I am curious about these languages (Java, C ...) which ignore mathematical definition of modulus operation.
What is the point of returning negative values in a module operation (that, by definition, should allways return a positive number)?
I doubt that the remainder operator was deliberately designed to have those semantics, which I agree aren't very useful. (Would you ever write a calendar program that shows the weekdays Sunday, AntiSaturday, AntiFriday, ..., AntiMonday for dates before the epoch?) Rather, negative remainders are a side effect of the way integer division is defined.
If So, the real question is: Why do C++, Java, C#, etc. use truncating integer division?Because that's the way that C does it. Why does C use truncating division?Originally, C didn't specify how In practice, every significant C implementation used truncating division, so in 1999 these semantics were formally made a part of the C standard. Why does hardware use truncating division?Because it's easier (=cheaper) to implement in terms of unsigned division. You just calculate Floored division has the additional step of subtracting 1 from the quotient if the remainder is nonzero. 


In Java at least, it's not a modulus operator  it's a remainder operator. I believe the reason for it being chosen that way is to make this relation work (from the JLS):
That equality relation seems like a reasonable thing to use as part of the definition. If you take division truncating towards zero to be a given, that leaves you with a negative remainder. 


In neither of the C or Java standards is It is defined to return negative numbers for negative dividends so that the relation 


Most of them are not defined to return a modulus. What they're defined to return is a remainder, for which positive and negative values are equally reasonable. In C or C++ it's pretty reasonable to say it should produce whatever the underlying hardware produces. That excuse/reason doesn't work nearly as well for Java though. Also note that in C89/90 and C++98/03, the remainder could be either positive or negative, as long as the results from remainder and division worked together ( 


From Wikipedia (my emphasis):



A pragmatic reason to return a negative value for modulus would be that the hardware instruction implementing modulus does so. So standards leave that ill defined, so that compilers can do whatever is simpler to them. 


(a/b)*b + a%b == a
, and that division truncates towards zero. – Oliver Charlesworth Nov 29 '11 at 22:48