Elliptic curves over $\Q$ of conductor 215475

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 84 matches)

 

Curve		Isogeny class
LMFDB label	Cremona label	LMFDB label	Cremona label	Weierstrass coefficients	Rank	Torsion structure
215475.a1	215475g1	215475.a	215475g	$[0, -1, 1, -26758, 1703418]$	$2$	trivial
215475.b1	215475h1	215475.b	215475h	$[0, -1, 1, -272666008, -1757020739082]$	$1$	trivial
215475.c1	215475e1	215475.c	215475e	$[0, -1, 1, -498, 10298]$	$2$	trivial
215475.d1	215475f1	215475.d	215475f	$[0, -1, 1, 8732, -243462]$	$0$	trivial
215475.e1	215475i1	215475.e	215475i	$[0, -1, 1, -18308, 1559768]$	$1$	trivial
215475.f1	215475b1	215475.f	215475b	$[0, 1, 1, -108, 1694]$	$2$	trivial
215475.g1	215475a1	215475.g	215475a	$[0, 1, 1, -2105458, 2781846994]$	$2$	trivial
215475.h1	215475c1	215475.h	215475c	$[0, 1, 1, -18308, -1246696]$	$0$	trivial
215475.i1	215475d1	215475.i	215475d	$[0, 1, 1, -1408, -36656]$	$0$	trivial
215475.j1	215475r1	215475.j	215475r	$[1, 1, 1, -3227988, 11090107296]$	$1$	trivial
215475.k1	215475s2	215475.k	215475s	$[1, 1, 1, -1388, -14344]$	$2$	$[2]$
215475.k2	215475s1	215475.k	215475s	$[1, 1, 1, 237, -1344]$	$2$	$[2]$
215475.l1	215475t1	215475.l	215475t	$[1, 1, 1, -84588, -8639844]$	$2$	$[2]$
215475.l2	215475t2	215475.l	215475t	$[1, 1, 1, 105537, -41721594]$	$2$	$[2]$
215475.m1	215475u2	215475.m	215475u	$[1, 1, 1, -414138, 78690906]$	$1$	$[2]$
215475.m2	215475u1	215475.m	215475u	$[1, 1, 1, -139513, -19075594]$	$1$	$[2]$
215475.n1	215475q1	215475.n	215475q	$[1, 1, 1, -25637388, -48225860844]$	$1$	$[2]$
215475.n2	215475q2	215475.n	215475q	$[1, 1, 1, 11436987, -176132454594]$	$1$	$[2]$
215475.o1	215475v1	215475.o	215475v	$[1, 1, 1, -1648, 27386]$	$2$	trivial
215475.p1	215475w4	215475.p	215475w	$[1, 1, 1, -65935438, -206102914594]$	$1$	$[2]$
215475.p2	215475w2	215475.p	215475w	$[1, 1, 1, -4144813, -3182502094]$	$1$	$[2, 2]$
215475.p3	215475w1	215475.p	215475w	$[1, 1, 1, -574688, 94872656]$	$1$	$[2]$
215475.p4	215475w3	215475.p	215475w	$[1, 1, 1, 523812, -9942671094]$	$1$	$[2]$
215475.q1	215475j1	215475.q	215475j	$[1, 0, 0, -477513, 631016892]$	$2$	trivial
215475.r1	215475n4	215475.r	215475n	$[1, 0, 0, -4419438, -3575980383]$	$1$	$[2]$
215475.r2	215475n2	215475.r	215475n	$[1, 0, 0, -300063, -45676008]$	$1$	$[2, 2]$
215475.r3	215475n1	215475.r	215475n	$[1, 0, 0, -109938, 13452867]$	$1$	$[4]$
215475.r4	215475n3	215475.r	215475n	$[1, 0, 0, 777312, -298859133]$	$1$	$[2]$
215475.s1	215475o1	215475.s	215475o	$[1, 0, 0, 21037, -6180708]$	$0$	trivial
215475.t1	215475p6	215475.t	215475p	$[1, 0, 0, -85235238, -302844873033]$	$0$	$[2]$
215475.t2	215475p4	215475.t	215475p	$[1, 0, 0, -5868613, -3712063408]$	$0$	$[2, 2]$
215475.t3	215475p2	215475.t	215475p	$[1, 0, 0, -2298488, 1296821967]$	$0$	$[2, 2]$
215475.t4	215475p1	215475.t	215475p	$[1, 0, 0, -2277363, 1322615592]$	$0$	$[2]$
215475.t5	215475p3	215475.t	215475p	$[1, 0, 0, 933637, 4654999842]$	$0$	$[2]$
215475.t6	215475p5	215475.t	215475p	$[1, 0, 0, 16376012, -25133637283]$	$0$	$[2]$
215475.u1	215475k1	215475.u	215475k	$[1, 0, 0, -6068, -176073]$	$1$	$[2]$
215475.u2	215475k2	215475.u	215475k	$[1, 0, 0, 2707, -641148]$	$1$	$[2]$
215475.v1	215475l1	215475.v	215475l	$[1, 0, 0, -6962888, 7708927017]$	$1$	trivial
215475.w1	215475m2	215475.w	215475m	$[1, 0, 0, -1808388, -924395733]$	$0$	$[2]$
215475.w2	215475m1	215475.w	215475m	$[1, 0, 0, -12763, -39152608]$	$0$	$[2]$
215475.x1	215475bh2	215475.x	215475bh	$[0, -1, 1, -250683, -48252982]$	$0$	trivial
215475.x2	215475bh1	215475.x	215475bh	$[0, -1, 1, 2817, -278107]$	$0$	trivial
215475.y1	215475bi2	215475.y	215475bi	$[0, -1, 1, -2177283, -1235849782]$	$1$	trivial
215475.y2	215475bi1	215475.y	215475bi	$[0, -1, 1, -22533, -2255407]$	$1$	trivial
215475.z1	215475bg1	215475.z	215475bg	$[0, -1, 1, 2817, 51443]$	$1$	trivial
215475.ba1	215475bj2	215475.ba	215475bj	$[0, -1, 1, -367960883, -2716633813957]$	$1$	trivial
215475.ba2	215475bj1	215475.ba	215475bj	$[0, -1, 1, -3808133, -4970361082]$	$1$	trivial
215475.bb1	215475x1	215475.bb	215475x	$[0, 1, 1, -2521133, -1541783356]$	$1$	trivial
215475.bc1	215475y1	215475.bc	215475y	$[0, 1, 1, 35967, 5524094]$	$1$	trivial
215475.bd1	215475z1	215475.bd	215475z	$[0, 1, 1, 70417, 6571244]$	$0$	trivial