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Recently I discovered that C#'s operator "%" is applicable to double. Tried some things out, and after all came up with this test:

class Program
{
    static void test(double a, double b)
    {
        if (a % b != a - b * Math.Truncate(a / b))
        {
            Console.WriteLine(a + ", " + b);
        }
    }
    static void Main(string[] args)
    {
        test(2.5, 7);
        test(-6.7, -3);
        test(8.7, 4);
        //...
    }
}

Everything in this test works. Is a % b always equivalent to a - b*Math.Round(a/b)? If not, please explain to me how this operator really works.

EDIT: Answering to James L, I understand that this is a modulo operator and everything. I'm curious only about how it works with double, integers I understand.

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Did some more testing. As it turned out, a % b is not always equivalent to a - b*Math.Truncate(a/b). For example, it's not for 1.0 and 0.1. –  Sergey Nov 12 '11 at 17:53

3 Answers 3

up vote 3 down vote accepted

The modulus operator works on floating point values in the same way as it does for integers. So consider a simple example:

4.5 % 2.1

Now, 4.5/2.1 is approximately equal to 2.142857

So, the integer part of the division is 2. Subtract 2*2.1 from 4.5 and you have the remainer, 0.3.

Of course, this process is subject to floating point representability issues so beware – you may see unexpected results. For example, see this question asked here on Stack Overflow: Floating Point Arithmetic - Modulo Operator on Double Type


Is a % b always equivalent to a - b*Math.Round(a/b)?

No it is not. Here is a simple counter example:

static double f(double a, double b)
{
    return a - b * Math.Round(a / b);
}

static void Main(string[] args)
{
    Console.WriteLine(1.9 % 1.0);
    Console.WriteLine(f(1.9, 1.0));
    Console.ReadLine();
}

As to the precise details of how the modulus operator is specified you need to refer to the C# specification – earlNameless's answer gives you a link to that.

It is my understanding that a % b is essentially equivalent, modulo floating point precision, to a - b*Math.Truncate(a/b).

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So basically a % b is always equivalent to a - b*Math.Round(a/b)? –  Sergey Nov 12 '11 at 16:15
2  
No it is not. Replace Round with Trunc and you should be there, certainly for positive a and b. –  David Heffernan Nov 12 '11 at 16:17
    
Just to be sure, then a % b always equals a - b * Math.Truncate(a / b)? –  Sergey Nov 12 '11 at 16:24
2  
When a and b are positive that is certainly true. I suspect that it is true for all cases, but I'm not 100% certain. –  David Heffernan Nov 12 '11 at 16:26
    
And the downvote is because of what exactly? I want to get this right. –  David Heffernan Nov 12 '11 at 16:50

From C# Language Specifications page 200:

Floating-point remainder:

float operator %(float x, float y); 
double operator %(double x, double y); 

The following table lists the results of all possible combinations of nonzero finite values, zeros, infinities, and NaN’s. In the table, x and y are positive finite values. z is the result of x % y and is computed as x – n * y, rounded to the nearest representable value, where n is the largest integer that is less than or equal to x / y. This method of computing the remainder is analogous to that used for integer operands, but differs from the IEC 60559 definition (in which n is the integer closest to x / y).

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From the MSDN page :

The modulus operator (%) computes the remainder after dividing its first operand by its second. All numeric types have predefined modulus operators.

And

Note the round-off errors associated with the double type.

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