Cremona's table of elliptic curves

Conductor 94178

94178 = 2 · 7² · 31²

Isogeny classes of curves of conductor 94178 [newforms of level 94178]

Class

r

Atkin-Lehner

Eigenvalues

94178a (2 curves)

0

²+ ⁷- ³¹+

²+ -1 3 ⁷- 3 -5 -3 7

94178b (2 curves)

1

²+ ⁷- ³¹-

²+ 0 0 ⁷- 0 4 4 8

94178c (2 curves)

1

²+ ⁷- ³¹-

²+ 0 0 ⁷- 0 -4 -4 -8

94178d (2 curves)

1

²+ ⁷- ³¹-

²+ 0 0 ⁷- 2 -2 2 6

94178e (1 curve)

1

²+ ⁷- ³¹-

²+ 1 -1 ⁷- -4 -2 -2 2

94178f (2 curves)

1

²+ ⁷- ³¹-

²+ 1 3 ⁷- -3 5 3 7

94178g (1 curve)

1

²+ ⁷- ³¹-

²+ -1 -1 ⁷- 4 2 2 2

94178h (6 curves)

1

²+ ⁷- ³¹-

²+ -2 0 ⁷- 0 -4 6 -2

94178i (1 curve)

1

²+ ⁷- ³¹-

²+ 3 3 ⁷- -6 2 2 -2

94178j (1 curve)

1

²+ ⁷- ³¹-

²+ -3 -3 ⁷- -6 -2 -2 2

94178k (2 curves)

0

²- ⁷+ ³¹+

²- 0 0 ⁷+ -2 -2 -7 6

94178l (2 curves)

0

²- ⁷+ ³¹+

²- -2 0 ⁷+ 6 2 -3 2

94178m (2 curves)

1

²- ⁷+ ³¹-

²- 0 0 ⁷+ 2 2 7 6

94178n (1 curve)

1

²- ⁷+ ³¹-

²- -1 4 ⁷+ -4 1 -4 4

94178o (2 curves)

1

²- ⁷+ ³¹-

²- 2 0 ⁷+ -6 -2 3 2

94178p (1 curve)

1

²- ⁷+ ³¹-

²- -3 0 ⁷+ -4 -1 4 0

94178q (2 curves)

1

²- ⁷- ³¹+

²- 0 0 ⁷- -2 2 7 -6

94178r (2 curves)

1

²- ⁷- ³¹+

²- 2 0 ⁷- 6 -2 3 -2

94178s (2 curves)

1

²- ⁷- ³¹+

²- -3 -1 ⁷- -3 -5 -3 -7

94178t (2 curves)

2

²- ⁷- ³¹-

²- 0 0 ⁷- 2 -2 -7 -6

94178u (4 curves)

0

²- ⁷- ³¹-

²- 0 2 ⁷- 0 2 -6 -4

94178v (1 curve)

0

²- ⁷- ³¹-

²- 1 1 ⁷- 2 0 6 -6

94178w (1 curve)

0

²- ⁷- ³¹-

²- 1 -1 ⁷- -2 0 6 6

94178x (3 curves)

2

²- ⁷- ³¹-

²- 1 -3 ⁷- 0 -4 -6 -2

94178y (1 curve)

0

²- ⁷- ³¹-

²- 1 -4 ⁷- -4 -1 4 -4

94178z (1 curve)

2

²- ⁷- ³¹-

²- -1 1 ⁷- -2 0 -6 -6

94178ba (1 curve)

0

²- ⁷- ³¹-

²- -1 -1 ⁷- 2 0 -6 6

94178bb (2 curves)

0

²- ⁷- ³¹-

²- 2 -2 ⁷- 6 4 2 4

94178bc (2 curves)

2

²- ⁷- ³¹-

²- -2 0 ⁷- -6 2 -3 -2

94178bd (2 curves)

0

²- ⁷- ³¹-

²- -2 2 ⁷- 2 -4 -2 8

94178be (1 curve)

0

²- ⁷- ³¹-

²- 3 0 ⁷- -4 1 -4 0

94178bf (2 curves)

0

²- ⁷- ³¹-

²- 3 -1 ⁷- 3 5 3 -7

94178bg (1 curve)

0

²- ⁷- ³¹-

²- -3 3 ⁷- -4 4 2 -6

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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