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I want a function that returns -1 for negative numbers and +1 for positive numbers. http://en.wikipedia.org/wiki/Sign%5Ffunction It's easy enough to write my own, but it seems like something that ought to be in a standard library somewhere.

Edit: Specifically, I was looking for a function working on floats.

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What should it return for 0? –  Craig McQueen Dec 14 '09 at 23:26
@Craig McQueen; that depends on if it is a positive zero or negative zero. –  ysth Dec 15 '09 at 5:53
I noticed that you specified the return value as an integer. Are you looking for a solution that takes integers or floating point numbers? –  Mark Byers Dec 15 '09 at 9:56
Amazing. Most of these solutions say to write your own function, even though this question specifically asks whether there is a function in the std lib... –  allyourcode Feb 11 '13 at 23:31
@ysth @Craig McQueen, false for floats too, no? sgn(x)'s definition says to return 0 if x==0. According to IEEE 754, negative zero and positive zero should compare as equal. –  RJFalconer Jun 4 '14 at 11:28

16 Answers 16

up vote 200 down vote accepted

Surprised no one has posted the branchless, type-safe C++ version yet:

template <typename T> int sgn(T val) {
    return (T(0) < val) - (val < T(0));


  • Actually implements signum (-1, 0, or 1). Implementations here using copysign only return -1 or 1, which is not signum. Also, some implementations here are returning a float (or T) rather than an int, which seems wasteful.
  • Works for ints, floats, doubles, unsigned shorts, or any custom types constructible from integer 0 and orderable.
  • Fast! copysign is slow, especially if you need to promote and then narrow again. This is branchless and optimizes excellently
  • Standards-compliant! The bitshift hack is neat, but only works for some bit representations, and doesn't work when you have an unsigned type. It could be provided as a manual specialization when appropriate.
  • Accurate! Simple comparisons with zero can maintain the machine's internal high-precision representation (e.g. 80 bit on x87), and avoid a premature round to zero.


  • It's a template so it'll take forever to compile.
  • Apparently some people think use of a new, somewhat esoteric, and very slow standard library function that doesn't even really implement signum is more understandable.
  • The < 0 part of the check triggers GCC's -Wtype-limits warning when instantiated for an unsigned type. You can avoid this by using some overloads:

    template <typename T> inline constexpr
    int signum(T x, std::false_type is_signed) {
        return T(0) < x;
    template <typename T> inline constexpr
    int signum(T x, std::true_type is_signed) {
        return (T(0) < x) - (x < T(0));
    template <typename T> inline constexpr
    int signum(T x) {
        return signum(x, std::is_signed<T>());

    (Which is a good example of the first caveat.)

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@GMan: GCC only just now (4.5) stopped having cost quadratic to the number of instantiations for template functions, and they are still drastically more expensive to parse and instantiate than manually written functions or the standard C preprocessor. The linker also has to do more work to remove duplicate instantiations. Templates also encourage #includes-in-#includes, which makes dependency calculation take longer and small (often implementation, not interface) changes to force more files to be recompiled. –  user79758 Jan 5 '11 at 22:42
@Joe: Yes, and there's still no noticeable cost. C++ uses templates, that's just something we all have to understand, accept, and get over. –  GManNickG Jan 5 '11 at 22:54
Wait, what's this "copysign is slow" business...? Using current compilers (g++ 4.6+, clang++ 3.0), std::copysign seems to result in excellent code for me: 4 instructions (inlined), no branching, entirely using the FPU. The recipe given in this answer, by contrast, generates much worse code (many more instructions, including a multiply, moving back and forth between integer unit and FPU)... –  snogglethorpe Jan 23 '12 at 6:35
@snogglethorpe: If you're calling copysign on an int it promotes to float/double, and must narrow again on return. Your compiler may optimize that promotion out but I can't find anything suggesting that's guaranteed by the standard. Also to implement signum via copysign you need to manually handle the 0 case - please make sure you include that in any performance comparison. –  user79758 Jan 23 '12 at 9:31
The first version is not branchless. Why do people think that a comparison used in an expression will not generate a branch? It will on most architectures. Only processors that have a cmove (or predication) will generate branchless code, but they'll do it also for ternaries or if/else if it is a win. –  tristopia Mar 12 '12 at 15:41

I don't know of a standard function for it. Here's an interesting way to write it though:

(x > 0) - (x < 0)

Here's a more readable way to do it:

if (x > 0) return 1;
if (x < 0) return -1;
return 0;

If you like the ternary operator you can do this:

(x > 0) ? 1 : ((x < 0) ? -1 : 0)
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Also one that works without branches. Nice. –  Joey Dec 14 '09 at 22:31
My hat's off to you -- very nice. –  Jerry Coffin Dec 14 '09 at 22:35
@Svante: not exactly. A value of 0 is "false"; any other value is "true"; however, the relational and equality operators always return 0 or 1 (see Standard 6.5.8 and 6.5.9). -- the value of the expression a * (x == 42) is either 0 or a. –  pmg Dec 14 '09 at 23:21
High-Performance Mark, I'm amazed that you missed the C++ tag. This answer is very much valid and doesn't deserve a down-vote. Moreover, I wouldn't use copysign for integral x even if I had it available. –  avakar Dec 15 '09 at 8:39
Has anyone actually checked what code GCC/G++/any other compiler emits on a real platform? My guess is that the "branchless" version uses two branches instead of one. Bitshifting is probably a lot faster - and more portable in terms of performance. –  Jørgen Fogh Sep 2 '11 at 11:29

There is a C99 math library function called copysign(), which takes the sign from one argument and the absolute value from the other:

result = copysign(1.0, value) // double
result = copysignf(1.0, value) // float
result = copysignl(1.0, value) // long double

will give you a result of +/- 1.0, depending on the sign of value. Note that floating point zeroes are signed: (+0) will yield +1, and (-0) will yield -1.

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Upvoted this one, downvoted most popular answer. Left reeling in amazement that SO community seems to prefer a hack to use of a standard library function. May the gods of programming condemn you all to trying to decipher hacks used by clever programmers unfamiliar with language standards. Yeah, I know this is going to cost me a ton of rep on SO, but I'd rather side with comingstorm than the rest of you ... –  High Performance Mark Dec 15 '09 at 7:42
This is close, but it gives the wrong answer for zero (according to the Wikipedia article in the question at least). Nice suggestion though. +1 anyway. –  Mark Byers Dec 15 '09 at 8:25
If you want an integer, or if you want the exact signum result for zeros, I like Mark Byers' answer, which is fiendishly elegant! If you don't care about the above, copysign() might have a performance advanage, depending on the application -- if I were optimizing a critical loop, I would try both. –  comingstorm Dec 16 '09 at 10:08
1) C99 is not fully supported everywhere (consider VC++); 2) this is also a C++ question. This is a good answer, but the upvoted one also works, and is more widely applicable. –  Pavel Minaev Dec 31 '09 at 9:17
Savior! Needed a way to determine between -0.0 and 0.0 –  Ólafur Waage May 14 '11 at 13:32

Apparently, the answer to the original poster's question is no. There is no standard C++ sgn function.

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Faster than the above solutions, including the highest rated one:

(x < 0) ? -1 : (x > 0)
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What type is x? Or are you using a #define? –  Chance Feb 20 '12 at 18:11
Your type is not faster. It will cause a cache miss quite often. –  drakej Dec 30 '12 at 3:19
Cache miss? I'm not sure how. Perhaps you meant branch misprediction? –  Catskul Jun 1 '13 at 5:10

There's a way to do it without branching, but it's not very pretty.

sign = -(int)((unsigned int)((int)v) >> (sizeof(int) * CHAR_BIT - 1));


Lots of other interesting, overly-clever stuff on that page, too...

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It seems that most of the answers missed the original question.

Is there a standard sign function (signum, sgn) in C/C++?

Not in the standard library, but there is in boost, which might as well be part of the standard.

    #include <boost/math/special_functions/sign.hpp>

    //Returns 1 if x > 0, -1 if x < 0, and 0 if x is zero.
    template <class T>
    inline int sign (const T& z);


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If all you want is to test the sign, use signbit (returns true if its argument has a negative sign). Not sure why you would particularly want -1 or +1 returned; copysign is more convenient for that, but it sounds like it will return +1 for negative zero on some platforms with only partial support for negative zero, where signbit presumably would return true.

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There's many mathematical applications in which the sign(x) is necessary. Otherwise I'd just do if (x < 0). –  Chance Mar 9 '12 at 16:42

My copy of C in a Nutshell reveals the existence of a standard function called copysign which might be useful. It looks as if copysign(1.0, -2.0) would return -1.0 and copysign(1.0, 2.0) would return +2.0.

Pretty close huh?

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Not standard, but may be widely available. Microsoft's starts with an underscore, which is the convention they use for non-standard extensions. Not the best choice when you're working with integers, though. –  Mark Ransom Dec 14 '09 at 23:33
copysign is both in the ISO C (C99) and POSIX standards. See opengroup.org/onlinepubs/000095399/functions/copysign.html –  lhf Dec 15 '09 at 1:19
What lhf said. Visual Studio is not a reference for the C standard. –  Stephen Canon Dec 15 '09 at 1:42

No, it doesn't exist in c++, like in matlab. I use a macro in my programs for this.

#define sign(a) ( ( (a) < 0 )  ?  -1   : ( (a) > 0 ) )
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The OP's question was "C/C++" but here is a strictly c++ solution:

template <typename T>
T sign(T t) 
    if( t == 0 )
        return T(0);
        return (t < 0) : T(-1) : T(1);

which doesn't handle +/- zero, but uses templates nicely to overload for any type for which the compiler can understand 0, 1, and -1. If it's used on a type for which this isn't true, then the compiler will complain so you don't get unexpected behavior. This wont have the speed of some of the earlier posts, but will be handy for many cases still.

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int sign(float n)
  union { float f; std::uint32_t i; } u { n };
  return 1 - ((u.i >> 31) << 1);

This function assumes:

  • binary32 representation of floating point numbers
  • a compiler that make an exception about the strict aliasing rule when using a named union
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This invokes undefined / implementation-defined behavior; it also returns a float, which signum usually does not. –  user79758 Feb 6 '12 at 20:05
@joe Making an int version is quite easy, i've added it to my answer. As for the UB: are you referring to the union or to the float bit twiddling (or both)? –  Gigi Feb 6 '12 at 21:58
@joe I've clarified the requisites to avoid UB in the answer, thank you. –  Gigi Feb 7 '12 at 0:05
There are still some bad assumptions here. For example I don't believe the endianness of the float is guaranteed to be the endianness of the integer. Your check also fails on any architectures using ILP64. Really, you're just reimplementing copysign; if you're using static_assert you've got C++11, and might as well really use copysign. –  user79758 Mar 15 '12 at 18:24
You'd also be better off using uint32_t rather than unsigned int - you could avoid the static_assert then. Too bad the behaviour of a union used like this is still undefined. –  Tom Aug 7 '12 at 17:05
double signof(double a) { return (a == 0) ? 0 : (a<0 ? -1 : 1); }
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I tend to use the following:

signval = i/abs(i);

That gives +/- 1 although it's likely not very fast.

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Does i=0 work very well? –  yingted Mar 13 '12 at 22:41
This is the correct way to compute "the" complex sign function. For real numbers, this is probably overkill. –  Alexandre C. Mar 15 '12 at 19:12
@Anonymous - no, it doesn't! –  Tom Aug 7 '12 at 17:08

I needed to solve this. This is what I came up with.

int sign(int v){
   return  ((v >> 31) | -(-v >> 31));
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This assumes 32bit ints, and probably has issues even when that's true (specifically I'm not sure it handles MIN_INT) –  Mat Jul 9 '13 at 18:25

The following expression will returns the sign of x (1 if x > 0 positive, -1 if x < 0 negative, or 0 if x equals to 0):

x != 0 ? abs(x) / x : 0;

You can also use the System::Math::Sign method.

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System::Math::Sign isn't standard C or C++. –  Mat Aug 19 '13 at 18:54

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