) 65.9542 3.00413
\(483\) 2.59290 0.117981
\(484\) 64.0797 2.91271
\(485\) 49.9082 2.26621
\(486\) −47.5596 −2.15735
\(487\) 27.1802 1.23165 0.615827 0.787881i \(-0.288822\pi\)
0.615827 + 0.787881i \(0.288822\pi\)
\(488\) 22.8392 1.03388
\(489\) 34.3648 1.55403
\(490\) 41.6066 1.87959
\(491\) −18.1400 −0.818648 −0.409324 0.912389i \(-0.634235\pi\)
−0.409324 + 0.912389i \(0.634235\pi\)
\(492\) −52.9366 −2.38657
\(493\) −1.97239 −0.0888322
\(494\) −13.6601 −0.614597
\(495\) 46.5919 2.09415
\(496\) −3.81619 −0.171352
\(497\) 9.19785 0.412580
\(498\) −36.2245 −1.62326
\(499\) −41.6502 −1.86452 −0.932260 0.361789i \(-0.882166\pi\)
−0.932260 + 0.361789i \(0.882166\pi\)
\(500\) −0.213373 −0.00954233
\(501\) 1.16757 0.0521633
\(502\) −37.7321 −1.68407
\(503\) 21.7307 0.968925 0.484463 0.874812i \(-0.339015\pi\)
0.484463 + 0.874812i \(0.339015\pi\)
\(504\) 7.32081 0.326095
\(505\) −14.9158 −0.663745
\(506\) −12.7067 −0.564883
\(507\) 2.37123 0.105310
\(508\) −11.4537 −0.508178
\(509\) 10.7617 0.477006 0.238503 0.971142i \(-0.423343\pi\)
0.238503 + 0.971142i \(0.423343\pi\)
\(510\) 3.67634 0.162791
\(511\) −10.1387 −0.448510
\(512\) 5.35484 0.236653
\(513\) −5.39672 −0.238271
\(514\) −45.4093 −2.00292
\(515\) 34.6934 1.52877
\(516\) 31.3333 1.37937
\(517\) 6.03615 0.265470
\(518\) −6.33165 −0.278197
\(519\) −16.4133 −0.720465
\(520\) 8.08091 0.354371
\(521\) −3.82763 −0.167691 −0.0838457 0.996479i \(-0.526720\pi\)
−0.0838457 + 0.996479i \(0.526720\pi\)
\(522\) 54.1582 2.37044
\(523\) −41.9169 −1.83290 −0.916450 0.400150i \(-0.868958\pi\)
−0.916450 + 0.400150i \(0.868958\pi\)
\(524\) 31.1742 1.36185
\(525\) 13.0204 0.568256
\(526\) −20.3996 −0.889466
\(527\) −1.73947 −0.0757726
\(528\) 6.31399 0.274781
\(529\) 1.00000 0.0434783
\(530\) −4.13760 −0.179726
\(531\) −13.0105 −0.564609
\(532\) 20.6297 0.894412
\(533\) 7.13855 0.309205
\(534\) −80.5407 −3.48534
\(535\) −48.2231 −2.08487
\(536\) 18.5567 0.801527
\(537\) 57.2502 2.47053
\(538\) −43.3945 −1.87087
\(539\) 32.5715 1.40295
\(540\) 8.85647 0.381122
\(541\) 21.6940 0.932699 0.466349 0.884601i \(-0.345569\pi\)
0.466349 + 0.884601i \(0.345569\pi\)
\(542\) 35.5208 1.52575
\(543\) 34.6809 1.48830
\(544\) 1.33660 0.0573062
\(545\) −2.09630 −0.0897956
\(546\) −5.87126 −0.251267
\(547\) −39.3753 −1.68356 −0.841782 0.539817i \(-0.818493\pi\)
−0.841782 + 0.539817i \(0.818493\pi\)
\(548\) −3.24325 −0.138545
\(549\) 23.4662 1.00151
\(550\) −63.8075 −2.72076
\(551\) 55.0141 2.34368
\(552\) 6.05294 0.257630
\(553\) 4.63977 0.197303
\(554\) 51.2708 2.17829
\(555\) 19.1956 0.814806
\(556\) −43.9954 −1.86582
\(557\) 34.6203 1.46691 0.733455 0.679738i \(-0.237907\pi\)
0.733455 + 0.679738i \(0.237907\pi\)
\(558\) 47.7626 2.02195
\(559\) −4.22532 −0.178712
\(560\) 1.64256 0.0694109
\(561\) 2.87800 0.121509
\(562\) 68.6289 2.89493
\(563\) −4.66039 −0.196412 −0.0982059 0.995166i \(-0.531310\pi\)
−0.0982059 + 0.995166i \(0.531310\pi\)
\(564\) −7.97660 −0.335876
\(565\) −15.7334 −0.661911
\(566\) 9.76912 0.410627
\(567\) −10.9233 −0.458736
\(568\) 21.4717 0.900933
\(569\) 41.2171 1.72791 0.863956 0.503567i \(-0.167979\pi\)
0.863956 + 0.503567i \(0.167979\pi\)
\(570\) −102.540 −4.29495
\(571\) −32.8618 −1.37522 −0.687612 0.726078i \(-0.741341\pi\)
−0.687612 + 0.726078i \(0.741341\pi\)
\(572\) 17.5493 0.733775
\(573\) −51.5830 −2.15491
\(574\) −17.6753 −0.737753
\(575\) 5.02155 0.209413
\(576\) −34.2115 −1.42548
\(577\) 12.9817 0.540434 0.270217 0.962800i \(-0.412905\pi\)
0.270217 + 0.962800i \(0.412905\pi\)
\(578\) −38.3882 −1.59674
\(579\) 12.8682 0.534785
\(580\) −90.2828 −3.74879
\(581\) −7.37727 −0.306061
\(582\) −84.6493 −3.50883
\(583\) −3.23910 −0.134150
\(584\) −23.6681 −0.979393
\(585\) 8.30275 0.343276
\(586\) −59.1583 −2.44381
\(587\) −36.3803 −1.50158 −0.750788 0.660543i \(-0.770326\pi\)
−0.750788 + 0.660543i \(0.770326\pi\)
\(588\) −43.0423 −1.77504
\(589\) 48.5174 1.99912
\(590\) 35.5593 1.46396
\(591\) 45.4777 1.87070
\(592\) 1.21339 0.0498701
\(593\) −17.3748 −0.713499 −0.356750 0.934200i \(-0.616115\pi\)
−0.356750 + 0.934200i \(0.616115\pi\)
\(594\) 11.3672 0.466403
\(595\) 0.748701 0.0306937
\(596\) 13.8406 0.566934
\(597\) −35.5969 −1.45688
\(598\) −2.26436 −0.0925965
\(599\) 1.05120 0.0429507 0.0214754 0.999769i \(-0.493164\pi\)
0.0214754 + 0.999769i \(0.493164\pi\)
\(600\) 30.3952 1.24088
\(601\) 11.2683 0.459643 0.229821 0.973233i \(-0.426186\pi\)
0.229821 + 0.973233i \(0.426186\pi\)
\(602\) 10.4621 0.426402
\(603\) 19.0661 0.776432
\(604\) −34.5075 −1.40409
\(605\) −64.8658 −2.63717
\(606\) 25.2987 1.02769
\(607\) 25.1906 1.02245 0.511227 0.859445i \(-0.329191\pi\)
0.511227 + 0.859445i \(0.329191\pi\)
\(608\) −37.2805 −1.51192
\(609\) 23.6456 0.958169
\(610\) −64.1358 −2.59678
\(611\) 1.07565 0.0435162
\(612\) −1.77401 −0.0717100
\(613\) 9.21738 0.372287 0.186143 0.982523i \(-0.440401\pi\)
0.186143 + 0.982523i \(0.440401\pi\)
\(614\) −34.3347 −1.38564
\(615\) 53.5860 2.16080
\(616\) −15.6637 −0.631107
\(617\) −21.4518 −0.863618 −0.431809 0.901965i \(-0.642124\pi\)
−0.431809 + 0.901965i \(0.642124\pi\)
\(618\) −58.8434 −2.36703
\(619\) 19.8781 0.798969 0.399485 0.916740i \(-0.369189\pi\)
0.399485 + 0.916740i \(0.369189\pi\)
\(620\) −79.6212 −3.19766
\(621\) −0.894583 −0.0358984
\(622\) −17.3296 −0.694856
\(623\) −16.4024 −0.657150
\(624\) 1.12516 0.0450426
\(625\) −24.8918 −0.995671
\(626\) 37.6315 1.50406
\(627\) −80.2733 −3.20581
\(628\) 21.6488 0.863881
\(629\) 0.553080 0.0220528
\(630\) −20.5579 −0.819047
\(631\) −2.22972 −0.0887638 −0.0443819 0.999015i \(-0.514132\pi\)
−0.0443819 + 0.999015i \(0.514132\pi\)
\(632\) 10.8312 0.430842
\(633\) −60.1296 −2.38994
\(634\) −47.7054 −1.89462
\(635\) 11.5942 0.460104
\(636\) 4.28038 0.169728
\(637\) 5.80429 0.229975
\(638\) −115.877 −4.58763
\(639\) 22.0612 0.872726
\(640\) 54.3776 2.14946
\(641\) 1.43174 0.0565503 0.0282751 0.999600i \(-0.490999\pi\)
0.0282751 + 0.999600i \(0.490999\pi\)
\(642\) 81.7912 3.22804
\(643\) −26.2134 −1.03375 −0.516877 0.856060i \(-0.672906\pi\)
−0.516877 + 0.856060i \(0.672906\pi\)
\(644\) 3.41967 0.134754
\(645\) −31.7177 −1.24888
\(646\) −2.95449 −0.116243
\(647\) −20.6640 −0.812386 −0.406193 0.913787i \(-0.633144\pi\)
−0.406193 + 0.913787i \(0.633144\pi\)
\(648\) −25.4997 −1.00172
\(649\) 27.8374 1.09272
\(650\) −11.3706 −0.445992
\(651\) 20.8533 0.817305
\(652\) 45.3224 1.77496
\(653\) 10.8658 0.425212 0.212606 0.977138i \(-0.431805\pi\)
0.212606 + 0.977138i \(0.431805\pi\)
\(654\) 3.55554 0.139032
\(655\) −31.5566 −1.23302
\(656\) 3.38728 0.132251
\(657\) −24.3178 −0.948729
\(658\) −2.66336 −0.103828
\(659\) 28.6913 1.11765 0.558827 0.829284i \(-0.311251\pi\)
0.558827 + 0.829284i \(0.311251\pi\)
\(660\) 131.735 5.12779
\(661\) 22.5301 0.876318 0.438159 0.898898i \(-0.355631\pi\)
0.438159 + 0.898898i \(0.355631\pi\)
\(662\) 51.3969 1.99760
\(663\) 0.512864 0.0199180
\(664\) −17.2217 −0.668332
\(665\) −20.8828 −0.809800
\(666\) −15.1865 −0.588467
\(667\) 9.11937 0.353104
\(668\) 1.53987 0.0595792
\(669\) −19.4226 −0.750920
\(670\) −52.1099 −2.01318
\(671\) −50.2084 −1.93827
\(672\) −16.0235 −0.618121
\(673\) 31.5184 1.21495 0.607473 0.794341i \(-0.292183\pi\)
0.607473 + 0.794341i \(0.292183\pi\)
\(674\) −82.6651 −3.18414
\(675\) −4.49220 −0.172905
\(676\) 3.12732 0.120282
\(677\) 26.4770 1.01759 0.508797 0.860887i \(-0.330090\pi\)
0.508797 + 0.860887i \(0.330090\pi\)
\(678\) 26.6855 1.02485
\(679\) −17.2392 −0.661579
\(680\) 1.74779 0.0670247
\(681\) 42.8085 1.64043
\(682\) −102.193 −3.91318
\(683\) 17.3961 0.665643 0.332821 0.942990i \(-0.391999\pi\)
0.332821 + 0.942990i \(0.391999\pi\)
\(684\) 49.4807 1.89194
\(685\) 3.28303 0.125438
\(686\) −31.7039 −1.21046
\(687\) 7.41193 0.282783
\(688\) −2.00494 −0.0764377
\(689\) −0.577213 −0.0219901
\(690\) −16.9976 −0.647086
\(691\) 51.1248 1.94488 0.972440 0.233153i \(-0.0749044\pi\)
0.972440 + 0.233153i \(0.0749044\pi\)
\(692\) −21.6469 −0.822890
\(693\) −16.0937 −0.611348
\(694\) 0.430651 0.0163473
\(695\) 44.5351 1.68931
\(696\) 55.1990 2.09231
\(697\) 1.54397 0.0584820
\(698\) 26.2722 0.994417
\(699\) 37.9828 1.43664
\(700\) 17.1721 0.649043
\(701\) 2.98710 0.112821 0.0564105 0.998408i \(-0.482034\pi\)
0.0564105 + 0.998408i \(0.482034\pi\)
\(702\) 2.02566 0.0764535
\(703\) −15.4265 −0.581823
\(704\) 73.1991 2.75880
\(705\) 8.07445 0.304101
\(706\) 23.0325 0.866839
\(707\) 5.15218 0.193768
\(708\) −36.7864 −1.38252
\(709\) 22.8486 0.858096 0.429048 0.903282i \(-0.358849\pi\)
0.429048 + 0.903282i \(0.358849\pi\)
\(710\) −60.2958 −2.26286
\(711\) 11.1285 0.417353
\(712\) −38.2904 −1.43499
\(713\) 8.04245 0.301192
\(714\) −1.26987 −0.0475238
\(715\) −17.7646 −0.664359
\(716\) 75.5050 2.82176
\(717\) −52.5154 −1.96122
\(718\) −22.0755 −0.823852
\(719\) 13.0998 0.488540 0.244270 0.969707i \(-0.421452\pi\)
0.244270 + 0.969707i \(0.421452\pi\)
\(720\) 3.93970 0.146824
\(721\) −11.9837 −0.446296
\(722\) 39.3840 1.46572
\(723\) 69.0670 2.56863
\(724\) 45.7393 1.69989
\(725\) 45.7934 1.70072
\(726\) 110.019 4.08318
\(727\) 6.86149 0.254479 0.127239 0.991872i \(-0.459388\pi\)
0.127239 + 0.991872i \(0.459388\pi\)
\(728\) −2.79129 −0.103452
\(729\) −19.8359 −0.734664
\(730\) 66.4635 2.45993
\(731\) −0.913879 −0.0338010
\(732\) 66.3489 2.45233
\(733\) −25.5999 −0.945553 −0.472776 0.881182i \(-0.656748\pi\)
−0.472776 + 0.881182i \(0.656748\pi\)
\(734\) 49.0268 1.80961
\(735\) 43.5703 1.60712
\(736\) −6.17977 −0.227789
\(737\) −40.7940 −1.50267
\(738\) −42.3945 −1.56056
\(739\) 10.4709 0.385177 0.192589 0.981280i \(-0.438312\pi\)
0.192589 + 0.981280i \(0.438312\pi\)
\(740\) 25.3162 0.930644
\(741\) −14.3048 −0.525501
\(742\) 1.42920 0.0524676
\(743\) 3.87862 0.142293 0.0711463 0.997466i \(-0.477334\pi\)
0.0711463 + 0.997466i \(0.477334\pi\)
\(744\) 48.6805 1.78471
\(745\) −14.0104 −0.513301
\(746\) −10.4396 −0.382220
\(747\) −17.6945 −0.647407
\(748\) 3.79568 0.138784
\(749\) 16.6571 0.608638
\(750\) −0.366341 −0.0133769
\(751\) 27.3306 0.997309 0.498654 0.866801i \(-0.333828\pi\)
0.498654 + 0.866801i \(0.333828\pi\)
\(752\) 0.510403 0.0186125
\(753\) −39.5130 −1.43993
\(754\) −20.6495 −0.752012
\(755\) 34.9308 1.27126
\(756\) −3.05918 −0.111261
\(757\) −1.67111 −0.0607375 −0.0303687 0.999539i \(-0.509668\pi\)
−0.0303687 + 0.999539i \(0.509668\pi\)
\(758\) −38.2456 −1.38914
\(759\) −13.3064 −0.482993
\(760\) −48.7494 −1.76833
\(761\) 31.3220 1.13542 0.567711 0.823228i \(-0.307829\pi\)
0.567711 + 0.823228i \(0.307829\pi\)
\(762\) −19.6650 −0.712388
\(763\) 0.724099 0.0262141
\(764\) −68.0307 −2.46127
\(765\) 1.79577 0.0649262
\(766\) 47.9181 1.73135
\(767\) 4.96068 0.179120
\(768\) −30.3683 −1.09582
\(769\) 0.211623 0.00763130 0.00381565 0.999993i \(-0.498785\pi\)
0.00381565 + 0.999993i \(0.498785\pi\)
\(770\) 43.9859 1.58514
\(771\) −47.5525 −1.71256
\(772\) 16.9714 0.610813
\(773\) −15.2808 −0.549613 −0.274807 0.961500i \(-0.588614\pi\)
−0.274807 + 0.961500i \(0.588614\pi\)
\(774\) 25.0934 0.901963
\(775\) 40.3856 1.45069
\(776\) −40.2436 −1.44466
\(777\) −6.63048 −0.237867
\(778\) −36.9542 −1.32487
\(779\) −43.0644 −1.54294
\(780\) 23.4754 0.840556
\(781\) −47.2022 −1.68903
\(782\) −0.489750 −0.0175134
\(783\) −8.15804 −0.291544
\(784\) 2.75417 0.0983633
\(785\) −21.9144 −0.782157
\(786\) 53.5231 1.90911
\(787\) −41.3904 −1.47541 −0.737705 0.675123i \(-0.764090\pi\)
−0.737705 + 0.675123i \(0.764090\pi\)
\(788\) 59.9787 2.13665
\(789\) −21.3624 −0.760522
\(790\) −30.4156 −1.08214
\(791\) 5.43461 0.193232
\(792\) −37.5695 −1.33497
\(793\) −8.94721 −0.317725
\(794\) 20.3318 0.721548
\(795\) −4.33288 −0.153672
\(796\) −46.9473 −1.66400
\(797\) 1.67212 0.0592294 0.0296147 0.999561i \(-0.490572\pi\)
0.0296147 + 0.999561i \(0.490572\pi\)
\(798\) 35.4193 1.25383
\(799\) 0.232649 0.00823052
\(800\) −31.0320 −1.09715
\(801\) −39.3415 −1.39006
\(802\) 52.3047 1.84694
\(803\) 52.0306 1.83612
\(804\) 53.9081 1.90119
\(805\) −3.46162 −0.122006
\(806\) −18.2110 −0.641455
\(807\) −45.4426 −1.59966
\(808\) 12.0274 0.423123
\(809\) 36.6250 1.28767 0.643833 0.765166i \(-0.277343\pi\)
0.643833 + 0.765166i \(0.277343\pi\)
\(810\) 71.6069 2.51601
\(811\) −32.4359 −1.13898 −0.569489 0.821999i \(-0.692859\pi\)
−0.569489 + 0.821999i \(0.692859\pi\)
\(812\) 31.1853 1.09439
\(813\) 37.1972 1.30456
\(814\) 32.4932 1.13889
\(815\) −45.8783 −1.60705
\(816\) 0.243357 0.00851921
\(817\) 25.4899 0.891780
\(818\) 12.4784 0.436296
\(819\) −2.86792 −0.100213
\(820\) 70.6724 2.46799
\(821\) 49.2576 1.71910 0.859551 0.511049i \(-0.170743\pi\)
0.859551 + 0.511049i \(0.170743\pi\)
\(822\) −5.56835 −0.194219
\(823\) 12.2443 0.426810 0.213405 0.976964i \(-0.431545\pi\)
0.213405 + 0.976964i \(0.431545\pi\)
\(824\) −27.9751 −0.974559
\(825\) −66.8190 −2.32634
\(826\) −12.2828 −0.427374
\(827\) −24.0204 −0.835273 −0.417636 0.908614i \(-0.637141\pi\)
−0.417636 + 0.908614i \(0.637141\pi\)
\(828\) 8.20213 0.285044
\(829\) −1.14959 −0.0399269 −0.0199634 0.999801i \(-0.506355\pi\)
−0.0199634 + 0.999801i \(0.506355\pi\)
\(830\) 48.3611 1.67864
\(831\) 53.6906 1.86251
\(832\) 13.0442 0.452226
\(833\) 1.25539 0.0434966
\(834\) −75.5360 −2.61560
\(835\) −1.55875 −0.0539429
\(836\) −105.869 −3.66156
\(837\) −7.19465 −0.248683
\(838\) 16.1096 0.556495
\(839\) −36.9364 −1.27518 −0.637592 0.770374i \(-0.720070\pi\)
−0.637592 + 0.770374i \(0.720070\pi\)
\(840\) −20.9530 −0.722947
\(841\) 54.1630 1.86769
\(842\) −4.45609 −0.153567
\(843\) 71.8680 2.47526
\(844\) −79.3025 −2.72970
\(845\) −3.16568 −0.108903
\(846\) −6.38809 −0.219627
\(847\) 22.4058 0.769872
\(848\) −0.273891 −0.00940545
\(849\) 10.2302 0.351100
\(850\) −2.45930 −0.0843534
\(851\) −2.55717 −0.0876586
\(852\) 62.3764 2.13698
\(853\) 2.42115 0.0828985 0.0414493 0.999141i \(-0.486803\pi\)
0.0414493 + 0.999141i \(0.486803\pi\)
\(854\) 22.1536 0.758082
\(855\) −50.0877 −1.71296
\(856\) 38.8849 1.32906
\(857\) −30.2965 −1.03491 −0.517455 0.855710i \(-0.673121\pi\)
−0.517455 + 0.855710i \(0.673121\pi\)
\(858\) 30.1306 1.02864
\(859\) −3.26790 −0.111499 −0.0557496 0.998445i \(-0.517755\pi\)
−0.0557496 + 0.998445i \(0.517755\pi\)
\(860\) −41.8311 −1.42643
\(861\) −18.5095 −0.630804
\(862\) −4.36854 −0.148793
\(863\) 38.8796 1.32348 0.661738 0.749735i \(-0.269819\pi\)
0.661738 + 0.749735i \(0.269819\pi\)
\(864\) 5.52832 0.188077
\(865\) 21.9124 0.745044
\(866\) −38.1716 −1.29713
\(867\) −40.2000 −1.36526
\(868\) 27.5026 0.933498
\(869\) −23.8107 −0.807723
\(870\) −155.007 −5.25523
\(871\) −7.26955 −0.246319
\(872\) 1.69036 0.0572428
\(873\) −41.3484 −1.39943
\(874\) 13.6601 0.462060
\(875\) −0.0746069 −0.00252217
\(876\) −68.7570 −2.32308
\(877\) 0.673607 0.0227461 0.0113731 0.999935i \(-0.496380\pi\)
0.0113731 + 0.999935i \(0.496380\pi\)
\(878\) 39.9354 1.34776
\(879\) −61.9505 −2.08954
\(880\) −8.42942 −0.284156
\(881\) 8.16669 0.275143 0.137571 0.990492i \(-0.456070\pi\)
0.137571 + 0.990492i \(0.456070\pi\)
\(882\) −34.4706 −1.16069
\(883\) −15.7235 −0.529137 −0.264568 0.964367i \(-0.585229\pi\)
−0.264568 + 0.964367i \(0.585229\pi\)
\(884\) 0.676396 0.0227497
\(885\) 37.2377 1.25173
\(886\) 48.9900 1.64585
\(887\) −27.0798 −0.909251 −0.454625 0.890683i \(-0.650227\pi\)
−0.454625 + 0.890683i \(0.650227\pi\)
\(888\) −15.4784 −0.519421
\(889\) −4.00486 −0.134319
\(890\) 107.525 3.60425
\(891\) 56.0571 1.87798
\(892\) −25.6156 −0.857675
\(893\) −6.48904 −0.217148
\(894\) 23.7630 0.794755
\(895\) −76.4312 −2.55481
\(896\) −18.7830 −0.627496
\(897\) −2.37123 −0.0791731
\(898\) −32.7702 −1.09355
\(899\) 73.3421 2.44610
\(900\) 41.1874 1.37291
\(901\) −0.124843 −0.00415913
\(902\) 90.7076 3.02023
\(903\) 10.9558 0.364587
\(904\) 12.6867 0.421953
\(905\) −46.3004 −1.53908
\(906\) −59.2461 −1.96832
\(907\) 9.71580 0.322608 0.161304 0.986905i \(-0.448430\pi\)
0.161304 + 0.986905i \(0.448430\pi\)
\(908\) 56.4585 1.87364
\(909\) 12.3576 0.409875
\(910\) 7.83835 0.259839
\(911\) −3.68558 −0.122109 −0.0610543 0.998134i \(-0.519446\pi\)
−0.0610543 + 0.998134i \(0.519446\pi\)
\(912\) −6.78773 −0.224764
\(913\) 37.8592 1.25296
\(914\) −34.2787 −1.13384
\(915\) −67.1628 −2.22034
\(916\) 9.77529 0.322985
\(917\) 10.9002 0.359956
\(918\) 0.438122 0.0144602
\(919\) −1.97858 −0.0652673 −0.0326337 0.999467i \(-0.510389\pi\)
−0.0326337 + 0.999467i \(0.510389\pi\)
\(920\) −8.08091 −0.266420
\(921\) −35.9552 −1.18476
\(922\) −27.1056 −0.892677
\(923\) −8.41151 −0.276868
\(924\) −45.5037 −1.49696
\(925\) −12.8410 −0.422208
\(926\) 39.4954 1.29790
\(927\) −28.7431 −0.944047
\(928\) −56.3556 −1.84996
\(929\) −0.206658 −0.00678023 −0.00339012 0.999994i \(-0.501079\pi\)
−0.00339012 + 0.999994i \(0.501079\pi\)
\(930\) −136.702 −4.48264
\(931\) −35.0153 −1.14758
\(932\) 50.0939 1.64088
\(933\) −18.1476 −0.594124
\(934\) 3.54986 0.116155
\(935\) −3.84224 −0.125655
\(936\) −6.69495 −0.218831
\(937\) 36.0425 1.17746 0.588728 0.808331i \(-0.299629\pi\)
0.588728 + 0.808331i \(0.299629\pi\)
\(938\) 17.9997 0.587711
\(939\) 39.4077 1.28602
\(940\) 10.6491 0.347334
\(941\) −15.5431 −0.506690 −0.253345 0.967376i \(-0.581531\pi\)
−0.253345 + 0.967376i \(0.581531\pi\)
\(942\) 37.1689 1.21103
\(943\) −7.13855 −0.232463
\(944\) 2.35387 0.0766120
\(945\) 3.09671 0.100736
\(946\) −53.6900 −1.74561
\(947\) −2.87566 −0.0934464 −0.0467232 0.998908i \(-0.514878\pi\)
−0.0467232 + 0.998908i \(0.514878\pi\)
\(948\) 31.4652 1.02194
\(949\) 9.27194 0.300980
\(950\) 68.5949 2.22551
\(951\) −49.9569 −1.61996
\(952\) −0.603717 −0.0195666
\(953\) 30.3101 0.981841 0.490921 0.871204i \(-0.336661\pi\)
0.490921 + 0.871204i \(0.336661\pi\)
\(954\) 3.42796 0.110984
\(955\) 68.8653 2.22843
\(956\) −69.2604 −2.24004
\(957\) −121.346 −3.92257
\(958\) −27.7400 −0.896239
\(959\) −1.13402 −0.0366193
\(960\) 97.9172 3.16026
\(961\) 33.6811 1.08649
\(962\) 5.79035 0.186688
\(963\) 39.9523 1.28745
\(964\) 91.0898 2.93380
\(965\) −17.1796 −0.553030
\(966\) 5.87126 0.188905
\(967\) 19.2278 0.618323 0.309162 0.951010i \(-0.399952\pi\)
0.309162 + 0.951010i \(0.399952\pi\)
\(968\) 52.3047 1.68114
\(969\) −3.09394 −0.0993916
\(970\) 113.010 3.62853
\(971\) 26.9172 0.863815 0.431907 0.901918i \(-0.357841\pi\)
0.431907 + 0.901918i \(0.357841\pi\)
\(972\) −65.6849 −2.10685
\(973\) −15.3832 −0.493163
\(974\) 61.5458 1.97206
\(975\) −11.9073 −0.381337
\(976\) −4.24551 −0.135895
\(977\) 33.5682 1.07394 0.536971 0.843601i \(-0.319569\pi\)
0.536971 + 0.843601i \(0.319569\pi\)
\(978\) 77.8143 2.48823
\(979\) 84.1754 2.69026
\(980\) 57.4631 1.83559
\(981\) 1.73676 0.0554505
\(982\) −41.0755 −1.31077
\(983\) 7.98670 0.254736 0.127368 0.991856i \(-0.459347\pi\)
0.127368 + 0.991856i \(0.459347\pi\)
\(984\) −43.2092 −1.37746
\(985\) −60.7145 −1.93452
\(986\) −4.46621 −0.142233
\(987\) −2.78906 −0.0887767
\(988\) −18.8661 −0.600209
\(989\) 4.22532 0.134357
\(990\) 105.501 3.35303
\(991\) −32.4610 −1.03116 −0.515578 0.856842i \(-0.672423\pi\)
−0.515578 + 0.856842i \(0.672423\pi\)
\(992\) −49.7005 −1.57799
\(993\) 53.8227 1.70801
\(994\) 20.8272 0.660599
\(995\) 47.5232 1.50659
\(996\) −50.0299 −1.58526
\(997\) −57.7905 −1.83024 −0.915121 0.403178i \(-0.867905\pi\)
−0.915121 + 0.403178i \(0.867905\pi\)
\(998\) −94.3110 −2.98536
\(999\) 2.28760 0.0723765
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 299.2.a.g.1.9 10
3.2 odd 2 2691.2.a.bc.1.2 10
4.3 odd 2 4784.2.a.bh.1.3 10
5.4 even 2 7475.2.a.w.1.2 10
13.12 even 2 3887.2.a.p.1.2 10
23.22 odd 2 6877.2.a.o.1.9 10
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
299.2.a.g.1.9 10 1.1 even 1 trivial
2691.2.a.bc.1.2 10 3.2 odd 2
3887.2.a.p.1.2 10 13.12 even 2
4784.2.a.bh.1.3 10 4.3 odd 2
6877.2.a.o.1.9 10 23.22 odd 2
7475.2.a.w.1.2 10 5.4 even 2