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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)
      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
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
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

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:


#include <stdio.h>

int main() {
    float x = 0x80000001;
    return 0;


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

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

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