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