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Orbit label Conrey labels Modulus Conductor Order Parity Primitive
592.a

\(\chi_{592}(1, \cdot)\)

$592$ $1$ $1$ even
592.b

\(\chi_{592}(591, \cdot)\)

$592$ $148$ $2$ odd
592.c

\(\chi_{592}(297, \cdot)\)

$592$ $8$ $2$ even
592.d

\(\chi_{592}(223, \cdot)\)

$592$ $4$ $2$ odd
592.e

\(\chi_{592}(73, \cdot)\)

$592$ $296$ $2$ even
592.f

\(\chi_{592}(519, \cdot)\)

$592$ $8$ $2$ odd
592.g

\(\chi_{592}(369, \cdot)\)

$592$ $37$ $2$ even
592.h

\(\chi_{592}(295, \cdot)\)

$592$ $296$ $2$ odd
592.i

\(\chi_{592}(417, \cdot)\)$,$ \(\chi_{592}(433, \cdot)\)

$592$ $37$ $3$ even
592.j

\(\chi_{592}(327, \cdot)\)$,$ \(\chi_{592}(487, \cdot)\)

$592$ $296$ $4$ even
592.k

\(\chi_{592}(401, \cdot)\)$,$ \(\chi_{592}(561, \cdot)\)

$592$ $37$ $4$ odd
592.l

\(\chi_{592}(117, \cdot)\)$,$ \(\chi_{592}(253, \cdot)\)

$592$ $592$ $4$ odd
592.m

\(\chi_{592}(43, \cdot)\)$,$ \(\chi_{592}(179, \cdot)\)

$592$ $592$ $4$ even
592.n

\(\chi_{592}(221, \cdot)\)$,$ \(\chi_{592}(517, \cdot)\)

$592$ $592$ $4$ even
592.o

\(\chi_{592}(149, \cdot)\)$,$ \(\chi_{592}(445, \cdot)\)

$592$ $16$ $4$ even
592.p

\(\chi_{592}(75, \cdot)\)$,$ \(\chi_{592}(371, \cdot)\)

$592$ $16$ $4$ odd
592.q

\(\chi_{592}(147, \cdot)\)$,$ \(\chi_{592}(443, \cdot)\)

$592$ $592$ $4$ odd
592.r

\(\chi_{592}(413, \cdot)\)$,$ \(\chi_{592}(549, \cdot)\)

$592$ $592$ $4$ odd
592.s

\(\chi_{592}(339, \cdot)\)$,$ \(\chi_{592}(475, \cdot)\)

$592$ $592$ $4$ even
592.t

\(\chi_{592}(31, \cdot)\)$,$ \(\chi_{592}(191, \cdot)\)

$592$ $148$ $4$ even
592.u

\(\chi_{592}(105, \cdot)\)$,$ \(\chi_{592}(265, \cdot)\)

$592$ $296$ $4$ odd
592.v

\(\chi_{592}(455, \cdot)\)$,$ \(\chi_{592}(471, \cdot)\)

$592$ $296$ $6$ odd
592.w

\(\chi_{592}(529, \cdot)\)$,$ \(\chi_{592}(545, \cdot)\)

$592$ $37$ $6$ even
592.x

\(\chi_{592}(343, \cdot)\)$,$ \(\chi_{592}(359, \cdot)\)

$592$ $296$ $6$ odd
592.y

\(\chi_{592}(233, \cdot)\)$,$ \(\chi_{592}(249, \cdot)\)

$592$ $296$ $6$ even
592.z

\(\chi_{592}(47, \cdot)\)$,$ \(\chi_{592}(63, \cdot)\)

$592$ $148$ $6$ odd
592.ba

\(\chi_{592}(121, \cdot)\)$,$ \(\chi_{592}(137, \cdot)\)

$592$ $296$ $6$ even
592.bb

\(\chi_{592}(159, \cdot)\)$,$ \(\chi_{592}(175, \cdot)\)

$592$ $148$ $6$ odd
592.bc

\(\chi_{592}(33, \cdot)\)$, \cdots ,$\(\chi_{592}(497, \cdot)\)

$592$ $37$ $9$ even
592.bd

\(\chi_{592}(393, \cdot)\)$, \cdots ,$\(\chi_{592}(569, \cdot)\)

$592$ $296$ $12$ odd
592.be

\(\chi_{592}(319, \cdot)\)$, \cdots ,$\(\chi_{592}(495, \cdot)\)

$592$ $148$ $12$ even
592.bf

\(\chi_{592}(251, \cdot)\)$, \cdots ,$\(\chi_{592}(563, \cdot)\)

$592$ $592$ $12$ even
592.bg

\(\chi_{592}(45, \cdot)\)$, \cdots ,$\(\chi_{592}(541, \cdot)\)

$592$ $592$ $12$ odd
592.bh

\(\chi_{592}(11, \cdot)\)$, \cdots ,$\(\chi_{592}(323, \cdot)\)

$592$ $592$ $12$ odd
592.bi

\(\chi_{592}(195, \cdot)\)$, \cdots ,$\(\chi_{592}(507, \cdot)\)

$592$ $592$ $12$ odd
592.bj

\(\chi_{592}(269, \cdot)\)$, \cdots ,$\(\chi_{592}(581, \cdot)\)

$592$ $592$ $12$ even
592.bk

\(\chi_{592}(85, \cdot)\)$, \cdots ,$\(\chi_{592}(397, \cdot)\)

$592$ $592$ $12$ even
592.bl

\(\chi_{592}(51, \cdot)\)$, \cdots ,$\(\chi_{592}(547, \cdot)\)

$592$ $592$ $12$ even
592.bm

\(\chi_{592}(29, \cdot)\)$, \cdots ,$\(\chi_{592}(341, \cdot)\)

$592$ $592$ $12$ odd
592.bn

\(\chi_{592}(97, \cdot)\)$, \cdots ,$\(\chi_{592}(273, \cdot)\)

$592$ $37$ $12$ odd
592.bo

\(\chi_{592}(23, \cdot)\)$, \cdots ,$\(\chi_{592}(199, \cdot)\)

$592$ $296$ $12$ even
592.bp

\(\chi_{592}(151, \cdot)\)$, \cdots ,$\(\chi_{592}(583, \cdot)\)

$592$ $296$ $18$ odd
592.bq

\(\chi_{592}(65, \cdot)\)$, \cdots ,$\(\chi_{592}(465, \cdot)\)

$592$ $37$ $18$ even
592.br

\(\chi_{592}(7, \cdot)\)$, \cdots ,$\(\chi_{592}(567, \cdot)\)

$592$ $296$ $18$ odd
592.bs

\(\chi_{592}(9, \cdot)\)$, \cdots ,$\(\chi_{592}(441, \cdot)\)

$592$ $296$ $18$ even
592.bt

\(\chi_{592}(95, \cdot)\)$, \cdots ,$\(\chi_{592}(559, \cdot)\)

$592$ $148$ $18$ odd
592.bu

\(\chi_{592}(127, \cdot)\)$, \cdots ,$\(\chi_{592}(527, \cdot)\)

$592$ $148$ $18$ odd
592.bv

\(\chi_{592}(25, \cdot)\)$, \cdots ,$\(\chi_{592}(585, \cdot)\)

$592$ $296$ $18$ even
592.bw

\(\chi_{592}(57, \cdot)\)$, \cdots ,$\(\chi_{592}(553, \cdot)\)

$592$ $296$ $36$ odd
592.bx

\(\chi_{592}(15, \cdot)\)$, \cdots ,$\(\chi_{592}(575, \cdot)\)

$592$ $148$ $36$ even
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