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Consider integer division

a = bq + r

where a, b, q, r are respectively: dividend, divisor, quotient, and remainder. Particularly when b = 0, there is no unique b that satisfies the equation for a given a, and hence it makes sense that the quotient q should be undefined in such case.

However, there is indeed a unique r in such case, namely, r = a. Under the premise that the quotient and the remainder are always defined together, it would follow that r is not defined whenever q is undefined, but in programming, we often want to use the remainder operation % irrespective of division /. I actually came across a situation where I want if b == 0 then a else a % b end.

Is there/Was there an operator in any programming language such that it is the same as % but returns the dividend instead of a zero division error when the divisor is 0?

Is there any reason that most (or all) programing languages return a zero division error for % 0?

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You know, I was wondering earlier on today if Chuck Norris could take the logarithm of zero... –  Andrew Grimm Apr 8 '11 at 15:52
Interesting question. Scheme (or guile, anyway) has both a remainder and a modulo function (they differ when the args are negative, btw). Both of them overflow on 0. –  drysdam Apr 8 '11 at 15:53
@Andrew Grimm, nice one :) –  Stargazer712 Apr 8 '11 at 15:57
"Divident" should be, "dividend". Also, I think you mean to have the divisor be 0, not the quotient. The quotient is the result of division, and is zero whenever the dividend is less than the divisior (for unsigned numbers). In this case, the remainder will be equal to the dividend. When the divisor is zero, the quotient is undefined, and it is not clear that multiplying an undefined number by zero is zero, so the remainder should also be undefined. –  pat Apr 8 '11 at 15:59
Now you need to say that there's no unique 'q' that satisfies the equation. –  pat Apr 8 '11 at 16:05

2 Answers 2

up vote 2 down vote accepted

Mathematically, the remainder is between 0 and b-1, where b is the divisor. Therefore, when b = 0, r is undefined since it has to be >= 0.

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Ah yes, that's the crucial missing statement, 0 <= r < b. Without a constraint on r, there would be an infinite number of quotients. –  pat Apr 8 '11 at 16:04
@user677480, @pat Thanks for the answer. I was my carelessness to have forgotten that condition. Now it's clear. –  sawa Apr 8 '11 at 16:26

Is there any programming language that returns the dividend? Not sure. I've never come across any.

Is there a reason that most don't return the dividend? Yes. Modulus is a common operation in CS because it is a byproduct of integer division on a CPU. Most (if not all) assembly languages have a modulus operation, and this operation uses the exact same hardware as the division operation. Thus if you can't divide by zero in hardware, then you can't do modulus zero in hardware.

Does this mean that you can't have a language that supports this? Not really, but you would have to add an if-statement to an operation that is usually a single instruction. This would probably result in a pretty heavy performance hit, so few (if any) do it.

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Thanks for the answer. The problem of having it implemented became clear enough. –  sawa Apr 8 '11 at 16:25
The modulus/remainder operation is most often used for checking if some number x is a multiple of some number y. What is of interest in such cases is not the exact value returned, but whether or not it is zero. Zero is a multiple of zero (the only multiple of zero) and applying a definition of division such that a/0 yields a quotient of zero and a remainder of a would let the normal method of testing "x is a multiple of y" work smoothly in all cases including zero. –  supercat Nov 13 '13 at 22:10
@supercat, nobody is trying to smooth over division by zero. If you need to handle division by zero in a special way, use an if statement. Modulus operates the way it does because it is efficient. If you need it to do more, then there are plenty of programming constructs that will get you there. –  Stargazer712 Nov 14 '13 at 0:25
@Stargazer712: I understand that many hardware vendors have decided that it was better to have divide-by-zero trap than simply do nothing but set a flag, and as a consequence of this allowing any sort of predictable behavior in an integer-divide-by-zero scenario would be more expensive than leaving it UB (the relative cost would probably be less than that of requiring that even when y is constant, x/y must to truncate toward zero and x%y must match the sign of x, but there would be a cost). My point was simply that x mod 0 is not a meaningless concept, though if I were designing... –  supercat Nov 14 '13 at 16:08
...a programming language I'd probably limit mod-zero testing to an "is multiple of" operator. When testing if x is a multiple of some arbitrary y, the cost if a zero check could be made up for by not having to adjust the value of x%y if x is negative. –  supercat Nov 14 '13 at 16:11

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