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;
```

`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 << n) + ~0`

translates into`2^n - 1`

. Or, what is the same,`1`

s in the`n-1`

least significative positions. – SJuan76 Sep 24 '13 at 14:51`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