Properties

Label 39.3.l.a.19.1
Level $39$
Weight $3$
Character 39.19
Analytic conductor $1.063$
Analytic rank $0$
Dimension $8$
CM no
Inner twists $2$

Related objects

Downloads

Learn more

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [39,3,Mod(7,39)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(39, base_ring=CyclotomicField(12))
 
chi = DirichletCharacter(H, H._module([0, 11]))
 
N = Newforms(chi, 3, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("39.7");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 39 = 3 \cdot 13 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 39.l (of order \(12\), degree \(4\), 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: \(1.06267303101\)
Analytic rank: \(0\)
Dimension: \(8\)
Relative dimension: \(2\) over \(\Q(\zeta_{12})\)
Coefficient field: 8.0.1579585536.10
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} - 2x^{7} - 4x^{6} + 28x^{5} - 38x^{4} + 8x^{3} + 200x^{2} - 352x + 484 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{12}]$

Embedding invariants

Embedding label 19.1
Root \(1.11361 + 1.42401i\) of defining polynomial
Character \(\chi\) \(=\) 39.19
Dual form 39.3.l.a.37.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-0.247589 - 0.924013i) q^{2} +(-0.866025 + 1.50000i) q^{3} +(2.67160 - 1.54245i) q^{4} +(5.21405 - 5.21405i) q^{5} +(1.60044 + 0.428836i) q^{6} +(-2.33731 + 8.72296i) q^{7} +(-4.79240 - 4.79240i) q^{8} +(-1.50000 - 2.59808i) q^{9} +O(q^{10})\) \(q+(-0.247589 - 0.924013i) q^{2} +(-0.866025 + 1.50000i) q^{3} +(2.67160 - 1.54245i) q^{4} +(5.21405 - 5.21405i) q^{5} +(1.60044 + 0.428836i) q^{6} +(-2.33731 + 8.72296i) q^{7} +(-4.79240 - 4.79240i) q^{8} +(-1.50000 - 2.59808i) q^{9} +(-6.10879 - 3.52691i) q^{10} +(-13.9926 + 3.74932i) q^{11} +5.34320i q^{12} +(6.62499 + 11.1852i) q^{13} +8.63882 q^{14} +(3.30558 + 12.3366i) q^{15} +(2.92810 - 5.07162i) q^{16} +(-1.28651 + 0.742766i) q^{17} +(-2.02927 + 2.02927i) q^{18} +(-23.0011 - 6.16313i) q^{19} +(5.88746 - 21.9723i) q^{20} +(-11.0603 - 11.0603i) q^{21} +(6.92884 + 12.0011i) q^{22} +(16.8580 + 9.73295i) q^{23} +(11.3389 - 3.03826i) q^{24} -29.3727i q^{25} +(8.69503 - 8.89091i) q^{26} +5.19615 q^{27} +(7.21037 + 26.9095i) q^{28} +(-10.4677 + 18.1306i) q^{29} +(10.5807 - 6.10879i) q^{30} +(27.4605 - 27.4605i) q^{31} +(-31.5974 - 8.46649i) q^{32} +(6.49401 - 24.2360i) q^{33} +(1.00485 + 1.00485i) q^{34} +(33.2951 + 57.6688i) q^{35} +(-8.01480 - 4.62735i) q^{36} +(4.23961 - 1.13600i) q^{37} +22.7792i q^{38} +(-22.5153 + 0.250783i) q^{39} -49.9756 q^{40} +(0.229153 + 0.855210i) q^{41} +(-7.48144 + 12.9582i) q^{42} +(32.9120 - 19.0018i) q^{43} +(-31.5996 + 31.5996i) q^{44} +(-21.3676 - 5.72543i) q^{45} +(4.81953 - 17.9867i) q^{46} +(-28.9494 - 28.9494i) q^{47} +(5.07162 + 8.78431i) q^{48} +(-28.1918 - 16.2766i) q^{49} +(-27.1407 + 7.27234i) q^{50} -2.57302i q^{51} +(34.9520 + 19.6638i) q^{52} +14.1027 q^{53} +(-1.28651 - 4.80131i) q^{54} +(-53.4092 + 92.5075i) q^{55} +(53.0053 - 30.6026i) q^{56} +(29.1642 - 29.1642i) q^{57} +(19.3446 + 5.18338i) q^{58} +(6.49369 - 24.2348i) q^{59} +(27.8597 + 27.8597i) q^{60} +(-20.9419 - 36.2724i) q^{61} +(-32.1728 - 18.5750i) q^{62} +(26.1689 - 7.01193i) q^{63} +7.86776i q^{64} +(92.8634 + 23.7774i) q^{65} -24.0022 q^{66} +(-3.91215 - 14.6003i) q^{67} +(-2.29136 + 3.96875i) q^{68} +(-29.1988 + 16.8580i) q^{69} +(45.0433 - 45.0433i) q^{70} +(-4.50471 - 1.20703i) q^{71} +(-5.26242 + 19.6396i) q^{72} +(-7.82668 - 7.82668i) q^{73} +(-2.09936 - 3.63619i) q^{74} +(44.0590 + 25.4375i) q^{75} +(-70.9561 + 19.0126i) q^{76} -130.821i q^{77} +(5.80625 + 20.7423i) q^{78} +133.039 q^{79} +(-11.1764 - 41.7110i) q^{80} +(-4.50000 + 7.79423i) q^{81} +(0.733490 - 0.423481i) q^{82} +(-50.7706 + 50.7706i) q^{83} +(-46.6086 - 12.4887i) q^{84} +(-2.83510 + 10.5807i) q^{85} +(-25.7065 - 25.7065i) q^{86} +(-18.1306 - 31.4032i) q^{87} +(85.0266 + 49.0901i) q^{88} +(82.8733 - 22.2058i) q^{89} +21.1615i q^{90} +(-113.053 + 31.6462i) q^{91} +60.0503 q^{92} +(17.4093 + 64.9722i) q^{93} +(-19.5821 + 33.9171i) q^{94} +(-152.064 + 87.7940i) q^{95} +(40.0639 - 40.0639i) q^{96} +(-71.3621 - 19.1214i) q^{97} +(-8.05978 + 30.0795i) q^{98} +(30.7300 + 30.7300i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q - 2 q^{2} + 12 q^{4} + 16 q^{5} - 6 q^{6} + 14 q^{7} - 24 q^{8} - 12 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q - 2 q^{2} + 12 q^{4} + 16 q^{5} - 6 q^{6} + 14 q^{7} - 24 q^{8} - 12 q^{9} - 42 q^{10} - 14 q^{11} + 2 q^{13} - 28 q^{14} + 24 q^{15} - 28 q^{16} + 18 q^{17} + 12 q^{18} - 94 q^{19} + 68 q^{20} + 12 q^{21} + 46 q^{22} - 30 q^{23} + 18 q^{24} + 136 q^{26} + 146 q^{28} - 64 q^{29} - 6 q^{30} + 80 q^{31} - 86 q^{32} + 42 q^{33} - 96 q^{34} + 122 q^{35} - 36 q^{36} + 110 q^{37} - 102 q^{39} - 204 q^{40} + 22 q^{41} - 102 q^{42} - 54 q^{43} - 92 q^{44} - 24 q^{45} + 294 q^{46} - 332 q^{47} - 12 q^{49} - 172 q^{50} - 72 q^{52} + 32 q^{53} + 18 q^{54} - 122 q^{55} + 66 q^{56} + 144 q^{57} - 134 q^{58} + 52 q^{59} + 132 q^{60} + 46 q^{61} + 288 q^{62} + 6 q^{63} + 214 q^{65} - 12 q^{66} + 86 q^{67} + 114 q^{68} + 54 q^{69} - 164 q^{70} + 94 q^{71} + 90 q^{72} + 56 q^{73} + 236 q^{74} - 60 q^{75} + 46 q^{76} - 12 q^{78} - 80 q^{79} - 80 q^{80} - 36 q^{81} + 180 q^{82} + 136 q^{83} - 66 q^{84} + 138 q^{85} - 396 q^{86} - 132 q^{87} + 66 q^{88} - 128 q^{89} - 496 q^{91} - 108 q^{92} + 36 q^{93} + 202 q^{94} - 486 q^{95} + 24 q^{96} - 40 q^{97} - 530 q^{98} + 84 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/39\mathbb{Z}\right)^\times\).

\(n\) \(14\) \(28\)
\(\chi(n)\) \(1\) \(e\left(\frac{5}{12}\right)\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −0.247589 0.924013i −0.123794 0.462007i 0.876000 0.482312i \(-0.160203\pi\)
−0.999794 + 0.0203054i \(0.993536\pi\)
\(3\) −0.866025 + 1.50000i −0.288675 + 0.500000i
\(4\) 2.67160 1.54245i 0.667900 0.385612i
\(5\) 5.21405 5.21405i 1.04281 1.04281i 0.0437686 0.999042i \(-0.486064\pi\)
0.999042 0.0437686i \(-0.0139364\pi\)
\(6\) 1.60044 + 0.428836i 0.266740 + 0.0714727i
\(7\) −2.33731 + 8.72296i −0.333902 + 1.24614i 0.571153 + 0.820843i \(0.306496\pi\)
−0.905055 + 0.425294i \(0.860171\pi\)
\(8\) −4.79240 4.79240i −0.599050 0.599050i
\(9\) −1.50000 2.59808i −0.166667 0.288675i
\(10\) −6.10879 3.52691i −0.610879 0.352691i
\(11\) −13.9926 + 3.74932i −1.27206 + 0.340847i −0.830819 0.556542i \(-0.812128\pi\)
−0.441239 + 0.897390i \(0.645461\pi\)
\(12\) 5.34320i 0.445267i
\(13\) 6.62499 + 11.1852i 0.509614 + 0.860403i
\(14\) 8.63882 0.617059
\(15\) 3.30558 + 12.3366i 0.220372 + 0.822439i
\(16\) 2.92810 5.07162i 0.183006 0.316976i
\(17\) −1.28651 + 0.742766i −0.0756769 + 0.0436921i −0.537361 0.843352i \(-0.680579\pi\)
0.461684 + 0.887044i \(0.347245\pi\)
\(18\) −2.02927 + 2.02927i −0.112737 + 0.112737i
\(19\) −23.0011 6.16313i −1.21058 0.324375i −0.403593 0.914939i \(-0.632239\pi\)
−0.806991 + 0.590564i \(0.798905\pi\)
\(20\) 5.88746 21.9723i 0.294373 1.09861i
\(21\) −11.0603 11.0603i −0.526680 0.526680i
\(22\) 6.92884 + 12.0011i 0.314947 + 0.545504i
\(23\) 16.8580 + 9.73295i 0.732955 + 0.423172i 0.819502 0.573076i \(-0.194250\pi\)
−0.0865474 + 0.996248i \(0.527583\pi\)
\(24\) 11.3389 3.03826i 0.472456 0.126594i
\(25\) 29.3727i 1.17491i
\(26\) 8.69503 8.89091i 0.334424 0.341958i
\(27\) 5.19615 0.192450
\(28\) 7.21037 + 26.9095i 0.257513 + 0.961053i
\(29\) −10.4677 + 18.1306i −0.360956 + 0.625195i −0.988118 0.153694i \(-0.950883\pi\)
0.627162 + 0.778889i \(0.284216\pi\)
\(30\) 10.5807 6.10879i 0.352691 0.203626i
\(31\) 27.4605 27.4605i 0.885823 0.885823i −0.108296 0.994119i \(-0.534539\pi\)
0.994119 + 0.108296i \(0.0345395\pi\)
\(32\) −31.5974 8.46649i −0.987418 0.264578i
\(33\) 6.49401 24.2360i 0.196788 0.734423i
\(34\) 1.00485 + 1.00485i 0.0295544 + 0.0295544i
\(35\) 33.2951 + 57.6688i 0.951289 + 1.64768i
\(36\) −8.01480 4.62735i −0.222633 0.128537i
\(37\) 4.23961 1.13600i 0.114584 0.0307027i −0.201071 0.979577i \(-0.564442\pi\)
0.315655 + 0.948874i \(0.397776\pi\)
\(38\) 22.7792i 0.599453i
\(39\) −22.5153 + 0.250783i −0.577314 + 0.00643034i
\(40\) −49.9756 −1.24939
\(41\) 0.229153 + 0.855210i 0.00558910 + 0.0208588i 0.968664 0.248375i \(-0.0798964\pi\)
−0.963075 + 0.269233i \(0.913230\pi\)
\(42\) −7.48144 + 12.9582i −0.178130 + 0.308529i
\(43\) 32.9120 19.0018i 0.765395 0.441901i −0.0658342 0.997831i \(-0.520971\pi\)
0.831230 + 0.555929i \(0.187638\pi\)
\(44\) −31.5996 + 31.5996i −0.718173 + 0.718173i
\(45\) −21.3676 5.72543i −0.474835 0.127232i
\(46\) 4.81953 17.9867i 0.104772 0.391016i
\(47\) −28.9494 28.9494i −0.615944 0.615944i 0.328544 0.944489i \(-0.393442\pi\)
−0.944489 + 0.328544i \(0.893442\pi\)
\(48\) 5.07162 + 8.78431i 0.105659 + 0.183006i
\(49\) −28.1918 16.2766i −0.575344 0.332175i
\(50\) −27.1407 + 7.27234i −0.542815 + 0.145447i
\(51\) 2.57302i 0.0504513i
\(52\) 34.9520 + 19.6638i 0.672154 + 0.378150i
\(53\) 14.1027 0.266088 0.133044 0.991110i \(-0.457525\pi\)
0.133044 + 0.991110i \(0.457525\pi\)
\(54\) −1.28651 4.80131i −0.0238242 0.0889132i
\(55\) −53.4092 + 92.5075i −0.971077 + 1.68195i
\(56\) 53.0053 30.6026i 0.946523 0.546475i
\(57\) 29.1642 29.1642i 0.511653 0.511653i
\(58\) 19.3446 + 5.18338i 0.333528 + 0.0893686i
\(59\) 6.49369 24.2348i 0.110063 0.410759i −0.888808 0.458281i \(-0.848466\pi\)
0.998870 + 0.0475212i \(0.0151322\pi\)
\(60\) 27.8597 + 27.8597i 0.464329 + 0.464329i
\(61\) −20.9419 36.2724i −0.343310 0.594630i 0.641735 0.766926i \(-0.278215\pi\)
−0.985045 + 0.172296i \(0.944881\pi\)
\(62\) −32.1728 18.5750i −0.518916 0.299596i
\(63\) 26.1689 7.01193i 0.415379 0.111301i
\(64\) 7.86776i 0.122934i
\(65\) 92.8634 + 23.7774i 1.42867 + 0.365806i
\(66\) −24.0022 −0.363670
\(67\) −3.91215 14.6003i −0.0583902 0.217915i 0.930566 0.366125i \(-0.119316\pi\)
−0.988956 + 0.148209i \(0.952649\pi\)
\(68\) −2.29136 + 3.96875i −0.0336964 + 0.0583639i
\(69\) −29.1988 + 16.8580i −0.423172 + 0.244318i
\(70\) 45.0433 45.0433i 0.643475 0.643475i
\(71\) −4.50471 1.20703i −0.0634466 0.0170005i 0.226956 0.973905i \(-0.427123\pi\)
−0.290403 + 0.956905i \(0.593789\pi\)
\(72\) −5.26242 + 19.6396i −0.0730892 + 0.272772i
\(73\) −7.82668 7.82668i −0.107215 0.107215i 0.651464 0.758679i \(-0.274155\pi\)
−0.758679 + 0.651464i \(0.774155\pi\)
\(74\) −2.09936 3.63619i −0.0283697 0.0491378i
\(75\) 44.0590 + 25.4375i 0.587453 + 0.339166i
\(76\) −70.9561 + 19.0126i −0.933633 + 0.250166i
\(77\) 130.821i 1.69897i
\(78\) 5.80625 + 20.7423i 0.0744391 + 0.265927i
\(79\) 133.039 1.68404 0.842021 0.539445i \(-0.181366\pi\)
0.842021 + 0.539445i \(0.181366\pi\)
\(80\) −11.1764 41.7110i −0.139705 0.521387i
\(81\) −4.50000 + 7.79423i −0.0555556 + 0.0962250i
\(82\) 0.733490 0.423481i 0.00894500 0.00516440i
\(83\) −50.7706 + 50.7706i −0.611694 + 0.611694i −0.943387 0.331693i \(-0.892380\pi\)
0.331693 + 0.943387i \(0.392380\pi\)
\(84\) −46.6086 12.4887i −0.554864 0.148675i
\(85\) −2.83510 + 10.5807i −0.0333541 + 0.124479i
\(86\) −25.7065 25.7065i −0.298913 0.298913i
\(87\) −18.1306 31.4032i −0.208398 0.360956i
\(88\) 85.0266 + 49.0901i 0.966211 + 0.557842i
\(89\) 82.8733 22.2058i 0.931161 0.249504i 0.238811 0.971066i \(-0.423242\pi\)
0.692350 + 0.721562i \(0.256576\pi\)
\(90\) 21.1615i 0.235127i
\(91\) −113.053 + 31.6462i −1.24234 + 0.347760i
\(92\) 60.0503 0.652721
\(93\) 17.4093 + 64.9722i 0.187196 + 0.698626i
\(94\) −19.5821 + 33.9171i −0.208320 + 0.360821i
\(95\) −152.064 + 87.7940i −1.60067 + 0.924148i
\(96\) 40.0639 40.0639i 0.417332 0.417332i
\(97\) −71.3621 19.1214i −0.735691 0.197128i −0.128529 0.991706i \(-0.541026\pi\)
−0.607162 + 0.794578i \(0.707692\pi\)
\(98\) −8.05978 + 30.0795i −0.0822427 + 0.306934i
\(99\) 30.7300 + 30.7300i 0.310404 + 0.310404i
\(100\) −45.3059 78.4721i −0.453059 0.784721i
\(101\) −143.284 82.7250i −1.41865 0.819059i −0.422472 0.906376i \(-0.638838\pi\)
−0.996181 + 0.0873165i \(0.972171\pi\)
\(102\) −2.37750 + 0.637049i −0.0233088 + 0.00624558i
\(103\) 151.448i 1.47037i 0.677865 + 0.735186i \(0.262905\pi\)
−0.677865 + 0.735186i \(0.737095\pi\)
\(104\) 21.8545 85.3537i 0.210140 0.820709i
\(105\) −115.338 −1.09845
\(106\) −3.49166 13.0311i −0.0329402 0.122935i
\(107\) 43.5281 75.3929i 0.406805 0.704607i −0.587725 0.809061i \(-0.699976\pi\)
0.994530 + 0.104454i \(0.0333095\pi\)
\(108\) 13.8820 8.01480i 0.128537 0.0742112i
\(109\) −53.0858 + 53.0858i −0.487026 + 0.487026i −0.907367 0.420340i \(-0.861911\pi\)
0.420340 + 0.907367i \(0.361911\pi\)
\(110\) 98.7016 + 26.4470i 0.897288 + 0.240427i
\(111\) −1.96761 + 7.34322i −0.0177262 + 0.0661551i
\(112\) 37.3957 + 37.3957i 0.333890 + 0.333890i
\(113\) 103.775 + 179.743i 0.918359 + 1.59064i 0.801907 + 0.597448i \(0.203819\pi\)
0.116452 + 0.993196i \(0.462848\pi\)
\(114\) −34.1688 19.7274i −0.299727 0.173047i
\(115\) 138.646 37.1502i 1.20562 0.323045i
\(116\) 64.5838i 0.556757i
\(117\) 19.1226 33.9901i 0.163441 0.290514i
\(118\) −24.0010 −0.203399
\(119\) −3.47215 12.9582i −0.0291777 0.108893i
\(120\) 43.2802 74.9635i 0.360668 0.624695i
\(121\) 76.9476 44.4257i 0.635930 0.367155i
\(122\) −28.3312 + 28.3312i −0.232223 + 0.232223i
\(123\) −1.48127 0.396904i −0.0120428 0.00322687i
\(124\) 31.0071 115.720i 0.250057 0.933225i
\(125\) −22.7993 22.7993i −0.182394 0.182394i
\(126\) −12.9582 22.4443i −0.102843 0.178130i
\(127\) −25.2200 14.5608i −0.198583 0.114652i 0.397411 0.917641i \(-0.369909\pi\)
−0.595994 + 0.802989i \(0.703242\pi\)
\(128\) −119.120 + 31.9180i −0.930622 + 0.249359i
\(129\) 65.8240i 0.510264i
\(130\) −1.02132 91.6940i −0.00785631 0.705339i
\(131\) 43.2933 0.330483 0.165242 0.986253i \(-0.447160\pi\)
0.165242 + 0.986253i \(0.447160\pi\)
\(132\) −20.0334 74.7655i −0.151768 0.566406i
\(133\) 107.521 186.233i 0.808432 1.40025i
\(134\) −12.5223 + 7.22975i −0.0934499 + 0.0539533i
\(135\) 27.0930 27.0930i 0.200689 0.200689i
\(136\) 9.72509 + 2.60583i 0.0715080 + 0.0191605i
\(137\) −54.9537 + 205.090i −0.401122 + 1.49701i 0.409977 + 0.912096i \(0.365537\pi\)
−0.811098 + 0.584910i \(0.801130\pi\)
\(138\) 22.8063 + 22.8063i 0.165263 + 0.165263i
\(139\) −88.6308 153.513i −0.637631 1.10441i −0.985951 0.167034i \(-0.946581\pi\)
0.348320 0.937376i \(-0.386752\pi\)
\(140\) 177.903 + 102.712i 1.27073 + 0.733658i
\(141\) 68.4949 18.3532i 0.485780 0.130164i
\(142\) 4.46126i 0.0314173i
\(143\) −134.638 131.672i −0.941525 0.920782i
\(144\) −17.5686 −0.122004
\(145\) 39.9548 + 149.113i 0.275550 + 1.02837i
\(146\) −5.29416 + 9.16975i −0.0362613 + 0.0628065i
\(147\) 48.8297 28.1918i 0.332175 0.191781i
\(148\) 9.57432 9.57432i 0.0646914 0.0646914i
\(149\) 277.594 + 74.3812i 1.86305 + 0.499203i 0.999983 0.00588753i \(-0.00187407\pi\)
0.863067 + 0.505090i \(0.168541\pi\)
\(150\) 12.5961 47.0091i 0.0839737 0.313394i
\(151\) 62.1027 + 62.1027i 0.411276 + 0.411276i 0.882183 0.470907i \(-0.156073\pi\)
−0.470907 + 0.882183i \(0.656073\pi\)
\(152\) 80.6943 + 139.767i 0.530883 + 0.919517i
\(153\) 3.85952 + 2.22830i 0.0252256 + 0.0145640i
\(154\) −120.880 + 32.3897i −0.784935 + 0.210323i
\(155\) 286.361i 1.84749i
\(156\) −59.7650 + 35.3987i −0.383109 + 0.226914i
\(157\) −206.710 −1.31663 −0.658313 0.752744i \(-0.728730\pi\)
−0.658313 + 0.752744i \(0.728730\pi\)
\(158\) −32.9390 122.930i −0.208475 0.778038i
\(159\) −12.2133 + 21.1540i −0.0768131 + 0.133044i
\(160\) −208.895 + 120.606i −1.30559 + 0.753785i
\(161\) −124.302 + 124.302i −0.772065 + 0.772065i
\(162\) 8.31612 + 2.22830i 0.0513341 + 0.0137549i
\(163\) −31.3116 + 116.857i −0.192096 + 0.716912i 0.800903 + 0.598793i \(0.204353\pi\)
−0.992999 + 0.118119i \(0.962314\pi\)
\(164\) 1.93132 + 1.93132i 0.0117764 + 0.0117764i
\(165\) −92.5075 160.228i −0.560651 0.971077i
\(166\) 59.4829 + 34.3425i 0.358331 + 0.206882i
\(167\) −131.450 + 35.2219i −0.787125 + 0.210910i −0.629924 0.776657i \(-0.716914\pi\)
−0.157201 + 0.987567i \(0.550247\pi\)
\(168\) 106.011i 0.631015i
\(169\) −81.2191 + 148.204i −0.480586 + 0.876948i
\(170\) 10.4787 0.0616393
\(171\) 18.4894 + 69.0033i 0.108125 + 0.403528i
\(172\) 58.6185 101.530i 0.340805 0.590292i
\(173\) 6.40309 3.69683i 0.0370121 0.0213689i −0.481380 0.876512i \(-0.659864\pi\)
0.518392 + 0.855143i \(0.326531\pi\)
\(174\) −24.5280 + 24.5280i −0.140966 + 0.140966i
\(175\) 256.217 + 68.6531i 1.46410 + 0.392303i
\(176\) −21.9568 + 81.9438i −0.124754 + 0.465590i
\(177\) 30.7285 + 30.7285i 0.173607 + 0.173607i
\(178\) −41.0370 71.0781i −0.230545 0.399315i
\(179\) −2.11025 1.21836i −0.0117891 0.00680646i 0.494094 0.869409i \(-0.335500\pi\)
−0.505883 + 0.862602i \(0.668833\pi\)
\(180\) −65.9168 + 17.6624i −0.366205 + 0.0981243i
\(181\) 214.481i 1.18498i −0.805579 0.592488i \(-0.798146\pi\)
0.805579 0.592488i \(-0.201854\pi\)
\(182\) 57.2321 + 96.6273i 0.314462 + 0.530919i
\(183\) 72.5449 0.396420
\(184\) −34.1459 127.434i −0.185576 0.692577i
\(185\) 16.1824 28.0287i 0.0874723 0.151506i
\(186\) 55.7249 32.1728i 0.299596 0.172972i
\(187\) 15.2168 15.2168i 0.0813732 0.0813732i
\(188\) −121.994 32.6882i −0.648905 0.173874i
\(189\) −12.1450 + 45.3259i −0.0642594 + 0.239819i
\(190\) 118.772 + 118.772i 0.625116 + 0.625116i
\(191\) −150.851 261.282i −0.789798 1.36797i −0.926090 0.377302i \(-0.876852\pi\)
0.136292 0.990669i \(-0.456481\pi\)
\(192\) −11.8016 6.81368i −0.0614669 0.0354879i
\(193\) 132.844 35.5955i 0.688312 0.184433i 0.102323 0.994751i \(-0.467373\pi\)
0.585990 + 0.810319i \(0.300706\pi\)
\(194\) 70.6737i 0.364298i
\(195\) −116.088 + 118.703i −0.595324 + 0.608735i
\(196\) −100.423 −0.512363
\(197\) −52.5257 196.029i −0.266628 0.995069i −0.961246 0.275691i \(-0.911093\pi\)
0.694618 0.719378i \(-0.255573\pi\)
\(198\) 20.7865 36.0033i 0.104982 0.181835i
\(199\) 85.5640 49.4004i 0.429970 0.248243i −0.269364 0.963038i \(-0.586813\pi\)
0.699334 + 0.714795i \(0.253480\pi\)
\(200\) −140.766 + 140.766i −0.703828 + 0.703828i
\(201\) 25.2885 + 6.77603i 0.125813 + 0.0337116i
\(202\) −40.9635 + 152.878i −0.202790 + 0.756822i
\(203\) −133.687 133.687i −0.658555 0.658555i
\(204\) −3.96875 6.87407i −0.0194546 0.0336964i
\(205\) 5.65393 + 3.26430i 0.0275801 + 0.0159234i
\(206\) 139.940 37.4969i 0.679322 0.182024i
\(207\) 58.3977i 0.282114i
\(208\) 76.1260 0.847918i 0.365990 0.00407653i
\(209\) 344.954 1.65050
\(210\) 28.5563 + 106.574i 0.135982 + 0.507493i
\(211\) 23.6402 40.9460i 0.112039 0.194057i −0.804553 0.593880i \(-0.797595\pi\)
0.916592 + 0.399823i \(0.130929\pi\)
\(212\) 37.6767 21.7527i 0.177720 0.102607i
\(213\) 5.71174 5.71174i 0.0268157 0.0268157i
\(214\) −80.4411 21.5541i −0.375893 0.100720i
\(215\) 72.5287 270.681i 0.337343 1.25898i
\(216\) −24.9020 24.9020i −0.115287 0.115287i
\(217\) 175.353 + 303.721i 0.808079 + 1.39963i
\(218\) 62.1955 + 35.9086i 0.285300 + 0.164718i
\(219\) 18.5181 4.96191i 0.0845576 0.0226571i
\(220\) 329.524i 1.49784i
\(221\) −16.8311 9.46908i −0.0761589 0.0428465i
\(222\) 7.27239 0.0327585
\(223\) −18.9159 70.5951i −0.0848246 0.316570i 0.910456 0.413605i \(-0.135731\pi\)
−0.995281 + 0.0970354i \(0.969064\pi\)
\(224\) 147.706 255.834i 0.659401 1.14212i
\(225\) −76.3124 + 44.0590i −0.339166 + 0.195818i
\(226\) 140.391 140.391i 0.621201 0.621201i
\(227\) 285.190 + 76.4165i 1.25635 + 0.336637i 0.824785 0.565447i \(-0.191296\pi\)
0.431561 + 0.902084i \(0.357963\pi\)
\(228\) 32.9308 122.900i 0.144433 0.539033i
\(229\) −94.5359 94.5359i −0.412820 0.412820i 0.469899 0.882720i \(-0.344290\pi\)
−0.882720 + 0.469899i \(0.844290\pi\)
\(230\) −68.6545 118.913i −0.298498 0.517013i
\(231\) 196.231 + 113.294i 0.849485 + 0.490450i
\(232\) 137.055 36.7237i 0.590754 0.158292i
\(233\) 195.092i 0.837304i 0.908147 + 0.418652i \(0.137497\pi\)
−0.908147 + 0.418652i \(0.862503\pi\)
\(234\) −36.1418 9.25399i −0.154452 0.0395470i
\(235\) −301.887 −1.28463
\(236\) −20.0324 74.7619i −0.0848830 0.316788i
\(237\) −115.215 + 199.559i −0.486141 + 0.842021i
\(238\) −11.1139 + 6.41662i −0.0466971 + 0.0269606i
\(239\) 3.70491 3.70491i 0.0155017 0.0155017i −0.699313 0.714815i \(-0.746511\pi\)
0.714815 + 0.699313i \(0.246511\pi\)
\(240\) 72.2455 + 19.3581i 0.301023 + 0.0806589i
\(241\) −65.5611 + 244.677i −0.272038 + 1.01526i 0.685763 + 0.727825i \(0.259469\pi\)
−0.957800 + 0.287434i \(0.907198\pi\)
\(242\) −60.1013 60.1013i −0.248352 0.248352i
\(243\) −7.79423 13.5000i −0.0320750 0.0555556i
\(244\) −111.897 64.6037i −0.458594 0.264769i
\(245\) −231.861 + 62.1268i −0.946370 + 0.253579i
\(246\) 1.46698i 0.00596333i
\(247\) −83.4460 298.103i −0.337838 1.20690i
\(248\) −263.203 −1.06130
\(249\) −32.1873 120.125i −0.129266 0.482428i
\(250\) −15.4220 + 26.7117i −0.0616880 + 0.106847i
\(251\) −154.714 + 89.3243i −0.616391 + 0.355874i −0.775463 0.631393i \(-0.782483\pi\)
0.159071 + 0.987267i \(0.449150\pi\)
\(252\) 59.0973 59.0973i 0.234513 0.234513i
\(253\) −272.379 72.9838i −1.07660 0.288474i
\(254\) −7.21017 + 26.9087i −0.0283865 + 0.105940i
\(255\) −13.4158 13.4158i −0.0526111 0.0526111i
\(256\) 74.7208 + 129.420i 0.291878 + 0.505548i
\(257\) −160.089 92.4273i −0.622913 0.359639i 0.155089 0.987901i \(-0.450434\pi\)
−0.778002 + 0.628261i \(0.783767\pi\)
\(258\) 60.8222 16.2973i 0.235745 0.0631677i
\(259\) 39.6371i 0.153039i
\(260\) 284.769 79.7135i 1.09527 0.306590i
\(261\) 62.8064 0.240638
\(262\) −10.7189 40.0036i −0.0409119 0.152685i
\(263\) −118.817 + 205.797i −0.451775 + 0.782497i −0.998496 0.0548174i \(-0.982542\pi\)
0.546721 + 0.837315i \(0.315876\pi\)
\(264\) −147.270 + 85.0266i −0.557842 + 0.322070i
\(265\) 73.5321 73.5321i 0.277480 0.277480i
\(266\) −198.702 53.2422i −0.747002 0.200158i
\(267\) −38.4616 + 143.541i −0.144051 + 0.537606i
\(268\) −32.9720 32.9720i −0.123030 0.123030i
\(269\) 252.599 + 437.515i 0.939032 + 1.62645i 0.767282 + 0.641310i \(0.221609\pi\)
0.171750 + 0.985141i \(0.445058\pi\)
\(270\) −31.7422 18.3264i −0.117564 0.0678755i
\(271\) 336.778 90.2394i 1.24272 0.332987i 0.423202 0.906036i \(-0.360906\pi\)
0.819521 + 0.573049i \(0.194240\pi\)
\(272\) 8.69958i 0.0319837i
\(273\) 50.4376 196.986i 0.184753 0.721560i
\(274\) 203.112 0.741283
\(275\) 110.127 + 411.001i 0.400463 + 1.49455i
\(276\) −52.0051 + 90.0755i −0.188424 + 0.326360i
\(277\) −236.660 + 136.636i −0.854370 + 0.493271i −0.862123 0.506699i \(-0.830865\pi\)
0.00775302 + 0.999970i \(0.497532\pi\)
\(278\) −119.904 + 119.904i −0.431309 + 0.431309i
\(279\) −112.535 30.1537i −0.403352 0.108078i
\(280\) 116.809 435.936i 0.417174 1.55691i
\(281\) 237.107 + 237.107i 0.843795 + 0.843795i 0.989350 0.145555i \(-0.0464967\pi\)
−0.145555 + 0.989350i \(0.546497\pi\)
\(282\) −33.9171 58.7462i −0.120274 0.208320i
\(283\) −109.314 63.1126i −0.386269 0.223013i 0.294273 0.955721i \(-0.404922\pi\)
−0.680542 + 0.732709i \(0.738256\pi\)
\(284\) −13.8966 + 3.72357i −0.0489316 + 0.0131112i
\(285\) 304.127i 1.06711i
\(286\) −88.3316 + 157.008i −0.308852 + 0.548978i
\(287\) −7.99557 −0.0278591
\(288\) 25.3995 + 94.7921i 0.0881926 + 0.329139i
\(289\) −143.397 + 248.370i −0.496182 + 0.859412i
\(290\) 127.890 73.8375i 0.441001 0.254612i
\(291\) 90.4835 90.4835i 0.310940 0.310940i
\(292\) −32.9820 8.83751i −0.112952 0.0302654i
\(293\) 57.8789 216.007i 0.197539 0.737226i −0.794056 0.607845i \(-0.792034\pi\)
0.991595 0.129381i \(-0.0412990\pi\)
\(294\) −38.1393 38.1393i −0.129726 0.129726i
\(295\) −92.5030 160.220i −0.313570 0.543118i
\(296\) −25.7621 14.8737i −0.0870340 0.0502491i
\(297\) −72.7079 + 19.4820i −0.244808 + 0.0655960i
\(298\) 274.917i 0.922539i
\(299\) 2.81846 + 253.041i 0.00942629 + 0.846291i
\(300\) 156.944 0.523147
\(301\) 88.8260 + 331.503i 0.295103 + 1.10134i
\(302\) 42.0078 72.7596i 0.139099 0.240926i
\(303\) 248.175 143.284i 0.819059 0.472884i
\(304\) −98.6066 + 98.6066i −0.324364 + 0.324364i
\(305\) −298.319 79.9342i −0.978093 0.262079i
\(306\) 1.10340 4.11795i 0.00360589 0.0134574i
\(307\) 67.3811 + 67.3811i 0.219482 + 0.219482i 0.808280 0.588798i \(-0.200399\pi\)
−0.588798 + 0.808280i \(0.700399\pi\)
\(308\) −201.784 349.501i −0.655144 1.13474i
\(309\) −227.173 131.158i −0.735186 0.424460i
\(310\) −264.601 + 70.8997i −0.853552 + 0.228709i
\(311\) 186.824i 0.600720i 0.953826 + 0.300360i \(0.0971068\pi\)
−0.953826 + 0.300360i \(0.902893\pi\)
\(312\) 109.104 + 106.700i 0.349692 + 0.341988i
\(313\) 316.741 1.01195 0.505976 0.862547i \(-0.331132\pi\)
0.505976 + 0.862547i \(0.331132\pi\)
\(314\) 51.1791 + 191.003i 0.162991 + 0.608290i
\(315\) 99.8854 173.007i 0.317096 0.549227i
\(316\) 355.428 205.206i 1.12477 0.649387i
\(317\) 288.027 288.027i 0.908603 0.908603i −0.0875568 0.996160i \(-0.527906\pi\)
0.996160 + 0.0875568i \(0.0279059\pi\)
\(318\) 22.5705 + 6.04774i 0.0709763 + 0.0190180i
\(319\) 78.4937 292.942i 0.246062 0.918315i
\(320\) 41.0229 + 41.0229i 0.128197 + 0.128197i
\(321\) 75.3929 + 130.584i 0.234869 + 0.406805i
\(322\) 145.633 + 84.0812i 0.452276 + 0.261122i
\(323\) 34.1688 9.15552i 0.105786 0.0283452i
\(324\) 27.7641i 0.0856917i
\(325\) 328.540 194.594i 1.01089 0.598749i
\(326\) 115.729 0.354998
\(327\) −33.6551 125.602i −0.102921 0.384105i
\(328\) 3.00032 5.19670i 0.00914731 0.0158436i
\(329\) 320.188 184.861i 0.973216 0.561886i
\(330\) −125.149 + 125.149i −0.379238 + 0.379238i
\(331\) −237.786 63.7145i −0.718386 0.192491i −0.118934 0.992902i \(-0.537948\pi\)
−0.599451 + 0.800411i \(0.704614\pi\)
\(332\) −57.3277 + 213.950i −0.172674 + 0.644428i
\(333\) −9.31083 9.31083i −0.0279604 0.0279604i
\(334\) 65.0910 + 112.741i 0.194883 + 0.337548i
\(335\) −96.5250 55.7287i −0.288134 0.166354i
\(336\) −88.4792 + 23.7079i −0.263331 + 0.0705593i
\(337\) 335.194i 0.994642i −0.867567 0.497321i \(-0.834317\pi\)
0.867567 0.497321i \(-0.165683\pi\)
\(338\) 157.051 + 38.3538i 0.464649 + 0.113473i
\(339\) −359.486 −1.06043
\(340\) 8.74600 + 32.6405i 0.0257235 + 0.0960015i
\(341\) −281.287 + 487.203i −0.824888 + 1.42875i
\(342\) 59.1822 34.1688i 0.173047 0.0999089i
\(343\) −105.024 + 105.024i −0.306192 + 0.306192i
\(344\) −248.791 66.6635i −0.723231 0.193789i
\(345\) −64.3460 + 240.143i −0.186510 + 0.696065i
\(346\) −5.00125 5.00125i −0.0144545 0.0144545i
\(347\) 49.6308 + 85.9631i 0.143028 + 0.247732i 0.928636 0.370993i \(-0.120983\pi\)
−0.785607 + 0.618725i \(0.787649\pi\)
\(348\) −96.8757 55.9312i −0.278378 0.160722i
\(349\) −341.285 + 91.4471i −0.977894 + 0.262026i −0.712158 0.702020i \(-0.752282\pi\)
−0.265737 + 0.964046i \(0.585615\pi\)
\(350\) 253.745i 0.724987i
\(351\) 34.4244 + 58.1202i 0.0980754 + 0.165585i
\(352\) 473.874 1.34623
\(353\) −138.527 516.988i −0.392426 1.46456i −0.826120 0.563495i \(-0.809457\pi\)
0.433693 0.901061i \(-0.357210\pi\)
\(354\) 20.7855 36.0016i 0.0587161 0.101699i
\(355\) −29.7813 + 17.1942i −0.0838910 + 0.0484345i
\(356\) 187.153 187.153i 0.525711 0.525711i
\(357\) 22.4443 + 6.01394i 0.0628693 + 0.0168458i
\(358\) −0.603302 + 2.25155i −0.00168520 + 0.00628926i
\(359\) 121.412 + 121.412i 0.338195 + 0.338195i 0.855688 0.517493i \(-0.173135\pi\)
−0.517493 + 0.855688i \(0.673135\pi\)
\(360\) 74.9635 + 129.841i 0.208232 + 0.360668i
\(361\) 178.431 + 103.017i 0.494269 + 0.285366i
\(362\) −198.183 + 53.1030i −0.547467 + 0.146693i
\(363\) 153.895i 0.423954i
\(364\) −253.220 + 258.925i −0.695660 + 0.711331i
\(365\) −81.6174 −0.223609
\(366\) −17.9613 67.0324i −0.0490745 0.183149i
\(367\) −245.179 + 424.663i −0.668064 + 1.15712i 0.310381 + 0.950612i \(0.399543\pi\)
−0.978445 + 0.206508i \(0.933790\pi\)
\(368\) 98.7237 56.9981i 0.268271 0.154886i
\(369\) 1.87817 1.87817i 0.00508990 0.00508990i
\(370\) −29.9055 8.01314i −0.0808256 0.0216571i
\(371\) −32.9624 + 123.017i −0.0888473 + 0.331583i
\(372\) 146.727 + 146.727i 0.394427 + 0.394427i
\(373\) −53.2171 92.1747i −0.142673 0.247117i 0.785829 0.618443i \(-0.212236\pi\)
−0.928502 + 0.371326i \(0.878903\pi\)
\(374\) −17.8280 10.2930i −0.0476685 0.0275214i
\(375\) 53.9437 14.4542i 0.143850 0.0385445i
\(376\) 277.474i 0.737963i
\(377\) −272.144 + 3.03124i −0.721868 + 0.00804042i
\(378\) 44.8886 0.118753
\(379\) 72.6275 + 271.050i 0.191629 + 0.715170i 0.993114 + 0.117155i \(0.0373773\pi\)
−0.801484 + 0.598016i \(0.795956\pi\)
\(380\) −270.836 + 469.101i −0.712726 + 1.23448i
\(381\) 43.6824 25.2200i 0.114652 0.0661943i
\(382\) −204.079 + 204.079i −0.534239 + 0.534239i
\(383\) −211.232 56.5995i −0.551521 0.147779i −0.0277127 0.999616i \(-0.508822\pi\)
−0.523808 + 0.851836i \(0.675489\pi\)
\(384\) 55.2836 206.321i 0.143968 0.537295i
\(385\) −682.106 682.106i −1.77170 1.77170i
\(386\) −65.7814 113.937i −0.170418 0.295173i
\(387\) −98.7360 57.0053i −0.255132 0.147300i
\(388\) −220.145 + 58.9876i −0.567384 + 0.152030i
\(389\) 68.7312i 0.176687i −0.996090 0.0883435i \(-0.971843\pi\)
0.996090 0.0883435i \(-0.0281573\pi\)
\(390\) 138.426 + 77.8774i 0.354937 + 0.199686i
\(391\) −28.9172 −0.0739570
\(392\) 57.1028 + 213.110i 0.145670 + 0.543649i
\(393\) −37.4931 + 64.9399i −0.0954022 + 0.165242i
\(394\) −168.128 + 97.0689i −0.426722 + 0.246368i
\(395\) 693.674 693.674i 1.75614 1.75614i
\(396\) 129.498 + 34.6988i 0.327014 + 0.0876232i
\(397\) 160.179 597.797i 0.403474 1.50579i −0.403378 0.915033i \(-0.632164\pi\)
0.806852 0.590753i \(-0.201169\pi\)
\(398\) −66.8313 66.8313i −0.167918 0.167918i
\(399\) 186.233 + 322.564i 0.466748 + 0.808432i
\(400\) −148.967 86.0062i −0.372418 0.215015i
\(401\) 388.764 104.169i 0.969486 0.259773i 0.260875 0.965372i \(-0.415989\pi\)
0.708611 + 0.705599i \(0.249322\pi\)
\(402\) 25.0446i 0.0622999i
\(403\) 489.078 + 125.227i 1.21359 + 0.310736i
\(404\) −510.397 −1.26336
\(405\) 17.1763 + 64.1027i 0.0424106 + 0.158278i
\(406\) −90.4289 + 156.627i −0.222731 + 0.385782i
\(407\) −55.0641 + 31.7913i −0.135293 + 0.0781112i
\(408\) −12.3309 + 12.3309i −0.0302228 + 0.0302228i
\(409\) 522.523 + 140.010i 1.27756 + 0.342322i 0.832923 0.553388i \(-0.186665\pi\)
0.444639 + 0.895710i \(0.353332\pi\)
\(410\) 1.61640 6.03250i 0.00394245 0.0147134i
\(411\) −260.043 260.043i −0.632709 0.632709i
\(412\) 233.602 + 404.610i 0.566994 + 0.982063i
\(413\) 196.221 + 113.289i 0.475113 + 0.274306i
\(414\) −53.9602 + 14.4586i −0.130339 + 0.0349241i
\(415\) 529.441i 1.27576i
\(416\) −114.633 409.514i −0.275559 0.984410i
\(417\) 307.026 0.736273
\(418\) −85.4066 318.742i −0.204322 0.762540i
\(419\) 346.999 601.020i 0.828161 1.43442i −0.0713190 0.997454i \(-0.522721\pi\)
0.899480 0.436963i \(-0.143946\pi\)
\(420\) −308.136 + 177.903i −0.733658 + 0.423578i
\(421\) −199.072 + 199.072i −0.472856 + 0.472856i −0.902838 0.429982i \(-0.858520\pi\)
0.429982 + 0.902838i \(0.358520\pi\)
\(422\) −43.6877 11.7061i −0.103525 0.0277395i
\(423\) −31.7886 + 118.637i −0.0751504 + 0.280465i
\(424\) −67.5857 67.5857i −0.159400 0.159400i
\(425\) 21.8170 + 37.7882i 0.0513341 + 0.0889133i
\(426\) −6.69188 3.86356i −0.0157086 0.00906939i
\(427\) 365.351 97.8955i 0.855623 0.229263i
\(428\) 268.560i 0.627476i
\(429\) 314.108 87.9260i 0.732186 0.204956i
\(430\) −268.070 −0.623419
\(431\) 137.582 + 513.464i 0.319217 + 1.19133i 0.919999 + 0.391920i \(0.128189\pi\)
−0.600782 + 0.799413i \(0.705144\pi\)
\(432\) 15.2149 26.3529i 0.0352196 0.0610021i
\(433\) 406.182 234.509i 0.938064 0.541592i 0.0487112 0.998813i \(-0.484489\pi\)
0.889353 + 0.457221i \(0.151155\pi\)
\(434\) 237.226 237.226i 0.546605 0.546605i
\(435\) −258.272 69.2038i −0.593729 0.159089i
\(436\) −59.9420 + 223.707i −0.137482 + 0.513088i
\(437\) −327.766 327.766i −0.750037 0.750037i
\(438\) −9.16975 15.8825i −0.0209355 0.0362613i
\(439\) −243.266 140.450i −0.554137 0.319931i 0.196652 0.980473i \(-0.436993\pi\)
−0.750789 + 0.660542i \(0.770326\pi\)
\(440\) 699.291 187.375i 1.58930 0.425851i
\(441\) 97.6594i 0.221450i
\(442\) −4.58236 + 17.8966i −0.0103673 + 0.0404900i
\(443\) −538.757 −1.21616 −0.608078 0.793877i \(-0.708059\pi\)
−0.608078 + 0.793877i \(0.708059\pi\)
\(444\) 6.06988 + 22.6531i 0.0136709 + 0.0510205i
\(445\) 316.323 547.888i 0.710839 1.23121i
\(446\) −60.5474 + 34.9571i −0.135757 + 0.0783791i
\(447\) −351.976 + 351.976i −0.787417 + 0.787417i
\(448\) −68.6302 18.3894i −0.153192 0.0410478i
\(449\) 165.141 616.316i 0.367798 1.37264i −0.495789 0.868443i \(-0.665121\pi\)
0.863588 0.504199i \(-0.168212\pi\)
\(450\) 59.6052 + 59.6052i 0.132456 + 0.132456i
\(451\) −6.41291 11.1075i −0.0142193 0.0246286i
\(452\) 554.489 + 320.134i 1.22674 + 0.708262i
\(453\) −146.936 + 39.3715i −0.324363 + 0.0869128i
\(454\) 282.440i 0.622114i
\(455\) −424.460 + 754.469i −0.932879 + 1.65817i
\(456\) −279.533 −0.613011
\(457\) −87.1500 325.248i −0.190700 0.711703i −0.993338 0.115236i \(-0.963237\pi\)
0.802638 0.596467i \(-0.203429\pi\)
\(458\) −63.9464 + 110.758i −0.139621 + 0.241831i
\(459\) −6.68489 + 3.85952i −0.0145640 + 0.00840855i
\(460\) 313.106 313.106i 0.680664 0.680664i
\(461\) −43.3727 11.6217i −0.0940839 0.0252097i 0.211470 0.977384i \(-0.432175\pi\)
−0.305554 + 0.952175i \(0.598842\pi\)
\(462\) 56.1006 209.370i 0.121430 0.453182i
\(463\) 401.890 + 401.890i 0.868014 + 0.868014i 0.992252 0.124238i \(-0.0396488\pi\)
−0.124238 + 0.992252i \(0.539649\pi\)
\(464\) 61.3012 + 106.177i 0.132115 + 0.228829i
\(465\) 429.541 + 247.996i 0.923745 + 0.533324i
\(466\) 180.267 48.3025i 0.386840 0.103653i
\(467\) 415.800i 0.890364i 0.895440 + 0.445182i \(0.146861\pi\)
−0.895440 + 0.445182i \(0.853139\pi\)
\(468\) −1.33998 120.304i −0.00286322 0.257059i
\(469\) 136.502 0.291049
\(470\) 74.7438 + 278.948i 0.159029 + 0.593505i
\(471\) 179.016 310.065i 0.380077 0.658313i
\(472\) −147.263 + 85.0225i −0.311998 + 0.180132i
\(473\) −389.282 + 389.282i −0.823007 + 0.823007i
\(474\) 212.921 + 57.0520i 0.449200 + 0.120363i
\(475\) −181.027 + 675.604i −0.381110 + 1.42232i
\(476\) −29.2636 29.2636i −0.0614782 0.0614782i
\(477\) −21.1540 36.6398i −0.0443481 0.0768131i
\(478\) −4.34068 2.50609i −0.00908092 0.00524287i
\(479\) 114.567 30.6981i 0.239179 0.0640879i −0.137238 0.990538i \(-0.543823\pi\)
0.376417 + 0.926450i \(0.377156\pi\)
\(480\) 417.790i 0.870396i
\(481\) 40.7938 + 39.8950i 0.0848104 + 0.0829419i
\(482\) 242.317 0.502733
\(483\) −78.8046 294.103i −0.163156 0.608908i
\(484\) 137.049 237.376i 0.283159 0.490445i
\(485\) −471.785 + 272.385i −0.972754 + 0.561620i
\(486\) −10.5444 + 10.5444i −0.0216963 + 0.0216963i
\(487\) −441.274 118.239i −0.906108 0.242791i −0.224470 0.974481i \(-0.572065\pi\)
−0.681637 + 0.731690i \(0.738732\pi\)
\(488\) −73.4701 + 274.194i −0.150553 + 0.561873i
\(489\) −148.168 148.168i −0.303003 0.303003i
\(490\) 114.812 + 198.860i 0.234310 + 0.405837i
\(491\) −292.221 168.714i −0.595154 0.343612i 0.171979 0.985101i \(-0.444984\pi\)
−0.767133 + 0.641488i \(0.778317\pi\)
\(492\) −4.56956 + 1.22441i −0.00928773 + 0.00248864i
\(493\) 31.1003i 0.0630837i
\(494\) −254.791 + 150.912i −0.515771 + 0.305490i
\(495\) 320.455 0.647385
\(496\) −58.8621 219.676i −0.118674 0.442896i
\(497\) 21.0578 36.4732i 0.0423698 0.0733867i
\(498\) −103.027 + 59.4829i −0.206882 + 0.119444i
\(499\) −149.216 + 149.216i −0.299029 + 0.299029i −0.840634 0.541604i \(-0.817817\pi\)
0.541604 + 0.840634i \(0.317817\pi\)
\(500\) −96.0774 25.7439i −0.192155 0.0514877i
\(501\) 61.0061 227.678i 0.121769 0.454447i
\(502\) 120.842 + 120.842i 0.240722 + 0.240722i
\(503\) −420.108 727.648i −0.835205 1.44662i −0.893864 0.448339i \(-0.852016\pi\)
0.0586591 0.998278i \(-0.481318\pi\)
\(504\) −159.016 91.8078i −0.315508 0.182158i
\(505\) −1178.42 + 315.757i −2.33351 + 0.625262i
\(506\) 269.752i 0.533107i
\(507\) −151.968 250.177i −0.299740 0.493446i
\(508\) −89.8371 −0.176845
\(509\) −0.0714391 0.266614i −0.000140352 0.000523800i 0.965856 0.259081i \(-0.0834196\pi\)
−0.965996 + 0.258557i \(0.916753\pi\)
\(510\) −9.07480 + 15.7180i −0.0177937 + 0.0308196i
\(511\) 86.5652 49.9785i 0.169404 0.0978052i
\(512\) −247.720 + 247.720i −0.483829 + 0.483829i
\(513\) −119.517 32.0245i −0.232977 0.0624260i
\(514\) −45.7679 + 170.808i −0.0890426 + 0.332311i
\(515\) 789.660 + 789.660i 1.53332 + 1.53332i
\(516\) 101.530 + 175.855i 0.196764 + 0.340805i
\(517\) 513.619 + 296.538i 0.993459 + 0.573574i
\(518\) 36.6252 9.81370i 0.0707051 0.0189454i
\(519\) 12.8062i 0.0246747i
\(520\) −331.088 558.989i −0.636708 1.07498i
\(521\) 59.7795 0.114740 0.0573699 0.998353i \(-0.481729\pi\)
0.0573699 + 0.998353i \(0.481729\pi\)
\(522\) −15.5501 58.0339i −0.0297895 0.111176i
\(523\) −95.0027 + 164.549i −0.181649 + 0.314626i −0.942442 0.334369i \(-0.891477\pi\)
0.760793 + 0.648995i \(0.224810\pi\)
\(524\) 115.662 66.7777i 0.220730 0.127438i
\(525\) −324.870 + 324.870i −0.618800 + 0.618800i
\(526\) 219.577 + 58.8354i 0.417446 + 0.111854i
\(527\) −14.9314 + 55.7249i −0.0283329 + 0.105740i
\(528\) −103.901 103.901i −0.196781 0.196781i
\(529\) −75.0395 129.972i −0.141852 0.245694i
\(530\) −86.1503 49.7389i −0.162548 0.0938470i
\(531\) −72.7044 + 19.4811i −0.136920 + 0.0366875i
\(532\) 663.386i 1.24697i
\(533\) −8.04759 + 8.22889i −0.0150987 + 0.0154388i
\(534\) 142.156 0.266210
\(535\) −166.145 620.061i −0.310551 1.15899i
\(536\) −51.2220 + 88.7192i −0.0955635 + 0.165521i
\(537\) 3.65507 2.11025i 0.00680646 0.00392971i
\(538\) 341.729 341.729i 0.635184 0.635184i
\(539\) 455.504 + 122.052i 0.845091 + 0.226442i
\(540\) 30.5921 114.171i 0.0566521 0.211428i
\(541\) −267.096 267.096i −0.493707 0.493707i 0.415765 0.909472i \(-0.363514\pi\)
−0.909472 + 0.415765i \(0.863514\pi\)
\(542\) −166.765 288.845i −0.307684 0.532924i
\(543\) 321.721 + 185.746i 0.592488 + 0.342073i
\(544\) 46.9389 12.5772i 0.0862847 0.0231199i
\(545\) 553.585i 1.01575i
\(546\) −194.505 + 2.16647i −0.356237 + 0.00396790i
\(547\) −159.345 −0.291308 −0.145654 0.989336i \(-0.546529\pi\)
−0.145654 + 0.989336i \(0.546529\pi\)
\(548\) 169.527 + 632.682i 0.309355 + 1.15453i
\(549\) −62.8257 + 108.817i −0.114437 + 0.198210i
\(550\) 352.504 203.518i 0.640917 0.370033i
\(551\) 352.511 352.511i 0.639765 0.639765i
\(552\) 220.723 + 59.1424i 0.399860 + 0.107142i
\(553\) −310.954 + 1160.50i −0.562304 + 2.09855i
\(554\) 184.848 + 184.848i 0.333660 + 0.333660i
\(555\) 28.0287 + 48.5471i 0.0505022 + 0.0874723i
\(556\) −473.572 273.417i −0.851748 0.491757i
\(557\) −423.037 + 113.352i −0.759492 + 0.203505i −0.617724 0.786395i \(-0.711945\pi\)
−0.141768 + 0.989900i \(0.545279\pi\)
\(558\) 111.450i 0.199731i
\(559\) 430.581 + 242.242i 0.770270 + 0.433349i
\(560\) 389.966 0.696368
\(561\) 9.64705 + 36.0033i 0.0171962 + 0.0641770i
\(562\) 160.385 277.794i 0.285382 0.494296i
\(563\) 643.670 371.623i 1.14329 0.660076i 0.196043 0.980595i \(-0.437191\pi\)
0.947242 + 0.320519i \(0.103857\pi\)
\(564\) 154.682 154.682i 0.274260 0.274260i
\(565\) 1478.27 + 396.102i 2.61642 + 0.701066i
\(566\) −31.2519 + 116.634i −0.0552154 + 0.206067i
\(567\) −57.4709 57.4709i −0.101360 0.101360i
\(568\) 15.8038 + 27.3729i 0.0278235 + 0.0481918i
\(569\) −872.664 503.833i −1.53368 0.885471i −0.999188 0.0402979i \(-0.987169\pi\)
−0.534493 0.845173i \(-0.679497\pi\)
\(570\) −281.018 + 75.2985i −0.493014 + 0.132103i
\(571\) 818.748i 1.43388i −0.697133 0.716942i \(-0.745541\pi\)
0.697133 0.716942i \(-0.254459\pi\)
\(572\) −562.797 144.102i −0.983910 0.251927i
\(573\) 522.565 0.911980
\(574\) 1.97961 + 7.38801i 0.00344880 + 0.0128711i
\(575\) 285.883 495.163i 0.497187 0.861153i
\(576\) 20.4411 11.8016i 0.0354879 0.0204890i
\(577\) −302.907 + 302.907i −0.524969 + 0.524969i −0.919068 0.394099i \(-0.871057\pi\)
0.394099 + 0.919068i \(0.371057\pi\)
\(578\) 265.001 + 71.0067i 0.458479 + 0.122849i
\(579\) −61.6532 + 230.093i −0.106482 + 0.397397i
\(580\) 336.743 + 336.743i 0.580592 + 0.580592i
\(581\) −324.203 561.537i −0.558009 0.966501i
\(582\) −106.011 61.2052i −0.182149 0.105164i
\(583\) −197.334 + 52.8754i −0.338480 + 0.0906954i
\(584\) 75.0171i 0.128454i
\(585\) −77.5197 276.932i −0.132512 0.473389i
\(586\) −213.924 −0.365057
\(587\) 21.6262 + 80.7101i 0.0368419 + 0.137496i 0.981897 0.189415i \(-0.0606590\pi\)
−0.945055 + 0.326911i \(0.893992\pi\)
\(588\) 86.9690 150.635i 0.147906 0.256181i
\(589\) −800.864 + 462.379i −1.35970 + 0.785024i
\(590\) −125.143 + 125.143i −0.212106 + 0.212106i
\(591\) 339.532 + 90.9772i 0.574504 + 0.153938i
\(592\) 6.65265 24.8280i 0.0112376 0.0419392i
\(593\) 299.336 + 299.336i 0.504782 + 0.504782i 0.912920 0.408138i \(-0.133822\pi\)
−0.408138 + 0.912920i \(0.633822\pi\)
\(594\) 36.0033 + 62.3595i 0.0606116 + 0.104982i
\(595\) −85.6689 49.4609i −0.143981 0.0831276i
\(596\) 856.351 229.458i 1.43683 0.384997i
\(597\) 171.128i 0.286647i
\(598\) 233.115 65.2543i 0.389825 0.109121i
\(599\) −678.215 −1.13225 −0.566123 0.824321i \(-0.691557\pi\)
−0.566123 + 0.824321i \(0.691557\pi\)
\(600\) −89.2418 333.055i −0.148736 0.555091i
\(601\) 371.743 643.877i 0.618540 1.07134i −0.371212 0.928548i \(-0.621058\pi\)
0.989752 0.142795i \(-0.0456091\pi\)
\(602\) 284.321 164.153i 0.472294 0.272679i
\(603\) −32.0645 + 32.0645i −0.0531750 + 0.0531750i
\(604\) 261.704 + 70.1233i 0.433284 + 0.116098i
\(605\) 169.571 632.847i 0.280282 1.04603i
\(606\) −193.841 193.841i −0.319870 0.319870i
\(607\) −535.813 928.056i −0.882724 1.52892i −0.848300 0.529516i \(-0.822374\pi\)
−0.0344238 0.999407i \(-0.510960\pi\)
\(608\) 674.594 + 389.477i 1.10953 + 0.640587i
\(609\) 316.306 84.7539i 0.519386 0.139169i
\(610\) 295.441i 0.484329i
\(611\) 132.016 515.595i 0.216066 0.843854i
\(612\) 13.7481 0.0224643
\(613\) 128.946 + 481.231i 0.210352 + 0.785043i 0.987751 + 0.156036i \(0.0498716\pi\)
−0.777400 + 0.629007i \(0.783462\pi\)
\(614\) 45.5782 78.9438i 0.0742316 0.128573i
\(615\) −9.79289 + 5.65393i −0.0159234 + 0.00919338i
\(616\) −626.945 + 626.945i −1.01777 + 1.01777i
\(617\) −48.3775 12.9627i −0.0784077 0.0210093i 0.219402 0.975635i \(-0.429589\pi\)
−0.297810 + 0.954625i \(0.596256\pi\)
\(618\) −64.9465 + 242.384i −0.105091 + 0.392207i
\(619\) 641.314 + 641.314i 1.03605 + 1.03605i 0.999326 + 0.0367223i \(0.0116917\pi\)
0.0367223 + 0.999326i \(0.488308\pi\)
\(620\) −441.697 765.042i −0.712415 1.23394i
\(621\) 87.5965 + 50.5739i 0.141057 + 0.0814394i
\(622\) 172.628 46.2554i 0.277536 0.0743657i
\(623\) 774.803i 1.24366i
\(624\) −64.6551 + 114.923i −0.103614 + 0.184172i
\(625\) 496.563 0.794501
\(626\) −78.4215 292.673i −0.125274 0.467529i
\(627\) −298.739 + 517.430i −0.476457 + 0.825248i
\(628\) −552.248 + 318.840i −0.879375 + 0.507707i
\(629\) −4.61051 + 4.61051i −0.00732990 + 0.00732990i
\(630\) −184.591 49.4609i −0.293001 0.0785094i
\(631\) 75.1504 280.465i 0.119097 0.444477i −0.880463 0.474114i \(-0.842768\pi\)
0.999561 + 0.0296370i \(0.00943514\pi\)
\(632\) −637.577 637.577i −1.00882 1.00882i
\(633\) 40.9460 + 70.9206i 0.0646857 + 0.112039i
\(634\) −337.453 194.829i −0.532260 0.307301i
\(635\) −207.419 + 55.5778i −0.326644 + 0.0875241i
\(636\) 75.3535i 0.118480i
\(637\) −4.71336 423.164i −0.00739930 0.664308i
\(638\) −290.117 −0.454729
\(639\) 3.62110 + 13.5141i 0.00566682 + 0.0211489i
\(640\) −454.673 + 787.518i −0.710427 + 1.23050i
\(641\) −846.246 + 488.580i −1.32020 + 0.762216i −0.983760 0.179491i \(-0.942555\pi\)
−0.336436 + 0.941706i \(0.609222\pi\)
\(642\) 101.995 101.995i 0.158871 0.158871i
\(643\) −740.884 198.519i −1.15223 0.308739i −0.368372 0.929679i \(-0.620085\pi\)
−0.783859 + 0.620939i \(0.786751\pi\)
\(644\) −140.356 + 523.817i −0.217945 + 0.813380i
\(645\) 343.210 + 343.210i 0.532108 + 0.532108i
\(646\) −16.9196 29.3057i −0.0261914 0.0453648i
\(647\) 641.839 + 370.566i 0.992024 + 0.572745i 0.905879 0.423537i \(-0.139212\pi\)
0.0861452 + 0.996283i \(0.472545\pi\)
\(648\) 58.9189 15.7873i 0.0909242 0.0243631i
\(649\) 363.456i 0.560024i
\(650\) −261.150 255.396i −0.401769 0.392917i
\(651\) −607.441 −0.933090
\(652\) 96.5933 + 360.491i 0.148149 + 0.552900i
\(653\) 324.951 562.831i 0.497627 0.861916i −0.502369 0.864653i \(-0.667538\pi\)
0.999996 + 0.00273761i \(0.000871408\pi\)
\(654\) −107.726 + 62.1955i −0.164718 + 0.0951001i
\(655\) 225.733 225.733i 0.344631 0.344631i
\(656\) 5.00829 + 1.34197i 0.00763459 + 0.00204568i
\(657\) −8.59429 + 32.0743i −0.0130811 + 0.0488194i
\(658\) −250.089 250.089i −0.380074 0.380074i
\(659\) 195.439 + 338.510i 0.296568 + 0.513672i 0.975349 0.220670i \(-0.0708244\pi\)
−0.678780 + 0.734342i \(0.737491\pi\)
\(660\) −494.286 285.376i −0.748919 0.432388i
\(661\) 307.060 82.2766i 0.464539 0.124473i −0.0189553 0.999820i \(-0.506034\pi\)
0.483494 + 0.875347i \(0.339367\pi\)
\(662\) 235.492i 0.355728i
\(663\) 28.7798 17.0462i 0.0434084 0.0257107i
\(664\) 486.626 0.732871
\(665\) −410.404 1531.65i −0.617149 2.30323i
\(666\) −6.29807 + 10.9086i −0.00945656 + 0.0163793i
\(667\) −352.929 + 203.764i −0.529129 + 0.305493i
\(668\) −296.854 + 296.854i −0.444392 + 0.444392i
\(669\) 122.274 + 32.7633i 0.182772 + 0.0489735i
\(670\) −27.5956 + 102.988i −0.0411874 + 0.153714i
\(671\) 429.029 + 429.029i 0.639388 + 0.639388i
\(672\) 255.834 + 443.117i 0.380705 + 0.659401i
\(673\) 674.426 + 389.380i 1.00212 + 0.578573i 0.908874 0.417070i \(-0.136943\pi\)
0.0932440 + 0.995643i \(0.470276\pi\)
\(674\) −309.724 + 82.9903i −0.459531 + 0.123131i
\(675\) 152.625i 0.226111i
\(676\) 11.6125 + 521.219i 0.0171782 + 0.771034i
\(677\) −274.256 −0.405105 −0.202552 0.979271i \(-0.564924\pi\)
−0.202552 + 0.979271i \(0.564924\pi\)
\(678\) 89.0045 + 332.169i 0.131275 + 0.489926i
\(679\) 333.591 577.796i 0.491297 0.850951i
\(680\) 64.2941 37.1202i 0.0945501 0.0545885i
\(681\) −361.607 + 361.607i −0.530994 + 0.530994i
\(682\) 519.825 + 139.287i 0.762207 + 0.204233i
\(683\) −54.8647 + 204.758i −0.0803290 + 0.299792i −0.994389 0.105788i \(-0.966264\pi\)
0.914060 + 0.405580i \(0.132930\pi\)
\(684\) 155.830 + 155.830i 0.227822 + 0.227822i
\(685\) 782.818 + 1355.88i 1.14280 + 1.97939i
\(686\) 123.046 + 71.0408i 0.179368 + 0.103558i
\(687\) 223.674 59.9333i 0.325581 0.0872392i
\(688\) 222.556i 0.323483i
\(689\) 93.4301 + 157.742i 0.135602 + 0.228943i
\(690\) 237.826 0.344676
\(691\) −189.135 705.860i −0.273711 1.02151i −0.956700 0.291076i \(-0.905987\pi\)
0.682989 0.730429i \(-0.260680\pi\)
\(692\) 11.4043 19.7529i 0.0164803 0.0285446i
\(693\) −339.882 + 196.231i −0.490450 + 0.283162i
\(694\) 67.1430 67.1430i 0.0967479 0.0967479i
\(695\) −1262.55 338.299i −1.81662 0.486761i
\(696\) −63.6074 + 237.386i −0.0913899 + 0.341072i
\(697\) −0.930028 0.930028i −0.00133433 0.00133433i
\(698\) 168.997 + 292.711i 0.242115 + 0.419356i
\(699\) −292.638 168.954i −0.418652 0.241709i
\(700\) 790.403 211.788i 1.12915 0.302554i
\(701\) 741.120i 1.05723i −0.848861 0.528616i \(-0.822711\pi\)
0.848861 0.528616i \(-0.177289\pi\)
\(702\) 45.1807 46.1985i 0.0643600 0.0658099i
\(703\) −104.517 −0.148673
\(704\) −29.4987 110.091i −0.0419016 0.156379i
\(705\) 261.442 452.831i 0.370839 0.642313i
\(706\) −443.406 + 256.001i −0.628054 + 0.362607i
\(707\) 1056.51 1056.51i 1.49435 1.49435i
\(708\) 129.491 + 34.6971i 0.182898 + 0.0490072i
\(709\) 195.004 727.766i 0.275041 1.02647i −0.680772 0.732495i \(-0.738356\pi\)
0.955814 0.293973i \(-0.0949777\pi\)
\(710\) 23.2612 + 23.2612i 0.0327623 + 0.0327623i
\(711\) −199.559 345.646i −0.280674 0.486141i
\(712\) −503.581 290.743i −0.707277 0.408347i
\(713\) 730.199 195.656i 1.02412 0.274413i
\(714\) 22.2278i 0.0311314i
\(715\) −1388.55 + 15.4662i −1.94203 + 0.0216311i
\(716\) −7.51701 −0.0104986
\(717\) 2.34882 + 8.76591i 0.00327590 + 0.0122258i
\(718\) 82.1261 142.247i 0.114382 0.198115i
\(719\) −623.311 + 359.869i −0.866914 + 0.500513i −0.866322 0.499487i \(-0.833522\pi\)
−0.000592602 1.00000i \(0.500189\pi\)
\(720\) −91.6037 + 91.6037i −0.127227 + 0.127227i
\(721\) −1321.08 353.982i −1.83229 0.490960i
\(722\) 51.0118 190.379i 0.0706534 0.263682i
\(723\) −310.239 310.239i −0.429099 0.429099i
\(724\) −330.826 573.007i −0.456942 0.791446i
\(725\) 532.545 + 307.465i 0.734545 + 0.424090i
\(726\) 142.201 38.1027i 0.195869 0.0524830i
\(727\) 348.947i 0.479982i 0.970775 + 0.239991i \(0.0771445\pi\)
−0.970775 + 0.239991i \(0.922856\pi\)
\(728\) 693.457 + 390.135i 0.952550 + 0.535899i
\(729\) 27.0000 0.0370370
\(730\) 20.2075 + 75.4155i 0.0276816 + 0.103309i
\(731\) −28.2277 + 48.8918i −0.0386152 + 0.0668835i
\(732\) 193.811 111.897i 0.264769 0.152865i
\(733\) −893.047 + 893.047i −1.21834 + 1.21834i −0.250133 + 0.968211i \(0.580474\pi\)
−0.968211 + 0.250133i \(0.919526\pi\)
\(734\) 453.098 + 121.407i 0.617300 + 0.165405i
\(735\) 107.607 401.594i 0.146404 0.546387i
\(736\) −450.263 450.263i −0.611771 0.611771i
\(737\) 109.483 + 189.629i 0.148552 + 0.257299i
\(738\) −2.20047 1.27044i −0.00298167 0.00172147i
\(739\) 531.494 142.413i 0.719206 0.192711i 0.119389 0.992848i \(-0.461906\pi\)
0.599818 + 0.800137i \(0.295240\pi\)
\(740\) 99.8420i 0.134922i
\(741\) 519.421 + 132.996i 0.700973 + 0.179482i
\(742\) 121.831 0.164192
\(743\) 94.3682 + 352.187i 0.127010 + 0.474007i 0.999903 0.0139039i \(-0.00442589\pi\)
−0.872894 + 0.487911i \(0.837759\pi\)
\(744\) 227.941 394.805i 0.306372 0.530652i
\(745\) 1835.22 1059.56i 2.46338 1.42223i
\(746\) −71.9947 + 71.9947i −0.0965076 + 0.0965076i
\(747\) 208.062 + 55.7500i 0.278530 + 0.0746318i
\(748\) 17.1821 64.1243i 0.0229707 0.0857277i
\(749\) 555.911 + 555.911i 0.742204 + 0.742204i
\(750\) −26.7117 46.2660i −0.0356156 0.0616880i
\(751\) 1151.63 + 664.893i 1.53346 + 0.885343i 0.999199 + 0.0400240i \(0.0127434\pi\)
0.534261 + 0.845319i \(0.320590\pi\)
\(752\) −231.587 + 62.0536i −0.307961 + 0.0825180i
\(753\) 309.428i 0.410928i
\(754\) 70.1807 + 250.714i 0.0930778 + 0.332512i
\(755\) 647.613 0.857766
\(756\) 37.4662 + 139.826i 0.0495584 + 0.184955i
\(757\) −525.086 + 909.475i −0.693640 + 1.20142i 0.276997 + 0.960871i \(0.410661\pi\)
−0.970637 + 0.240549i \(0.922672\pi\)
\(758\) 232.472 134.218i 0.306691 0.177068i
\(759\) 345.363 345.363i 0.455024 0.455024i
\(760\) 1149.49 + 308.006i 1.51249 + 0.405271i
\(761\) −25.2037 + 94.0616i −0.0331192 + 0.123603i −0.980506 0.196487i \(-0.937047\pi\)
0.947387 + 0.320090i \(0.103713\pi\)
\(762\) −34.1189 34.1189i −0.0447754 0.0447754i
\(763\) −338.988 587.144i −0.444283 0.769520i
\(764\) −806.030 465.362i −1.05501 0.609112i
\(765\) 31.7422 8.50530i 0.0414931 0.0111180i
\(766\) 209.195i 0.273100i
\(767\) 314.093 87.9217i 0.409508 0.114631i
\(768\) −258.840 −0.337032
\(769\) −193.448 721.958i −0.251558 0.938827i −0.969973 0.243213i \(-0.921799\pi\)
0.718415 0.695615i \(-0.244868\pi\)
\(770\) −461.393 + 799.156i −0.599212 + 1.03786i
\(771\) 277.282 160.089i 0.359639 0.207638i
\(772\) 300.003 300.003i 0.388605 0.388605i
\(773\) 1117.06 + 299.317i 1.44510 + 0.387214i 0.894318 0.447433i \(-0.147662\pi\)
0.550785 + 0.834647i \(0.314328\pi\)
\(774\) −28.2277 + 105.347i −0.0364699 + 0.136107i
\(775\) −806.588 806.588i −1.04076 1.04076i
\(776\) 250.358 + 433.633i 0.322626 + 0.558805i
\(777\) −59.4557 34.3268i −0.0765196 0.0441786i
\(778\) −63.5086 + 17.0171i −0.0816305 + 0.0218728i
\(779\) 21.0831i 0.0270643i
\(780\) −127.047 + 496.188i −0.162881 + 0.636139i
\(781\) 67.5583 0.0865023
\(782\) 7.15957 + 26.7199i 0.00915545 + 0.0341686i
\(783\) −54.3919 + 94.2096i −0.0694661 + 0.120319i
\(784\) −165.097 + 95.3189i −0.210583 + 0.121580i
\(785\) −1077.80 + 1077.80i −1.37299 + 1.37299i
\(786\) 69.2882 + 18.5657i 0.0881529 + 0.0236205i
\(787\) 137.658 513.745i 0.174914 0.652789i −0.821652 0.569990i \(-0.806947\pi\)
0.996566 0.0827996i \(-0.0263862\pi\)
\(788\) −442.692 442.692i −0.561792 0.561792i
\(789\) −205.797 356.450i −0.260832 0.451775i
\(790\) −812.709 469.218i −1.02875 0.593947i
\(791\) −1810.44 + 485.107i −2.28880 + 0.613283i
\(792\) 294.541i 0.371895i
\(793\) 266.976 474.545i 0.336666 0.598417i
\(794\) −592.031 −0.745631
\(795\) 46.6175 + 173.979i 0.0586383 + 0.218841i
\(796\) 152.395 263.956i 0.191451 0.331603i
\(797\) −245.822 + 141.925i −0.308434 + 0.178075i −0.646226 0.763146i \(-0.723654\pi\)
0.337791 + 0.941221i \(0.390320\pi\)
\(798\) 251.945 251.945i 0.315720 0.315720i
\(799\) 58.7462 + 15.7410i 0.0735246 + 0.0197009i
\(800\) −248.683 + 928.099i −0.310854 + 1.16012i
\(801\) −182.002 182.002i −0.227219 0.227219i
\(802\) −192.507 333.432i −0.240034 0.415751i
\(803\) 138.861 + 80.1712i 0.172927 + 0.0998396i
\(804\) 78.0125 20.9034i 0.0970305 0.0259992i
\(805\) 1296.24i 1.61023i
\(806\) −5.37892 482.919i −0.00667360 0.599155i
\(807\) −875.030 −1.08430
\(808\) 290.222 + 1083.13i 0.359186 + 1.34050i
\(809\) −454.194 + 786.687i −0.561426 + 0.972419i 0.435946 + 0.899973i \(0.356414\pi\)
−0.997372 + 0.0724461i \(0.976919\pi\)
\(810\) 54.9791 31.7422i 0.0678755 0.0391879i
\(811\) 672.980 672.980i 0.829815 0.829815i −0.157676 0.987491i \(-0.550400\pi\)
0.987491 + 0.157676i \(0.0504001\pi\)
\(812\) −563.362 150.952i −0.693796 0.185902i
\(813\) −156.299 + 583.316i −0.192250 + 0.717486i
\(814\) 43.0088 + 43.0088i 0.0528364 + 0.0528364i
\(815\) 446.036 + 772.557i 0.547284 + 0.947923i
\(816\) −13.0494 7.53405i −0.0159919 0.00923291i
\(817\) −874.122 + 234.220i −1.06992 + 0.286683i
\(818\) 517.483i 0.632619i
\(819\) 251.799 + 246.251i 0.307447 + 0.300673i
\(820\) 20.1400 0.0245610
\(821\) 230.562 + 860.468i 0.280830 + 1.04807i 0.951833 + 0.306618i \(0.0991973\pi\)
−0.671003 + 0.741455i \(0.734136\pi\)
\(822\) −175.900 + 304.667i −0.213990 + 0.370642i
\(823\) 518.656 299.446i 0.630202 0.363847i −0.150629 0.988590i \(-0.548130\pi\)
0.780830 + 0.624743i \(0.214796\pi\)
\(824\) 725.801 725.801i 0.880827 0.880827i
\(825\) −711.875 190.746i −0.862879 0.231208i
\(826\) 56.0979 209.360i 0.0679151 0.253463i
\(827\) 99.8692 + 99.8692i 0.120761 + 0.120761i 0.764904 0.644144i \(-0.222786\pi\)
−0.644144 + 0.764904i \(0.722786\pi\)
\(828\) −90.0755 156.015i −0.108787 0.188424i
\(829\) −994.325 574.074i −1.19943 0.692490i −0.239000 0.971020i \(-0.576819\pi\)
−0.960428 + 0.278530i \(0.910153\pi\)
\(830\) 489.210 131.084i 0.589410 0.157932i
\(831\) 473.321i 0.569580i
\(832\) −88.0028 + 52.1238i −0.105773 + 0.0626489i
\(833\) 48.3587 0.0580537
\(834\) −76.0161 283.696i −0.0911464 0.340163i
\(835\) −501.738 + 869.035i −0.600884 + 1.04076i
\(836\) 921.579 532.074i 1.10237 0.636452i
\(837\) 142.689 142.689i 0.170477 0.170477i
\(838\) −641.264 171.826i −0.765231 0.205043i
\(839\) 348.604 1301.01i 0.415500 1.55067i −0.368333 0.929694i \(-0.620071\pi\)
0.783833 0.620972i \(-0.213262\pi\)
\(840\) 552.744 + 552.744i 0.658029 + 0.658029i
\(841\) 201.353 + 348.754i 0.239421 + 0.414690i
\(842\) 233.233 + 134.657i 0.276999 + 0.159926i
\(843\) −561.000 + 150.320i −0.665480 + 0.178315i
\(844\) 145.855i 0.172814i
\(845\) 349.264 + 1196.22i 0.413330 + 1.41565i
\(846\) 117.492 0.138880
\(847\) 207.673 + 775.048i 0.245187 + 0.915050i
\(848\) 41.2941 71.5235i 0.0486959 0.0843437i
\(849\) 189.338 109.314i 0.223013 0.128756i
\(850\) 29.5151 29.5151i 0.0347237 0.0347237i
\(851\) 82.5278 + 22.1133i 0.0969774 + 0.0259850i
\(852\) 6.44942 24.0696i 0.00756974 0.0282507i
\(853\) 16.0075 + 16.0075i 0.0187661 + 0.0187661i 0.716428 0.697661i \(-0.245776\pi\)
−0.697661 + 0.716428i \(0.745776\pi\)
\(854\) −180.913 313.351i −0.211842 0.366922i
\(855\) 456.191 + 263.382i 0.533557 + 0.308049i
\(856\) −569.917 + 152.709i −0.665791 + 0.178398i
\(857\) 598.263i 0.698090i −0.937106 0.349045i \(-0.886506\pi\)
0.937106 0.349045i \(-0.113494\pi\)
\(858\) −159.014 268.470i −0.185331 0.312902i
\(859\) −221.649 −0.258031 −0.129016 0.991643i \(-0.541182\pi\)
−0.129016 + 0.991643i \(0.541182\pi\)
\(860\) −223.744 835.024i −0.260167 0.970958i
\(861\) 6.92437 11.9934i 0.00804224 0.0139296i
\(862\) 440.384 254.256i 0.510886 0.294960i
\(863\) 91.5674 91.5674i 0.106104 0.106104i −0.652062 0.758166i \(-0.726096\pi\)
0.758166 + 0.652062i \(0.226096\pi\)
\(864\) −164.185 43.9932i −0.190029 0.0509180i
\(865\) 14.1106 52.6615i 0.0163128 0.0608803i
\(866\) −317.255 317.255i −0.366346 0.366346i
\(867\) −248.370 430.190i −0.286471 0.496182i
\(868\) 936.948 + 540.947i 1.07943 + 0.623211i
\(869\) −1861.57 + 498.806i −2.14220 + 0.574000i
\(870\) 255.781i 0.294001i
\(871\) 137.390 140.485i 0.157738 0.161292i
\(872\) 508.817 0.583506
\(873\) 57.3642 + 214.086i 0.0657093 + 0.245230i
\(874\) −221.709 + 384.011i −0.253672 + 0.439372i
\(875\) 252.167 145.588i 0.288190 0.166387i
\(876\) 41.8195 41.8195i 0.0477392 0.0477392i
\(877\) −185.307 49.6528i −0.211296 0.0566166i 0.151618 0.988439i \(-0.451552\pi\)
−0.362914 + 0.931822i \(0.618218\pi\)
\(878\) −69.5475 + 259.555i −0.0792112 + 0.295620i
\(879\) 273.886 + 273.886i 0.311588 + 0.311588i
\(880\) 312.775 + 541.743i 0.355427 + 0.615617i
\(881\) −346.366 199.975i −0.393152 0.226986i 0.290373 0.956913i \(-0.406221\pi\)
−0.683525 + 0.729927i \(0.739554\pi\)
\(882\) 90.2386 24.1793i 0.102311 0.0274142i
\(883\) 517.066i 0.585579i −0.956177 0.292789i \(-0.905417\pi\)
0.956177 0.292789i \(-0.0945835\pi\)
\(884\) −59.5716 + 0.663530i −0.0673887 + 0.000750599i
\(885\) 320.440 0.362079
\(886\) 133.390 + 497.818i 0.150553 + 0.561872i
\(887\) 193.693 335.487i 0.218369 0.378226i −0.735941 0.677046i \(-0.763260\pi\)
0.954309 + 0.298820i \(0.0965930\pi\)
\(888\) 44.6212 25.7621i 0.0502491 0.0290113i
\(889\) 185.960 185.960i 0.209179 0.209179i
\(890\) −584.574 156.636i −0.656825 0.175996i
\(891\) 33.7439 125.934i 0.0378719 0.141340i
\(892\) −159.425 159.425i −0.178728 0.178728i
\(893\) 487.449 + 844.286i 0.545855 + 0.945449i
\(894\) 412.375 + 238.085i 0.461270 + 0.266314i
\(895\) −17.3555 + 4.65040i −0.0193917 + 0.00519598i
\(896\) 1113.68i 1.24294i
\(897\) −382.002 214.912i −0.425866 0.239590i
\(898\) −610.371 −0.679701
\(899\) 210.427 + 785.326i 0.234068 + 0.873555i
\(900\) −135.918 + 235.416i −0.151020 + 0.261574i
\(901\) −18.1432 + 10.4750i −0.0201367 + 0.0116260i
\(902\) −8.67570 + 8.67570i −0.00961829 + 0.00961829i
\(903\) −574.180 153.851i −0.635859 0.170378i
\(904\) 364.070 1358.73i 0.402733 1.50302i
\(905\) −1118.31 1118.31i −1.23571 1.23571i
\(906\) 72.7596 + 126.023i 0.0803086 + 0.139099i
\(907\) 760.934 + 439.325i 0.838957 + 0.484372i 0.856910 0.515467i \(-0.172381\pi\)
−0.0179525 + 0.999839i \(0.505715\pi\)
\(908\) 879.784 235.737i 0.968925 0.259623i
\(909\) 496.350i 0.546040i
\(910\) 802.231 + 205.409i 0.881572 + 0.225724i
\(911\) 1101.78 1.20942 0.604708 0.796447i \(-0.293290\pi\)
0.604708 + 0.796447i \(0.293290\pi\)
\(912\) −62.5141 233.306i −0.0685462 0.255818i
\(913\) 520.060 900.770i 0.569616 0.986605i
\(914\) −278.956 + 161.055i −0.305204 + 0.176210i
\(915\) 378.253 378.253i 0.413391 0.413391i
\(916\) −398.379 106.745i −0.434912 0.116534i
\(917\) −101.190 + 377.646i −0.110349 + 0.411827i
\(918\) 5.22135 + 5.22135i 0.00568775 + 0.00568775i
\(919\) 697.032 + 1207.29i 0.758468 + 1.31371i 0.943632 + 0.330997i \(0.107385\pi\)
−0.185164 + 0.982708i \(0.559282\pi\)
\(920\) −842.487 486.410i −0.915747 0.528707i
\(921\) −159.425 + 42.7179i −0.173100 + 0.0463821i
\(922\) 42.9543i 0.0465882i
\(923\) −16.3427 58.3828i −0.0177061 0.0632533i
\(924\) 699.001 0.756495
\(925\) −33.3673 124.529i −0.0360728 0.134626i
\(926\) 271.849 470.855i 0.293573 0.508483i
\(927\) 393.474 227.173i 0.424460 0.245062i
\(928\) 484.256 484.256i 0.521827 0.521827i
\(929\) 493.671 + 132.279i 0.531401 + 0.142388i 0.514535 0.857469i \(-0.327965\pi\)
0.0168658 + 0.999858i \(0.494631\pi\)
\(930\) 122.802 458.303i 0.132045 0.492799i
\(931\) 548.129 + 548.129i 0.588753 + 0.588753i
\(932\) 300.919 + 521.208i 0.322875 + 0.559236i
\(933\) −280.236 161.794i −0.300360 0.173413i
\(934\) 384.204 102.947i 0.411354 0.110222i
\(935\) 158.682i 0.169714i
\(936\) −254.537 + 71.2508i −0.271942 + 0.0761227i
\(937\) −242.433 −0.258733 −0.129367 0.991597i \(-0.541294\pi\)
−0.129367 + 0.991597i \(0.541294\pi\)
\(938\) −33.7963 126.130i −0.0360302 0.134467i
\(939\) −274.306 + 475.112i −0.292126 + 0.505976i
\(940\) −806.522 + 465.646i −0.858002 + 0.495368i
\(941\) −982.979 + 982.979i −1.04461 + 1.04461i −0.0456539 + 0.998957i \(0.514537\pi\)
−0.998957 + 0.0456539i \(0.985463\pi\)
\(942\) −330.827 88.6448i −0.351196 0.0941028i
\(943\) −4.46067 + 16.6474i −0.00473029 + 0.0176537i
\(944\) −103.896 103.896i −0.110059 0.110059i
\(945\) 173.007 + 299.656i 0.183076 + 0.317096i
\(946\) 456.084 + 263.320i 0.482118 + 0.278351i
\(947\) 1689.99 452.832i 1.78457 0.478175i 0.793168 0.609003i \(-0.208430\pi\)
0.991405 + 0.130829i \(0.0417637\pi\)
\(948\) 710.856i 0.749848i
\(949\) 35.6916 139.395i 0.0376097 0.146886i
\(950\) 669.087 0.704302
\(951\) 182.602 + 681.479i 0.192010 + 0.716592i
\(952\) −45.4611 + 78.7410i −0.0477533 + 0.0827111i
\(953\) 1482.27 855.789i 1.55537 0.897995i 0.557684 0.830053i \(-0.311690\pi\)
0.997689 0.0679418i \(-0.0216432\pi\)
\(954\) −28.6182 + 28.6182i −0.0299981 + 0.0299981i
\(955\) −2148.89 575.792i −2.25014 0.602924i
\(956\) 4.18341 15.6127i 0.00437595 0.0163313i
\(957\) 371.436 + 371.436i 0.388126 + 0.388126i
\(958\) −56.7309 98.2608i −0.0592180 0.102569i
\(959\) −1660.55 958.717i −1.73154 0.999705i
\(960\) −97.0613 + 26.0075i −0.101106 + 0.0270911i
\(961\) 547.158i 0.569363i
\(962\) 26.7635 47.5716i 0.0278207 0.0494507i
\(963\) −261.169 −0.271203
\(964\) 202.250 + 754.805i 0.209802 + 0.782993i
\(965\) 507.060 878.254i 0.525451 0.910108i
\(966\) −252.244 + 145.633i −0.261122 + 0.150759i
\(967\) 633.859 633.859i 0.655490 0.655490i −0.298819 0.954310i \(-0.596593\pi\)
0.954310 + 0.298819i \(0.0965928\pi\)
\(968\) −581.669 155.858i −0.600898 0.161010i
\(969\) −15.8578 + 59.1822i −0.0163651 + 0.0610755i
\(970\) 368.496 + 368.496i 0.379893 + 0.379893i
\(971\) −52.4564 90.8571i −0.0540231 0.0935707i 0.837749 0.546055i \(-0.183871\pi\)
−0.891772 + 0.452485i \(0.850538\pi\)
\(972\) −41.6461 24.0444i −0.0428458 0.0247371i
\(973\) 1546.25 414.315i 1.58915 0.425812i
\(974\) 437.018i 0.448684i
\(975\) 7.36617 + 661.333i 0.00755504 + 0.678291i
\(976\) −245.280 −0.251312
\(977\) 24.9573 + 93.1421i 0.0255449 + 0.0953348i 0.977521 0.210836i \(-0.0676187\pi\)
−0.951977 + 0.306171i \(0.900952\pi\)
\(978\) −100.225 + 173.594i −0.102479 + 0.177499i
\(979\) −1076.36 + 621.437i −1.09945 + 0.634767i
\(980\) −523.611 + 523.611i −0.534297 + 0.534297i
\(981\) 217.550 + 58.2923i 0.221763 + 0.0594213i
\(982\) −83.5432 + 311.787i −0.0850745 + 0.317502i
\(983\) −1145.06 1145.06i −1.16487 1.16487i −0.983396 0.181471i \(-0.941914\pi\)
−0.181471 0.983396i \(-0.558086\pi\)
\(984\) 5.19670 + 9.00095i 0.00528120 + 0.00914731i
\(985\) −1295.98 748.232i −1.31571 0.759626i
\(986\) −28.7371 + 7.70008i −0.0291451 + 0.00780941i
\(987\) 640.376i 0.648811i
\(988\) −682.744 667.702i −0.691036 0.675812i
\(989\) 739.772 0.748000
\(990\) −79.3411 296.105i −0.0801425 0.299096i
\(991\) −507.166 + 878.437i −0.511772 + 0.886415i 0.488135 + 0.872768i \(0.337677\pi\)
−0.999907 + 0.0136468i \(0.995656\pi\)
\(992\) −1100.17 + 635.185i −1.10905 + 0.640308i
\(993\) 301.500 301.500i 0.303626 0.303626i
\(994\) −38.9154 10.4273i −0.0391503 0.0104903i
\(995\) 188.559 703.711i 0.189506 0.707248i
\(996\) −271.278 271.278i −0.272367 0.272367i
\(997\) −121.020 209.612i −0.121384 0.210243i 0.798930 0.601424i \(-0.205400\pi\)
−0.920314 + 0.391181i \(0.872067\pi\)
\(998\) 174.821 + 100.933i 0.175172 + 0.101135i
\(999\) 22.0297 5.90283i 0.0220517 0.00590874i
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 39.3.l.a.19.1 8
3.2 odd 2 117.3.bd.c.19.2 8
13.11 odd 12 inner 39.3.l.a.37.1 yes 8
39.11 even 12 117.3.bd.c.37.2 8
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
39.3.l.a.19.1 8 1.1 even 1 trivial
39.3.l.a.37.1 yes 8 13.11 odd 12 inner
117.3.bd.c.19.2 8 3.2 odd 2
117.3.bd.c.37.2 8 39.11 even 12