# Comparison of one float variable to its contained value

``````#include<stdio.h>
int main()
{
float a,b;
a=4.375;
b=4.385;

if(a==4.375)
printf("YES\n");
else
printf("NO\n");

if(b==4.385)
printf("YES\n");
else
printf("NO\n");

return 0;
}
``````

``````YES
NO
``````

I always thought if i compare a float with double value. it will never match to it. unless value is pure integer. but here float "a" has 4.375 is exact in it but "b" doesn't

``````printf("%0.20f\n",a);
printf("%0.20f\n",b);

This prints :

4.37500000000000000000
4.38500022888183593750

but if i print

printf("%0.20f\n",4.475);

It prints 4.47499990463256835938
``````

How is this rounding effect is showing in some and not in others.

Can anyone explain this. how should "WE" judge when value in float variable will match to that contained in it and when it doesn't ?

-
0.375 = 3/8, Since 8=2^3, it isn't problem storing it in a binary variable –  gkovacs90 Jun 18 '13 at 10:09
possible duplicate of strange output in comparison of float with float literal –  devnull Jun 18 '13 at 10:27
no not duplicate.. i asked difference between both situations sir :) –  user2494601 Jun 18 '13 at 10:36

The conversion from decimal fraction to a binary fraction is precise only if the decimal fraction can be summed up by binary fractions like `0.5`, `0.25`, ..., etc.

0.375 = 0.25 + 0.125 = 2-2 + 2-3

So it can be represented exactly by using binary fractions.

Where as the number `0.385` can not be represented by using binary fractions precisely. So numbers like `0.5`, `0.25`, `0.125`, ..., etc. or a combination of these numbers can be represented exactly as floating point numbers. Others like 0.385 will give incorrect results when the comparison or equality operations are performed on them.

-
Thanks now i got it !! –  user2494601 Jun 18 '13 at 10:17
if precision digits are multiple of 25 then. matches else no ! –  user2494601 Jun 18 '13 at 10:18
This answer does not explain why `4.385` stored in `a` does not compare equal to a literal `4.385`. Both are, as this answer describes, approximated with powers of two. A good answer should state actual cause of the difference: The `float` object has less precision than the `double` literal, so they cannot approximate 4.385 equally well, and their values are different. –  Eric Postpischil Jun 18 '13 at 13:30
@MichaelSmith The power of five that it has to be a multiple of depends on the number of digits after the decimal point. A number with d digits after the decimal point is an integer multiple of 1/(10^d). It must also be an integer multiple of 1/(2^d) if the digits represent a multiple of 5^d. 0.375 has 3 digits after the decimal point, and 375 is 3*125, an integer multiple of 5^3. 0.425 is not exactly representable as a binary fraction because 425, although divisible by 25, is not divisible by 125. –  Patricia Shanahan Jun 18 '13 at 14:19