Orbit label |
Conrey labels |
Modulus |
Conductor |
Order |
Parity |
Real |
Primitive |
Minimal |
1805.a |
\(\chi_{1805}(1, \cdot)\)
|
$1805$ |
$1$ |
$1$ |
even |
✓ |
|
✓ |
1805.b |
\(\chi_{1805}(1084, \cdot)\)
|
$1805$ |
$5$ |
$2$ |
even |
✓ |
|
✓ |
1805.c |
\(\chi_{1805}(721, \cdot)\)
|
$1805$ |
$19$ |
$2$ |
odd |
✓ |
|
✓ |
1805.d |
\(\chi_{1805}(1804, \cdot)\)
|
$1805$ |
$95$ |
$2$ |
odd |
✓ |
|
✓ |
1805.e |
\(\chi_{1805}(1151, \cdot)\)$,$ \(\chi_{1805}(1736, \cdot)\)
|
$1805$ |
$19$ |
$3$ |
even |
|
|
|
1805.f |
\(\chi_{1805}(362, \cdot)\)$,$ \(\chi_{1805}(723, \cdot)\)
|
$1805$ |
$5$ |
$4$ |
odd |
|
|
✓ |
1805.g |
\(\chi_{1805}(1082, \cdot)\)$,$ \(\chi_{1805}(1443, \cdot)\)
|
$1805$ |
$95$ |
$4$ |
even |
|
|
✓ |
1805.h |
\(\chi_{1805}(69, \cdot)\)$,$ \(\chi_{1805}(654, \cdot)\)
|
$1805$ |
$95$ |
$6$ |
odd |
|
|
|
1805.i |
\(\chi_{1805}(429, \cdot)\)$,$ \(\chi_{1805}(1014, \cdot)\)
|
$1805$ |
$95$ |
$6$ |
even |
|
|
|
1805.j |
\(\chi_{1805}(791, \cdot)\)$,$ \(\chi_{1805}(1376, \cdot)\)
|
$1805$ |
$19$ |
$6$ |
odd |
|
|
|
1805.k |
\(\chi_{1805}(606, \cdot)\)$, \cdots ,$\(\chi_{1805}(1506, \cdot)\)
|
$1805$ |
$19$ |
$9$ |
even |
|
|
|
1805.l |
\(\chi_{1805}(293, \cdot)\)$, \cdots ,$\(\chi_{1805}(1737, \cdot)\)
|
$1805$ |
$95$ |
$12$ |
even |
|
|
|
1805.m |
\(\chi_{1805}(68, \cdot)\)$, \cdots ,$\(\chi_{1805}(1512, \cdot)\)
|
$1805$ |
$95$ |
$12$ |
odd |
|
|
|
1805.n |
\(\chi_{1805}(116, \cdot)\)$, \cdots ,$\(\chi_{1805}(1751, \cdot)\)
|
$1805$ |
$19$ |
$18$ |
odd |
|
|
|
1805.o |
\(\chi_{1805}(299, \cdot)\)$, \cdots ,$\(\chi_{1805}(1199, \cdot)\)
|
$1805$ |
$95$ |
$18$ |
odd |
|
|
|
1805.p |
\(\chi_{1805}(54, \cdot)\)$, \cdots ,$\(\chi_{1805}(1689, \cdot)\)
|
$1805$ |
$95$ |
$18$ |
even |
|
|
|
1805.q |
\(\chi_{1805}(96, \cdot)\)$, \cdots ,$\(\chi_{1805}(1711, \cdot)\)
|
$1805$ |
$361$ |
$19$ |
even |
|
|
✓ |
1805.r |
\(\chi_{1805}(28, \cdot)\)$, \cdots ,$\(\chi_{1805}(1678, \cdot)\)
|
$1805$ |
$95$ |
$36$ |
odd |
|
|
|
1805.s |
\(\chi_{1805}(127, \cdot)\)$, \cdots ,$\(\chi_{1805}(1777, \cdot)\)
|
$1805$ |
$95$ |
$36$ |
even |
|
|
|
1805.t |
\(\chi_{1805}(94, \cdot)\)$, \cdots ,$\(\chi_{1805}(1709, \cdot)\)
|
$1805$ |
$1805$ |
$38$ |
odd |
|
✓ |
✓ |
1805.u |
\(\chi_{1805}(56, \cdot)\)$, \cdots ,$\(\chi_{1805}(1766, \cdot)\)
|
$1805$ |
$361$ |
$38$ |
odd |
|
|
✓ |
1805.v |
\(\chi_{1805}(39, \cdot)\)$, \cdots ,$\(\chi_{1805}(1749, \cdot)\)
|
$1805$ |
$1805$ |
$38$ |
even |
|
✓ |
✓ |
1805.w |
\(\chi_{1805}(11, \cdot)\)$, \cdots ,$\(\chi_{1805}(1721, \cdot)\)
|
$1805$ |
$361$ |
$57$ |
even |
|
|
✓ |
1805.x |
\(\chi_{1805}(18, \cdot)\)$, \cdots ,$\(\chi_{1805}(1747, \cdot)\)
|
$1805$ |
$1805$ |
$76$ |
even |
|
✓ |
✓ |
1805.y |
\(\chi_{1805}(58, \cdot)\)$, \cdots ,$\(\chi_{1805}(1787, \cdot)\)
|
$1805$ |
$1805$ |
$76$ |
odd |
|
✓ |
✓ |
1805.z |
\(\chi_{1805}(31, \cdot)\)$, \cdots ,$\(\chi_{1805}(1756, \cdot)\)
|
$1805$ |
$361$ |
$114$ |
odd |
|
|
✓ |
1805.ba |
\(\chi_{1805}(49, \cdot)\)$, \cdots ,$\(\chi_{1805}(1774, \cdot)\)
|
$1805$ |
$1805$ |
$114$ |
even |
|
✓ |
✓ |
1805.bb |
\(\chi_{1805}(84, \cdot)\)$, \cdots ,$\(\chi_{1805}(1794, \cdot)\)
|
$1805$ |
$1805$ |
$114$ |
odd |
|
✓ |
✓ |
1805.bc |
\(\chi_{1805}(6, \cdot)\)$, \cdots ,$\(\chi_{1805}(1791, \cdot)\)
|
$1805$ |
$361$ |
$171$ |
even |
|
|
✓ |
1805.bd |
\(\chi_{1805}(7, \cdot)\)$, \cdots ,$\(\chi_{1805}(1797, \cdot)\)
|
$1805$ |
$1805$ |
$228$ |
odd |
|
✓ |
✓ |
1805.be |
\(\chi_{1805}(8, \cdot)\)$, \cdots ,$\(\chi_{1805}(1798, \cdot)\)
|
$1805$ |
$1805$ |
$228$ |
even |
|
✓ |
✓ |
1805.bf |
\(\chi_{1805}(4, \cdot)\)$, \cdots ,$\(\chi_{1805}(1784, \cdot)\)
|
$1805$ |
$1805$ |
$342$ |
even |
|
✓ |
✓ |
1805.bg |
\(\chi_{1805}(14, \cdot)\)$, \cdots ,$\(\chi_{1805}(1799, \cdot)\)
|
$1805$ |
$1805$ |
$342$ |
odd |
|
✓ |
✓ |
1805.bh |
\(\chi_{1805}(21, \cdot)\)$, \cdots ,$\(\chi_{1805}(1801, \cdot)\)
|
$1805$ |
$361$ |
$342$ |
odd |
|
|
✓ |
1805.bi |
\(\chi_{1805}(2, \cdot)\)$, \cdots ,$\(\chi_{1805}(1788, \cdot)\)
|
$1805$ |
$1805$ |
$684$ |
even |
|
✓ |
✓ |
1805.bj |
\(\chi_{1805}(17, \cdot)\)$, \cdots ,$\(\chi_{1805}(1803, \cdot)\)
|
$1805$ |
$1805$ |
$684$ |
odd |
|
✓ |
✓ |