Elliptic curves over $\Q$ of conductor 286110

Conductor	j-invariant	Rank	Torsion order	Torsion structure
Analytic order of Ш	$p$ div |Ш|	Maximal primes	Nonmax $p$	Bad $p$
Number of integral points	Regulator	CM	CM discriminant	Semistable
Curves per isogeny class	Cyclic isogeny degree	Isogeny class size	Isogeny class degree	Potential good reduction

Results (1-50 of 341 matches)

 

Curve		Isogeny class
LMFDB label	Cremona label	LMFDB label	Cremona label	Weierstrass coefficients	Rank	Torsion structure
286110.a1	286110a1	286110.a	286110a	$[1, -1, 0, -730935, -287460059]$	$1$	trivial
286110.a2	286110a2	286110.a	286110a	$[1, -1, 0, 5277375, 2004109375]$	$1$	trivial
286110.b1	286110b1	286110.b	286110b	$[1, -1, 0, 130056015, 4023845123741]$	$1$	trivial
286110.c1	286110c2	286110.c	286110c	$[1, -1, 0, -444825, 112806675]$	$2$	$[2]$
286110.c2	286110c1	286110.c	286110c	$[1, -1, 0, -2655, 4828761]$	$2$	$[2]$
286110.d1	286110d2	286110.d	286110d	$[1, -1, 0, -1526535, -701080259]$	$0$	$[2]$
286110.d2	286110d1	286110.d	286110d	$[1, -1, 0, 40185, -39611075]$	$0$	$[2]$
286110.e1	286110e3	286110.e	286110e	$[1, -1, 0, -4767388560, 126690560092800]$	$0$	$[2]$
286110.e2	286110e2	286110.e	286110e	$[1, -1, 0, -317805840, 1700891571456]$	$0$	$[2, 2]$
286110.e3	286110e1	286110.e	286110e	$[1, -1, 0, -104731920, -389747116800]$	$0$	$[2]$
286110.e4	286110e4	286110.e	286110e	$[1, -1, 0, 722594160, 10509542211456]$	$0$	$[2]$
286110.f1	286110f2	286110.f	286110f	$[1, -1, 0, -3648390, 2683036556]$	$1$	$[2]$
286110.f2	286110f1	286110.f	286110f	$[1, -1, 0, -215070, 46933460]$	$1$	$[2]$
286110.g1	286110g3	286110.g	286110g	$[1, -1, 0, -279272025, -639541810589]$	$0$	$[2]$
286110.g2	286110g2	286110.g	286110g	$[1, -1, 0, -225769455, -1304568055175]$	$0$	$[2, 2]$
286110.g3	286110g1	286110.g	286110g	$[1, -1, 0, -225717435, -1305199796459]$	$0$	$[2]$
286110.g4	286110g4	286110.g	286110g	$[1, -1, 0, -173099205, -1929163481825]$	$0$	$[2]$
286110.h1	286110h1	286110.h	286110h	$[1, -1, 0, -794430, -2373532524]$	$0$	trivial
286110.i1	286110i1	286110.i	286110i	$[1, -1, 0, 47070, -4254764]$	$1$	trivial
286110.j1	286110j1	286110.j	286110j	$[1, -1, 0, 60075, 6747381]$	$0$	trivial
286110.k1	286110k1	286110.k	286110k	$[1, -1, 0, -8534445, -9673135579]$	$1$	trivial
286110.l1	286110l1	286110.l	286110l	$[1, -1, 0, -349965, -108546075]$	$0$	trivial
286110.m1	286110m1	286110.m	286110m	$[1, -1, 0, -615, 6031]$	$2$	trivial
286110.m2	286110m2	286110.m	286110m	$[1, -1, 0, 660, 25496]$	$2$	trivial
286110.n1	286110n1	286110.n	286110n	$[1, -1, 0, -71474364225, -7357279917403715]$	$1$	trivial
286110.o1	286110o1	286110.o	286110o	$[1, -1, 0, -86040, 9735556]$	$1$	trivial
286110.p1	286110p2	286110.p	286110p	$[1, -1, 0, -2165812515, 38795867119125]$	$1$	$[2]$
286110.p2	286110p1	286110.p	286110p	$[1, -1, 0, -135343395, 606397816341]$	$1$	$[2]$
286110.q1	286110q2	286110.q	286110q	$[1, -1, 0, -36936855, -86040178749]$	$1$	$[2]$
286110.q2	286110q1	286110.q	286110q	$[1, -1, 0, -1121085, -2725534575]$	$1$	$[2]$
286110.r1	286110r1	286110.r	286110r	$[1, -1, 0, -209604240, 2566765481800]$	$1$	trivial
286110.s1	286110s1	286110.s	286110s	$[1, -1, 0, -310440, -21974544]$	$1$	$[2]$
286110.s2	286110s2	286110.s	286110s	$[1, -1, 0, 1163460, -171428004]$	$1$	$[2]$
286110.t1	286110t3	286110.t	286110t	$[1, -1, 0, -51944625, 140322558325]$	$1$	$[2]$
286110.t2	286110t2	286110.t	286110t	$[1, -1, 0, -7727625, -5177901875]$	$1$	$[2, 2]$
286110.t3	286110t1	286110.t	286110t	$[1, -1, 0, -6895305, -6965891699]$	$1$	$[2]$
286110.t4	286110t4	286110.t	286110t	$[1, -1, 0, 23172255, -36257001179]$	$1$	$[2]$
286110.u1	286110u1	286110.u	286110u	$[1, -1, 0, -605220, -221645800]$	$1$	trivial
286110.v1	286110v2	286110.v	286110v	$[1, -1, 0, -25500105, -49557022749]$	$1$	$[2]$
286110.v2	286110v1	286110.v	286110v	$[1, -1, 0, -1593855, -773928999]$	$1$	$[2]$
286110.w1	286110w2	286110.w	286110w	$[1, -1, 0, -787741515, -8460957084219]$	$1$	$[2]$
286110.w2	286110w1	286110.w	286110w	$[1, -1, 0, -80269515, 54600390981]$	$1$	$[2]$
286110.x1	286110x2	286110.x	286110x	$[1, -1, 0, -30600728640, 2060380247097856]$	$0$	trivial
286110.x2	286110x1	286110.x	286110x	$[1, -1, 0, -377524800, 2830509690880]$	$0$	trivial
286110.y1	286110y1	286110.y	286110y	$[1, -1, 0, -318360868065, -69208434591226115]$	$0$	trivial
286110.z1	286110z1	286110.z	286110z	$[1, -1, 0, -223740, -1758766284]$	$0$	trivial
286110.ba1	286110ba1	286110.ba	286110ba	$[1, -1, 0, -172683045, 873553706325]$	$0$	trivial
286110.bb1	286110bb1	286110.bb	286110bb	$[1, -1, 0, -2655, -143195]$	$0$	trivial
286110.bb2	286110bb2	286110.bb	286110bb	$[1, -1, 0, 23355, 3409771]$	$0$	trivial
286110.bc1	286110bc1	286110.bc	286110bc	$[1, -1, 0, -14017702005, -1230459041673675]$	$0$	trivial