# Curiously, why does my abs-function return -0?

The following abs-function sometimes returns `-0` (minus zero)

``````inline float abs(float a){
return( a>=0.0f? a :-a);
}
``````

To be more specific, the statement `sprintf(str, "%.2f", abs(-0.00f) );` produces "-0.00", and that is annoying since the string is displayed to the user.

Question:

1) Why does it produce `-0`?

2) How to fix it?

PS: I am using xcode's (objective) c compiler.

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Just curious.. any reason you're not using `fabs` and `fabsf`? –  James Webster Jul 12 '13 at 17:14
@JamesWebster Okay, fabs would fix the problem! But how is fabs implemented, and what is wrong with my implementation? –  ragnarius Jul 12 '13 at 17:17
@ragnarius it should output: `-0.00` –  Grijesh Chauhan Jul 12 '13 at 17:23
@GrijeshChauhan Yes, that is correct! sprintf produces -0.00 (It was shown as -0 in the debugger) –  ragnarius Jul 12 '13 at 17:25
Change it to return( a>0.0f? a :-a); –  Ramy Al Zuhouri Jul 12 '13 at 19:36

1. -0 is an artifact of binary representation, 0 with the sign bit set. Wikipedia has a comprehensive article on signed zero if you would like further details.

2. Use fabs() as people have said above. If you really really really want to inline, chain your compares:

inline float abs(float a) { return (a > 0.f) ? a : ( (a < 0.f) ? -a : 0); }

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1. Because `-0.0 == 0.0` and thus `-0.0 >= 0.0` is true.

2. Use `fabs` (or `fabsf` for float instead of `double`) rather than trying to reinvent it.

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It's interesting how `printf` determines when to output the `-` sign. Surely it doesn't compare with zero since -0.0 is not less than 0.0. –  Inspired Jul 12 '13 at 17:17
To me it is not obvious that -0.0 == 0.0. The binary representations of -0.0 and 0.0 are different, and I would have guessed that two floats are equal if and only if their binary representations are equal (but then I would have guessed wrong, at least for some compilers) –  ragnarius Jul 12 '13 at 17:33
@ragnarius: It's not really a compiler issue, but it's part of the IEEE 754 standard. Most implementations are at least nominally IEEE 754 compliant, and those that aren't often still support `-0.0`. –  Dietrich Epp Jul 12 '13 at 18:13
@ragnarius: `1.0/Inf == 0.0 == -0.0 == -1.0/Inf` — remember, using `==`, `-0.0 == +0.0`. However, `1.0/Inf` will generate a positive number and `-1.0/Inf` will generate a negative number. The sign of the output is determined only by the signs of the inputs, as long as the output isn't `NaN`: positive divided by positive is positive, negative divided by positive is negative. –  Dietrich Epp Jul 12 '13 at 19:09
@Inspired The minus sign is the easiest character to generate in the decimal representation of a binary floating-point number. The (comparatively tricky) conversion requires accessing the bits of the representation anyway. –  Pascal Cuoq Jul 12 '13 at 21:55

Use `signbit()` to differentiate. Works with -0 and -INF and, I think, -NAN (if there is such a thing).

``````// C11
inline float ragnarius_abs(float a) {
return signbit(a) ? -a : a;
}
``````

As to why `a = -0.0f; a>=0.0f? a :-a;` produces `-0`?
`-0.0f >= 0.0f` is true: `-0.0f` and `0.0f` are both numerically equal, thus `a`, which is `-0.0f` is returned.

Further notes about floating point types:

-0 equals 0. It is the sole floating point exception where 2 different binary IEEE 754 bit representations compare as equal. Some other floating point formats have various different bit representations representing the same numeric value.

NAN does not equal NAN. NAN may be expressed with numerous representations, but even if 2 NANs have the exact same bit representation, they will not numerically (==) compare as equal.

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Okay! Is signbit defined in C (or only in c++11?)? –  ragnarius Jul 12 '13 at 18:31
Do you think fabs() is implemented this way? –  ragnarius Jul 12 '13 at 18:32
`signbit()` is C11. C11 draft appendix F.10.4.2 says fabs(±0) returns +0. So it is likely ragnarius_abs() is simple a re-creation of `fabs()`. Oh well. –  chux Jul 12 '13 at 18:55
But fabs() is defined in C, it cannot use signbit() (?). –  ragnarius Jul 12 '13 at 19:03
( One possible implementation is if (a==0.0f) return 0.0f; return( a>=0.0f? a :-a); ) –  ragnarius Jul 12 '13 at 19:04