gmp_libmpz_congruent_ui_p Method |
Return non-zero if n is congruent to c modulo d.
Namespace:
Math.Gmp.Native
Assembly:
Math.Gmp.Native (in Math.Gmp.Native.dll) Version: 1.0.0.0 (1.0.0.0)
Syntax public static int mpz_congruent_ui_p(
mpz_t n,
uint c,
uint d
)
Public Shared Function mpz_congruent_ui_p (
n As mpz_t,
c As UInteger,
d As UInteger
) As Integer
public:
static int mpz_congruent_ui_p(
mpz_t^ n,
unsigned int c,
unsigned int d
)
static member mpz_congruent_ui_p :
n : mpz_t *
c : uint32 *
d : uint32 -> int
Parameters
- n
- Type: Math.Gmp.Nativempz_t
An operand integer. - c
- Type: SystemUInt32
The remainder of the division by d. - d
- Type: SystemUInt32
The divisor operand integer.
Return Value
Type:
Int32Non-zero if
n is congruent to
c modulo
d.
Remarks n is congruent to c mod d if there exists an integer q
satisfying n = c + q * d.
Unlike the other division functions, d = 0 is accepted and following the rule it can be seen
that n and c are considered congruent mod 0 only when exactly equal.
Examples
mpz_t n = new mpz_t();
gmp_lib.mpz_init_set_ui(n, 10000U);
Assert.IsTrue(gmp_lib.mpz_congruent_ui_p(n, 1U, 3U) > 0);
gmp_lib.mpz_clear(n);
Dim n As New mpz_t()
gmp_lib.mpz_init_set_ui(n, 10000UI)
Assert.IsTrue(gmp_lib.mpz_congruent_ui_p(n, 1UI, 3UI) > 0)
gmp_lib.mpz_clear(n)
No code example is currently available or this language may not be supported.
No code example is currently available or this language may not be supported.
See Also