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`

?

`remainder`

and a`modulo`

function (they differ when the args are negative, btw). Both of them overflow on 0. – drysdam Apr 8 '11 at 15:53willbe equal to the dividend. When the divisor is zero, the quotient is undefined, and it is not clear that multiplying an undefined number by zeroiszero, so the remainder should also be undefined. – pat Apr 8 '11 at 15:59