# Round with floor problem in Objective-C

I am calculating g with e and s, which are all doubles. After that I want to cut off all digits after the second and save the result in x, for example:

g = 2.123 => x = 2.12

g = 5.34995 => x = 5.34

and so on. I Use...

``````g = 0.5*e + 0.5*s;
x = floor(g*100)/100;
``````

...and it works fine most of the time. But sometimes I get strange results. For example:

e = 3.0 s = 1.6 g = 2.30 but x = 2.29!!!

So I tried to track down the error:

``````g = 0.5*e + 0.5*s;
NSLog(@"%f",g);
``````

gives me g = 2.30

``````g = g * 100;
NSLog(@"%f",g);
``````

gives me g = 230.0

``````x = floor(g);
NSLog(@"%f",x);
``````

results in x = 229.0 !!!

I don't get it! Help please! :-)

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For your perusal: What Every Computer Scientist Should Know About Floating-Point Arithmetic docs.sun.com/source/806-3568/ncg_goldberg.html –  martin clayton Feb 13 '10 at 10:54
This has nothing to do with Objective-C, or even C, really. –  dreamlax Feb 13 '10 at 13:48
Any particular reason you want to store these in only 2 decimal digits? –  alesplin Mar 1 '10 at 17:05

This will be due to floating point calculations.

``````g * 100
``````

229.99999999999997

Also have a look at Floating point

Accuracy problems

The fact that floating-point numbers cannot precisely represent all real numbers, and that floating-point operations cannot precisely represent true arithmetic operations, leads to many surprising situations. This is related to the finite precision with which computers generally represent numbers.

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Thanks a lot. Do you have a quick solution to avoid this problem? –  iHilke Feb 13 '10 at 10:58
Have a look at social.msdn.microsoft.com/Forums/en-US/csharpgeneral/thread/…. try decimal vs double for precision if you can. And maybe stackoverflow.com/questions/618535/… –  astander Feb 13 '10 at 11:17
the decimal type is a .Net type; OP is using Objective-C & the Cocoa API (note the call to `NSLog`), so decimal isn't an option. –  outis Feb 14 '10 at 6:23
Sorry, when i originally posted the answer it also stated c#, please see the revisions to the question. –  astander Feb 14 '10 at 14:33

As others have already mentioned, this is due to the limited precision of floating point numbers in computers. These imprecisions show up everywhere a hard yes/no decision about a floating point number is made. In order to resolve the problem, you can add/subtract a small number to find an answer that is correct up to a certain accuracy.

You may find functions like these useful:

``````#define ACC 1e-7

double floorAcc( double x ) { return floor(x + ACC);}
double ceilAcc( double x ) { return ceil(x - ACC); }
double isLessThanAcc( double x, double y ) { return (x + ACC) < y; }
double isEqualAcc( double x, double y ) { return (x + ACC) > y && (x - ACC) < y; }
``````

Of course, these work only in a limited number range. When working with very small or very large numbers, you need to pick another value for ACC.

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``````double e = 3.0;