Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Please refer the Link.

It is suggested that the fastest way to calculate absolute value of a number is by using (relatively difficult) bitwise operator.

I know bitwise operators are faster than division and Multiplication. But are they even faster than + and - operator?

Thanks

share|improve this question

closed as off-topic by Tim Post Mar 2 at 5:20

This question appears to be off-topic. The users who voted to close gave this specific reason:

  • "This question appears to be off-topic because it lacks sufficient information to diagnose the problem. Describe your problem in more detail or include a minimal example in the question itself." – Tim Post
If this question can be reworded to fit the rules in the help center, please edit the question.

    
maybe, but that depends on your architecture and possibly many other circumstances. –  PlasmaHH Jul 24 '13 at 12:35
2  
i think it will help you stackoverflow.com/questions/15668718/… –  user2408578 Jul 24 '13 at 12:37
    
right shift on negative values is implementation defined, so this is not portable –  Jens Gustedt Jul 24 '13 at 12:37
    
@PlasmaHH but is it really worth to use bitwise operator usually in place of +/- for performance? I mean is that significant? –  pranitkothari Jul 24 '13 at 12:37
    
@ppk: that depends on your architecture and possibly many other circumstances. In some cases it is, in some it isn't, in some it is the other way round. –  PlasmaHH Jul 24 '13 at 14:04

5 Answers 5

up vote 2 down vote accepted

Measure. In the context you're interested in. I've worked on machines where multiply was faster than shifting, and on machines where it was radically slower. But you can't tell up front. For that matter, what is fastest on the latest Intel may not be fastest on the next one to come out. (The code in the link is the sort of thing you don't want to do. It's not readable, it's not portable, and even on systems where it works, there's a good chance that it is slower than the naïve implementation.)

share|improve this answer

I'm sure the compiler would be very grateful for your analysis of this situation; it would certainly never have thought of this!

Here's GCC's take on this:

int myabs(int n)
{
  return n < 0 ? -n : n;   // hurray, portable code!
}

Becomes:

mov edx, edi     ;; edx = x
sar edx, 31      ;; edx >>= 31
mov eax, edx
xor eax, edi
sub eax, edx     ;; eax = (x ^ (x >> 31)) - (x >> 31)
ret              ;; return eax
share|improve this answer
4  
would have been a candidate for a +1 without the sarcasm –  Jens Gustedt Jul 24 '13 at 12:41
6  
@JensGustedt: Sarcasm is reserved for compiler-outsmarters who don't research the problem. –  Kerrek SB Jul 24 '13 at 12:41
    
@jleahy: jonshiring's rule strikes again. –  Kerrek SB Jul 24 '13 at 12:48
    
Brilliant answer. –  alex Jul 25 '13 at 1:26

On just about any platform you'll encounter today, a bitwise operation is exactly as fast as addition and subtraction; the ALU can complete all of these in a single cycle. Some platforms (particularly ARM) can also do a shift in the same cycle as another operation.

Multiplication and division may or may not take longer; that varies from platform to platform.

But note that compilers generally know the fastest way to do simple operations like this, so it's generally not worth trying such micro-optimisations; it's quite easy to accidentally defeat the compiler's optimisation and produce slower code.

share|improve this answer

On most modern architectures, bitwise operators like & and | are as fast as arithmetic + and -. In a lot of modern cpu, all these operations take one cpu cycle.

share|improve this answer

I have no idea about Javascript, but any C/C++ compiler worth its salt will optimize arithmetic operators to bitwise operations, when possible. I would worry more about keeping your code readable. Sometimes you will see these "tricks" written with bitwise operators, to make it clearer how the trick works.

share|improve this answer

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