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Today I was tracking down why my program was getting some unexpected checksum-mismatch errors, in some code that I wrote that serializes and deserializes IEEE-754 floating-point values, in a format that includes a 32-bit checksum value (which is computed by running a CRC-type algorithm over the bytes of the floating-point array).

After a bit of head-scratching, I realized the problem was the 0.0f and -0.0f have different bit-patterns (0x00000000 vs 0x00000080 (little-endian), respectively), but they are considered equivalent by the C++ equality-operator. So, the checksum-mismatch errors happened because my checksum-calculating algorithm picked up the difference between those two bit-patterns, while certain other parts of my codebase (that use floating point equality testing, rather than looking at the values byte-by-byte) did not make that distinction.

Okay, fair enough -- I should probably have known better than to do floating-point equality testing anyway.

But this got me thinking, are there other IEEE-754 floating point values that are considered equal (according to the C == operator) but have different bit-patterns? Or, to put it another way, how exactly does the == operator decide whether two floating-point values are equal? Newbie me though it was doing something like memcmp() on their bit-patterns, but clearly it's more nuanced than that.

Here's a code example of what I mean, in case I wasn't clear above.

#include <stdio.h>

static void PrintFloatBytes(const char * title, float f)
   printf("Byte-representation of [%s] is: ", title);
   const unsigned char * p = (const unsigned char *) &f;
   for (int i=0; i<sizeof(f); i++) printf("%02x ", p[i]);

int main(int argc, char ** argv)
   const float pzero = -0.0f;
   const float nzero = +0.0f;
   PrintFloatBytes("pzero", pzero);
   PrintFloatBytes("nzero", nzero);
   printf("Is pzero equal to nzero?  %s\n", (pzero==nzero)?"Yes":"No");
   return 0;
share|improve this question
how-to.wikia.com/wiki/… FYI, using an epsilon is the way forward for float comparisons. Not on-topic, but useful to know. –  darvids0n Jun 7 '11 at 1:10
NaNs could go either way (possibly depending on the compiler). They also can be different in memory since there are a large number of possible NaNs (2^24-1 for single precision). –  ughoavgfhw Jun 7 '11 at 1:19

3 Answers 3

up vote 11 down vote accepted

It uses the IEEE-754 equality rules.

  • -0 == +0
  • NaN != NaN
share|improve this answer
+1 NaN. Note that this is a case where the bit patterns would be the same, but == would return false. –  Ernest Friedman-Hill Jun 7 '11 at 1:06
+1 NaN. Also note that you can have different bit patterns representing the two NaNs. –  trutheality Jun 7 '11 at 1:16
Indeed, +0.0 and -0.0 are the only two distinct bit patterns that can compare equal. –  R.. Jun 7 '11 at 2:28
@Ernest: minor nitpick: NaN has a lot of bit patterns. For 32-bit floats, it would be 2^23 - 1 different bit-patterns. –  Alok Singhal Jun 7 '11 at 5:59
Didn't know that! –  Ernest Friedman-Hill Jun 7 '11 at 10:42

For Windows platforms, this link has:

  • Divide by 0 produces +/- INF, except 0/0 which results in NaN.
  • log of (+/-) 0 produces -INF. log of a negative value (other than -0) produces NaN.
  • Reciprocal square root (rsq) or square root (sqrt) of a negative number produces NaN. The exception is -0; sqrt(-0) produces -0, and rsq(-0) produces -INF.
  • INF - INF = NaN
  • (+/-)INF / (+/-)INF = NaN
  • (+/-)INF * 0 = NaN
  • NaN (any OP) any-value = NaN
  • The comparisons EQ, GT, GE, LT, and LE, when either or both operands is NaN returns FALSE.
  • Comparisons ignore the sign of 0 (so +0 equals -0).
  • The comparison NE, when either or both operands is NaN returns TRUE.
  • Comparisons of any non-NaN value against +/- INF return the correct result.
share|improve this answer

exact comparison. That's why it's best to avoid == as a test on floats. It can lead to unexpected and subtle bugs.

A standard example is this code:

 float f = 0.1f;

 if((f*f) == 0.01f)
     printf("0.1 squared is 0.01\n");

because 0.1 can't be represented precisely in binary (it's a repeating whatever the hell you call a fractional binary) 0.1*0.1 won't be exactly 0.01 -- and thus the equality test won't work.

Numerical analysts worry about this at length, but for a first approximation it's useful to define a value -- APL called it FUZZ -- which is how closely two floats need to come to be considered equal. So you might, for example, #define FUZZ 0.00001f and test

 float f = 0.1f;

 if(abs((f*f)-0.01f) < FUZZ)
     printf("0.1 squared is 0.01\n");
share|improve this answer
Clearly it's not exact comparison on the bit-by-bit level though, or it wouldn't indicate that (-0.0f == 0.0f) because those two values have different bit-patterns. –  Jeremy Friesner Jun 7 '11 at 1:02
A reasonable point that would be more apposite had I written "exact bit by bit comparison". –  Charlie Martin Jun 7 '11 at 1:11

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