I found some example source code where the author seems to use bitwise
& operator instead of
% operator. However when I tried
x & 4 it doesn't produce the same value as
x % 5.
This only works for powers of 2.
is equivalent to:
Note also that this may be true only for
To understand why this works, consider what MOD really is - it's just the remainder after performing integer division. In the case of a division by 2^n, we are effectively just shifting a binary value right by n bits and discarding any low order bits that get shifted out, e.g. for an 8 bit binary number
if we divide by 4 = 2^2 then we shift right by 2 bits:
The remainder (
If we wanted to know the remainder then we could just extract the bits
Note that the has has value 3, which in the general case is just 2^n - 1.
Let's try this with some real numbers. Suppose we want to calculate 42 / 4 and get both the quotient and the remainder:
To get the quotient we shift right by 2 bits:
So 42/4 = 10 remainder 2.
The answer quite simple, try to think in binary.
... and so on.
This have the same result as reminder (% is remainder, formally, not modulus). It works only with powers of 2 and only for zero and positive numbers.