# Why does using modulo on non-integer values lose floating-point precision? [duplicate]

I am wondering why I am losing precision when using this code :

``````double x = 12.0456;    // or float : same result
System.out.println(x); // outputs 12.0456 obviously
x %= 1;                // should now be equal to 0.0456 right?
System.out.println(x); // outputs 0.04560000000000031 or 0.045599937 when using float
``````

12.0456 modulo 1 should equal 0.0456 right? But it shows a slightly different value, why do I keep losing precision? I mean the code should substract exactly 1 until the value is less than 1.

However, I found out a way to get the correct value :

``````double x = 12.0456;
System.out.println(x);
x %= 1;
System.out.println((float)x); //outputs 0.0456 exactly
``````

This way works perfectly, but do you guys have a better solution?

I don't care which floating point type I should use, I just want to find a clean way to get the correct value! I don't like having to convert the value to a double and then to a float.

-
You need to read up on the use of floating point numbers in Java. Your result is both expected and correct. –  BeRecursive Feb 9 at 22:23
Doubles are, in practice, only precise up to 6 to 8 significant figures. –  Code-Guru Feb 9 at 22:27
BeRecursive, do you know a method to get the result I want while being expected and correct? –  dominicbri7 Feb 9 at 22:27
@dominicbri7 `float`s and `double`s simply can't represent any arbitrary real number. If you need to maintain a known precision, use `BigDecimals`, but even those are only arbitrary-precision, not infinite-precision. (This might not be practically important.) –  millimoose Feb 9 at 22:49
@Code-Guru Doubles are 'in practice' accurate to 14-15 decimal digits: less so if there are fractions, and in a way that can't be reduced to just a simple number of decimal places. It depends on the actual value. –  EJP Feb 10 at 11:20

## marked as duplicate by Jan Dvorak, Code-Guru, BeRecursive, thkala, NeoliskFeb 10 at 2:20

To add to your answer, take the fraction `1/3` as an example. It is impossible to represent this precisely with a finite number of decimal places. Similar issues arise with binary representations of floating point numbers. –  Code-Guru Feb 10 at 20:08