Properties

Label 78.3.l.c.7.1
Level $78$
Weight $3$
Character 78.7
Analytic conductor $2.125$
Analytic rank $0$
Dimension $8$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [78,3,Mod(7,78)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(78, 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("78.7");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 78 = 2 \cdot 3 \cdot 13 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 78.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: \(2.12534606201\)
Analytic rank: \(0\)
Dimension: \(8\)
Relative dimension: \(2\) over \(\Q(\zeta_{12})\)
Coefficient field: \(\mathbb{Q}[x]/(x^{8} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} - 2x^{7} + 2x^{6} + 82x^{5} + 5053x^{4} - 6736x^{3} + 6728x^{2} + 275384x + 5635876 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{12}]$

Embedding invariants

Embedding label 7.1
Root \(-5.39181 + 5.39181i\) of defining polynomial
Character \(\chi\) \(=\) 78.7
Dual form 78.3.l.c.67.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(1.36603 - 0.366025i) q^{2} +(0.866025 - 1.50000i) q^{3} +(1.73205 - 1.00000i) q^{4} +(-6.39181 - 6.39181i) q^{5} +(0.633975 - 2.36603i) q^{6} +(9.23137 + 2.47354i) q^{7} +(2.00000 - 2.00000i) q^{8} +(-1.50000 - 2.59808i) q^{9} +O(q^{10})\) \(q+(1.36603 - 0.366025i) q^{2} +(0.866025 - 1.50000i) q^{3} +(1.73205 - 1.00000i) q^{4} +(-6.39181 - 6.39181i) q^{5} +(0.633975 - 2.36603i) q^{6} +(9.23137 + 2.47354i) q^{7} +(2.00000 - 2.00000i) q^{8} +(-1.50000 - 2.59808i) q^{9} +(-11.0709 - 6.39181i) q^{10} +(4.21503 + 15.7307i) q^{11} -3.46410i q^{12} +(-3.81310 + 12.4282i) q^{13} +13.5157 q^{14} +(-15.1232 + 4.05225i) q^{15} +(2.00000 - 3.46410i) q^{16} +(8.31934 - 4.80317i) q^{17} +(-3.00000 - 3.00000i) q^{18} +(2.56168 - 9.56033i) q^{19} +(-17.4627 - 4.67913i) q^{20} +(11.7049 - 11.7049i) q^{21} +(11.5157 + 19.9457i) q^{22} +(-23.6929 - 13.6791i) q^{23} +(-1.26795 - 4.73205i) q^{24} +56.7105i q^{25} +(-0.659759 + 18.3729i) q^{26} -5.19615 q^{27} +(18.4627 - 4.94708i) q^{28} +(-13.8023 + 23.9063i) q^{29} +(-19.1754 + 11.0709i) q^{30} +(11.5613 + 11.5613i) q^{31} +(1.46410 - 5.46410i) q^{32} +(27.2464 + 7.30064i) q^{33} +(9.60634 - 9.60634i) q^{34} +(-43.1948 - 74.8156i) q^{35} +(-5.19615 - 3.00000i) q^{36} +(-5.45615 - 20.3626i) q^{37} -13.9973i q^{38} +(15.3401 + 16.4828i) q^{39} -25.5672 q^{40} +(39.1030 - 10.4776i) q^{41} +(11.7049 - 20.2735i) q^{42} +(-30.9095 + 17.8456i) q^{43} +(23.0313 + 23.0313i) q^{44} +(-7.01869 + 26.1941i) q^{45} +(-37.3721 - 10.0138i) q^{46} +(25.5184 - 25.5184i) q^{47} +(-3.46410 - 6.00000i) q^{48} +(36.6646 + 21.1683i) q^{49} +(20.7575 + 77.4679i) q^{50} -16.6387i q^{51} +(5.82371 + 25.3394i) q^{52} -39.0697 q^{53} +(-7.09808 + 1.90192i) q^{54} +(73.6060 - 127.489i) q^{55} +(23.4098 - 13.5157i) q^{56} +(-12.1220 - 12.1220i) q^{57} +(-10.1040 + 37.7086i) q^{58} +(-46.0300 - 12.3337i) q^{59} +(-22.1419 + 22.1419i) q^{60} +(-35.2717 - 61.0923i) q^{61} +(20.0248 + 11.5613i) q^{62} +(-7.42062 - 27.6941i) q^{63} -8.00000i q^{64} +(103.811 - 55.0661i) q^{65} +39.8915 q^{66} +(38.7250 - 10.3763i) q^{67} +(9.60634 - 16.6387i) q^{68} +(-41.0374 + 23.6929i) q^{69} +(-86.3896 - 86.3896i) q^{70} +(-8.28114 + 30.9056i) q^{71} +(-8.19615 - 2.19615i) q^{72} +(-9.68320 + 9.68320i) q^{73} +(-14.9065 - 25.8188i) q^{74} +(85.0657 + 49.1127i) q^{75} +(-5.12337 - 19.1207i) q^{76} +155.642i q^{77} +(26.9880 + 16.9011i) q^{78} -56.1543 q^{79} +(-34.9255 + 9.35826i) q^{80} +(-4.50000 + 7.79423i) q^{81} +(49.5806 - 28.6254i) q^{82} +(4.59931 + 4.59931i) q^{83} +(8.56859 - 31.9784i) q^{84} +(-83.8766 - 22.4747i) q^{85} +(-35.6912 + 35.6912i) q^{86} +(23.9063 + 41.4069i) q^{87} +(39.8915 + 23.0313i) q^{88} +(29.9479 + 111.767i) q^{89} +38.3509i q^{90} +(-65.9418 + 105.298i) q^{91} -54.7165 q^{92} +(27.3544 - 7.32958i) q^{93} +(25.5184 - 44.1991i) q^{94} +(-77.4816 + 44.7340i) q^{95} +(-6.92820 - 6.92820i) q^{96} +(-9.04249 + 33.7470i) q^{97} +(57.8330 + 15.4963i) q^{98} +(34.5470 - 34.5470i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q + 4 q^{2} - 6 q^{5} + 12 q^{6} + 10 q^{7} + 16 q^{8} - 12 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q + 4 q^{2} - 6 q^{5} + 12 q^{6} + 10 q^{7} + 16 q^{8} - 12 q^{9} - 6 q^{10} + 24 q^{11} + 4 q^{14} - 12 q^{15} + 16 q^{16} - 84 q^{17} - 24 q^{18} + 10 q^{19} - 12 q^{20} + 18 q^{21} - 12 q^{22} - 12 q^{23} - 24 q^{24} + 26 q^{26} + 20 q^{28} + 36 q^{29} - 18 q^{30} - 94 q^{31} - 16 q^{32} + 60 q^{34} - 204 q^{35} + 140 q^{37} + 66 q^{39} - 24 q^{40} + 72 q^{41} + 18 q^{42} - 222 q^{43} - 24 q^{44} - 84 q^{46} + 300 q^{47} + 42 q^{49} - 62 q^{50} + 44 q^{52} + 84 q^{53} - 36 q^{54} + 396 q^{55} + 36 q^{56} + 24 q^{57} - 66 q^{58} - 60 q^{59} - 12 q^{60} - 90 q^{61} + 198 q^{62} - 24 q^{63} - 108 q^{65} + 72 q^{66} + 304 q^{67} + 60 q^{68} - 216 q^{69} - 408 q^{70} - 192 q^{71} - 24 q^{72} + 16 q^{73} - 46 q^{74} + 312 q^{75} - 20 q^{76} + 114 q^{78} - 96 q^{79} - 24 q^{80} - 36 q^{81} + 114 q^{82} - 12 q^{84} - 390 q^{85} + 168 q^{86} + 30 q^{87} + 72 q^{88} + 354 q^{89} - 218 q^{91} - 288 q^{92} - 42 q^{93} + 300 q^{94} - 576 q^{95} - 460 q^{97} + 58 q^{98} - 36 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/78\mathbb{Z}\right)^\times\).

\(n\) \(53\) \(67\)
\(\chi(n)\) \(1\) \(e\left(\frac{11}{12}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 1.36603 0.366025i 0.683013 0.183013i
\(3\) 0.866025 1.50000i 0.288675 0.500000i
\(4\) 1.73205 1.00000i 0.433013 0.250000i
\(5\) −6.39181 6.39181i −1.27836 1.27836i −0.941584 0.336778i \(-0.890663\pi\)
−0.336778 0.941584i \(-0.609337\pi\)
\(6\) 0.633975 2.36603i 0.105662 0.394338i
\(7\) 9.23137 + 2.47354i 1.31877 + 0.353363i 0.848516 0.529170i \(-0.177496\pi\)
0.470252 + 0.882532i \(0.344163\pi\)
\(8\) 2.00000 2.00000i 0.250000 0.250000i
\(9\) −1.50000 2.59808i −0.166667 0.288675i
\(10\) −11.0709 6.39181i −1.10709 0.639181i
\(11\) 4.21503 + 15.7307i 0.383184 + 1.43006i 0.841009 + 0.541021i \(0.181962\pi\)
−0.457825 + 0.889042i \(0.651371\pi\)
\(12\) 3.46410i 0.288675i
\(13\) −3.81310 + 12.4282i −0.293316 + 0.956016i
\(14\) 13.5157 0.965405
\(15\) −15.1232 + 4.05225i −1.00821 + 0.270150i
\(16\) 2.00000 3.46410i 0.125000 0.216506i
\(17\) 8.31934 4.80317i 0.489373 0.282540i −0.234941 0.972010i \(-0.575490\pi\)
0.724314 + 0.689470i \(0.242157\pi\)
\(18\) −3.00000 3.00000i −0.166667 0.166667i
\(19\) 2.56168 9.56033i 0.134825 0.503175i −0.865173 0.501473i \(-0.832792\pi\)
0.999999 0.00170204i \(-0.000541777\pi\)
\(20\) −17.4627 4.67913i −0.873137 0.233956i
\(21\) 11.7049 11.7049i 0.557377 0.557377i
\(22\) 11.5157 + 19.9457i 0.523440 + 0.906624i
\(23\) −23.6929 13.6791i −1.03013 0.594745i −0.113107 0.993583i \(-0.536080\pi\)
−0.917021 + 0.398838i \(0.869414\pi\)
\(24\) −1.26795 4.73205i −0.0528312 0.197169i
\(25\) 56.7105i 2.26842i
\(26\) −0.659759 + 18.3729i −0.0253754 + 0.706651i
\(27\) −5.19615 −0.192450
\(28\) 18.4627 4.94708i 0.659384 0.176681i
\(29\) −13.8023 + 23.9063i −0.475942 + 0.824356i −0.999620 0.0275606i \(-0.991226\pi\)
0.523678 + 0.851916i \(0.324559\pi\)
\(30\) −19.1754 + 11.0709i −0.639181 + 0.369031i
\(31\) 11.5613 + 11.5613i 0.372946 + 0.372946i 0.868549 0.495603i \(-0.165053\pi\)
−0.495603 + 0.868549i \(0.665053\pi\)
\(32\) 1.46410 5.46410i 0.0457532 0.170753i
\(33\) 27.2464 + 7.30064i 0.825648 + 0.221232i
\(34\) 9.60634 9.60634i 0.282540 0.282540i
\(35\) −43.1948 74.8156i −1.23414 2.13759i
\(36\) −5.19615 3.00000i −0.144338 0.0833333i
\(37\) −5.45615 20.3626i −0.147464 0.550342i −0.999633 0.0270763i \(-0.991380\pi\)
0.852170 0.523265i \(-0.175286\pi\)
\(38\) 13.9973i 0.368350i
\(39\) 15.3401 + 16.4828i 0.393335 + 0.422636i
\(40\) −25.5672 −0.639181
\(41\) 39.1030 10.4776i 0.953731 0.255551i 0.251786 0.967783i \(-0.418982\pi\)
0.701945 + 0.712232i \(0.252315\pi\)
\(42\) 11.7049 20.2735i 0.278688 0.482703i
\(43\) −30.9095 + 17.8456i −0.718826 + 0.415014i −0.814320 0.580416i \(-0.802890\pi\)
0.0954945 + 0.995430i \(0.469557\pi\)
\(44\) 23.0313 + 23.0313i 0.523440 + 0.523440i
\(45\) −7.01869 + 26.1941i −0.155971 + 0.582092i
\(46\) −37.3721 10.0138i −0.812436 0.217692i
\(47\) 25.5184 25.5184i 0.542944 0.542944i −0.381447 0.924391i \(-0.624574\pi\)
0.924391 + 0.381447i \(0.124574\pi\)
\(48\) −3.46410 6.00000i −0.0721688 0.125000i
\(49\) 36.6646 + 21.1683i 0.748258 + 0.432007i
\(50\) 20.7575 + 77.4679i 0.415149 + 1.54936i
\(51\) 16.6387i 0.326249i
\(52\) 5.82371 + 25.3394i 0.111994 + 0.487296i
\(53\) −39.0697 −0.737165 −0.368582 0.929595i \(-0.620157\pi\)
−0.368582 + 0.929595i \(0.620157\pi\)
\(54\) −7.09808 + 1.90192i −0.131446 + 0.0352208i
\(55\) 73.6060 127.489i 1.33829 2.31799i
\(56\) 23.4098 13.5157i 0.418033 0.241351i
\(57\) −12.1220 12.1220i −0.212667 0.212667i
\(58\) −10.1040 + 37.7086i −0.174207 + 0.650149i
\(59\) −46.0300 12.3337i −0.780169 0.209046i −0.153310 0.988178i \(-0.548993\pi\)
−0.626859 + 0.779132i \(0.715660\pi\)
\(60\) −22.1419 + 22.1419i −0.369031 + 0.369031i
\(61\) −35.2717 61.0923i −0.578224 1.00151i −0.995683 0.0928174i \(-0.970413\pi\)
0.417459 0.908696i \(-0.362921\pi\)
\(62\) 20.0248 + 11.5613i 0.322981 + 0.186473i
\(63\) −7.42062 27.6941i −0.117788 0.439589i
\(64\) 8.00000i 0.125000i
\(65\) 103.811 55.0661i 1.59710 0.847170i
\(66\) 39.8915 0.604416
\(67\) 38.7250 10.3763i 0.577984 0.154870i 0.0420285 0.999116i \(-0.486618\pi\)
0.535956 + 0.844246i \(0.319951\pi\)
\(68\) 9.60634 16.6387i 0.141270 0.244686i
\(69\) −41.0374 + 23.6929i −0.594745 + 0.343376i
\(70\) −86.3896 86.3896i −1.23414 1.23414i
\(71\) −8.28114 + 30.9056i −0.116636 + 0.435291i −0.999404 0.0345180i \(-0.989010\pi\)
0.882768 + 0.469809i \(0.155677\pi\)
\(72\) −8.19615 2.19615i −0.113835 0.0305021i
\(73\) −9.68320 + 9.68320i −0.132647 + 0.132647i −0.770313 0.637666i \(-0.779900\pi\)
0.637666 + 0.770313i \(0.279900\pi\)
\(74\) −14.9065 25.8188i −0.201439 0.348903i
\(75\) 85.0657 + 49.1127i 1.13421 + 0.654836i
\(76\) −5.12337 19.1207i −0.0674127 0.251588i
\(77\) 155.642i 2.02132i
\(78\) 26.9880 + 16.9011i 0.346000 + 0.216680i
\(79\) −56.1543 −0.710814 −0.355407 0.934712i \(-0.615658\pi\)
−0.355407 + 0.934712i \(0.615658\pi\)
\(80\) −34.9255 + 9.35826i −0.436569 + 0.116978i
\(81\) −4.50000 + 7.79423i −0.0555556 + 0.0962250i
\(82\) 49.5806 28.6254i 0.604641 0.349090i
\(83\) 4.59931 + 4.59931i 0.0554133 + 0.0554133i 0.734270 0.678857i \(-0.237524\pi\)
−0.678857 + 0.734270i \(0.737524\pi\)
\(84\) 8.56859 31.9784i 0.102007 0.380695i
\(85\) −83.8766 22.4747i −0.986783 0.264408i
\(86\) −35.6912 + 35.6912i −0.415014 + 0.415014i
\(87\) 23.9063 + 41.4069i 0.274785 + 0.475942i
\(88\) 39.8915 + 23.0313i 0.453312 + 0.261720i
\(89\) 29.9479 + 111.767i 0.336494 + 1.25581i 0.902241 + 0.431233i \(0.141921\pi\)
−0.565747 + 0.824579i \(0.691412\pi\)
\(90\) 38.3509i 0.426121i
\(91\) −65.9418 + 105.298i −0.724636 + 1.15712i
\(92\) −54.7165 −0.594745
\(93\) 27.3544 7.32958i 0.294133 0.0788127i
\(94\) 25.5184 44.1991i 0.271472 0.470203i
\(95\) −77.4816 + 44.7340i −0.815596 + 0.470885i
\(96\) −6.92820 6.92820i −0.0721688 0.0721688i
\(97\) −9.04249 + 33.7470i −0.0932215 + 0.347908i −0.996744 0.0806336i \(-0.974306\pi\)
0.903522 + 0.428541i \(0.140972\pi\)
\(98\) 57.8330 + 15.4963i 0.590132 + 0.158126i
\(99\) 34.5470 34.5470i 0.348960 0.348960i
\(100\) 56.7105 + 98.2254i 0.567105 + 0.982254i
\(101\) −101.471 58.5846i −1.00467 0.580045i −0.0950419 0.995473i \(-0.530299\pi\)
−0.909626 + 0.415428i \(0.863632\pi\)
\(102\) −6.09018 22.7289i −0.0597076 0.222832i
\(103\) 184.178i 1.78813i −0.447933 0.894067i \(-0.647840\pi\)
0.447933 0.894067i \(-0.352160\pi\)
\(104\) 17.2302 + 32.4826i 0.165675 + 0.312333i
\(105\) −149.631 −1.42506
\(106\) −53.3702 + 14.3005i −0.503493 + 0.134910i
\(107\) −3.57599 + 6.19380i −0.0334205 + 0.0578860i −0.882252 0.470778i \(-0.843973\pi\)
0.848831 + 0.528664i \(0.177307\pi\)
\(108\) −9.00000 + 5.19615i −0.0833333 + 0.0481125i
\(109\) 8.07627 + 8.07627i 0.0740942 + 0.0740942i 0.743183 0.669089i \(-0.233315\pi\)
−0.669089 + 0.743183i \(0.733315\pi\)
\(110\) 53.8833 201.095i 0.489848 1.82814i
\(111\) −35.2691 9.45034i −0.317740 0.0851382i
\(112\) 27.0313 27.0313i 0.241351 0.241351i
\(113\) 58.2038 + 100.812i 0.515077 + 0.892140i 0.999847 + 0.0174984i \(0.00557019\pi\)
−0.484769 + 0.874642i \(0.661096\pi\)
\(114\) −20.9959 12.1220i −0.184175 0.106333i
\(115\) 64.0064 + 238.875i 0.556578 + 2.07718i
\(116\) 55.2093i 0.475942i
\(117\) 38.0091 8.73557i 0.324864 0.0746630i
\(118\) −67.3926 −0.571124
\(119\) 88.6798 23.7617i 0.745208 0.199678i
\(120\) −22.1419 + 38.3509i −0.184516 + 0.319591i
\(121\) −124.899 + 72.1107i −1.03223 + 0.595956i
\(122\) −70.5433 70.5433i −0.578224 0.578224i
\(123\) 18.1477 67.7283i 0.147543 0.550637i
\(124\) 31.5861 + 8.46347i 0.254727 + 0.0682538i
\(125\) 202.687 202.687i 1.62150 1.62150i
\(126\) −20.2735 35.1147i −0.160901 0.278688i
\(127\) −23.3984 13.5091i −0.184240 0.106371i 0.405043 0.914297i \(-0.367256\pi\)
−0.589283 + 0.807927i \(0.700590\pi\)
\(128\) −2.92820 10.9282i −0.0228766 0.0853766i
\(129\) 61.8190i 0.479217i
\(130\) 121.653 113.219i 0.935795 0.870917i
\(131\) −64.5682 −0.492887 −0.246444 0.969157i \(-0.579262\pi\)
−0.246444 + 0.969157i \(0.579262\pi\)
\(132\) 54.4927 14.6013i 0.412824 0.110616i
\(133\) 47.2957 81.9186i 0.355607 0.615929i
\(134\) 49.1013 28.3486i 0.366427 0.211557i
\(135\) 33.2128 + 33.2128i 0.246021 + 0.246021i
\(136\) 7.03233 26.2450i 0.0517083 0.192978i
\(137\) 197.212 + 52.8428i 1.43950 + 0.385714i 0.892360 0.451325i \(-0.149049\pi\)
0.547143 + 0.837039i \(0.315715\pi\)
\(138\) −47.3859 + 47.3859i −0.343376 + 0.343376i
\(139\) −31.8057 55.0890i −0.228818 0.396324i 0.728640 0.684897i \(-0.240153\pi\)
−0.957458 + 0.288573i \(0.906819\pi\)
\(140\) −149.631 86.3896i −1.06879 0.617069i
\(141\) −16.1780 60.3771i −0.114738 0.428207i
\(142\) 45.2490i 0.318655i
\(143\) −211.577 7.59757i −1.47956 0.0531299i
\(144\) −12.0000 −0.0833333
\(145\) 241.026 64.5828i 1.66225 0.445399i
\(146\) −9.68320 + 16.7718i −0.0663233 + 0.114875i
\(147\) 63.5050 36.6646i 0.432007 0.249419i
\(148\) −29.8130 29.8130i −0.201439 0.201439i
\(149\) 7.51093 28.0312i 0.0504089 0.188129i −0.936130 0.351653i \(-0.885620\pi\)
0.986539 + 0.163525i \(0.0522863\pi\)
\(150\) 134.178 + 35.9530i 0.894523 + 0.239687i
\(151\) 31.6350 31.6350i 0.209503 0.209503i −0.594553 0.804056i \(-0.702671\pi\)
0.804056 + 0.594553i \(0.202671\pi\)
\(152\) −13.9973 24.2440i −0.0920875 0.159500i
\(153\) −24.9580 14.4095i −0.163124 0.0941798i
\(154\) 56.9689 + 212.611i 0.369928 + 1.38059i
\(155\) 147.796i 0.953520i
\(156\) 43.0526 + 13.2090i 0.275978 + 0.0846730i
\(157\) 242.423 1.54409 0.772047 0.635566i \(-0.219233\pi\)
0.772047 + 0.635566i \(0.219233\pi\)
\(158\) −76.7082 + 20.5539i −0.485495 + 0.130088i
\(159\) −33.8354 + 58.6046i −0.212801 + 0.368582i
\(160\) −44.2838 + 25.5672i −0.276773 + 0.159795i
\(161\) −184.883 184.883i −1.14834 1.14834i
\(162\) −3.29423 + 12.2942i −0.0203347 + 0.0758903i
\(163\) −15.0812 4.04100i −0.0925228 0.0247914i 0.212261 0.977213i \(-0.431917\pi\)
−0.304783 + 0.952422i \(0.598584\pi\)
\(164\) 57.2507 57.2507i 0.349090 0.349090i
\(165\) −127.489 220.818i −0.772662 1.33829i
\(166\) 7.96623 + 4.59931i 0.0479894 + 0.0277067i
\(167\) 12.8137 + 47.8214i 0.0767287 + 0.286355i 0.993620 0.112782i \(-0.0359762\pi\)
−0.916891 + 0.399138i \(0.869310\pi\)
\(168\) 46.8197i 0.278688i
\(169\) −139.920 94.7801i −0.827932 0.560829i
\(170\) −122.804 −0.722376
\(171\) −28.6810 + 7.68505i −0.167725 + 0.0449418i
\(172\) −35.6912 + 61.8190i −0.207507 + 0.359413i
\(173\) −145.860 + 84.2123i −0.843122 + 0.486776i −0.858324 0.513108i \(-0.828494\pi\)
0.0152025 + 0.999884i \(0.495161\pi\)
\(174\) 47.8126 + 47.8126i 0.274785 + 0.274785i
\(175\) −140.276 + 523.516i −0.801575 + 2.99152i
\(176\) 62.9228 + 16.8601i 0.357516 + 0.0957961i
\(177\) −58.3637 + 58.3637i −0.329738 + 0.329738i
\(178\) 81.8193 + 141.715i 0.459659 + 0.796153i
\(179\) 271.106 + 156.523i 1.51456 + 0.874432i 0.999854 + 0.0170659i \(0.00543251\pi\)
0.514707 + 0.857366i \(0.327901\pi\)
\(180\) 14.0374 + 52.3882i 0.0779855 + 0.291046i
\(181\) 19.4795i 0.107622i −0.998551 0.0538108i \(-0.982863\pi\)
0.998551 0.0538108i \(-0.0171368\pi\)
\(182\) −51.5367 + 167.976i −0.283168 + 0.922942i
\(183\) −122.185 −0.667675
\(184\) −74.7442 + 20.0276i −0.406218 + 0.108846i
\(185\) −95.2795 + 165.029i −0.515024 + 0.892048i
\(186\) 34.6840 20.0248i 0.186473 0.107660i
\(187\) 110.623 + 110.623i 0.591569 + 0.591569i
\(188\) 18.6807 69.7175i 0.0993657 0.370838i
\(189\) −47.9676 12.8529i −0.253797 0.0680047i
\(190\) −89.4681 + 89.4681i −0.470885 + 0.470885i
\(191\) −71.4756 123.799i −0.374218 0.648164i 0.615992 0.787752i \(-0.288755\pi\)
−0.990210 + 0.139588i \(0.955422\pi\)
\(192\) −12.0000 6.92820i −0.0625000 0.0360844i
\(193\) −43.4334 162.096i −0.225044 0.839874i −0.982387 0.186857i \(-0.940170\pi\)
0.757344 0.653017i \(-0.226497\pi\)
\(194\) 49.4091i 0.254686i
\(195\) 7.30415 203.406i 0.0374572 1.04311i
\(196\) 84.6734 0.432007
\(197\) 164.580 44.0992i 0.835434 0.223854i 0.184351 0.982860i \(-0.440982\pi\)
0.651083 + 0.759007i \(0.274315\pi\)
\(198\) 34.5470 59.8372i 0.174480 0.302208i
\(199\) 140.059 80.8629i 0.703813 0.406346i −0.104953 0.994477i \(-0.533469\pi\)
0.808766 + 0.588131i \(0.200136\pi\)
\(200\) 113.421 + 113.421i 0.567105 + 0.567105i
\(201\) 17.9723 67.0736i 0.0894145 0.333699i
\(202\) −160.056 42.8869i −0.792357 0.212311i
\(203\) −186.548 + 186.548i −0.918953 + 0.918953i
\(204\) −16.6387 28.8190i −0.0815621 0.141270i
\(205\) −316.910 182.968i −1.54590 0.892526i
\(206\) −67.4138 251.592i −0.327251 1.22132i
\(207\) 82.0748i 0.396497i
\(208\) 35.4264 + 38.0654i 0.170319 + 0.183007i
\(209\) 161.188 0.771236
\(210\) −204.400 + 54.7688i −0.973333 + 0.260804i
\(211\) 89.9377 155.777i 0.426245 0.738278i −0.570291 0.821443i \(-0.693170\pi\)
0.996536 + 0.0831651i \(0.0265029\pi\)
\(212\) −67.6707 + 39.0697i −0.319202 + 0.184291i
\(213\) 39.1868 + 39.1868i 0.183975 + 0.183975i
\(214\) −2.61781 + 9.76979i −0.0122327 + 0.0456532i
\(215\) 311.634 + 83.5020i 1.44946 + 0.388381i
\(216\) −10.3923 + 10.3923i −0.0481125 + 0.0481125i
\(217\) 78.1295 + 135.324i 0.360044 + 0.623614i
\(218\) 13.9885 + 8.07627i 0.0641675 + 0.0370471i
\(219\) 6.13890 + 22.9107i 0.0280315 + 0.104615i
\(220\) 294.424i 1.33829i
\(221\) 27.9723 + 121.709i 0.126571 + 0.550721i
\(222\) −51.6376 −0.232602
\(223\) 376.519 100.888i 1.68843 0.452413i 0.718445 0.695584i \(-0.244854\pi\)
0.969983 + 0.243171i \(0.0781877\pi\)
\(224\) 27.0313 46.8197i 0.120676 0.209016i
\(225\) 147.338 85.0657i 0.654836 0.378070i
\(226\) 116.408 + 116.408i 0.515077 + 0.515077i
\(227\) 34.5070 128.782i 0.152013 0.567321i −0.847329 0.531068i \(-0.821791\pi\)
0.999343 0.0362535i \(-0.0115424\pi\)
\(228\) −33.1180 8.87393i −0.145254 0.0389207i
\(229\) −304.866 + 304.866i −1.33129 + 1.33129i −0.427077 + 0.904215i \(0.640457\pi\)
−0.904215 + 0.427077i \(0.859543\pi\)
\(230\) 174.869 + 302.882i 0.760299 + 1.31688i
\(231\) 233.463 + 134.790i 1.01066 + 0.583506i
\(232\) 20.2080 + 75.4172i 0.0871034 + 0.325074i
\(233\) 44.1414i 0.189448i 0.995504 + 0.0947240i \(0.0301969\pi\)
−0.995504 + 0.0947240i \(0.969803\pi\)
\(234\) 48.7239 25.8453i 0.208222 0.110450i
\(235\) −326.217 −1.38816
\(236\) −92.0600 + 24.6674i −0.390085 + 0.104523i
\(237\) −48.6311 + 84.2315i −0.205194 + 0.355407i
\(238\) 112.441 64.9181i 0.472443 0.272765i
\(239\) −15.8448 15.8448i −0.0662964 0.0662964i 0.673181 0.739478i \(-0.264927\pi\)
−0.739478 + 0.673181i \(0.764927\pi\)
\(240\) −16.2090 + 60.4927i −0.0675374 + 0.252053i
\(241\) −464.593 124.487i −1.92777 0.516545i −0.980697 0.195535i \(-0.937356\pi\)
−0.947076 0.321010i \(-0.895978\pi\)
\(242\) −144.221 + 144.221i −0.595956 + 0.595956i
\(243\) 7.79423 + 13.5000i 0.0320750 + 0.0555556i
\(244\) −122.185 70.5433i −0.500757 0.289112i
\(245\) −99.0494 369.657i −0.404283 1.50881i
\(246\) 99.1611i 0.403094i
\(247\) 109.050 + 68.2917i 0.441497 + 0.276484i
\(248\) 46.2453 0.186473
\(249\) 10.8821 2.91584i 0.0437031 0.0117102i
\(250\) 202.687 351.065i 0.810749 1.40426i
\(251\) −183.403 + 105.888i −0.730691 + 0.421865i −0.818675 0.574257i \(-0.805291\pi\)
0.0879839 + 0.996122i \(0.471958\pi\)
\(252\) −40.5470 40.5470i −0.160901 0.160901i
\(253\) 115.316 430.365i 0.455794 1.70105i
\(254\) −36.9075 9.88934i −0.145305 0.0389344i
\(255\) −106.351 + 106.351i −0.417064 + 0.417064i
\(256\) −8.00000 13.8564i −0.0312500 0.0541266i
\(257\) 235.923 + 136.210i 0.917990 + 0.530002i 0.882993 0.469386i \(-0.155525\pi\)
0.0349966 + 0.999387i \(0.488858\pi\)
\(258\) 22.6273 + 84.4464i 0.0877029 + 0.327311i
\(259\) 201.471i 0.777881i
\(260\) 124.740 199.189i 0.479771 0.766110i
\(261\) 82.8139 0.317295
\(262\) −88.2018 + 23.6336i −0.336648 + 0.0902046i
\(263\) −118.171 + 204.679i −0.449321 + 0.778247i −0.998342 0.0575615i \(-0.981667\pi\)
0.549021 + 0.835809i \(0.315001\pi\)
\(264\) 69.0940 39.8915i 0.261720 0.151104i
\(265\) 249.726 + 249.726i 0.942363 + 0.942363i
\(266\) 34.6229 129.214i 0.130161 0.485768i
\(267\) 193.587 + 51.8713i 0.725043 + 0.194275i
\(268\) 56.6973 56.6973i 0.211557 0.211557i
\(269\) −233.180 403.880i −0.866842 1.50141i −0.865207 0.501415i \(-0.832813\pi\)
−0.00163514 0.999999i \(-0.500520\pi\)
\(270\) 57.5263 + 33.2128i 0.213060 + 0.123010i
\(271\) −119.372 445.502i −0.440486 1.64392i −0.727586 0.686017i \(-0.759358\pi\)
0.287099 0.957901i \(-0.407309\pi\)
\(272\) 38.4254i 0.141270i
\(273\) 100.839 + 190.103i 0.369374 + 0.696348i
\(274\) 288.738 1.05379
\(275\) −892.095 + 239.036i −3.24398 + 0.869223i
\(276\) −47.3859 + 82.0748i −0.171688 + 0.297372i
\(277\) −21.2638 + 12.2766i −0.0767645 + 0.0443200i −0.537891 0.843014i \(-0.680779\pi\)
0.461126 + 0.887334i \(0.347445\pi\)
\(278\) −63.6113 63.6113i −0.228818 0.228818i
\(279\) 12.6952 47.3792i 0.0455025 0.169818i
\(280\) −236.021 63.2416i −0.842931 0.225863i
\(281\) 276.591 276.591i 0.984311 0.984311i −0.0155674 0.999879i \(-0.504955\pi\)
0.999879 + 0.0155674i \(0.00495547\pi\)
\(282\) −44.1991 76.5551i −0.156734 0.271472i
\(283\) 339.231 + 195.855i 1.19870 + 0.692068i 0.960265 0.279091i \(-0.0900331\pi\)
0.238432 + 0.971159i \(0.423366\pi\)
\(284\) 16.5623 + 61.8113i 0.0583179 + 0.217645i
\(285\) 154.963i 0.543731i
\(286\) −291.800 + 67.0640i −1.02028 + 0.234489i
\(287\) 386.891 1.34805
\(288\) −16.3923 + 4.39230i −0.0569177 + 0.0152511i
\(289\) −98.3591 + 170.363i −0.340343 + 0.589491i
\(290\) 305.609 176.444i 1.05382 0.608426i
\(291\) 42.7895 + 42.7895i 0.147043 + 0.147043i
\(292\) −7.08860 + 26.4550i −0.0242760 + 0.0905993i
\(293\) 286.280 + 76.7084i 0.977064 + 0.261804i 0.711808 0.702374i \(-0.247877\pi\)
0.265256 + 0.964178i \(0.414543\pi\)
\(294\) 73.3293 73.3293i 0.249419 0.249419i
\(295\) 215.380 + 373.050i 0.730103 + 1.26457i
\(296\) −51.6376 29.8130i −0.174451 0.100720i
\(297\) −21.9019 81.7391i −0.0737439 0.275216i
\(298\) 41.0405i 0.137720i
\(299\) 260.351 242.301i 0.870738 0.810371i
\(300\) 196.451 0.654836
\(301\) −329.479 + 88.2837i −1.09462 + 0.293301i
\(302\) 31.6350 54.7934i 0.104752 0.181435i
\(303\) −175.754 + 101.471i −0.580045 + 0.334889i
\(304\) −27.9946 27.9946i −0.0920875 0.0920875i
\(305\) −165.041 + 615.940i −0.541117 + 2.01948i
\(306\) −39.3675 10.5485i −0.128652 0.0344722i
\(307\) 221.215 221.215i 0.720571 0.720571i −0.248150 0.968722i \(-0.579823\pi\)
0.968722 + 0.248150i \(0.0798227\pi\)
\(308\) 155.642 + 269.580i 0.505331 + 0.875259i
\(309\) −276.267 159.503i −0.894067 0.516190i
\(310\) −54.0969 201.892i −0.174506 0.651266i
\(311\) 12.5556i 0.0403716i −0.999796 0.0201858i \(-0.993574\pi\)
0.999796 0.0201858i \(-0.00642578\pi\)
\(312\) 63.6457 + 2.28547i 0.203993 + 0.00732523i
\(313\) 590.956 1.88804 0.944018 0.329893i \(-0.107013\pi\)
0.944018 + 0.329893i \(0.107013\pi\)
\(314\) 331.156 88.7329i 1.05464 0.282589i
\(315\) −129.584 + 224.447i −0.411379 + 0.712529i
\(316\) −97.2622 + 56.1543i −0.307792 + 0.177704i
\(317\) 54.7137 + 54.7137i 0.172598 + 0.172598i 0.788120 0.615522i \(-0.211055\pi\)
−0.615522 + 0.788120i \(0.711055\pi\)
\(318\) −24.7692 + 92.4400i −0.0778906 + 0.290692i
\(319\) −434.240 116.354i −1.36125 0.364747i
\(320\) −51.1345 + 51.1345i −0.159795 + 0.159795i
\(321\) 6.19380 + 10.7280i 0.0192953 + 0.0334205i
\(322\) −320.226 184.883i −0.994491 0.574170i
\(323\) −24.6084 91.8398i −0.0761870 0.284334i
\(324\) 18.0000i 0.0555556i
\(325\) −704.809 216.243i −2.16864 0.665363i
\(326\) −22.0804 −0.0677314
\(327\) 19.1087 5.12015i 0.0584362 0.0156579i
\(328\) 57.2507 99.1611i 0.174545 0.302321i
\(329\) 298.690 172.449i 0.907874 0.524161i
\(330\) −254.979 254.979i −0.772662 0.772662i
\(331\) −5.29073 + 19.7453i −0.0159841 + 0.0596534i −0.973457 0.228869i \(-0.926497\pi\)
0.957473 + 0.288522i \(0.0931640\pi\)
\(332\) 12.5655 + 3.36693i 0.0378480 + 0.0101413i
\(333\) −44.7195 + 44.7195i −0.134293 + 0.134293i
\(334\) 35.0077 + 60.6351i 0.104813 + 0.181542i
\(335\) −313.846 181.199i −0.936854 0.540893i
\(336\) −17.1372 63.9568i −0.0510035 0.190348i
\(337\) 202.326i 0.600375i 0.953880 + 0.300188i \(0.0970493\pi\)
−0.953880 + 0.300188i \(0.902951\pi\)
\(338\) −225.827 78.2575i −0.668127 0.231531i
\(339\) 201.624 0.594760
\(340\) −167.753 + 44.9493i −0.493392 + 0.132204i
\(341\) −133.136 + 230.599i −0.390429 + 0.676243i
\(342\) −36.3660 + 20.9959i −0.106333 + 0.0613917i
\(343\) −45.0296 45.0296i −0.131282 0.131282i
\(344\) −26.1278 + 97.5103i −0.0759529 + 0.283460i
\(345\) 413.744 + 110.862i 1.19926 + 0.321340i
\(346\) −168.425 + 168.425i −0.486776 + 0.486776i
\(347\) −278.263 481.966i −0.801911 1.38895i −0.918357 0.395753i \(-0.870483\pi\)
0.116446 0.993197i \(-0.462850\pi\)
\(348\) 82.8139 + 47.8126i 0.237971 + 0.137393i
\(349\) 119.978 + 447.764i 0.343777 + 1.28299i 0.894035 + 0.447998i \(0.147863\pi\)
−0.550258 + 0.834995i \(0.685471\pi\)
\(350\) 766.480i 2.18994i
\(351\) 19.8135 64.5788i 0.0564486 0.183985i
\(352\) 92.1254 0.261720
\(353\) −272.941 + 73.1344i −0.773205 + 0.207180i −0.623787 0.781595i \(-0.714407\pi\)
−0.149418 + 0.988774i \(0.547740\pi\)
\(354\) −58.3637 + 101.089i −0.164869 + 0.285562i
\(355\) 250.474 144.611i 0.705562 0.407356i
\(356\) 163.639 + 163.639i 0.459659 + 0.459659i
\(357\) 41.1564 153.598i 0.115284 0.430246i
\(358\) 427.630 + 114.583i 1.19450 + 0.320064i
\(359\) −280.398 + 280.398i −0.781054 + 0.781054i −0.980009 0.198955i \(-0.936245\pi\)
0.198955 + 0.980009i \(0.436245\pi\)
\(360\) 38.3509 + 66.4256i 0.106530 + 0.184516i
\(361\) 227.797 + 131.519i 0.631018 + 0.364318i
\(362\) −7.12999 26.6095i −0.0196961 0.0735069i
\(363\) 249.799i 0.688151i
\(364\) −8.91709 + 248.323i −0.0244975 + 0.682205i
\(365\) 123.786 0.339141
\(366\) −166.907 + 44.7227i −0.456031 + 0.122193i
\(367\) −295.943 + 512.588i −0.806384 + 1.39670i 0.108968 + 0.994045i \(0.465245\pi\)
−0.915353 + 0.402653i \(0.868088\pi\)
\(368\) −94.7718 + 54.7165i −0.257532 + 0.148686i
\(369\) −85.8761 85.8761i −0.232726 0.232726i
\(370\) −69.7494 + 260.308i −0.188512 + 0.703536i
\(371\) −360.667 96.6405i −0.972149 0.260487i
\(372\) 40.0496 40.0496i 0.107660 0.107660i
\(373\) 255.943 + 443.306i 0.686174 + 1.18849i 0.973066 + 0.230525i \(0.0740445\pi\)
−0.286892 + 0.957963i \(0.592622\pi\)
\(374\) 191.606 + 110.623i 0.512314 + 0.295785i
\(375\) −128.499 479.563i −0.342663 1.27884i
\(376\) 102.073i 0.271472i
\(377\) −244.483 262.695i −0.648496 0.696804i
\(378\) −70.2295 −0.185792
\(379\) 197.686 52.9699i 0.521600 0.139762i 0.0115932 0.999933i \(-0.496310\pi\)
0.510006 + 0.860171i \(0.329643\pi\)
\(380\) −89.4681 + 154.963i −0.235442 + 0.407798i
\(381\) −40.5273 + 23.3984i −0.106371 + 0.0614132i
\(382\) −142.951 142.951i −0.374218 0.374218i
\(383\) 84.9951 317.206i 0.221919 0.828214i −0.761696 0.647934i \(-0.775633\pi\)
0.983615 0.180280i \(-0.0577002\pi\)
\(384\) −18.9282 5.07180i −0.0492922 0.0132078i
\(385\) 994.834 994.834i 2.58398 2.58398i
\(386\) −118.662 205.529i −0.307415 0.532459i
\(387\) 92.7285 + 53.5369i 0.239609 + 0.138338i
\(388\) 18.0850 + 67.4941i 0.0466108 + 0.173954i
\(389\) 393.984i 1.01281i −0.862295 0.506406i \(-0.830974\pi\)
0.862295 0.506406i \(-0.169026\pi\)
\(390\) −64.4740 280.531i −0.165318 0.719310i
\(391\) −262.813 −0.672156
\(392\) 115.666 30.9926i 0.295066 0.0790628i
\(393\) −55.9177 + 96.8523i −0.142284 + 0.246444i
\(394\) 208.680 120.481i 0.529644 0.305790i
\(395\) 358.928 + 358.928i 0.908678 + 0.908678i
\(396\) 25.2902 94.3842i 0.0638641 0.238344i
\(397\) −115.976 31.0756i −0.292130 0.0782760i 0.109778 0.993956i \(-0.464986\pi\)
−0.401908 + 0.915680i \(0.631653\pi\)
\(398\) 161.726 161.726i 0.406346 0.406346i
\(399\) −81.9186 141.887i −0.205310 0.355607i
\(400\) 196.451 + 113.421i 0.491127 + 0.283552i
\(401\) 85.9977 + 320.948i 0.214458 + 0.800368i 0.986357 + 0.164623i \(0.0526407\pi\)
−0.771899 + 0.635746i \(0.780693\pi\)
\(402\) 98.2025i 0.244285i
\(403\) −187.771 + 99.6019i −0.465933 + 0.247151i
\(404\) −234.338 −0.580045
\(405\) 78.5824 21.0561i 0.194031 0.0519903i
\(406\) −186.548 + 323.110i −0.459477 + 0.795837i
\(407\) 297.321 171.658i 0.730518 0.421765i
\(408\) −33.2773 33.2773i −0.0815621 0.0815621i
\(409\) −113.840 + 424.856i −0.278337 + 1.03877i 0.675235 + 0.737603i \(0.264042\pi\)
−0.953572 + 0.301165i \(0.902625\pi\)
\(410\) −499.877 133.942i −1.21921 0.326687i
\(411\) 250.055 250.055i 0.608406 0.608406i
\(412\) −184.178 319.005i −0.447034 0.774285i
\(413\) −394.412 227.714i −0.954993 0.551366i
\(414\) 30.0415 + 112.116i 0.0725639 + 0.270812i
\(415\) 58.7958i 0.141677i
\(416\) 62.3262 + 39.0313i 0.149823 + 0.0938253i
\(417\) −110.178 −0.264216
\(418\) 220.187 58.9990i 0.526764 0.141146i
\(419\) 62.4764 108.212i 0.149108 0.258263i −0.781790 0.623542i \(-0.785693\pi\)
0.930898 + 0.365279i \(0.119026\pi\)
\(420\) −259.169 + 149.631i −0.617069 + 0.356265i
\(421\) 9.46318 + 9.46318i 0.0224779 + 0.0224779i 0.718256 0.695779i \(-0.244940\pi\)
−0.695779 + 0.718256i \(0.744940\pi\)
\(422\) 65.8389 245.714i 0.156016 0.582261i
\(423\) −104.576 28.0211i −0.247225 0.0662438i
\(424\) −78.1394 + 78.1394i −0.184291 + 0.184291i
\(425\) 272.390 + 471.794i 0.640918 + 1.11010i
\(426\) 67.8735 + 39.1868i 0.159327 + 0.0919877i
\(427\) −174.492 651.212i −0.408646 1.52509i
\(428\) 14.3040i 0.0334205i
\(429\) −194.627 + 310.785i −0.453676 + 0.724441i
\(430\) 456.263 1.06108
\(431\) 698.341 187.120i 1.62028 0.434153i 0.669197 0.743085i \(-0.266638\pi\)
0.951084 + 0.308932i \(0.0999715\pi\)
\(432\) −10.3923 + 18.0000i −0.0240563 + 0.0416667i
\(433\) 35.4730 20.4803i 0.0819237 0.0472987i −0.458479 0.888705i \(-0.651605\pi\)
0.540402 + 0.841407i \(0.318272\pi\)
\(434\) 156.259 + 156.259i 0.360044 + 0.360044i
\(435\) 111.861 417.470i 0.257151 0.959701i
\(436\) 22.0648 + 5.91224i 0.0506073 + 0.0135602i
\(437\) −191.471 + 191.471i −0.438148 + 0.438148i
\(438\) 16.7718 + 29.0496i 0.0382918 + 0.0663233i
\(439\) −576.214 332.678i −1.31256 0.757808i −0.330042 0.943966i \(-0.607063\pi\)
−0.982520 + 0.186159i \(0.940396\pi\)
\(440\) −107.767 402.191i −0.244924 0.914069i
\(441\) 127.010i 0.288005i
\(442\) 82.7596 + 156.020i 0.187239 + 0.352985i
\(443\) 267.578 0.604013 0.302006 0.953306i \(-0.402344\pi\)
0.302006 + 0.953306i \(0.402344\pi\)
\(444\) −70.5383 + 18.9007i −0.158870 + 0.0425691i
\(445\) 522.973 905.816i 1.17522 2.03554i
\(446\) 477.408 275.631i 1.07042 0.618008i
\(447\) −35.5421 35.5421i −0.0795125 0.0795125i
\(448\) 19.7883 73.8510i 0.0441703 0.164846i
\(449\) −543.945 145.750i −1.21146 0.324610i −0.404125 0.914704i \(-0.632424\pi\)
−0.807335 + 0.590094i \(0.799091\pi\)
\(450\) 170.131 170.131i 0.378070 0.378070i
\(451\) 329.640 + 570.953i 0.730909 + 1.26597i
\(452\) 201.624 + 116.408i 0.446070 + 0.257539i
\(453\) −20.0558 74.8492i −0.0442732 0.165230i
\(454\) 188.550i 0.415308i
\(455\) 1094.53 251.554i 2.40556 0.552866i
\(456\) −48.4881 −0.106333
\(457\) −643.576 + 172.446i −1.40826 + 0.377343i −0.881305 0.472548i \(-0.843334\pi\)
−0.526958 + 0.849891i \(0.676668\pi\)
\(458\) −304.866 + 528.043i −0.665646 + 1.15293i
\(459\) −43.2285 + 24.9580i −0.0941798 + 0.0543748i
\(460\) 349.738 + 349.738i 0.760299 + 0.760299i
\(461\) −92.7172 + 346.025i −0.201122 + 0.750597i 0.789475 + 0.613783i \(0.210353\pi\)
−0.990597 + 0.136814i \(0.956314\pi\)
\(462\) 368.253 + 98.6731i 0.797084 + 0.213578i
\(463\) −630.292 + 630.292i −1.36132 + 1.36132i −0.489084 + 0.872236i \(0.662669\pi\)
−0.872236 + 0.489084i \(0.837331\pi\)
\(464\) 55.2093 + 95.6252i 0.118985 + 0.206089i
\(465\) −221.693 127.995i −0.476760 0.275257i
\(466\) 16.1569 + 60.2983i 0.0346714 + 0.129395i
\(467\) 425.264i 0.910630i −0.890331 0.455315i \(-0.849527\pi\)
0.890331 0.455315i \(-0.150473\pi\)
\(468\) 57.0981 53.1395i 0.122004 0.113546i
\(469\) 383.151 0.816953
\(470\) −445.621 + 119.404i −0.948130 + 0.254051i
\(471\) 209.944 363.634i 0.445741 0.772047i
\(472\) −116.727 + 67.3926i −0.247304 + 0.142781i
\(473\) −411.009 411.009i −0.868940 0.868940i
\(474\) −35.6004 + 132.863i −0.0751064 + 0.280301i
\(475\) 542.171 + 145.274i 1.14141 + 0.305841i
\(476\) 129.836 129.836i 0.272765 0.272765i
\(477\) 58.6046 + 101.506i 0.122861 + 0.212801i
\(478\) −27.4441 15.8448i −0.0574144 0.0331482i
\(479\) −71.3059 266.117i −0.148864 0.555568i −0.999553 0.0298988i \(-0.990481\pi\)
0.850689 0.525670i \(-0.176185\pi\)
\(480\) 88.5675i 0.184516i
\(481\) 273.876 + 9.83470i 0.569389 + 0.0204464i
\(482\) −680.212 −1.41123
\(483\) −437.437 + 117.211i −0.905667 + 0.242673i
\(484\) −144.221 + 249.799i −0.297978 + 0.516113i
\(485\) 273.502 157.907i 0.563923 0.325581i
\(486\) 15.5885 + 15.5885i 0.0320750 + 0.0320750i
\(487\) −165.703 + 618.410i −0.340252 + 1.26984i 0.557811 + 0.829968i \(0.311641\pi\)
−0.898062 + 0.439868i \(0.855025\pi\)
\(488\) −192.728 51.6413i −0.394934 0.105822i
\(489\) −19.1222 + 19.1222i −0.0391048 + 0.0391048i
\(490\) −270.608 468.707i −0.552261 0.956545i
\(491\) 490.748 + 283.333i 0.999486 + 0.577053i 0.908096 0.418762i \(-0.137536\pi\)
0.0913898 + 0.995815i \(0.470869\pi\)
\(492\) −36.2955 135.457i −0.0737713 0.275318i
\(493\) 265.180i 0.537890i
\(494\) 173.961 + 53.3732i 0.352148 + 0.108043i
\(495\) −441.636 −0.892194
\(496\) 63.1722 16.9269i 0.127363 0.0341269i
\(497\) −152.893 + 264.818i −0.307631 + 0.532833i
\(498\) 13.7979 7.96623i 0.0277067 0.0159965i
\(499\) −409.292 409.292i −0.820224 0.820224i 0.165916 0.986140i \(-0.446942\pi\)
−0.986140 + 0.165916i \(0.946942\pi\)
\(500\) 148.377 553.752i 0.296755 1.10750i
\(501\) 82.8290 + 22.1940i 0.165327 + 0.0442993i
\(502\) −211.776 + 211.776i −0.421865 + 0.421865i
\(503\) −111.621 193.333i −0.221910 0.384360i 0.733478 0.679714i \(-0.237896\pi\)
−0.955388 + 0.295354i \(0.904563\pi\)
\(504\) −70.2295 40.5470i −0.139344 0.0804504i
\(505\) 274.125 + 1023.05i 0.542822 + 2.02584i
\(506\) 630.097i 1.24525i
\(507\) −263.345 + 127.799i −0.519418 + 0.252069i
\(508\) −54.0363 −0.106371
\(509\) −414.332 + 111.020i −0.814012 + 0.218114i −0.641727 0.766933i \(-0.721782\pi\)
−0.172285 + 0.985047i \(0.555115\pi\)
\(510\) −106.351 + 184.206i −0.208532 + 0.361188i
\(511\) −113.341 + 65.4375i −0.221802 + 0.128058i
\(512\) −16.0000 16.0000i −0.0312500 0.0312500i
\(513\) −13.3109 + 49.6769i −0.0259472 + 0.0968361i
\(514\) 372.134 + 99.7130i 0.723996 + 0.193994i
\(515\) −1177.23 + 1177.23i −2.28588 + 2.28588i
\(516\) 61.8190 + 107.074i 0.119804 + 0.207507i
\(517\) 508.983 + 293.861i 0.984492 + 0.568397i
\(518\) −73.7436 275.215i −0.142362 0.531303i
\(519\) 291.720i 0.562081i
\(520\) 97.4906 317.755i 0.187482 0.611067i
\(521\) −470.908 −0.903854 −0.451927 0.892055i \(-0.649263\pi\)
−0.451927 + 0.892055i \(0.649263\pi\)
\(522\) 113.126 30.3120i 0.216716 0.0580689i
\(523\) 455.785 789.442i 0.871481 1.50945i 0.0110172 0.999939i \(-0.496493\pi\)
0.860464 0.509511i \(-0.170174\pi\)
\(524\) −111.835 + 64.5682i −0.213426 + 0.123222i
\(525\) 663.791 + 663.791i 1.26436 + 1.26436i
\(526\) −86.5075 + 322.851i −0.164463 + 0.613784i
\(527\) 151.714 + 40.6515i 0.287881 + 0.0771376i
\(528\) 79.7829 79.7829i 0.151104 0.151104i
\(529\) 109.737 + 190.070i 0.207443 + 0.359301i
\(530\) 432.539 + 249.726i 0.816110 + 0.471182i
\(531\) 37.0011 + 138.090i 0.0696819 + 0.260056i
\(532\) 189.183i 0.355607i
\(533\) −18.8858 + 525.932i −0.0354331 + 0.986739i
\(534\) 283.430 0.530768
\(535\) 62.4466 16.7325i 0.116723 0.0312758i
\(536\) 56.6973 98.2025i 0.105778 0.183214i
\(537\) 469.570 271.106i 0.874432 0.504854i
\(538\) −466.361 466.361i −0.866842 0.866842i
\(539\) −178.450 + 665.986i −0.331077 + 1.23559i
\(540\) 90.7391 + 24.3135i 0.168035 + 0.0450249i
\(541\) −393.572 + 393.572i −0.727490 + 0.727490i −0.970119 0.242629i \(-0.921990\pi\)
0.242629 + 0.970119i \(0.421990\pi\)
\(542\) −326.130 564.873i −0.601716 1.04220i
\(543\) −29.2193 16.8697i −0.0538108 0.0310677i
\(544\) −14.0647 52.4900i −0.0258542 0.0964890i
\(545\) 103.244i 0.189438i
\(546\) 207.331 + 222.776i 0.379727 + 0.408015i
\(547\) −388.679 −0.710565 −0.355283 0.934759i \(-0.615615\pi\)
−0.355283 + 0.934759i \(0.615615\pi\)
\(548\) 394.424 105.686i 0.719751 0.192857i
\(549\) −105.815 + 183.277i −0.192741 + 0.333838i
\(550\) −1131.13 + 653.059i −2.05660 + 1.18738i
\(551\) 193.195 + 193.195i 0.350626 + 0.350626i
\(552\) −34.6889 + 129.461i −0.0628422 + 0.234530i
\(553\) −518.382 138.900i −0.937399 0.251175i
\(554\) −24.5533 + 24.5533i −0.0443200 + 0.0443200i
\(555\) 165.029 + 285.838i 0.297349 + 0.515024i
\(556\) −110.178 63.6113i −0.198162 0.114409i
\(557\) 183.042 + 683.123i 0.328622 + 1.22643i 0.910621 + 0.413244i \(0.135604\pi\)
−0.581999 + 0.813190i \(0.697729\pi\)
\(558\) 69.3679i 0.124315i
\(559\) −103.928 452.197i −0.185917 0.808939i
\(560\) −345.558 −0.617069
\(561\) 261.738 70.1325i 0.466556 0.125013i
\(562\) 276.591 479.071i 0.492156 0.852439i
\(563\) −514.657 + 297.138i −0.914134 + 0.527776i −0.881759 0.471700i \(-0.843640\pi\)
−0.0323751 + 0.999476i \(0.510307\pi\)
\(564\) −88.3982 88.3982i −0.156734 0.156734i
\(565\) 272.343 1016.40i 0.482023 1.79893i
\(566\) 535.087 + 143.376i 0.945383 + 0.253314i
\(567\) −60.8205 + 60.8205i −0.107267 + 0.107267i
\(568\) 45.2490 + 78.3735i 0.0796637 + 0.137982i
\(569\) 101.268 + 58.4673i 0.177976 + 0.102754i 0.586341 0.810064i \(-0.300568\pi\)
−0.408365 + 0.912819i \(0.633901\pi\)
\(570\) 56.7205 + 211.684i 0.0995096 + 0.371375i
\(571\) 137.505i 0.240815i −0.992725 0.120408i \(-0.961580\pi\)
0.992725 0.120408i \(-0.0384201\pi\)
\(572\) −374.059 + 198.417i −0.653949 + 0.346883i
\(573\) −247.599 −0.432109
\(574\) 528.503 141.612i 0.920736 0.246711i
\(575\) 775.750 1343.64i 1.34913 2.33676i
\(576\) −20.7846 + 12.0000i −0.0360844 + 0.0208333i
\(577\) −617.016 617.016i −1.06935 1.06935i −0.997409 0.0719422i \(-0.977080\pi\)
−0.0719422 0.997409i \(-0.522920\pi\)
\(578\) −72.0038 + 268.722i −0.124574 + 0.464917i
\(579\) −280.758 75.2289i −0.484901 0.129929i
\(580\) 352.887 352.887i 0.608426 0.608426i
\(581\) 31.0814 + 53.8345i 0.0534963 + 0.0926583i
\(582\) 74.1136 + 42.7895i 0.127343 + 0.0735215i
\(583\) −164.680 614.594i −0.282470 1.05419i
\(584\) 38.7328i 0.0663233i
\(585\) −298.783 187.111i −0.510740 0.319847i
\(586\) 419.143 0.715261
\(587\) 373.261 100.015i 0.635878 0.170383i 0.0735425 0.997292i \(-0.476570\pi\)
0.562336 + 0.826909i \(0.309903\pi\)
\(588\) 73.3293 127.010i 0.124710 0.216003i
\(589\) 140.146 80.9136i 0.237940 0.137375i
\(590\) 430.761 + 430.761i 0.730103 + 0.730103i
\(591\) 76.3821 285.062i 0.129242 0.482338i
\(592\) −81.4506 21.8246i −0.137585 0.0368659i
\(593\) 536.353 536.353i 0.904473 0.904473i −0.0913459 0.995819i \(-0.529117\pi\)
0.995819 + 0.0913459i \(0.0291169\pi\)
\(594\) −59.8372 103.641i −0.100736 0.174480i
\(595\) −718.704 414.944i −1.20791 0.697385i
\(596\) −15.0219 56.0623i −0.0252045 0.0940643i
\(597\) 280.117i 0.469208i
\(598\) 266.957 426.284i 0.446417 0.712850i
\(599\) 344.623 0.575331 0.287666 0.957731i \(-0.407121\pi\)
0.287666 + 0.957731i \(0.407121\pi\)
\(600\) 268.357 71.9060i 0.447261 0.119843i
\(601\) −445.870 + 772.269i −0.741879 + 1.28497i 0.209759 + 0.977753i \(0.432732\pi\)
−0.951639 + 0.307220i \(0.900601\pi\)
\(602\) −417.763 + 241.195i −0.693958 + 0.400657i
\(603\) −85.0459 85.0459i −0.141038 0.141038i
\(604\) 23.1584 86.4284i 0.0383417 0.143093i
\(605\) 1259.25 + 337.415i 2.08141 + 0.557711i
\(606\) −202.943 + 202.943i −0.334889 + 0.334889i
\(607\) −232.733 403.106i −0.383416 0.664096i 0.608132 0.793836i \(-0.291919\pi\)
−0.991548 + 0.129740i \(0.958586\pi\)
\(608\) −48.4881 27.9946i −0.0797501 0.0460437i
\(609\) 118.266 + 441.376i 0.194198 + 0.724756i
\(610\) 901.799i 1.47836i
\(611\) 219.843 + 414.452i 0.359809 + 0.678317i
\(612\) −57.6381 −0.0941798
\(613\) 851.290 228.103i 1.38873 0.372109i 0.514444 0.857524i \(-0.327998\pi\)
0.874284 + 0.485415i \(0.161332\pi\)
\(614\) 221.215 383.156i 0.360286 0.624033i
\(615\) −548.903 + 316.910i −0.892526 + 0.515300i
\(616\) 311.284 + 311.284i 0.505331 + 0.505331i
\(617\) 293.787 1096.43i 0.476154 1.77703i −0.140805 0.990037i \(-0.544969\pi\)
0.616960 0.786995i \(-0.288364\pi\)
\(618\) −435.769 116.764i −0.705129 0.188939i
\(619\) 69.6384 69.6384i 0.112501 0.112501i −0.648615 0.761117i \(-0.724651\pi\)
0.761117 + 0.648615i \(0.224651\pi\)
\(620\) −147.796 255.989i −0.238380 0.412886i
\(621\) 123.112 + 71.0788i 0.198248 + 0.114459i
\(622\) −4.59566 17.1512i −0.00738852 0.0275743i
\(623\) 1105.84i 1.77503i
\(624\) 87.7782 20.1739i 0.140670 0.0323300i
\(625\) −1173.32 −1.87731
\(626\) 807.260 216.305i 1.28955 0.345535i
\(627\) 139.593 241.782i 0.222637 0.385618i
\(628\) 419.888 242.423i 0.668612 0.386023i
\(629\) −143.197 143.197i −0.227658 0.227658i
\(630\) −94.8624 + 354.031i −0.150575 + 0.561954i
\(631\) 616.962 + 165.314i 0.977752 + 0.261988i 0.712098 0.702080i \(-0.247745\pi\)
0.265655 + 0.964068i \(0.414412\pi\)
\(632\) −112.309 + 112.309i −0.177704 + 0.177704i
\(633\) −155.777 269.813i −0.246093 0.426245i
\(634\) 94.7669 + 54.7137i 0.149475 + 0.0862992i
\(635\) 63.2108 + 235.906i 0.0995445 + 0.371505i
\(636\) 135.341i 0.212801i
\(637\) −402.891 + 374.959i −0.632481 + 0.588632i
\(638\) −635.772 −0.996507
\(639\) 92.7169 24.8434i 0.145097 0.0388786i
\(640\) −51.1345 + 88.5675i −0.0798976 + 0.138387i
\(641\) −792.951 + 457.811i −1.23705 + 0.714213i −0.968491 0.249049i \(-0.919882\pi\)
−0.268563 + 0.963262i \(0.586549\pi\)
\(642\) 12.3876 + 12.3876i 0.0192953 + 0.0192953i
\(643\) 109.397 408.276i 0.170136 0.634955i −0.827194 0.561917i \(-0.810064\pi\)
0.997329 0.0730378i \(-0.0232694\pi\)
\(644\) −505.109 135.343i −0.784330 0.210161i
\(645\) 395.135 395.135i 0.612613 0.612613i
\(646\) −67.2314 116.448i −0.104073 0.180260i
\(647\) 557.382 + 321.805i 0.861487 + 0.497380i 0.864510 0.502616i \(-0.167629\pi\)
−0.00302290 + 0.999995i \(0.500962\pi\)
\(648\) 6.58846 + 24.5885i 0.0101674 + 0.0379452i
\(649\) 776.071i 1.19579i
\(650\) −1041.94 37.4153i −1.60298 0.0575619i
\(651\) 270.649 0.415743
\(652\) −30.1624 + 8.08200i −0.0462614 + 0.0123957i
\(653\) 149.123 258.289i 0.228366 0.395542i −0.728958 0.684559i \(-0.759995\pi\)
0.957324 + 0.289016i \(0.0933282\pi\)
\(654\) 24.2288 13.9885i 0.0370471 0.0213892i
\(655\) 412.708 + 412.708i 0.630088 + 0.630088i
\(656\) 41.9104 156.412i 0.0638878 0.238433i
\(657\) 39.6825 + 10.6329i 0.0603995 + 0.0161840i
\(658\) 344.898 344.898i 0.524161 0.524161i
\(659\) 322.944 + 559.356i 0.490052 + 0.848794i 0.999934 0.0114495i \(-0.00364456\pi\)
−0.509883 + 0.860244i \(0.670311\pi\)
\(660\) −441.636 254.979i −0.669145 0.386331i
\(661\) 251.425 + 938.332i 0.380371 + 1.41956i 0.845336 + 0.534235i \(0.179400\pi\)
−0.464965 + 0.885329i \(0.653933\pi\)
\(662\) 28.9091i 0.0436693i
\(663\) 206.789 + 63.4450i 0.311899 + 0.0956938i
\(664\) 18.3972 0.0277067
\(665\) −825.913 + 221.303i −1.24197 + 0.332786i
\(666\) −44.7195 + 77.4564i −0.0671464 + 0.116301i
\(667\) 654.035 377.607i 0.980562 0.566128i
\(668\) 70.0153 + 70.0153i 0.104813 + 0.104813i
\(669\) 174.743 652.151i 0.261201 0.974814i
\(670\) −495.045 132.647i −0.738873 0.197981i
\(671\) 812.354 812.354i 1.21066 1.21066i
\(672\) −46.8197 81.0940i −0.0696721 0.120676i
\(673\) −712.407 411.308i −1.05855 0.611156i −0.133522 0.991046i \(-0.542629\pi\)
−0.925032 + 0.379890i \(0.875962\pi\)
\(674\) 74.0566 + 276.383i 0.109876 + 0.410064i
\(675\) 294.676i 0.436557i
\(676\) −337.129 24.2434i −0.498712 0.0358631i
\(677\) 195.713 0.289089 0.144544 0.989498i \(-0.453828\pi\)
0.144544 + 0.989498i \(0.453828\pi\)
\(678\) 275.423 73.7994i 0.406229 0.108849i
\(679\) −166.949 + 289.165i −0.245875 + 0.425868i
\(680\) −212.702 + 122.804i −0.312798 + 0.180594i
\(681\) −163.289 163.289i −0.239778 0.239778i
\(682\) −97.4626 + 363.735i −0.142907 + 0.533336i
\(683\) −628.395 168.378i −0.920052 0.246527i −0.232444 0.972610i \(-0.574672\pi\)
−0.687607 + 0.726083i \(0.741339\pi\)
\(684\) −41.9919 + 41.9919i −0.0613917 + 0.0613917i
\(685\) −922.780 1598.30i −1.34712 2.33329i
\(686\) −77.9936 45.0296i −0.113693 0.0656408i
\(687\) 193.277 + 721.320i 0.281335 + 1.04996i
\(688\) 142.765i 0.207507i
\(689\) 148.977 485.566i 0.216222 0.704741i
\(690\) 605.763 0.877918
\(691\) −303.752 + 81.3900i −0.439583 + 0.117786i −0.471821 0.881694i \(-0.656403\pi\)
0.0322384 + 0.999480i \(0.489736\pi\)
\(692\) −168.425 + 291.720i −0.243388 + 0.421561i
\(693\) 404.370 233.463i 0.583506 0.336887i
\(694\) −556.526 556.526i −0.801911 0.801911i
\(695\) −148.823 + 555.414i −0.214134 + 0.799157i
\(696\) 130.627 + 35.0013i 0.187682 + 0.0502892i
\(697\) 274.985 274.985i 0.394526 0.394526i
\(698\) 327.786 + 567.742i 0.469608 + 0.813385i
\(699\) 66.2121 + 38.2276i 0.0947240 + 0.0546889i
\(700\) 280.551 + 1047.03i 0.400787 + 1.49576i
\(701\) 769.901i 1.09829i −0.835727 0.549145i \(-0.814954\pi\)
0.835727 0.549145i \(-0.185046\pi\)
\(702\) 3.42821 95.4686i 0.00488349 0.135995i
\(703\) −208.651 −0.296800
\(704\) 125.846 33.7202i 0.178758 0.0478980i
\(705\) −282.512 + 489.326i −0.400727 + 0.694079i
\(706\) −346.076 + 199.807i −0.490192 + 0.283013i
\(707\) −791.810 791.810i −1.11996 1.11996i
\(708\) −42.7252 + 159.453i −0.0603463 + 0.225215i
\(709\) 918.547 + 246.124i 1.29555 + 0.347142i 0.839767 0.542947i \(-0.182692\pi\)
0.455786 + 0.890089i \(0.349358\pi\)
\(710\) 289.223 289.223i 0.407356 0.407356i
\(711\) 84.2315 + 145.893i 0.118469 + 0.205194i
\(712\) 283.430 + 163.639i 0.398076 + 0.229829i
\(713\) −115.773 432.071i −0.162374 0.605990i
\(714\) 224.883i 0.314962i
\(715\) 1303.80 + 1400.92i 1.82349 + 1.95933i
\(716\) 626.093 0.874432
\(717\) −37.4893 + 10.0452i −0.0522863 + 0.0140101i
\(718\) −280.398 + 485.664i −0.390527 + 0.676412i
\(719\) −1165.21 + 672.733i −1.62060 + 0.935651i −0.633835 + 0.773468i \(0.718520\pi\)
−0.986761 + 0.162183i \(0.948146\pi\)
\(720\) 76.7017 + 76.7017i 0.106530 + 0.106530i
\(721\) 455.571 1700.21i 0.631860 2.35813i
\(722\) 359.316 + 96.2785i 0.497668 + 0.133350i
\(723\) −589.081 + 589.081i −0.814773 + 0.814773i
\(724\) −19.4795 33.7395i −0.0269054 0.0466015i
\(725\) −1355.74 782.736i −1.86998 1.07964i
\(726\) 91.4327 + 341.231i 0.125940 + 0.470016i
\(727\) 681.807i 0.937837i 0.883241 + 0.468918i \(0.155356\pi\)
−0.883241 + 0.468918i \(0.844644\pi\)
\(728\) 78.7114 + 342.479i 0.108120 + 0.470438i
\(729\) 27.0000 0.0370370
\(730\) 169.095 45.3090i 0.231637 0.0620671i
\(731\) −171.431 + 296.927i −0.234516 + 0.406193i
\(732\) −211.630 + 122.185i −0.289112 + 0.166919i
\(733\) 760.545 + 760.545i 1.03758 + 1.03758i 0.999266 + 0.0383126i \(0.0121983\pi\)
0.0383126 + 0.999266i \(0.487802\pi\)
\(734\) −216.645 + 808.531i −0.295157 + 1.10154i
\(735\) −640.265 171.559i −0.871109 0.233413i
\(736\) −109.433 + 109.433i −0.148686 + 0.148686i
\(737\) 326.454 + 565.434i 0.442949 + 0.767210i
\(738\) −148.742 85.8761i −0.201547 0.116363i
\(739\) 202.762 + 756.716i 0.274373 + 1.02397i 0.956260 + 0.292517i \(0.0944927\pi\)
−0.681888 + 0.731457i \(0.738841\pi\)
\(740\) 381.118i 0.515024i
\(741\) 196.877 104.432i 0.265691 0.140934i
\(742\) −528.053 −0.711662
\(743\) 779.633 208.902i 1.04930 0.281160i 0.307340 0.951600i \(-0.400561\pi\)
0.741964 + 0.670440i \(0.233894\pi\)
\(744\) 40.0496 69.3679i 0.0538301 0.0932365i
\(745\) −227.178 + 131.161i −0.304937 + 0.176056i
\(746\) 511.886 + 511.886i 0.686174 + 0.686174i
\(747\) 5.05039 18.8483i 0.00676090 0.0252320i
\(748\) 302.229 + 80.9820i 0.404049 + 0.108265i
\(749\) −48.3319 + 48.3319i −0.0645286 + 0.0645286i
\(750\) −351.065 608.062i −0.468086 0.810749i
\(751\) 858.524 + 495.669i 1.14317 + 0.660012i 0.947215 0.320600i \(-0.103885\pi\)
0.195959 + 0.980612i \(0.437218\pi\)
\(752\) −37.3615 139.435i −0.0496828 0.185419i
\(753\) 366.807i 0.487127i
\(754\) −430.123 269.361i −0.570455 0.357243i
\(755\) −404.410 −0.535642
\(756\) −95.9353 + 25.7058i −0.126898 + 0.0340023i
\(757\) −370.164 + 641.143i −0.488988 + 0.846952i −0.999920 0.0126691i \(-0.995967\pi\)
0.510932 + 0.859621i \(0.329301\pi\)
\(758\) 250.656 144.716i 0.330681 0.190919i
\(759\) −545.680 545.680i −0.718946 0.718946i
\(760\) −65.4952 + 244.431i −0.0861778 + 0.321620i
\(761\) 762.920 + 204.424i 1.00252 + 0.268625i 0.722502 0.691368i \(-0.242992\pi\)
0.280021 + 0.959994i \(0.409659\pi\)
\(762\) −46.7968 + 46.7968i −0.0614132 + 0.0614132i
\(763\) 54.5781 + 94.5320i 0.0715309 + 0.123895i
\(764\) −247.599 142.951i −0.324082 0.187109i
\(765\) 67.4240 + 251.630i 0.0881359 + 0.328928i
\(766\) 464.422i 0.606295i
\(767\) 328.803 525.040i 0.428687 0.684538i
\(768\) −27.7128 −0.0360844
\(769\) 12.3641 3.31296i 0.0160782 0.00430814i −0.250771 0.968046i \(-0.580684\pi\)
0.266849 + 0.963738i \(0.414017\pi\)
\(770\) 994.834 1723.10i 1.29199 2.23780i
\(771\) 408.631 235.923i 0.530002 0.305997i
\(772\) −237.325 237.325i −0.307415 0.307415i
\(773\) 24.6452 91.9770i 0.0318825 0.118987i −0.948151 0.317821i \(-0.897049\pi\)
0.980033 + 0.198834i \(0.0637155\pi\)
\(774\) 146.265 + 39.1917i 0.188973 + 0.0506353i
\(775\) −655.648 + 655.648i −0.845997 + 0.845997i
\(776\) 49.4091 + 85.5790i 0.0636715 + 0.110282i
\(777\) −302.207 174.479i −0.388941 0.224555i
\(778\) −144.208 538.192i −0.185358 0.691764i
\(779\) 400.678i 0.514349i
\(780\) −190.754 359.613i −0.244557 0.461042i
\(781\) −521.072 −0.667186
\(782\) −359.009 + 96.1962i −0.459091 + 0.123013i
\(783\) 71.7189 124.221i 0.0915951 0.158647i
\(784\) 146.659 84.6734i 0.187064 0.108002i
\(785\) −1549.52 1549.52i −1.97391 1.97391i
\(786\) −40.9346 + 152.770i −0.0520797 + 0.194364i
\(787\) −869.425 232.962i −1.10473 0.296012i −0.340042 0.940410i \(-0.610441\pi\)
−0.764690 + 0.644398i \(0.777108\pi\)
\(788\) 240.963 240.963i 0.305790 0.305790i
\(789\) 204.679 + 354.514i 0.259416 + 0.449321i
\(790\) 621.681 + 358.928i 0.786938 + 0.454339i
\(791\) 287.939 + 1074.60i 0.364018 + 1.35854i
\(792\) 138.188i 0.174480i
\(793\) 893.762 205.412i 1.12706 0.259032i
\(794\) −169.800 −0.213854
\(795\) 590.859 158.320i 0.743218 0.199145i
\(796\) 161.726 280.117i 0.203173 0.351906i
\(797\) −559.840 + 323.224i −0.702435 + 0.405551i −0.808254 0.588835i \(-0.799587\pi\)
0.105819 + 0.994385i \(0.466254\pi\)
\(798\) −163.837 163.837i −0.205310 0.205310i
\(799\) 89.7268 334.865i 0.112299 0.419105i
\(800\) 309.872 + 83.0299i 0.387340 + 0.103787i
\(801\) 245.458 245.458i 0.306439 0.306439i
\(802\) 234.950 + 406.945i 0.292955 + 0.507413i
\(803\) −193.139 111.509i −0.240521 0.138865i
\(804\) −35.9446 134.147i −0.0447072 0.166850i
\(805\) 2363.47i 2.93599i
\(806\) −220.043 + 204.788i −0.273006 + 0.254079i
\(807\) −807.761 −1.00094
\(808\) −320.112 + 85.7738i −0.396178 + 0.106156i
\(809\) 572.693 991.934i 0.707903 1.22612i −0.257731 0.966217i \(-0.582975\pi\)
0.965634 0.259907i \(-0.0836918\pi\)
\(810\) 99.6385 57.5263i 0.123010 0.0710201i
\(811\) 394.302 + 394.302i 0.486192 + 0.486192i 0.907102 0.420910i \(-0.138289\pi\)
−0.420910 + 0.907102i \(0.638289\pi\)
\(812\) −136.562 + 509.657i −0.168180 + 0.627657i
\(813\) −771.631 206.758i −0.949116 0.254315i
\(814\) 343.316 343.316i 0.421765 0.421765i
\(815\) 70.5670 + 122.226i 0.0865853 + 0.149970i
\(816\) −57.6381 33.2773i −0.0706349 0.0407811i
\(817\) 91.4296 + 341.220i 0.111909 + 0.417650i
\(818\) 622.032i 0.760431i
\(819\) 372.484 + 13.3756i 0.454803 + 0.0163317i
\(820\) −731.871 −0.892526
\(821\) −684.846 + 183.504i −0.834161 + 0.223513i −0.650528 0.759482i \(-0.725452\pi\)
−0.183633 + 0.982995i \(0.558786\pi\)
\(822\) 250.055 433.107i 0.304203 0.526895i
\(823\) 479.938 277.093i 0.583157 0.336686i −0.179230 0.983807i \(-0.557361\pi\)
0.762387 + 0.647121i \(0.224027\pi\)
\(824\) −368.356 368.356i −0.447034 0.447034i
\(825\) −414.023 + 1545.15i −0.501846 + 1.87291i
\(826\) −622.126 166.698i −0.753179 0.201814i
\(827\) 140.395 140.395i 0.169764 0.169764i −0.617112 0.786876i \(-0.711697\pi\)
0.786876 + 0.617112i \(0.211697\pi\)
\(828\) 82.0748 + 142.158i 0.0991241 + 0.171688i
\(829\) 446.523 + 257.800i 0.538628 + 0.310977i 0.744523 0.667597i \(-0.232677\pi\)
−0.205894 + 0.978574i \(0.566010\pi\)
\(830\) −21.5208 80.3165i −0.0259286 0.0967669i
\(831\) 42.5275i 0.0511763i
\(832\) 99.4256 + 30.5048i 0.119502 + 0.0366645i
\(833\) 406.701 0.488236
\(834\) −150.506 + 40.3280i −0.180463 + 0.0483549i
\(835\) 223.762 387.568i 0.267979 0.464153i
\(836\) 279.186 161.188i 0.333955 0.192809i
\(837\) −60.0744 60.0744i −0.0717735 0.0717735i
\(838\) 45.7359 170.689i 0.0545775 0.203686i
\(839\) −840.624 225.244i −1.00194 0.268468i −0.279679 0.960094i \(-0.590228\pi\)
−0.722256 + 0.691626i \(0.756895\pi\)
\(840\) −299.262 + 299.262i −0.356265 + 0.356265i
\(841\) 39.4922 + 68.4025i 0.0469586 + 0.0813348i
\(842\) 16.3907 + 9.46318i 0.0194664 + 0.0112389i
\(843\) −175.352 654.423i −0.208009 0.776302i
\(844\) 359.751i 0.426245i
\(845\) 288.529 + 1500.16i 0.341454 + 1.77534i
\(846\) −153.110 −0.180981
\(847\) −1331.36 + 356.737i −1.57186 + 0.421177i
\(848\) −78.1394 + 135.341i −0.0921456 + 0.159601i
\(849\) 587.566 339.231i 0.692068 0.399566i
\(850\) 544.780 + 544.780i 0.640918 + 0.640918i
\(851\) −149.271 + 557.087i −0.175406 + 0.654626i
\(852\) 107.060 + 28.6867i 0.125658 + 0.0336698i
\(853\) −42.9256 + 42.9256i −0.0503230 + 0.0503230i −0.731820 0.681497i \(-0.761329\pi\)
0.681497 + 0.731820i \(0.261329\pi\)
\(854\) −476.720 825.703i −0.558220 0.966866i
\(855\) 232.445 + 134.202i 0.271865 + 0.156962i
\(856\) 5.23561 + 19.5396i 0.00611637 + 0.0228266i
\(857\) 236.541i 0.276011i −0.990431 0.138005i \(-0.955931\pi\)
0.990431 0.138005i \(-0.0440692\pi\)
\(858\) −152.110 + 495.779i −0.177285 + 0.577831i
\(859\) −646.957 −0.753151 −0.376575 0.926386i \(-0.622898\pi\)
−0.376575 + 0.926386i \(0.622898\pi\)
\(860\) 623.267 167.004i 0.724729 0.194191i
\(861\) 335.057 580.336i 0.389149 0.674026i
\(862\) 885.461 511.221i 1.02722 0.593064i
\(863\) −344.605 344.605i −0.399310 0.399310i 0.478680 0.877990i \(-0.341116\pi\)
−0.877990 + 0.478680i \(0.841116\pi\)
\(864\) −7.60770 + 28.3923i −0.00880520 + 0.0328615i
\(865\) 1470.58 + 394.040i 1.70009 + 0.455538i
\(866\) 40.9607 40.9607i 0.0472987 0.0472987i
\(867\) 170.363 + 295.077i 0.196497 + 0.340343i
\(868\) 270.649 + 156.259i 0.311807 + 0.180022i
\(869\) −236.692 883.347i −0.272373 1.01651i
\(870\) 611.218i 0.702550i
\(871\) −18.7033 + 520.848i −0.0214733 + 0.597988i
\(872\) 32.3051 0.0370471
\(873\) 101.241 27.1275i 0.115969 0.0310738i
\(874\) −191.471 + 331.637i −0.219074 + 0.379448i
\(875\) 2372.44 1369.73i 2.71136 1.56540i
\(876\) 33.5436 + 33.5436i 0.0382918 + 0.0382918i
\(877\) 227.669 849.673i 0.259600 0.968840i −0.705873 0.708338i \(-0.749445\pi\)
0.965473 0.260502i \(-0.0838881\pi\)
\(878\) −908.892 243.537i −1.03518 0.277377i
\(879\) 362.988 362.988i 0.412956 0.412956i
\(880\) −294.424 509.957i −0.334573 0.579497i
\(881\) 35.9052 + 20.7299i 0.0407551 + 0.0235299i 0.520239 0.854021i \(-0.325843\pi\)
−0.479484 + 0.877551i \(0.659176\pi\)
\(882\) −46.4889 173.499i −0.0527085 0.196711i
\(883\) 28.0736i 0.0317934i 0.999874 + 0.0158967i \(0.00506029\pi\)
−0.999874 + 0.0158967i \(0.994940\pi\)
\(884\) 170.159 + 182.835i 0.192487 + 0.206826i
\(885\) 746.099 0.843050
\(886\) 365.518 97.9402i 0.412548 0.110542i
\(887\) −68.9319 + 119.393i −0.0777135 + 0.134604i −0.902263 0.431186i \(-0.858095\pi\)
0.824550 + 0.565790i \(0.191429\pi\)
\(888\) −89.4389 + 51.6376i −0.100720 + 0.0581505i
\(889\) −182.584 182.584i −0.205382 0.205382i
\(890\) 382.843 1428.79i 0.430161 1.60538i
\(891\) −141.576 37.9353i −0.158896 0.0425760i
\(892\) 551.263 551.263i 0.618008 0.618008i
\(893\) −178.594 309.334i −0.199993 0.346399i
\(894\) −61.5607 35.5421i −0.0688598 0.0397563i
\(895\) −732.393 2733.33i −0.818316 3.05400i
\(896\) 108.125i 0.120676i
\(897\) −137.981 600.365i −0.153825 0.669303i
\(898\) −796.391 −0.886850
\(899\) −435.962 + 116.816i −0.484941 + 0.129939i
\(900\) 170.131 294.676i 0.189035 0.327418i
\(901\) −325.034 + 187.659i −0.360748 + 0.208278i
\(902\) 659.280 + 659.280i 0.730909 + 0.730909i
\(903\) −152.912 + 570.675i −0.169338 + 0.631976i
\(904\) 318.031 + 85.2162i 0.351804 + 0.0942657i
\(905\) −124.509 + 124.509i −0.137579 + 0.137579i
\(906\) −54.7934 94.9049i −0.0604784 0.104752i
\(907\) 776.354 + 448.228i 0.855958 + 0.494187i 0.862657 0.505790i \(-0.168799\pi\)
−0.00669893 + 0.999978i \(0.502132\pi\)
\(908\) −69.0140 257.564i −0.0760066 0.283661i
\(909\) 351.507i 0.386697i
\(910\) 1403.08 744.255i 1.54185 0.817863i
\(911\) −318.659 −0.349791 −0.174895 0.984587i \(-0.555959\pi\)
−0.174895 + 0.984587i \(0.555959\pi\)
\(912\) −66.2359 + 17.7479i −0.0726271 + 0.0194604i
\(913\) −52.9641 + 91.7365i −0.0580111 + 0.100478i
\(914\) −816.022 + 471.131i −0.892803 + 0.515460i
\(915\) 780.981 + 780.981i 0.853531 + 0.853531i
\(916\) −223.177 + 832.909i −0.243643 + 0.909289i
\(917\) −596.053 159.712i −0.650004 0.174168i
\(918\) −49.9160 + 49.9160i −0.0543748 + 0.0543748i
\(919\) 50.2641 + 87.0600i 0.0546944 + 0.0947334i 0.892076 0.451885i \(-0.149248\pi\)
−0.837382 + 0.546618i \(0.815915\pi\)
\(920\) 605.763 + 349.738i 0.658438 + 0.380150i
\(921\) −140.245 523.401i −0.152275 0.568297i
\(922\) 506.616i 0.549475i
\(923\) −352.525 220.766i −0.381934 0.239183i
\(924\) 539.160 0.583506
\(925\) 1154.78 309.421i 1.24841 0.334509i
\(926\) −630.292 + 1091.70i −0.680660 + 1.17894i
\(927\) −478.508 + 276.267i −0.516190 + 0.298022i
\(928\) 110.419 + 110.419i 0.118985 + 0.118985i
\(929\) −287.719 + 1073.78i −0.309709 + 1.15585i 0.619107 + 0.785306i \(0.287495\pi\)
−0.928816 + 0.370542i \(0.879172\pi\)
\(930\) −349.688 93.6986i −0.376009 0.100751i
\(931\) 296.300 296.300i 0.318259 0.318259i
\(932\) 44.1414 + 76.4552i 0.0473620 + 0.0820334i
\(933\) −18.8334 10.8734i −0.0201858 0.0116543i
\(934\) −155.657 580.921i −0.166657 0.621972i
\(935\) 1414.17i 1.51248i
\(936\) 58.5470 93.4893i 0.0625502 0.0998817i
\(937\) −99.5793 −0.106275 −0.0531373 0.998587i \(-0.516922\pi\)
−0.0531373 + 0.998587i \(0.516922\pi\)
\(938\) 523.394 140.243i 0.557989 0.149513i
\(939\) 511.783 886.433i 0.545029 0.944018i
\(940\) −565.025 + 326.217i −0.601090 + 0.347040i
\(941\) 795.092 + 795.092i 0.844943 + 0.844943i 0.989497 0.144554i \(-0.0461746\pi\)
−0.144554 + 0.989497i \(0.546175\pi\)
\(942\) 153.690 573.578i 0.163153 0.608894i
\(943\) −1069.79 286.649i −1.13445 0.303976i
\(944\) −134.785 + 134.785i −0.142781 + 0.142781i
\(945\) 224.447 + 388.753i 0.237510 + 0.411379i
\(946\) −711.888 411.009i −0.752524 0.434470i
\(947\) 94.5423 + 352.837i 0.0998335 + 0.372584i 0.997708 0.0676681i \(-0.0215559\pi\)
−0.897874 + 0.440252i \(0.854889\pi\)
\(948\) 194.524i 0.205194i
\(949\) −83.4217 157.268i −0.0879049 0.165720i
\(950\) 793.793 0.835572
\(951\) 129.454 34.6871i 0.136124 0.0364743i
\(952\) 129.836 224.883i 0.136383 0.236221i
\(953\) −262.250 + 151.410i −0.275184 + 0.158877i −0.631241 0.775587i \(-0.717454\pi\)
0.356057 + 0.934464i \(0.384121\pi\)
\(954\) 117.209 + 117.209i 0.122861 + 0.122861i
\(955\) −334.443 + 1248.16i −0.350203 + 1.30697i
\(956\) −43.2889 11.5992i −0.0452813 0.0121331i
\(957\) −550.594 + 550.594i −0.575334 + 0.575334i
\(958\) −194.811 337.423i −0.203352 0.352216i
\(959\) 1689.83 + 975.623i 1.76207 + 1.01733i
\(960\) 32.4180 + 120.985i 0.0337687 + 0.126027i
\(961\) 693.672i 0.721823i
\(962\) 377.721 86.8111i 0.392642 0.0902403i
\(963\) 21.4559 0.0222803
\(964\) −929.186 + 248.975i −0.963886 + 0.258273i
\(965\) −758.467 + 1313.70i −0.785976 + 1.36135i
\(966\) −554.648 + 320.226i −0.574170 + 0.331497i
\(967\) 228.726 + 228.726i 0.236532 + 0.236532i 0.815412 0.578881i \(-0.196510\pi\)
−0.578881 + 0.815412i \(0.696510\pi\)
\(968\) −105.577 + 394.020i −0.109068 + 0.407046i
\(969\) −159.071 42.6230i −0.164160 0.0439866i
\(970\) 315.813 315.813i 0.325581 0.325581i
\(971\) 297.774 + 515.760i 0.306668 + 0.531164i 0.977631 0.210326i \(-0.0674526\pi\)
−0.670964 + 0.741490i \(0.734119\pi\)
\(972\) 27.0000 + 15.5885i 0.0277778 + 0.0160375i
\(973\) −157.345 587.220i −0.161711 0.603515i
\(974\) 905.415i 0.929585i
\(975\) −934.747 + 869.942i −0.958715 + 0.892248i
\(976\) −282.173 −0.289112
\(977\) 922.516 247.187i 0.944233 0.253007i 0.246320 0.969189i \(-0.420779\pi\)
0.697914 + 0.716182i \(0.254112\pi\)
\(978\) −19.1222 + 33.1207i −0.0195524 + 0.0338657i
\(979\) −1631.95 + 942.204i −1.66695 + 0.962415i
\(980\) −541.216 541.216i −0.552261 0.552261i
\(981\) 8.86836 33.0972i 0.00904012 0.0337382i
\(982\) 774.081 + 207.414i 0.788270 + 0.211216i
\(983\) 265.546 265.546i 0.270138 0.270138i −0.559018 0.829156i \(-0.688822\pi\)
0.829156 + 0.559018i \(0.188822\pi\)
\(984\) −99.1611 171.752i −0.100774 0.174545i
\(985\) −1333.84 770.093i −1.35415 0.781821i
\(986\) 97.0625 + 362.242i 0.0984406 + 0.367385i
\(987\) 597.381i 0.605249i
\(988\) 257.171 + 9.23485i 0.260295 + 0.00934701i
\(989\) 976.450 0.987310
\(990\) −603.286 + 161.650i −0.609380 + 0.163283i
\(991\) −72.5775 + 125.708i −0.0732366 + 0.126850i −0.900318 0.435233i \(-0.856666\pi\)
0.827081 + 0.562082i \(0.189999\pi\)
\(992\) 80.0992 46.2453i 0.0807451 0.0466182i
\(993\) 25.0360 + 25.0360i 0.0252125 + 0.0252125i
\(994\) −111.925 + 417.710i −0.112601 + 0.420232i
\(995\) −1412.09 378.368i −1.41919 0.380269i
\(996\) 15.9325 15.9325i 0.0159965 0.0159965i
\(997\) −292.161 506.038i −0.293040 0.507561i 0.681487 0.731830i \(-0.261334\pi\)
−0.974527 + 0.224270i \(0.928000\pi\)
\(998\) −708.914 409.292i −0.710335 0.410112i
\(999\) 28.3510 + 105.807i 0.0283794 + 0.105913i
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 78.3.l.c.7.1 8
3.2 odd 2 234.3.bb.d.163.2 8
13.2 odd 12 inner 78.3.l.c.67.1 yes 8
13.4 even 6 1014.3.f.j.775.2 8
13.6 odd 12 1014.3.f.h.577.1 8
13.7 odd 12 1014.3.f.j.577.2 8
13.9 even 3 1014.3.f.h.775.1 8
39.2 even 12 234.3.bb.d.145.2 8
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
78.3.l.c.7.1 8 1.1 even 1 trivial
78.3.l.c.67.1 yes 8 13.2 odd 12 inner
234.3.bb.d.145.2 8 39.2 even 12
234.3.bb.d.163.2 8 3.2 odd 2
1014.3.f.h.577.1 8 13.6 odd 12
1014.3.f.h.775.1 8 13.9 even 3
1014.3.f.j.577.2 8 13.7 odd 12
1014.3.f.j.775.2 8 13.4 even 6