# How to compute the integer absolute value

How to compute the integer absolute value without using if condition. I guess we need to use some bitwise operation. Can anybody help?

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Is the ternary operator allowed ? –  cnicutar Aug 20 '12 at 16:42
No, I guess you cannot use that too. –  Pragyan Aug 20 '12 at 16:43
What's the motivation? Performance? Are you trying to solve a branch-predication failure by eliminating the branch? Intellectual curiosity? Homework? Something else? –  Adrian McCarthy Aug 20 '12 at 17:04
@AdrianMcCarthy Well, who cares? I'd be satisfied with all of those (yes, even performance). –  Christian Rau Aug 20 '12 at 17:28

1) Set the mask as right shift of integer by 31 (assuming integers are stored as two's-complement 32-bit values and that the right-shift operator does sign extension).

`````` mask = n>>31
``````

2) XOR the mask with number

``````mask ^ n
``````

3) Subtract mask from result of step 2 and return the result.

``````(mask^n) - mask
``````
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graphics.stanford.edu/~seander/bithacks.html is this patented? –  Quonux Oct 20 '13 at 16:32

Same as existing answers, but with more explanations:

Let's assume a twos-complement number (as it's the usual case and you don't say otherwise) and let's assume 32-bit:

First, we perform an arithmetic right-shift by 31 bits. This shifts in all `1`s for a negative number or all `0`s for a positive one (but note that the actual `>>`-operator's behaviour in C or C++ is implementation defined for negative numbers, but will usually also perform an arithmetic shift, but let's just assume pseudocode or actual hardware instructions, since it sounds like homework anyway):

``````mask = x >> 31;
``````

So what we get is `111...111` (-1) for negative numbers and `000...000` (0) for positives

Now we XOR this with `x`, getting the behaviour of a NOT for `mask=111...111` (negative) and a no-op for `mask=000...000` (positive):

``````x = x XOR mask;
``````

And finally subtract our mask, which means +1 for negatives and +0/no-op for positives:

``````x = x - mask;
``````

So for positives we perform an XOR with 0 and a subtraction of 0 and thus get the same number. And for negatives, we got `(NOT x) + 1`, which is exactly `-x` when using twos-complement representation.

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Upvote for the clear explanation, much better than the accepted answer! –  Chuntao Lu Aug 30 '14 at 14:18

Assume `int` is of 32-bit.

``````int my_abs(int x)
{
int y = (x >> 31);
return (x ^ y) - y;
}
``````
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I wrote my own, before discovering this question.

My answer is probably slower, but still valid:

``````int abs_of_x = ((x*(x >> 31)) | ((~x + 1) * ((~x + 1) >> 31)));
``````
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What is the programming language you're using? In C# you can use the Math.Abs methos:

``````int value1 = -1000;
int value2 = 20;
int abs1 = Math.Abs(value1);
int abs2 = Math.Abs(value2);
``````
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Well, I'm pretty sure that's also outruled by the question. Of course using a prebuilt functions is always easiest ;) –  Christian Rau Aug 20 '12 at 16:51
I can see that now. Worth trying to help though. Good thing he got his answer. –  Florin Bombeanu Aug 20 '12 at 17:42
Always worth mentioning the obvious. Sometimes I find that the bitmask or branchless hacks that are supposed to be faster are really slower. All depends on the processor and the compiler. –  Paul Chernoch Oct 21 '13 at 15:00