Cremona's table of elliptic curves

6942 = 2 · 3 · 13 · 89

Class	r	Atkin-Lehner	Eigenvalues
6942a (1 curve)	1	2+ 3+ 13- 89-	2+ 3+ -1  3 -3 13- -4  1
Curve Equation t Generators 6942a1 [1,1,0,-58,256] 1 [6:-16:1]
6942b (1 curve)	1	2+ 3+ 13- 89-	2+ 3+  2 -3  6 13-  2 -2
Curve Equation t Generators 6942b1 [1,1,0,-329,-2523] 1 [21:9:1]
6942c (1 curve)	1	2+ 3- 13+ 89-	2+ 3-  0  1  0 13+  4  0
Curve Equation t Generators 6942c1 [1,0,1,-2016,34660] 1 [26:-12:1]
6942d (1 curve)	1	2+ 3- 13+ 89-	2+ 3-  1 -3  3 13+  0 -3
Curve Equation t Generators 6942d1 [1,0,1,-508,5690] 1 [1:71:1]
6942e (1 curve)	1	2+ 3- 13+ 89-	2+ 3-  1 -3 -5 13+  0  7
Curve Equation t Generators 6942e1 [1,0,1,-183,1114] 1 [-1:36:1]
6942f (1 curve)	1	2+ 3- 13+ 89-	2+ 3- -1  1  1 13+ -4 -5
Curve Equation t Generators 6942f1 [1,0,1,-159,-782] 1 [31:140:1]
6942g (1 curve)	1	2+ 3- 13+ 89-	2+ 3-  3 -3  1 13+  0 -1
Curve Equation t Generators 6942g1 [1,0,1,88,758] 1 [9:43:1]
6942h (1 curve)	1	2+ 3- 13+ 89-	2+ 3- -3  1  3 13+  4 -3
Curve Equation t Generators 6942h1 [1,0,1,5,-10] 1 [3:4:1]
6942i (1 curve)	0	2- 3+ 13+ 89+	2- 3+  3  1 -3 13+  0  7
Curve Equation t 6942i1 [1,1,1,-12364,524009] 1
6942j (1 curve)	0	2- 3+ 13+ 89+	2- 3+  3  5  1 13+  4 -1
Curve Equation t 6942j1 [1,1,1,6,3] 1
6942k (1 curve)	1	2- 3+ 13- 89+	2- 3+  0 -3  0 13-  4 -8
Curve Equation t Generators 6942k1 [1,1,1,7,-1] 1 [1:2:1]
6942l (1 curve)	1	2- 3- 13+ 89+	2- 3-  0  1 -4 13+ -4 -4
Curve Equation t Generators 6942l1 [1,0,0,-33,5193] 1 [-6:75:1]
6942m (4 curves)	0	2- 3- 13+ 89-	2- 3- -2  0  4 13+ -6  4
Curve Equation t 6942m1 [1,0,0,51,-111] 2 6942m2 [1,0,0,-269,-1071] 4 6942m3 [1,0,0,-3829,-91495] 2 6942m4 [1,0,0,-1829,29193] 2
6942n (3 curves)	0	2- 3- 13- 89+	2- 3- -3 -1  3 13-  0 -7
Curve Equation t 6942n1 [1,0,0,-210177,37101321] 9 6942n2 [1,0,0,247743,166305609] 3 6942n3 [1,0,0,-2256837,-4804811139] 1

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

Part of Computational Number Theory
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