LMFDB - Embedded newform 735.2.g.c.734.31

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [735,2,Mod(734,735)]

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

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(735, base_ring=CyclotomicField(2))

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

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

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

chi := DirichletCharacter("735.734");

S:= CuspForms(chi, 2);

N := Newforms(S);

Level:	$ N $	$=$	$ 735 = 3 \cdot 5 \cdot 7^{2} $
Weight:	$ k $	$=$	$ 2 $
Character orbit:	$[\chi]$	$=$	735.g (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:	$5.86900454856$
Analytic rank:	$0$
Dimension:	$32$
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label			734.31
Character	$\chi$	$=$	735.734
Dual form			735.2.g.c.734.32

$q$-expansion

comment: q-expansion

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

gp: mfcoefs(f, 20)

$f(q)$	$=$	\(q+2.20906 q^{2} +(1.59632 - 0.672139i) q^{3} +2.87996 q^{4} +(1.33217 + 1.79592i) q^{5} +(3.52637 - 1.48480i) q^{6} +1.94389 q^{8} +(2.09646 - 2.14589i) q^{9} +(2.94284 + 3.96730i) q^{10} -3.81691i q^{11} +(4.59733 - 1.93573i) q^{12} -6.50161 q^{13} +(3.33367 + 1.97146i) q^{15} -1.46575 q^{16} +2.94050i q^{17} +(4.63121 - 4.74041i) q^{18} +2.03485i q^{19} +(3.83659 + 5.17218i) q^{20} -8.43180i q^{22} +3.00058 q^{23} +(3.10306 - 1.30656i) q^{24} +(-1.45065 + 4.78494i) q^{25} -14.3625 q^{26} +(1.90428 - 4.83464i) q^{27} -2.25259i q^{29} +(7.36429 + 4.35507i) q^{30} +6.66511i q^{31} -7.12571 q^{32} +(-2.56549 - 6.09300i) q^{33} +6.49574i q^{34} +(6.03772 - 6.18009i) q^{36} -3.36664i q^{37} +4.49512i q^{38} +(-10.3786 + 4.36998i) q^{39} +(2.58959 + 3.49107i) q^{40} -3.51094 q^{41} +7.03729i q^{43} -10.9926i q^{44} +(6.64669 + 0.906381i) q^{45} +6.62848 q^{46} -5.01279i q^{47} +(-2.33980 + 0.985185i) q^{48} +(-3.20459 + 10.5702i) q^{50} +(1.97642 + 4.69396i) q^{51} -18.7244 q^{52} +1.93423 q^{53} +(4.20667 - 10.6800i) q^{54} +(6.85487 - 5.08477i) q^{55} +(1.36770 + 3.24827i) q^{57} -4.97612i q^{58} +7.93019 q^{59} +(9.60084 + 5.67772i) q^{60} -13.6650i q^{61} +14.7237i q^{62} -12.8096 q^{64} +(-8.66124 - 11.6764i) q^{65} +(-5.66734 - 13.4598i) q^{66} +10.7863i q^{67} +8.46851i q^{68} +(4.78988 - 2.01681i) q^{69} -10.9926i q^{71} +(4.07528 - 4.17138i) q^{72} -3.30897 q^{73} -7.43712i q^{74} +(0.900436 + 8.61332i) q^{75} +5.86030i q^{76} +(-22.9271 + 9.65357i) q^{78} -5.84977 q^{79} +(-1.95262 - 2.63236i) q^{80} +(-0.209716 - 8.99756i) q^{81} -7.75589 q^{82} -2.66330i q^{83} +(-5.28089 + 3.91724i) q^{85} +15.5458i q^{86} +(-1.51405 - 3.59585i) q^{87} -7.41965i q^{88} +13.5159 q^{89} +(14.6830 + 2.00225i) q^{90} +8.64156 q^{92} +(4.47988 + 10.6396i) q^{93} -11.0736i q^{94} +(-3.65444 + 2.71077i) q^{95} +(-11.3749 + 4.78946i) q^{96} -4.46688 q^{97} +(-8.19069 - 8.00200i) q^{99} +O(q^{100})\)
$\operatorname{Tr}(f)(q)$	$=$	$ 32 q + 16 q^{4} + 40 q^{9} + 16 q^{15} - 16 q^{16} + 64 q^{25} + 56 q^{30} - 16 q^{36} - 56 q^{39} - 32 q^{46} - 40 q^{51} + 8 q^{60} - 176 q^{64} + 48 q^{79} - 40 q^{81} - 64 q^{85} + 40 q^{99}+O(q^{100}) $ 32 * q + 16 * q^4 + 40 * q^9 + 16 * q^15 - 16 * q^16 + 64 * q^25 + 56 * q^30 - 16 * q^36 - 56 * q^39 - 32 * q^46 - 40 * q^51 + 8 * q^60 - 176 * q^64 + 48 * q^79 - 40 * q^81 - 64 * q^85 + 40 * q^99

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/735\mathbb{Z}\right)^\times$.

$n$	$346$	$442$	$491$
$\chi(n)$	$-1$	$-1$	$-1$

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 $

$2$	2.20906			1.56204			0.781022	−	0.624504i	$-0.214699\pi$
$2$	2.20906			1.56204			0.781022	+	0.624504i	$0.214699\pi$
$3$	1.59632	−	0.672139i	0.921634	−	0.388059i
$3$	1.59632	−	0.672139i	0.921634	−	0.388059i
$4$	2.87996			1.43998
$5$	1.33217	+	1.79592i	0.595764	+	0.803160i
$5$	1.33217	+	1.79592i	0.595764	+	0.803160i
$6$	3.52637	−	1.48480i	1.43963	−	0.606166i
$7$		0			0
$7$		0			0
$8$	1.94389			0.687269
$9$	2.09646	−	2.14589i	0.698820	−	0.715298i
$10$	2.94284	+	3.96730i	0.930609	+	1.25457i
$11$		−	3.81691i		−	1.15084i	−0.817857	−	0.575421i	$-0.804838\pi$
$11$		−	3.81691i		−	1.15084i	0.817857	−	0.575421i	$-0.195162\pi$
$12$	4.59733	−	1.93573i	1.32714	−	0.558798i
$13$	−6.50161			−1.80322			−0.901611	−	0.432548i	$-0.857615\pi$
$13$	−6.50161			−1.80322			−0.901611	+	0.432548i	$0.857615\pi$
$14$		0			0
$15$	3.33367	+	1.97146i	0.860750	+	0.509028i
$16$	−1.46575			−0.366437
$17$			2.94050i			0.713175i	0.934262	+	0.356587i	$0.116060\pi$
$17$			2.94050i			0.713175i	−0.934262	+	0.356587i	$0.883940\pi$
$18$	4.63121	−	4.74041i	1.09159	−	1.11733i
$19$			2.03485i			0.466828i	0.972377	+	0.233414i	$0.0749897\pi$
$19$			2.03485i			0.466828i	−0.972377	+	0.233414i	$0.925010\pi$
$20$	3.83659	+	5.17218i	0.857888	+	1.15653i
$21$		0			0
$22$		−	8.43180i		−	1.79767i
$23$	3.00058			0.625665			0.312832	−	0.949808i	$-0.398722\pi$
$23$	3.00058			0.625665			0.312832	+	0.949808i	$0.398722\pi$
$24$	3.10306	−	1.30656i	0.633410	−	0.266701i
$25$	−1.45065	+	4.78494i	−0.290131	+	0.956987i
$26$	−14.3625			−2.81671
$27$	1.90428	−	4.83464i	0.366478	−	0.930427i
$28$		0			0
$29$		−	2.25259i		−	0.418296i	−0.977884	−	0.209148i	$-0.932931\pi$
$29$		−	2.25259i		−	0.418296i	0.977884	−	0.209148i	$-0.0670690\pi$
$30$	7.36429	+	4.35507i	1.34453	+	0.795123i
$31$			6.66511i			1.19709i	0.801089	+	0.598545i	$0.204254\pi$
$31$			6.66511i			1.19709i	−0.801089	+	0.598545i	$0.795746\pi$
$32$	−7.12571			−1.25966
$33$	−2.56549	−	6.09300i	−0.446595	−	1.06066i
$34$			6.49574i			1.11401i
$35$		0			0
$36$	6.03772	−	6.18009i	1.00629	−	1.03001i
$37$		−	3.36664i		−	0.553472i	−0.960946	−	0.276736i	$-0.910747\pi$
$37$		−	3.36664i		−	0.553472i	0.960946	−	0.276736i	$-0.0892528\pi$
$38$			4.49512i			0.729205i
$39$	−10.3786	+	4.36998i	−1.66191	+	0.699757i
$40$	2.58959	+	3.49107i	0.409450	+	0.551986i
$41$	−3.51094			−0.548317			−0.274158	−	0.961685i	$-0.588399\pi$
$41$	−3.51094			−0.548317			−0.274158	+	0.961685i	$0.588399\pi$
$42$		0			0
$43$			7.03729i			1.07318i	0.843844	+	0.536588i	$0.180287\pi$
$43$			7.03729i			1.07318i	−0.843844	+	0.536588i	$0.819713\pi$
$44$		−	10.9926i		−	1.65719i
$45$	6.64669	+	0.906381i	0.990830	+	0.135115i
$46$	6.62848			0.977316
$47$		−	5.01279i		−	0.731190i	−0.930774	−	0.365595i	$-0.880865\pi$
$47$		−	5.01279i		−	0.731190i	0.930774	−	0.365595i	$-0.119135\pi$
$48$	−2.33980	+	0.985185i	−0.337721	+	0.142199i
$49$		0			0
$50$	−3.20459	+	10.5702i	−0.453197	+	1.49486i
$51$	1.97642	+	4.69396i	0.276754	+	0.657286i
$52$	−18.7244			−2.59660
$53$	1.93423			0.265686			0.132843	−	0.991137i	$-0.457589\pi$
$53$	1.93423			0.265686			0.132843	+	0.991137i	$0.457589\pi$
$54$	4.20667	−	10.6800i	0.572455	−	1.45337i
$55$	6.85487	−	5.08477i	0.924310	−	0.685630i
$56$		0			0
$57$	1.36770	+	3.24827i	0.181157	+	0.430244i
$58$		−	4.97612i		−	0.653396i
$59$	7.93019			1.03242			0.516211	−	0.856461i	$-0.327342\pi$
$59$	7.93019			1.03242			0.516211	+	0.856461i	$0.327342\pi$
$60$	9.60084	+	5.67772i	1.23946	+	0.732990i
$61$		−	13.6650i		−	1.74962i	−0.484466	−	0.874810i	$-0.660986\pi$
$61$		−	13.6650i		−	1.74962i	0.484466	−	0.874810i	$-0.339014\pi$
$62$			14.7237i			1.86991i
$63$		0			0
$64$	−12.8096			−1.60121
$65$	−8.66124	−	11.6764i	−1.07429	−	1.44828i
$66$	−5.66734	−	13.4598i	−0.697601	−	1.65679i
$67$			10.7863i			1.31776i	0.752250	+	0.658878i	$0.228969\pi$
$67$			10.7863i			1.31776i	−0.752250	+	0.658878i	$0.771031\pi$
$68$			8.46851i			1.02696i
$69$	4.78988	−	2.01681i	0.576634	−	0.242795i
$70$		0			0
$71$		−	10.9926i		−	1.30458i	−0.757971	−	0.652288i	$-0.773809\pi$
$71$		−	10.9926i		−	1.30458i	0.757971	−	0.652288i	$-0.226191\pi$
$72$	4.07528	−	4.17138i	0.480277	−	0.491602i
$73$	−3.30897			−0.387286			−0.193643	−	0.981072i	$-0.562030\pi$
$73$	−3.30897			−0.387286			−0.193643	+	0.981072i	$0.562030\pi$
$74$		−	7.43712i		−	0.864548i
$75$	0.900436	+	8.61332i	0.103973	+	0.994580i
$76$			5.86030i			0.672223i
$77$		0			0
$78$	−22.9271	+	9.65357i	−2.59598	+	1.09305i
$79$	−5.84977			−0.658151			−0.329075	−	0.944304i	$-0.606737\pi$
$79$	−5.84977			−0.658151			−0.329075	+	0.944304i	$0.606737\pi$
$80$	−1.95262	−	2.63236i	−0.218310	−	0.294307i
$81$	−0.209716	−	8.99756i	−0.0233018	−	0.999728i
$82$	−7.75589			−0.856495
$83$		−	2.66330i		−	0.292336i	−0.989260	−	0.146168i	$-0.953306\pi$
$83$		−	2.66330i		−	0.292336i	0.989260	−	0.146168i	$-0.0466939\pi$
$84$		0			0
$85$	−5.28089	+	3.91724i	−0.572793	+	0.424884i
$86$			15.5458i			1.67635i
$87$	−1.51405	−	3.59585i	−0.162324	−	0.385516i
$88$		−	7.41965i		−	0.790938i
$89$	13.5159			1.43268			0.716339	−	0.697752i	$-0.245816\pi$
$89$	13.5159			1.43268			0.716339	+	0.697752i	$0.245816\pi$
$90$	14.6830	+	2.00225i	1.54772	+	0.211056i
$91$		0			0
$92$	8.64156			0.900945
$93$	4.47988	+	10.6396i	0.464542	+	1.10328i
$94$		−	11.0736i		−	1.14215i
$95$	−3.65444	+	2.71077i	−0.374937	+	0.278119i
$96$	−11.3749	+	4.78946i	−1.16094	+	0.488822i
$97$	−4.46688			−0.453543			−0.226771	−	0.973948i	$-0.572817\pi$
$97$	−4.46688			−0.453543			−0.226771	+	0.973948i	$0.572817\pi$
$98$		0			0
$99$	−8.19069	−	8.00200i	−0.823195	−	0.804231i
$100$	−4.17782	+	13.7804i	−0.417782	+	1.37804i
$101$	−8.87047			−0.882644			−0.441322	−	0.897349i	$-0.645490\pi$
$101$	−8.87047			−0.882644			−0.441322	+	0.897349i	$0.645490\pi$
$102$	4.36604	+	10.3693i	0.432302	+	1.02671i
$103$	−1.32243			−0.130303			−0.0651516	−	0.997875i	$-0.520753\pi$
$103$	−1.32243			−0.130303			−0.0651516	+	0.997875i	$0.520753\pi$
$104$	−12.6384			−1.23930
$105$		0			0
$106$	4.27283			0.415014
$107$	−3.32444			−0.321386			−0.160693	−	0.987004i	$-0.551373\pi$
$107$	−3.32444			−0.321386			−0.160693	+	0.987004i	$0.551373\pi$
$108$	5.48424	−	13.9236i	0.527722	−	1.33980i
$109$	12.2985			1.17799			0.588994	−	0.808138i	$-0.299524\pi$
$109$	12.2985			1.17799			0.588994	+	0.808138i	$0.299524\pi$
$110$	15.1428	−	11.2326i	1.44381	−	1.07098i
$111$	−2.26285	−	5.37423i	−0.214780	−	0.510099i
$112$		0			0
$113$	20.4591			1.92463			0.962314	−	0.271941i	$-0.0876657\pi$
$113$	20.4591			1.92463			0.962314	+	0.271941i	$0.0876657\pi$
$114$	3.02135	+	7.17564i	0.282975	+	0.672061i
$115$	3.99728	+	5.38881i	0.372749	+	0.502509i
$116$		−	6.48737i		−	0.602338i
$117$	−13.6304	+	13.9518i	−1.26013	+	1.28984i
$118$	17.5183			1.61269
$119$		0			0
$120$	6.48029	+	3.83229i	0.591567	+	0.349839i
$121$	−3.56881			−0.324438
$122$		−	30.1868i		−	2.73298i
$123$	−5.60458	+	2.35984i	−0.505348	+	0.212780i
$124$			19.1953i			1.72379i
$125$	−10.5259	+	3.76908i	−0.941463	+	0.337117i
$126$		0			0
$127$			0.597329i			0.0530044i	0.999649	+	0.0265022i	$0.00843689\pi$
$127$			0.597329i			0.0530044i	−0.999649	+	0.0265022i	$0.991563\pi$
$128$	−14.0459			−1.24149
$129$	4.73004	+	11.2338i	0.416456	+	0.989077i
$130$	−19.1332	−	25.7938i	−1.67810	−	2.26227i
$131$	−5.81183			−0.507782			−0.253891	−	0.967233i	$-0.581710\pi$
$131$	−5.81183			−0.507782			−0.253891	+	0.967233i	$0.581710\pi$
$132$	−7.38852	−	17.5476i	−0.643088	−	1.52732i
$133$		0			0
$134$			23.8276i			2.05839i
$135$	11.2194	−	3.02063i	0.965616	−	0.259974i
$136$			5.71600i			0.490143i
$137$	−1.09369			−0.0934400			−0.0467200	−	0.998908i	$-0.514877\pi$
$137$	−1.09369			−0.0934400			−0.0467200	+	0.998908i	$0.514877\pi$
$138$	10.5812	−	4.45526i	0.900728	−	0.379257i
$139$			7.35968i			0.624240i	0.950043	+	0.312120i	$0.101039\pi$
$139$			7.35968i			0.624240i	−0.950043	+	0.312120i	$0.898961\pi$
$140$		0			0
$141$	−3.36929	−	8.00200i	−0.283745	−	0.673890i
$142$		−	24.2833i		−	2.03781i
$143$			24.8161i			2.07522i
$144$	−3.07288	+	3.14534i	−0.256073	+	0.262111i
$145$	4.04547	−	3.00083i	0.335958	−	0.249205i
$146$	−7.30973			−0.604958
$147$		0			0
$148$		−	9.69579i		−	0.796989i
$149$			10.8195i			0.886365i	0.896431	+	0.443183i	$0.146151\pi$
$149$			10.8195i			0.886365i	−0.896431	+	0.443183i	$0.853849\pi$
$150$	1.98912	+	19.0274i	0.162411	+	1.55358i
$151$	−8.29599			−0.675118			−0.337559	−	0.941304i	$-0.609601\pi$
$151$	−8.29599			−0.675118			−0.337559	+	0.941304i	$0.609601\pi$
$152$			3.95553i			0.320836i
$153$	6.30999	+	6.16463i	0.510132	+	0.498381i
$154$		0			0
$155$	−11.9700	+	8.87905i	−0.961454	+	0.713183i
$156$	−29.8901	+	12.5854i	−2.39312	+	1.00764i
$157$	5.41185			0.431913			0.215957	−	0.976403i	$-0.430713\pi$
$157$	5.41185			0.431913			0.215957	+	0.976403i	$0.430713\pi$
$158$	−12.9225			−1.02806
$159$	3.08764	−	1.30007i	0.244866	−	0.103102i
$160$	−9.49264	−	12.7972i	−0.750459	−	1.01171i
$161$		0			0
$162$	−0.463276	−	19.8762i	−0.0363984	−	1.56162i
$163$			17.1569i			1.34383i	0.740627	+	0.671917i	$0.234529\pi$
$163$			17.1569i			1.34383i	−0.740627	+	0.671917i	$0.765471\pi$
$164$	−10.1114			−0.789566
$165$	7.52487	−	12.7243i	0.585811	−	0.990588i
$166$		−	5.88341i		−	0.456641i
$167$		−	9.60588i		−	0.743325i	−0.928368	−	0.371663i	$-0.878788\pi$
$167$		−	9.60588i		−	0.743325i	0.928368	−	0.371663i	$-0.121212\pi$
$168$		0			0
$169$	29.2709			2.25161
$170$	−11.6658	+	8.65342i	−0.894728	+	0.663687i
$171$	4.36658	+	4.26599i	0.333921	+	0.326228i
$172$			20.2671i			1.54535i
$173$			10.1725i			0.773403i	0.922205	+	0.386702i	$0.126386\pi$
$173$			10.1725i			0.773403i	−0.922205	+	0.386702i	$0.873614\pi$
$174$	−3.34464	−	7.94346i	−0.253556	−	0.602192i
$175$		0			0
$176$			5.59463i			0.421711i
$177$	12.6591	−	5.33019i	0.951516	−	0.400641i
$178$	29.8574			2.23791
$179$			23.6545i			1.76802i	0.467466	+	0.884011i	$0.345167\pi$
$179$			23.6545i			1.76802i	−0.467466	+	0.884011i	$0.654833\pi$
$180$	19.1422	+	2.61034i	1.42678	+	0.194563i
$181$		−	15.6330i		−	1.16199i	−0.813906	−	0.580997i	$-0.802663\pi$
$181$		−	15.6330i		−	1.16199i	0.813906	−	0.580997i	$-0.197337\pi$
$182$		0			0
$183$	−9.18476	−	21.8136i	−0.678957	−	1.61251i
$184$	5.83280			0.430000
$185$	6.04622	−	4.48493i	0.444527	−	0.329739i
$186$	9.89634	+	23.5036i	0.725635	+	1.72337i
$187$	11.2236			0.820752
$188$		−	14.4366i		−	1.05290i
$189$		0			0
$190$	−8.07288	+	5.98826i	−0.585668	+	0.434434i
$191$		−	10.7792i		−	0.779953i	−0.920825	−	0.389976i	$-0.872483\pi$
$191$		−	10.7792i		−	0.779953i	0.920825	−	0.389976i	$-0.127517\pi$
$192$	−20.4483	+	8.60986i	−1.47573	+	0.621363i
$193$		−	1.84621i		−	0.132893i	−0.997790	−	0.0664465i	$-0.978834\pi$
$193$		−	1.84621i		−	0.132893i	0.997790	−	0.0664465i	$-0.0211662\pi$
$194$	−9.86762			−0.708454
$195$	−21.6742	−	12.8176i	−1.55212	−	0.917890i
$196$		0			0
$197$	−8.09941			−0.577059			−0.288530	−	0.957471i	$-0.593166\pi$
$197$	−8.09941			−0.577059			−0.288530	+	0.957471i	$0.593166\pi$
$198$	−18.0937	−	17.6769i	−1.28587	−	1.25624i
$199$		−	10.1027i		−	0.716164i	−0.933690	−	0.358082i	$-0.883431\pi$
$199$		−	10.1027i		−	0.716164i	0.933690	−	0.358082i	$-0.116569\pi$
$200$	−2.81991	+	9.30138i	−0.199398	+	0.657707i
$201$	7.24988	+	17.2184i	0.511367	+	1.21449i
$202$	−19.5954			−1.37873
$203$		0			0
$204$	5.69201	+	13.5184i	0.398521	+	0.946480i
$205$	−4.67717	−	6.30537i	−0.326667	−	0.440386i
$206$	−2.92134			−0.203539
$207$	6.29060	−	6.43893i	0.437227	−	0.447537i
$208$	9.52972			0.660767
$209$	7.76686			0.537245
$210$		0			0
$211$	10.6818			0.735367			0.367684	−	0.929951i	$-0.380151\pi$
$211$	10.6818			0.735367			0.367684	+	0.929951i	$0.380151\pi$
$212$	5.57050			0.382583
$213$	−7.38852	−	17.5476i	−0.506253	−	1.20234i
$214$	−7.34390			−0.502018
$215$	−12.6384	+	9.37486i	−0.861932	+	0.639360i
$216$	3.70170	−	9.39800i	0.251869	−	0.639453i
$217$		0			0
$218$	27.1683			1.84007
$219$	−5.28217	+	2.22409i	−0.356936	+	0.150290i
$220$	19.7417	−	14.6439i	1.33099	−	0.987294i
$221$		−	19.1180i		−	1.28601i
$222$	−4.99878	−	11.8720i	−0.335496	−	0.796797i
$223$	4.13183			0.276688			0.138344	−	0.990384i	$-0.455822\pi$
$223$	4.13183			0.276688			0.138344	+	0.990384i	$0.455822\pi$
$224$		0			0
$225$	7.22672	+	13.1444i	0.481782	+	0.876291i
$226$	45.1954			3.00635
$227$			7.17565i			0.476265i	0.971233	+	0.238132i	$0.0765352\pi$
$227$			7.17565i			0.476265i	−0.971233	+	0.238132i	$0.923465\pi$
$228$	3.93894	+	9.35490i	0.260862	+	0.619544i
$229$			10.4511i			0.690629i	0.938487	+	0.345315i	$0.112228\pi$
$229$			10.4511i			0.690629i	−0.938487	+	0.345315i	$0.887772\pi$
$230$	8.83025	+	11.9042i	0.582250	+	0.784941i
$231$		0			0
$232$		−	4.37879i		−	0.287481i
$233$	−3.90144			−0.255592			−0.127796	−	0.991800i	$-0.540790\pi$
$233$	−3.90144			−0.255592			−0.127796	+	0.991800i	$0.540790\pi$
$234$	−30.1103	+	30.8203i	−1.96837	+	2.01479i
$235$	9.00256	−	6.67788i	0.587262	−	0.435617i
$236$	22.8386			1.48667
$237$	−9.33810	+	3.93186i	−0.606574	+	0.255402i
$238$		0			0
$239$		−	23.7873i		−	1.53867i	−0.638844	−	0.769336i	$-0.720587\pi$
$239$		−	23.7873i		−	1.53867i	0.638844	−	0.769336i	$-0.279413\pi$
$240$	−4.88632	−	2.88966i	−0.315411	−	0.186526i
$241$		−	13.2825i		−	0.855603i	−0.903873	−	0.427801i	$-0.859288\pi$
$241$		−	13.2825i		−	0.855603i	0.903873	−	0.427801i	$-0.140712\pi$
$242$	−7.88374			−0.506786
$243$	−6.38238	−	14.2220i	−0.409430	−	0.912342i
$244$		−	39.3546i		−	2.51942i
$245$		0			0
$246$	−12.3809	+	5.21303i	−0.789375	+	0.332371i
$247$		−	13.2298i		−	0.841794i
$248$			12.9562i			0.822722i
$249$	−1.79011	−	4.25148i	−0.113444	−	0.269427i
$250$	−23.2523	+	8.32615i	−1.47061	+	0.526592i
$251$	−9.12747			−0.576121			−0.288060	−	0.957612i	$-0.593010\pi$
$251$	−9.12747			−0.576121			−0.288060	+	0.957612i	$0.593010\pi$
$252$		0			0
$253$		−	11.4530i		−	0.720041i
$254$			1.31954i			0.0827951i
$255$	−5.79706	+	9.80264i	−0.363026	+	0.613865i
$256$	−5.40900			−0.338062
$257$			6.68630i			0.417080i	0.978014	+	0.208540i	$0.0668712\pi$
$257$			6.68630i			0.417080i	−0.978014	+	0.208540i	$0.933129\pi$
$258$	10.4489	+	24.8161i	0.650523	+	1.54498i
$259$		0			0
$260$	−24.9440	−	33.6275i	−1.54696	−	2.08549i
$261$	−4.83382	−	4.72247i	−0.299206	−	0.292313i
$262$	−12.8387			−0.793177
$263$	24.1283			1.48782			0.743908	−	0.668282i	$-0.232970\pi$
$263$	24.1283			1.48782			0.743908	+	0.668282i	$0.232970\pi$
$264$	−4.98704	−	11.8441i	−0.306931	−	0.728955i
$265$	2.57672	+	3.47371i	0.158286	+	0.213389i
$266$		0			0
$267$	21.5756	−	9.08453i	1.32041	−	0.555964i
$268$			31.0641i			1.89754i
$269$	−19.0079			−1.15893			−0.579465	−	0.814997i	$-0.696738\pi$
$269$	−19.0079			−1.15893			−0.579465	+	0.814997i	$0.696738\pi$
$270$	24.7845	−	6.67275i	1.50833	−	0.406091i
$271$		−	11.8486i		−	0.719750i	−0.933001	−	0.359875i	$-0.882819\pi$
$271$		−	11.8486i		−	0.719750i	0.933001	−	0.359875i	$-0.117181\pi$
$272$		−	4.31002i		−	0.261334i
$273$		0			0
$274$	−2.41603			−0.145957
$275$	18.2637	+	5.53702i	1.10134	+	0.333895i
$276$	13.7947	−	5.80833i	0.830342	−	0.349620i
$277$		−	16.5181i		−	0.992478i	−0.868186	−	0.496239i	$-0.834714\pi$
$277$		−	16.5181i		−	0.992478i	0.868186	−	0.496239i	$-0.165286\pi$
$278$			16.2580i			0.975090i
$279$	14.3026	+	13.9731i	0.856275	+	0.836550i
$280$		0			0
$281$			10.1076i			0.602968i	0.953471	+	0.301484i	$0.0974820\pi$
$281$			10.1076i			0.602968i	−0.953471	+	0.301484i	$0.902518\pi$
$282$	−7.44297	−	17.6769i	−0.443222	−	1.05265i
$283$	−6.00203			−0.356784			−0.178392	−	0.983960i	$-0.557089\pi$
$283$	−6.00203			−0.356784			−0.178392	+	0.983960i	$0.557089\pi$
$284$		−	31.6581i		−	1.87856i
$285$	−4.01163	+	6.78354i	−0.237628	+	0.401822i
$286$			54.8203i			3.24159i
$287$		0			0
$288$	−14.9388	+	15.2910i	−0.880275	+	0.901031i
$289$	8.35349			0.491382
$290$	8.93670	−	6.62903i	0.524781	−	0.389270i
$291$	−7.13056	+	3.00236i	−0.418001	+	0.176002i
$292$	−9.52972			−0.557684
$293$			3.55369i			0.207609i	0.994598	+	0.103805i	$0.0331016\pi$
$293$			3.55369i			0.207609i	−0.994598	+	0.103805i	$0.966898\pi$
$294$		0			0
$295$	10.5643	+	14.2420i	0.615080	+	0.829200i
$296$		−	6.54438i		−	0.380384i
$297$	−18.4534	−	7.26846i	−1.07077	−	0.421759i
$298$			23.9009i			1.38454i
$299$	−19.5086			−1.12821
$300$	2.59322	+	24.8060i	0.149720	+	1.43218i
$301$		0			0
$302$	−18.3264			−1.05456
$303$	−14.1601	+	5.96218i	−0.813475	+	0.342518i
$304$		−	2.98258i		−	0.171063i
$305$	24.5412	−	18.2040i	1.40522	−	1.04236i
$306$	13.9392	+	13.6181i	0.796849	+	0.778492i
$307$	29.0345			1.65709			0.828544	−	0.559923i	$-0.189169\pi$
$307$	29.0345			1.65709			0.828544	+	0.559923i	$0.189169\pi$
$308$		0			0
$309$	−2.11102	+	0.888858i	−0.120092	+	0.0505654i
$310$	−26.4425	+	19.6144i	−1.50183	+	1.11402i
$311$	8.64432			0.490174			0.245087	−	0.969501i	$-0.421183\pi$
$311$	8.64432			0.490174			0.245087	+	0.969501i	$0.421183\pi$
$312$	−20.1749	+	8.49476i	−1.14218	+	0.480921i
$313$	−10.8521			−0.613400			−0.306700	−	0.951806i	$-0.599225\pi$
$313$	−10.8521			−0.613400			−0.306700	+	0.951806i	$0.599225\pi$
$314$	11.9551			0.674667
$315$		0			0
$316$	−16.8471			−0.947724
$317$	−9.34091			−0.524638			−0.262319	−	0.964981i	$-0.584487\pi$
$317$	−9.34091			−0.524638			−0.262319	+	0.964981i	$0.584487\pi$
$318$	6.82079	−	2.87193i	0.382491	−	0.161050i
$319$	−8.59794			−0.481392
$320$	−17.0646	−	23.0051i	−0.953940	−	1.28602i
$321$	−5.30686	+	2.23448i	−0.296200	+	0.124717i
$322$		0			0
$323$	−5.98348			−0.332930
$324$	−0.603973	−	25.9126i	−0.0335541	−	1.43959i
$325$	9.43158	−	31.1098i	0.523170	−	1.72566i
$326$			37.9007i			2.09913i
$327$	19.6324	−	8.26633i	1.08567	−	0.457129i
$328$	−6.82488			−0.376841
$329$		0			0
$330$	16.6229	−	28.1088i	0.915062	−	1.54734i
$331$	2.90918			0.159903			0.0799515	−	0.996799i	$-0.474523\pi$
$331$	2.90918			0.159903			0.0799515	+	0.996799i	$0.474523\pi$
$332$		−	7.67021i		−	0.420958i
$333$	−7.22445	−	7.05803i	−0.395898	−	0.386777i
$334$		−	21.2200i		−	1.16111i
$335$	−19.3713	+	14.3692i	−1.05837	+	0.785071i
$336$		0			0
$337$			15.2910i			0.832954i	0.909146	+	0.416477i	$0.136735\pi$
$337$			15.2910i			0.832954i	−0.909146	+	0.416477i	$0.863265\pi$
$338$	64.6613			3.51711
$339$	32.6592	−	13.7513i	1.77380	−	0.746870i
$340$	−15.2088	+	11.2815i	−0.824811	+	0.611824i
$341$	25.4401			1.37766
$342$	9.64606	+	9.42384i	0.521599	+	0.509583i
$343$		0			0
$344$			13.6797i			0.737561i
$345$	10.0030	+	5.91552i	0.538541	+	0.318481i
$346$			22.4718i			1.20809i
$347$	−31.5784			−1.69522			−0.847609	−	0.530622i	$-0.821958\pi$
$347$	−31.5784			−1.69522			−0.847609	+	0.530622i	$0.821958\pi$
$348$	−4.36041	−	10.3559i	−0.233743	−	0.555135i
$349$			8.25024i			0.441625i	0.975316	+	0.220813i	$0.0708709\pi$
$349$			8.25024i			0.441625i	−0.975316	+	0.220813i	$0.929129\pi$
$350$		0			0
$351$	−12.3809	+	31.4329i	−0.660842	+	1.67777i
$352$			27.1982i			1.44967i
$353$		−	4.28810i		−	0.228232i	−0.993467	−	0.114116i	$-0.963596\pi$
$353$		−	4.28810i		−	0.228232i	0.993467	−	0.114116i	$-0.0364036\pi$
$354$	27.9647	−	11.7747i	1.48631	−	0.625819i
$355$	19.7417	−	14.6439i	1.04778	−	0.777220i
$356$	38.9252			2.06303
$357$		0			0
$358$			52.2543i			2.76173i
$359$			7.13534i			0.376589i	0.982113	+	0.188294i	$0.0602959\pi$
$359$			7.13534i			0.376589i	−0.982113	+	0.188294i	$0.939704\pi$
$360$	12.9204	+	1.76190i	0.680966	+	0.0928605i
$361$	14.8594			0.782072
$362$		−	34.5343i		−	1.81508i
$363$	−5.69696	+	2.39874i	−0.299013	+	0.125901i
$364$		0			0
$365$	−4.40811	−	5.94265i	−0.230731	−	0.311053i
$366$	−20.2897	−	48.1877i	−1.06056	−	2.51881i
$367$	−24.3914			−1.27322			−0.636609	−	0.771187i	$-0.719664\pi$
$367$	−24.3914			−1.27322			−0.636609	+	0.771187i	$0.719664\pi$
$368$	−4.39810			−0.229267
$369$	−7.36055	+	7.53411i	−0.383175	+	0.392210i
$370$	13.3565	−	9.90750i	0.694370	−	0.515067i
$371$		0			0
$372$	12.9019	+	30.6417i	0.668931	+	1.58870i
$373$		−	22.0547i		−	1.14195i	−0.820968	−	0.570974i	$-0.806566\pi$
$373$		−	22.0547i		−	1.14195i	0.820968	−	0.570974i	$-0.193434\pi$
$374$	24.7937			1.28205
$375$	−14.2693	+	13.0915i	−0.736863	+	0.676042i
$376$		−	9.74430i		−	0.502524i
$377$			14.6455i			0.754280i
$378$		0			0
$379$	1.15801			0.0594828			0.0297414	−	0.999558i	$-0.490532\pi$
$379$	1.15801			0.0594828			0.0297414	+	0.999558i	$0.490532\pi$
$380$	−10.5246	+	7.80691i	−0.539902	+	0.400486i
$381$	0.401488	+	0.953527i	0.0205688	+	0.0488506i
$382$		−	23.8118i		−	1.21832i
$383$			2.12930i			0.108802i	0.998519	+	0.0544011i	$0.0173250\pi$
$383$			2.12930i			0.108802i	−0.998519	+	0.0544011i	$0.982675\pi$
$384$	−22.4217	+	9.44079i	−1.14420	+	0.481773i
$385$		0			0
$386$		−	4.07839i		−	0.207585i
$387$	15.1013	+	14.7534i	0.767641	+	0.749957i
$388$	−12.8644			−0.653093
$389$			24.1571i			1.22481i	0.790543	+	0.612406i	$0.209798\pi$
$389$			24.1571i			1.22481i	−0.790543	+	0.612406i	$0.790202\pi$
$390$	−47.8797	−	28.3150i	−2.42448	−	1.43378i
$391$			8.82320i			0.446208i
$392$		0			0
$393$	−9.27752	+	3.90635i	−0.467989	+	0.197049i
$394$	−17.8921			−0.901392
$395$	−7.79288	−	10.5057i	−0.392103	−	0.528600i
$396$	−23.5889	−	23.0454i	−1.18538	−	1.15808i
$397$	12.0158			0.603058			0.301529	−	0.953457i	$-0.402503\pi$
$397$	12.0158			0.603058			0.301529	+	0.953457i	$0.402503\pi$
$398$		−	22.3176i		−	1.11868i
$399$		0			0
$400$	2.12629	−	7.01351i	0.106315	−	0.350675i
$401$		−	30.8302i		−	1.53958i	−0.638294	−	0.769792i	$-0.720360\pi$
$401$		−	30.8302i		−	1.53958i	0.638294	−	0.769792i	$-0.279640\pi$
$402$	16.0155	+	38.0364i	0.798778	+	1.89708i
$403$		−	43.3340i		−	2.15862i
$404$	−25.5466			−1.27099
$405$	15.8795	−	12.3629i	0.789059	−	0.614317i
$406$		0			0
$407$	−12.8502			−0.636959
$408$	3.84194	+	9.12455i	0.190204	+	0.451732i
$409$			15.6691i			0.774788i	0.921914	+	0.387394i	$0.126625\pi$
$409$			15.6691i			0.774788i	−0.921914	+	0.387394i	$0.873375\pi$
$410$	−10.3322	−	13.9290i	−0.510269	−	0.687902i
$411$	−1.74587	+	0.735110i	−0.0861176	+	0.0362603i
$412$	−3.80855			−0.187634
$413$		0			0
$414$	13.8963	−	14.2240i	0.682968	−	0.699072i
$415$	4.78308	−	3.54797i	0.234792	−	0.174163i
$416$	46.3286			2.27144
$417$	4.94672	+	11.7484i	0.242242	+	0.575321i
$418$	17.1575			0.839200
$419$	19.5975			0.957399			0.478699	−	0.877979i	$-0.341108\pi$
$419$	19.5975			0.957399			0.478699	+	0.877979i	$0.341108\pi$
$420$		0			0
$421$	−32.5791			−1.58781			−0.793903	−	0.608044i	$-0.791954\pi$
$421$	−32.5791			−1.58781			−0.793903	+	0.608044i	$0.791954\pi$
$422$	23.5968			1.14868
$423$	−10.7569	−	10.5091i	−0.523019	−	0.510970i
$424$	3.75992			0.182598
$425$	−14.0701	−	4.26564i	−0.682499	−	0.206914i
$426$	−16.3217	−	38.7638i	−0.790789	−	1.87811i
$427$		0			0
$428$	−9.57425			−0.462789
$429$	16.6798	+	39.6143i	0.805310	+	1.91260i
$430$	−27.9190	+	20.7097i	−1.34638	+	0.998708i
$431$			27.8893i			1.34338i	0.740832	+	0.671690i	$0.234431\pi$
$431$			27.8893i			1.34338i	−0.740832	+	0.671690i	$0.765569\pi$
$432$	−2.79119	+	7.08636i	−0.134291	+	0.340943i
$433$	−3.47350			−0.166926			−0.0834629	−	0.996511i	$-0.526598\pi$
$433$	−3.47350			−0.166926			−0.0834629	+	0.996511i	$0.526598\pi$
$434$		0			0
$435$	4.44088	−	7.50940i	0.212924	−	0.360048i
$436$	35.4193			1.69628
$437$			6.10575i			0.292078i
$438$	−11.6687	+	4.91315i	−0.557550	+	0.234760i
$439$			3.94804i			0.188429i	0.995552	+	0.0942147i	$0.0300340\pi$
$439$			3.94804i			0.188429i	−0.995552	+	0.0942147i	$0.969966\pi$
$440$	13.3251	−	9.88423i	0.635249	−	0.471212i
$441$		0			0
$442$		−	42.2328i		−	2.00881i
$443$	−16.0308			−0.761646			−0.380823	−	0.924648i	$-0.624359\pi$
$443$	−16.0308			−0.761646			−0.380823	+	0.924648i	$0.624359\pi$
$444$	−6.51692	−	15.4776i	−0.309279	−	0.734533i
$445$	18.0054	+	24.2734i	0.853538	+	1.15067i
$446$	9.12747			0.432198
$447$	7.27218	+	17.2713i	0.343962	+	0.816905i
$448$		0			0
$449$		−	21.1001i		−	0.995777i	−0.867241	−	0.497889i	$-0.834109\pi$
$449$		−	21.1001i		−	0.995777i	0.867241	−	0.497889i	$-0.165891\pi$
$450$	15.9643	+	29.0367i	0.752564	+	1.36881i
$451$			13.4010i			0.631026i
$452$	58.9213			2.77143
$453$	−13.2430	+	5.57605i	−0.622212	+	0.261986i
$454$			15.8515i			0.743947i
$455$		0			0
$456$	2.65867	+	6.31429i	0.124503	+	0.295694i
$457$			9.60675i			0.449385i	0.974430	+	0.224692i	$0.0721378\pi$
$457$			9.60675i			0.449385i	−0.974430	+	0.224692i	$0.927862\pi$
$458$			23.0872i			1.07879i
$459$	14.2162	+	5.59952i	0.663557	+	0.261363i
$460$	11.5120	+	15.5195i	0.536751	+	0.723603i
$461$	24.5367			1.14279			0.571393	−	0.820676i	$-0.306403\pi$
$461$	24.5367			1.14279			0.571393	+	0.820676i	$0.306403\pi$
$462$		0			0
$463$		−	14.5875i		−	0.677937i	−0.940798	−	0.338968i	$-0.889922\pi$
$463$		−	14.5875i		−	0.677937i	0.940798	−	0.338968i	$-0.110078\pi$
$464$			3.30173i			0.153279i
$465$	−13.1400	+	22.2193i	−0.609352	+	1.03039i
$466$	−8.61854			−0.399246
$467$		−	17.9185i		−	0.829170i	−0.910010	−	0.414585i	$-0.863927\pi$
$467$		−	17.9185i		−	0.829170i	0.910010	−	0.414585i	$-0.136073\pi$
$468$	−39.2549	+	40.1805i	−1.81456	+	1.85735i
$469$		0			0
$470$	19.8872	−	14.7519i	0.917330	−	0.680452i
$471$	8.63904	−	3.63752i	0.398066	−	0.167608i
$472$	15.4154			0.709552
$473$	26.8607			1.23506
$474$	−20.6284	+	8.68572i	−0.947496	+	0.398949i
$475$	−9.73665	−	2.95187i	−0.446748	−	0.135441i
$476$		0			0
$477$	4.05503	−	4.15064i	0.185667	−	0.190045i
$478$		−	52.5477i		−	2.40347i
$479$	2.96497			0.135473			0.0677364	−	0.997703i	$-0.478422\pi$
$479$	2.96497			0.135473			0.0677364	+	0.997703i	$0.478422\pi$
$480$	−23.7548	−	14.0480i	−1.08425	−	0.641201i
$481$			21.8886i			0.998034i
$482$		−	29.3419i		−	1.33649i
$483$		0			0
$484$	−10.2780			−0.467184
$485$	−5.95064	−	8.02215i	−0.270204	−	0.364267i
$486$	−14.0991	−	31.4173i	−0.639547	−	1.42512i
$487$			33.2558i			1.50696i	0.657469	+	0.753482i	$0.271627\pi$
$487$			33.2558i			1.50696i	−0.657469	+	0.753482i	$0.728373\pi$
$488$		−	26.5632i		−	1.20246i
$489$	11.5318	+	27.3879i	0.521487	+	1.23852i
$490$		0			0
$491$			25.4892i			1.15031i	0.818043	+	0.575157i	$0.195059\pi$
$491$			25.4892i			1.15031i	−0.818043	+	0.575157i	$0.804941\pi$
$492$	−16.1410	+	6.79624i	−0.727691	+	0.306398i
$493$	6.62373			0.298318
$494$		−	29.2255i		−	1.31492i
$495$	3.45957	−	25.3698i	0.155496	−	1.14029i
$496$		−	9.76937i		−	0.438658i
$497$		0			0
$498$	−3.95447	−	9.39179i	−0.177204	−	0.420856i
$499$	−33.6716			−1.50735			−0.753673	−	0.657249i	$-0.771720\pi$
$499$	−33.6716			−1.50735			−0.753673	+	0.657249i	$0.771720\pi$
$500$	−30.3141	+	10.8548i	−1.35569	+	0.485442i
$501$	−6.45648	−	15.3340i	−0.288454	−	0.685074i
$502$	−20.1632			−0.899926
$503$		−	35.2418i		−	1.57135i	−0.618637	−	0.785677i	$-0.712315\pi$
$503$		−	35.2418i		−	1.57135i	0.618637	−	0.785677i	$-0.287685\pi$
$504$		0			0
$505$	−11.8170	−	15.9306i	−0.525848	−	0.708904i
$506$		−	25.3003i		−	1.12474i
$507$	46.7257	−	19.6741i	2.07516	−	0.873758i
$508$			1.72028i			0.0763252i
$509$	23.1829			1.02756			0.513782	−	0.857921i	$-0.328244\pi$
$509$	23.1829			1.02756			0.513782	+	0.857921i	$0.328244\pi$
$510$	−12.8061	+	21.6547i	−0.567062	+	0.958884i
$511$		0			0
$512$	16.1430			0.713426
$513$	9.83779	+	3.87493i	0.434349	+	0.171082i
$514$			14.7705i			0.651497i
$515$	−1.76170	−	2.37498i	−0.0776299	−	0.104654i
$516$	13.6223	+	32.3528i	0.599689	+	1.42425i
$517$	−19.1334			−0.841484
$518$		0			0
$519$	6.83735	+	16.2386i	0.300126	+	0.712795i
$520$	−16.8365	−	22.6976i	−0.738329	−	0.995354i
$521$	−14.3752			−0.629791			−0.314895	−	0.949126i	$-0.601969\pi$
$521$	−14.3752			−0.629791			−0.314895	+	0.949126i	$0.601969\pi$
$522$	−10.6782	−	10.4322i	−0.467373	−	0.456606i
$523$	−25.2484			−1.10404			−0.552018	−	0.833832i	$-0.686142\pi$
$523$	−25.2484			−1.10404			−0.552018	+	0.833832i	$0.686142\pi$
$524$	−16.7378			−0.731195
$525$		0			0
$526$	53.3010			2.32403
$527$	−19.5987			−0.853734
$528$	3.76037	+	8.93080i	0.163649	+	0.388663i
$529$	−13.9965			−0.608543
$530$	5.69213	+	7.67366i	0.247250	+	0.333322i
$531$	16.6253	−	17.0173i	0.721477	−	0.738489i
$532$		0			0
$533$	22.8268			0.988737
$534$	47.6619	−	20.0683i	2.06253	−	0.868441i
$535$	−4.42871	−	5.97042i	−0.191470	−	0.258124i
$536$			20.9674i			0.905652i
$537$	15.8991	+	37.7601i	0.686097	+	1.62947i
$538$	−41.9896			−1.81030
$539$		0			0
$540$	32.3115	−	8.69928i	1.39047	−	0.374357i
$541$	15.7795			0.678412			0.339206	−	0.940712i	$-0.389842\pi$
$541$	15.7795			0.678412			0.339206	+	0.940712i	$0.389842\pi$
$542$		−	26.1742i		−	1.12428i
$543$	−10.5076	−	24.9553i	−0.450922	−	1.07093i
$544$		−	20.9531i		−	0.898357i
$545$	16.3837	+	22.0872i	0.701802	+	0.946112i
$546$		0			0
$547$		−	8.23195i		−	0.351973i	−0.984393	−	0.175986i	$-0.943689\pi$
$547$		−	8.23195i		−	0.351973i	0.984393	−	0.175986i	$-0.0563115\pi$
$548$	−3.14978			−0.134552
$549$	−29.3236	−	28.6481i	−1.25150	−	1.22267i
$550$	40.3456	+	12.2316i	1.72034	+	0.521558i
$551$	4.58370			0.195272
$552$	9.31100	−	3.92045i	0.396303	−	0.166865i
$553$		0			0
$554$		−	36.4896i		−	1.55029i
$555$	6.63718	−	11.2233i	0.281733	−	0.476401i
$556$			21.1956i			0.898893i
$557$	28.9351			1.22602			0.613011	−	0.790075i	$-0.289958\pi$
$557$	28.9351			1.22602			0.613011	+	0.790075i	$0.289958\pi$
$558$	31.5954	+	30.8675i	1.33754	+	1.30673i
$559$		−	45.7537i		−	1.93518i
$560$		0			0
$561$	17.9164	−	7.54382i	0.756433	−	0.318500i
$562$			22.3283i			0.941862i
$563$		−	6.22808i		−	0.262482i	−0.991350	−	0.131241i	$-0.958104\pi$
$563$		−	6.22808i		−	0.262482i	0.991350	−	0.131241i	$-0.0418962\pi$
$564$	−9.70342	−	23.0454i	−0.408588	−	0.970388i
$565$	27.2549	+	36.7428i	1.14662	+	1.54578i
$566$	−13.2589			−0.557312
$567$		0			0
$568$		−	21.3683i		−	0.896594i
$569$		−	9.89419i		−	0.414786i	−0.978258	−	0.207393i	$-0.933502\pi$
$569$		−	9.89419i		−	0.414786i	0.978258	−	0.207393i	$-0.0664979\pi$
$570$	−8.86194	+	14.9853i	−0.371186	+	0.627664i
$571$	19.2094			0.803890			0.401945	−	0.915664i	$-0.368334\pi$
$571$	19.2094			0.803890			0.401945	+	0.915664i	$0.368334\pi$
$572$			71.4693i			2.98828i
$573$	−7.24509	−	17.2070i	−0.302668	−	0.718831i
$574$		0			0
$575$	−4.35281	+	14.3576i	−0.181525	+	0.598753i
$576$	−26.8549	+	27.4881i	−1.11895	+	1.14534i
$577$	38.0753			1.58510			0.792549	−	0.609809i	$-0.208754\pi$
$577$	38.0753			1.58510			0.792549	+	0.609809i	$0.208754\pi$
$578$	18.4534			0.767560
$579$	−1.24091	−	2.94713i	−0.0515704	−	0.122479i
$580$	11.6508	−	8.64228i	0.483773	−	0.358851i
$581$		0			0
$582$	−15.7519	+	6.63241i	−0.652935	+	0.274922i
$583$		−	7.38277i		−	0.305763i
$584$	−6.43228			−0.266170
$585$	−43.2142	−	5.89293i	−1.78669	−	0.243643i
$586$			7.85033i			0.324294i
$587$			11.9232i			0.492124i	0.969254	+	0.246062i	$0.0791367\pi$
$587$			11.9232i			0.492124i	−0.969254	+	0.246062i	$0.920863\pi$
$588$		0			0
$589$	−13.5625			−0.558835
$590$	23.3373	+	31.4614i	0.960782	+	1.29525i
$591$	−12.9292	+	5.44393i	−0.531838	+	0.223933i
$592$			4.93465i			0.202813i
$593$		−	16.8579i		−	0.692272i	−0.938184	−	0.346136i	$-0.887494\pi$
$593$		−	16.8579i		−	0.692272i	0.938184	−	0.346136i	$-0.112506\pi$
$594$	−40.7647	−	16.0565i	−1.67260	−	0.658806i
$595$		0			0
$596$			31.1596i			1.27635i
$597$	−6.79044	−	16.1272i	−0.277914	−	0.660041i
$598$	−43.0958			−1.76232
$599$			13.5950i			0.555477i	0.960657	+	0.277739i	$0.0895849\pi$
$599$			13.5950i			0.555477i	−0.960657	+	0.277739i	$0.910415\pi$
$600$	1.75035	+	16.7433i	0.0714577	+	0.683544i
$601$			46.2155i			1.88517i	0.333966	+	0.942585i	$0.391613\pi$
$601$			46.2155i			1.88517i	−0.333966	+	0.942585i	$0.608387\pi$
$602$		0			0
$603$	23.1462	+	22.6130i	0.942588	+	0.920874i
$604$	−23.8921			−0.972156
$605$	−4.75426	−	6.40930i	−0.193288	−	0.260575i
$606$	−31.2805	+	13.1708i	−1.27068	+	0.535029i
$607$	−8.74327			−0.354878			−0.177439	−	0.984132i	$-0.556781\pi$
$607$	−8.74327			−0.354878			−0.177439	+	0.984132i	$0.556781\pi$
$608$		−	14.4998i		−	0.588044i
$609$		0			0
$610$	54.2130	−	40.2139i	2.19502	−	1.62821i
$611$			32.5912i			1.31850i
$612$	18.1725	+	17.7539i	0.734581	+	0.717658i
$613$			24.3570i			0.983771i	0.870660	+	0.491885i	$0.163692\pi$
$613$			24.3570i			0.983771i	−0.870660	+	0.491885i	$0.836308\pi$
$614$	64.1391			2.58845
$615$	−11.7043	−	6.92167i	−0.471964	−	0.279109i
$616$		0			0
$617$	−25.3125			−1.01904			−0.509522	−	0.860458i	$-0.670178\pi$
$617$	−25.3125			−1.01904			−0.509522	+	0.860458i	$0.670178\pi$
$618$	−4.66338	+	1.96354i	−0.187589	+	0.0789853i
$619$			30.2552i			1.21606i	0.793915	+	0.608029i	$0.208040\pi$
$619$			30.2552i			1.21606i	−0.793915	+	0.608029i	$0.791960\pi$
$620$	−34.4731	+	25.5713i	−1.38447	+	1.02697i
$621$	5.71394	−	14.5067i	0.229293	−	0.582135i
$622$	19.0958			0.765673
$623$		0			0
$624$	15.2125	−	6.40529i	0.608986	−	0.256417i
$625$	−20.7912	−	13.8826i	−0.831648	−	0.555303i
$626$	−23.9731			−0.958157
$627$	12.3984	−	5.22041i	0.495143	−	0.208483i
$628$	15.5859			0.621946
$629$	9.89959			0.394723
$630$		0			0
$631$	−5.90652			−0.235135			−0.117568	−	0.993065i	$-0.537510\pi$
$631$	−5.90652			−0.235135			−0.117568	+	0.993065i	$0.537510\pi$
$632$	−11.3713			−0.452326
$633$	17.0516	−	7.17967i	0.677740	−	0.285366i
$634$	−20.6347			−0.819507
$635$	−1.07275	+	0.795743i	−0.0425710	+	0.0315781i
$636$	8.89228	−	3.74415i	0.352602	−	0.148465i
$637$		0			0
$638$	−18.9934			−0.751956
$639$	−23.5889	−	23.0454i	−0.933161	−	0.911664i
$640$	−18.7115	−	25.2253i	−0.739637	−	0.997118i
$641$		−	0.128699i		−	0.00508330i	−0.999997	−	0.00254165i	$-0.999191\pi$
$641$		−	0.128699i		−	0.00508330i	0.999997	−	0.00254165i	$-0.000809034\pi$
$642$	−11.7232	+	4.93612i	−0.462677	+	0.194813i
$643$	−0.150563			−0.00593763			−0.00296881	−	0.999996i	$-0.500945\pi$
$643$	−0.150563			−0.00593763			−0.00296881	+	0.999996i	$0.500945\pi$
$644$		0			0
$645$	−13.8737	+	23.4600i	−0.546277	+	0.923737i
$646$	−13.2179			−0.520051
$647$			41.3552i			1.62584i	0.582375	+	0.812920i	$0.302124\pi$
$647$			41.3552i			1.62584i	−0.582375	+	0.812920i	$0.697876\pi$
$648$	−0.407664	−	17.4903i	−0.0160146	−	0.687082i
$649$		−	30.2688i		−	1.18816i
$650$	20.8350	−	68.7235i	0.817214	−	2.69556i
$651$		0			0
$652$			49.4113i			1.93509i
$653$	−29.4608			−1.15289			−0.576446	−	0.817136i	$-0.695561\pi$
$653$	−29.4608			−1.15289			−0.576446	+	0.817136i	$0.695561\pi$
$654$	43.3692	−	18.2608i	1.69587	−	0.714056i
$655$	−7.74233	−	10.4376i	−0.302518	−	0.407830i
$656$	5.14615			0.200924
$657$	−6.93713	+	7.10071i	−0.270643	+	0.277025i
$658$		0			0
$659$			22.4678i			0.875220i	0.899165	+	0.437610i	$0.144175\pi$
$659$			22.4678i			0.875220i	−0.899165	+	0.437610i	$0.855825\pi$
$660$	21.6713	−	36.6456i	0.843556	−	1.42643i
$661$			23.4594i			0.912465i	0.889861	+	0.456233i	$0.150802\pi$
$661$			23.4594i			0.912465i	−0.889861	+	0.456233i	$0.849198\pi$
$662$	6.42656			0.249776
$663$	−12.8499	−	30.5183i	−0.499049	−	1.18523i
$664$		−	5.17717i		−	0.200913i
$665$		0			0
$666$	−15.9593	−	15.5916i	−0.618409	−	0.604163i
$667$		−	6.75909i		−	0.261713i
$668$		−	27.6646i		−	1.07037i
$669$	6.59571	−	2.77716i	0.255005	−	0.107371i
$670$	−42.7925	+	31.7424i	−1.65322	+	1.22632i
$671$	−52.1580			−2.01354
$672$		0			0
$673$		−	44.5504i		−	1.71729i	−0.512570	−	0.858645i	$-0.671307\pi$
$673$		−	44.5504i		−	1.71729i	0.512570	−	0.858645i	$-0.328693\pi$
$674$			33.7788i			1.30111i
$675$	20.3710	+	16.1252i	0.784080	+	0.620660i
$676$	84.2991			3.24227
$677$		−	45.7011i		−	1.75643i	−0.478262	−	0.878217i	$-0.658733\pi$
$677$		−	45.7011i		−	1.75643i	0.478262	−	0.878217i	$-0.341267\pi$
$678$	72.1462	−	30.3776i	2.77076	−	1.16664i
$679$		0			0
$680$	−10.2655	+	7.61467i	−0.393663	+	0.292009i
$681$	4.82303	+	11.4546i	0.184819	+	0.438942i
$682$	56.1989			2.15197
$683$	−38.6888			−1.48038			−0.740192	−	0.672395i	$-0.765266\pi$
$683$	−38.6888			−1.48038			−0.740192	+	0.672395i	$0.765266\pi$
$684$	12.5756	+	12.2859i	0.480839	+	0.469763i
$685$	−1.45698	−	1.96418i	−0.0556682	−	0.0750473i
$686$		0			0
$687$	7.02460	+	16.6833i	0.268005	+	0.636508i
$688$		−	10.3149i		−	0.393252i
$689$	−12.5756			−0.479092
$690$	22.0972	+	13.0678i	0.841225	+	0.497481i
$691$		−	19.2567i		−	0.732559i	−0.930505	−	0.366279i	$-0.880631\pi$
$691$		−	19.2567i		−	0.732559i	0.930505	−	0.366279i	$-0.119369\pi$
$692$			29.2965i			1.11369i
$693$		0			0
$694$	−69.7587			−2.64800
$695$	−13.2174	+	9.80433i	−0.501364	+	0.371899i
$696$	−2.94315	−	6.98994i	−0.111560	−	0.264953i
$697$		−	10.3239i		−	0.391046i
$698$			18.2253i			0.689838i
$699$	−6.22794	+	2.62231i	−0.235562	+	0.0991849i
$700$		0			0
$701$			6.75777i			0.255238i	0.991823	+	0.127619i	$0.0407334\pi$
$701$			6.75777i			0.255238i	−0.991823	+	0.127619i	$0.959267\pi$
$702$	−27.3501	+	69.4373i	−1.03226	+	2.62074i
$703$	6.85063			0.258376
$704$			48.8933i			1.84273i
$705$	9.88249	−	16.7110i	0.372196	−	0.629372i
$706$		−	9.47268i		−	0.356509i
$707$		0			0
$708$	36.4577	−	15.3507i	1.37016	−	0.576916i
$709$	4.89171			0.183712			0.0918561	−	0.995772i	$-0.470720\pi$
$709$	4.89171			0.183712			0.0918561	+	0.995772i	$0.470720\pi$
$710$	43.6108	−	32.3494i	1.63668	−	1.21405i
$711$	−12.2638	+	12.5530i	−0.459929	+	0.470774i
$712$	26.2733			0.984635
$713$			19.9992i			0.748977i
$714$		0			0
$715$	−44.5677	+	33.0592i	−1.66674	+	1.23634i
$716$			68.1241i			2.54592i
$717$	−15.9884	−	37.9721i	−0.597096	−	1.41809i
$718$			15.7624i			0.588248i
$719$	−38.0217			−1.41797			−0.708985	−	0.705224i	$-0.750846\pi$
$719$	−38.0217			−1.41797			−0.708985	+	0.705224i	$0.750846\pi$
$720$	−9.74237	−	1.32852i	−0.363077	−	0.0495112i
$721$		0			0
$722$	32.8253			1.22163
$723$	−8.92770	−	21.2031i	−0.332025	−	0.788553i
$724$		−	45.0225i		−	1.67325i
$725$	10.7785	+	3.26773i	0.400304	+	0.121360i
$726$	−12.5849	+	5.29896i	−0.467071	+	0.196663i
$727$	−18.6502			−0.691699			−0.345849	−	0.938290i	$-0.612409\pi$
$727$	−18.6502			−0.691699			−0.345849	+	0.938290i	$0.612409\pi$
$728$		0			0
$729$	−19.7475	−	18.4130i	−0.731387	−	0.681962i
$730$	−9.73780	−	13.1277i	−0.360412	−	0.485878i
$731$	−20.6931			−0.765363
$732$	−26.4517	−	62.8224i	−0.977684	−	2.32198i
$733$	−37.5933			−1.38854			−0.694271	−	0.719714i	$-0.744273\pi$
$733$	−37.5933			−1.38854			−0.694271	+	0.719714i	$0.744273\pi$
$734$	−53.8821			−1.98882
$735$		0			0
$736$	−21.3813			−0.788124
$737$	41.1703			1.51653
$738$	−16.2599	+	16.6433i	−0.598536	+	0.612649i
$739$	−49.4378			−1.81860			−0.909300	−	0.416142i	$-0.863382\pi$
$739$	−49.4378			−1.81860			−0.909300	+	0.416142i	$0.863382\pi$
$740$	17.4129	−	12.9164i	0.640110	−	0.474818i
$741$	−8.89228	−	21.1190i	−0.326666	−	0.775826i
$742$		0			0
$743$	−42.7477			−1.56826			−0.784131	−	0.620596i	$-0.786891\pi$
$743$	−42.7477			−1.56826			−0.784131	+	0.620596i	$0.786891\pi$
$744$	8.70839	+	20.6823i	0.319265	+	0.758249i
$745$	−19.4309	+	14.4134i	−0.711893	+	0.528065i
$746$		−	48.7202i		−	1.78377i
$747$	−5.71517	−	5.58351i	−0.209107	−	0.204290i
$748$	32.3236			1.18187
$749$		0			0
$750$	−31.5218	+	28.9200i	−1.15101	+	1.05601i
$751$	5.59051			0.204001			0.102000	−	0.994784i	$-0.467476\pi$
$751$	5.59051			0.204001			0.102000	+	0.994784i	$0.467476\pi$
$752$			7.34748i			0.267935i
$753$	−14.5703	+	6.13492i	−0.530973	+	0.223569i
$754$			32.3528i			1.17822i
$755$	−11.0517	−	14.8989i	−0.402211	−	0.542227i
$756$		0			0
$757$			42.9931i			1.56261i	0.624150	+	0.781305i	$0.285445\pi$
$757$			42.9931i			1.56261i	−0.624150	+	0.781305i	$0.714555\pi$
$758$	2.55811			0.0929148
$759$	−7.69798	−	18.2826i	−0.279419	−	0.663615i
$760$	−7.10382	+	5.26944i	−0.257683	+	0.191143i
$761$	−49.1430			−1.78143			−0.890716	−	0.454561i	$-0.849796\pi$
$761$	−49.1430			−1.78143			−0.890716	+	0.454561i	$0.849796\pi$
$762$	0.886912	+	2.10640i	0.0321294	+	0.0763068i
$763$		0			0
$764$		−	31.0436i		−	1.12312i
$765$	−2.66521	+	19.5446i	−0.0963608	+	0.706635i
$766$			4.70376i			0.169954i
$767$	−51.5590			−1.86169
$768$	−8.63447	+	3.63559i	−0.311570	+	0.131188i
$769$			27.0203i			0.974376i	0.873297	+	0.487188i	$0.161977\pi$
$769$			27.0203i			0.974376i	−0.873297	+	0.487188i	$0.838023\pi$
$770$		0			0
$771$	4.49412	+	10.6735i	0.161852	+	0.384395i
$772$		−	5.31701i		−	0.191363i
$773$		−	52.9162i		−	1.90326i	−0.307244	−	0.951631i	$-0.599407\pi$
$773$		−	52.9162i		−	1.90326i	0.307244	−	0.951631i	$-0.400593\pi$
$774$	33.3597	+	32.5912i	1.19909	+	1.17147i
$775$	−31.8921	−	9.66877i	−1.14560	−	0.347312i
$776$	−8.68312			−0.311706
$777$		0			0
$778$			53.3645i			1.91321i
$779$		−	7.14426i		−	0.255970i
$780$	−62.4209	−	36.9143i	−2.23503	−	1.32174i
$781$	−41.9576			−1.50136
$782$			19.4910i			0.696997i
$783$	−10.8905	−	4.28956i	−0.389193	−	0.153296i
$784$		0			0
$785$	7.20950	+	9.71926i	0.257318	+	0.346895i
$786$	−20.4946	+	8.62938i	−0.731019	+	0.307800i
$787$	−16.7576			−0.597344			−0.298672	−	0.954356i	$-0.596544\pi$
$787$	−16.7576			−0.597344			−0.298672	+	0.954356i	$0.596544\pi$
$788$	−23.3260			−0.830954
$789$	38.5165	−	16.2176i	1.37122	−	0.577361i
$790$	−17.2150	−	23.2078i	−0.612481	−	0.825697i
$791$		0			0
$792$	−15.9218	−	15.5550i	−0.565756	−	0.552723i
$793$			88.8443i			3.15495i
$794$	26.5437			0.942002
$795$	6.44807	+	3.81324i	0.228690	+	0.135242i
$796$		−	29.0955i		−	1.03126i
$797$		−	55.9724i		−	1.98264i	−0.131462	−	0.991321i	$-0.541967\pi$
$797$		−	55.9724i		−	1.98264i	0.131462	−	0.991321i	$-0.458033\pi$
$798$		0			0
$799$	14.7401			0.521466
$800$	10.3369	−	34.0960i	0.365466	−	1.20548i
$801$	28.3355	−	29.0036i	1.00118	−	1.02479i
$802$		−	68.1058i		−	2.40490i
$803$			12.6301i			0.445705i
$804$	20.8794	+	49.5882i	0.736359	+	1.74884i
$805$		0			0
$806$		−	95.7274i		−	3.37186i
$807$	−30.3426	+	12.7759i	−1.06811	+	0.449734i
$808$	−17.2432			−0.606614
$809$		−	42.1009i		−	1.48019i	−0.672503	−	0.740094i	$-0.734781\pi$
$809$		−	42.1009i		−	1.48019i	0.672503	−	0.740094i	$-0.265219\pi$
$810$	35.0788	−	27.3104i	1.23254	−	0.959590i
$811$			1.35051i			0.0474227i	0.999719	+	0.0237113i	$0.00754826\pi$
$811$			1.35051i			0.0474227i	−0.999719	+	0.0237113i	$0.992452\pi$
$812$		0			0
$813$	−7.96388	−	18.9141i	−0.279306	−	0.663346i
$814$	−28.3868			−0.994958
$815$	−30.8124	+	22.8559i	−1.07931	+	0.800608i
$816$	−2.89693	−	6.88016i	−0.101413	−	0.240854i
$817$	−14.3199			−0.500989
$818$			34.6141i			1.21025i
$819$		0			0
$820$	−13.4701	−	18.1592i	−0.470395	−	0.634147i
$821$			11.3444i			0.395923i	0.980210	+	0.197962i	$0.0634322\pi$
$821$			11.3444i			0.395923i	−0.980210	+	0.197962i	$0.936568\pi$
$822$	−3.85674	+	1.62390i	−0.134519	+	0.0566402i
$823$			30.1779i			1.05193i	0.850505	+	0.525967i	$0.176297\pi$
$823$			30.1779i			1.05193i	−0.850505	+	0.525967i	$0.823703\pi$
$824$	−2.57066			−0.0895533
$825$	32.8763	−	3.43689i	1.14460	−	0.119657i
$826$		0			0
$827$	−34.7911			−1.20981			−0.604903	−	0.796299i	$-0.706788\pi$
$827$	−34.7911			−1.20981			−0.604903	+	0.796299i	$0.706788\pi$
$828$	18.1167	−	18.5439i	0.629598	−	0.644444i
$829$			4.04928i			0.140637i	0.997525	+	0.0703187i	$0.0224016\pi$
$829$			4.04928i			0.140637i	−0.997525	+	0.0703187i	$0.977598\pi$
$830$	10.5661	−	7.83769i	0.366756	−	0.272050i
$831$	−11.1025	−	26.3682i	−0.385140	−	0.914701i
$832$	83.2833			2.88733
$833$		0			0
$834$	10.9276	+	25.9529i	0.378393	+	0.898676i
$835$	17.2514	−	12.7967i	0.597009	−	0.442846i
$836$	22.3683			0.773622
$837$	32.2234	+	12.6922i	1.11380	+	0.438707i
$838$	43.2920			1.49550
$839$	25.8653			0.892969			0.446485	−	0.894791i	$-0.352676\pi$
$839$	25.8653			0.892969			0.446485	+	0.894791i	$0.352676\pi$
$840$		0			0
$841$	23.9258			0.825029
$842$	−71.9692			−2.48022
$843$	6.79370	+	16.1349i	0.233987	+	0.555716i
$844$	30.7632			1.05891
$845$	38.9938	+	52.5682i	1.34143	+	1.80840i
$846$	−23.7627	−	23.2153i	−0.816978	−	0.798158i
$847$		0			0
$848$	−2.83509			−0.0973573
$849$	−9.58114	+	4.03420i	−0.328824	+	0.138453i
$850$	−31.0817	−	9.42307i	−1.06609	−	0.323209i
$851$		−	10.1019i		−	0.346288i
$852$	−21.2787	−	50.5364i	−0.728995	−	1.73135i
$853$	37.5709			1.28640			0.643201	−	0.765697i	$-0.277606\pi$
$853$	37.5709			1.28640			0.643201	+	0.765697i	$0.277606\pi$
$854$		0			0
$855$	−1.84435	+	13.5250i	−0.0630755	+	0.462547i
$856$	−6.46234			−0.220878
$857$			22.9281i			0.783208i	0.920134	+	0.391604i	$0.128080\pi$
$857$			22.9281i			0.783208i	−0.920134	+	0.391604i	$0.871920\pi$
$858$	36.8468	+	87.5106i	1.25793	+	2.98756i
$859$			18.7653i			0.640263i	0.947373	+	0.320132i	$0.103727\pi$
$859$			18.7653i			0.640263i	−0.947373	+	0.320132i	$0.896273\pi$
$860$	−36.3981	+	26.9992i	−1.24117	+	0.920666i
$861$		0			0
$862$			61.6092i			2.09842i
$863$	8.46172			0.288040			0.144020	−	0.989575i	$-0.453997\pi$
$863$	8.46172			0.288040			0.144020	+	0.989575i	$0.453997\pi$
$864$	−13.5693	+	34.4502i	−0.461638	+	1.17202i
$865$	−18.2690	+	13.5515i	−0.621166	+	0.460766i
$866$	−7.67319			−0.260746
$867$	13.3348	−	5.61470i	0.452874	−	0.190685i
$868$		0			0
$869$			22.3281i			0.757428i
$870$	9.81019	−	16.5887i	0.332597	−	0.562411i
$871$		−	70.1283i		−	2.37621i
$872$	23.9070			0.809594
$873$	−9.36463	+	9.58544i	−0.316945	+	0.324418i
$874$			13.4880i			0.456238i
$875$		0			0
$876$	−15.2125	+	6.40529i	−0.513981	+	0.216415i
$877$			3.78589i			0.127840i	0.997955	+	0.0639201i	$0.0203603\pi$
$877$			3.78589i			0.127840i	−0.997955	+	0.0639201i	$0.979640\pi$
$878$			8.72146i			0.294335i
$879$	2.38857	+	5.67282i	0.0805646	+	0.191340i
$880$	−10.0475	+	7.45299i	−0.338701	+	0.251240i
$881$	54.6531			1.84131			0.920654	−	0.390379i	$-0.127656\pi$
$881$	54.6531			1.84131			0.920654	+	0.390379i	$0.127656\pi$
$882$		0			0
$883$		−	28.1492i		−	0.947295i	−0.880715	−	0.473647i	$-0.842937\pi$
$883$		−	28.1492i		−	0.947295i	0.880715	−	0.473647i	$-0.157063\pi$
$884$		−	55.0589i		−	1.85183i
$885$	26.4366	+	15.6340i	0.888658	+	0.525532i
$886$	−35.4130			−1.18972
$887$			30.0235i			1.00809i	0.863677	+	0.504045i	$0.168155\pi$
$887$			30.0235i			1.00809i	−0.863677	+	0.504045i	$0.831845\pi$
$888$	−4.39873	−	10.4469i	−0.147612	−	0.350575i
$889$		0			0
$890$	39.7751	+	53.6215i	1.33326	+	1.79740i
$891$	−34.3429	+	0.800467i	−1.15053	+	0.0268166i
$892$	11.8995			0.398425
$893$	10.2003			0.341340
$894$	16.0647	+	38.1534i	0.537284	+	1.27604i
$895$	−42.4816	+	31.5118i	−1.42000	+	1.05332i
$896$		0			0
$897$	−31.1420	+	13.1125i	−1.03980	+	0.437814i
$898$		−	46.6116i		−	1.55545i
$899$	15.0138			0.500737
$900$	20.8127	+	37.8553i	0.693756	+	1.26184i
$901$			5.68758i			0.189481i
$902$			29.6036i			0.985691i
$903$		0			0
$904$	39.7702			1.32274
$905$	28.0756	−	20.8258i	0.933266	−	0.692274i
$906$	−29.2547	+	12.3179i	−0.971922	+	0.409233i
$907$		−	19.4331i		−	0.645264i	−0.946524	−	0.322632i	$-0.895432\pi$
$907$		−	19.4331i		−	0.645264i	0.946524	−	0.322632i	$-0.104568\pi$
$908$			20.6656i			0.685812i
$909$	−18.5966	+	19.0351i	−0.616809	+	0.631354i
$910$		0			0
$911$		−	53.2832i		−	1.76535i	−0.469982	−	0.882676i	$-0.655739\pi$
$911$		−	53.2832i		−	1.76535i	0.469982	−	0.882676i	$-0.344261\pi$
$912$	−2.00471	−	4.76115i	−0.0663826	−	0.157657i
$913$	−10.1656			−0.336432
$914$			21.2219i			0.701959i
$915$	26.9399	−	45.5545i	0.890605	−	1.50599i
$916$			30.0988i			0.994493i
$917$		0			0
$918$	31.4046	+	12.3697i	1.03650	+	0.408261i
$919$	45.0127			1.48483			0.742416	−	0.669939i	$-0.233680\pi$
$919$	45.0127			1.48483			0.742416	+	0.669939i	$0.233680\pi$
$920$	7.77028	+	10.4752i	0.256178	+	0.345358i
$921$	46.3484	−	19.5152i	1.52723	−	0.643049i
$922$	54.2030			1.78508
$923$			71.4693i			2.35244i
$924$		0			0
$925$	16.1092	+	4.88383i	0.529666	+	0.160579i
$926$		−	32.2246i		−	1.05897i
$927$	−2.77243	+	2.83780i	−0.0910584	+	0.0932056i
$928$			16.0513i			0.526910i
$929$	42.6990			1.40091			0.700455	−	0.713696i	$-0.252980\pi$
$929$	42.6990			1.40091			0.700455	+	0.713696i	$0.252980\pi$
$930$	−29.0270	+	49.0838i	−0.951834	+	1.60952i
$931$		0			0
$932$	−11.2360			−0.368048
$933$	13.7991	−	5.81018i	0.451761	−	0.190217i
$934$		−	39.5832i		−	1.29520i
$935$	14.9517	+	20.1567i	0.488974	+	0.659195i
$936$	−26.4959	+	27.1207i	−0.866046	+	0.886467i
$937$	−26.4685			−0.864688			−0.432344	−	0.901709i	$-0.642313\pi$
$937$	−26.4685			−0.864688			−0.432344	+	0.901709i	$0.642313\pi$
$938$		0			0
$939$	−17.3235	+	7.29415i	−0.565330	+	0.238036i
$940$	25.9270	−	19.2320i	0.845646	−	0.627280i
$941$	−31.7091			−1.03369			−0.516843	−	0.856080i	$-0.672893\pi$
$941$	−31.7091			−1.03369			−0.516843	+	0.856080i	$0.672893\pi$
$942$	19.0842	−	8.03550i	0.621796	−	0.261811i
$943$	−10.5349			−0.343063
$944$	−11.6237			−0.378318
$945$		0			0
$946$	59.3370			1.92921
$947$	11.9455			0.388177			0.194089	−	0.980984i	$-0.437825\pi$
$947$	11.9455			0.388177			0.194089	+	0.980984i	$0.437825\pi$
$948$	−26.8933	+	11.3236i	−0.873455	+	0.367773i
$949$	21.5137			0.698363
$950$	−21.5089	−	6.52087i	−0.697840	−	0.211565i
$951$	−14.9111	+	6.27839i	−0.483524	+	0.203591i
$952$		0			0
$953$	−1.76384			−0.0571364			−0.0285682	−	0.999592i	$-0.509095\pi$
$953$	−1.76384			−0.0571364			−0.0285682	+	0.999592i	$0.509095\pi$
$954$	8.95781	−	9.16903i	0.290020	−	0.296858i
$955$	19.3585	−	14.3597i	0.626426	−	0.464668i
$956$		−	68.5065i		−	2.21566i
$957$	−13.7250	+	5.77901i	−0.443668	+	0.186809i
$958$	6.54980			0.211614
$959$		0			0
$960$	−42.7031	−	25.2536i	−1.37824	−	0.815058i
$961$	−13.4237			−0.433023
$962$			48.3533i			1.55897i
$963$	−6.96955	+	7.13389i	−0.224591	+	0.229886i
$964$		−	38.2532i		−	1.23205i
$965$	3.31564	−	2.45946i	0.106734	−	0.0791728i
$966$		0			0
$967$		−	53.4014i		−	1.71727i	−0.512584	−	0.858637i	$-0.671312\pi$
$967$		−	53.4014i		−	1.71727i	0.512584	−	0.858637i	$-0.328688\pi$
$968$	−6.93738			−0.222976
$969$	−9.55154	+	4.02173i	−0.306840	+	0.129197i
$970$	−13.1453	−	17.7214i	−0.422071	−	0.569001i
$971$	−47.9153			−1.53768			−0.768838	−	0.639444i	$-0.779165\pi$
$971$	−47.9153			−1.53768			−0.768838	+	0.639444i	$0.779165\pi$
$972$	−18.3810	−	40.9588i	−0.589571	−	1.31375i
$973$		0			0
$974$			73.4642i			2.35394i
$975$	−5.85428	−	56.0004i	−0.187487	−	1.79345i
$976$			20.0294i			0.641125i
$977$	−8.14823			−0.260685			−0.130342	−	0.991469i	$-0.541608\pi$
$977$	−8.14823			−0.260685			−0.130342	+	0.991469i	$0.541608\pi$
$978$	25.4745	+	60.5016i	0.814586	+	1.93463i
$979$		−	51.5889i		−	1.64879i
$980$		0			0
$981$	25.7834	−	26.3914i	0.823201	−	0.842612i
$982$			56.3073i			1.79684i
$983$		−	14.6023i		−	0.465742i	−0.972508	−	0.232871i	$-0.925188\pi$
$983$		−	14.6023i		−	0.465742i	0.972508	−	0.232871i	$-0.0748120\pi$
$984$	−10.8947	+	4.58727i	−0.347310	+	0.146237i
$985$	−10.7898	−	14.5459i	−0.343791	−	0.463471i
$986$	14.6322			0.465986
$987$		0			0
$988$		−	38.1014i		−	1.21217i
$989$			21.1160i			0.671449i
$990$	7.64242	−	56.0435i	0.242892	−	1.78118i
$991$	15.6824			0.498166			0.249083	−	0.968482i	$-0.419871\pi$
$991$	15.6824			0.498166			0.249083	+	0.968482i	$0.419871\pi$
$992$		−	47.4936i		−	1.50792i
$993$	4.64398	−	1.95537i	0.147372	−	0.0620519i
$994$		0			0
$995$	18.1437	−	13.4585i	0.575194	−	0.426664i
$996$	−5.15544	−	12.2441i	−0.163357	−	0.387969i
$997$	27.0422			0.856436			0.428218	−	0.903676i	$-0.359142\pi$
$997$	27.0422			0.856436			0.428218	+	0.903676i	$0.359142\pi$
$998$	−74.3826			−2.35454
$999$	−16.2765	−	6.41102i	−0.514965	−	0.202836i

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	735.2.g.c.734.31	yes	32
3.2	odd	2	inner	735.2.g.c.734.4	yes	32
5.4	even	2	inner	735.2.g.c.734.2	yes	32
7.2	even	3		735.2.p.g.374.2		64
7.3	odd	6		735.2.p.g.509.4		64
7.4	even	3		735.2.p.g.509.1		64
7.5	odd	6		735.2.p.g.374.3		64
7.6	odd	2	inner	735.2.g.c.734.30	yes	32
15.14	odd	2	inner	735.2.g.c.734.29	yes	32
21.2	odd	6		735.2.p.g.374.29		64
21.5	even	6		735.2.p.g.374.32		64
21.11	odd	6		735.2.p.g.509.30		64
21.17	even	6		735.2.p.g.509.31		64
21.20	even	2	inner	735.2.g.c.734.1	✓	32
35.4	even	6		735.2.p.g.509.32		64
35.9	even	6		735.2.p.g.374.31		64
35.19	odd	6		735.2.p.g.374.30		64
35.24	odd	6		735.2.p.g.509.29		64
35.34	odd	2	inner	735.2.g.c.734.3	yes	32
105.44	odd	6		735.2.p.g.374.4		64
105.59	even	6		735.2.p.g.509.2		64
105.74	odd	6		735.2.p.g.509.3		64
105.89	even	6		735.2.p.g.374.1		64
105.104	even	2	inner	735.2.g.c.734.32	yes	32

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
735.2.g.c.734.1	✓	32	21.20	even	2	inner
735.2.g.c.734.2	yes	32	5.4	even	2	inner
735.2.g.c.734.3	yes	32	35.34	odd	2	inner
735.2.g.c.734.4	yes	32	3.2	odd	2	inner
735.2.g.c.734.29	yes	32	15.14	odd	2	inner
735.2.g.c.734.30	yes	32	7.6	odd	2	inner
735.2.g.c.734.31	yes	32	1.1	even	1	trivial
735.2.g.c.734.32	yes	32	105.104	even	2	inner
735.2.p.g.374.1		64	105.89	even	6
735.2.p.g.374.2		64	7.2	even	3
735.2.p.g.374.3		64	7.5	odd	6
735.2.p.g.374.4		64	105.44	odd	6
735.2.p.g.374.29		64	21.2	odd	6
735.2.p.g.374.30		64	35.19	odd	6
735.2.p.g.374.31		64	35.9	even	6
735.2.p.g.374.32		64	21.5	even	6
735.2.p.g.509.1		64	7.4	even	3
735.2.p.g.509.2		64	105.59	even	6
735.2.p.g.509.3		64	105.74	odd	6
735.2.p.g.509.4		64	7.3	odd	6
735.2.p.g.509.29		64	35.24	odd	6
735.2.p.g.509.30		64	21.11	odd	6
735.2.p.g.509.31		64	21.17	even	6
735.2.p.g.509.32		64	35.4	even	6

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:	\( N \)	\(=\)	\( 735 = 3 \cdot 5 \cdot 7^{2} \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	735.g (of order \(2\), degree \(1\), minimal)

\(f(q)\)	\(=\)	\(q+2.20906 q^{2} +(1.59632 - 0.672139i) q^{3} +2.87996 q^{4} +(1.33217 + 1.79592i) q^{5} +(3.52637 - 1.48480i) q^{6} +1.94389 q^{8} +(2.09646 - 2.14589i) q^{9} +(2.94284 + 3.96730i) q^{10} -3.81691i q^{11} +(4.59733 - 1.93573i) q^{12} -6.50161 q^{13} +(3.33367 + 1.97146i) q^{15} -1.46575 q^{16} +2.94050i q^{17} +(4.63121 - 4.74041i) q^{18} +2.03485i q^{19} +(3.83659 + 5.17218i) q^{20} -8.43180i q^{22} +3.00058 q^{23} +(3.10306 - 1.30656i) q^{24} +(-1.45065 + 4.78494i) q^{25} -14.3625 q^{26} +(1.90428 - 4.83464i) q^{27} -2.25259i q^{29} +(7.36429 + 4.35507i) q^{30} +6.66511i q^{31} -7.12571 q^{32} +(-2.56549 - 6.09300i) q^{33} +6.49574i q^{34} +(6.03772 - 6.18009i) q^{36} -3.36664i q^{37} +4.49512i q^{38} +(-10.3786 + 4.36998i) q^{39} +(2.58959 + 3.49107i) q^{40} -3.51094 q^{41} +7.03729i q^{43} -10.9926i q^{44} +(6.64669 + 0.906381i) q^{45} +6.62848 q^{46} -5.01279i q^{47} +(-2.33980 + 0.985185i) q^{48} +(-3.20459 + 10.5702i) q^{50} +(1.97642 + 4.69396i) q^{51} -18.7244 q^{52} +1.93423 q^{53} +(4.20667 - 10.6800i) q^{54} +(6.85487 - 5.08477i) q^{55} +(1.36770 + 3.24827i) q^{57} -4.97612i q^{58} +7.93019 q^{59} +(9.60084 + 5.67772i) q^{60} -13.6650i q^{61} +14.7237i q^{62} -12.8096 q^{64} +(-8.66124 - 11.6764i) q^{65} +(-5.66734 - 13.4598i) q^{66} +10.7863i q^{67} +8.46851i q^{68} +(4.78988 - 2.01681i) q^{69} -10.9926i q^{71} +(4.07528 - 4.17138i) q^{72} -3.30897 q^{73} -7.43712i q^{74} +(0.900436 + 8.61332i) q^{75} +5.86030i q^{76} +(-22.9271 + 9.65357i) q^{78} -5.84977 q^{79} +(-1.95262 - 2.63236i) q^{80} +(-0.209716 - 8.99756i) q^{81} -7.75589 q^{82} -2.66330i q^{83} +(-5.28089 + 3.91724i) q^{85} +15.5458i q^{86} +(-1.51405 - 3.59585i) q^{87} -7.41965i q^{88} +13.5159 q^{89} +(14.6830 + 2.00225i) q^{90} +8.64156 q^{92} +(4.47988 + 10.6396i) q^{93} -11.0736i q^{94} +(-3.65444 + 2.71077i) q^{95} +(-11.3749 + 4.78946i) q^{96} -4.46688 q^{97} +(-8.19069 - 8.00200i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 32 q + 16 q^{4} + 40 q^{9} + 16 q^{15} - 16 q^{16} + 64 q^{25} + 56 q^{30} - 16 q^{36} - 56 q^{39} - 32 q^{46} - 40 q^{51} + 8 q^{60} - 176 q^{64} + 48 q^{79} - 40 q^{81} - 64 q^{85} + 40 q^{99}+O(q^{100}) \) 32 * q + 16 * q^4 + 40 * q^9 + 16 * q^15 - 16 * q^16 + 64 * q^25 + 56 * q^30 - 16 * q^36 - 56 * q^39 - 32 * q^46 - 40 * q^51 + 8 * q^60 - 176 * q^64 + 48 * q^79 - 40 * q^81 - 64 * q^85 + 40 * q^99

Introduction

L-functions

Modular forms

Varieties

Fields

Representations

Groups

Database

Properties

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