There's a method described by Granlund & Montgomery that requires the modular / multiplicative inverse of the (odd) divisor modulo
2**b. (Some parts of this paper have been improved recently)
(d) = 3, 7 (odd numbers) are an easy case. Assuming 32 bit (unsigned) arithmetic, the inverses modulo
2863311531 (0xAAAAAAAB) and
3067833783 (0xB6DB6DB7) respectively. There's an online calculator here.
We also need the
qmax = (2**32 - 1) / d values:
To test a 32 bit (unsigned) number
(n), perform a single word multiply - that is, discard the high word of the full 64 bit result:
q = dinv * n
(n) is divisible by
(q) must satisfy:
q * d == n and
q <= qmax. e.g.,
int is_divisible_by_3 (uint32_t n)
uint32_t q = n * 0xAAAAAAAB;
return (q <= 0x55555555 && (q * 3 == n))
Which replaces a division / remainder with a couple of single word multiplications.
And similarly for
d = 7. Alternatively, a modern compiler like gcc will perform a similar optimization for a constant divisor / modulus, e.g.,
if (n % 3 == 0) ... - in the assembly generated for MIPS, etc.