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.

I have to following bitwise code which casts a floating point value (packaged in an int) to an int value.

Question: There are rounding issues so it fails in cases where input is 0x80000001 for example. How do I handle this?

Here is the code:

  if(x == 0) return x;

  unsigned int signBit = 0;
  unsigned int absX = (unsigned int)x;
  if (x < 0)
  {
      signBit = 0x80000000u;
      absX = (unsigned int)-x;
  }

  unsigned int exponent = 158;
  while ((absX & 0x80000000) == 0)
  {
      exponent--;
      absX <<= 1;
  }

  unsigned int mantissa = absX >> 8;

  unsigned int result = signBit | (exponent << 23) | (mantissa & 0x7fffff);
  printf("\nfor x: %x, result: %x",x,result);
  return result;
share|improve this question
2  
Good: You marked this as homework and posted your code. Bad: You didn't ask your question! What do you need help with? –  lc. Sep 10 '12 at 1:05
1  
Questions typically have a question mark... –  Lee Taylor Sep 10 '12 at 1:06
    
Sorry, fixed post. –  Anonymous Sep 10 '12 at 1:09
    
Do you have examples of expected input and output? for example the 32-bit float pattern 0x80000001 is a very small negative number close to zero. So if you want the int of that then the answer is zero? –  Mark Tolonen Sep 10 '12 at 2:14
    
Yes: Test [0x80000001] gives [0xceffffff] - expected [0xcf000000] –  Anonymous Sep 10 '12 at 2:17

1 Answer 1

That's because the precision of 0x80000001 exceeds that of a float. Read the linked article, the precision of a float is 24 bits, so any pair of floats whose difference (x - y) is less than the highest bit of the two >> 24 simply cannot be detected. gdb agrees with your cast:

main.c:

#include <stdio.h>

int main() {
    float x = 0x80000001;
    printf("%f\n",x);
    return 0;
}

gdb:

Breakpoint 1, main () at test.c:4
4       float x = 0x80000001;
(gdb) n
5       printf("%f\n",x);
(gdb) p x
$1 = 2.14748365e+09
(gdb) p (int)x
$2 = -2147483648
(gdb) p/x (int)x
$3 = 0x80000000
(gdb) 

The limit of this imprecision:

(gdb) p 0x80000000 == (float)0x80000080 
$21 = 1
(gdb) p 0x80000000 == (float)0x80000081
$20 = 0

The actual bitwise representation:

(gdb) p/x (int)(void*)(float)0x80000000
$27 = 0x4f000000
(gdb) p/x (int)(void*)(float)0x80000080
$28 = 0x4f000000
(gdb) p/x (int)(void*)(float)0x80000081
$29 = 0x4f000001

doubles do have enough precision to make the distinction:

(gdb) p 0x80000000 == (float)0x80000001
$1 = 1
(gdb) p 0x80000000 == (double)0x80000001
$2 = 0
share|improve this answer
    
How can this be handled? –  Anonymous Sep 10 '12 at 1:19
    
@Anonymous use doubles. I've added some explanation. It boils down to the fact that the number of bits in the mantissa of a float simply isn't enough to store those two numbers in a distinct manner. –  Kevin Sep 10 '12 at 1:49
    
Also, (general comment) if anyone knows an easier way to get the bitwise representation of a float, I'd love to hear it. –  Kevin Sep 10 '12 at 1:53
    
using long does not help. –  Anonymous Sep 10 '12 at 1:57
    
@Anonymous That's why I said double, not long. –  Kevin Sep 10 '12 at 1:57

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

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