Orbit label |
Conrey labels |
Modulus |
Conductor |
Order |
Parity |
Real |
Primitive |
Minimal |
260.a |
\(\chi_{260}(1, \cdot)\)
|
$260$ |
$1$ |
$1$ |
even |
✓ |
|
✓ |
260.b |
\(\chi_{260}(131, \cdot)\)
|
$260$ |
$4$ |
$2$ |
odd |
✓ |
|
✓ |
260.c |
\(\chi_{260}(209, \cdot)\)
|
$260$ |
$5$ |
$2$ |
even |
✓ |
|
✓ |
260.d |
\(\chi_{260}(129, \cdot)\)
|
$260$ |
$65$ |
$2$ |
even |
✓ |
|
✓ |
260.e |
\(\chi_{260}(51, \cdot)\)
|
$260$ |
$52$ |
$2$ |
odd |
✓ |
|
✓ |
260.f |
\(\chi_{260}(181, \cdot)\)
|
$260$ |
$13$ |
$2$ |
even |
✓ |
|
✓ |
260.g |
\(\chi_{260}(259, \cdot)\)
|
$260$ |
$260$ |
$2$ |
odd |
✓ |
✓ |
✓ |
260.h |
\(\chi_{260}(79, \cdot)\)
|
$260$ |
$20$ |
$2$ |
odd |
✓ |
|
✓ |
260.i |
\(\chi_{260}(61, \cdot)\)$,$ \(\chi_{260}(81, \cdot)\)
|
$260$ |
$13$ |
$3$ |
even |
|
|
✓ |
260.j |
\(\chi_{260}(31, \cdot)\)$,$ \(\chi_{260}(151, \cdot)\)
|
$260$ |
$52$ |
$4$ |
even |
|
|
✓ |
260.k |
\(\chi_{260}(109, \cdot)\)$,$ \(\chi_{260}(229, \cdot)\)
|
$260$ |
$65$ |
$4$ |
odd |
|
|
✓ |
260.l |
\(\chi_{260}(47, \cdot)\)$,$ \(\chi_{260}(83, \cdot)\)
|
$260$ |
$260$ |
$4$ |
odd |
|
✓ |
✓ |
260.m |
\(\chi_{260}(57, \cdot)\)$,$ \(\chi_{260}(73, \cdot)\)
|
$260$ |
$65$ |
$4$ |
even |
|
|
✓ |
260.n |
\(\chi_{260}(77, \cdot)\)$,$ \(\chi_{260}(233, \cdot)\)
|
$260$ |
$65$ |
$4$ |
odd |
|
|
✓ |
260.o |
\(\chi_{260}(27, \cdot)\)$,$ \(\chi_{260}(183, \cdot)\)
|
$260$ |
$20$ |
$4$ |
even |
|
|
✓ |
260.p |
\(\chi_{260}(103, \cdot)\)$,$ \(\chi_{260}(207, \cdot)\)
|
$260$ |
$260$ |
$4$ |
even |
|
✓ |
✓ |
260.q |
\(\chi_{260}(53, \cdot)\)$,$ \(\chi_{260}(157, \cdot)\)
|
$260$ |
$5$ |
$4$ |
odd |
|
|
✓ |
260.r |
\(\chi_{260}(177, \cdot)\)$,$ \(\chi_{260}(213, \cdot)\)
|
$260$ |
$65$ |
$4$ |
even |
|
|
✓ |
260.s |
\(\chi_{260}(187, \cdot)\)$,$ \(\chi_{260}(203, \cdot)\)
|
$260$ |
$260$ |
$4$ |
odd |
|
✓ |
✓ |
260.t |
\(\chi_{260}(21, \cdot)\)$,$ \(\chi_{260}(161, \cdot)\)
|
$260$ |
$13$ |
$4$ |
odd |
|
|
✓ |
260.u |
\(\chi_{260}(99, \cdot)\)$,$ \(\chi_{260}(239, \cdot)\)
|
$260$ |
$260$ |
$4$ |
even |
|
✓ |
✓ |
260.v |
\(\chi_{260}(139, \cdot)\)$,$ \(\chi_{260}(159, \cdot)\)
|
$260$ |
$260$ |
$6$ |
odd |
|
✓ |
✓ |
260.w |
\(\chi_{260}(179, \cdot)\)$,$ \(\chi_{260}(199, \cdot)\)
|
$260$ |
$260$ |
$6$ |
odd |
|
✓ |
✓ |
260.x |
\(\chi_{260}(101, \cdot)\)$,$ \(\chi_{260}(121, \cdot)\)
|
$260$ |
$13$ |
$6$ |
even |
|
|
✓ |
260.y |
\(\chi_{260}(231, \cdot)\)$,$ \(\chi_{260}(251, \cdot)\)
|
$260$ |
$52$ |
$6$ |
odd |
|
|
✓ |
260.z |
\(\chi_{260}(49, \cdot)\)$,$ \(\chi_{260}(69, \cdot)\)
|
$260$ |
$65$ |
$6$ |
even |
|
|
✓ |
260.ba |
\(\chi_{260}(9, \cdot)\)$,$ \(\chi_{260}(29, \cdot)\)
|
$260$ |
$65$ |
$6$ |
even |
|
|
✓ |
260.bb |
\(\chi_{260}(191, \cdot)\)$,$ \(\chi_{260}(211, \cdot)\)
|
$260$ |
$52$ |
$6$ |
odd |
|
|
✓ |
260.bc |
\(\chi_{260}(19, \cdot)\)$, \cdots ,$\(\chi_{260}(219, \cdot)\)
|
$260$ |
$260$ |
$12$ |
even |
|
✓ |
✓ |
260.bd |
\(\chi_{260}(41, \cdot)\)$, \cdots ,$\(\chi_{260}(241, \cdot)\)
|
$260$ |
$13$ |
$12$ |
odd |
|
|
✓ |
260.be |
\(\chi_{260}(63, \cdot)\)$, \cdots ,$\(\chi_{260}(227, \cdot)\)
|
$260$ |
$260$ |
$12$ |
odd |
|
✓ |
✓ |
260.bf |
\(\chi_{260}(37, \cdot)\)$, \cdots ,$\(\chi_{260}(253, \cdot)\)
|
$260$ |
$65$ |
$12$ |
even |
|
|
✓ |
260.bg |
\(\chi_{260}(23, \cdot)\)$, \cdots ,$\(\chi_{260}(147, \cdot)\)
|
$260$ |
$260$ |
$12$ |
even |
|
✓ |
✓ |
260.bh |
\(\chi_{260}(113, \cdot)\)$, \cdots ,$\(\chi_{260}(237, \cdot)\)
|
$260$ |
$65$ |
$12$ |
odd |
|
|
✓ |
260.bi |
\(\chi_{260}(17, \cdot)\)$, \cdots ,$\(\chi_{260}(257, \cdot)\)
|
$260$ |
$65$ |
$12$ |
odd |
|
|
✓ |
260.bj |
\(\chi_{260}(3, \cdot)\)$, \cdots ,$\(\chi_{260}(243, \cdot)\)
|
$260$ |
$260$ |
$12$ |
even |
|
✓ |
✓ |
260.bk |
\(\chi_{260}(33, \cdot)\)$, \cdots ,$\(\chi_{260}(197, \cdot)\)
|
$260$ |
$65$ |
$12$ |
even |
|
|
✓ |
260.bl |
\(\chi_{260}(7, \cdot)\)$, \cdots ,$\(\chi_{260}(223, \cdot)\)
|
$260$ |
$260$ |
$12$ |
odd |
|
✓ |
✓ |
260.bm |
\(\chi_{260}(89, \cdot)\)$, \cdots ,$\(\chi_{260}(249, \cdot)\)
|
$260$ |
$65$ |
$12$ |
odd |
|
|
✓ |
260.bn |
\(\chi_{260}(11, \cdot)\)$, \cdots ,$\(\chi_{260}(171, \cdot)\)
|
$260$ |
$52$ |
$12$ |
even |
|
|
✓ |