# How to calculated the absolute value via of bit operations

In the book "hacker's delight" is an example of where the absolute value of the number so (х XOR у) - у, where y = x >> 31.

I know that this expression `y = x >> 31` gets the sign of x, I understand boolean algebra but i'm not understand how it works this expression `(х XOR у) - у` and I need a detailed explanation. Please help me.

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gcc currently uses this to implement integer absolute value on x86. It's not actually the fastest way, though: gcc.gnu.org/bugzilla/show_bug.cgi?id=67510 – Peter Cordes Sep 9 '15 at 8:04

It follows from the definition of two's complement, `-x = ~x + 1`

If `x` is negative: `y = x>>31 = -1`. Rewrite the `~x` inversion as `x ^ -1`, and the `+1` to subtracting `-1`, to get:

``````-x = (x ^ -1) - -1 = abs(x)
``````

If `x` is non-negative: `y = 0`, and `(x ^ 0) - 0)` is obviously just `x`.

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(x XOR y) - y is just doing 2's complement on a negative number. For positive number, y will be 0 so x remains unchanged.

Example. x = -2.

-2 is represented as 0xFFFFFFFE

x>>31 will make y = 0xFFFFFFFF (ie. -1)

x XOR y will flip all the bits in x giving result as 0x00000001

(x XOR y) - y = 0x00000001 - (-1) = 0x00000002.

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