Properties

Label 74.4.c.b.63.2
Level $74$
Weight $4$
Character 74.63
Analytic conductor $4.366$
Analytic rank $0$
Dimension $10$
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: \(10\)
Relative dimension: \(5\) over \(\Q(\zeta_{3})\)
Coefficient field: \(\mathbb{Q}[x]/(x^{10} + \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{10} + 84 x^{8} - 140 x^{7} + 6309 x^{6} - 5214 x^{5} + 67648 x^{4} + 164178 x^{3} + 511389 x^{2} + \cdots + 443556 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 2^{4}\cdot 3 \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{3}]$

Embedding invariants

Embedding label 63.2
Root \(-0.858393 + 1.48678i\) of defining polynomial
Character \(\chi\) \(=\) 74.63
Dual form 74.4.c.b.47.2

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-1.00000 - 1.73205i) q^{2} +(-1.35839 + 2.35281i) q^{3} +(-2.00000 + 3.46410i) q^{4} +(0.388081 - 0.672176i) q^{5} +5.43357 q^{6} +(11.9492 - 20.6965i) q^{7} +8.00000 q^{8} +(9.80954 + 16.9906i) q^{9} +O(q^{10})\) \(q+(-1.00000 - 1.73205i) q^{2} +(-1.35839 + 2.35281i) q^{3} +(-2.00000 + 3.46410i) q^{4} +(0.388081 - 0.672176i) q^{5} +5.43357 q^{6} +(11.9492 - 20.6965i) q^{7} +8.00000 q^{8} +(9.80954 + 16.9906i) q^{9} -1.55232 q^{10} +52.4685 q^{11} +(-5.43357 - 9.41122i) q^{12} +(34.3127 - 59.4314i) q^{13} -47.7966 q^{14} +(1.05433 + 1.82616i) q^{15} +(-8.00000 - 13.8564i) q^{16} +(-44.7302 - 77.4750i) q^{17} +(19.6191 - 33.9812i) q^{18} +(-47.2533 + 81.8450i) q^{19} +(1.55232 + 2.68870i) q^{20} +(32.4633 + 56.2281i) q^{21} +(-52.4685 - 90.8782i) q^{22} +135.523 q^{23} +(-10.8671 + 18.8224i) q^{24} +(62.1988 + 107.731i) q^{25} -137.251 q^{26} -126.654 q^{27} +(47.7966 + 82.7862i) q^{28} +172.177 q^{29} +(2.10867 - 3.65232i) q^{30} -286.679 q^{31} +(-16.0000 + 27.7128i) q^{32} +(-71.2729 + 123.448i) q^{33} +(-89.4604 + 154.950i) q^{34} +(-9.27448 - 16.0639i) q^{35} -78.4763 q^{36} +(184.044 + 129.541i) q^{37} +189.013 q^{38} +(93.2203 + 161.462i) q^{39} +(3.10465 - 5.37741i) q^{40} +(80.2235 - 138.951i) q^{41} +(64.9266 - 112.456i) q^{42} -459.761 q^{43} +(-104.937 + 181.756i) q^{44} +15.2276 q^{45} +(-135.523 - 234.733i) q^{46} -57.4596 q^{47} +43.4686 q^{48} +(-114.065 - 197.566i) q^{49} +(124.398 - 215.463i) q^{50} +243.045 q^{51} +(137.251 + 237.726i) q^{52} +(-153.743 - 266.290i) q^{53} +(126.654 + 219.371i) q^{54} +(20.3620 - 35.2681i) q^{55} +(95.5932 - 165.572i) q^{56} +(-128.377 - 222.355i) q^{57} +(-172.177 - 298.219i) q^{58} +(-93.4414 - 161.845i) q^{59} -8.43466 q^{60} +(266.755 - 462.034i) q^{61} +(286.679 + 496.542i) q^{62} +468.863 q^{63} +64.0000 q^{64} +(-26.6322 - 46.1284i) q^{65} +285.091 q^{66} +(-92.1029 + 159.527i) q^{67} +357.841 q^{68} +(-184.094 + 318.860i) q^{69} +(-18.5490 + 32.1277i) q^{70} +(-98.9525 + 171.391i) q^{71} +(78.4763 + 135.925i) q^{72} +62.7530 q^{73} +(40.3269 - 448.314i) q^{74} -337.962 q^{75} +(-189.013 - 327.380i) q^{76} +(626.955 - 1085.92i) q^{77} +(186.441 - 322.925i) q^{78} +(-418.243 + 724.419i) q^{79} -12.4186 q^{80} +(-92.8116 + 160.754i) q^{81} -320.894 q^{82} +(438.007 + 758.650i) q^{83} -259.706 q^{84} -69.4358 q^{85} +(459.761 + 796.329i) q^{86} +(-233.883 + 405.098i) q^{87} +419.748 q^{88} +(545.438 + 944.727i) q^{89} +(-15.2276 - 26.3750i) q^{90} +(-820.016 - 1420.31i) q^{91} +(-271.047 + 469.467i) q^{92} +(389.422 - 674.499i) q^{93} +(57.4596 + 99.5230i) q^{94} +(36.6762 + 63.5250i) q^{95} +(-43.4686 - 75.2898i) q^{96} -1433.73 q^{97} +(-228.129 + 395.131i) q^{98} +(514.692 + 891.473i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 10 q - 10 q^{2} - 5 q^{3} - 20 q^{4} - q^{5} + 20 q^{6} - q^{7} + 80 q^{8} - 38 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 10 q - 10 q^{2} - 5 q^{3} - 20 q^{4} - q^{5} + 20 q^{6} - q^{7} + 80 q^{8} - 38 q^{9} + 4 q^{10} - 80 q^{11} - 20 q^{12} + 73 q^{13} + 4 q^{14} + 113 q^{15} - 80 q^{16} + 69 q^{17} - 76 q^{18} + 33 q^{19} - 4 q^{20} - 109 q^{21} + 80 q^{22} - 524 q^{23} - 40 q^{24} + 132 q^{25} - 292 q^{26} + 898 q^{27} - 4 q^{28} + 296 q^{29} + 226 q^{30} - 784 q^{31} - 160 q^{32} + 124 q^{33} + 138 q^{34} - 263 q^{35} + 304 q^{36} + 24 q^{37} - 132 q^{38} + 679 q^{39} - 8 q^{40} + 345 q^{41} - 218 q^{42} - 492 q^{43} + 160 q^{44} - 1816 q^{45} + 524 q^{46} - 32 q^{47} + 160 q^{48} + 150 q^{49} + 264 q^{50} + 342 q^{51} + 292 q^{52} - 19 q^{53} - 898 q^{54} + 340 q^{55} - 8 q^{56} + 207 q^{57} - 296 q^{58} - 105 q^{59} - 904 q^{60} + 219 q^{61} + 784 q^{62} - 304 q^{63} + 640 q^{64} + 1191 q^{65} - 496 q^{66} + 773 q^{67} - 552 q^{68} + 604 q^{69} - 526 q^{70} + 555 q^{71} - 304 q^{72} + 348 q^{73} + 102 q^{74} - 2952 q^{75} + 132 q^{76} + 884 q^{77} + 1358 q^{78} - 727 q^{79} + 32 q^{80} - 2609 q^{81} - 1380 q^{82} + 2229 q^{83} + 872 q^{84} - 3042 q^{85} + 492 q^{86} + 2660 q^{87} - 640 q^{88} + 901 q^{89} + 1816 q^{90} - 1405 q^{91} + 1048 q^{92} + 3236 q^{93} + 32 q^{94} - 3337 q^{95} - 160 q^{96} - 4596 q^{97} + 300 q^{98} + 6784 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

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

\(n\) \(39\)
\(\chi(n)\) \(e\left(\frac{1}{3}\right)\)

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
\(3\) −1.35839 + 2.35281i −0.261423 + 0.452798i −0.966620 0.256213i \(-0.917525\pi\)
0.705197 + 0.709011i \(0.250858\pi\)
\(4\) −2.00000 + 3.46410i −0.250000 + 0.433013i
\(5\) 0.388081 0.672176i 0.0347110 0.0601213i −0.848148 0.529759i \(-0.822282\pi\)
0.882859 + 0.469638i \(0.155616\pi\)
\(6\) 5.43357 0.369708
\(7\) 11.9492 20.6965i 0.645194 1.11751i −0.339063 0.940764i \(-0.610110\pi\)
0.984257 0.176745i \(-0.0565567\pi\)
\(8\) 8.00000 0.353553
\(9\) 9.80954 + 16.9906i 0.363316 + 0.629282i
\(10\) −1.55232 −0.0490888
\(11\) 52.4685 1.43817 0.719084 0.694923i \(-0.244561\pi\)
0.719084 + 0.694923i \(0.244561\pi\)
\(12\) −5.43357 9.41122i −0.130711 0.226399i
\(13\) 34.3127 59.4314i 0.732049 1.26795i −0.223957 0.974599i \(-0.571897\pi\)
0.956006 0.293347i \(-0.0947692\pi\)
\(14\) −47.7966 −0.912442
\(15\) 1.05433 + 1.82616i 0.0181485 + 0.0314341i
\(16\) −8.00000 13.8564i −0.125000 0.216506i
\(17\) −44.7302 77.4750i −0.638157 1.10532i −0.985837 0.167707i \(-0.946364\pi\)
0.347680 0.937613i \(-0.386969\pi\)
\(18\) 19.6191 33.9812i 0.256903 0.444970i
\(19\) −47.2533 + 81.8450i −0.570560 + 0.988239i 0.425948 + 0.904747i \(0.359940\pi\)
−0.996508 + 0.0834915i \(0.973393\pi\)
\(20\) 1.55232 + 2.68870i 0.0173555 + 0.0300606i
\(21\) 32.4633 + 56.2281i 0.337337 + 0.584284i
\(22\) −52.4685 90.8782i −0.508469 0.880695i
\(23\) 135.523 1.22863 0.614317 0.789059i \(-0.289432\pi\)
0.614317 + 0.789059i \(0.289432\pi\)
\(24\) −10.8671 + 18.8224i −0.0924269 + 0.160088i
\(25\) 62.1988 + 107.731i 0.497590 + 0.861852i
\(26\) −137.251 −1.03527
\(27\) −126.654 −0.902762
\(28\) 47.7966 + 82.7862i 0.322597 + 0.558754i
\(29\) 172.177 1.10250 0.551248 0.834341i \(-0.314152\pi\)
0.551248 + 0.834341i \(0.314152\pi\)
\(30\) 2.10867 3.65232i 0.0128329 0.0222273i
\(31\) −286.679 −1.66094 −0.830468 0.557066i \(-0.811927\pi\)
−0.830468 + 0.557066i \(0.811927\pi\)
\(32\) −16.0000 + 27.7128i −0.0883883 + 0.153093i
\(33\) −71.2729 + 123.448i −0.375970 + 0.651199i
\(34\) −89.4604 + 154.950i −0.451245 + 0.781579i
\(35\) −9.27448 16.0639i −0.0447907 0.0775797i
\(36\) −78.4763 −0.363316
\(37\) 184.044 + 129.541i 0.817748 + 0.575577i
\(38\) 189.013 0.806894
\(39\) 93.2203 + 161.462i 0.382749 + 0.662940i
\(40\) 3.10465 5.37741i 0.0122722 0.0212561i
\(41\) 80.2235 138.951i 0.305581 0.529281i −0.671810 0.740724i \(-0.734483\pi\)
0.977390 + 0.211443i \(0.0678161\pi\)
\(42\) 64.9266 112.456i 0.238533 0.413151i
\(43\) −459.761 −1.63053 −0.815266 0.579087i \(-0.803409\pi\)
−0.815266 + 0.579087i \(0.803409\pi\)
\(44\) −104.937 + 181.756i −0.359542 + 0.622745i
\(45\) 15.2276 0.0504443
\(46\) −135.523 234.733i −0.434388 0.752381i
\(47\) −57.4596 −0.178326 −0.0891632 0.996017i \(-0.528419\pi\)
−0.0891632 + 0.996017i \(0.528419\pi\)
\(48\) 43.4686 0.130711
\(49\) −114.065 197.566i −0.332550 0.575993i
\(50\) 124.398 215.463i 0.351849 0.609421i
\(51\) 243.045 0.667315
\(52\) 137.251 + 237.726i 0.366025 + 0.633973i
\(53\) −153.743 266.290i −0.398457 0.690147i 0.595079 0.803667i \(-0.297121\pi\)
−0.993536 + 0.113520i \(0.963787\pi\)
\(54\) 126.654 + 219.371i 0.319175 + 0.552827i
\(55\) 20.3620 35.2681i 0.0499203 0.0864645i
\(56\) 95.5932 165.572i 0.228110 0.395099i
\(57\) −128.377 222.355i −0.298315 0.516696i
\(58\) −172.177 298.219i −0.389791 0.675138i
\(59\) −93.4414 161.845i −0.206187 0.357126i 0.744323 0.667819i \(-0.232772\pi\)
−0.950510 + 0.310693i \(0.899439\pi\)
\(60\) −8.43466 −0.0181485
\(61\) 266.755 462.034i 0.559910 0.969793i −0.437593 0.899173i \(-0.644169\pi\)
0.997503 0.0706199i \(-0.0224977\pi\)
\(62\) 286.679 + 496.542i 0.587230 + 1.01711i
\(63\) 468.863 0.937637
\(64\) 64.0000 0.125000
\(65\) −26.6322 46.1284i −0.0508204 0.0880234i
\(66\) 285.091 0.531702
\(67\) −92.1029 + 159.527i −0.167943 + 0.290885i −0.937696 0.347456i \(-0.887046\pi\)
0.769754 + 0.638341i \(0.220379\pi\)
\(68\) 357.841 0.638157
\(69\) −184.094 + 318.860i −0.321193 + 0.556322i
\(70\) −18.5490 + 32.1277i −0.0316718 + 0.0548571i
\(71\) −98.9525 + 171.391i −0.165401 + 0.286484i −0.936798 0.349871i \(-0.886225\pi\)
0.771396 + 0.636355i \(0.219559\pi\)
\(72\) 78.4763 + 135.925i 0.128452 + 0.222485i
\(73\) 62.7530 0.100612 0.0503061 0.998734i \(-0.483980\pi\)
0.0503061 + 0.998734i \(0.483980\pi\)
\(74\) 40.3269 448.314i 0.0633501 0.704263i
\(75\) −337.962 −0.520326
\(76\) −189.013 327.380i −0.285280 0.494119i
\(77\) 626.955 1085.92i 0.927897 1.60717i
\(78\) 186.441 322.925i 0.270644 0.468769i
\(79\) −418.243 + 724.419i −0.595646 + 1.03169i 0.397809 + 0.917468i \(0.369771\pi\)
−0.993455 + 0.114221i \(0.963563\pi\)
\(80\) −12.4186 −0.0173555
\(81\) −92.8116 + 160.754i −0.127314 + 0.220514i
\(82\) −320.894 −0.432156
\(83\) 438.007 + 758.650i 0.579247 + 1.00328i 0.995566 + 0.0940662i \(0.0299865\pi\)
−0.416319 + 0.909218i \(0.636680\pi\)
\(84\) −259.706 −0.337337
\(85\) −69.4358 −0.0886043
\(86\) 459.761 + 796.329i 0.576480 + 0.998493i
\(87\) −233.883 + 405.098i −0.288218 + 0.499208i
\(88\) 419.748 0.508469
\(89\) 545.438 + 944.727i 0.649622 + 1.12518i 0.983213 + 0.182461i \(0.0584062\pi\)
−0.333591 + 0.942718i \(0.608260\pi\)
\(90\) −15.2276 26.3750i −0.0178348 0.0308907i
\(91\) −820.016 1420.31i −0.944627 1.63614i
\(92\) −271.047 + 469.467i −0.307158 + 0.532014i
\(93\) 389.422 674.499i 0.434207 0.752068i
\(94\) 57.4596 + 99.5230i 0.0630479 + 0.109202i
\(95\) 36.6762 + 63.5250i 0.0396095 + 0.0686056i
\(96\) −43.4686 75.2898i −0.0462135 0.0800441i
\(97\) −1433.73 −1.50075 −0.750377 0.661010i \(-0.770128\pi\)
−0.750377 + 0.661010i \(0.770128\pi\)
\(98\) −228.129 + 395.131i −0.235148 + 0.407289i
\(99\) 514.692 + 891.473i 0.522510 + 0.905014i
\(100\) −497.590 −0.497590
\(101\) −483.484 −0.476322 −0.238161 0.971226i \(-0.576545\pi\)
−0.238161 + 0.971226i \(0.576545\pi\)
\(102\) −243.045 420.966i −0.235931 0.408645i
\(103\) −701.463 −0.671041 −0.335520 0.942033i \(-0.608912\pi\)
−0.335520 + 0.942033i \(0.608912\pi\)
\(104\) 274.502 475.451i 0.258818 0.448287i
\(105\) 50.3936 0.0468372
\(106\) −307.486 + 532.581i −0.281751 + 0.488008i
\(107\) 445.364 771.393i 0.402383 0.696947i −0.591630 0.806209i \(-0.701515\pi\)
0.994013 + 0.109262i \(0.0348488\pi\)
\(108\) 253.308 438.742i 0.225691 0.390907i
\(109\) −736.798 1276.17i −0.647453 1.12142i −0.983729 0.179658i \(-0.942501\pi\)
0.336276 0.941764i \(-0.390833\pi\)
\(110\) −81.4482 −0.0705980
\(111\) −554.788 + 257.053i −0.474398 + 0.219805i
\(112\) −382.373 −0.322597
\(113\) 829.553 + 1436.83i 0.690600 + 1.19615i 0.971642 + 0.236459i \(0.0759868\pi\)
−0.281041 + 0.959696i \(0.590680\pi\)
\(114\) −256.754 + 444.711i −0.210940 + 0.365360i
\(115\) 52.5941 91.0956i 0.0426471 0.0738670i
\(116\) −344.353 + 596.437i −0.275624 + 0.477395i
\(117\) 1346.37 1.06386
\(118\) −186.883 + 323.690i −0.145796 + 0.252526i
\(119\) −2137.95 −1.64694
\(120\) 8.43466 + 14.6093i 0.00641647 + 0.0111136i
\(121\) 1421.95 1.06833
\(122\) −1067.02 −0.791833
\(123\) 217.950 + 377.500i 0.159771 + 0.276732i
\(124\) 573.358 993.085i 0.415234 0.719207i
\(125\) 193.573 0.138510
\(126\) −468.863 812.094i −0.331505 0.574183i
\(127\) 1203.87 + 2085.17i 0.841152 + 1.45692i 0.888922 + 0.458060i \(0.151455\pi\)
−0.0477695 + 0.998858i \(0.515211\pi\)
\(128\) −64.0000 110.851i −0.0441942 0.0765466i
\(129\) 624.536 1081.73i 0.426258 0.738301i
\(130\) −53.2645 + 92.2568i −0.0359354 + 0.0622420i
\(131\) 129.574 + 224.430i 0.0864196 + 0.149683i 0.905995 0.423288i \(-0.139124\pi\)
−0.819576 + 0.572971i \(0.805791\pi\)
\(132\) −285.091 493.793i −0.187985 0.325600i
\(133\) 1129.27 + 1955.96i 0.736243 + 1.27521i
\(134\) 368.412 0.237507
\(135\) −49.1520 + 85.1338i −0.0313358 + 0.0542752i
\(136\) −357.841 619.800i −0.225622 0.390790i
\(137\) −933.443 −0.582112 −0.291056 0.956706i \(-0.594007\pi\)
−0.291056 + 0.956706i \(0.594007\pi\)
\(138\) 736.376 0.454235
\(139\) 344.347 + 596.427i 0.210123 + 0.363944i 0.951753 0.306865i \(-0.0992801\pi\)
−0.741630 + 0.670810i \(0.765947\pi\)
\(140\) 74.1959 0.0447907
\(141\) 78.0527 135.191i 0.0466186 0.0807458i
\(142\) 395.810 0.233913
\(143\) 1800.34 3118.28i 1.05281 1.82352i
\(144\) 156.953 271.850i 0.0908291 0.157321i
\(145\) 66.8185 115.733i 0.0382688 0.0662835i
\(146\) −62.7530 108.691i −0.0355718 0.0616121i
\(147\) 619.778 0.347744
\(148\) −816.830 + 378.466i −0.453669 + 0.210201i
\(149\) −1001.72 −0.550765 −0.275383 0.961335i \(-0.588805\pi\)
−0.275383 + 0.961335i \(0.588805\pi\)
\(150\) 337.962 + 585.366i 0.183963 + 0.318633i
\(151\) −928.781 + 1608.70i −0.500550 + 0.866979i 0.499449 + 0.866343i \(0.333536\pi\)
−1.00000 0.000635608i \(0.999798\pi\)
\(152\) −378.026 + 654.760i −0.201723 + 0.349395i
\(153\) 877.565 1519.99i 0.463705 0.803161i
\(154\) −2507.82 −1.31225
\(155\) −111.255 + 192.699i −0.0576528 + 0.0998576i
\(156\) −745.763 −0.382749
\(157\) −203.348 352.210i −0.103369 0.179041i 0.809702 0.586842i \(-0.199629\pi\)
−0.913071 + 0.407801i \(0.866296\pi\)
\(158\) 1672.97 0.842371
\(159\) 835.373 0.416663
\(160\) 12.4186 + 21.5096i 0.00613610 + 0.0106280i
\(161\) 1619.39 2804.86i 0.792707 1.37301i
\(162\) 371.247 0.180049
\(163\) −122.787 212.672i −0.0590023 0.102195i 0.835015 0.550226i \(-0.185459\pi\)
−0.894018 + 0.448031i \(0.852125\pi\)
\(164\) 320.894 + 555.805i 0.152790 + 0.264641i
\(165\) 55.3193 + 95.8159i 0.0261006 + 0.0452076i
\(166\) 876.013 1517.30i 0.409589 0.709429i
\(167\) 443.342 767.892i 0.205430 0.355816i −0.744839 0.667244i \(-0.767474\pi\)
0.950270 + 0.311428i \(0.100807\pi\)
\(168\) 259.706 + 449.824i 0.119267 + 0.206576i
\(169\) −1256.23 2175.85i −0.571792 0.990373i
\(170\) 69.4358 + 120.266i 0.0313264 + 0.0542588i
\(171\) −1854.13 −0.829175
\(172\) 919.522 1592.66i 0.407633 0.706041i
\(173\) 1970.08 + 3412.27i 0.865793 + 1.49960i 0.866258 + 0.499597i \(0.166519\pi\)
−0.000464763 1.00000i \(0.500148\pi\)
\(174\) 935.534 0.407601
\(175\) 2972.89 1.28417
\(176\) −419.748 727.025i −0.179771 0.311373i
\(177\) 507.720 0.215608
\(178\) 1090.88 1889.45i 0.459352 0.795621i
\(179\) −3033.79 −1.26680 −0.633398 0.773826i \(-0.718340\pi\)
−0.633398 + 0.773826i \(0.718340\pi\)
\(180\) −30.4552 + 52.7499i −0.0126111 + 0.0218430i
\(181\) −420.366 + 728.095i −0.172627 + 0.299000i −0.939338 0.342994i \(-0.888559\pi\)
0.766710 + 0.641993i \(0.221892\pi\)
\(182\) −1640.03 + 2840.62i −0.667952 + 1.15693i
\(183\) 724.717 + 1255.25i 0.292747 + 0.507052i
\(184\) 1084.19 0.434388
\(185\) 158.498 73.4378i 0.0629893 0.0291851i
\(186\) −1557.69 −0.614061
\(187\) −2346.93 4065.00i −0.917777 1.58964i
\(188\) 114.919 199.046i 0.0445816 0.0772176i
\(189\) −1513.41 + 2621.30i −0.582456 + 1.00884i
\(190\) 73.3524 127.050i 0.0280081 0.0485115i
\(191\) −2187.61 −0.828742 −0.414371 0.910108i \(-0.635998\pi\)
−0.414371 + 0.910108i \(0.635998\pi\)
\(192\) −86.9371 + 150.580i −0.0326778 + 0.0565997i
\(193\) −809.935 −0.302075 −0.151037 0.988528i \(-0.548261\pi\)
−0.151037 + 0.988528i \(0.548261\pi\)
\(194\) 1433.73 + 2483.29i 0.530597 + 0.919021i
\(195\) 144.708 0.0531424
\(196\) 912.517 0.332550
\(197\) −1574.13 2726.47i −0.569299 0.986054i −0.996635 0.0819617i \(-0.973881\pi\)
0.427337 0.904093i \(-0.359452\pi\)
\(198\) 1029.38 1782.95i 0.369470 0.639942i
\(199\) 2211.71 0.787861 0.393930 0.919140i \(-0.371115\pi\)
0.393930 + 0.919140i \(0.371115\pi\)
\(200\) 497.590 + 861.852i 0.175925 + 0.304711i
\(201\) −250.224 433.401i −0.0878081 0.152088i
\(202\) 483.484 + 837.420i 0.168405 + 0.291686i
\(203\) 2057.36 3563.46i 0.711323 1.23205i
\(204\) −486.089 + 841.931i −0.166829 + 0.288956i
\(205\) −62.2664 107.849i −0.0212140 0.0367438i
\(206\) 701.463 + 1214.97i 0.237249 + 0.410927i
\(207\) 1329.42 + 2302.63i 0.446383 + 0.773157i
\(208\) −1098.01 −0.366025
\(209\) −2479.31 + 4294.29i −0.820562 + 1.42125i
\(210\) −50.3936 87.2842i −0.0165595 0.0286818i
\(211\) −632.160 −0.206254 −0.103127 0.994668i \(-0.532885\pi\)
−0.103127 + 0.994668i \(0.532885\pi\)
\(212\) 1229.94 0.398457
\(213\) −268.833 465.632i −0.0864794 0.149787i
\(214\) −1781.46 −0.569055
\(215\) −178.425 + 309.040i −0.0565974 + 0.0980297i
\(216\) −1013.23 −0.319175
\(217\) −3425.57 + 5933.26i −1.07163 + 1.85611i
\(218\) −1473.60 + 2552.34i −0.457819 + 0.792965i
\(219\) −85.2432 + 147.646i −0.0263023 + 0.0455569i
\(220\) 81.4482 + 141.072i 0.0249602 + 0.0432323i
\(221\) −6139.26 −1.86865
\(222\) 1000.02 + 703.868i 0.302328 + 0.212795i
\(223\) −4755.80 −1.42813 −0.714063 0.700081i \(-0.753147\pi\)
−0.714063 + 0.700081i \(0.753147\pi\)
\(224\) 382.373 + 662.289i 0.114055 + 0.197549i
\(225\) −1220.28 + 2113.59i −0.361565 + 0.626249i
\(226\) 1659.11 2873.66i 0.488328 0.845809i
\(227\) 1537.87 2663.67i 0.449657 0.778829i −0.548706 0.836015i \(-0.684879\pi\)
0.998364 + 0.0571860i \(0.0182128\pi\)
\(228\) 1027.02 0.298315
\(229\) −358.860 + 621.564i −0.103555 + 0.179363i −0.913147 0.407630i \(-0.866355\pi\)
0.809592 + 0.586993i \(0.199689\pi\)
\(230\) −210.376 −0.0603122
\(231\) 1703.30 + 2950.20i 0.485147 + 0.840299i
\(232\) 1377.41 0.389791
\(233\) 3630.44 1.02076 0.510382 0.859948i \(-0.329504\pi\)
0.510382 + 0.859948i \(0.329504\pi\)
\(234\) −1346.37 2331.98i −0.376132 0.651479i
\(235\) −22.2990 + 38.6230i −0.00618990 + 0.0107212i
\(236\) 747.531 0.206187
\(237\) −1136.28 1968.09i −0.311431 0.539414i
\(238\) 2137.95 + 3703.04i 0.582281 + 1.00854i
\(239\) −205.221 355.454i −0.0555425 0.0962024i 0.836917 0.547329i \(-0.184355\pi\)
−0.892460 + 0.451127i \(0.851022\pi\)
\(240\) 16.8693 29.2185i 0.00453713 0.00785854i
\(241\) 1122.13 1943.59i 0.299929 0.519492i −0.676190 0.736727i \(-0.736370\pi\)
0.976119 + 0.217235i \(0.0697037\pi\)
\(242\) −1421.95 2462.88i −0.377712 0.654216i
\(243\) −1961.98 3398.25i −0.517946 0.897110i
\(244\) 1067.02 + 1848.14i 0.279955 + 0.484897i
\(245\) −177.065 −0.0461726
\(246\) 435.900 755.001i 0.112975 0.195679i
\(247\) 3242.78 + 5616.65i 0.835356 + 1.44688i
\(248\) −2293.43 −0.587230
\(249\) −2379.94 −0.605713
\(250\) −193.573 335.278i −0.0489705 0.0848194i
\(251\) −1176.80 −0.295932 −0.147966 0.988992i \(-0.547273\pi\)
−0.147966 + 0.988992i \(0.547273\pi\)
\(252\) −937.726 + 1624.19i −0.234409 + 0.406009i
\(253\) 7110.71 1.76698
\(254\) 2407.74 4170.33i 0.594784 1.03020i
\(255\) 94.3210 163.369i 0.0231632 0.0401198i
\(256\) −128.000 + 221.703i −0.0312500 + 0.0541266i
\(257\) −1642.03 2844.09i −0.398550 0.690308i 0.594998 0.803727i \(-0.297153\pi\)
−0.993547 + 0.113419i \(0.963820\pi\)
\(258\) −2498.14 −0.602820
\(259\) 4880.21 2261.17i 1.17082 0.542481i
\(260\) 213.058 0.0508204
\(261\) 1688.97 + 2925.39i 0.400555 + 0.693781i
\(262\) 259.149 448.859i 0.0611079 0.105842i
\(263\) −239.738 + 415.238i −0.0562086 + 0.0973561i −0.892761 0.450531i \(-0.851235\pi\)
0.836552 + 0.547888i \(0.184568\pi\)
\(264\) −570.183 + 987.586i −0.132926 + 0.230234i
\(265\) −238.659 −0.0553234
\(266\) 2258.55 3911.92i 0.520603 0.901710i
\(267\) −2963.68 −0.679304
\(268\) −368.412 638.108i −0.0839714 0.145443i
\(269\) 1408.00 0.319134 0.159567 0.987187i \(-0.448990\pi\)
0.159567 + 0.987187i \(0.448990\pi\)
\(270\) 196.608 0.0443155
\(271\) 809.175 + 1401.53i 0.181380 + 0.314159i 0.942351 0.334627i \(-0.108610\pi\)
−0.760971 + 0.648786i \(0.775277\pi\)
\(272\) −715.683 + 1239.60i −0.159539 + 0.276330i
\(273\) 4455.62 0.987788
\(274\) 933.443 + 1616.77i 0.205808 + 0.356469i
\(275\) 3263.48 + 5652.51i 0.715619 + 1.23949i
\(276\) −736.376 1275.44i −0.160596 0.278161i
\(277\) 3653.07 6327.31i 0.792389 1.37246i −0.132094 0.991237i \(-0.542170\pi\)
0.924484 0.381221i \(-0.124496\pi\)
\(278\) 688.694 1192.85i 0.148580 0.257348i
\(279\) −2812.19 4870.85i −0.603445 1.04520i
\(280\) −74.1959 128.511i −0.0158359 0.0274286i
\(281\) −2299.27 3982.46i −0.488125 0.845458i 0.511782 0.859116i \(-0.328986\pi\)
−0.999907 + 0.0136580i \(0.995652\pi\)
\(282\) −312.211 −0.0659287
\(283\) 4279.73 7412.71i 0.898953 1.55703i 0.0701175 0.997539i \(-0.477663\pi\)
0.828835 0.559493i \(-0.189004\pi\)
\(284\) −395.810 685.563i −0.0827007 0.143242i
\(285\) −199.283 −0.0414193
\(286\) −7201.35 −1.48890
\(287\) −1917.21 3320.70i −0.394317 0.682978i
\(288\) −627.810 −0.128452
\(289\) −1545.08 + 2676.16i −0.314488 + 0.544709i
\(290\) −267.274 −0.0541202
\(291\) 1947.57 3373.29i 0.392331 0.679538i
\(292\) −125.506 + 217.383i −0.0251530 + 0.0435663i
\(293\) −1087.91 + 1884.32i −0.216916 + 0.375710i −0.953864 0.300240i \(-0.902933\pi\)
0.736947 + 0.675950i \(0.236266\pi\)
\(294\) −619.778 1073.49i −0.122946 0.212949i
\(295\) −145.051 −0.0286279
\(296\) 1472.35 + 1036.33i 0.289117 + 0.203497i
\(297\) −6645.35 −1.29832
\(298\) 1001.72 + 1735.03i 0.194725 + 0.337273i
\(299\) 4650.18 8054.34i 0.899420 1.55784i
\(300\) 675.923 1170.73i 0.130081 0.225308i
\(301\) −5493.75 + 9515.46i −1.05201 + 1.82213i
\(302\) 3715.12 0.707885
\(303\) 656.762 1137.54i 0.124521 0.215677i
\(304\) 1512.10 0.285280
\(305\) −207.045 358.613i −0.0388701 0.0673250i
\(306\) −3510.26 −0.655778
\(307\) −3546.01 −0.659223 −0.329612 0.944117i \(-0.606918\pi\)
−0.329612 + 0.944117i \(0.606918\pi\)
\(308\) 2507.82 + 4343.67i 0.463949 + 0.803583i
\(309\) 952.862 1650.41i 0.175425 0.303846i
\(310\) 445.019 0.0815334
\(311\) 5032.15 + 8715.93i 0.917514 + 1.58918i 0.803179 + 0.595738i \(0.203140\pi\)
0.114335 + 0.993442i \(0.463526\pi\)
\(312\) 745.763 + 1291.70i 0.135322 + 0.234385i
\(313\) 3854.56 + 6676.29i 0.696078 + 1.20564i 0.969816 + 0.243839i \(0.0784067\pi\)
−0.273738 + 0.961804i \(0.588260\pi\)
\(314\) −406.697 + 704.420i −0.0730931 + 0.126601i
\(315\) 181.957 315.158i 0.0325464 0.0563719i
\(316\) −1672.97 2897.68i −0.297823 0.515845i
\(317\) −4863.44 8423.72i −0.861696 1.49250i −0.870290 0.492539i \(-0.836069\pi\)
0.00859393 0.999963i \(-0.497264\pi\)
\(318\) −835.373 1446.91i −0.147312 0.255153i
\(319\) 9033.85 1.58558
\(320\) 24.8372 43.0193i 0.00433888 0.00751516i
\(321\) 1209.96 + 2095.71i 0.210384 + 0.364396i
\(322\) −6477.56 −1.12106
\(323\) 8454.59 1.45643
\(324\) −371.247 643.018i −0.0636568 0.110257i
\(325\) 8536.84 1.45704
\(326\) −245.573 + 425.345i −0.0417210 + 0.0722628i
\(327\) 4003.44 0.677036
\(328\) 641.788 1111.61i 0.108039 0.187129i
\(329\) −686.594 + 1189.22i −0.115055 + 0.199281i
\(330\) 110.639 191.632i 0.0184559 0.0319666i
\(331\) 2150.24 + 3724.32i 0.357062 + 0.618450i 0.987469 0.157815i \(-0.0504450\pi\)
−0.630406 + 0.776265i \(0.717112\pi\)
\(332\) −3504.05 −0.579247
\(333\) −395.588 + 4397.76i −0.0650994 + 0.723710i
\(334\) −1773.37 −0.290522
\(335\) 71.4868 + 123.819i 0.0116589 + 0.0201939i
\(336\) 519.413 899.649i 0.0843342 0.146071i
\(337\) −4687.63 + 8119.21i −0.757719 + 1.31241i 0.186292 + 0.982494i \(0.440353\pi\)
−0.944011 + 0.329913i \(0.892980\pi\)
\(338\) −2512.45 + 4351.70i −0.404318 + 0.700299i
\(339\) −4507.44 −0.722154
\(340\) 138.872 240.533i 0.0221511 0.0383668i
\(341\) −15041.6 −2.38871
\(342\) 1854.13 + 3211.45i 0.293158 + 0.507764i
\(343\) 2745.22 0.432151
\(344\) −3678.09 −0.576480
\(345\) 142.887 + 247.487i 0.0222979 + 0.0386210i
\(346\) 3940.15 6824.55i 0.612208 1.06038i
\(347\) −2361.85 −0.365391 −0.182695 0.983170i \(-0.558482\pi\)
−0.182695 + 0.983170i \(0.558482\pi\)
\(348\) −935.534 1620.39i −0.144109 0.249604i
\(349\) −1058.43 1833.25i −0.162339 0.281180i 0.773368 0.633958i \(-0.218571\pi\)
−0.935707 + 0.352777i \(0.885237\pi\)
\(350\) −2972.89 5149.20i −0.454022 0.786389i
\(351\) −4345.85 + 7527.23i −0.660866 + 1.14465i
\(352\) −839.497 + 1454.05i −0.127117 + 0.220174i
\(353\) 1964.66 + 3402.89i 0.296227 + 0.513081i 0.975270 0.221018i \(-0.0709381\pi\)
−0.679042 + 0.734099i \(0.737605\pi\)
\(354\) −507.720 879.397i −0.0762289 0.132032i
\(355\) 76.8032 + 133.027i 0.0114825 + 0.0198883i
\(356\) −4363.51 −0.649622
\(357\) 2904.18 5030.18i 0.430547 0.745730i
\(358\) 3033.79 + 5254.68i 0.447880 + 0.775751i
\(359\) 1087.17 0.159829 0.0799143 0.996802i \(-0.474535\pi\)
0.0799143 + 0.996802i \(0.474535\pi\)
\(360\) 121.821 0.0178348
\(361\) −1036.24 1794.82i −0.151078 0.261674i
\(362\) 1681.46 0.244132
\(363\) −1931.56 + 3345.56i −0.279286 + 0.483737i
\(364\) 6560.13 0.944627
\(365\) 24.3533 42.1811i 0.00349235 0.00604893i
\(366\) 1449.43 2510.49i 0.207003 0.358540i
\(367\) −2223.20 + 3850.69i −0.316213 + 0.547696i −0.979695 0.200496i \(-0.935745\pi\)
0.663482 + 0.748192i \(0.269078\pi\)
\(368\) −1084.19 1877.87i −0.153579 0.266007i
\(369\) 3147.82 0.444090
\(370\) −285.696 201.089i −0.0401423 0.0282544i
\(371\) −7348.39 −1.02833
\(372\) 1557.69 + 2698.00i 0.217103 + 0.376034i
\(373\) −1089.61 + 1887.26i −0.151254 + 0.261980i −0.931689 0.363258i \(-0.881665\pi\)
0.780435 + 0.625237i \(0.214998\pi\)
\(374\) −4693.85 + 8129.99i −0.648966 + 1.12404i
\(375\) −262.948 + 455.440i −0.0362096 + 0.0627168i
\(376\) −459.677 −0.0630479
\(377\) 5907.85 10232.7i 0.807081 1.39791i
\(378\) 6053.63 0.823718
\(379\) −5269.65 9127.30i −0.714205 1.23704i −0.963265 0.268551i \(-0.913455\pi\)
0.249061 0.968488i \(-0.419878\pi\)
\(380\) −293.410 −0.0396095
\(381\) −6541.32 −0.879585
\(382\) 2187.61 + 3789.05i 0.293005 + 0.507499i
\(383\) −2792.81 + 4837.29i −0.372600 + 0.645363i −0.989965 0.141314i \(-0.954867\pi\)
0.617364 + 0.786677i \(0.288200\pi\)
\(384\) 347.749 0.0462135
\(385\) −486.618 842.848i −0.0644166 0.111573i
\(386\) 809.935 + 1402.85i 0.106800 + 0.184982i
\(387\) −4510.04 7811.62i −0.592399 1.02606i
\(388\) 2867.46 4966.58i 0.375189 0.649846i
\(389\) −1487.31 + 2576.09i −0.193855 + 0.335766i −0.946524 0.322632i \(-0.895432\pi\)
0.752670 + 0.658398i \(0.228766\pi\)
\(390\) −144.708 250.642i −0.0187887 0.0325429i
\(391\) −6061.99 10499.7i −0.784061 1.35803i
\(392\) −912.517 1580.52i −0.117574 0.203644i
\(393\) −704.052 −0.0903683
\(394\) −3148.25 + 5452.93i −0.402555 + 0.697246i
\(395\) 324.625 + 562.266i 0.0413510 + 0.0716220i
\(396\) −4117.54 −0.522510
\(397\) 11005.6 1.39133 0.695663 0.718369i \(-0.255111\pi\)
0.695663 + 0.718369i \(0.255111\pi\)
\(398\) −2211.71 3830.80i −0.278551 0.482464i
\(399\) −6135.98 −0.769883
\(400\) 995.181 1723.70i 0.124398 0.215463i
\(401\) 11819.7 1.47194 0.735971 0.677013i \(-0.236726\pi\)
0.735971 + 0.677013i \(0.236726\pi\)
\(402\) −500.448 + 866.801i −0.0620897 + 0.107543i
\(403\) −9836.73 + 17037.7i −1.21589 + 2.10598i
\(404\) 966.969 1674.84i 0.119080 0.206253i
\(405\) 72.0369 + 124.772i 0.00883838 + 0.0153085i
\(406\) −8229.46 −1.00596
\(407\) 9656.52 + 6796.81i 1.17606 + 0.827777i
\(408\) 1944.36 0.235931
\(409\) −1155.34 2001.11i −0.139677 0.241928i 0.787697 0.616063i \(-0.211273\pi\)
−0.927375 + 0.374134i \(0.877940\pi\)
\(410\) −124.533 + 215.697i −0.0150006 + 0.0259818i
\(411\) 1267.98 2196.21i 0.152177 0.263579i
\(412\) 1402.93 2429.94i 0.167760 0.290569i
\(413\) −4466.18 −0.532122
\(414\) 2658.84 4605.25i 0.315640 0.546705i
\(415\) 679.928 0.0804250
\(416\) 1098.01 + 1901.80i 0.129409 + 0.224143i
\(417\) −1871.03 −0.219724
\(418\) 9917.24 1.16045
\(419\) −5214.15 9031.16i −0.607942 1.05299i −0.991579 0.129502i \(-0.958662\pi\)
0.383637 0.923484i \(-0.374671\pi\)
\(420\) −100.787 + 174.568i −0.0117093 + 0.0202811i
\(421\) 12564.4 1.45451 0.727257 0.686366i \(-0.240795\pi\)
0.727257 + 0.686366i \(0.240795\pi\)
\(422\) 632.160 + 1094.93i 0.0729219 + 0.126305i
\(423\) −563.652 976.274i −0.0647889 0.112218i
\(424\) −1229.94 2130.32i −0.140876 0.244004i
\(425\) 5564.33 9637.70i 0.635081 1.09999i
\(426\) −537.666 + 931.264i −0.0611502 + 0.105915i
\(427\) −6375.00 11041.8i −0.722501 1.25141i
\(428\) 1781.46 + 3085.57i 0.201191 + 0.348474i
\(429\) 4891.13 + 8471.69i 0.550457 + 0.953420i
\(430\) 713.698 0.0800409
\(431\) −4556.08 + 7891.37i −0.509185 + 0.881935i 0.490758 + 0.871296i \(0.336720\pi\)
−0.999943 + 0.0106388i \(0.996614\pi\)
\(432\) 1013.23 + 1754.97i 0.112845 + 0.195454i
\(433\) −8620.44 −0.956748 −0.478374 0.878156i \(-0.658774\pi\)
−0.478374 + 0.878156i \(0.658774\pi\)
\(434\) 13702.3 1.51551
\(435\) 181.531 + 314.422i 0.0200087 + 0.0346560i
\(436\) 5894.38 0.647453
\(437\) −6403.92 + 11091.9i −0.701009 + 1.21418i
\(438\) 340.973 0.0371971
\(439\) 653.694 1132.23i 0.0710686 0.123094i −0.828301 0.560283i \(-0.810692\pi\)
0.899370 + 0.437188i \(0.144026\pi\)
\(440\) 162.896 282.145i 0.0176495 0.0305698i
\(441\) 2237.84 3876.06i 0.241641 0.418535i
\(442\) 6139.26 + 10633.5i 0.660667 + 1.14431i
\(443\) 13166.5 1.41209 0.706046 0.708166i \(-0.250477\pi\)
0.706046 + 0.708166i \(0.250477\pi\)
\(444\) 219.119 2435.95i 0.0234210 0.260372i
\(445\) 846.697 0.0901962
\(446\) 4755.80 + 8237.30i 0.504919 + 0.874545i
\(447\) 1360.73 2356.85i 0.143983 0.249385i
\(448\) 764.746 1324.58i 0.0806492 0.139689i
\(449\) 6928.66 12000.8i 0.728249 1.26136i −0.229373 0.973338i \(-0.573668\pi\)
0.957623 0.288026i \(-0.0929989\pi\)
\(450\) 4881.13 0.511331
\(451\) 4209.21 7290.56i 0.439477 0.761196i
\(452\) −6636.43 −0.690600
\(453\) −2523.30 4370.48i −0.261711 0.453296i
\(454\) −6151.49 −0.635911
\(455\) −1272.93 −0.131156
\(456\) −1027.02 1778.84i −0.105470 0.182680i
\(457\) 3569.12 6181.89i 0.365331 0.632772i −0.623498 0.781825i \(-0.714289\pi\)
0.988829 + 0.149053i \(0.0476225\pi\)
\(458\) 1435.44 0.146449
\(459\) 5665.26 + 9812.52i 0.576104 + 0.997841i
\(460\) 210.376 + 364.382i 0.0213236 + 0.0369335i
\(461\) 173.069 + 299.764i 0.0174851 + 0.0302851i 0.874636 0.484781i \(-0.161101\pi\)
−0.857150 + 0.515066i \(0.827767\pi\)
\(462\) 3406.60 5900.41i 0.343051 0.594181i
\(463\) −296.192 + 513.020i −0.0297305 + 0.0514947i −0.880508 0.474032i \(-0.842798\pi\)
0.850777 + 0.525526i \(0.176132\pi\)
\(464\) −1377.41 2385.75i −0.137812 0.238697i
\(465\) −302.255 523.521i −0.0301435 0.0522101i
\(466\) −3630.44 6288.11i −0.360895 0.625088i
\(467\) −7407.74 −0.734024 −0.367012 0.930216i \(-0.619619\pi\)
−0.367012 + 0.930216i \(0.619619\pi\)
\(468\) −2692.74 + 4663.96i −0.265965 + 0.460666i
\(469\) 2201.10 + 3812.42i 0.216711 + 0.375355i
\(470\) 89.1959 0.00875383
\(471\) 1104.91 0.108092
\(472\) −747.531 1294.76i −0.0728981 0.126263i
\(473\) −24123.0 −2.34498
\(474\) −2272.55 + 3936.18i −0.220215 + 0.381424i
\(475\) −11756.4 −1.13562
\(476\) 4275.90 7406.08i 0.411735 0.713145i
\(477\) 3016.29 5224.37i 0.289532 0.501483i
\(478\) −410.442 + 710.907i −0.0392745 + 0.0680254i
\(479\) 3755.62 + 6504.93i 0.358244 + 0.620496i 0.987668 0.156566i \(-0.0500424\pi\)
−0.629424 + 0.777062i \(0.716709\pi\)
\(480\) −67.4773 −0.00641647
\(481\) 14013.8 6493.10i 1.32843 0.615509i
\(482\) −4488.53 −0.424164
\(483\) 4399.53 + 7620.22i 0.414463 + 0.717871i
\(484\) −2843.89 + 4925.77i −0.267082 + 0.462600i
\(485\) −556.403 + 963.719i −0.0520927 + 0.0902273i
\(486\) −3923.96 + 6796.49i −0.366243 + 0.634352i
\(487\) −10382.4 −0.966057 −0.483029 0.875605i \(-0.660463\pi\)
−0.483029 + 0.875605i \(0.660463\pi\)
\(488\) 2134.04 3696.27i 0.197958 0.342874i
\(489\) 667.169 0.0616982
\(490\) 177.065 + 306.686i 0.0163245 + 0.0282748i
\(491\) 789.050 0.0725241 0.0362620 0.999342i \(-0.488455\pi\)
0.0362620 + 0.999342i \(0.488455\pi\)
\(492\) −1743.60 −0.159771
\(493\) −7701.49 13339.4i −0.703565 1.21861i
\(494\) 6485.55 11233.3i 0.590686 1.02310i
\(495\) 798.969 0.0725475
\(496\) 2293.43 + 3972.34i 0.207617 + 0.359603i
\(497\) 2364.80 + 4095.95i 0.213432 + 0.369675i
\(498\) 2379.94 + 4122.18i 0.214152 + 0.370922i
\(499\) 6298.52 10909.4i 0.565051 0.978697i −0.431994 0.901876i \(-0.642190\pi\)
0.997045 0.0768202i \(-0.0244768\pi\)
\(500\) −387.146 + 670.556i −0.0346274 + 0.0599764i
\(501\) 1204.47 + 2086.20i 0.107408 + 0.186037i
\(502\) 1176.80 + 2038.28i 0.104628 + 0.181221i
\(503\) −54.7405 94.8133i −0.00485240 0.00840461i 0.863589 0.504196i \(-0.168211\pi\)
−0.868441 + 0.495792i \(0.834878\pi\)
\(504\) 3750.90 0.331505
\(505\) −187.631 + 324.987i −0.0165336 + 0.0286371i
\(506\) −7110.71 12316.1i −0.624723 1.08205i
\(507\) 6825.80 0.597918
\(508\) −9630.97 −0.841152
\(509\) 8335.62 + 14437.7i 0.725874 + 1.25725i 0.958613 + 0.284711i \(0.0918977\pi\)
−0.232740 + 0.972539i \(0.574769\pi\)
\(510\) −377.284 −0.0327577
\(511\) 749.845 1298.77i 0.0649143 0.112435i
\(512\) 512.000 0.0441942
\(513\) 5984.82 10366.0i 0.515080 0.892145i
\(514\) −3284.07 + 5688.17i −0.281817 + 0.488122i
\(515\) −272.225 + 471.507i −0.0232925 + 0.0403438i
\(516\) 2498.14 + 4326.91i 0.213129 + 0.369150i
\(517\) −3014.82 −0.256464
\(518\) −8796.68 6191.60i −0.746147 0.525180i
\(519\) −10704.6 −0.905352
\(520\) −213.058 369.027i −0.0179677 0.0311210i
\(521\) −9189.88 + 15917.3i −0.772775 + 1.33849i 0.163261 + 0.986583i \(0.447799\pi\)
−0.936036 + 0.351903i \(0.885535\pi\)
\(522\) 3377.95 5850.77i 0.283235 0.490577i
\(523\) −1343.48 + 2326.97i −0.112325 + 0.194553i −0.916707 0.399559i \(-0.869163\pi\)
0.804382 + 0.594112i \(0.202497\pi\)
\(524\) −1036.60 −0.0864196
\(525\) −4038.35 + 6994.63i −0.335711 + 0.581468i
\(526\) 958.950 0.0794909
\(527\) 12823.2 + 22210.4i 1.05994 + 1.83587i
\(528\) 2280.73 0.187985
\(529\) 6199.58 0.509541
\(530\) 238.659 + 413.369i 0.0195598 + 0.0338785i
\(531\) 1833.23 3175.25i 0.149822 0.259500i
\(532\) −9034.18 −0.736243
\(533\) −5505.37 9535.59i −0.447400 0.774920i
\(534\) 2963.68 + 5133.24i 0.240170 + 0.415987i
\(535\) −345.675 598.726i −0.0279342 0.0483835i
\(536\) −736.823 + 1276.22i −0.0593767 + 0.102844i
\(537\) 4121.08 7137.92i 0.331169 0.573602i
\(538\) −1408.00 2438.72i −0.112831 0.195429i
\(539\) −5984.80 10366.0i −0.478263 0.828375i
\(540\) −196.608 340.535i −0.0156679 0.0271376i
\(541\) −13884.4 −1.10339 −0.551697 0.834045i \(-0.686020\pi\)
−0.551697 + 0.834045i \(0.686020\pi\)
\(542\) 1618.35 2803.06i 0.128255 0.222144i
\(543\) −1142.04 1978.08i −0.0902575 0.156331i
\(544\) 2862.73 0.225622
\(545\) −1143.75 −0.0898951
\(546\) −4455.62 7717.35i −0.349236 0.604894i
\(547\) −10032.0 −0.784161 −0.392080 0.919931i \(-0.628245\pi\)
−0.392080 + 0.919931i \(0.628245\pi\)
\(548\) 1866.89 3233.54i 0.145528 0.252062i
\(549\) 10467.0 0.813698
\(550\) 6526.96 11305.0i 0.506019 0.876451i
\(551\) −8135.90 + 14091.8i −0.629040 + 1.08953i
\(552\) −1472.75 + 2550.88i −0.113559 + 0.196690i
\(553\) 9995.31 + 17312.4i 0.768614 + 1.33128i
\(554\) −14612.3 −1.12061
\(555\) −42.5180 + 472.673i −0.00325187 + 0.0361511i
\(556\) −2754.78 −0.210123
\(557\) −3402.32 5892.99i −0.258817 0.448284i 0.707108 0.707105i \(-0.249999\pi\)
−0.965925 + 0.258821i \(0.916666\pi\)
\(558\) −5624.37 + 9741.70i −0.426700 + 0.739066i
\(559\) −15775.7 + 27324.2i −1.19363 + 2.06743i
\(560\) −148.392 + 257.022i −0.0111977 + 0.0193949i
\(561\) 12752.2 0.959711
\(562\) −4598.55 + 7964.92i −0.345157 + 0.597829i
\(563\) 6070.28 0.454409 0.227204 0.973847i \(-0.427041\pi\)
0.227204 + 0.973847i \(0.427041\pi\)
\(564\) 312.211 + 540.765i 0.0233093 + 0.0403729i
\(565\) 1287.74 0.0958858
\(566\) −17118.9 −1.27131
\(567\) 2218.04 + 3841.76i 0.164284 + 0.284548i
\(568\) −791.620 + 1371.13i −0.0584783 + 0.101287i
\(569\) −3086.82 −0.227428 −0.113714 0.993514i \(-0.536275\pi\)
−0.113714 + 0.993514i \(0.536275\pi\)
\(570\) 199.283 + 345.168i 0.0146439 + 0.0253640i
\(571\) 6743.89 + 11680.8i 0.494261 + 0.856086i 0.999978 0.00661383i \(-0.00210526\pi\)
−0.505717 + 0.862700i \(0.668772\pi\)
\(572\) 7201.35 + 12473.1i 0.526405 + 0.911760i
\(573\) 2971.63 5147.01i 0.216652 0.375252i
\(574\) −3834.41 + 6641.40i −0.278824 + 0.482938i
\(575\) 8429.39 + 14600.1i 0.611356 + 1.05890i
\(576\) 627.810 + 1087.40i 0.0454145 + 0.0786603i
\(577\) −11779.0 20401.8i −0.849855 1.47199i −0.881338 0.472487i \(-0.843356\pi\)
0.0314832 0.999504i \(-0.489977\pi\)
\(578\) 6180.32 0.444753
\(579\) 1100.21 1905.62i 0.0789692 0.136779i
\(580\) 267.274 + 462.932i 0.0191344 + 0.0331417i
\(581\) 20935.2 1.49491
\(582\) −7790.27 −0.554840
\(583\) −8066.66 13971.9i −0.573048 0.992548i
\(584\) 502.024 0.0355718
\(585\) 522.500 904.997i 0.0369277 0.0639607i
\(586\) 4351.64 0.306766
\(587\) −7994.37 + 13846.7i −0.562118 + 0.973616i 0.435194 + 0.900337i \(0.356680\pi\)
−0.997311 + 0.0732795i \(0.976653\pi\)
\(588\) −1239.56 + 2146.97i −0.0869361 + 0.150578i
\(589\) 13546.5 23463.2i 0.947664 1.64140i
\(590\) 145.051 + 251.236i 0.0101215 + 0.0175309i
\(591\) 8553.13 0.595311
\(592\) 322.615 3586.51i 0.0223976 0.248995i
\(593\) −1694.48 −0.117342 −0.0586710 0.998277i \(-0.518686\pi\)
−0.0586710 + 0.998277i \(0.518686\pi\)
\(594\) 6645.35 + 11510.1i 0.459027 + 0.795058i
\(595\) −829.699 + 1437.08i −0.0571669 + 0.0990160i
\(596\) 2003.44 3470.06i 0.137691 0.238488i
\(597\) −3004.38 + 5203.73i −0.205965 + 0.356741i
\(598\) −18600.7 −1.27197
\(599\) 12696.6 21991.1i 0.866058 1.50006i 6.47628e−5 1.00000i \(-0.499979\pi\)
0.865993 0.500056i \(-0.166687\pi\)
\(600\) −2703.69 −0.183963
\(601\) −6109.34 10581.7i −0.414651 0.718196i 0.580741 0.814089i \(-0.302763\pi\)
−0.995392 + 0.0958920i \(0.969430\pi\)
\(602\) 21975.0 1.48777
\(603\) −3613.95 −0.244065
\(604\) −3715.12 6434.78i −0.250275 0.433489i
\(605\) 551.831 955.799i 0.0370828 0.0642293i
\(606\) −2627.05 −0.176100
\(607\) −3601.10 6237.29i −0.240798 0.417074i 0.720144 0.693825i \(-0.244076\pi\)
−0.960942 + 0.276751i \(0.910742\pi\)
\(608\) −1512.10 2619.04i −0.100862 0.174698i
\(609\) 5589.42 + 9681.15i 0.371912 + 0.644171i
\(610\) −414.091 + 717.227i −0.0274853 + 0.0476060i
\(611\) −1971.60 + 3414.90i −0.130544 + 0.226108i
\(612\) 3510.26 + 6079.95i 0.231853 + 0.401581i
\(613\) 3085.53 + 5344.29i 0.203301 + 0.352127i 0.949590 0.313495i \(-0.101500\pi\)
−0.746289 + 0.665622i \(0.768166\pi\)
\(614\) 3546.01 + 6141.87i 0.233071 + 0.403690i
\(615\) 338.329 0.0221833
\(616\) 5015.64 8687.34i 0.328061 0.568219i
\(617\) 14814.9 + 25660.1i 0.966652 + 1.67429i 0.705110 + 0.709098i \(0.250898\pi\)
0.261542 + 0.965192i \(0.415769\pi\)
\(618\) −3811.45 −0.248089
\(619\) −11685.8 −0.758793 −0.379397 0.925234i \(-0.623868\pi\)
−0.379397 + 0.925234i \(0.623868\pi\)
\(620\) −445.019 770.795i −0.0288264 0.0499288i
\(621\) −17164.6 −1.10916
\(622\) 10064.3 17431.9i 0.648780 1.12372i
\(623\) 26070.1 1.67653
\(624\) 1491.53 2583.40i 0.0956872 0.165735i
\(625\) −7699.73 + 13336.3i −0.492782 + 0.853524i
\(626\) 7709.12 13352.6i 0.492202 0.852518i
\(627\) −6735.75 11666.7i −0.429027 0.743097i
\(628\) 1626.79 0.103369
\(629\) 1803.83 20053.2i 0.114346 1.27118i
\(630\) −727.827 −0.0460275
\(631\) −180.276 312.247i −0.0113735 0.0196995i 0.860283 0.509817i \(-0.170287\pi\)
−0.871656 + 0.490118i \(0.836954\pi\)
\(632\) −3345.95 + 5795.35i −0.210593 + 0.364757i
\(633\) 858.721 1487.35i 0.0539196 0.0933915i
\(634\) −9726.87 + 16847.4i −0.609311 + 1.05536i
\(635\) 1868.80 0.116789
\(636\) −1670.75 + 2893.82i −0.104166 + 0.180420i
\(637\) −15655.5 −0.973771
\(638\) −9033.85 15647.1i −0.560586 0.970963i
\(639\) −3882.71 −0.240372
\(640\) −99.3488 −0.00613610
\(641\) 6689.77 + 11587.0i 0.412215 + 0.713977i 0.995132 0.0985545i \(-0.0314219\pi\)
−0.582917 + 0.812532i \(0.698089\pi\)
\(642\) 2419.92 4191.42i 0.148764 0.257667i
\(643\) 15878.5 0.973850 0.486925 0.873444i \(-0.338118\pi\)
0.486925 + 0.873444i \(0.338118\pi\)
\(644\) 6477.56 + 11219.5i 0.396353 + 0.686504i
\(645\) −484.741 839.596i −0.0295917 0.0512544i
\(646\) −8454.59 14643.8i −0.514925 0.891876i
\(647\) 2787.95 4828.87i 0.169406 0.293419i −0.768805 0.639483i \(-0.779149\pi\)
0.938211 + 0.346064i \(0.112482\pi\)
\(648\) −742.493 + 1286.04i −0.0450122 + 0.0779634i
\(649\) −4902.73 8491.78i −0.296532 0.513608i
\(650\) −8536.84 14786.2i −0.515142 0.892252i
\(651\) −9306.54 16119.4i −0.560295 0.970459i
\(652\) 982.292 0.0590023
\(653\) 733.239 1270.01i 0.0439416 0.0761091i −0.843218 0.537572i \(-0.819342\pi\)
0.887160 + 0.461462i \(0.152675\pi\)
\(654\) −4003.44 6934.16i −0.239368 0.414598i
\(655\) 201.142 0.0119989
\(656\) −2567.15 −0.152790
\(657\) 615.578 + 1066.21i 0.0365540 + 0.0633134i
\(658\) 2746.37 0.162713
\(659\) −3421.40 + 5926.05i −0.202244 + 0.350297i −0.949251 0.314519i \(-0.898157\pi\)
0.747007 + 0.664816i \(0.231490\pi\)
\(660\) −442.554 −0.0261006
\(661\) 526.840 912.514i 0.0310011 0.0536954i −0.850109 0.526607i \(-0.823464\pi\)
0.881110 + 0.472912i \(0.156797\pi\)
\(662\) 4300.47 7448.64i 0.252481 0.437310i
\(663\) 8339.52 14444.5i 0.488507 0.846119i
\(664\) 3504.05 + 6069.20i 0.204795 + 0.354715i
\(665\) 1753.00 0.102223
\(666\) 8012.73 3712.58i 0.466196 0.216005i
\(667\) 23333.9 1.35456
\(668\) 1773.37 + 3071.57i 0.102715 + 0.177908i
\(669\) 6460.25 11189.5i 0.373345 0.646652i
\(670\) 142.974 247.638i 0.00824411 0.0142792i
\(671\) 13996.3 24242.2i 0.805246 1.39473i
\(672\) −2077.65 −0.119267
\(673\) 5661.86 9806.62i 0.324292 0.561690i −0.657077 0.753824i \(-0.728207\pi\)
0.981369 + 0.192133i \(0.0615406\pi\)
\(674\) 18750.5 1.07158
\(675\) −7877.73 13644.6i −0.449206 0.778047i
\(676\) 10049.8 0.571792
\(677\) 19446.7 1.10399 0.551993 0.833849i \(-0.313867\pi\)
0.551993 + 0.833849i \(0.313867\pi\)
\(678\) 4507.44 + 7807.11i 0.255320 + 0.442227i
\(679\) −17131.9 + 29673.2i −0.968277 + 1.67711i
\(680\) −555.486 −0.0313264
\(681\) 4178.07 + 7236.63i 0.235101 + 0.407207i
\(682\) 15041.6 + 26052.8i 0.844536 + 1.46278i
\(683\) −10174.1 17622.1i −0.569989 0.987249i −0.996566 0.0827984i \(-0.973614\pi\)
0.426578 0.904451i \(-0.359719\pi\)
\(684\) 3708.26 6422.90i 0.207294 0.359043i
\(685\) −362.251 + 627.438i −0.0202057 + 0.0349973i
\(686\) −2745.22 4754.86i −0.152789 0.264638i
\(687\) −974.946 1688.66i −0.0541434 0.0937792i
\(688\) 3678.09 + 6370.63i 0.203817 + 0.353021i
\(689\) −21101.3 −1.16676
\(690\) 285.774 494.974i 0.0157670 0.0273092i
\(691\) 4149.78 + 7187.63i 0.228459 + 0.395702i 0.957352 0.288926i \(-0.0932980\pi\)
−0.728893 + 0.684628i \(0.759965\pi\)
\(692\) −15760.6 −0.865793
\(693\) 24600.5 1.34848
\(694\) 2361.85 + 4090.84i 0.129185 + 0.223755i
\(695\) 534.539 0.0291744
\(696\) −1871.07 + 3240.78i −0.101900 + 0.176497i
\(697\) −14353.6 −0.780033
\(698\) −2116.86 + 3666.51i −0.114791 + 0.198824i
\(699\) −4931.57 + 8541.72i −0.266851 + 0.462200i
\(700\) −5945.78 + 10298.4i −0.321042 + 0.556061i
\(701\) −4691.48 8125.88i −0.252774 0.437818i 0.711514 0.702672i \(-0.248010\pi\)
−0.964289 + 0.264854i \(0.914676\pi\)
\(702\) 17383.4 0.934606
\(703\) −19298.9 + 8941.88i −1.03538 + 0.479729i
\(704\) 3357.99 0.179771
\(705\) −60.5816 104.930i −0.00323636 0.00560554i
\(706\) 3929.32 6805.78i 0.209464 0.362803i
\(707\) −5777.23 + 10006.5i −0.307320 + 0.532293i
\(708\) −1015.44 + 1758.79i −0.0539020 + 0.0933610i
\(709\) 10322.1 0.546764 0.273382 0.961906i \(-0.411858\pi\)
0.273382 + 0.961906i \(0.411858\pi\)
\(710\) 153.606 266.054i 0.00811936 0.0140631i
\(711\) −16411.1 −0.865632
\(712\) 4363.51 + 7557.82i 0.229676 + 0.397811i
\(713\) −38851.7 −2.04068
\(714\) −11616.7 −0.608886
\(715\) −1397.35 2420.29i −0.0730883 0.126593i
\(716\) 6067.59 10509.4i 0.316699 0.548538i
\(717\) 1115.08 0.0580803
\(718\) −1087.17 1883.03i −0.0565079 0.0978746i
\(719\) −16150.9 27974.3i −0.837731 1.45099i −0.891787 0.452455i \(-0.850548\pi\)
0.0540560 0.998538i \(-0.482785\pi\)
\(720\) −121.821 211.000i −0.00630554 0.0109215i
\(721\) −8381.89 + 14517.9i −0.432951 + 0.749894i
\(722\) −2072.48 + 3589.64i −0.106828 + 0.185031i
\(723\) 3048.59 + 5280.32i 0.156817 + 0.271614i
\(724\) −1681.46 2912.38i −0.0863137 0.149500i
\(725\) 10709.2 + 18548.8i 0.548591 + 0.950188i
\(726\) 7726.25 0.394970
\(727\) 10968.0 18997.2i 0.559535 0.969143i −0.438000 0.898975i \(-0.644313\pi\)
0.997535 0.0701684i \(-0.0223537\pi\)
\(728\) −6560.13 11362.5i −0.333976 0.578464i
\(729\) 5648.72 0.286985
\(730\) −97.4130 −0.00493893
\(731\) 20565.2 + 35620.0i 1.04053 + 1.80226i
\(732\) −5797.74 −0.292747
\(733\) −12123.5 + 20998.6i −0.610905 + 1.05812i 0.380183 + 0.924911i \(0.375861\pi\)
−0.991088 + 0.133207i \(0.957472\pi\)
\(734\) 8892.79 0.447192
\(735\) 240.524 416.600i 0.0120706 0.0209068i
\(736\) −2168.37 + 3755.73i −0.108597 + 0.188095i
\(737\) −4832.51 + 8370.15i −0.241530 + 0.418342i
\(738\) −3147.82 5452.19i −0.157009 0.271948i
\(739\) 5870.01 0.292195 0.146097 0.989270i \(-0.453329\pi\)
0.146097 + 0.989270i \(0.453329\pi\)
\(740\) −62.6005 + 695.929i −0.00310978 + 0.0345714i
\(741\) −17619.9 −0.873524
\(742\) 7348.39 + 12727.8i 0.363568 + 0.629719i
\(743\) 1730.82 2997.87i 0.0854611 0.148023i −0.820127 0.572182i \(-0.806097\pi\)
0.905588 + 0.424159i \(0.139430\pi\)
\(744\) 3115.38 5396.00i 0.153515 0.265896i
\(745\) −388.748 + 673.331i −0.0191176 + 0.0331127i
\(746\) 4358.43 0.213906
\(747\) −8593.29 + 14884.0i −0.420899 + 0.729019i
\(748\) 18775.4 0.917777
\(749\) −10643.4 18435.0i −0.519230 0.899332i
\(750\) 1051.79 0.0512080
\(751\) 24153.8 1.17362 0.586808 0.809726i \(-0.300384\pi\)
0.586808 + 0.809726i \(0.300384\pi\)
\(752\) 459.677 + 796.184i 0.0222908 + 0.0386088i
\(753\) 1598.56 2768.78i 0.0773634 0.133997i
\(754\) −23631.4 −1.14139
\(755\) 720.885 + 1248.61i 0.0347492 + 0.0601874i
\(756\) −6053.63 10485.2i −0.291228 0.504422i
\(757\) 1640.07 + 2840.68i 0.0787441 + 0.136389i 0.902708 0.430253i \(-0.141576\pi\)
−0.823964 + 0.566642i \(0.808242\pi\)
\(758\) −10539.3 + 18254.6i −0.505019 + 0.874719i
\(759\) −9659.14 + 16730.1i −0.461930 + 0.800085i
\(760\) 293.410 + 508.200i 0.0140041 + 0.0242557i
\(761\) 11208.5 + 19413.7i 0.533914 + 0.924766i 0.999215 + 0.0396137i \(0.0126127\pi\)
−0.465301 + 0.885152i \(0.654054\pi\)
\(762\) 6541.32 + 11329.9i 0.310980 + 0.538634i
\(763\) −35216.4 −1.67093
\(764\) 4375.22 7578.10i 0.207186 0.358856i
\(765\) −681.133 1179.76i −0.0321914 0.0557571i
\(766\) 11171.2 0.526937
\(767\) −12824.9 −0.603756
\(768\) −347.749 602.318i −0.0163389 0.0282998i
\(769\) −11280.2 −0.528965 −0.264483 0.964390i \(-0.585201\pi\)
−0.264483 + 0.964390i \(0.585201\pi\)
\(770\) −973.237 + 1685.70i −0.0455494 + 0.0788938i
\(771\) 8922.10 0.416760
\(772\) 1619.87 2805.70i 0.0755187 0.130802i
\(773\) 3037.07 5260.36i 0.141314 0.244763i −0.786678 0.617364i \(-0.788201\pi\)
0.927992 + 0.372601i \(0.121534\pi\)
\(774\) −9020.08 + 15623.2i −0.418889 + 0.725537i
\(775\) −17831.1 30884.3i −0.826466 1.43148i
\(776\) −11469.8 −0.530597
\(777\) −1309.14 + 14553.8i −0.0604444 + 0.671960i
\(778\) 5949.23 0.274152
\(779\) 7581.64 + 13131.8i 0.348704 + 0.603973i
\(780\) −289.416 + 501.284i −0.0132856 + 0.0230113i
\(781\) −5191.89 + 8992.62i −0.237875 + 0.412012i
\(782\) −12124.0 + 20999.3i −0.554415 + 0.960274i
\(783\) −21806.9 −0.995292
\(784\) −1825.03 + 3161.05i −0.0831374 + 0.143998i
\(785\) −315.663 −0.0143522
\(786\) 704.052 + 1219.45i 0.0319500 + 0.0553390i
\(787\) 8222.13 0.372411 0.186205 0.982511i \(-0.440381\pi\)
0.186205 + 0.982511i \(0.440381\pi\)
\(788\) 12593.0 0.569299
\(789\) −651.315 1128.11i −0.0293884 0.0509022i
\(790\) 649.249 1124.53i 0.0292396 0.0506444i
\(791\) 39649.8 1.78228
\(792\) 4117.54 + 7131.78i 0.184735 + 0.319971i
\(793\) −18306.2 31707.3i −0.819764 1.41987i
\(794\) −11005.6 19062.3i −0.491908 0.852009i
\(795\) 324.192 561.518i 0.0144628 0.0250503i
\(796\) −4423.43 + 7661.60i −0.196965 + 0.341154i
\(797\) −15865.7 27480.2i −0.705134 1.22133i −0.966643 0.256127i \(-0.917553\pi\)
0.261509 0.965201i \(-0.415780\pi\)
\(798\) 6135.98 + 10627.8i 0.272195 + 0.471455i
\(799\) 2570.18 + 4451.68i 0.113800 + 0.197108i
\(800\) −3980.72 −0.175925
\(801\) −10701.0 + 18534.7i −0.472036 + 0.817591i
\(802\) −11819.7 20472.4i −0.520410 0.901377i
\(803\) 3292.56 0.144697
\(804\) 2001.79 0.0878081
\(805\) −1256.91 2177.03i −0.0550313 0.0953171i
\(806\) 39346.9 1.71952
\(807\) −1912.61 + 3312.74i −0.0834289 + 0.144503i
\(808\) −3867.87 −0.168405
\(809\) −4286.25 + 7424.01i −0.186275 + 0.322638i −0.944006 0.329930i \(-0.892975\pi\)
0.757730 + 0.652568i \(0.226308\pi\)
\(810\) 144.074 249.543i 0.00624967 0.0108248i
\(811\) −4034.56 + 6988.06i −0.174689 + 0.302570i −0.940054 0.341027i \(-0.889225\pi\)
0.765365 + 0.643597i \(0.222559\pi\)
\(812\) 8229.46 + 14253.8i 0.355662 + 0.616024i
\(813\) −4396.71 −0.189667
\(814\) 2115.89 23522.4i 0.0911082 1.01285i
\(815\) −190.604 −0.00819213
\(816\) −1944.36 3367.73i −0.0834144 0.144478i
\(817\) 21725.2 37629.1i 0.930316 1.61136i
\(818\) −2310.69 + 4002.23i −0.0987669 + 0.171069i
\(819\) 16088.0 27865.2i 0.686397 1.18887i
\(820\) 498.132 0.0212140
\(821\) −8924.58 + 15457.8i −0.379379 + 0.657103i −0.990972 0.134069i \(-0.957196\pi\)
0.611593 + 0.791172i \(0.290529\pi\)
\(822\) −5071.93 −0.215211
\(823\) −3987.27 6906.16i −0.168879 0.292508i 0.769147 0.639072i \(-0.220681\pi\)
−0.938026 + 0.346565i \(0.887348\pi\)
\(824\) −5611.71 −0.237249
\(825\) −17732.3 −0.748316
\(826\) 4466.18 + 7735.65i 0.188134 + 0.325857i
\(827\) 19717.5 34151.7i 0.829074 1.43600i −0.0696912 0.997569i \(-0.522201\pi\)
0.898765 0.438430i \(-0.144465\pi\)
\(828\) −10635.4 −0.446383
\(829\) 13596.0 + 23549.0i 0.569614 + 0.986601i 0.996604 + 0.0823441i \(0.0262407\pi\)
−0.426990 + 0.904256i \(0.640426\pi\)
\(830\) −679.928 1177.67i −0.0284345 0.0492501i
\(831\) 9924.61 + 17189.9i 0.414297 + 0.717584i
\(832\) 2196.01 3803.61i 0.0915061 0.158493i
\(833\) −10204.3 + 17674.3i −0.424438 + 0.735148i
\(834\) 1871.03 + 3240.73i 0.0776842 + 0.134553i
\(835\) −344.106 596.008i −0.0142614 0.0247015i
\(836\) −9917.24 17177.2i −0.410281 0.710627i
\(837\) 36309.0 1.49943
\(838\) −10428.3 + 18062.3i −0.429880 + 0.744574i
\(839\) −8976.25 15547.3i −0.369362 0.639753i 0.620104 0.784519i \(-0.287090\pi\)
−0.989466 + 0.144766i \(0.953757\pi\)
\(840\) 403.148 0.0165595
\(841\) 5255.77 0.215498
\(842\) −12564.4 21762.1i −0.514248 0.890704i
\(843\) 12493.3 0.510428
\(844\) 1264.32 2189.87i 0.0515636 0.0893108i
\(845\) −1950.07 −0.0793899
\(846\) −1127.30 + 1952.55i −0.0458127 + 0.0793499i
\(847\) 16991.1 29429.4i 0.689280 1.19387i
\(848\) −2459.89 + 4260.65i −0.0996142 + 0.172537i
\(849\) 11627.1 + 20138.7i 0.470013 + 0.814087i
\(850\) −22257.3 −0.898140
\(851\) 24942.3 + 17555.8i 1.00471 + 0.707173i
\(852\) 2150.66 0.0864794
\(853\) 2459.38 + 4259.77i 0.0987194 + 0.170987i 0.911155 0.412064i \(-0.135192\pi\)
−0.812435 + 0.583051i \(0.801859\pi\)
\(854\) −12750.0 + 22083.7i −0.510885 + 0.884880i
\(855\) −719.553 + 1246.30i −0.0287815 + 0.0498510i
\(856\) 3562.91 6171.14i 0.142264 0.246408i
\(857\) −34168.0 −1.36191 −0.680956 0.732325i \(-0.738435\pi\)
−0.680956 + 0.732325i \(0.738435\pi\)
\(858\) 9782.27 16943.4i 0.389232 0.674170i
\(859\) 31471.2 1.25004 0.625020 0.780608i \(-0.285091\pi\)
0.625020 + 0.780608i \(0.285091\pi\)
\(860\) −713.698 1236.16i −0.0282987 0.0490148i
\(861\) 10417.3 0.412334
\(862\) 18224.3 0.720097
\(863\) −4633.23 8024.99i −0.182754 0.316540i 0.760063 0.649849i \(-0.225168\pi\)
−0.942818 + 0.333309i \(0.891835\pi\)
\(864\) 2026.46 3509.94i 0.0797937 0.138207i
\(865\) 3058.20 0.120210
\(866\) 8620.44 + 14931.0i 0.338262 + 0.585886i
\(867\) −4197.65 7270.54i −0.164429 0.284799i
\(868\) −13702.3 23733.0i −0.535813 0.928055i
\(869\) −21944.6 + 38009.2i −0.856640 + 1.48374i
\(870\) 363.063 628.843i 0.0141483 0.0245055i
\(871\) 6320.61 + 10947.6i 0.245885 + 0.425885i
\(872\) −5894.38 10209.4i −0.228909 0.396483i
\(873\) −14064.2 24360.0i −0.545248 0.944398i
\(874\) 25615.7 0.991377
\(875\) 2313.03 4006.29i 0.0893655 0.154786i
\(876\) −340.973 590.582i −0.0131512 0.0227785i
\(877\) 7585.58 0.292072 0.146036 0.989279i \(-0.453349\pi\)
0.146036 + 0.989279i \(0.453349\pi\)
\(878\) −2614.78 −0.100506
\(879\) −2955.62 5119.29i −0.113414 0.196438i
\(880\) −651.585 −0.0249602
\(881\) 13118.8 22722.4i 0.501684 0.868943i −0.498314 0.866997i \(-0.666047\pi\)
0.999998 0.00194607i \(-0.000619455\pi\)
\(882\) −8951.37 −0.341733
\(883\) 2316.25 4011.86i 0.0882763 0.152899i −0.818506 0.574498i \(-0.805197\pi\)
0.906783 + 0.421599i \(0.138531\pi\)
\(884\) 12278.5 21267.0i 0.467162 0.809148i
\(885\) 197.037 341.278i 0.00748397 0.0129626i
\(886\) −13166.5 22805.0i −0.499250 0.864727i
\(887\) 937.723 0.0354968 0.0177484 0.999842i \(-0.494350\pi\)
0.0177484 + 0.999842i \(0.494350\pi\)
\(888\) −4438.30 + 2056.42i −0.167725 + 0.0777128i
\(889\) 57541.0 2.17082
\(890\) −846.697 1466.52i −0.0318892 0.0552337i
\(891\) −4869.69 + 8434.55i −0.183099 + 0.317136i
\(892\) 9511.61 16474.6i 0.357032 0.618397i
\(893\) 2715.15 4702.78i 0.101746 0.176229i
\(894\) −5442.91 −0.203622
\(895\) −1177.36 + 2039.24i −0.0439718 + 0.0761613i
\(896\) −3058.98 −0.114055
\(897\) 12633.5 + 21881.9i 0.470258 + 0.814511i
\(898\) −27714.7 −1.02990
\(899\) −49359.4 −1.83118
\(900\) −4881.13 8454.37i −0.180783 0.313125i
\(901\) −13753.9 + 23822.4i −0.508556 + 0.880844i
\(902\) −16836.8 −0.621514
\(903\) −14925.3 25851.5i −0.550038 0.952694i
\(904\) 6636.43 + 11494.6i 0.244164 + 0.422904i
\(905\) 326.272 + 565.120i 0.0119842 + 0.0207572i
\(906\) −5046.60 + 8740.96i −0.185057 + 0.320529i
\(907\) 12354.0 21397.8i 0.452269 0.783353i −0.546257 0.837617i \(-0.683948\pi\)
0.998527 + 0.0542640i \(0.0172813\pi\)
\(908\) 6151.49 + 10654.7i 0.224829 + 0.389415i
\(909\) −4742.76 8214.70i −0.173055 0.299741i
\(910\) 1272.93 + 2204.78i 0.0463706 + 0.0803163i
\(911\) 43065.2 1.56621 0.783103 0.621892i \(-0.213636\pi\)
0.783103 + 0.621892i \(0.213636\pi\)
\(912\) −2054.03 + 3557.69i −0.0745787 + 0.129174i
\(913\) 22981.6 + 39805.2i 0.833055 + 1.44289i
\(914\) −14276.5 −0.516656
\(915\) 1125.00 0.0406461
\(916\) −1435.44 2486.26i −0.0517776 0.0896815i
\(917\) 6193.22 0.223030
\(918\) 11330.5 19625.0i 0.407367 0.705580i
\(919\) −10234.4 −0.367356 −0.183678 0.982986i \(-0.558800\pi\)
−0.183678 + 0.982986i \(0.558800\pi\)
\(920\) 420.752 728.765i 0.0150780 0.0261159i
\(921\) 4816.87 8343.07i 0.172336 0.298495i
\(922\) 346.138 599.528i 0.0123638 0.0214148i
\(923\) 6790.66 + 11761.8i 0.242164 + 0.419440i
\(924\) −13626.4 −0.485147
\(925\) −2508.28 + 27884.6i −0.0891588 + 0.991179i
\(926\) 1184.77 0.0420452
\(927\) −6881.03 11918.3i −0.243800 0.422274i
\(928\) −2754.83 + 4771.50i −0.0974478 + 0.168785i
\(929\) 21571.9 37363.6i 0.761841 1.31955i −0.180059 0.983656i \(-0.557629\pi\)
0.941900 0.335892i \(-0.109038\pi\)
\(930\) −604.510 + 1047.04i −0.0213147 + 0.0369181i
\(931\) 21559.7 0.758958
\(932\) −7260.88 + 12576.2i −0.255191 + 0.442004i
\(933\) −27342.5 −0.959436
\(934\) 7407.74 + 12830.6i 0.259517 + 0.449496i
\(935\) −3643.19 −0.127428
\(936\) 10770.9 0.376132
\(937\) 6452.89 + 11176.7i 0.224981 + 0.389678i 0.956314 0.292343i \(-0.0944348\pi\)
−0.731333 + 0.682021i \(0.761101\pi\)
\(938\) 4402.21 7624.85i 0.153238 0.265416i
\(939\) −20944.0 −0.727883
\(940\) −89.1959 154.492i −0.00309495 0.00536061i
\(941\) 2572.99 + 4456.55i 0.0891361 + 0.154388i 0.907146 0.420816i \(-0.138256\pi\)
−0.818010 + 0.575204i \(0.804923\pi\)
\(942\) −1104.91 1913.76i −0.0382164 0.0661927i
\(943\) 10872.2 18831.1i 0.375447 0.650293i
\(944\) −1495.06 + 2589.52i −0.0515467 + 0.0892816i
\(945\) 1174.65 + 2034.55i 0.0404353 + 0.0700360i
\(946\) 24123.0 + 41782.2i 0.829076 + 1.43600i
\(947\) 17452.0 + 30227.8i 0.598855 + 1.03725i 0.992990 + 0.118194i \(0.0377106\pi\)
−0.394136 + 0.919052i \(0.628956\pi\)
\(948\) 9090.22 0.311431
\(949\) 2153.23 3729.50i 0.0736530 0.127571i
\(950\) 11756.4 + 20362.6i 0.401502 + 0.695423i
\(951\) 26425.8 0.901068
\(952\) −17103.6 −0.582281
\(953\) −26126.3 45252.1i −0.888053 1.53815i −0.842174 0.539206i \(-0.818724\pi\)
−0.0458792 0.998947i \(-0.514609\pi\)
\(954\) −12065.2 −0.409459
\(955\) −848.969 + 1470.46i −0.0287665 + 0.0498250i
\(956\) 1641.77 0.0555425
\(957\) −12271.5 + 21254.9i −0.414506 + 0.717945i
\(958\) 7511.24 13009.9i 0.253317 0.438757i
\(959\) −11153.8 + 19319.0i −0.375575 + 0.650515i
\(960\) 67.4773 + 116.874i 0.00226856 + 0.00392927i
\(961\) 52393.7 1.75871
\(962\) −25260.2 17779.6i −0.846593 0.595880i
\(963\) 17475.3 0.584769
\(964\) 4488.53 + 7774.36i 0.149964 + 0.259746i
\(965\) −314.321 + 544.419i −0.0104853 + 0.0181611i
\(966\) 8799.07 15240.4i 0.293070 0.507612i
\(967\) 9804.84 16982.5i 0.326063 0.564757i −0.655664 0.755053i \(-0.727611\pi\)
0.981727 + 0.190296i \(0.0609446\pi\)
\(968\) 11375.6 0.377712
\(969\) −11484.7 + 19892.0i −0.380743 + 0.659467i
\(970\) 2225.61 0.0736703
\(971\) 948.820 + 1643.40i 0.0313585 + 0.0543145i 0.881279 0.472597i \(-0.156683\pi\)
−0.849920 + 0.526911i \(0.823350\pi\)
\(972\) 15695.8 0.517946
\(973\) 16458.6 0.542281
\(974\) 10382.4 + 17982.8i 0.341553 + 0.591587i
\(975\) −11596.4 + 20085.5i −0.380904 + 0.659745i
\(976\) −8536.17 −0.279955
\(977\) −10786.8 18683.3i −0.353225 0.611804i 0.633587 0.773671i \(-0.281582\pi\)
−0.986813 + 0.161867i \(0.948248\pi\)
\(978\) −667.169 1155.57i −0.0218136 0.0377823i
\(979\) 28618.4 + 49568.4i 0.934266 + 1.61820i
\(980\) 354.130 613.372i 0.0115431 0.0199933i
\(981\) 14455.3 25037.3i 0.470461 0.814862i
\(982\) −789.050 1366.67i −0.0256411 0.0444117i
\(983\) −8544.27 14799.1i −0.277233 0.480181i 0.693463 0.720492i \(-0.256084\pi\)
−0.970696 + 0.240311i \(0.922751\pi\)
\(984\) 1743.60 + 3020.00i 0.0564877 + 0.0978396i
\(985\) −2443.55 −0.0790438
\(986\) −15403.0 + 26678.7i −0.497496 + 0.861688i
\(987\) −1865.33 3230.84i −0.0601561 0.104193i
\(988\) −25942.2 −0.835356
\(989\) −62308.3 −2.00333
\(990\) −798.969 1383.86i −0.0256494 0.0444261i
\(991\) −48873.0 −1.56660 −0.783301 0.621642i \(-0.786466\pi\)
−0.783301 + 0.621642i \(0.786466\pi\)
\(992\) 4586.86 7944.68i 0.146807 0.254278i
\(993\) −11683.5 −0.373377
\(994\) 4729.60 8191.90i 0.150919 0.261400i
\(995\) 858.324 1486.66i 0.0273475 0.0473672i
\(996\) 4759.88 8244.35i 0.151428 0.262281i
\(997\) −9047.11 15670.0i −0.287387 0.497769i 0.685798 0.727792i \(-0.259453\pi\)
−0.973185 + 0.230023i \(0.926120\pi\)
\(998\) −25194.1 −0.799102
\(999\) −23309.9 16406.8i −0.738232 0.519609i
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.b.63.2 yes 10
3.2 odd 2 666.4.f.d.433.4 10
37.10 even 3 inner 74.4.c.b.47.2 10
111.47 odd 6 666.4.f.d.343.4 10
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
74.4.c.b.47.2 10 37.10 even 3 inner
74.4.c.b.63.2 yes 10 1.1 even 1 trivial
666.4.f.d.343.4 10 111.47 odd 6
666.4.f.d.433.4 10 3.2 odd 2