Cremona's table of elliptic curves

65360 = 2⁴ · 5 · 19 · 43

Class	r	Atkin-Lehner	Eigenvalues
65360a (1 curve)	1	2+ 5+ 19- 43-	2+  0 5+  1 -2  4  5 19-
Curve Equation t Generators 65360a1 [0,0,0,-1523,-22878] 1 [83:650:1]
65360b (1 curve)	2	2+ 5- 19- 43-	2+  0 5- -3 -2  0 -3 19-
Curve Equation t Generators 65360b1 [0,0,0,-99707,13483994] 1 [-1599:-118250:27]&[163:-1250:1]
65360c (1 curve)	0	2+ 5- 19- 43-	2+  2 5-  4  3  1 -7 19-
Curve Equation t 65360c1 [0,-1,0,95,-2403] 1
65360d (2 curves)	0	2- 5+ 19+ 43+	2-  2 5+ -5  6  2 -3 19+
Curve Equation t 65360d1 [0,-1,0,404,3420] 1 65360d2 [0,-1,0,-11636,489836] 1
65360e (1 curve)	1	2- 5+ 19+ 43-	2-  1 5+  1 -2  7  7 19+
Curve Equation t Generators 65360e1 [0,1,0,-34376,2443124] 1 [-76:2150:1]
65360f (1 curve)	1	2- 5+ 19+ 43-	2-  2 5+  0  3  1 -3 19+
Curve Equation t Generators 65360f1 [0,-1,0,-628101,-191389399] 1 [26892820:1510988889:8000]
65360g (1 curve)	1	2- 5- 19+ 43+	2-  0 5-  3  6  0 -7 19+
Curve Equation t Generators 65360g1 [0,0,0,-8147,-389486] 1 [8178:739510:1]
65360h (4 curves)	1	2- 5- 19+ 43+	2-  2 5-  4  0 -4  6 19+
Curve Equation t Generators 65360h1 [0,-1,0,495,85400] 2 [4090:92505:8] 65360h2 [0,-1,0,-26380,1611900] 2 [38599890:841535605:74088] 65360h3 [0,-1,0,-132505,18612300] 2 [434755606530:8422420863885:783777448] 65360h4 [0,-1,0,-2120180,1188955340] 2 [1609367085969969256806162:10448787553186111834850837:1671983821992220621416]
65360i (1 curve)	2	2- 5- 19+ 43-	2- -2 5- -4 -5  1  5 19+
Curve Equation t Generators 65360i1 [0,1,0,203115,-12668225] 1 [75:1730:1]&[155:4750:1]
65360j (1 curve)	1	2- 5- 19- 43-	2-  2 5-  1  4 -6 -1 19-
Curve Equation t Generators 65360j1 [0,-1,0,-360,-5008] 1 [29:90:1]
65360k (2 curves)	1	2- 5- 19- 43-	2- -2 5-  4  0  4 -2 19-
Curve Equation t Generators 65360k1 [0,1,0,-65,250] 2 [10:105:8] 65360k2 [0,1,0,-1140,14440] 2 [4398:1981:216]

Data from Elliptic Curve Data by J. E. Cremona.
Design inspired by The Modular Forms Explorer by William Stein.

Part of Computational Number Theory
Back to Tables and computations