LMFDB - Embedded newform 65.2.b.a.14.1

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [65,2,Mod(14,65)]

mf = mfinit([N,k,chi],0)

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(65, base_ring=CyclotomicField(2))

chi = DirichletCharacter(H, H._module([1, 0]))

N = Newforms(chi, 2, names="a")

//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code

chi := DirichletCharacter("65.14");

S:= CuspForms(chi, 2);

N := Newforms(S);

Level:	$ N $	$=$	$ 65 = 5 \cdot 13 $
Weight:	$ k $	$=$	$ 2 $
Character orbit:	$[\chi]$	$=$	65.b (of order $2$, degree $1$, 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:	$0.519027613138$
Analytic rank:	$0$
Dimension:	$6$
Coefficient field:	6.0.350464.1
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{6} - 2x^{5} + 2x^{4} + 2x^{3} + 4x^{2} - 4x + 2 $ x^6 - 2x^5 + 2x^4 + 2x^3 + 4x^2 - 4*x + 2
Coefficient ring:	$\Z[a_1, a_2, a_3]$
Coefficient ring index:	$ 2 $
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label			14.1
Root			$0.403032 - 0.403032i$ of defining polynomial
Character	$\chi$	$=$	65.14
Dual form			65.2.b.a.14.6

$q$-expansion

comment: q-expansion

sage: f.q_expansion() # note that sage often uses an isomorphic number field

gp: mfcoefs(f, 20)

$f(q)$	$=$	$q-2.67513i q^{2} -0.481194i q^{3} -5.15633 q^{4} +(1.67513 + 1.48119i) q^{5} -1.28726 q^{6} -0.806063i q^{7} +8.44358i q^{8} +2.76845 q^{9} +O(q^{10})$	\(q-2.67513i q^{2} -0.481194i q^{3} -5.15633 q^{4} +(1.67513 + 1.48119i) q^{5} -1.28726 q^{6} -0.806063i q^{7} +8.44358i q^{8} +2.76845 q^{9} +(3.96239 - 4.48119i) q^{10} -3.67513 q^{11} +2.48119i q^{12} -1.00000i q^{13} -2.15633 q^{14} +(0.712742 - 0.806063i) q^{15} +12.2750 q^{16} +1.35026i q^{17} -7.40597i q^{18} +1.67513 q^{19} +(-8.63752 - 7.63752i) q^{20} -0.387873 q^{21} +9.83146i q^{22} +6.48119i q^{23} +4.06300 q^{24} +(0.612127 + 4.96239i) q^{25} -2.67513 q^{26} -2.77575i q^{27} +4.15633i q^{28} -2.41819 q^{29} +(-2.15633 - 1.90668i) q^{30} -5.28726 q^{31} -15.9502i q^{32} +1.76845i q^{33} +3.61213 q^{34} +(1.19394 - 1.35026i) q^{35} -14.2750 q^{36} -3.76845i q^{37} -4.48119i q^{38} -0.481194 q^{39} +(-12.5066 + 14.1441i) q^{40} -8.31265 q^{41} +1.03761i q^{42} -6.79384i q^{43} +18.9502 q^{44} +(4.63752 + 4.10062i) q^{45} +17.3380 q^{46} -3.19394i q^{47} -5.90668i q^{48} +6.35026 q^{49} +(13.2750 - 1.63752i) q^{50} +0.649738 q^{51} +5.15633i q^{52} +5.73813i q^{53} -7.42548 q^{54} +(-6.15633 - 5.44358i) q^{55} +6.80606 q^{56} -0.806063i q^{57} +6.46898i q^{58} -5.98778 q^{59} +(-3.67513 + 4.15633i) q^{60} -1.76845 q^{61} +14.1441i q^{62} -2.23155i q^{63} -18.1187 q^{64} +(1.48119 - 1.67513i) q^{65} +4.73084 q^{66} -9.89446i q^{67} -6.96239i q^{68} +3.11871 q^{69} +(-3.61213 - 3.19394i) q^{70} +8.56230 q^{71} +23.3757i q^{72} -11.7685i q^{73} -10.0811 q^{74} +(2.38787 - 0.294552i) q^{75} -8.63752 q^{76} +2.96239i q^{77} +1.28726i q^{78} +2.26187 q^{79} +(20.5623 + 18.1817i) q^{80} +6.96968 q^{81} +22.2374i q^{82} +3.84367i q^{83} +2.00000 q^{84} +(-2.00000 + 2.26187i) q^{85} -18.1744 q^{86} +1.16362i q^{87} -31.0313i q^{88} -2.77575 q^{89} +(10.9697 - 12.4060i) q^{90} -0.806063 q^{91} -33.4191i q^{92} +2.54420i q^{93} -8.54420 q^{94} +(2.80606 + 2.48119i) q^{95} -7.67513 q^{96} +1.87399i q^{97} -16.9878i q^{98} -10.1744 q^{99} +O(q^{100})\)
$\operatorname{Tr}(f)(q)$	$=$	$ 6 q - 10 q^{4} + 4 q^{6} - 6 q^{9}+O(q^{10}) $ 6 * q - 10 * q^4 + 4 * q^6 - 6 * q^9	$ 6 q - 10 q^{4} + 4 q^{6} - 6 q^{9} + 2 q^{10} - 12 q^{11} + 8 q^{14} + 16 q^{15} + 10 q^{16} - 20 q^{20} - 4 q^{21} + 16 q^{24} + 2 q^{25} - 6 q^{26} - 12 q^{29} + 8 q^{30} - 20 q^{31} + 20 q^{34} + 8 q^{35} - 22 q^{36} + 8 q^{39} - 34 q^{40} - 8 q^{41} + 40 q^{44} - 4 q^{45} + 32 q^{46} + 18 q^{49} + 16 q^{50} + 24 q^{51} - 68 q^{54} - 16 q^{55} + 40 q^{56} + 16 q^{59} - 12 q^{60} + 12 q^{61} - 66 q^{64} - 2 q^{65} - 16 q^{66} - 24 q^{69} - 20 q^{70} - 24 q^{71} + 4 q^{74} + 16 q^{75} - 20 q^{76} + 32 q^{79} + 48 q^{80} + 46 q^{81} + 12 q^{84} - 12 q^{85} - 32 q^{86} - 20 q^{89} + 70 q^{90} - 4 q^{91} - 32 q^{94} + 16 q^{95} - 36 q^{96} + 16 q^{99}+O(q^{100}) $ 6 * q - 10 * q^4 + 4 * q^6 - 6 * q^9 + 2 * q^10 - 12 * q^11 + 8 * q^14 + 16 * q^15 + 10 * q^16 - 20 * q^20 - 4 * q^21 + 16 * q^24 + 2 * q^25 - 6 * q^26 - 12 * q^29 + 8 * q^30 - 20 * q^31 + 20 * q^34 + 8 * q^35 - 22 * q^36 + 8 * q^39 - 34 * q^40 - 8 * q^41 + 40 * q^44 - 4 * q^45 + 32 * q^46 + 18 * q^49 + 16 * q^50 + 24 * q^51 - 68 * q^54 - 16 * q^55 + 40 * q^56 + 16 * q^59 - 12 * q^60 + 12 * q^61 - 66 * q^64 - 2 * q^65 - 16 * q^66 - 24 * q^69 - 20 * q^70 - 24 * q^71 + 4 * q^74 + 16 * q^75 - 20 * q^76 + 32 * q^79 + 48 * q^80 + 46 * q^81 + 12 * q^84 - 12 * q^85 - 32 * q^86 - 20 * q^89 + 70 * q^90 - 4 * q^91 - 32 * q^94 + 16 * q^95 - 36 * q^96 + 16 * q^99

Display 100 coefficients 10 coefficients

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/65\mathbb{Z}\right)^\times$.

$n$	$27$	$41$
$\chi(n)$	$-1$	$1$

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 $a_p$)

$n$	$a_n$			$a_n / n^{(k-1)/2}$			$ \alpha_n $			$ \theta_n $
$p$	$a_p$			$a_p / p^{(k-1)/2}$			$ \alpha_p$			$ \theta_p $

$2$		−	2.67513i		−	1.89160i	−0.324745	−	0.945802i	$-0.605279\pi$
$2$		−	2.67513i		−	1.89160i	0.324745	−	0.945802i	$-0.394721\pi$
$3$		−	0.481194i		−	0.277818i	−0.990305	−	0.138909i	$-0.955641\pi$
$3$		−	0.481194i		−	0.277818i	0.990305	−	0.138909i	$-0.0443595\pi$
$4$	−5.15633			−2.57816
$5$	1.67513	+	1.48119i	0.749141	+	0.662410i
$5$	1.67513	+	1.48119i	0.749141	+	0.662410i
$6$	−1.28726			−0.525521
$7$		−	0.806063i		−	0.304663i	−0.988329	−	0.152332i	$-0.951322\pi$
$7$		−	0.806063i		−	0.304663i	0.988329	−	0.152332i	$-0.0486782\pi$
$8$			8.44358i			2.98526i
$9$	2.76845			0.922817
$10$	3.96239	−	4.48119i	1.25302	−	1.41708i
$11$	−3.67513			−1.10809			−0.554047	−	0.832486i	$-0.686917\pi$
$11$	−3.67513			−1.10809			−0.554047	+	0.832486i	$0.686917\pi$
$12$			2.48119i			0.716259i
$13$		−	1.00000i		−	0.277350i
$13$		−	1.00000i		−	0.277350i
$14$	−2.15633			−0.576302
$15$	0.712742	−	0.806063i	0.184029	−	0.208125i
$16$	12.2750			3.06876
$17$			1.35026i			0.327487i	0.986503	+	0.163743i	$0.0523569\pi$
$17$			1.35026i			0.327487i	−0.986503	+	0.163743i	$0.947643\pi$
$18$		−	7.40597i		−	1.74560i
$19$	1.67513			0.384301			0.192151	−	0.981365i	$-0.438454\pi$
$19$	1.67513			0.384301			0.192151	+	0.981365i	$0.438454\pi$
$20$	−8.63752	−	7.63752i	−1.93141	−	1.70780i
$21$	−0.387873			−0.0846409
$22$			9.83146i			2.09607i
$23$			6.48119i			1.35142i	0.737166	+	0.675711i	$0.236163\pi$
$23$			6.48119i			1.35142i	−0.737166	+	0.675711i	$0.763837\pi$
$24$	4.06300			0.829357
$25$	0.612127	+	4.96239i	0.122425	+	0.992478i
$26$	−2.67513			−0.524636
$27$		−	2.77575i		−	0.534193i
$28$			4.15633i			0.785472i
$29$	−2.41819			−0.449047			−0.224523	−	0.974469i	$-0.572083\pi$
$29$	−2.41819			−0.449047			−0.224523	+	0.974469i	$0.572083\pi$
$30$	−2.15633	−	1.90668i	−0.393689	−	0.348110i
$31$	−5.28726			−0.949620			−0.474810	−	0.880088i	$-0.657483\pi$
$31$	−5.28726			−0.949620			−0.474810	+	0.880088i	$0.657483\pi$
$32$		−	15.9502i		−	2.81962i
$33$			1.76845i			0.307848i
$34$	3.61213			0.619475
$35$	1.19394	−	1.35026i	0.201812	−	0.228236i
$36$	−14.2750			−2.37917
$37$		−	3.76845i		−	0.619530i	−0.950813	−	0.309765i	$-0.899750\pi$
$37$		−	3.76845i		−	0.619530i	0.950813	−	0.309765i	$-0.100250\pi$
$38$		−	4.48119i		−	0.726946i
$39$	−0.481194			−0.0770528
$40$	−12.5066	+	14.1441i	−1.97747	+	2.23638i
$41$	−8.31265			−1.29822			−0.649109	−	0.760695i	$-0.724858\pi$
$41$	−8.31265			−1.29822			−0.649109	+	0.760695i	$0.724858\pi$
$42$			1.03761i			0.160107i
$43$		−	6.79384i		−	1.03605i	−0.855365	−	0.518026i	$-0.826667\pi$
$43$		−	6.79384i		−	1.03605i	0.855365	−	0.518026i	$-0.173333\pi$
$44$	18.9502			2.85685
$45$	4.63752	+	4.10062i	0.691321	+	0.611284i
$46$	17.3380			2.55635
$47$		−	3.19394i		−	0.465884i	−0.972491	−	0.232942i	$-0.925165\pi$
$47$		−	3.19394i		−	0.465884i	0.972491	−	0.232942i	$-0.0748352\pi$
$48$		−	5.90668i		−	0.852556i
$49$	6.35026			0.907180
$50$	13.2750	−	1.63752i	1.87737	−	0.231580i
$51$	0.649738			0.0909816
$52$			5.15633i			0.715054i
$53$			5.73813i			0.788193i	0.919069	+	0.394097i	$0.128943\pi$
$53$			5.73813i			0.788193i	−0.919069	+	0.394097i	$0.871057\pi$
$54$	−7.42548			−1.01048
$55$	−6.15633	−	5.44358i	−0.830119	−	0.734013i
$56$	6.80606			0.909498
$57$		−	0.806063i		−	0.106766i
$58$			6.46898i			0.849418i
$59$	−5.98778			−0.779543			−0.389771	−	0.920912i	$-0.627446\pi$
$59$	−5.98778			−0.779543			−0.389771	+	0.920912i	$0.627446\pi$
$60$	−3.67513	+	4.15633i	−0.474457	+	0.536579i
$61$	−1.76845			−0.226427			−0.113214	−	0.993571i	$-0.536114\pi$
$61$	−1.76845			−0.226427			−0.113214	+	0.993571i	$0.536114\pi$
$62$			14.1441i			1.79630i
$63$		−	2.23155i		−	0.281149i
$64$	−18.1187			−2.26484
$65$	1.48119	−	1.67513i	0.183720	−	0.207774i
$66$	4.73084			0.582326
$67$		−	9.89446i		−	1.20880i	−0.796681	−	0.604400i	$-0.793413\pi$
$67$		−	9.89446i		−	1.20880i	0.796681	−	0.604400i	$-0.206587\pi$
$68$		−	6.96239i		−	0.844314i
$69$	3.11871			0.375449
$70$	−3.61213	−	3.19394i	−0.431732	−	0.381748i
$71$	8.56230			1.01616			0.508079	−	0.861311i	$-0.330356\pi$
$71$	8.56230			1.01616			0.508079	+	0.861311i	$0.330356\pi$
$72$			23.3757i			2.75485i
$73$		−	11.7685i		−	1.37739i	−0.725050	−	0.688697i	$-0.758183\pi$
$73$		−	11.7685i		−	1.37739i	0.725050	−	0.688697i	$-0.241817\pi$
$74$	−10.0811			−1.17190
$75$	2.38787	−	0.294552i	0.275728	−	0.0340119i
$76$	−8.63752			−0.990791
$77$			2.96239i			0.337596i
$78$			1.28726i			0.145753i
$79$	2.26187			0.254480			0.127240	−	0.991872i	$-0.459388\pi$
$79$	2.26187			0.254480			0.127240	+	0.991872i	$0.459388\pi$
$80$	20.5623	+	18.1817i	2.29893	+	2.03278i
$81$	6.96968			0.774409
$82$			22.2374i			2.45571i
$83$			3.84367i			0.421898i	0.977497	+	0.210949i	$0.0676554\pi$
$83$			3.84367i			0.421898i	−0.977497	+	0.210949i	$0.932345\pi$
$84$	2.00000			0.218218
$85$	−2.00000	+	2.26187i	−0.216930	+	0.245334i
$86$	−18.1744			−1.95980
$87$			1.16362i			0.124753i
$88$		−	31.0313i		−	3.30794i
$89$	−2.77575			−0.294229			−0.147114	−	0.989120i	$-0.546999\pi$
$89$	−2.77575			−0.294229			−0.147114	+	0.989120i	$0.546999\pi$
$90$	10.9697	−	12.4060i	1.15631	−	1.30770i
$91$	−0.806063			−0.0844984
$92$		−	33.4191i		−	3.48419i
$93$			2.54420i			0.263821i
$94$	−8.54420			−0.881267
$95$	2.80606	+	2.48119i	0.287896	+	0.254565i
$96$	−7.67513			−0.783340
$97$			1.87399i			0.190275i	0.995464	+	0.0951375i	$0.0303291\pi$
$97$			1.87399i			0.190275i	−0.995464	+	0.0951375i	$0.969671\pi$
$98$		−	16.9878i		−	1.71603i
$99$	−10.1744			−1.02257
$100$	−3.15633	−	25.5877i	−0.315633	−	2.55877i
$101$	10.4993			1.04472			0.522359	−	0.852725i	$-0.325052\pi$
$101$	10.4993			1.04472			0.522359	+	0.852725i	$0.325052\pi$
$102$		−	1.73813i		−	0.172101i
$103$			15.3684i			1.51429i	0.653247	+	0.757145i	$0.273406\pi$
$103$			15.3684i			1.51429i	−0.653247	+	0.757145i	$0.726594\pi$
$104$	8.44358			0.827961
$105$	−0.649738	−	0.574515i	−0.0634080	−	0.0560670i
$106$	15.3503			1.49095
$107$		−	11.1309i		−	1.07607i	−0.842923	−	0.538034i	$-0.819167\pi$
$107$		−	11.1309i		−	1.07607i	0.842923	−	0.538034i	$-0.180833\pi$
$108$			14.3127i			1.37724i
$109$	−9.58769			−0.918334			−0.459167	−	0.888350i	$-0.651852\pi$
$109$	−9.58769			−0.918334			−0.459167	+	0.888350i	$0.651852\pi$
$110$	−14.5623	+	16.4690i	−1.38846	+	1.57026i
$111$	−1.81336			−0.172116
$112$		−	9.89446i		−	0.934939i
$113$			0.574515i			0.0540459i	0.999635	+	0.0270229i	$0.00860271\pi$
$113$			0.574515i			0.0540459i	−0.999635	+	0.0270229i	$0.991397\pi$
$114$	−2.15633			−0.201958
$115$	−9.59991	+	10.8568i	−0.895196	+	1.01241i
$116$	12.4690			1.15772
$117$		−	2.76845i		−	0.255943i
$118$			16.0181i			1.47459i
$119$	1.08840			0.0997732
$120$	6.80606	+	6.01810i	0.621306	+	0.549375i
$121$	2.50659			0.227872
$122$			4.73084i			0.428310i
$123$			4.00000i			0.360668i
$124$	27.2628			2.44827
$125$	−6.32487	+	9.21933i	−0.565713	+	0.824602i
$126$	−5.96968			−0.531822
$127$			4.29455i			0.381080i	0.981679	+	0.190540i	$0.0610239\pi$
$127$			4.29455i			0.381080i	−0.981679	+	0.190540i	$0.938976\pi$
$128$			16.5696i			1.46456i
$129$	−3.26916			−0.287833
$130$	−4.48119	−	3.96239i	−0.393027	−	0.347524i
$131$	−0.836381			−0.0730749			−0.0365375	−	0.999332i	$-0.511633\pi$
$131$	−0.836381			−0.0730749			−0.0365375	+	0.999332i	$0.511633\pi$
$132$		−	9.11871i		−	0.793682i
$133$		−	1.35026i		−	0.117083i
$134$	−26.4690			−2.28657
$135$	4.11142	−	4.64974i	0.353855	−	0.400186i
$136$	−11.4010			−0.977632
$137$			14.9380i			1.27624i	0.769939	+	0.638118i	$0.220287\pi$
$137$			14.9380i			1.27624i	−0.769939	+	0.638118i	$0.779713\pi$
$138$		−	8.34297i		−	0.710201i
$139$	8.43866			0.715758			0.357879	−	0.933768i	$-0.383500\pi$
$139$	8.43866			0.715758			0.357879	+	0.933768i	$0.383500\pi$
$140$	−6.15633	+	6.96239i	−0.520304	+	0.588429i
$141$	−1.53690			−0.129431
$142$		−	22.9053i		−	1.92217i
$143$			3.67513i			0.307330i
$144$	33.9829			2.83190
$145$	−4.05079	−	3.58181i	−0.336399	−	0.297453i
$146$	−31.4821			−2.60548
$147$		−	3.05571i		−	0.252031i
$148$			19.4314i			1.59725i
$149$	11.3503			0.929850			0.464925	−	0.885350i	$-0.346081\pi$
$149$	11.3503			0.929850			0.464925	+	0.885350i	$0.346081\pi$
$150$	−0.787965	−	6.38787i	−0.0643371	−	0.521568i
$151$	13.9878			1.13831			0.569155	−	0.822230i	$-0.307271\pi$
$151$	13.9878			1.13831			0.569155	+	0.822230i	$0.307271\pi$
$152$			14.1441i			1.14724i
$153$			3.73813i			0.302210i
$154$	7.92478			0.638597
$155$	−8.85685	−	7.83146i	−0.711399	−	0.629038i
$156$	2.48119			0.198655
$157$		−	2.77575i		−	0.221529i	−0.993847	−	0.110764i	$-0.964670\pi$
$157$		−	2.77575i		−	0.221529i	0.993847	−	0.110764i	$-0.0353299\pi$
$158$		−	6.05079i		−	0.481375i
$159$	2.76116			0.218974
$160$	23.6253	−	26.7186i	1.86774	−	2.11229i
$161$	5.22425			0.411729
$162$		−	18.6448i		−	1.46487i
$163$			2.23155i			0.174788i	0.996174	+	0.0873942i	$0.0278540\pi$
$163$			2.23155i			0.174788i	−0.996174	+	0.0873942i	$0.972146\pi$
$164$	42.8627			3.34702
$165$	−2.61942	+	2.96239i	−0.203922	+	0.230622i
$166$	10.2823			0.798064
$167$			15.6932i			1.21438i	0.794557	+	0.607189i	$0.207703\pi$
$167$			15.6932i			1.21438i	−0.794557	+	0.607189i	$0.792297\pi$
$168$		−	3.27504i		−	0.252675i
$169$	−1.00000			−0.0769231
$170$	6.05079	+	5.35026i	0.464074	+	0.410346i
$171$	4.63752			0.354640
$172$			35.0313i			2.67111i
$173$		−	25.5877i		−	1.94540i	−0.232075	−	0.972698i	$-0.574551\pi$
$173$		−	25.5877i		−	1.94540i	0.232075	−	0.972698i	$-0.425449\pi$
$174$	3.11283			0.235983
$175$	4.00000	−	0.493413i	0.302372	−	0.0372985i
$176$	−45.1124			−3.40047
$177$			2.88129i			0.216571i
$178$			7.42548i			0.556564i
$179$	−12.1260			−0.906340			−0.453170	−	0.891424i	$-0.649707\pi$
$179$	−12.1260			−0.906340			−0.453170	+	0.891424i	$0.649707\pi$
$180$	−23.9126	−	21.1441i	−1.78234	−	1.57599i
$181$	−2.73084			−0.202982			−0.101491	−	0.994836i	$-0.532361\pi$
$181$	−2.73084			−0.202982			−0.101491	+	0.994836i	$0.532361\pi$
$182$			2.15633i			0.159837i
$183$			0.850969i			0.0629054i
$184$	−54.7245			−4.03434
$185$	5.58181	−	6.31265i	0.410383	−	0.464115i
$186$	6.80606			0.499045
$187$		−	4.96239i		−	0.362886i
$188$			16.4690i			1.20112i
$189$	−2.23743			−0.162749
$190$	6.63752	−	7.50659i	0.481536	−	0.544585i
$191$	20.6253			1.49239			0.746197	−	0.665725i	$-0.231878\pi$
$191$	20.6253			1.49239			0.746197	+	0.665725i	$0.231878\pi$
$192$			8.71862i			0.629212i
$193$		−	21.7889i		−	1.56840i	−0.620508	−	0.784200i	$-0.713073\pi$
$193$		−	21.7889i		−	1.56840i	0.620508	−	0.784200i	$-0.286927\pi$
$194$	5.01317			0.359925
$195$	−0.806063	−	0.712742i	−0.0577234	−	0.0510405i
$196$	−32.7440			−2.33886
$197$		−	2.00000i		−	0.142494i	−0.997459	−	0.0712470i	$-0.977302\pi$
$197$		−	2.00000i		−	0.142494i	0.997459	−	0.0712470i	$-0.0226979\pi$
$198$			27.2179i			1.93429i
$199$	16.7513			1.18747			0.593734	−	0.804661i	$-0.297653\pi$
$199$	16.7513			1.18747			0.593734	+	0.804661i	$0.297653\pi$
$200$	−41.9003	+	5.16854i	−2.96280	+	0.365471i
$201$	−4.76116			−0.335826
$202$		−	28.0870i		−	1.97619i
$203$			1.94921i			0.136808i
$204$	−3.35026			−0.234565
$205$	−13.9248	−	12.3127i	−0.972549	−	0.859953i
$206$	41.1124			2.86443
$207$			17.9429i			1.24712i
$208$		−	12.2750i		−	0.851121i
$209$	−6.15633			−0.425842
$210$	−1.53690	+	1.73813i	−0.106056	+	0.119943i
$211$	−4.90175			−0.337451			−0.168725	−	0.985663i	$-0.553965\pi$
$211$	−4.90175			−0.337451			−0.168725	+	0.985663i	$0.553965\pi$
$212$		−	29.5877i		−	2.03209i
$213$		−	4.12013i		−	0.282307i
$214$	−29.7767			−2.03549
$215$	10.0630	−	11.3806i	0.686291	−	0.776149i
$216$	23.4372			1.59470
$217$			4.26187i			0.289314i
$218$			25.6483i			1.73712i
$219$	−5.66291			−0.382664
$220$	31.7440	+	28.0689i	2.14018	+	1.89240i
$221$	1.35026			0.0908284
$222$			4.85097i			0.325576i
$223$			24.9076i			1.66794i	0.551811	+	0.833969i	$0.313937\pi$
$223$			24.9076i			1.66794i	−0.551811	+	0.833969i	$0.686063\pi$
$224$	−12.8568			−0.859034
$225$	1.69464	+	13.7381i	0.112976	+	0.915876i
$226$	1.53690			0.102233
$227$		−	9.95509i		−	0.660743i	−0.943851	−	0.330371i	$-0.892826\pi$
$227$		−	9.95509i		−	0.660743i	0.943851	−	0.330371i	$-0.107174\pi$
$228$			4.15633i			0.275259i
$229$	−5.35026			−0.353555			−0.176778	−	0.984251i	$-0.556567\pi$
$229$	−5.35026			−0.353555			−0.176778	+	0.984251i	$0.556567\pi$
$230$	29.0435	+	25.6810i	1.91507	+	1.69336i
$231$	1.42548			0.0937900
$232$		−	20.4182i		−	1.34052i
$233$		−	10.7612i		−	0.704987i	−0.935814	−	0.352493i	$-0.885334\pi$
$233$		−	10.7612i		−	0.704987i	0.935814	−	0.352493i	$-0.114666\pi$
$234$	−7.40597			−0.484144
$235$	4.73084	−	5.35026i	0.308606	−	0.349013i
$236$	30.8749			2.00979
$237$		−	1.08840i		−	0.0706990i
$238$		−	2.91160i		−	0.188731i
$239$	11.8618			0.767274			0.383637	−	0.923484i	$-0.374671\pi$
$239$	11.8618			0.767274			0.383637	+	0.923484i	$0.374671\pi$
$240$	8.74894	−	9.89446i	0.564742	−	0.638685i
$241$	−28.6253			−1.84392			−0.921959	−	0.387288i	$-0.873412\pi$
$241$	−28.6253			−1.84392			−0.921959	+	0.387288i	$0.873412\pi$
$242$		−	6.70545i		−	0.431043i
$243$		−	11.6810i		−	0.749337i
$244$	9.11871			0.583766
$245$	10.6375	+	9.40597i	0.679606	+	0.600925i
$246$	10.7005			0.682240
$247$		−	1.67513i		−	0.106586i
$248$		−	44.6434i		−	2.83486i
$249$	1.84955			0.117211
$250$	24.6629	+	16.9199i	1.55982	+	1.07011i
$251$	−19.3865			−1.22366			−0.611831	−	0.790988i	$-0.709567\pi$
$251$	−19.3865			−1.22366			−0.611831	+	0.790988i	$0.709567\pi$
$252$			11.5066i			0.724847i
$253$		−	23.8192i		−	1.49750i
$254$	11.4885			0.720852
$255$	1.08840	+	0.962389i	0.0681580	+	0.0602671i
$256$	8.08840			0.505525
$257$		−	22.8627i		−	1.42614i	−0.701094	−	0.713069i	$-0.747305\pi$
$257$		−	22.8627i		−	1.42614i	0.701094	−	0.713069i	$-0.252695\pi$
$258$			8.74543i			0.544467i
$259$	−3.03761			−0.188748
$260$	−7.63752	+	8.63752i	−0.473659	+	0.535676i
$261$	−6.69464			−0.414388
$262$			2.23743i			0.138229i
$263$			21.8822i			1.34932i	0.738130	+	0.674658i	$0.235709\pi$
$263$			21.8822i			1.34932i	−0.738130	+	0.674658i	$0.764291\pi$
$264$	−14.9321			−0.919005
$265$	−8.49929	+	9.61213i	−0.522107	+	0.590468i
$266$	−3.61213			−0.221474
$267$			1.33567i			0.0817419i
$268$			51.0191i			3.11648i
$269$	−22.7513			−1.38717			−0.693586	−	0.720374i	$-0.743970\pi$
$269$	−22.7513			−1.38717			−0.693586	+	0.720374i	$0.743970\pi$
$270$	−12.4387	−	10.9986i	−0.756993	−	0.669353i
$271$	0.123638			0.00751049			0.00375525	−	0.999993i	$-0.498805\pi$
$271$	0.123638			0.00751049			0.00375525	+	0.999993i	$0.498805\pi$
$272$			16.5745i			1.00498i
$273$			0.387873i			0.0234751i
$274$	39.9610			2.41413
$275$	−2.24965	−	18.2374i	−0.135659	−	1.09976i
$276$	−16.0811			−0.967969
$277$			15.3503i			0.922308i	0.887320	+	0.461154i	$0.152564\pi$
$277$			15.3503i			0.922308i	−0.887320	+	0.461154i	$0.847436\pi$
$278$		−	22.5745i		−	1.35393i
$279$	−14.6375			−0.876325
$280$	11.4010	+	10.0811i	0.681343	+	0.602461i
$281$	13.9248			0.830683			0.415341	−	0.909666i	$-0.363662\pi$
$281$	13.9248			0.830683			0.415341	+	0.909666i	$0.363662\pi$
$282$			4.11142i			0.244831i
$283$			20.3815i			1.21156i	0.795634	+	0.605778i	$0.207138\pi$
$283$			20.3815i			1.21156i	−0.795634	+	0.605778i	$0.792862\pi$
$284$	−44.1500			−2.61982
$285$	1.19394	−	1.35026i	0.0707227	−	0.0799826i
$286$	9.83146			0.581346
$287$			6.70052i			0.395519i
$288$		−	44.1573i		−	2.60199i
$289$	15.1768			0.892753
$290$	−9.58181	+	10.8364i	−0.562663	+	0.636334i
$291$	0.901754			0.0528618
$292$			60.6820i			3.55114i
$293$			5.38058i			0.314337i	0.987572	+	0.157168i	$0.0502365\pi$
$293$			5.38058i			0.314337i	−0.987572	+	0.157168i	$0.949763\pi$
$294$	−8.17442			−0.476742
$295$	−10.0303	−	8.86907i	−0.583988	−	0.516377i
$296$	31.8192			1.84946
$297$			10.2012i			0.591935i
$298$		−	30.3634i		−	1.75891i
$299$	6.48119			0.374817
$300$	−12.3127	+	1.51881i	−0.710871	+	0.0876883i
$301$	−5.47627			−0.315647
$302$		−	37.4191i		−	2.15323i
$303$		−	5.05220i		−	0.290241i
$304$	20.5623			1.17933
$305$	−2.96239	−	2.61942i	−0.169626	−	0.149988i
$306$	10.0000			0.571662
$307$			19.1695i			1.09406i	0.837113	+	0.547031i	$0.184242\pi$
$307$			19.1695i			1.09406i	−0.837113	+	0.547031i	$0.815758\pi$
$308$		−	15.2750i		−	0.870376i
$309$	7.39517			0.420696
$310$	−20.9502	+	23.6932i	−1.18989	+	1.34568i
$311$	−25.2506			−1.43183			−0.715915	−	0.698187i	$-0.753990\pi$
$311$	−25.2506			−1.43183			−0.715915	+	0.698187i	$0.753990\pi$
$312$		−	4.06300i		−	0.230022i
$313$			2.81194i			0.158940i	0.996837	+	0.0794702i	$0.0253229\pi$
$313$			2.81194i			0.158940i	−0.996837	+	0.0794702i	$0.974677\pi$
$314$	−7.42548			−0.419044
$315$	3.30536	−	3.73813i	0.186236	−	0.210620i
$316$	−11.6629			−0.656090
$317$			23.7685i			1.33497i	0.744624	+	0.667485i	$0.232629\pi$
$317$			23.7685i			1.33497i	−0.744624	+	0.667485i	$0.767371\pi$
$318$		−	7.38646i		−	0.414212i
$319$	8.88717			0.497586
$320$	−30.3512	−	26.8373i	−1.69668	−	1.50025i
$321$	−5.35614			−0.298951
$322$		−	13.9756i		−	0.778828i
$323$			2.26187i			0.125854i
$324$	−35.9380			−1.99655
$325$	4.96239	−	0.612127i	0.275264	−	0.0339547i
$326$	5.96968			0.330630
$327$			4.61354i			0.255129i
$328$		−	70.1886i		−	3.87551i
$329$	−2.57452			−0.141938
$330$	7.92478	+	7.00729i	0.436245	+	0.385739i
$331$	−11.8011			−0.648649			−0.324325	−	0.945946i	$-0.605137\pi$
$331$	−11.8011			−0.648649			−0.324325	+	0.945946i	$0.605137\pi$
$332$		−	19.8192i		−	1.08772i
$333$		−	10.4328i		−	0.571713i
$334$	41.9814			2.29712
$335$	14.6556	−	16.5745i	0.800722	−	0.905563i
$336$	−4.76116			−0.259742
$337$		−	16.1114i		−	0.877645i	−0.898574	−	0.438822i	$-0.855396\pi$
$337$		−	16.1114i		−	0.877645i	0.898574	−	0.438822i	$-0.144604\pi$
$338$			2.67513i			0.145508i
$339$	0.276454			0.0150149
$340$	10.3127	−	11.6629i	0.559282	−	0.632510i
$341$	19.4314			1.05227
$342$		−	12.4060i		−	0.670838i
$343$		−	10.7612i		−	0.581048i
$344$	57.3644			3.09288
$345$	5.22425	+	4.61942i	0.281264	+	0.248701i
$346$	−68.4504			−3.67992
$347$		−	27.4944i		−	1.47598i	−0.674814	−	0.737988i	$-0.735776\pi$
$347$		−	27.4944i		−	1.47598i	0.674814	−	0.737988i	$-0.264224\pi$
$348$		−	6.00000i		−	0.321634i
$349$	17.6023			0.942228			0.471114	−	0.882072i	$-0.343852\pi$
$349$	17.6023			0.942228			0.471114	+	0.882072i	$0.343852\pi$
$350$	−1.31994	−	10.7005i	−0.0705540	−	0.571967i
$351$	−2.77575			−0.148158
$352$			58.6190i			3.12440i
$353$			15.7685i			0.839270i	0.907693	+	0.419635i	$0.137842\pi$
$353$			15.7685i			0.839270i	−0.907693	+	0.419635i	$0.862158\pi$
$354$	7.70782			0.409666
$355$	14.3430	+	12.6824i	0.761246	+	0.673113i
$356$	14.3127			0.758569
$357$		−	0.523730i		−	0.0277187i
$358$			32.4387i			1.71444i
$359$	14.8242			0.782389			0.391195	−	0.920308i	$-0.372062\pi$
$359$	14.8242			0.782389			0.391195	+	0.920308i	$0.372062\pi$
$360$	−34.6239	+	39.1573i	−1.82484	+	2.06377i
$361$	−16.1939			−0.852312
$362$			7.30536i			0.383961i
$363$		−	1.20616i		−	0.0633067i
$364$	4.15633			0.217851
$365$	17.4314	−	19.7137i	0.912399	−	1.03186i
$366$	2.27645			0.118992
$367$			27.0313i			1.41102i	0.708700	+	0.705510i	$0.249282\pi$
$367$			27.0313i			1.41102i	−0.708700	+	0.705510i	$0.750718\pi$
$368$			79.5569i			4.14719i
$369$	−23.0132			−1.19802
$370$	−16.8872	−	14.9321i	−0.877922	−	0.776281i
$371$	4.62530			0.240134
$372$		−	13.1187i		−	0.680174i
$373$			12.9525i			0.670657i	0.942101	+	0.335329i	$0.108847\pi$
$373$			12.9525i			0.670657i	−0.942101	+	0.335329i	$0.891153\pi$
$374$	−13.2750			−0.686436
$375$	4.43629	+	3.04349i	0.229089	+	0.157165i
$376$	26.9683			1.39078
$377$			2.41819i			0.124543i
$378$			5.98541i			0.307856i
$379$	30.2858			1.55568			0.777840	−	0.628463i	$-0.216316\pi$
$379$	30.2858			1.55568			0.777840	+	0.628463i	$0.216316\pi$
$380$	−14.4690	−	12.7938i	−0.742243	−	0.656310i
$381$	2.06651			0.105871
$382$		−	55.1754i		−	2.82302i
$383$		−	21.0943i		−	1.07787i	−0.842348	−	0.538934i	$-0.818827\pi$
$383$		−	21.0943i		−	1.07787i	0.842348	−	0.538934i	$-0.181173\pi$
$384$	7.97319			0.406880
$385$	−4.38787	+	4.96239i	−0.223627	+	0.252907i
$386$	−58.2882			−2.96679
$387$		−	18.8084i		−	0.956086i
$388$		−	9.66291i		−	0.490560i
$389$	6.77575			0.343544			0.171772	−	0.985137i	$-0.445051\pi$
$389$	6.77575			0.343544			0.171772	+	0.985137i	$0.445051\pi$
$390$	−1.90668	+	2.15633i	−0.0965484	+	0.109190i
$391$	−8.75131			−0.442573
$392$			53.6190i			2.70817i
$393$			0.402462i			0.0203015i
$394$	−5.35026			−0.269542
$395$	3.78892	+	3.35026i	0.190641	+	0.168570i
$396$	52.4626			2.63635
$397$		−	10.4690i		−	0.525423i	−0.964874	−	0.262711i	$-0.915383\pi$
$397$		−	10.4690i		−	0.525423i	0.964874	−	0.262711i	$-0.0846167\pi$
$398$		−	44.8119i		−	2.24622i
$399$	−0.649738			−0.0325276
$400$	7.51388	+	60.9135i	0.375694	+	3.04568i
$401$	5.01317			0.250346			0.125173	−	0.992135i	$-0.460051\pi$
$401$	5.01317			0.250346			0.125173	+	0.992135i	$0.460051\pi$
$402$			12.7367i			0.635250i
$403$			5.28726i			0.263377i
$404$	−54.1378			−2.69345
$405$	11.6751	+	10.3235i	0.580142	+	0.512977i
$406$	5.21440			0.258787
$407$			13.8496i			0.686497i
$408$			5.48612i			0.271603i
$409$	14.3879			0.711435			0.355717	−	0.934594i	$-0.384237\pi$
$409$	14.3879			0.711435			0.355717	+	0.934594i	$0.384237\pi$
$410$	−32.9380	+	37.2506i	−1.62669	+	1.83968i
$411$	7.18806			0.354561
$412$		−	79.2443i		−	3.90408i
$413$			4.82653i			0.237498i
$414$	47.9995			2.35905
$415$	−5.69323	+	6.43866i	−0.279470	+	0.316061i
$416$	−15.9502			−0.782021
$417$		−	4.06063i		−	0.198850i
$418$			16.4690i			0.805524i
$419$	−17.4617			−0.853059			−0.426529	−	0.904474i	$-0.640264\pi$
$419$	−17.4617			−0.853059			−0.426529	+	0.904474i	$0.640264\pi$
$420$	3.35026	+	2.96239i	0.163476	+	0.144550i
$421$	2.88717			0.140712			0.0703559	−	0.997522i	$-0.477586\pi$
$421$	2.88717			0.140712			0.0703559	+	0.997522i	$0.477586\pi$
$422$			13.1128i			0.638323i
$423$		−	8.84226i		−	0.429925i
$424$	−48.4504			−2.35296
$425$	−6.70052	+	0.826531i	−0.325023	+	0.0400927i
$426$	−11.0219			−0.534012
$427$			1.42548i			0.0689840i
$428$			57.3947i			2.77428i
$429$	1.76845			0.0853817
$430$	−30.4445	−	26.9199i	−1.46817	−	1.29819i
$431$	0.889535			0.0428474			0.0214237	−	0.999770i	$-0.493180\pi$
$431$	0.889535			0.0428474			0.0214237	+	0.999770i	$0.493180\pi$
$432$		−	34.0724i		−	1.63931i
$433$		−	25.2506i		−	1.21347i	−0.794906	−	0.606733i	$-0.792480\pi$
$433$		−	25.2506i		−	1.21347i	0.794906	−	0.606733i	$-0.207520\pi$
$434$	11.4010			0.547268
$435$	−1.72355	+	1.94921i	−0.0826377	+	0.0934577i
$436$	49.4372			2.36761
$437$			10.8568i			0.519354i
$438$			15.1490i			0.723849i
$439$	−28.8119			−1.37512			−0.687560	−	0.726128i	$-0.741318\pi$
$439$	−28.8119			−1.37512			−0.687560	+	0.726128i	$0.741318\pi$
$440$	45.9633	−	51.9814i	2.19122	−	2.47812i
$441$	17.5804			0.837162
$442$		−	3.61213i		−	0.171811i
$443$			36.9805i			1.75700i	0.477746	+	0.878498i	$0.341454\pi$
$443$			36.9805i			1.75700i	−0.477746	+	0.878498i	$0.658546\pi$
$444$	9.35026			0.443744
$445$	−4.64974	−	4.11142i	−0.220419	−	0.194900i
$446$	66.6312			3.15508
$447$		−	5.46168i		−	0.258329i
$448$			14.6048i			0.690013i
$449$	12.6859			0.598686			0.299343	−	0.954146i	$-0.403232\pi$
$449$	12.6859			0.598686			0.299343	+	0.954146i	$0.403232\pi$
$450$	36.7513	−	4.53339i	1.73247	−	0.213706i
$451$	30.5501			1.43855
$452$		−	2.96239i		−	0.139339i
$453$		−	6.73084i		−	0.316242i
$454$	−26.6312			−1.24986
$455$	−1.35026	−	1.19394i	−0.0633012	−	0.0559726i
$456$	6.80606			0.318723
$457$			25.0494i			1.17176i	0.810398	+	0.585880i	$0.199251\pi$
$457$			25.0494i			1.17176i	−0.810398	+	0.585880i	$0.800749\pi$
$458$			14.3127i			0.668786i
$459$	3.74798			0.174941
$460$	49.5002	−	55.9814i	2.30796	−	2.61015i
$461$	−36.8872			−1.71801			−0.859003	−	0.511970i	$-0.828916\pi$
$461$	−36.8872			−1.71801			−0.859003	+	0.511970i	$0.828916\pi$
$462$		−	3.81336i		−	0.177413i
$463$		−	39.0191i		−	1.81337i	−0.421809	−	0.906685i	$-0.638605\pi$
$463$		−	39.0191i		−	1.81337i	0.421809	−	0.906685i	$-0.361395\pi$
$464$	−29.6834			−1.37802
$465$	−3.76845	+	4.26187i	−0.174758	+	0.197639i
$466$	−28.7875			−1.33356
$467$		−	32.7694i		−	1.51639i	−0.652029	−	0.758194i	$-0.726082\pi$
$467$		−	32.7694i		−	1.51639i	0.652029	−	0.758194i	$-0.273918\pi$
$468$			14.2750i			0.659864i
$469$	−7.97556			−0.368277
$470$	−14.3127	−	12.6556i	−0.660193	−	0.583760i
$471$	−1.33567			−0.0615446
$472$		−	50.5583i		−	2.32714i
$473$			24.9683i			1.14804i
$474$	−2.91160			−0.133734
$475$	1.02539	+	8.31265i	0.0470482	+	0.381411i
$476$	−5.61213			−0.257231
$477$			15.8858i			0.727359i
$478$		−	31.7318i		−	1.45138i
$479$	−16.8749			−0.771036			−0.385518	−	0.922700i	$-0.625977\pi$
$479$	−16.8749			−0.771036			−0.385518	+	0.922700i	$0.625977\pi$
$480$	−12.8568	−	11.3684i	−0.586832	−	0.518892i
$481$	−3.76845			−0.171827
$482$			76.5764i			3.48796i
$483$		−	2.51388i		−	0.114386i
$484$	−12.9248			−0.587490
$485$	−2.77575	+	3.13918i	−0.126040	+	0.142543i
$486$	−31.2482			−1.41745
$487$			9.24472i			0.418918i	0.977817	+	0.209459i	$0.0671703\pi$
$487$			9.24472i			0.418918i	−0.977817	+	0.209459i	$0.932830\pi$
$488$		−	14.9321i		−	0.675943i
$489$	1.07381			0.0485593
$490$	25.1622	−	28.4568i	1.13671	−	1.28555i
$491$	−25.7499			−1.16208			−0.581038	−	0.813876i	$-0.697353\pi$
$491$	−25.7499			−1.16208			−0.581038	+	0.813876i	$0.697353\pi$
$492$		−	20.6253i		−	0.929860i
$493$		−	3.26519i		−	0.147057i
$494$	−4.48119			−0.201618
$495$	−17.0435	−	15.0703i	−0.766048	−	0.677360i
$496$	−64.9013			−2.91415
$497$		−	6.90175i		−	0.309586i
$498$		−	4.94780i		−	0.221716i
$499$	27.7015			1.24009			0.620044	−	0.784567i	$-0.287115\pi$
$499$	27.7015			1.24009			0.620044	+	0.784567i	$0.287115\pi$
$500$	32.6131	−	47.5379i	1.45850	−	2.12596i
$501$	7.55149			0.337376
$502$			51.8613i			2.31468i
$503$			2.35519i			0.105013i	0.998621	+	0.0525063i	$0.0167210\pi$
$503$			2.35519i			0.105013i	−0.998621	+	0.0525063i	$0.983279\pi$
$504$	18.8423			0.839301
$505$	17.5877	+	15.5515i	0.782642	+	0.692032i
$506$	−63.7196			−2.83268
$507$			0.481194i			0.0213706i
$508$		−	22.1441i		−	0.982486i
$509$	−21.5125			−0.953523			−0.476762	−	0.879033i	$-0.658190\pi$
$509$	−21.5125			−0.953523			−0.476762	+	0.879033i	$0.658190\pi$
$510$	2.57452	−	2.91160i	0.114001	−	0.128928i
$511$	−9.48612			−0.419641
$512$			11.5017i			0.508306i
$513$		−	4.64974i		−	0.205291i
$514$	−61.1608			−2.69769
$515$	−22.7635	+	25.7440i	−1.00308	+	1.13442i
$516$	16.8568			0.742081
$517$			11.7381i			0.516243i
$518$			8.12601i			0.357036i
$519$	−12.3127			−0.540465
$520$	14.1441	+	12.5066i	0.620260	+	0.548450i
$521$	37.7440			1.65360			0.826798	−	0.562499i	$-0.190160\pi$
$521$	37.7440			1.65360			0.826798	+	0.562499i	$0.190160\pi$
$522$			17.9090i			0.783858i
$523$			23.7416i			1.03815i	0.854729	+	0.519075i	$0.173723\pi$
$523$			23.7416i			1.03815i	−0.854729	+	0.519075i	$0.826277\pi$
$524$	4.31265			0.188399
$525$	−0.237428	−	1.92478i	−0.0103622	−	0.0840042i
$526$	58.5379			2.55237
$527$		−	7.13918i		−	0.310988i
$528$			21.7078i			0.944712i
$529$	−19.0059			−0.826343
$530$	25.7137	+	22.7367i	1.11693	+	0.987620i
$531$	−16.5769			−0.719376
$532$			6.96239i			0.301858i
$533$			8.31265i			0.360061i
$534$	3.57310			0.154623
$535$	16.4871	−	18.6458i	0.712798	−	0.806127i
$536$	83.5447			3.60858
$537$			5.83497i			0.251797i
$538$			60.8627i			2.62398i
$539$	−23.3380			−1.00524
$540$	−21.1998	+	23.9756i	−0.912295	+	1.03174i
$541$	13.0376			0.560531			0.280265	−	0.959923i	$-0.409578\pi$
$541$	13.0376			0.560531			0.280265	+	0.959923i	$0.409578\pi$
$542$		−	0.330749i		−	0.0142069i
$543$			1.31406i			0.0563919i
$544$	21.5369			0.923387
$545$	−16.0606	−	14.2012i	−0.687962	−	0.608314i
$546$	1.03761			0.0444057
$547$		−	8.43041i		−	0.360458i	−0.983625	−	0.180229i	$-0.942316\pi$
$547$		−	8.43041i		−	0.360458i	0.983625	−	0.180229i	$-0.0576839\pi$
$548$		−	77.0249i		−	3.29034i
$549$	−4.89587			−0.208951
$550$	−48.7875	+	6.01810i	−2.08031	+	0.256613i
$551$	−4.05079			−0.172569
$552$			26.3331i			1.12081i
$553$		−	1.82321i		−	0.0775306i
$554$	41.0640			1.74464
$555$	−3.03761	−	2.68594i	−0.128939	−	0.114012i
$556$	−43.5125			−1.84534
$557$		−	13.6932i		−	0.580201i	−0.956996	−	0.290100i	$-0.906311\pi$
$557$		−	13.6932i		−	0.580201i	0.956996	−	0.290100i	$-0.0936887\pi$
$558$			39.1573i			1.65766i
$559$	−6.79384			−0.287349
$560$	14.6556	−	16.5745i	0.619313	−	0.700401i
$561$	−2.38787			−0.100816
$562$		−	37.2506i		−	1.57132i
$563$		−	8.86907i		−	0.373787i	−0.982380	−	0.186893i	$-0.940158\pi$
$563$		−	8.86907i		−	0.373787i	0.982380	−	0.186893i	$-0.0598419\pi$
$564$	7.92478			0.333693
$565$	−0.850969	+	0.962389i	−0.0358005	+	0.0404880i
$566$	54.5233			2.29178
$567$		−	5.61801i		−	0.235934i
$568$			72.2965i			3.03349i
$569$	32.7816			1.37428			0.687139	−	0.726526i	$-0.258866\pi$
$569$	32.7816			1.37428			0.687139	+	0.726526i	$0.258866\pi$
$570$	−3.61213	−	3.19394i	−0.151295	−	0.133779i
$571$	40.2882			1.68601			0.843005	−	0.537906i	$-0.180785\pi$
$571$	40.2882			1.68601			0.843005	+	0.537906i	$0.180785\pi$
$572$		−	18.9502i		−	0.792346i
$573$		−	9.92478i		−	0.414614i
$574$	17.9248			0.748166
$575$	−32.1622	+	3.96731i	−1.34126	+	0.165448i
$576$	−50.1608			−2.09003
$577$		−	28.8568i		−	1.20133i	−0.799502	−	0.600663i	$-0.794903\pi$
$577$		−	28.8568i		−	1.20133i	0.799502	−	0.600663i	$-0.205097\pi$
$578$		−	40.5999i		−	1.68873i
$579$	−10.4847			−0.435729
$580$	20.8872	+	18.4690i	0.867292	+	0.766882i
$581$	3.09825			0.128537
$582$		−	2.41231i		−	0.0999935i
$583$		−	21.0884i		−	0.873392i
$584$	99.3679			4.11187
$585$	4.10062	−	4.63752i	0.169540	−	0.191738i
$586$	14.3938			0.594600
$587$		−	41.6786i		−	1.72026i	−0.510074	−	0.860131i	$-0.670382\pi$
$587$		−	41.6786i		−	1.72026i	0.510074	−	0.860131i	$-0.329618\pi$
$588$			15.7562i			0.649776i
$589$	−8.85685			−0.364940
$590$	−23.7259	+	26.8324i	−0.976781	+	1.10467i
$591$	−0.962389			−0.0395874
$592$		−	46.2579i		−	1.90119i
$593$			22.4993i			0.923935i	0.886897	+	0.461968i	$0.152856\pi$
$593$			22.4993i			0.923935i	−0.886897	+	0.461968i	$0.847144\pi$
$594$	27.2896			1.11971
$595$	1.82321	+	1.61213i	0.0747442	+	0.0660908i
$596$	−58.5256			−2.39730
$597$		−	8.06063i		−	0.329900i
$598$		−	17.3380i		−	0.709005i
$599$	−4.15045			−0.169583			−0.0847913	−	0.996399i	$-0.527022\pi$
$599$	−4.15045			−0.169583			−0.0847913	+	0.996399i	$0.527022\pi$
$600$	2.48707	+	20.1622i	0.101534	+	0.823119i
$601$	27.9248			1.13908			0.569538	−	0.821965i	$-0.307122\pi$
$601$	27.9248			1.13908			0.569538	+	0.821965i	$0.307122\pi$
$602$			14.6497i			0.597079i
$603$		−	27.3923i		−	1.11550i
$604$	−72.1255			−2.93475
$605$	4.19886	+	3.71274i	0.170708	+	0.150944i
$606$	−13.5153			−0.549021
$607$		−	8.19489i		−	0.332620i	−0.986073	−	0.166310i	$-0.946815\pi$
$607$		−	8.19489i		−	0.332620i	0.986073	−	0.166310i	$-0.0531853\pi$
$608$		−	26.7186i		−	1.08358i
$609$	0.937951			0.0380077
$610$	−7.00729	+	7.92478i	−0.283717	+	0.320865i
$611$	−3.19394			−0.129213
$612$		−	19.2750i		−	0.779147i
$613$			33.1392i			1.33848i	0.743047	+	0.669239i	$0.233380\pi$
$613$			33.1392i			1.33848i	−0.743047	+	0.669239i	$0.766620\pi$
$614$	51.2809			2.06953
$615$	−5.92478	+	6.70052i	−0.238910	+	0.270191i
$616$	−25.0132			−1.00781
$617$			29.0132i			1.16803i	0.811744	+	0.584013i	$0.198518\pi$
$617$			29.0132i			1.16803i	−0.811744	+	0.584013i	$0.801482\pi$
$618$		−	19.7830i		−	0.795791i
$619$	−12.2134			−0.490900			−0.245450	−	0.969409i	$-0.578936\pi$
$619$	−12.2134			−0.490900			−0.245450	+	0.969409i	$0.578936\pi$
$620$	45.6688	+	40.3815i	1.83410	+	1.62176i
$621$	17.9902			0.721920
$622$			67.5487i			2.70845i
$623$			2.23743i			0.0896406i
$624$	−5.90668			−0.236456
$625$	−24.2506	+	6.07522i	−0.970024	+	0.243009i
$626$	7.52232			0.300652
$627$			2.96239i			0.118306i
$628$			14.3127i			0.571137i
$629$	5.08840			0.202888
$630$	−10.0000	−	8.84226i	−0.398410	−	0.352284i
$631$	−1.22188			−0.0486424			−0.0243212	−	0.999704i	$-0.507742\pi$
$631$	−1.22188			−0.0486424			−0.0243212	+	0.999704i	$0.507742\pi$
$632$			19.0982i			0.759687i
$633$			2.35870i			0.0937498i
$634$	63.5837			2.52523
$635$	−6.36107	+	7.19394i	−0.252431	+	0.285483i
$636$	−14.2374			−0.564551
$637$		−	6.35026i		−	0.251607i
$638$		−	23.7743i		−	0.941235i
$639$	23.7043			0.937728
$640$	−24.5428	+	27.7562i	−0.970139	+	1.09716i
$641$	−22.1016			−0.872960			−0.436480	−	0.899714i	$-0.643775\pi$
$641$	−22.1016			−0.872960			−0.436480	+	0.899714i	$0.643775\pi$
$642$			14.3284i			0.565496i
$643$			11.6688i			0.460172i	0.973170	+	0.230086i	$0.0739008\pi$
$643$			11.6688i			0.460172i	−0.973170	+	0.230086i	$0.926099\pi$
$644$	−26.9380			−1.06150
$645$	−5.47627	−	4.84226i	−0.215628	−	0.190664i
$646$	6.05079			0.238065
$647$		−	11.9575i		−	0.470096i	−0.971984	−	0.235048i	$-0.924475\pi$
$647$		−	11.9575i		−	0.470096i	0.971984	−	0.235048i	$-0.0755248\pi$
$648$			58.8491i			2.31181i
$649$	22.0059			0.863806
$650$	−1.63752	−	13.2750i	−0.0642288	−	0.520690i
$651$	2.05079			0.0803766
$652$		−	11.5066i		−	0.450633i
$653$		−	10.9986i		−	0.430408i	−0.976569	−	0.215204i	$-0.930958\pi$
$653$		−	10.9986i		−	0.430408i	0.976569	−	0.215204i	$-0.0690416\pi$
$654$	12.3418			0.482604
$655$	−1.40105	−	1.23884i	−0.0547434	−	0.0484056i
$656$	−102.038			−3.98392
$657$		−	32.5804i		−	1.27108i
$658$			6.88717i			0.268490i
$659$	2.63989			0.102835			0.0514177	−	0.998677i	$-0.483626\pi$
$659$	2.63989			0.102835			0.0514177	+	0.998677i	$0.483626\pi$
$660$	13.5066	−	15.2750i	0.525743	−	0.594580i
$661$	18.3028			0.711896			0.355948	−	0.934506i	$-0.384158\pi$
$661$	18.3028			0.711896			0.355948	+	0.934506i	$0.384158\pi$
$662$			31.5696i			1.22699i
$663$		−	0.649738i		−	0.0252337i
$664$	−32.4544			−1.25947
$665$	2.00000	−	2.26187i	0.0775567	−	0.0877114i
$666$	−27.9090			−1.08145
$667$		−	15.6728i		−	0.606852i
$668$		−	80.9194i		−	3.13087i
$669$	11.9854			0.463383
$670$	−44.3390	−	39.2057i	−1.71296	−	1.51465i
$671$	6.49929			0.250902
$672$			6.18664i			0.238655i
$673$			6.71037i			0.258666i	0.991601	+	0.129333i	$0.0412836\pi$
$673$			6.71037i			0.258666i	−0.991601	+	0.129333i	$0.958716\pi$
$674$	−43.1002			−1.66016
$675$	13.7743	−	1.69911i	0.530174	−	0.0653987i
$676$	5.15633			0.198320
$677$			1.57593i			0.0605679i	0.999541	+	0.0302840i	$0.00964116\pi$
$677$			1.57593i			0.0605679i	−0.999541	+	0.0302840i	$0.990359\pi$
$678$		−	0.739549i		−	0.0284022i
$679$	1.51056			0.0579698
$680$	−19.0982	−	16.8872i	−0.732384	−	0.647593i
$681$	−4.79033			−0.183566
$682$		−	51.9814i		−	1.99047i
$683$			15.1939i			0.581380i	0.956817	+	0.290690i	$0.0938848\pi$
$683$			15.1939i			0.581380i	−0.956817	+	0.290690i	$0.906115\pi$
$684$	−23.9126			−0.914320
$685$	−22.1260	+	25.0230i	−0.845391	+	0.956081i
$686$	−28.7875			−1.09911
$687$			2.57452i			0.0982239i
$688$		−	83.3947i		−	3.17939i
$689$	5.73813			0.218606
$690$	12.3576	−	13.9756i	0.470444	−	0.532041i
$691$	−18.7127			−0.711866			−0.355933	−	0.934511i	$-0.615837\pi$
$691$	−18.7127			−0.711866			−0.355933	+	0.934511i	$0.615837\pi$
$692$			131.938i			5.01555i
$693$			8.20123i			0.311539i
$694$	−73.5510			−2.79196
$695$	14.1359	+	12.4993i	0.536204	+	0.474125i
$696$	−9.82512			−0.372420
$697$		−	11.2243i		−	0.425149i
$698$		−	47.0884i		−	1.78232i
$699$	−5.17821			−0.195858
$700$	−20.6253	+	2.54420i	−0.779563	+	0.0961617i
$701$	24.3028			0.917904			0.458952	−	0.888461i	$-0.348225\pi$
$701$	24.3028			0.917904			0.458952	+	0.888461i	$0.348225\pi$
$702$			7.42548i			0.280257i
$703$		−	6.31265i		−	0.238086i
$704$	66.5886			2.50965
$705$	−2.57452	−	2.27645i	−0.0969619	−	0.0857362i
$706$	42.1827			1.58757
$707$		−	8.46310i		−	0.318287i
$708$		−	14.8568i		−	0.558355i
$709$	9.66291			0.362898			0.181449	−	0.983400i	$-0.441921\pi$
$709$	9.66291			0.362898			0.181449	+	0.983400i	$0.441921\pi$
$710$	33.9271	−	38.3693i	1.27326	−	1.43997i
$711$	6.26187			0.234838
$712$		−	23.4372i		−	0.878348i
$713$		−	34.2677i		−	1.28334i
$714$	−1.40105			−0.0524329
$715$	−5.44358	+	6.15633i	−0.203578	+	0.230234i
$716$	62.5256			2.33669
$717$		−	5.70782i		−	0.213162i
$718$		−	39.6566i		−	1.47997i
$719$	−28.4142			−1.05967			−0.529836	−	0.848100i	$-0.677746\pi$
$719$	−28.4142			−1.05967			−0.529836	+	0.848100i	$0.677746\pi$
$720$	56.9257	+	50.3352i	2.12150	+	1.87588i
$721$	12.3879			0.461349
$722$			43.3209i			1.61224i
$723$			13.7743i			0.512273i
$724$	14.0811			0.523320
$725$	−1.48024	−	12.0000i	−0.0549747	−	0.445669i
$726$	−3.22662			−0.119751
$727$			34.8545i			1.29268i	0.763049	+	0.646341i	$0.223701\pi$
$727$			34.8545i			1.29268i	−0.763049	+	0.646341i	$0.776299\pi$
$728$		−	6.80606i		−	0.252249i
$729$	15.2882			0.566230
$730$	−52.7367	−	46.6312i	−1.95187	−	1.72590i
$731$	9.17347			0.339293
$732$		−	4.38787i		−	0.162180i
$733$			6.25202i			0.230923i	0.993312	+	0.115462i	$0.0368348\pi$
$733$			6.25202i			0.230923i	−0.993312	+	0.115462i	$0.963165\pi$
$734$	72.3122			2.66909
$735$	4.52610	−	5.11871i	0.166948	−	0.188807i
$736$	103.376			3.81050
$737$			36.3634i			1.33946i
$738$			61.5633i			2.26617i
$739$	32.0846			1.18025			0.590126	−	0.807311i	$-0.299078\pi$
$739$	32.0846			1.18025			0.590126	+	0.807311i	$0.299078\pi$
$740$	−28.7816	+	32.5501i	−1.05803	+	1.19656i
$741$	−0.806063			−0.0296115
$742$		−	12.3733i		−	0.454238i
$743$		−	30.5442i		−	1.12056i	−0.828304	−	0.560279i	$-0.810694\pi$
$743$		−	30.5442i		−	1.12056i	0.828304	−	0.560279i	$-0.189306\pi$
$744$	−21.4821			−0.787574
$745$	19.0132	+	16.8119i	0.696589	+	0.615942i
$746$	34.6497			1.26862
$747$			10.6410i			0.389335i
$748$			25.5877i			0.935579i
$749$	−8.97224			−0.327838
$750$	8.14174	−	11.8677i	0.297294	−	0.433345i
$751$	28.1622			1.02765			0.513827	−	0.857894i	$-0.328227\pi$
$751$	28.1622			1.02765			0.513827	+	0.857894i	$0.328227\pi$
$752$		−	39.2057i		−	1.42968i
$753$			9.32865i			0.339955i
$754$	6.46898			0.235586
$755$	23.4314	+	20.7186i	0.852755	+	0.754028i
$756$	11.5369			0.419593
$757$		−	35.4109i		−	1.28703i	−0.765433	−	0.643515i	$-0.777475\pi$
$757$		−	35.4109i		−	1.28703i	0.765433	−	0.643515i	$-0.222525\pi$
$758$		−	81.0186i		−	2.94273i
$759$	−11.4617			−0.416033
$760$	−20.9502	+	23.6932i	−0.759943	+	0.859444i
$761$	−19.2388			−0.697407			−0.348704	−	0.937233i	$-0.613378\pi$
$761$	−19.2388			−0.697407			−0.348704	+	0.937233i	$0.613378\pi$
$762$		−	5.52820i		−	0.200265i
$763$			7.72829i			0.279783i
$764$	−106.351			−3.84764
$765$	−5.53690	+	6.26187i	−0.200187	+	0.226398i
$766$	−56.4299			−2.03890
$767$			5.98778i			0.216206i
$768$		−	3.89209i		−	0.140444i
$769$	−48.9643			−1.76570			−0.882849	−	0.469657i	$-0.844378\pi$
$769$	−48.9643			−1.76570			−0.882849	+	0.469657i	$0.844378\pi$
$770$	13.2750	+	11.7381i	0.478399	+	0.423013i
$771$	−11.0014			−0.396206
$772$			112.351i			4.04359i
$773$			46.1681i			1.66055i	0.557354	+	0.830275i	$0.311817\pi$
$773$			46.1681i			1.66055i	−0.557354	+	0.830275i	$0.688183\pi$
$774$	−50.3150			−1.80854
$775$	−3.23647	−	26.2374i	−0.116258	−	0.942476i
$776$	−15.8232			−0.568020
$777$			1.46168i			0.0524375i
$778$		−	18.1260i		−	0.649849i
$779$	−13.9248			−0.498907
$780$	4.15633	+	3.67513i	0.148820	+	0.131591i
$781$	−31.4676			−1.12600
$782$			23.4109i			0.837172i
$783$			6.71228i			0.239877i
$784$	77.9497			2.78392
$785$	4.11142	−	4.64974i	0.146743	−	0.165956i
$786$	1.07664			0.0384024
$787$			22.6458i			0.807234i	0.914928	+	0.403617i	$0.132247\pi$
$787$			22.6458i			0.807234i	−0.914928	+	0.403617i	$0.867753\pi$
$788$			10.3127i			0.367373i
$789$	10.5296			0.374864
$790$	8.96239	−	10.1359i	0.318867	−	0.360618i
$791$	0.463096			0.0164658
$792$		−	85.9086i		−	3.05263i
$793$			1.76845i			0.0627996i
$794$	−28.0059			−0.993891
$795$	4.62530	+	4.08981i	0.164043	+	0.145051i
$796$	−86.3752			−3.06149
$797$		−	8.23743i		−	0.291785i	−0.989300	−	0.145892i	$-0.953395\pi$
$797$		−	8.23743i		−	0.291785i	0.989300	−	0.145892i	$-0.0466053\pi$
$798$			1.73813i			0.0615293i
$799$	4.31265			0.152571
$800$	79.1509	−	9.76353i	2.79841	−	0.345193i
$801$	−7.68452			−0.271519
$802$		−	13.4109i		−	0.473555i
$803$			43.2506i			1.52628i
$804$	24.5501			0.865814
$805$	8.75131	+	7.73813i	0.308443	+	0.272733i
$806$	14.1441			0.498205
$807$			10.9478i			0.385381i
$808$			88.6516i			3.11875i
$809$	−44.1319			−1.55159			−0.775797	−	0.630982i	$-0.782652\pi$
$809$	−44.1319			−1.55159			−0.775797	+	0.630982i	$0.782652\pi$
$810$	27.6166	−	31.2325i	0.970348	−	1.09740i
$811$	22.6883			0.796694			0.398347	−	0.917235i	$-0.369584\pi$
$811$	22.6883			0.796694			0.398347	+	0.917235i	$0.369584\pi$
$812$		−	10.0508i		−	0.352713i
$813$		−	0.0594941i		−	0.00208655i
$814$	37.0494			1.29858
$815$	−3.30536	+	3.73813i	−0.115782	+	0.130941i
$816$	7.97556			0.279201
$817$		−	11.3806i		−	0.398156i
$818$		−	38.4894i		−	1.34575i
$819$	−2.23155			−0.0779766
$820$	71.8007	+	63.4880i	2.50739	+	2.21710i
$821$	−50.2736			−1.75456			−0.877281	−	0.479978i	$-0.840645\pi$
$821$	−50.2736			−1.75456			−0.877281	+	0.479978i	$0.840645\pi$
$822$		−	19.2290i		−	0.670688i
$823$			5.13093i			0.178853i	0.995993	+	0.0894265i	$0.0285034\pi$
$823$			5.13093i			0.178853i	−0.995993	+	0.0894265i	$0.971497\pi$
$824$	−129.764			−4.52054
$825$	−8.77575	+	1.08252i	−0.305532	+	0.0376884i
$826$	12.9116			0.449252
$827$		−	18.6946i		−	0.650076i	−0.945701	−	0.325038i	$-0.894623\pi$
$827$		−	18.6946i		−	0.650076i	0.945701	−	0.325038i	$-0.105377\pi$
$828$		−	92.5193i		−	3.21527i
$829$	3.44121			0.119518			0.0597591	−	0.998213i	$-0.480967\pi$
$829$	3.44121			0.119518			0.0597591	+	0.998213i	$0.480967\pi$
$830$	17.2243	+	15.2301i	0.597863	+	0.528646i
$831$	7.38646			0.256233
$832$			18.1187i			0.628153i
$833$			8.57452i			0.297089i
$834$	−10.8627			−0.376146
$835$	−23.2447	+	26.2882i	−0.804417	+	0.909741i
$836$	31.7440			1.09789
$837$			14.6761i			0.507280i
$838$			46.7123i			1.61365i
$839$	52.6248			1.81681			0.908406	−	0.418090i	$-0.137300\pi$
$839$	52.6248			1.81681			0.908406	+	0.418090i	$0.137300\pi$
$840$	4.85097	−	5.48612i	0.167374	−	0.189289i
$841$	−23.1524			−0.798357
$842$		−	7.72355i		−	0.266171i
$843$		−	6.70052i		−	0.230778i
$844$	25.2750			0.870003
$845$	−1.67513	−	1.48119i	−0.0576263	−	0.0509546i
$846$	−23.6542			−0.813248
$847$		−	2.02047i		−	0.0694241i
$848$			70.4358i			2.41878i
$849$	9.80748			0.336592
$850$	2.21108	+	17.9248i	0.0758394	+	0.614815i
$851$	24.4241			0.837246
$852$			21.2447i			0.727832i
$853$		−	6.31853i		−	0.216342i	−0.994132	−	0.108171i	$-0.965501\pi$
$853$		−	6.31853i		−	0.216342i	0.994132	−	0.108171i	$-0.0344995\pi$
$854$	3.81336			0.130490
$855$	7.76845	+	6.86907i	0.265675	+	0.234917i
$856$	93.9850			3.21234
$857$			0.775746i			0.0264990i	0.999912	+	0.0132495i	$0.00421757\pi$
$857$			0.775746i			0.0264990i	−0.999912	+	0.0132495i	$0.995782\pi$
$858$		−	4.73084i		−	0.161508i
$859$	−3.24869			−0.110844			−0.0554220	−	0.998463i	$-0.517650\pi$
$859$	−3.24869			−0.110844			−0.0554220	+	0.998463i	$0.517650\pi$
$860$	−51.8881	+	58.6820i	−1.76937	+	2.00104i
$861$	3.22425			0.109882
$862$		−	2.37962i		−	0.0810503i
$863$		−	19.9208i		−	0.678112i	−0.940766	−	0.339056i	$-0.889892\pi$
$863$		−	19.9208i		−	0.678112i	0.940766	−	0.339056i	$-0.110108\pi$
$864$	−44.2736			−1.50622
$865$	37.9003	−	42.8627i	1.28865	−	1.45738i
$866$	−67.5487			−2.29540
$867$		−	7.30299i		−	0.248022i
$868$		−	21.9756i		−	0.745899i
$869$	−8.31265			−0.281987
$870$	5.21440	+	4.61071i	0.176785	+	0.156318i
$871$	−9.89446			−0.335261
$872$		−	80.9544i		−	2.74146i
$873$			5.18806i			0.175589i
$874$	29.0435			0.982411
$875$	7.43136	+	5.09825i	0.251226	+	0.172352i
$876$	29.1998			0.986570
$877$		−	22.1378i		−	0.747539i	−0.927522	−	0.373770i	$-0.878065\pi$
$877$		−	22.1378i		−	0.747539i	0.927522	−	0.373770i	$-0.121935\pi$
$878$			77.0757i			2.60118i
$879$	2.58910			0.0873283
$880$	−75.5691	−	66.8202i	−2.54743	−	2.25251i
$881$	2.23155			0.0751828			0.0375914	−	0.999293i	$-0.488031\pi$
$881$	2.23155			0.0751828			0.0375914	+	0.999293i	$0.488031\pi$
$882$		−	47.0299i		−	1.58358i
$883$		−	4.30440i		−	0.144855i	−0.997374	−	0.0724273i	$-0.976925\pi$
$883$		−	4.30440i		−	0.144855i	0.997374	−	0.0724273i	$-0.0230745\pi$
$884$	−6.96239			−0.234170
$885$	−4.26774	+	4.82653i	−0.143459	+	0.162242i
$886$	98.9276			3.32354
$887$		−	15.9330i		−	0.534979i	−0.963561	−	0.267489i	$-0.913806\pi$
$887$		−	15.9330i		−	0.534979i	0.963561	−	0.267489i	$-0.0861940\pi$
$888$		−	15.3112i		−	0.513811i
$889$	3.46168			0.116101
$890$	−10.9986	+	12.4387i	−0.368673	+	0.416945i
$891$	−25.6145			−0.858118
$892$		−	128.432i		−	4.30022i
$893$		−	5.35026i		−	0.179040i
$894$	−14.6107			−0.488655
$895$	−20.3127	−	17.9610i	−0.678977	−	0.600369i
$896$	13.3561			0.446197
$897$		−	3.11871i		−	0.104131i
$898$		−	33.9365i		−	1.13248i
$899$	12.7856			0.426423
$900$	−8.73813	−	70.8383i	−0.291271	−	2.36128i
$901$	−7.74798			−0.258123
$902$		−	81.7255i		−	2.72116i
$903$			2.63515i			0.0876923i
$904$	−4.85097			−0.161341
$905$	−4.57452	−	4.04491i	−0.152062	−	0.134457i
$906$	−18.0059			−0.598205
$907$			51.9086i			1.72360i	0.507251	+	0.861798i	$0.330662\pi$
$907$			51.9086i			1.72360i	−0.507251	+	0.861798i	$0.669338\pi$
$908$			51.3317i			1.70350i
$909$	29.0668			0.964085
$910$	−3.19394	+	3.61213i	−0.105878	+	0.119741i
$911$	−9.67750			−0.320630			−0.160315	−	0.987066i	$-0.551251\pi$
$911$	−9.67750			−0.320630			−0.160315	+	0.987066i	$0.551251\pi$
$912$		−	9.89446i		−	0.327638i
$913$		−	14.1260i		−	0.467503i
$914$	67.0103			2.21651
$915$	−1.26045	+	1.42548i	−0.0416692	+	0.0471251i
$916$	27.5877			0.911523
$917$			0.674176i			0.0222632i
$918$		−	10.0263i		−	0.330919i
$919$	−13.5515			−0.447022			−0.223511	−	0.974701i	$-0.571752\pi$
$919$	−13.5515			−0.447022			−0.223511	+	0.974701i	$0.571752\pi$
$920$	−91.6707	−	81.0576i	−3.02229	−	2.67239i
$921$	9.22425			0.303949
$922$			98.6780i			3.24979i
$923$		−	8.56230i		−	0.281831i
$924$	−7.35026			−0.241806
$925$	18.7005	−	2.30677i	0.614869	−	0.0758462i
$926$	−104.381			−3.43017
$927$			42.5466i			1.39741i
$928$			38.5705i			1.26614i
$929$	9.44992			0.310042			0.155021	−	0.987911i	$-0.450455\pi$
$929$	9.44992			0.310042			0.155021	+	0.987911i	$0.450455\pi$
$930$	11.4010	+	10.0811i	0.373855	+	0.330572i
$931$	10.6375			0.348631
$932$			55.4880i			1.81757i
$933$			12.1504i			0.397788i
$934$	−87.6625			−2.86840
$935$	7.35026	−	8.31265i	0.240379	−	0.271853i
$936$	23.3757			0.764057
$937$		−	16.0409i		−	0.524035i	−0.965063	−	0.262017i	$-0.915612\pi$
$937$		−	16.0409i		−	0.524035i	0.965063	−	0.262017i	$-0.0843877\pi$
$938$			21.3357i			0.696634i
$939$	1.35309			0.0441565
$940$	−24.3938	+	27.5877i	−0.795636	+	0.899811i
$941$	−21.6747			−0.706574			−0.353287	−	0.935515i	$-0.614936\pi$
$941$	−21.6747			−0.706574			−0.353287	+	0.935515i	$0.614936\pi$
$942$			3.57310i			0.116418i
$943$		−	53.8759i		−	1.75444i
$944$	−73.5002			−2.39223
$945$	−3.74798	−	3.31406i	−0.121922	−	0.107807i
$946$	66.7934			2.17164
$947$			4.63118i			0.150493i	0.997165	+	0.0752466i	$0.0239744\pi$
$947$			4.63118i			0.150493i	−0.997165	+	0.0752466i	$0.976026\pi$
$948$			5.61213i			0.182273i
$949$	−11.7685			−0.382020
$950$	22.2374	−	2.74306i	0.721477	−	0.0889966i
$951$	11.4372			0.370878
$952$			9.18997i			0.297849i
$953$			26.2981i			0.851878i	0.904752	+	0.425939i	$0.140056\pi$
$953$			26.2981i			0.851878i	−0.904752	+	0.425939i	$0.859944\pi$
$954$	42.4965			1.37587
$955$	34.5501	+	30.5501i	1.11801	+	0.988577i
$956$	−61.1632			−1.97816
$957$		−	4.27645i		−	0.138238i
$958$			45.1427i			1.45849i
$959$	12.0409			0.388822
$960$	−12.9140	+	14.6048i	−0.416797	+	0.471369i
$961$	−3.04491			−0.0982228
$962$			10.0811i			0.325028i
$963$		−	30.8155i		−	0.993014i
$964$	147.601			4.75392
$965$	32.2736	−	36.4993i	1.03892	−	1.17495i
$966$	−6.72496			−0.216372
$967$			11.9405i			0.383981i	0.981397	+	0.191990i	$0.0614942\pi$
$967$			11.9405i			0.383981i	−0.981397	+	0.191990i	$0.938506\pi$
$968$			21.1646i			0.680255i
$969$	1.08840			0.0349643
$970$	8.39772	+	7.42548i	0.269635	+	0.238418i
$971$	30.1524			0.967635			0.483818	−	0.875169i	$-0.339250\pi$
$971$	30.1524			0.967635			0.483818	+	0.875169i	$0.339250\pi$
$972$			60.2311i			1.93191i
$973$		−	6.80209i		−	0.218065i
$974$	24.7308			0.792427
$975$	−0.294552	−	2.38787i	−0.00943321	−	0.0764731i
$976$	−21.7078			−0.694850
$977$		−	26.9321i		−	0.861633i	−0.902439	−	0.430817i	$-0.858226\pi$
$977$		−	26.9321i		−	0.861633i	0.902439	−	0.430817i	$-0.141774\pi$
$978$		−	2.87258i		−	0.0918549i
$979$	10.2012			0.326033
$980$	−54.8505	−	48.5002i	−1.75214	−	1.54928i
$981$	−26.5431			−0.847455
$982$			68.8843i			2.19819i
$983$		−	20.5902i		−	0.656727i	−0.944551	−	0.328363i	$-0.893503\pi$
$983$		−	20.5902i		−	0.656727i	0.944551	−	0.328363i	$-0.106497\pi$
$984$	−33.7743			−1.07669
$985$	2.96239	−	3.35026i	0.0943895	−	0.106748i
$986$	−8.73481			−0.278173
$987$			1.23884i			0.0394328i
$988$			8.63752i			0.274796i
$989$	44.0322			1.40014
$990$	−40.3150	+	45.5936i	−1.28130	+	1.44906i
$991$	−48.1378			−1.52915			−0.764573	−	0.644537i	$-0.777050\pi$
$991$	−48.1378			−1.52915			−0.764573	+	0.644537i	$0.777050\pi$
$992$			84.3327i			2.67756i
$993$			5.67864i			0.180206i
$994$	−18.4631			−0.585614
$995$	28.0606	+	24.8119i	0.889582	+	0.786591i
$996$	−9.53690			−0.302188
$997$		−	33.4255i		−	1.05860i	−0.848436	−	0.529298i	$-0.822455\pi$
$997$		−	33.4255i		−	1.05860i	0.848436	−	0.529298i	$-0.177545\pi$
$998$		−	74.1051i		−	2.34576i
$999$	−10.4603			−0.330948

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	65.2.b.a.14.1	✓	6
3.2	odd	2		585.2.c.b.469.6		6
4.3	odd	2		1040.2.d.c.209.4		6
5.2	odd	4		325.2.a.k.1.3		3
5.3	odd	4		325.2.a.j.1.1		3
5.4	even	2	inner	65.2.b.a.14.6	yes	6
13.2	odd	12		845.2.l.e.654.6		12
13.3	even	3		845.2.n.f.529.6		12
13.4	even	6		845.2.n.g.484.6		12
13.5	odd	4		845.2.d.a.844.1		6
13.6	odd	12		845.2.l.e.699.5		12
13.7	odd	12		845.2.l.d.699.1		12
13.8	odd	4		845.2.d.b.844.5		6
13.9	even	3		845.2.n.f.484.1		12
13.10	even	6		845.2.n.g.529.1		12
13.11	odd	12		845.2.l.d.654.2		12
13.12	even	2		845.2.b.c.339.6		6
15.2	even	4		2925.2.a.bf.1.1		3
15.8	even	4		2925.2.a.bj.1.3		3
15.14	odd	2		585.2.c.b.469.1		6
20.3	even	4		5200.2.a.cj.1.1		3
20.7	even	4		5200.2.a.cb.1.3		3
20.19	odd	2		1040.2.d.c.209.3		6
65.4	even	6		845.2.n.g.484.1		12
65.9	even	6		845.2.n.f.484.6		12
65.12	odd	4		4225.2.a.ba.1.1		3
65.19	odd	12		845.2.l.d.699.2		12
65.24	odd	12		845.2.l.e.654.5		12
65.29	even	6		845.2.n.f.529.1		12
65.34	odd	4		845.2.d.a.844.2		6
65.38	odd	4		4225.2.a.bh.1.3		3
65.44	odd	4		845.2.d.b.844.6		6
65.49	even	6		845.2.n.g.529.6		12
65.54	odd	12		845.2.l.d.654.1		12
65.59	odd	12		845.2.l.e.699.6		12
65.64	even	2		845.2.b.c.339.1		6

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
65.2.b.a.14.1	✓	6	1.1	even	1	trivial
65.2.b.a.14.6	yes	6	5.4	even	2	inner
325.2.a.j.1.1		3	5.3	odd	4
325.2.a.k.1.3		3	5.2	odd	4
585.2.c.b.469.1		6	15.14	odd	2
585.2.c.b.469.6		6	3.2	odd	2
845.2.b.c.339.1		6	65.64	even	2
845.2.b.c.339.6		6	13.12	even	2
845.2.d.a.844.1		6	13.5	odd	4
845.2.d.a.844.2		6	65.34	odd	4
845.2.d.b.844.5		6	13.8	odd	4
845.2.d.b.844.6		6	65.44	odd	4
845.2.l.d.654.1		12	65.54	odd	12
845.2.l.d.654.2		12	13.11	odd	12
845.2.l.d.699.1		12	13.7	odd	12
845.2.l.d.699.2		12	65.19	odd	12
845.2.l.e.654.5		12	65.24	odd	12
845.2.l.e.654.6		12	13.2	odd	12
845.2.l.e.699.5		12	13.6	odd	12
845.2.l.e.699.6		12	65.59	odd	12
845.2.n.f.484.1		12	13.9	even	3
845.2.n.f.484.6		12	65.9	even	6
845.2.n.f.529.1		12	65.29	even	6
845.2.n.f.529.6		12	13.3	even	3
845.2.n.g.484.1		12	65.4	even	6
845.2.n.g.484.6		12	13.4	even	6
845.2.n.g.529.1		12	13.10	even	6
845.2.n.g.529.6		12	65.49	even	6
1040.2.d.c.209.3		6	20.19	odd	2
1040.2.d.c.209.4		6	4.3	odd	2
2925.2.a.bf.1.1		3	15.2	even	4
2925.2.a.bj.1.3		3	15.8	even	4
4225.2.a.ba.1.1		3	65.12	odd	4
4225.2.a.bh.1.3		3	65.38	odd	4
5200.2.a.cb.1.3		3	20.7	even	4
5200.2.a.cj.1.1		3	20.3	even	4

Overview	Random
Universe	Knowledge

Classical	Maass
Hilbert	Bianchi

Elliptic curves over $\Q$
Elliptic curves over $\Q(\alpha)$
Genus 2 curves over $\Q$
Higher genus families
Abelian varieties over $\F_{q}$

Level:	\( N \)	\(=\)	\( 65 = 5 \cdot 13 \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	65.b (of order \(2\), degree \(1\), minimal)

\(f(q)\)	\(=\)	\(q-2.67513i q^{2} -0.481194i q^{3} -5.15633 q^{4} +(1.67513 + 1.48119i) q^{5} -1.28726 q^{6} -0.806063i q^{7} +8.44358i q^{8} +2.76845 q^{9} +O(q^{10})\)	\(q-2.67513i q^{2} -0.481194i q^{3} -5.15633 q^{4} +(1.67513 + 1.48119i) q^{5} -1.28726 q^{6} -0.806063i q^{7} +8.44358i q^{8} +2.76845 q^{9} +(3.96239 - 4.48119i) q^{10} -3.67513 q^{11} +2.48119i q^{12} -1.00000i q^{13} -2.15633 q^{14} +(0.712742 - 0.806063i) q^{15} +12.2750 q^{16} +1.35026i q^{17} -7.40597i q^{18} +1.67513 q^{19} +(-8.63752 - 7.63752i) q^{20} -0.387873 q^{21} +9.83146i q^{22} +6.48119i q^{23} +4.06300 q^{24} +(0.612127 + 4.96239i) q^{25} -2.67513 q^{26} -2.77575i q^{27} +4.15633i q^{28} -2.41819 q^{29} +(-2.15633 - 1.90668i) q^{30} -5.28726 q^{31} -15.9502i q^{32} +1.76845i q^{33} +3.61213 q^{34} +(1.19394 - 1.35026i) q^{35} -14.2750 q^{36} -3.76845i q^{37} -4.48119i q^{38} -0.481194 q^{39} +(-12.5066 + 14.1441i) q^{40} -8.31265 q^{41} +1.03761i q^{42} -6.79384i q^{43} +18.9502 q^{44} +(4.63752 + 4.10062i) q^{45} +17.3380 q^{46} -3.19394i q^{47} -5.90668i q^{48} +6.35026 q^{49} +(13.2750 - 1.63752i) q^{50} +0.649738 q^{51} +5.15633i q^{52} +5.73813i q^{53} -7.42548 q^{54} +(-6.15633 - 5.44358i) q^{55} +6.80606 q^{56} -0.806063i q^{57} +6.46898i q^{58} -5.98778 q^{59} +(-3.67513 + 4.15633i) q^{60} -1.76845 q^{61} +14.1441i q^{62} -2.23155i q^{63} -18.1187 q^{64} +(1.48119 - 1.67513i) q^{65} +4.73084 q^{66} -9.89446i q^{67} -6.96239i q^{68} +3.11871 q^{69} +(-3.61213 - 3.19394i) q^{70} +8.56230 q^{71} +23.3757i q^{72} -11.7685i q^{73} -10.0811 q^{74} +(2.38787 - 0.294552i) q^{75} -8.63752 q^{76} +2.96239i q^{77} +1.28726i q^{78} +2.26187 q^{79} +(20.5623 + 18.1817i) q^{80} +6.96968 q^{81} +22.2374i q^{82} +3.84367i q^{83} +2.00000 q^{84} +(-2.00000 + 2.26187i) q^{85} -18.1744 q^{86} +1.16362i q^{87} -31.0313i q^{88} -2.77575 q^{89} +(10.9697 - 12.4060i) q^{90} -0.806063 q^{91} -33.4191i q^{92} +2.54420i q^{93} -8.54420 q^{94} +(2.80606 + 2.48119i) q^{95} -7.67513 q^{96} +1.87399i q^{97} -16.9878i q^{98} -10.1744 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 6 q - 10 q^{4} + 4 q^{6} - 6 q^{9}+O(q^{10}) \) 6 * q - 10 * q^4 + 4 * q^6 - 6 * q^9	\( 6 q - 10 q^{4} + 4 q^{6} - 6 q^{9} + 2 q^{10} - 12 q^{11} + 8 q^{14} + 16 q^{15} + 10 q^{16} - 20 q^{20} - 4 q^{21} + 16 q^{24} + 2 q^{25} - 6 q^{26} - 12 q^{29} + 8 q^{30} - 20 q^{31} + 20 q^{34} + 8 q^{35} - 22 q^{36} + 8 q^{39} - 34 q^{40} - 8 q^{41} + 40 q^{44} - 4 q^{45} + 32 q^{46} + 18 q^{49} + 16 q^{50} + 24 q^{51} - 68 q^{54} - 16 q^{55} + 40 q^{56} + 16 q^{59} - 12 q^{60} + 12 q^{61} - 66 q^{64} - 2 q^{65} - 16 q^{66} - 24 q^{69} - 20 q^{70} - 24 q^{71} + 4 q^{74} + 16 q^{75} - 20 q^{76} + 32 q^{79} + 48 q^{80} + 46 q^{81} + 12 q^{84} - 12 q^{85} - 32 q^{86} - 20 q^{89} + 70 q^{90} - 4 q^{91} - 32 q^{94} + 16 q^{95} - 36 q^{96} + 16 q^{99}+O(q^{100}) \) 6 * q - 10 * q^4 + 4 * q^6 - 6 * q^9 + 2 * q^10 - 12 * q^11 + 8 * q^14 + 16 * q^15 + 10 * q^16 - 20 * q^20 - 4 * q^21 + 16 * q^24 + 2 * q^25 - 6 * q^26 - 12 * q^29 + 8 * q^30 - 20 * q^31 + 20 * q^34 + 8 * q^35 - 22 * q^36 + 8 * q^39 - 34 * q^40 - 8 * q^41 + 40 * q^44 - 4 * q^45 + 32 * q^46 + 18 * q^49 + 16 * q^50 + 24 * q^51 - 68 * q^54 - 16 * q^55 + 40 * q^56 + 16 * q^59 - 12 * q^60 + 12 * q^61 - 66 * q^64 - 2 * q^65 - 16 * q^66 - 24 * q^69 - 20 * q^70 - 24 * q^71 + 4 * q^74 + 16 * q^75 - 20 * q^76 + 32 * q^79 + 48 * q^80 + 46 * q^81 + 12 * q^84 - 12 * q^85 - 32 * q^86 - 20 * q^89 + 70 * q^90 - 4 * q^91 - 32 * q^94 + 16 * q^95 - 36 * q^96 + 16 * q^99

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