int mystery(int x, int n)
{
   return (x + (x>>31 & ((1 << n) + ~0))) >> n;
}

I have been trying to figure out how this code works. This is what I have so far:

  • shifts n left over one,
  • adds that result to 1^32 (why?)
  • ands this result to x shifted over to 31 (wouldn't this just clear the value of x>>31?)
  • and right before it shifts by n, adds x (again, I don't understand why)
  • 2
    It might be interesting to see what the type of the x and n variables is. – SirDarius Sep 24 '13 at 14:48
  • 1
    if x is an int32, then x>>31 returns 1 if the number is negative and 0 if it is 0 or positive. – SJuan76 Sep 24 '13 at 14:48
  • 1
    It might also be interesting to know what the return type of the function is. In any case, this coding style should be forbidden in any professional project. – Daniel Daranas Sep 24 '13 at 14:50
  • 1
    Also, (1 << n) + ~0 translates into 2^n - 1. Or, what is the same, 1s in the n-1 least significative positions. – SJuan76 Sep 24 '13 at 14:51
  • 3
    @SJuan76: You make a wrong assumption. If x is signed then x >> 31 will be 0 if x >= 0, -1 if x < 0. Most implementations implement right shift as arithmetic when x is signed and logical when x is unsigned – phuclv Sep 24 '13 at 15:03

It divides by 2^n with correct rounding (round towards zero) so that the expression is equivalent to:

y = x / (1 << n);

If you take a naïve approach to division by 2^n, i.e.

y = x >> n;

you get incorrect rounding for x < 0.

This part of the expression: (x>>31 & ((1 << n) + ~0)) is equal to zero for x >= 0, but for x < 0 it adjusts the result appropriately by adding 2^n - 1.

Note that strictly speaking the expression relies on implementation-specific behaviour, as it assumes that right shifting a signed integer preserves the sign bit. While this is true for most compilers and platforms, it can not be guaranteed, so the expression is not 100% safe or portable.

Note also that the expression has a hard-coded assumption that int is 32 bits, which also makes it non-portable. A more portable version which works with any size of int would be:

   return (x + (x >> (sizeof(int) * CHAR_BIT - 1) & ((1 << n) + ~0))) >> n;
  • 1
    I tried it and I got 0..Never thought of x<0..Nice ans...+1 – Anirudha Sep 24 '13 at 14:57
  • OP says the return type and type of variables is int. Does this work the same in environments where int is 64 bits ? – SirDarius Sep 24 '13 at 15:00
  • No - it's assuming 32 bit ints (i.e. int32_t). It wouldn't be hard to make it more general however - I've updated the answer with a more portable version. – Paul R Sep 24 '13 at 15:01

Your Answer

By clicking "Post Your Answer", you acknowledge that you have read our updated terms of service, privacy policy and cookie policy, and that your continued use of the website is subject to these policies.

Not the answer you're looking for? Browse other questions tagged or ask your own question.