# How do I check whether a number is divisible by 2*M_PI in c++?

This is what I've done for checking the divisibility of a number by 2*M_PI. "w" is a constant that's 2/3 and t is the variable that varies by t += dt, where dt is 0.1. I'm trying to use the mod operator, %, to see if something is divisible. But its not working.

bool divisible; real w = 2/3; real t;

``````if((w*t) % 2*M_PI == 0)
{
divisible = true;
}

else
{
divisible = false;
}
``````

This is the error that I get, "invalid operands of types ‘real’ and ‘int’ to binary ‘operator%’"

What does this mean? How do I get this to work? So do I need to make w and t an int? They can't be because w is 2/3, and t increments from 0 by 0.1. Can someone please help me?

-
Just check `cos(w*t) == 0` ;) –  MSalters Dec 10 '12 at 11:00

Use `std::fmod` instead, it operates on doubles rather than the integral `%` operator.

-
And look out for rounding errors, i.e. don't compare using `==` but see if you are within an acceptable epsilon from the desired value. –  Waldheinz May 30 '11 at 10:09
I'm getting compiling errors, w is a double, t is a double, and M_PI a floating point I think? Should, fmod((w*t)/(2*M_PI)) work? –  QEntanglement May 30 '11 at 10:21
@QEntanglement, did you look at the signature for the function? I left out a link on purpose (i.e. for you to do a little lateral thinking! ;) ) –  Nim May 30 '11 at 10:23
I'm a beginner. What do you mean signature for the function? I saw that "modf" splits the integer part from the float parts. I don't know how I will use this. –  QEntanglement May 30 '11 at 10:26
It doesn't matter whether you are or not, I hinted which function you should look at - did you for example search for this function? And if you had, you would have seen what the signature is (i.e. what parameters it accepts, and what it returns etc.) This will help you greatly when you actually come to use it. And as I said below, `modf` is not a modulo operation, it simply breaks the passed in value to integral and fractional quantities. –  Nim May 30 '11 at 10:29

Why would you want to know if a floating-point number is exactly divisible by another one?

Floating-point arithmetics should not be used for "precise" calculations. The outcome of every operation is defined strictly, but it differs from the mathematical meaning of the same operation. In particular:

``````double a = 1e20;
double b = 1e-20;

double c = (a + b) - a;
``````

You might expect that `c` will be equal to `b`, but in fact it won't!

You should only compare floating-point numbers with some window. Means - does the specific floating-point value lie within some finite-length range.

-
`modf` is not a modulo operation, it simply breaks the double into integral and fractional parts. –  Nim May 30 '11 at 10:11