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. In general:
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. 


mod
implementation that has to handle all numbers. But this optimization is so wellknown and simple that many compilers implement it, so yeah. @xanatos: Be sure to let the JIT warm up first when benchmarking. – delnan Oct 24 '11 at 13:43