Properties

Label 74.4.c.a.47.3
Level $74$
Weight $4$
Character 74.47
Analytic conductor $4.366$
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] = [74,4,Mod(47,74)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(74, base_ring=CyclotomicField(6))
 
chi = DirichletCharacter(H, H._module([4]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("74.47");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 74 = 2 \cdot 37 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 74.c (of order \(3\), degree \(2\), 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: \(4.36614134042\)
Analytic rank: \(0\)
Dimension: \(8\)
Relative dimension: \(4\) over \(\Q(\zeta_{3})\)
Coefficient field: \(\mathbb{Q}[x]/(x^{8} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} - x^{7} + 48x^{6} + 157x^{5} + 1944x^{4} + 3005x^{3} + 12895x^{2} - 11550x + 44100 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 2^{2} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{3}]$

Embedding invariants

Embedding label 47.3
Root \(-1.95521 - 3.38653i\) of defining polynomial
Character \(\chi\) \(=\) 74.47
Dual form 74.4.c.a.63.3

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(1.00000 - 1.73205i) q^{2} +(1.45521 + 2.52050i) q^{3} +(-2.00000 - 3.46410i) q^{4} +(-8.20891 - 14.2183i) q^{5} +5.82085 q^{6} +(-6.65276 - 11.5229i) q^{7} -8.00000 q^{8} +(9.26471 - 16.0469i) q^{9} +O(q^{10})\) \(q+(1.00000 - 1.73205i) q^{2} +(1.45521 + 2.52050i) q^{3} +(-2.00000 - 3.46410i) q^{4} +(-8.20891 - 14.2183i) q^{5} +5.82085 q^{6} +(-6.65276 - 11.5229i) q^{7} -8.00000 q^{8} +(9.26471 - 16.0469i) q^{9} -32.8357 q^{10} +60.5228 q^{11} +(5.82085 - 10.0820i) q^{12} +(-12.3660 - 21.4185i) q^{13} -26.6111 q^{14} +(23.8914 - 41.3812i) q^{15} +(-8.00000 + 13.8564i) q^{16} +(-47.0001 + 81.4065i) q^{17} +(-18.5294 - 32.0939i) q^{18} +(18.3801 + 31.8352i) q^{19} +(-32.8357 + 56.8730i) q^{20} +(19.3624 - 33.5366i) q^{21} +(60.5228 - 104.829i) q^{22} -143.129 q^{23} +(-11.6417 - 20.1640i) q^{24} +(-72.2725 + 125.180i) q^{25} -49.4640 q^{26} +132.510 q^{27} +(-26.6111 + 46.0917i) q^{28} +118.321 q^{29} +(-47.7829 - 82.7624i) q^{30} +317.683 q^{31} +(16.0000 + 27.7128i) q^{32} +(88.0736 + 152.548i) q^{33} +(94.0002 + 162.813i) q^{34} +(-109.224 + 189.181i) q^{35} -74.1176 q^{36} +(95.0800 - 203.992i) q^{37} +73.5203 q^{38} +(35.9903 - 62.3371i) q^{39} +(65.6713 + 113.746i) q^{40} +(59.1649 + 102.477i) q^{41} +(-38.7248 - 67.0733i) q^{42} -217.430 q^{43} +(-121.046 - 209.657i) q^{44} -304.213 q^{45} +(-143.129 + 247.906i) q^{46} +262.977 q^{47} -46.5668 q^{48} +(82.9815 - 143.728i) q^{49} +(144.545 + 250.359i) q^{50} -273.581 q^{51} +(-49.4640 + 85.6741i) q^{52} +(-130.507 + 226.044i) q^{53} +(132.510 - 229.514i) q^{54} +(-496.826 - 860.529i) q^{55} +(53.2221 + 92.1834i) q^{56} +(-53.4939 + 92.6541i) q^{57} +(118.321 - 204.937i) q^{58} +(29.2376 - 50.6411i) q^{59} -191.132 q^{60} +(345.987 + 599.266i) q^{61} +(317.683 - 550.242i) q^{62} -246.544 q^{63} +64.0000 q^{64} +(-203.023 + 351.646i) q^{65} +352.294 q^{66} +(-148.414 - 257.060i) q^{67} +376.001 q^{68} +(-208.283 - 360.756i) q^{69} +(218.448 + 378.363i) q^{70} +(-495.169 - 857.658i) q^{71} +(-74.1176 + 128.376i) q^{72} +799.748 q^{73} +(-258.245 - 368.676i) q^{74} -420.688 q^{75} +(73.5203 - 127.341i) q^{76} +(-402.644 - 697.400i) q^{77} +(-71.9807 - 124.674i) q^{78} +(-54.2659 - 93.9912i) q^{79} +262.685 q^{80} +(-57.3166 - 99.2753i) q^{81} +236.660 q^{82} +(28.3523 - 49.1076i) q^{83} -154.899 q^{84} +1543.28 q^{85} +(-217.430 + 376.601i) q^{86} +(172.182 + 298.228i) q^{87} -484.182 q^{88} +(-712.458 + 1234.01i) q^{89} +(-304.213 + 526.912i) q^{90} +(-164.536 + 284.985i) q^{91} +(286.257 + 495.812i) q^{92} +(462.296 + 800.720i) q^{93} +(262.977 - 455.489i) q^{94} +(301.761 - 522.665i) q^{95} +(-46.5668 + 80.6561i) q^{96} +705.808 q^{97} +(-165.963 - 287.456i) q^{98} +(560.726 - 971.206i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q + 8 q^{2} - 5 q^{3} - 16 q^{4} - 10 q^{5} - 20 q^{6} + 3 q^{7} - 64 q^{8} + 7 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q + 8 q^{2} - 5 q^{3} - 16 q^{4} - 10 q^{5} - 20 q^{6} + 3 q^{7} - 64 q^{8} + 7 q^{9} - 40 q^{10} + 64 q^{11} - 20 q^{12} - 61 q^{13} + 12 q^{14} - 43 q^{15} - 64 q^{16} + 12 q^{17} - 14 q^{18} - 71 q^{19} - 40 q^{20} + 67 q^{21} + 64 q^{22} - 52 q^{23} + 40 q^{24} + 48 q^{25} - 244 q^{26} + 658 q^{27} + 12 q^{28} + 322 q^{29} + 86 q^{30} - 112 q^{31} + 128 q^{32} + 280 q^{33} - 24 q^{34} - 359 q^{35} - 56 q^{36} + 557 q^{37} - 284 q^{38} - 389 q^{39} + 80 q^{40} + 92 q^{41} - 134 q^{42} + 532 q^{43} - 128 q^{44} + 330 q^{45} - 52 q^{46} + 280 q^{47} + 160 q^{48} + 87 q^{49} - 96 q^{50} - 1306 q^{51} - 244 q^{52} + 159 q^{53} + 658 q^{54} - 872 q^{55} - 24 q^{56} - 469 q^{57} + 322 q^{58} + 263 q^{59} + 344 q^{60} - 206 q^{61} - 112 q^{62} - 2328 q^{63} + 512 q^{64} - 731 q^{65} + 1120 q^{66} + 245 q^{67} - 96 q^{68} - 360 q^{69} + 718 q^{70} - 957 q^{71} - 56 q^{72} - 272 q^{73} - 178 q^{74} - 3232 q^{75} - 284 q^{76} + 744 q^{77} + 778 q^{78} + 173 q^{79} + 320 q^{80} - 528 q^{81} + 368 q^{82} + 1217 q^{83} - 536 q^{84} + 2988 q^{85} + 532 q^{86} - 2336 q^{87} - 512 q^{88} - 2136 q^{89} + 330 q^{90} + 1575 q^{91} + 104 q^{92} + 2608 q^{93} + 280 q^{94} + 891 q^{95} + 160 q^{96} + 5262 q^{97} - 174 q^{98} - 176 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/74\mathbb{Z}\right)^\times\).

\(n\) \(39\)
\(\chi(n)\) \(e\left(\frac{2}{3}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 1.00000 1.73205i 0.353553 0.612372i
\(3\) 1.45521 + 2.52050i 0.280056 + 0.485071i 0.971398 0.237456i \(-0.0763136\pi\)
−0.691342 + 0.722527i \(0.742980\pi\)
\(4\) −2.00000 3.46410i −0.250000 0.433013i
\(5\) −8.20891 14.2183i −0.734227 1.27172i −0.955061 0.296408i \(-0.904211\pi\)
0.220834 0.975311i \(-0.429122\pi\)
\(6\) 5.82085 0.396059
\(7\) −6.65276 11.5229i −0.359216 0.622179i 0.628614 0.777717i \(-0.283622\pi\)
−0.987830 + 0.155538i \(0.950289\pi\)
\(8\) −8.00000 −0.353553
\(9\) 9.26471 16.0469i 0.343137 0.594331i
\(10\) −32.8357 −1.03835
\(11\) 60.5228 1.65894 0.829469 0.558553i \(-0.188643\pi\)
0.829469 + 0.558553i \(0.188643\pi\)
\(12\) 5.82085 10.0820i 0.140028 0.242536i
\(13\) −12.3660 21.4185i −0.263824 0.456956i 0.703431 0.710764i \(-0.251650\pi\)
−0.967255 + 0.253807i \(0.918317\pi\)
\(14\) −26.6111 −0.508007
\(15\) 23.8914 41.3812i 0.411250 0.712305i
\(16\) −8.00000 + 13.8564i −0.125000 + 0.216506i
\(17\) −47.0001 + 81.4065i −0.670541 + 1.16141i 0.307210 + 0.951642i \(0.400605\pi\)
−0.977751 + 0.209769i \(0.932729\pi\)
\(18\) −18.5294 32.0939i −0.242635 0.420256i
\(19\) 18.3801 + 31.8352i 0.221931 + 0.384395i 0.955394 0.295334i \(-0.0954308\pi\)
−0.733464 + 0.679729i \(0.762098\pi\)
\(20\) −32.8357 + 56.8730i −0.367114 + 0.635860i
\(21\) 19.3624 33.5366i 0.201201 0.348490i
\(22\) 60.5228 104.829i 0.586523 1.01589i
\(23\) −143.129 −1.29758 −0.648791 0.760967i \(-0.724725\pi\)
−0.648791 + 0.760967i \(0.724725\pi\)
\(24\) −11.6417 20.1640i −0.0990148 0.171499i
\(25\) −72.2725 + 125.180i −0.578180 + 1.00144i
\(26\) −49.4640 −0.373103
\(27\) 132.510 0.944503
\(28\) −26.6111 + 46.0917i −0.179608 + 0.311090i
\(29\) 118.321 0.757641 0.378821 0.925470i \(-0.376330\pi\)
0.378821 + 0.925470i \(0.376330\pi\)
\(30\) −47.7829 82.7624i −0.290797 0.503676i
\(31\) 317.683 1.84056 0.920282 0.391256i \(-0.127959\pi\)
0.920282 + 0.391256i \(0.127959\pi\)
\(32\) 16.0000 + 27.7128i 0.0883883 + 0.153093i
\(33\) 88.0736 + 152.548i 0.464595 + 0.804703i
\(34\) 94.0002 + 162.813i 0.474144 + 0.821242i
\(35\) −109.224 + 189.181i −0.527492 + 0.913643i
\(36\) −74.1176 −0.343137
\(37\) 95.0800 203.992i 0.422461 0.906381i
\(38\) 73.5203 0.313857
\(39\) 35.9903 62.3371i 0.147771 0.255947i
\(40\) 65.6713 + 113.746i 0.259589 + 0.449621i
\(41\) 59.1649 + 102.477i 0.225366 + 0.390346i 0.956429 0.291964i \(-0.0943088\pi\)
−0.731063 + 0.682310i \(0.760975\pi\)
\(42\) −38.7248 67.0733i −0.142271 0.246420i
\(43\) −217.430 −0.771113 −0.385556 0.922684i \(-0.625990\pi\)
−0.385556 + 0.922684i \(0.625990\pi\)
\(44\) −121.046 209.657i −0.414734 0.718341i
\(45\) −304.213 −1.00776
\(46\) −143.129 + 247.906i −0.458764 + 0.794603i
\(47\) 262.977 0.816151 0.408075 0.912948i \(-0.366200\pi\)
0.408075 + 0.912948i \(0.366200\pi\)
\(48\) −46.5668 −0.140028
\(49\) 82.9815 143.728i 0.241928 0.419032i
\(50\) 144.545 + 250.359i 0.408835 + 0.708123i
\(51\) −273.581 −0.751156
\(52\) −49.4640 + 85.6741i −0.131912 + 0.228478i
\(53\) −130.507 + 226.044i −0.338235 + 0.585840i −0.984101 0.177611i \(-0.943163\pi\)
0.645866 + 0.763451i \(0.276497\pi\)
\(54\) 132.510 229.514i 0.333932 0.578387i
\(55\) −496.826 860.529i −1.21804 2.10970i
\(56\) 53.2221 + 92.1834i 0.127002 + 0.219974i
\(57\) −53.4939 + 92.6541i −0.124306 + 0.215304i
\(58\) 118.321 204.937i 0.267867 0.463959i
\(59\) 29.2376 50.6411i 0.0645155 0.111744i −0.831963 0.554830i \(-0.812783\pi\)
0.896479 + 0.443086i \(0.146116\pi\)
\(60\) −191.132 −0.411250
\(61\) 345.987 + 599.266i 0.726214 + 1.25784i 0.958472 + 0.285185i \(0.0920551\pi\)
−0.232259 + 0.972654i \(0.574612\pi\)
\(62\) 317.683 550.242i 0.650737 1.12711i
\(63\) −246.544 −0.493041
\(64\) 64.0000 0.125000
\(65\) −203.023 + 351.646i −0.387413 + 0.671020i
\(66\) 352.294 0.657037
\(67\) −148.414 257.060i −0.270621 0.468730i 0.698400 0.715708i \(-0.253896\pi\)
−0.969021 + 0.246978i \(0.920562\pi\)
\(68\) 376.001 0.670541
\(69\) −208.283 360.756i −0.363395 0.629419i
\(70\) 218.448 + 378.363i 0.372993 + 0.646043i
\(71\) −495.169 857.658i −0.827686 1.43359i −0.899849 0.436202i \(-0.856323\pi\)
0.0721625 0.997393i \(-0.477010\pi\)
\(72\) −74.1176 + 128.376i −0.121317 + 0.210128i
\(73\) 799.748 1.28224 0.641119 0.767441i \(-0.278470\pi\)
0.641119 + 0.767441i \(0.278470\pi\)
\(74\) −258.245 368.676i −0.405680 0.579158i
\(75\) −420.688 −0.647691
\(76\) 73.5203 127.341i 0.110965 0.192197i
\(77\) −402.644 697.400i −0.595916 1.03216i
\(78\) −71.9807 124.674i −0.104490 0.180982i
\(79\) −54.2659 93.9912i −0.0772834 0.133859i 0.824794 0.565434i \(-0.191291\pi\)
−0.902077 + 0.431575i \(0.857958\pi\)
\(80\) 262.685 0.367114
\(81\) −57.3166 99.2753i −0.0786236 0.136180i
\(82\) 236.660 0.318716
\(83\) 28.3523 49.1076i 0.0374948 0.0649429i −0.846669 0.532120i \(-0.821396\pi\)
0.884164 + 0.467177i \(0.154729\pi\)
\(84\) −154.899 −0.201201
\(85\) 1543.28 1.96932
\(86\) −217.430 + 376.601i −0.272629 + 0.472208i
\(87\) 172.182 + 298.228i 0.212182 + 0.367510i
\(88\) −484.182 −0.586523
\(89\) −712.458 + 1234.01i −0.848543 + 1.46972i 0.0339650 + 0.999423i \(0.489187\pi\)
−0.882508 + 0.470297i \(0.844147\pi\)
\(90\) −304.213 + 526.912i −0.356298 + 0.617126i
\(91\) −164.536 + 284.985i −0.189539 + 0.328292i
\(92\) 286.257 + 495.812i 0.324395 + 0.561869i
\(93\) 462.296 + 800.720i 0.515461 + 0.892804i
\(94\) 262.977 455.489i 0.288553 0.499788i
\(95\) 301.761 522.665i 0.325895 0.564467i
\(96\) −46.5668 + 80.6561i −0.0495074 + 0.0857493i
\(97\) 705.808 0.738803 0.369402 0.929270i \(-0.379563\pi\)
0.369402 + 0.929270i \(0.379563\pi\)
\(98\) −165.963 287.456i −0.171069 0.296301i
\(99\) 560.726 971.206i 0.569243 0.985958i
\(100\) 578.180 0.578180
\(101\) −1624.13 −1.60007 −0.800035 0.599954i \(-0.795186\pi\)
−0.800035 + 0.599954i \(0.795186\pi\)
\(102\) −273.581 + 473.856i −0.265574 + 0.459987i
\(103\) −891.058 −0.852413 −0.426206 0.904626i \(-0.640150\pi\)
−0.426206 + 0.904626i \(0.640150\pi\)
\(104\) 98.9280 + 171.348i 0.0932758 + 0.161558i
\(105\) −635.777 −0.590909
\(106\) 261.013 + 452.088i 0.239168 + 0.414251i
\(107\) 514.734 + 891.545i 0.465058 + 0.805504i 0.999204 0.0398884i \(-0.0127003\pi\)
−0.534146 + 0.845392i \(0.679367\pi\)
\(108\) −265.020 459.028i −0.236126 0.408982i
\(109\) −633.641 + 1097.50i −0.556806 + 0.964416i 0.440955 + 0.897529i \(0.354640\pi\)
−0.997761 + 0.0668865i \(0.978693\pi\)
\(110\) −1987.31 −1.72257
\(111\) 652.525 57.2026i 0.557972 0.0489138i
\(112\) 212.888 0.179608
\(113\) −282.261 + 488.890i −0.234981 + 0.406999i −0.959267 0.282500i \(-0.908836\pi\)
0.724286 + 0.689500i \(0.242170\pi\)
\(114\) 106.988 + 185.308i 0.0878976 + 0.152243i
\(115\) 1174.93 + 2035.04i 0.952720 + 1.65016i
\(116\) −236.641 409.875i −0.189410 0.328068i
\(117\) −458.269 −0.362111
\(118\) −58.4753 101.282i −0.0456194 0.0790151i
\(119\) 1250.72 0.963475
\(120\) −191.132 + 331.050i −0.145399 + 0.251838i
\(121\) 2332.01 1.75207
\(122\) 1383.95 1.02702
\(123\) −172.195 + 298.251i −0.126230 + 0.218637i
\(124\) −635.365 1100.48i −0.460141 0.796987i
\(125\) 320.886 0.229608
\(126\) −246.544 + 427.026i −0.174316 + 0.301925i
\(127\) 408.648 707.798i 0.285524 0.494543i −0.687212 0.726457i \(-0.741166\pi\)
0.972736 + 0.231914i \(0.0744989\pi\)
\(128\) 64.0000 110.851i 0.0441942 0.0765466i
\(129\) −316.408 548.034i −0.215955 0.374044i
\(130\) 406.046 + 703.291i 0.273943 + 0.474483i
\(131\) −473.906 + 820.829i −0.316071 + 0.547451i −0.979665 0.200642i \(-0.935697\pi\)
0.663593 + 0.748093i \(0.269031\pi\)
\(132\) 352.294 610.192i 0.232298 0.402351i
\(133\) 244.557 423.585i 0.159442 0.276161i
\(134\) −593.655 −0.382716
\(135\) −1087.76 1884.06i −0.693480 1.20114i
\(136\) 376.001 651.252i 0.237072 0.410621i
\(137\) 872.036 0.543818 0.271909 0.962323i \(-0.412345\pi\)
0.271909 + 0.962323i \(0.412345\pi\)
\(138\) −833.131 −0.513919
\(139\) 491.613 851.499i 0.299986 0.519591i −0.676146 0.736767i \(-0.736351\pi\)
0.976132 + 0.217176i \(0.0696846\pi\)
\(140\) 873.791 0.527492
\(141\) 382.687 + 662.834i 0.228568 + 0.395891i
\(142\) −1980.68 −1.17053
\(143\) −748.425 1296.31i −0.437667 0.758062i
\(144\) 148.235 + 256.751i 0.0857843 + 0.148583i
\(145\) −971.284 1682.31i −0.556281 0.963507i
\(146\) 799.748 1385.20i 0.453340 0.785207i
\(147\) 483.023 0.271014
\(148\) −896.810 + 78.6174i −0.498090 + 0.0436643i
\(149\) −939.077 −0.516323 −0.258162 0.966102i \(-0.583117\pi\)
−0.258162 + 0.966102i \(0.583117\pi\)
\(150\) −420.688 + 728.652i −0.228993 + 0.396628i
\(151\) 1052.43 + 1822.86i 0.567188 + 0.982399i 0.996842 + 0.0794055i \(0.0253022\pi\)
−0.429654 + 0.902994i \(0.641364\pi\)
\(152\) −147.041 254.682i −0.0784643 0.135904i
\(153\) 870.884 + 1508.42i 0.460175 + 0.797047i
\(154\) −1610.58 −0.842753
\(155\) −2607.83 4516.89i −1.35139 2.34068i
\(156\) −287.923 −0.147771
\(157\) 308.636 534.573i 0.156891 0.271743i −0.776855 0.629679i \(-0.783186\pi\)
0.933746 + 0.357937i \(0.116520\pi\)
\(158\) −217.063 −0.109295
\(159\) −759.660 −0.378899
\(160\) 262.685 454.984i 0.129794 0.224810i
\(161\) 952.201 + 1649.26i 0.466111 + 0.807329i
\(162\) −229.267 −0.111191
\(163\) −25.9187 + 44.8925i −0.0124547 + 0.0215721i −0.872186 0.489175i \(-0.837298\pi\)
0.859731 + 0.510747i \(0.170631\pi\)
\(164\) 236.660 409.907i 0.112683 0.195173i
\(165\) 1445.98 2504.51i 0.682237 1.18167i
\(166\) −56.7046 98.2152i −0.0265128 0.0459216i
\(167\) −519.747 900.228i −0.240834 0.417136i 0.720118 0.693851i \(-0.244088\pi\)
−0.960952 + 0.276715i \(0.910754\pi\)
\(168\) −154.899 + 268.293i −0.0711353 + 0.123210i
\(169\) 792.664 1372.93i 0.360794 0.624913i
\(170\) 1543.28 2673.04i 0.696259 1.20596i
\(171\) 681.144 0.304611
\(172\) 434.861 + 753.201i 0.192778 + 0.333902i
\(173\) −1546.91 + 2679.33i −0.679823 + 1.17749i 0.295211 + 0.955432i \(0.404610\pi\)
−0.975034 + 0.222056i \(0.928723\pi\)
\(174\) 688.728 0.300071
\(175\) 1923.25 0.830765
\(176\) −484.182 + 838.629i −0.207367 + 0.359171i
\(177\) 170.188 0.0722719
\(178\) 1424.92 + 2468.03i 0.600011 + 1.03925i
\(179\) −1588.95 −0.663485 −0.331743 0.943370i \(-0.607637\pi\)
−0.331743 + 0.943370i \(0.607637\pi\)
\(180\) 608.425 + 1053.82i 0.251941 + 0.436374i
\(181\) 1189.42 + 2060.13i 0.488446 + 0.846014i 0.999912 0.0132899i \(-0.00423044\pi\)
−0.511465 + 0.859304i \(0.670897\pi\)
\(182\) 329.072 + 569.970i 0.134024 + 0.232137i
\(183\) −1006.97 + 1744.12i −0.406761 + 0.704531i
\(184\) 1145.03 0.458764
\(185\) −3680.92 + 322.682i −1.46284 + 0.128238i
\(186\) 1849.18 0.728972
\(187\) −2844.58 + 4926.95i −1.11239 + 1.92671i
\(188\) −525.953 910.978i −0.204038 0.353404i
\(189\) −881.558 1526.90i −0.339280 0.587650i
\(190\) −603.522 1045.33i −0.230443 0.399138i
\(191\) 3253.74 1.23263 0.616314 0.787500i \(-0.288625\pi\)
0.616314 + 0.787500i \(0.288625\pi\)
\(192\) 93.1337 + 161.312i 0.0350070 + 0.0606339i
\(193\) −4069.18 −1.51765 −0.758824 0.651296i \(-0.774226\pi\)
−0.758824 + 0.651296i \(0.774226\pi\)
\(194\) 705.808 1222.50i 0.261206 0.452423i
\(195\) −1181.77 −0.433990
\(196\) −663.852 −0.241928
\(197\) 1738.26 3010.75i 0.628659 1.08887i −0.359162 0.933275i \(-0.616937\pi\)
0.987821 0.155595i \(-0.0497293\pi\)
\(198\) −1121.45 1942.41i −0.402516 0.697178i
\(199\) 2872.30 1.02318 0.511588 0.859231i \(-0.329057\pi\)
0.511588 + 0.859231i \(0.329057\pi\)
\(200\) 578.180 1001.44i 0.204417 0.354061i
\(201\) 431.948 748.155i 0.151578 0.262541i
\(202\) −1624.13 + 2813.08i −0.565710 + 0.979838i
\(203\) −787.160 1363.40i −0.272157 0.471389i
\(204\) 547.161 + 947.711i 0.187789 + 0.325260i
\(205\) 971.360 1682.44i 0.330940 0.573205i
\(206\) −891.058 + 1543.36i −0.301373 + 0.521994i
\(207\) −1326.04 + 2296.78i −0.445249 + 0.771193i
\(208\) 395.712 0.131912
\(209\) 1112.41 + 1926.76i 0.368169 + 0.637687i
\(210\) −635.777 + 1101.20i −0.208918 + 0.361856i
\(211\) −3868.60 −1.26221 −0.631103 0.775699i \(-0.717398\pi\)
−0.631103 + 0.775699i \(0.717398\pi\)
\(212\) 1044.05 0.338235
\(213\) 1441.15 2496.15i 0.463597 0.802974i
\(214\) 2058.93 0.657691
\(215\) 1784.87 + 3091.48i 0.566172 + 0.980639i
\(216\) −1060.08 −0.333932
\(217\) −2113.47 3660.63i −0.661159 1.14516i
\(218\) 1267.28 + 2195.00i 0.393721 + 0.681945i
\(219\) 1163.80 + 2015.77i 0.359099 + 0.621977i
\(220\) −1987.31 + 3442.11i −0.609019 + 1.05485i
\(221\) 2324.81 0.707619
\(222\) 553.447 1187.41i 0.167319 0.358980i
\(223\) 1194.79 0.358786 0.179393 0.983777i \(-0.442587\pi\)
0.179393 + 0.983777i \(0.442587\pi\)
\(224\) 212.888 368.734i 0.0635009 0.109987i
\(225\) 1339.17 + 2319.51i 0.396790 + 0.687261i
\(226\) 564.522 + 977.781i 0.166157 + 0.287792i
\(227\) 2696.53 + 4670.53i 0.788436 + 1.36561i 0.926924 + 0.375248i \(0.122442\pi\)
−0.138488 + 0.990364i \(0.544224\pi\)
\(228\) 427.951 0.124306
\(229\) 654.768 + 1134.09i 0.188944 + 0.327261i 0.944899 0.327363i \(-0.106160\pi\)
−0.755954 + 0.654625i \(0.772827\pi\)
\(230\) 4699.72 1.34735
\(231\) 1171.87 2029.73i 0.333780 0.578124i
\(232\) −946.565 −0.267867
\(233\) −4220.12 −1.18656 −0.593281 0.804995i \(-0.702168\pi\)
−0.593281 + 0.804995i \(0.702168\pi\)
\(234\) −458.269 + 793.746i −0.128026 + 0.221747i
\(235\) −2158.75 3739.07i −0.599240 1.03791i
\(236\) −233.901 −0.0645155
\(237\) 157.937 273.555i 0.0432873 0.0749759i
\(238\) 1250.72 2166.31i 0.340640 0.590005i
\(239\) −1232.09 + 2134.04i −0.333460 + 0.577570i −0.983188 0.182597i \(-0.941550\pi\)
0.649727 + 0.760167i \(0.274883\pi\)
\(240\) 382.263 + 662.099i 0.102812 + 0.178076i
\(241\) −1068.44 1850.59i −0.285577 0.494634i 0.687172 0.726495i \(-0.258852\pi\)
−0.972749 + 0.231861i \(0.925519\pi\)
\(242\) 2332.01 4039.16i 0.619452 1.07292i
\(243\) 1955.70 3387.37i 0.516289 0.894239i
\(244\) 1383.95 2397.07i 0.363107 0.628920i
\(245\) −2724.75 −0.710522
\(246\) 344.391 + 596.502i 0.0892583 + 0.154600i
\(247\) 454.576 787.349i 0.117101 0.202825i
\(248\) −2541.46 −0.650737
\(249\) 165.035 0.0420026
\(250\) 320.886 555.791i 0.0811785 0.140605i
\(251\) 5204.00 1.30866 0.654330 0.756210i \(-0.272951\pi\)
0.654330 + 0.756210i \(0.272951\pi\)
\(252\) 493.087 + 854.052i 0.123260 + 0.213493i
\(253\) −8662.54 −2.15261
\(254\) −817.295 1415.60i −0.201896 0.349695i
\(255\) 2245.80 + 3889.84i 0.551519 + 0.955260i
\(256\) −128.000 221.703i −0.0312500 0.0541266i
\(257\) −2662.67 + 4611.89i −0.646277 + 1.11938i 0.337728 + 0.941244i \(0.390341\pi\)
−0.984005 + 0.178140i \(0.942992\pi\)
\(258\) −1265.63 −0.305406
\(259\) −2983.13 + 261.512i −0.715686 + 0.0627395i
\(260\) 1624.18 0.387413
\(261\) 1096.21 1898.69i 0.259975 0.450290i
\(262\) 947.811 + 1641.66i 0.223496 + 0.387107i
\(263\) 2081.59 + 3605.42i 0.488047 + 0.845322i 0.999905 0.0137478i \(-0.00437620\pi\)
−0.511859 + 0.859070i \(0.671043\pi\)
\(264\) −704.589 1220.38i −0.164259 0.284505i
\(265\) 4285.27 0.993366
\(266\) −489.113 847.169i −0.112742 0.195275i
\(267\) −4147.11 −0.950558
\(268\) −593.655 + 1028.24i −0.135311 + 0.234365i
\(269\) −4294.65 −0.973417 −0.486709 0.873564i \(-0.661803\pi\)
−0.486709 + 0.873564i \(0.661803\pi\)
\(270\) −4351.05 −0.980729
\(271\) 3124.92 5412.51i 0.700462 1.21324i −0.267843 0.963463i \(-0.586311\pi\)
0.968305 0.249773i \(-0.0803559\pi\)
\(272\) −752.001 1302.50i −0.167635 0.290353i
\(273\) −957.741 −0.212326
\(274\) 872.036 1510.41i 0.192269 0.333019i
\(275\) −4374.13 + 7576.22i −0.959165 + 1.66132i
\(276\) −833.131 + 1443.02i −0.181698 + 0.314710i
\(277\) −697.434 1207.99i −0.151281 0.262026i 0.780418 0.625258i \(-0.215006\pi\)
−0.931698 + 0.363233i \(0.881673\pi\)
\(278\) −983.226 1703.00i −0.212122 0.367407i
\(279\) 2943.24 5097.83i 0.631566 1.09390i
\(280\) 873.791 1513.45i 0.186497 0.323021i
\(281\) 3834.53 6641.61i 0.814054 1.40998i −0.0959517 0.995386i \(-0.530589\pi\)
0.910005 0.414596i \(-0.136077\pi\)
\(282\) 1530.75 0.323244
\(283\) −1422.38 2463.64i −0.298770 0.517485i 0.677085 0.735905i \(-0.263243\pi\)
−0.975855 + 0.218420i \(0.929910\pi\)
\(284\) −1980.68 + 3430.63i −0.413843 + 0.716797i
\(285\) 1756.51 0.365075
\(286\) −2993.70 −0.618955
\(287\) 787.221 1363.51i 0.161910 0.280436i
\(288\) 592.941 0.121317
\(289\) −1961.52 3397.45i −0.399250 0.691522i
\(290\) −3885.14 −0.786700
\(291\) 1027.10 + 1778.99i 0.206906 + 0.358372i
\(292\) −1599.50 2770.41i −0.320560 0.555225i
\(293\) 506.246 + 876.845i 0.100939 + 0.174832i 0.912072 0.410030i \(-0.134482\pi\)
−0.811133 + 0.584862i \(0.801149\pi\)
\(294\) 483.023 836.620i 0.0958179 0.165962i
\(295\) −960.037 −0.189476
\(296\) −760.640 + 1631.94i −0.149363 + 0.320454i
\(297\) 8019.88 1.56687
\(298\) −939.077 + 1626.53i −0.182548 + 0.316182i
\(299\) 1769.93 + 3065.60i 0.342333 + 0.592938i
\(300\) 841.375 + 1457.30i 0.161923 + 0.280458i
\(301\) 1446.51 + 2505.44i 0.276996 + 0.479770i
\(302\) 4209.72 0.802126
\(303\) −2363.46 4093.63i −0.448109 0.776148i
\(304\) −588.163 −0.110965
\(305\) 5680.35 9838.65i 1.06641 1.84708i
\(306\) 3483.54 0.650786
\(307\) −1332.81 −0.247776 −0.123888 0.992296i \(-0.539536\pi\)
−0.123888 + 0.992296i \(0.539536\pi\)
\(308\) −1610.58 + 2789.60i −0.297958 + 0.516078i
\(309\) −1296.68 2245.91i −0.238723 0.413481i
\(310\) −10431.3 −1.91116
\(311\) −1636.64 + 2834.75i −0.298410 + 0.516861i −0.975772 0.218788i \(-0.929790\pi\)
0.677362 + 0.735650i \(0.263123\pi\)
\(312\) −287.923 + 498.697i −0.0522449 + 0.0904908i
\(313\) 4641.33 8039.02i 0.838158 1.45173i −0.0532753 0.998580i \(-0.516966\pi\)
0.891433 0.453152i \(-0.149701\pi\)
\(314\) −617.272 1069.15i −0.110938 0.192151i
\(315\) 2023.86 + 3505.42i 0.362004 + 0.627010i
\(316\) −217.063 + 375.965i −0.0386417 + 0.0669294i
\(317\) −3656.66 + 6333.52i −0.647881 + 1.12216i 0.335747 + 0.941952i \(0.391011\pi\)
−0.983628 + 0.180211i \(0.942322\pi\)
\(318\) −759.660 + 1315.77i −0.133961 + 0.232027i
\(319\) 7161.10 1.25688
\(320\) −525.370 909.968i −0.0917784 0.158965i
\(321\) −1498.09 + 2594.78i −0.260484 + 0.451172i
\(322\) 3808.80 0.659181
\(323\) −3455.46 −0.595254
\(324\) −229.267 + 397.101i −0.0393118 + 0.0680901i
\(325\) 3574.89 0.610151
\(326\) 51.8374 + 89.7850i 0.00880677 + 0.0152538i
\(327\) −3688.33 −0.623747
\(328\) −473.320 819.814i −0.0796790 0.138008i
\(329\) −1749.52 3030.26i −0.293174 0.507792i
\(330\) −2891.95 5009.01i −0.482415 0.835567i
\(331\) 1261.16 2184.40i 0.209426 0.362736i −0.742108 0.670280i \(-0.766174\pi\)
0.951534 + 0.307544i \(0.0995072\pi\)
\(332\) −226.818 −0.0374948
\(333\) −2392.56 3415.67i −0.393728 0.562095i
\(334\) −2078.99 −0.340590
\(335\) −2436.63 + 4220.37i −0.397395 + 0.688309i
\(336\) 309.798 + 536.586i 0.0503002 + 0.0871226i
\(337\) 3812.18 + 6602.88i 0.616209 + 1.06731i 0.990171 + 0.139861i \(0.0446657\pi\)
−0.373962 + 0.927444i \(0.622001\pi\)
\(338\) −1585.33 2745.87i −0.255120 0.441881i
\(339\) −1643.00 −0.263232
\(340\) −3086.56 5346.07i −0.492330 0.852740i
\(341\) 19227.0 3.05338
\(342\) 681.144 1179.78i 0.107696 0.186535i
\(343\) −6772.02 −1.06605
\(344\) 1739.44 0.272629
\(345\) −3419.55 + 5922.83i −0.533630 + 0.924274i
\(346\) 3093.82 + 5358.65i 0.480707 + 0.832610i
\(347\) 6531.69 1.01049 0.505244 0.862976i \(-0.331402\pi\)
0.505244 + 0.862976i \(0.331402\pi\)
\(348\) 688.728 1192.91i 0.106091 0.183755i
\(349\) −4498.94 + 7792.40i −0.690037 + 1.19518i 0.281788 + 0.959477i \(0.409072\pi\)
−0.971825 + 0.235703i \(0.924261\pi\)
\(350\) 1923.25 3331.16i 0.293720 0.508737i
\(351\) −1638.62 2838.17i −0.249182 0.431596i
\(352\) 968.365 + 1677.26i 0.146631 + 0.253972i
\(353\) −4064.62 + 7040.12i −0.612855 + 1.06150i 0.377902 + 0.925846i \(0.376646\pi\)
−0.990757 + 0.135650i \(0.956688\pi\)
\(354\) 170.188 294.774i 0.0255520 0.0442573i
\(355\) −8129.60 + 14080.9i −1.21542 + 2.10517i
\(356\) 5699.66 0.848543
\(357\) 1820.07 + 3152.45i 0.269827 + 0.467354i
\(358\) −1588.95 + 2752.15i −0.234577 + 0.406300i
\(359\) 9517.86 1.39926 0.699629 0.714507i \(-0.253349\pi\)
0.699629 + 0.714507i \(0.253349\pi\)
\(360\) 2433.70 0.356298
\(361\) 2753.85 4769.80i 0.401494 0.695407i
\(362\) 4757.68 0.690768
\(363\) 3393.57 + 5877.84i 0.490679 + 0.849881i
\(364\) 1316.29 0.189539
\(365\) −6565.06 11371.0i −0.941455 1.63065i
\(366\) 2013.94 + 3488.24i 0.287624 + 0.498179i
\(367\) −1507.72 2611.44i −0.214447 0.371434i 0.738654 0.674085i \(-0.235462\pi\)
−0.953101 + 0.302651i \(0.902128\pi\)
\(368\) 1145.03 1983.25i 0.162198 0.280935i
\(369\) 2192.58 0.309326
\(370\) −3122.01 + 6698.21i −0.438664 + 0.941145i
\(371\) 3472.92 0.485997
\(372\) 1849.18 3202.88i 0.257730 0.446402i
\(373\) −2067.73 3581.42i −0.287033 0.497155i 0.686067 0.727538i \(-0.259336\pi\)
−0.973100 + 0.230383i \(0.926002\pi\)
\(374\) 5689.15 + 9853.90i 0.786575 + 1.36239i
\(375\) 466.958 + 808.795i 0.0643030 + 0.111376i
\(376\) −2103.81 −0.288553
\(377\) −1463.15 2534.26i −0.199884 0.346209i
\(378\) −3526.23 −0.479814
\(379\) −5423.72 + 9394.16i −0.735086 + 1.27321i 0.219599 + 0.975590i \(0.429525\pi\)
−0.954685 + 0.297617i \(0.903808\pi\)
\(380\) −2414.09 −0.325895
\(381\) 2378.68 0.319851
\(382\) 3253.74 5635.64i 0.435800 0.754828i
\(383\) −5115.39 8860.12i −0.682466 1.18207i −0.974226 0.225574i \(-0.927574\pi\)
0.291760 0.956492i \(-0.405759\pi\)
\(384\) 372.535 0.0495074
\(385\) −6610.54 + 11449.8i −0.875076 + 1.51568i
\(386\) −4069.18 + 7048.02i −0.536569 + 0.929365i
\(387\) −2014.43 + 3489.09i −0.264597 + 0.458296i
\(388\) −1411.62 2444.99i −0.184701 0.319911i
\(389\) 5643.73 + 9775.23i 0.735600 + 1.27410i 0.954459 + 0.298341i \(0.0964331\pi\)
−0.218859 + 0.975756i \(0.570234\pi\)
\(390\) −1181.77 + 2046.88i −0.153439 + 0.265763i
\(391\) 6727.06 11651.6i 0.870081 1.50703i
\(392\) −663.852 + 1149.82i −0.0855346 + 0.148150i
\(393\) −2758.54 −0.354071
\(394\) −3476.52 6021.51i −0.444529 0.769947i
\(395\) −890.927 + 1543.13i −0.113487 + 0.196565i
\(396\) −4485.81 −0.569243
\(397\) −5616.17 −0.709994 −0.354997 0.934867i \(-0.615518\pi\)
−0.354997 + 0.934867i \(0.615518\pi\)
\(398\) 2872.30 4974.97i 0.361748 0.626565i
\(399\) 1423.53 0.178611
\(400\) −1156.36 2002.87i −0.144545 0.250359i
\(401\) −4291.70 −0.534457 −0.267229 0.963633i \(-0.586108\pi\)
−0.267229 + 0.963633i \(0.586108\pi\)
\(402\) −863.895 1496.31i −0.107182 0.185645i
\(403\) −3928.46 6804.29i −0.485585 0.841057i
\(404\) 3248.26 + 5626.15i 0.400017 + 0.692850i
\(405\) −941.014 + 1629.88i −0.115455 + 0.199974i
\(406\) −3148.64 −0.384887
\(407\) 5754.51 12346.2i 0.700837 1.50363i
\(408\) 2188.65 0.265574
\(409\) −5410.71 + 9371.62i −0.654138 + 1.13300i 0.327972 + 0.944688i \(0.393635\pi\)
−0.982109 + 0.188312i \(0.939698\pi\)
\(410\) −1942.72 3364.89i −0.234010 0.405317i
\(411\) 1269.00 + 2197.97i 0.152300 + 0.263791i
\(412\) 1782.12 + 3086.71i 0.213103 + 0.369106i
\(413\) −778.045 −0.0926999
\(414\) 2652.09 + 4593.55i 0.314838 + 0.545316i
\(415\) −930.966 −0.110119
\(416\) 395.712 685.393i 0.0466379 0.0807792i
\(417\) 2861.61 0.336052
\(418\) 4449.66 0.520669
\(419\) −1479.54 + 2562.63i −0.172506 + 0.298789i −0.939295 0.343110i \(-0.888520\pi\)
0.766789 + 0.641899i \(0.221853\pi\)
\(420\) 1271.55 + 2202.39i 0.147727 + 0.255871i
\(421\) −14707.4 −1.70260 −0.851300 0.524679i \(-0.824185\pi\)
−0.851300 + 0.524679i \(0.824185\pi\)
\(422\) −3868.60 + 6700.61i −0.446257 + 0.772940i
\(423\) 2436.40 4219.97i 0.280052 0.485064i
\(424\) 1044.05 1808.35i 0.119584 0.207126i
\(425\) −6793.63 11766.9i −0.775387 1.34301i
\(426\) −2882.31 4992.30i −0.327813 0.567788i
\(427\) 4603.53 7973.56i 0.521735 0.903671i
\(428\) 2058.93 3566.18i 0.232529 0.402752i
\(429\) 2178.24 3772.82i 0.245143 0.424600i
\(430\) 7139.47 0.800688
\(431\) −4649.37 8052.95i −0.519611 0.899993i −0.999740 0.0227951i \(-0.992743\pi\)
0.480129 0.877198i \(-0.340590\pi\)
\(432\) −1060.08 + 1836.11i −0.118063 + 0.204491i
\(433\) 5144.92 0.571014 0.285507 0.958377i \(-0.407838\pi\)
0.285507 + 0.958377i \(0.407838\pi\)
\(434\) −8453.87 −0.935020
\(435\) 2826.85 4896.25i 0.311580 0.539672i
\(436\) 5069.13 0.556806
\(437\) −2630.72 4556.53i −0.287973 0.498784i
\(438\) 4655.22 0.507842
\(439\) 697.221 + 1207.62i 0.0758008 + 0.131291i 0.901434 0.432916i \(-0.142515\pi\)
−0.825633 + 0.564207i \(0.809182\pi\)
\(440\) 3974.61 + 6884.23i 0.430641 + 0.745893i
\(441\) −1537.60 2663.20i −0.166029 0.287571i
\(442\) 2324.81 4026.69i 0.250181 0.433326i
\(443\) 8425.29 0.903606 0.451803 0.892118i \(-0.350781\pi\)
0.451803 + 0.892118i \(0.350781\pi\)
\(444\) −1503.21 2146.01i −0.160673 0.229381i
\(445\) 23394.0 2.49209
\(446\) 1194.79 2069.44i 0.126850 0.219711i
\(447\) −1366.56 2366.95i −0.144599 0.250454i
\(448\) −425.777 737.467i −0.0449019 0.0777724i
\(449\) −3965.40 6868.27i −0.416790 0.721901i 0.578825 0.815452i \(-0.303512\pi\)
−0.995614 + 0.0935509i \(0.970178\pi\)
\(450\) 5356.67 0.561146
\(451\) 3580.83 + 6202.18i 0.373868 + 0.647559i
\(452\) 2258.09 0.234981
\(453\) −3063.02 + 5305.30i −0.317689 + 0.550254i
\(454\) 10786.1 1.11502
\(455\) 5402.65 0.556660
\(456\) 427.951 741.233i 0.0439488 0.0761215i
\(457\) −6549.86 11344.7i −0.670437 1.16123i −0.977780 0.209632i \(-0.932773\pi\)
0.307344 0.951599i \(-0.400560\pi\)
\(458\) 2619.07 0.267208
\(459\) −6227.98 + 10787.2i −0.633328 + 1.09696i
\(460\) 4699.72 8140.15i 0.476360 0.825080i
\(461\) −1467.75 + 2542.22i −0.148286 + 0.256839i −0.930594 0.366053i \(-0.880709\pi\)
0.782308 + 0.622892i \(0.214042\pi\)
\(462\) −2343.73 4059.46i −0.236018 0.408795i
\(463\) 3095.03 + 5360.75i 0.310666 + 0.538089i 0.978507 0.206215i \(-0.0661146\pi\)
−0.667841 + 0.744304i \(0.732781\pi\)
\(464\) −946.565 + 1639.50i −0.0947052 + 0.164034i
\(465\) 7589.89 13146.1i 0.756931 1.31104i
\(466\) −4220.12 + 7309.46i −0.419513 + 0.726618i
\(467\) −18421.8 −1.82539 −0.912697 0.408636i \(-0.866004\pi\)
−0.912697 + 0.408636i \(0.866004\pi\)
\(468\) 916.539 + 1587.49i 0.0905278 + 0.156799i
\(469\) −1974.72 + 3420.32i −0.194423 + 0.336750i
\(470\) −8635.01 −0.847454
\(471\) 1796.53 0.175753
\(472\) −233.901 + 405.129i −0.0228097 + 0.0395075i
\(473\) −13159.5 −1.27923
\(474\) −315.874 547.109i −0.0306088 0.0530159i
\(475\) −5313.50 −0.513263
\(476\) −2501.44 4332.63i −0.240869 0.417197i
\(477\) 2418.21 + 4188.46i 0.232122 + 0.402047i
\(478\) 2464.17 + 4268.07i 0.235792 + 0.408404i
\(479\) 2941.83 5095.41i 0.280618 0.486044i −0.690919 0.722932i \(-0.742794\pi\)
0.971537 + 0.236888i \(0.0761274\pi\)
\(480\) 1529.05 0.145399
\(481\) −5544.97 + 486.091i −0.525632 + 0.0460787i
\(482\) −4273.75 −0.403867
\(483\) −2771.31 + 4800.05i −0.261075 + 0.452194i
\(484\) −4664.02 8078.32i −0.438018 0.758670i
\(485\) −5793.92 10035.4i −0.542450 0.939551i
\(486\) −3911.40 6774.75i −0.365072 0.632323i
\(487\) 17541.3 1.63218 0.816089 0.577926i \(-0.196138\pi\)
0.816089 + 0.577926i \(0.196138\pi\)
\(488\) −2767.89 4794.13i −0.256755 0.444713i
\(489\) −150.869 −0.0139520
\(490\) −2724.75 + 4719.41i −0.251207 + 0.435104i
\(491\) −2324.10 −0.213615 −0.106807 0.994280i \(-0.534063\pi\)
−0.106807 + 0.994280i \(0.534063\pi\)
\(492\) 1377.56 0.126230
\(493\) −5561.08 + 9632.08i −0.508030 + 0.879933i
\(494\) −909.152 1574.70i −0.0828030 0.143419i
\(495\) −18411.8 −1.67182
\(496\) −2541.46 + 4401.94i −0.230070 + 0.398494i
\(497\) −6588.48 + 11411.6i −0.594636 + 1.02994i
\(498\) 165.035 285.848i 0.0148502 0.0257212i
\(499\) −8608.03 14909.5i −0.772241 1.33756i −0.936332 0.351115i \(-0.885802\pi\)
0.164091 0.986445i \(-0.447531\pi\)
\(500\) −641.773 1111.58i −0.0574019 0.0994230i
\(501\) 1512.69 2620.05i 0.134894 0.233643i
\(502\) 5204.00 9013.59i 0.462681 0.801387i
\(503\) 8175.11 14159.7i 0.724672 1.25517i −0.234437 0.972131i \(-0.575325\pi\)
0.959109 0.283037i \(-0.0913420\pi\)
\(504\) 1972.35 0.174316
\(505\) 13332.3 + 23092.3i 1.17481 + 2.03484i
\(506\) −8662.54 + 15004.0i −0.761061 + 1.31820i
\(507\) 4613.98 0.404170
\(508\) −3269.18 −0.285524
\(509\) −3588.68 + 6215.77i −0.312505 + 0.541275i −0.978904 0.204320i \(-0.934502\pi\)
0.666399 + 0.745596i \(0.267835\pi\)
\(510\) 8983.20 0.779966
\(511\) −5320.53 9215.43i −0.460600 0.797782i
\(512\) −512.000 −0.0441942
\(513\) 2435.55 + 4218.49i 0.209614 + 0.363062i
\(514\) 5325.35 + 9223.78i 0.456987 + 0.791524i
\(515\) 7314.61 + 12669.3i 0.625865 + 1.08403i
\(516\) −1265.63 + 2192.14i −0.107977 + 0.187022i
\(517\) 15916.1 1.35394
\(518\) −2530.18 + 5428.45i −0.214613 + 0.460448i
\(519\) −9004.34 −0.761554
\(520\) 1624.18 2813.17i 0.136971 0.237241i
\(521\) 10956.0 + 18976.4i 0.921292 + 1.59572i 0.797419 + 0.603426i \(0.206198\pi\)
0.123873 + 0.992298i \(0.460468\pi\)
\(522\) −2192.41 3797.37i −0.183830 0.318403i
\(523\) −3172.40 5494.77i −0.265238 0.459406i 0.702388 0.711794i \(-0.252117\pi\)
−0.967626 + 0.252388i \(0.918784\pi\)
\(524\) 3791.24 0.316071
\(525\) 2798.74 + 4847.55i 0.232661 + 0.402980i
\(526\) 8326.36 0.690202
\(527\) −14931.1 + 25861.4i −1.23417 + 2.13765i
\(528\) −2818.36 −0.232298
\(529\) 8318.79 0.683718
\(530\) 4285.27 7422.30i 0.351208 0.608310i
\(531\) −541.756 938.350i −0.0442754 0.0766872i
\(532\) −1956.45 −0.159442
\(533\) 1463.27 2534.45i 0.118914 0.205965i
\(534\) −4147.11 + 7183.01i −0.336073 + 0.582096i
\(535\) 8450.81 14637.2i 0.682916 1.18285i
\(536\) 1187.31 + 2056.48i 0.0956791 + 0.165721i
\(537\) −2312.26 4004.96i −0.185813 0.321838i
\(538\) −4294.65 + 7438.55i −0.344155 + 0.596094i
\(539\) 5022.27 8698.83i 0.401344 0.695149i
\(540\) −4351.05 + 7536.25i −0.346740 + 0.600571i
\(541\) 6617.93 0.525928 0.262964 0.964806i \(-0.415300\pi\)
0.262964 + 0.964806i \(0.415300\pi\)
\(542\) −6249.83 10825.0i −0.495301 0.857887i
\(543\) −3461.72 + 5995.87i −0.273585 + 0.473863i
\(544\) −3008.01 −0.237072
\(545\) 20806.0 1.63529
\(546\) −957.741 + 1658.86i −0.0750687 + 0.130023i
\(547\) 8366.36 0.653967 0.326983 0.945030i \(-0.393968\pi\)
0.326983 + 0.945030i \(0.393968\pi\)
\(548\) −1744.07 3020.82i −0.135955 0.235480i
\(549\) 12821.9 0.996764
\(550\) 8748.27 + 15152.4i 0.678232 + 1.17473i
\(551\) 2174.74 + 3766.77i 0.168144 + 0.291234i
\(552\) 1666.26 + 2886.05i 0.128480 + 0.222533i
\(553\) −722.036 + 1250.60i −0.0555228 + 0.0961682i
\(554\) −2789.73 −0.213943
\(555\) −6169.84 8808.19i −0.471883 0.673670i
\(556\) −3932.90 −0.299986
\(557\) −8102.21 + 14033.4i −0.616341 + 1.06753i 0.373807 + 0.927507i \(0.378052\pi\)
−0.990148 + 0.140027i \(0.955281\pi\)
\(558\) −5886.47 10195.7i −0.446585 0.773507i
\(559\) 2688.74 + 4657.04i 0.203438 + 0.352365i
\(560\) −1747.58 3026.90i −0.131873 0.228411i
\(561\) −16557.9 −1.24612
\(562\) −7669.07 13283.2i −0.575623 0.997008i
\(563\) 12134.1 0.908332 0.454166 0.890917i \(-0.349937\pi\)
0.454166 + 0.890917i \(0.349937\pi\)
\(564\) 1530.75 2651.33i 0.114284 0.197946i
\(565\) 9268.22 0.690119
\(566\) −5689.53 −0.422525
\(567\) −762.628 + 1320.91i −0.0564857 + 0.0978360i
\(568\) 3961.35 + 6861.26i 0.292631 + 0.506852i
\(569\) 4207.57 0.310001 0.155000 0.987914i \(-0.450462\pi\)
0.155000 + 0.987914i \(0.450462\pi\)
\(570\) 1756.51 3042.36i 0.129074 0.223562i
\(571\) −7208.27 + 12485.1i −0.528295 + 0.915034i 0.471161 + 0.882047i \(0.343835\pi\)
−0.999456 + 0.0329866i \(0.989498\pi\)
\(572\) −2993.70 + 5185.24i −0.218834 + 0.379031i
\(573\) 4734.88 + 8201.05i 0.345205 + 0.597913i
\(574\) −1574.44 2727.01i −0.114488 0.198298i
\(575\) 10344.3 17916.8i 0.750236 1.29945i
\(576\) 592.941 1027.00i 0.0428922 0.0742914i
\(577\) −2976.55 + 5155.53i −0.214758 + 0.371972i −0.953198 0.302348i \(-0.902230\pi\)
0.738440 + 0.674319i \(0.235563\pi\)
\(578\) −7846.06 −0.564625
\(579\) −5921.53 10256.4i −0.425026 0.736167i
\(580\) −3885.14 + 6729.25i −0.278141 + 0.481754i
\(581\) −754.485 −0.0538749
\(582\) 4108.41 0.292610
\(583\) −7898.62 + 13680.8i −0.561111 + 0.971872i
\(584\) −6397.98 −0.453340
\(585\) 3761.89 + 6515.79i 0.265872 + 0.460504i
\(586\) 2024.99 0.142750
\(587\) 826.237 + 1431.08i 0.0580962 + 0.100626i 0.893611 0.448843i \(-0.148164\pi\)
−0.835515 + 0.549468i \(0.814830\pi\)
\(588\) −966.046 1673.24i −0.0677535 0.117353i
\(589\) 5839.03 + 10113.5i 0.408477 + 0.707503i
\(590\) −960.037 + 1662.83i −0.0669900 + 0.116030i
\(591\) 10118.2 0.704239
\(592\) 2065.96 + 2949.40i 0.143430 + 0.204763i
\(593\) 19299.3 1.33647 0.668237 0.743949i \(-0.267049\pi\)
0.668237 + 0.743949i \(0.267049\pi\)
\(594\) 8019.88 13890.8i 0.553973 0.959509i
\(595\) −10267.1 17783.1i −0.707410 1.22527i
\(596\) 1878.15 + 3253.06i 0.129081 + 0.223575i
\(597\) 4179.81 + 7239.65i 0.286547 + 0.496314i
\(598\) 7079.71 0.484132
\(599\) −10904.6 18887.4i −0.743826 1.28834i −0.950741 0.309985i \(-0.899676\pi\)
0.206916 0.978359i \(-0.433657\pi\)
\(600\) 3365.50 0.228993
\(601\) 7020.60 12160.0i 0.476500 0.825322i −0.523138 0.852248i \(-0.675239\pi\)
0.999637 + 0.0269263i \(0.00857194\pi\)
\(602\) 5786.05 0.391731
\(603\) −5500.04 −0.371441
\(604\) 4209.72 7291.44i 0.283594 0.491200i
\(605\) −19143.3 33157.1i −1.28642 2.22815i
\(606\) −9453.83 −0.633722
\(607\) −1399.45 + 2423.92i −0.0935783 + 0.162082i −0.909014 0.416765i \(-0.863164\pi\)
0.815436 + 0.578847i \(0.196497\pi\)
\(608\) −588.163 + 1018.73i −0.0392321 + 0.0679521i
\(609\) 2290.97 3968.08i 0.152438 0.264031i
\(610\) −11360.7 19677.3i −0.754067 1.30608i
\(611\) −3251.97 5632.57i −0.215320 0.372945i
\(612\) 3483.54 6033.66i 0.230088 0.398523i
\(613\) −2153.38 + 3729.77i −0.141883 + 0.245749i −0.928206 0.372067i \(-0.878649\pi\)
0.786323 + 0.617816i \(0.211982\pi\)
\(614\) −1332.81 + 2308.49i −0.0876022 + 0.151731i
\(615\) 5654.14 0.370727
\(616\) 3221.15 + 5579.20i 0.210688 + 0.364923i
\(617\) −5981.28 + 10359.9i −0.390271 + 0.675970i −0.992485 0.122365i \(-0.960952\pi\)
0.602214 + 0.798335i \(0.294285\pi\)
\(618\) −5186.72 −0.337606
\(619\) −4832.58 −0.313793 −0.156896 0.987615i \(-0.550149\pi\)
−0.156896 + 0.987615i \(0.550149\pi\)
\(620\) −10431.3 + 18067.6i −0.675696 + 1.17034i
\(621\) −18966.0 −1.22557
\(622\) 3273.29 + 5669.50i 0.211008 + 0.365476i
\(623\) 18959.2 1.21924
\(624\) 575.845 + 997.393i 0.0369427 + 0.0639867i
\(625\) 6399.93 + 11085.0i 0.409596 + 0.709441i
\(626\) −9282.66 16078.0i −0.592667 1.02653i
\(627\) −3237.60 + 5607.69i −0.206216 + 0.357176i
\(628\) −2469.09 −0.156891
\(629\) 12137.5 + 17327.8i 0.769403 + 1.09842i
\(630\) 8095.42 0.511951
\(631\) −2688.57 + 4656.74i −0.169620 + 0.293791i −0.938286 0.345859i \(-0.887587\pi\)
0.768666 + 0.639650i \(0.220921\pi\)
\(632\) 434.127 + 751.930i 0.0273238 + 0.0473262i
\(633\) −5629.64 9750.83i −0.353488 0.612260i
\(634\) 7313.31 + 12667.0i 0.458121 + 0.793489i
\(635\) −13418.2 −0.838560
\(636\) 1519.32 + 2631.54i 0.0947247 + 0.164068i
\(637\) −4104.59 −0.255306
\(638\) 7161.10 12403.4i 0.444374 0.769679i
\(639\) −18350.4 −1.13604
\(640\) −2101.48 −0.129794
\(641\) 10782.4 18675.6i 0.664397 1.15077i −0.315052 0.949074i \(-0.602022\pi\)
0.979448 0.201694i \(-0.0646448\pi\)
\(642\) 2996.19 + 5189.55i 0.184190 + 0.319027i
\(643\) 15722.2 0.964266 0.482133 0.876098i \(-0.339862\pi\)
0.482133 + 0.876098i \(0.339862\pi\)
\(644\) 3808.80 6597.04i 0.233056 0.403664i
\(645\) −5194.73 + 8997.53i −0.317120 + 0.549267i
\(646\) −3455.46 + 5985.04i −0.210454 + 0.364517i
\(647\) −2502.84 4335.05i −0.152082 0.263413i 0.779911 0.625890i \(-0.215264\pi\)
−0.931993 + 0.362477i \(0.881931\pi\)
\(648\) 458.533 + 794.203i 0.0277977 + 0.0481469i
\(649\) 1769.54 3064.94i 0.107027 0.185377i
\(650\) 3574.89 6191.88i 0.215721 0.373639i
\(651\) 6151.09 10654.0i 0.370323 0.641418i
\(652\) 207.350 0.0124547
\(653\) −14023.0 24288.5i −0.840371 1.45557i −0.889581 0.456777i \(-0.849004\pi\)
0.0492100 0.998788i \(-0.484330\pi\)
\(654\) −3688.33 + 6388.38i −0.220528 + 0.381966i
\(655\) 15561.0 0.928273
\(656\) −1893.28 −0.112683
\(657\) 7409.43 12833.5i 0.439984 0.762074i
\(658\) −6998.09 −0.414611
\(659\) 213.729 + 370.190i 0.0126338 + 0.0218825i 0.872273 0.489019i \(-0.162645\pi\)
−0.859639 + 0.510901i \(0.829312\pi\)
\(660\) −11567.8 −0.682237
\(661\) −11811.7 20458.5i −0.695042 1.20385i −0.970167 0.242439i \(-0.922053\pi\)
0.275125 0.961408i \(-0.411281\pi\)
\(662\) −2522.33 4368.80i −0.148086 0.256493i
\(663\) 3383.10 + 5859.70i 0.198173 + 0.343245i
\(664\) −226.818 + 392.861i −0.0132564 + 0.0229608i
\(665\) −8030.18 −0.468266
\(666\) −8308.68 + 728.367i −0.483415 + 0.0423779i
\(667\) −16935.1 −0.983101
\(668\) −2078.99 + 3600.91i −0.120417 + 0.208568i
\(669\) 1738.68 + 3011.48i 0.100480 + 0.174037i
\(670\) 4873.26 + 8440.74i 0.281001 + 0.486708i
\(671\) 20940.1 + 36269.3i 1.20474 + 2.08668i
\(672\) 1239.19 0.0711353
\(673\) 3667.47 + 6352.25i 0.210060 + 0.363835i 0.951733 0.306926i \(-0.0993006\pi\)
−0.741673 + 0.670762i \(0.765967\pi\)
\(674\) 15248.7 0.871451
\(675\) −9576.83 + 16587.6i −0.546093 + 0.945860i
\(676\) −6341.31 −0.360794
\(677\) −5311.75 −0.301547 −0.150773 0.988568i \(-0.548176\pi\)
−0.150773 + 0.988568i \(0.548176\pi\)
\(678\) −1643.00 + 2845.76i −0.0930664 + 0.161196i
\(679\) −4695.57 8132.97i −0.265390 0.459668i
\(680\) −12346.2 −0.696259
\(681\) −7848.06 + 13593.2i −0.441613 + 0.764896i
\(682\) 19227.0 33302.2i 1.07953 1.86981i
\(683\) 9684.36 16773.8i 0.542550 0.939724i −0.456207 0.889874i \(-0.650792\pi\)
0.998757 0.0498505i \(-0.0158745\pi\)
\(684\) −1362.29 2359.55i −0.0761526 0.131900i
\(685\) −7158.47 12398.8i −0.399286 0.691584i
\(686\) −6772.02 + 11729.5i −0.376905 + 0.652819i
\(687\) −1905.65 + 3300.69i −0.105830 + 0.183303i
\(688\) 1739.44 3012.81i 0.0963891 0.166951i
\(689\) 6455.37 0.356938
\(690\) 6839.10 + 11845.7i 0.377333 + 0.653560i
\(691\) 8874.76 15371.5i 0.488585 0.846253i −0.511329 0.859385i \(-0.670847\pi\)
0.999914 + 0.0131316i \(0.00418005\pi\)
\(692\) 12375.3 0.679823
\(693\) −14921.5 −0.817924
\(694\) 6531.69 11313.2i 0.357262 0.618796i
\(695\) −16142.4 −0.881032
\(696\) −1377.46 2385.82i −0.0750177 0.129934i
\(697\) −11123.0 −0.604469
\(698\) 8997.89 + 15584.8i 0.487930 + 0.845119i
\(699\) −6141.17 10636.8i −0.332304 0.575567i
\(700\) −3846.50 6662.32i −0.207691 0.359732i
\(701\) 15426.6 26719.7i 0.831176 1.43964i −0.0659297 0.997824i \(-0.521001\pi\)
0.897106 0.441815i \(-0.145665\pi\)
\(702\) −6554.48 −0.352397
\(703\) 8241.72 722.497i 0.442165 0.0387617i
\(704\) 3873.46 0.207367
\(705\) 6282.89 10882.3i 0.335642 0.581348i
\(706\) 8129.23 + 14080.2i 0.433354 + 0.750591i
\(707\) 10805.0 + 18714.7i 0.574770 + 0.995530i
\(708\) −340.376 589.549i −0.0180680 0.0312946i
\(709\) 2394.66 0.126846 0.0634228 0.997987i \(-0.479798\pi\)
0.0634228 + 0.997987i \(0.479798\pi\)
\(710\) 16259.2 + 28161.7i 0.859432 + 1.48858i
\(711\) −2011.03 −0.106075
\(712\) 5699.66 9872.10i 0.300005 0.519624i
\(713\) −45469.5 −2.38828
\(714\) 7280.27 0.381593
\(715\) −12287.5 + 21282.6i −0.642695 + 1.11318i
\(716\) 3177.90 + 5504.29i 0.165871 + 0.287298i
\(717\) −7171.79 −0.373550
\(718\) 9517.86 16485.4i 0.494712 0.856867i
\(719\) −12366.9 + 21420.0i −0.641455 + 1.11103i 0.343653 + 0.939097i \(0.388336\pi\)
−0.985108 + 0.171936i \(0.944998\pi\)
\(720\) 2433.70 4215.29i 0.125970 0.218187i
\(721\) 5928.00 + 10267.6i 0.306200 + 0.530354i
\(722\) −5507.69 9539.60i −0.283899 0.491727i
\(723\) 3109.61 5386.00i 0.159955 0.277050i
\(724\) 4757.68 8240.54i 0.244223 0.423007i
\(725\) −8551.33 + 14811.3i −0.438053 + 0.758730i
\(726\) 13574.3 0.693925
\(727\) 5572.65 + 9652.11i 0.284289 + 0.492403i 0.972436 0.233168i \(-0.0749092\pi\)
−0.688148 + 0.725571i \(0.741576\pi\)
\(728\) 1316.29 2279.88i 0.0670122 0.116069i
\(729\) 8288.76 0.421112
\(730\) −26260.2 −1.33142
\(731\) 10219.3 17700.3i 0.517062 0.895578i
\(732\) 8055.75 0.406761
\(733\) 10203.7 + 17673.3i 0.514164 + 0.890559i 0.999865 + 0.0164337i \(0.00523125\pi\)
−0.485700 + 0.874125i \(0.661435\pi\)
\(734\) −6030.87 −0.303274
\(735\) −3965.09 6867.74i −0.198986 0.344654i
\(736\) −2290.06 3966.50i −0.114691 0.198651i
\(737\) −8982.42 15558.0i −0.448944 0.777594i
\(738\) 2192.58 3797.67i 0.109363 0.189423i
\(739\) 602.373 0.0299847 0.0149923 0.999888i \(-0.495228\pi\)
0.0149923 + 0.999888i \(0.495228\pi\)
\(740\) 8479.63 + 12105.7i 0.421240 + 0.601371i
\(741\) 2646.02 0.131180
\(742\) 3472.92 6015.27i 0.171826 0.297611i
\(743\) 10783.3 + 18677.3i 0.532440 + 0.922213i 0.999283 + 0.0378723i \(0.0120580\pi\)
−0.466843 + 0.884340i \(0.654609\pi\)
\(744\) −3698.37 6405.76i −0.182243 0.315654i
\(745\) 7708.80 + 13352.0i 0.379099 + 0.656619i
\(746\) −8270.94 −0.405926
\(747\) −525.351 909.935i −0.0257317 0.0445687i
\(748\) 22756.6 1.11239
\(749\) 6848.80 11862.5i 0.334112 0.578699i
\(750\) 1867.83 0.0909381
\(751\) 12502.8 0.607502 0.303751 0.952751i \(-0.401761\pi\)
0.303751 + 0.952751i \(0.401761\pi\)
\(752\) −2103.81 + 3643.91i −0.102019 + 0.176702i
\(753\) 7572.93 + 13116.7i 0.366498 + 0.634793i
\(754\) −5852.61 −0.282678
\(755\) 17278.6 29927.4i 0.832891 1.44261i
\(756\) −3526.23 + 6107.61i −0.169640 + 0.293825i
\(757\) −13816.8 + 23931.3i −0.663380 + 1.14901i 0.316341 + 0.948645i \(0.397546\pi\)
−0.979722 + 0.200363i \(0.935788\pi\)
\(758\) 10847.4 + 18788.3i 0.519785 + 0.900293i
\(759\) −12605.9 21834.0i −0.602850 1.04417i
\(760\) −2414.09 + 4181.32i −0.115221 + 0.199569i
\(761\) −16364.5 + 28344.2i −0.779519 + 1.35017i 0.152700 + 0.988273i \(0.451203\pi\)
−0.932219 + 0.361895i \(0.882130\pi\)
\(762\) 2378.68 4119.99i 0.113085 0.195868i
\(763\) 16861.9 0.800053
\(764\) −6507.47 11271.3i −0.308157 0.533744i
\(765\) 14298.0 24764.9i 0.675746 1.17043i
\(766\) −20461.6 −0.965153
\(767\) −1446.21 −0.0680830
\(768\) 372.535 645.249i 0.0175035 0.0303170i
\(769\) −10486.8 −0.491759 −0.245880 0.969300i \(-0.579077\pi\)
−0.245880 + 0.969300i \(0.579077\pi\)
\(770\) 13221.1 + 22899.6i 0.618772 + 1.07174i
\(771\) −15499.0 −0.723975
\(772\) 8138.36 + 14096.0i 0.379412 + 0.657161i
\(773\) 14059.1 + 24351.0i 0.654165 + 1.13305i 0.982102 + 0.188347i \(0.0603131\pi\)
−0.327938 + 0.944699i \(0.606354\pi\)
\(774\) 4028.86 + 6978.19i 0.187099 + 0.324064i
\(775\) −22959.7 + 39767.4i −1.06418 + 1.84321i
\(776\) −5646.46 −0.261206
\(777\) −5000.23 7138.44i −0.230865 0.329588i
\(778\) 22574.9 1.04030
\(779\) −2174.91 + 3767.06i −0.100031 + 0.173259i
\(780\) 2363.53 + 4093.76i 0.108497 + 0.187923i
\(781\) −29969.0 51907.8i −1.37308 2.37824i
\(782\) −13454.1 23303.2i −0.615240 1.06563i
\(783\) 15678.7 0.715594
\(784\) 1327.70 + 2299.65i 0.0604821 + 0.104758i
\(785\) −10134.3 −0.460774
\(786\) −2758.54 + 4777.92i −0.125183 + 0.216823i
\(787\) 1767.35 0.0800497 0.0400249 0.999199i \(-0.487256\pi\)
0.0400249 + 0.999199i \(0.487256\pi\)
\(788\) −13906.1 −0.628659
\(789\) −6058.32 + 10493.3i −0.273361 + 0.473475i
\(790\) 1781.85 + 3086.26i 0.0802475 + 0.138993i
\(791\) 7511.26 0.337636
\(792\) −4485.81 + 7769.65i −0.201258 + 0.348589i
\(793\) 8556.94 14821.1i 0.383185 0.663696i
\(794\) −5616.17 + 9727.50i −0.251021 + 0.434781i
\(795\) 6235.98 + 10801.0i 0.278198 + 0.481853i
\(796\) −5744.61 9949.95i −0.255794 0.443048i
\(797\) −1575.72 + 2729.24i −0.0700314 + 0.121298i −0.898915 0.438123i \(-0.855643\pi\)
0.828883 + 0.559421i \(0.188977\pi\)
\(798\) 1423.53 2465.62i 0.0631483 0.109376i
\(799\) −12359.9 + 21408.0i −0.547262 + 0.947886i
\(800\) −4625.44 −0.204417
\(801\) 13201.4 + 22865.5i 0.582334 + 1.00863i
\(802\) −4291.70 + 7433.45i −0.188959 + 0.327287i
\(803\) 48403.0 2.12715
\(804\) −3455.58 −0.151578
\(805\) 15633.1 27077.3i 0.684464 1.18553i
\(806\) −15713.8 −0.686720
\(807\) −6249.63 10824.7i −0.272611 0.472177i
\(808\) 12993.0 0.565710
\(809\) −1501.83 2601.25i −0.0652678 0.113047i 0.831545 0.555457i \(-0.187457\pi\)
−0.896813 + 0.442410i \(0.854124\pi\)
\(810\) 1882.03 + 3259.77i 0.0816392 + 0.141403i
\(811\) 5509.98 + 9543.56i 0.238571 + 0.413218i 0.960305 0.278954i \(-0.0899875\pi\)
−0.721733 + 0.692171i \(0.756654\pi\)
\(812\) −3148.64 + 5453.60i −0.136078 + 0.235694i
\(813\) 18189.7 0.784674
\(814\) −15629.7 22313.3i −0.672998 0.960786i
\(815\) 851.057 0.0365782
\(816\) 2188.65 3790.84i 0.0938945 0.162630i
\(817\) −3996.39 6921.95i −0.171133 0.296412i
\(818\) 10821.4 + 18743.2i 0.462545 + 0.801152i
\(819\) 3048.76 + 5280.60i 0.130076 + 0.225298i
\(820\) −7770.88 −0.330940
\(821\) −8490.58 14706.1i −0.360930 0.625148i 0.627184 0.778871i \(-0.284207\pi\)
−0.988114 + 0.153722i \(0.950874\pi\)
\(822\) 5076.00 0.215384
\(823\) −14754.5 + 25555.6i −0.624922 + 1.08240i 0.363634 + 0.931542i \(0.381536\pi\)
−0.988556 + 0.150855i \(0.951797\pi\)
\(824\) 7128.46 0.301373
\(825\) −25461.2 −1.07448
\(826\) −778.045 + 1347.61i −0.0327744 + 0.0567669i
\(827\) 11615.4 + 20118.5i 0.488402 + 0.845938i 0.999911 0.0133405i \(-0.00424655\pi\)
−0.511509 + 0.859278i \(0.670913\pi\)
\(828\) 10608.4 0.445249
\(829\) 16588.2 28731.7i 0.694974 1.20373i −0.275216 0.961383i \(-0.588749\pi\)
0.970190 0.242348i \(-0.0779174\pi\)
\(830\) −930.966 + 1612.48i −0.0389329 + 0.0674338i
\(831\) 2029.83 3515.77i 0.0847341 0.146764i
\(832\) −791.424 1370.79i −0.0329780 0.0571195i
\(833\) 7800.27 + 13510.5i 0.324446 + 0.561957i
\(834\) 2861.61 4956.45i 0.118812 0.205789i
\(835\) −8533.12 + 14779.8i −0.353654 + 0.612546i
\(836\) 4449.66 7707.03i 0.184084 0.318844i
\(837\) 42096.1 1.73842
\(838\) 2959.07 + 5125.26i 0.121980 + 0.211276i
\(839\) −2589.11 + 4484.47i −0.106539 + 0.184531i −0.914366 0.404889i \(-0.867310\pi\)
0.807827 + 0.589420i \(0.200643\pi\)
\(840\) 5086.21 0.208918
\(841\) −10389.2 −0.425980
\(842\) −14707.4 + 25474.0i −0.601960 + 1.04263i
\(843\) 22320.3 0.911923
\(844\) 7737.20 + 13401.2i 0.315552 + 0.546551i
\(845\) −26027.6 −1.05962
\(846\) −4872.80 8439.94i −0.198026 0.342992i
\(847\) −15514.3 26871.6i −0.629372 1.09010i
\(848\) −2088.10 3616.70i −0.0845587 0.146460i
\(849\) 4139.74 7170.25i 0.167345 0.289850i
\(850\) −27174.5 −1.09656
\(851\) −13608.7 + 29197.1i −0.548178 + 1.17610i
\(852\) −11529.2 −0.463597
\(853\) 3717.94 6439.66i 0.149238 0.258487i −0.781708 0.623644i \(-0.785651\pi\)
0.930946 + 0.365157i \(0.118985\pi\)
\(854\) −9207.07 15947.1i −0.368922 0.638992i
\(855\) −5591.45 9684.68i −0.223653 0.387379i
\(856\) −4117.87 7132.36i −0.164423 0.284788i
\(857\) −20772.0 −0.827956 −0.413978 0.910287i \(-0.635861\pi\)
−0.413978 + 0.910287i \(0.635861\pi\)
\(858\) −4356.47 7545.63i −0.173342 0.300237i
\(859\) −31655.7 −1.25737 −0.628684 0.777661i \(-0.716406\pi\)
−0.628684 + 0.777661i \(0.716406\pi\)
\(860\) 7139.47 12365.9i 0.283086 0.490319i
\(861\) 4582.30 0.181376
\(862\) −18597.5 −0.734841
\(863\) 6956.22 12048.5i 0.274383 0.475245i −0.695596 0.718433i \(-0.744860\pi\)
0.969979 + 0.243188i \(0.0781931\pi\)
\(864\) 2120.16 + 3672.23i 0.0834830 + 0.144597i
\(865\) 50793.8 1.99658
\(866\) 5144.92 8911.26i 0.201884 0.349673i
\(867\) 5708.85 9888.02i 0.223625 0.387330i
\(868\) −8453.87 + 14642.5i −0.330579 + 0.572580i
\(869\) −3284.32 5688.61i −0.128208 0.222063i
\(870\) −5653.70 9792.50i −0.220320 0.381606i
\(871\) −3670.57 + 6357.61i −0.142793 + 0.247324i
\(872\) 5069.13 8779.99i 0.196861 0.340972i
\(873\) 6539.10 11326.1i 0.253511 0.439094i
\(874\) −10522.9 −0.407255
\(875\) −2134.78 3697.55i −0.0824786 0.142857i
\(876\) 4655.22 8063.07i 0.179549 0.310988i
\(877\) −12863.3 −0.495284 −0.247642 0.968852i \(-0.579656\pi\)
−0.247642 + 0.968852i \(0.579656\pi\)
\(878\) 2788.89 0.107199
\(879\) −1473.39 + 2551.99i −0.0565373 + 0.0979256i
\(880\) 15898.4 0.609019
\(881\) −12909.5 22359.9i −0.493680 0.855078i 0.506294 0.862361i \(-0.331015\pi\)
−0.999973 + 0.00728277i \(0.997682\pi\)
\(882\) −6150.39 −0.234801
\(883\) −14614.0 25312.2i −0.556965 0.964692i −0.997748 0.0670780i \(-0.978632\pi\)
0.440783 0.897614i \(-0.354701\pi\)
\(884\) −4649.62 8053.38i −0.176905 0.306408i
\(885\) −1397.06 2419.78i −0.0530640 0.0919095i
\(886\) 8425.29 14593.0i 0.319473 0.553343i
\(887\) −47021.4 −1.77996 −0.889980 0.455999i \(-0.849282\pi\)
−0.889980 + 0.455999i \(0.849282\pi\)
\(888\) −5220.20 + 457.621i −0.197273 + 0.0172936i
\(889\) −10874.5 −0.410259
\(890\) 23394.0 40519.6i 0.881089 1.52609i
\(891\) −3468.96 6008.42i −0.130432 0.225914i
\(892\) −2389.59 4138.88i −0.0896965 0.155359i
\(893\) 4833.53 + 8371.92i 0.181129 + 0.313724i
\(894\) −5466.23 −0.204495
\(895\) 13043.6 + 22592.1i 0.487149 + 0.843767i
\(896\) −1703.11 −0.0635009
\(897\) −5151.25 + 8922.22i −0.191745 + 0.332112i
\(898\) −15861.6 −0.589430
\(899\) 37588.4 1.39449
\(900\) 5356.67 9278.02i 0.198395 0.343630i
\(901\) −12267.6 21248.2i −0.453601 0.785659i
\(902\) 14323.3 0.528730
\(903\) −4209.97 + 7291.89i −0.155149 + 0.268725i
\(904\) 2258.09 3911.12i 0.0830784 0.143896i
\(905\) 19527.7 33822.9i 0.717262 1.24233i
\(906\) 6126.04 + 10610.6i 0.224640 + 0.389088i
\(907\) −5033.11 8717.61i −0.184258 0.319144i 0.759068 0.651011i \(-0.225655\pi\)
−0.943326 + 0.331867i \(0.892321\pi\)
\(908\) 10786.1 18682.1i 0.394218 0.682806i
\(909\) −15047.1 + 26062.3i −0.549043 + 0.950971i
\(910\) 5402.65 9357.66i 0.196809 0.340883i
\(911\) −44601.3 −1.62207 −0.811036 0.584996i \(-0.801096\pi\)
−0.811036 + 0.584996i \(0.801096\pi\)
\(912\) −855.902 1482.47i −0.0310765 0.0538261i
\(913\) 1715.96 2972.13i 0.0622015 0.107736i
\(914\) −26199.4 −0.948141
\(915\) 33064.5 1.19462
\(916\) 2619.07 4536.36i 0.0944722 0.163631i
\(917\) 12611.1 0.454151
\(918\) 12456.0 + 21574.4i 0.447830 + 0.775665i
\(919\) 34609.0 1.24227 0.621134 0.783704i \(-0.286672\pi\)
0.621134 + 0.783704i \(0.286672\pi\)
\(920\) −9399.44 16280.3i −0.336837 0.583419i
\(921\) −1939.52 3359.35i −0.0693913 0.120189i
\(922\) 2935.50 + 5084.44i 0.104854 + 0.181613i
\(923\) −12246.5 + 21211.6i −0.436727 + 0.756433i
\(924\) −9374.93 −0.333780
\(925\) 18664.0 + 26645.1i 0.663425 + 0.947120i
\(926\) 12380.1 0.439348
\(927\) −8255.39 + 14298.8i −0.292495 + 0.506616i
\(928\) 1893.13 + 3279.00i 0.0669667 + 0.115990i
\(929\) −8241.12 14274.0i −0.291047 0.504107i 0.683011 0.730408i \(-0.260670\pi\)
−0.974057 + 0.226301i \(0.927337\pi\)
\(930\) −15179.8 26292.2i −0.535231 0.927047i
\(931\) 6100.82 0.214765
\(932\) 8440.24 + 14618.9i 0.296641 + 0.513797i
\(933\) −9526.66 −0.334286
\(934\) −18421.8 + 31907.5i −0.645374 + 1.11782i
\(935\) 93403.5 3.26698
\(936\) 3666.15 0.128026
\(937\) 15512.5 26868.4i 0.540844 0.936770i −0.458011 0.888946i \(-0.651438\pi\)
0.998856 0.0478237i \(-0.0152286\pi\)
\(938\) 3949.45 + 6840.65i 0.137478 + 0.238118i
\(939\) 27016.5 0.938925
\(940\) −8635.01 + 14956.3i −0.299620 + 0.518957i
\(941\) 10491.0 18170.9i 0.363438 0.629494i −0.625086 0.780556i \(-0.714936\pi\)
0.988524 + 0.151062i \(0.0482694\pi\)
\(942\) 1796.53 3111.67i 0.0621380 0.107626i
\(943\) −8468.20 14667.3i −0.292431 0.506505i
\(944\) 467.802 + 810.257i 0.0161289 + 0.0279360i
\(945\) −14473.3 + 25068.4i −0.498217 + 0.862938i
\(946\) −13159.5 + 22792.9i −0.452275 + 0.783364i
\(947\) 2163.90 3747.99i 0.0742528 0.128610i −0.826508 0.562925i \(-0.809676\pi\)
0.900761 + 0.434315i \(0.143009\pi\)
\(948\) −1263.49 −0.0432873
\(949\) −9889.68 17129.4i −0.338285 0.585927i
\(950\) −5313.50 + 9203.25i −0.181466 + 0.314308i
\(951\) −21284.9 −0.725772
\(952\) −10005.8 −0.340640
\(953\) 2641.41 4575.06i 0.0897835 0.155510i −0.817636 0.575735i \(-0.804716\pi\)
0.907420 + 0.420226i \(0.138049\pi\)
\(954\) 9672.84 0.328270
\(955\) −26709.6 46262.4i −0.905030 1.56756i
\(956\) 9856.69 0.333460
\(957\) 10420.9 + 18049.6i 0.351997 + 0.609676i
\(958\) −5883.67 10190.8i −0.198427 0.343685i
\(959\) −5801.45 10048.4i −0.195348 0.338352i
\(960\) 1529.05 2648.40i 0.0514062 0.0890382i
\(961\) 71131.2 2.38767
\(962\) −4703.04 + 10090.3i −0.157622 + 0.338174i
\(963\) 19075.4 0.638314
\(964\) −4273.75 + 7402.35i −0.142789 + 0.247317i
\(965\) 33403.5 + 57856.6i 1.11430 + 1.93002i
\(966\) 5542.62 + 9600.10i 0.184608 + 0.319750i
\(967\) −3895.68 6747.52i −0.129552 0.224391i 0.793951 0.607982i \(-0.208021\pi\)
−0.923503 + 0.383591i \(0.874687\pi\)
\(968\) −18656.1 −0.619452
\(969\) −5028.44 8709.51i −0.166704 0.288741i
\(970\) −23175.7 −0.767140
\(971\) 20363.0 35269.7i 0.672997 1.16566i −0.304054 0.952655i \(-0.598340\pi\)
0.977050 0.213009i \(-0.0683265\pi\)
\(972\) −15645.6 −0.516289
\(973\) −13082.3 −0.431039
\(974\) 17541.3 30382.4i 0.577062 0.999501i
\(975\) 5202.22 + 9010.51i 0.170876 + 0.295967i
\(976\) −11071.6 −0.363107
\(977\) 21320.1 36927.5i 0.698148 1.20923i −0.270960 0.962591i \(-0.587341\pi\)
0.969108 0.246637i \(-0.0793255\pi\)
\(978\) −150.869 + 261.313i −0.00493278 + 0.00854382i
\(979\) −43119.9 + 74685.9i −1.40768 + 2.43817i
\(980\) 5449.50 + 9438.81i 0.177631 + 0.307665i
\(981\) 11741.0 + 20336.0i 0.382122 + 0.661854i
\(982\) −2324.10 + 4025.45i −0.0755243 + 0.130812i
\(983\) −13801.2 + 23904.3i −0.447801 + 0.775615i −0.998243 0.0592590i \(-0.981126\pi\)
0.550441 + 0.834874i \(0.314460\pi\)
\(984\) 1377.56 2386.01i 0.0446291 0.0773000i
\(985\) −57076.9 −1.84632
\(986\) 11122.2 + 19264.2i 0.359231 + 0.622207i
\(987\) 5091.85 8819.35i 0.164210 0.284421i
\(988\) −3636.61 −0.117101
\(989\) 31120.5 1.00058
\(990\) −18411.8 + 31890.2i −0.591076 + 1.02377i
\(991\) −41118.5 −1.31803 −0.659017 0.752128i \(-0.729028\pi\)
−0.659017 + 0.752128i \(0.729028\pi\)
\(992\) 5082.92 + 8803.88i 0.162684 + 0.281778i
\(993\) 7341.06 0.234604
\(994\) 13177.0 + 22823.2i 0.420471 + 0.728277i
\(995\) −23578.5 40839.1i −0.751244 1.30119i
\(996\) −330.069 571.697i −0.0105006 0.0181877i
\(997\) −16478.5 + 28541.6i −0.523450 + 0.906642i 0.476177 + 0.879349i \(0.342022\pi\)
−0.999627 + 0.0272929i \(0.991311\pi\)
\(998\) −34432.1 −1.09211
\(999\) 12599.1 27031.0i 0.399016 0.856079i
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 74.4.c.a.47.3 8
3.2 odd 2 666.4.f.a.343.4 8
37.26 even 3 inner 74.4.c.a.63.3 yes 8
111.26 odd 6 666.4.f.a.433.4 8
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
74.4.c.a.47.3 8 1.1 even 1 trivial
74.4.c.a.63.3 yes 8 37.26 even 3 inner
666.4.f.a.343.4 8 3.2 odd 2
666.4.f.a.433.4 8 111.26 odd 6