Modular curve 120.16.0-24.c.1.1

• Label: 120.16.0-24.c.1.1
• Level: $120$
• Index: $16$
• Genus: $0$
• Cusps: $2$
• $\Q$-cusps: $2$

Invariants

Level:	$120$		$\SL_2$-level:	$6$
Index:	$16$		$\PSL_2$-index:	$8$
Genus:	$0 = 1 + \frac{ 8 }{12} - \frac{ 0 }{4} - \frac{ 2 }{3} - \frac{ 2 }{2}$
Cusps:	$2$ (all of which are rational)		Cusp widths	$2\cdot6$		Cusp orbits	$1^{2}$
Elliptic points:	$0$ of order $2$ and $2$ of order $3$
$\Q$-gonality:	$1$
$\overline{\Q}$-gonality:	$1$
Rational cusps:	$2$
Rational CM points:	none

Other labels

Cummins and Pauli (CP) label:

6C0

Level structure

$\GL_2(\Z/120\Z)$-generators:	$\begin{bmatrix}54&103\\101&109\end{bmatrix}$, $\begin{bmatrix}62&1\\63&76\end{bmatrix}$, $\begin{bmatrix}72&97\\107&28\end{bmatrix}$, $\begin{bmatrix}115&63\\58&59\end{bmatrix}$
Contains $-I$:	no $\quad$ (see 24.8.0.c.1 for the level structure with $-I$)
Cyclic 120-isogeny field degree:	$72$
Cyclic 120-torsion field degree:	$2304$
Full 120-torsion field degree:	$2211840$

Models

This modular curve is isomorphic to $\mathbb{P}^1$.

Rational points

This modular curve has infinitely many rational points, including 150 stored non-cuspidal points.

Maps to other modular curves

$j$-invariant map of degree 8 to the modular curve $X(1)$ :

$\displaystyle j$

$=$

$\displaystyle \frac{3^3}{2^9}\cdot\frac{x^{8}(x^{2}+8y^{2})^{3}(x^{2}+72y^{2})}{y^{6}x^{10}}$

Modular covers

This modular curve minimally covers the modular curves listed below.

Covered curve	Level	Index	Degree	Genus	Rank
15.8.0-3.a.1.2	$15$	$2$	$2$	$0$	$0$
120.8.0-3.a.1.8	$120$	$2$	$2$	$0$	$?$

This modular curve is minimally covered by the modular curves in the database listed below.

Covering curve	Level	Index	Degree	Genus
120.48.0-24.ca.1.1	$120$	$3$	$3$	$0$
120.48.1-24.cl.1.1	$120$	$3$	$3$	$1$
120.64.1-24.c.1.5	$120$	$4$	$4$	$1$
120.80.2-120.c.1.9	$120$	$5$	$5$	$2$
120.96.3-120.bs.1.31	$120$	$6$	$6$	$3$
120.160.5-120.c.1.32	$120$	$10$	$10$	$5$