In C/C++, why should one use abs() or fabs() to find the absolute value of a variable without using the following code?

int absoluteValue = value < 0 ? -value : value;

Does it have something to do with fewer instructions at lower level?

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    c/c++ why? why do you use both like this? – user2736738 Feb 4 '18 at 14:18
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    Better readability and compiler optimization. – iBug Feb 4 '18 at 14:18
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    abs() is a pre-defined and well-known function, so almost all programmers use it. This lead to uniformity in codes. – H.H Feb 4 '18 at 14:20
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    Why reinvent something that's been tested and added to standard library, especially when you might get it wrong or miss special cases? – codebender Feb 4 '18 at 14:50
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    Why wouldn't you use abs or fabs? – immibis Feb 4 '18 at 22:44

The "conditional abs" you propose is not equivalent to std::abs (or fabs) for floating point numbers, see e.g.

#include <iostream>
#include <cmath>

int main () {
    double d = -0.0;
    double a = d < 0 ? -d : d;
    std::cout << d << ' ' << a << ' ' << std::abs(d);


-0 -0 0

Given -0.0 and 0.0 represent the same real number '0', this difference may or may not matter, depending on how the result is used. However, the abs function as specified by IEEE754 mandates the signbit of the result to be 0, which would forbid the result -0.0. I personally think anything used to calculate some "absolute value" should match this behavior.

For integers, both variants will be equivalent both in runtime and behavior. (Live example)

But as std::abs (or the fitting C equivalents) are known to be correct and easier to read, you should just always prefer those.

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    "Negative zero" in floating point is really something to take into account. – iBug Feb 4 '18 at 14:32
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    This answer is informative. However, for a function like abs(), even standard implement is not perfect. INT_MIN < 0 && abs(INT_MIN) < 0 is true. – llllllllll Feb 4 '18 at 19:22
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    @liliscent abs(INT_MIN) is UB even, at least in C++, but that's kind of a fundamental limitation of the language. You want to fix the return type to match the source type (as specified in IEEE754, for example), so the runtime problem of the input being INT_MIN can't really be worked around anyways. – Baum mit Augen Feb 4 '18 at 19:27
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    @BaummitAugen You're right, even in C99 it's also UB port70.net/~nsz/c/c99/n1256.html# – llllllllll Feb 4 '18 at 19:35
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    I don't know if this really can happen, but if you divide 1 by 0 and get infinity, you might get -infinity when dividing 1 by -.0. – Thern Feb 5 '18 at 9:08

The first thing that comes to mind is readability.

Compare these two lines of codes:

int x = something, y = something, z = something;
// Compare
int absall = (x > 0 ? x : -x) + (y > 0 ? y : -y) + (z > 0 ? z : -z);
int absall = abs(x) + abs(y) + abs(z);
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    Whoa, with all due respect, but that's a lot of up votes for a low-ball nitpick. The question clearly isn't about syntax but rather implementation. Your "problem" is trivial to solve... And your answer is good for question "why should we wrap one-liners into functions?" – luk32 Feb 4 '18 at 17:45
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    @luk32 The question was "why choose one thing over another?" One answer is readability, because they do differ quite a lot. I wouldn't call this a "nitpick". – SH7890 Feb 4 '18 at 21:21
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    @SH7890 Readability is a no issue, because you can write a function to prevent this, or heck even a macro. It takes one line, and will look exactly the same. Here's a fix for readability: int cabs(int a) {return a > 0 ? a : -a;}. There even is a hint, that it's about implementation. No one sane will copy-paste whole implementation on each use case. Come on. – luk32 Feb 4 '18 at 22:08
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    @luk32 Sure, but the standard library authors helpfully foresaw you might want to do this and so they wrote that function for you so you don't need to write it yourself. It's called abs. Why bother to write your own cabs function that does exactly the same thing? One reason might be that you don't know abs exists, but since you do now, it's not like you get anything out of spiting it. – immibis Feb 4 '18 at 22:39
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    @luk32 you got my point. Readability is certaily not a concern since I can define macros/functions with that line of code. I was looking for lower level equivalence or dissymmetry. – Subhranil Feb 5 '18 at 2:21

The compiler will most likely do the same thing for both at the bottom layer - at least a modern competent compiler.

However, at least for floating point, you'll end up writing a few dozen lines if you want to handle all the special cases of infinity, not-a-number (NaN), negative zero and so on.

As well as it's easier to read that abs is taking the absolute value than reading that if it's less than zero, negate it.

If the compiler is "stupid", it may well end up doing worse code for a = (a < 0)?-a:a, because it forces an if (even if it's hidden), and that could well be worse than the built-in floating point abs instruction on that processor (aside from complexity of special values)

Both Clang (6.0-pre-release) and gcc (4.9.2) generates WORSE code for the second case.

I wrote this little sample:

#include <cmath>
#include <cstdlib>

extern int intval;
extern float floatval;

void func1()
    int a = std::abs(intval);
    float f = std::abs(floatval);
    intval = a;
    floatval = f;

void func2()
    int a = intval < 0?-intval:intval;
    float f = floatval < 0?-floatval:floatval;
    intval = a;
    floatval = f;

clang makes this code for func1:

_Z5func1v:                              # @_Z5func1v
    movl    intval(%rip), %eax
    movl    %eax, %ecx
    negl    %ecx
    cmovll  %eax, %ecx
    movss   floatval(%rip), %xmm0   # xmm0 = mem[0],zero,zero,zero
    andps   .LCPI0_0(%rip), %xmm0
    movl    %ecx, intval(%rip)
    movss   %xmm0, floatval(%rip)

_Z5func2v:                              # @_Z5func2v
    movl    intval(%rip), %eax
    movl    %eax, %ecx
    negl    %ecx
    cmovll  %eax, %ecx
    movss   floatval(%rip), %xmm0   
    movaps  .LCPI1_0(%rip), %xmm1 
    xorps   %xmm0, %xmm1
    xorps   %xmm2, %xmm2
    movaps  %xmm0, %xmm3
    cmpltss %xmm2, %xmm3
    movaps  %xmm3, %xmm2
    andnps  %xmm0, %xmm2
    andps   %xmm1, %xmm3
    orps    %xmm2, %xmm3
    movl    %ecx, intval(%rip)
    movss   %xmm3, floatval(%rip)

g++ func1:

    movss   .LC0(%rip), %xmm1
    movl    intval(%rip), %eax
    movss   floatval(%rip), %xmm0
    andps   %xmm1, %xmm0
    sarl    $31, %eax
    xorl    %eax, intval(%rip)
    subl    %eax, intval(%rip)
    movss   %xmm0, floatval(%rip)

g++ func2:

    movl    intval(%rip), %eax
    movl    intval(%rip), %edx
    pxor    %xmm1, %xmm1
    movss   floatval(%rip), %xmm0
    sarl    $31, %eax
    xorl    %eax, %edx
    subl    %eax, %edx
    ucomiss %xmm0, %xmm1
    jbe .L3
    movss   .LC3(%rip), %xmm1
    xorps   %xmm1, %xmm0
    movl    %edx, intval(%rip)
    movss   %xmm0, floatval(%rip)

Note that both cases are notably more complex in the second form, and in the gcc case, it uses a branch. Clang uses more instructions, but no branch. I'm not sure which is faster on which processor models, but quite clearly more instructions is rarely better.

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    This answer says that a modern competent compiler will most likely do the same thing for both then shows assembly code demonstrating that the selected compilers did not do the same thing. That is a conflicting, confusing message. Are the selected compilers incompetent or unmodern? Why use them for examples then? Or was the statement that a modern competent compiler will most likely do the same thing for both incorrect? Why is there a difference in the generated code? – Eric Postpischil Feb 4 '18 at 16:54
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    "quite clearly more instructions is rarely better." I beg to differ, especially when you compare against branching. It trips prefetching and out-of-order execution. It's complex and probably isn't safe to be generalized. – luk32 Feb 4 '18 at 17:43
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    Is this at -O3? – Calchas Feb 5 '18 at 10:28
  • @EricPostpischil, for the integer case, clang produced identical code for both. gcc's code differs slightly in that the abs() version computes and stores the result in a single operation, while the conditional version computes the result into a register, then copies it to memory. – Mark Feb 6 '18 at 0:10
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    @Calchas: I used -O2, which is what I normally use for "optimized" code. But -O3 didn't alter the code in any noticeable way. A newer version of gcc may be different - but I don't have one of those right now - my computer is about to be upgraded, so will get a new compiler as well [it wasn't starting this morning, got it going this evening, replacement bits on the way]. – Mats Petersson Feb 7 '18 at 0:39

Why use abs() or fabs() instead of conditional negation?

Various reasons have already been stated, yet consider conditional code advantages as abs(INT_MIN) should be avoided.

There is a good reason to use the conditional code in lieu of abs() when the negative absolute value of an integer is sought

// Negative absolute value

int nabs(int value) {
  return -abs(value);  // abs(INT_MIN) is undefined behavior.

int nabs(int value) {
  return value < 0 ? value : -value; // well defined for all `int`

When a positive absolute function is needed and value == INT_MIN is a real possibility, abs(), for all its clarity and speed fails a corner case. Various alternatives

unsigned absoluteValue = value < 0 ? (0u - value) : (0u + value);
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    +1 for abs(INT_MIN) is undefined behavior. I didn't knew that. Why the library implementers made it undefined? – manav m-n Feb 5 '18 at 5:25
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    @manavm-n Consider that possible results are abs(INT_MIN) --> INT_MIN, or abs(INT_MIN) --> INT_MAX or program dies or etc.. None are universally preferred, so best to allow an implementation to be fast with other values and let abs(INT_MIN) --> UB to embrace all implementations. Agree to disagree – chux Feb 5 '18 at 5:30
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    @manavm-n The C spec specs it is UB. "If the result cannot be represented, the behavior is undefined." § 2 – chux Feb 5 '18 at 14:11
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    @chux, abs(INT_MIN) is only undefined behavior under two's-compliment arithmetic. Under sign-magnitude arithmetic (not that anybody uses it any more), it's perfectly well defined. – Mark Feb 6 '18 at 0:13
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    @TrevorPowell: You presume wrongly, (0u - value) is performed using promotion to unsigned int and the result is computed modulo, like all unsigned arithmetic. – Ben Voigt Feb 6 '18 at 6:06

There might be a more-efficient low-level implementation than a conditional branch, on a given architecture. For example, the CPU might have an abs instruction, or a way to extract the sign bit without the overhead of a branch. Supposing an arithmetic right shift can fill a register r with -1 if the number is negative, or 0 if positive, abs x could become (x+r)^r (and seeing Mats Petersson's answer, g++ actually does this on x86).

Other answers have gone over the situation for IEEE floating-point.

Trying to tell the compiler to perform a conditional branch instead of trusting the library is probably premature optimization.


Consider that you could feed a complicated expression into abs(). If you code it with expr > 0 ? expr : -expr, you have to repeat the whole expression three times, and it will be evaluated two times.
In addition, the two result (before and after the colon) might turn out to be of different types (like signed int / unsigned int), which disables the use in a return statement. Of course, you could add a temporary variable , but that solves only parts of it, and is not better in any way either.

  • This is easily worked around by initializing a temporary variable. An argument with side-effects would give incorrect results if evaluated twice! abs(printf("hello, world!\n"))? – Davislor Feb 4 '18 at 18:50
  • The question do specify the absolute value of a variable though, so side-effects are not relevant to this particular question. – pipe Feb 5 '18 at 12:03

Assuming that the compiler won't be able to determine that both abs() and conditional negation are attempting to achieve the same goal, conditional negation compiles to a compare instruction, a conditional jump instruction, and a move instruction, whereas abs() either compiles to an actual absolute value instruction, in instruction sets that support such a thing, or a bitwise and that keeps everthing the same, except for the sign bit. Every instruction above is typically 1 cycle, so using abs() is likely to be at least as fast, or faster than conditional negation (since the compiler might still recognize that you are attempting to calculate an absolute value when using the conditional negation, and generate an absolute value instruction anyway). Even if there is no change in the compiled code, abs() is still more readable than conditional negation.

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    ... provided that the compiler is stupid enough not to identify the intention of getting absolute value. – iBug Feb 4 '18 at 14:23
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    No it doesnt. Depends on compiler. GCC generates equivalent code for both cases. – StaceyGirl Feb 4 '18 at 14:24
  • @Ivan That's why I I said "at least as fast" – Cpp plus 1 Feb 4 '18 at 14:24
  • @Cppplus1 If compiler does not treat abs as intrinsic, it is likely to be slower, so no. In practice there is no difference between abs and ?: version. – StaceyGirl Feb 4 '18 at 14:26
  • @Ivan It is easier to make abs() intrinsic than recognizing that conditional negation is the same as an absolute value. – Cpp plus 1 Feb 4 '18 at 14:27

The intent behind abs() is "(unconditionally) set the sign of this number to positive". Even if that had to be implemented as a conditional based on the current state of the number, it's probably more useful to be able to think of it as a simple "do this", rather than a more complex "if… this… that".


...and would you make it into a macro, you can have multiple evaluations that you may not want (side efffects). Consider:

#define ABS(a) ((a)<0?-(a):(a))

and use:

f= 5.0;

which would expand to


Function calls won't have this unintended side-effects.

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