parent, value, [construct=False]) |
copy,
crt,
is_square,
is_unit,
lift,
modulus,
order,
rational_reconstruction,
sqrt
Further documentation:
other) |
Use the Chinese Remainder Theorem to find an element of the integers modulo the product of the moduli that reduces to self and to other. The modulus of other must be coprime to the modulus of self.
) |
Returns the order of self.
) |
sage: R = IntegerModRing(97) sage: a = R(2) / R(3) sage: a 33 sage: a.rational_reconstruction() 2/3
Instances of class IntegerMod also have the following special methods:
__cmp__,
__float__,
__int__,
__invert__,
__long__,
__mod__,
__neg__,
__pow__,
__repr__,
_add,
_cmp,
_div,
_integer_,
_mul,
_pari_,
_rational_,
_sub
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