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I came across a bug with the 64bit processors that I wanted to share.

CGFloat test1 = 0.58;
CGFloat test2 = 0.40;
CGFloat value;

value = fmaxf( test1, test2 );

The result would be:
value = 0.5799999833106995

This obviously is a rounding issue, but if you needed to check to see which value was picked you would get an erroneous result.

if( test1 == value ){
 // do something

however if you use either MIN( A, B ) or MAX( A, B ) it would work as expected.
I thought this is was worth sharing


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Please see answers below as this is not a bug, but a bug with my code. Stephen thanks for pointing it out –  reza23 Jan 10 '14 at 13:31
It is not a but in your code, is is just an example of display rounding due to a display precision to small to show all the digits. With a display format of %0,20f all of the resoles are displayed without rounding. –  zaph Jan 10 '14 at 13:45

1 Answer 1

up vote 2 down vote accepted

This has nothing to do with a bug in fminf or fmaxf. There is a bug in your code.

On 64-bit systems, CGFloat is typedef'd to double, but you're using the fmaxf function, which operates on float (not double), which causes its arguments to be rounded to single precision, thus changing the value. Don't do that.

On 32-bit systems, this doesn't happen because CGFloat is typedef'd to float, matching the argument and return type of fmaxf; no rounding occurs.

Instead, either include <tgmath.h> and use fmax without the f suffix, or use float instead of CGFloat.

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CGFLoat maps to a double on 64 bit iOS devices? I did not know that! Thanks for that. That implies that the 64 bit ARM has native double precision math. That's cool. –  Duncan C Jan 10 '14 at 13:03
32-bit ARM (or at least the implementations used in high-end phones) has native double-precision too. –  Stephen Canon Jan 10 '14 at 13:04
0.58 can not be represented exactly by a CGFloat. How you see it depends on how it is displayed. The reason is because of the different bases of the number systems: base 10 for decimal, base 2 for CGFloat. So while this answer does have some correct information it is incorrect. –  zaph Jan 10 '14 at 13:26
@Zaph: while it's true that 0.58 cannot be represented exactly, that's not the source of the problem that the questioner was having (if it were, he would have experienced the issue one 32-bit as well). –  Stephen Canon Jan 10 '14 at 13:27
If the values had been displayed with a higher precision, %0.20f, none of the floats/doubles would have been displayed as exact values due to rounding. The rounding occurs at a different display precision doe to the type double or float. If you start out with an approximation you will end up with an approximation. Try it. –  zaph Jan 10 '14 at 13:48

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