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Why is X % 0 an invalid expression?

I always thought X % 0 should equal X. Since you can't divide by zero, shouldn't the answer naturally be the remainder, X (everything left over)?

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I would like to know who gave him a -1 and the reason. I gave him a +1 because the question was correct, correctly written, and interesting. –  xanatos Sep 10 '11 at 7:09
@xanatos Me too. I gave the other +1 to balance the other -1... I suspect it's highly duplicated, but then it should have been voted to be closed. –  user166390 Sep 10 '11 at 7:42
@pst: possible duplicate of Why is this a floating point exception? but it wasn't exactly easy to find. –  mu is too short Sep 10 '11 at 8:15
@Mu the response are quite different. Here Petar explains how % is mathematically defined, there they explain why the error is that instead of something more clear. –  xanatos Sep 10 '11 at 9:36
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6 Answers

up vote 13 down vote accepted

The C++ Standard(2003) says in §5.6/4,

[...] If the second operand of / or % is zero the behavior is undefined; [...]

That is, following expressions invoke undefined-behavior(UB):

X / 0; //UB
X % 0; //UB

Note also that -5 % 2 is NOT equal to -(5 % 2) (as Petar seems to suggest in his comment to his answer). It's implementation-defined. The spec says (§5.6/4),

[...] If both operands are nonnegative then the remainder is nonnegative; if not, the sign of the remainder is implementation-defined.

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I'd probably lean towards "partly implementation defined", the sign is implementation defined but wouldn't the value be fixed once the sign is chosen? But that's just nit picking. –  mu is too short Sep 10 '11 at 7:51
Is it possible to crash program using mod zero or just result is unknown ? –  Zaffy Oct 2 '12 at 11:29
@Zaffy: Since mod zero invokes undefined behavior (UB), so yes, it is possible to crash your program using mod zero, but it is not guranteed to crash your program. Program crash is just one out of the million possibilities of UB. –  Nawaz Oct 2 '12 at 11:46
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X % Y gives a result in the integer [ 0, Y ) range. X % 0 would have to give a result greater or equal to zero, and less than zero.

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That's not true, AFAIK the sign of x % y is implementation defined if x < 0. -5 % 2 happens to be -1 on my system. –  mu is too short Sep 10 '11 at 7:07
True you, the quirks of mod. But alas it is enough to illustrate why one cannot mod by zero. –  K-ballo Sep 10 '11 at 7:18
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X % D is by definition a number 0 <= R < D, such that there exists Q so that

X = D*Q + R

So if D = 0, no such number can exists (because 0 <= R < 0)

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That's not true, AFAIK the sign of x % y is implementation defined if x < 0. -5 % 2 happens to be -1 on my system. –  mu is too short Sep 10 '11 at 7:08
X = D*Q + R works for any Q when D = 0, with X = R as the OP wanted. It's the 0 <= R < 0 that's impossible to satisfy. Your answer seems to imply that it's the other way round, though I might just be reading it wrong. –  hammar Sep 10 '11 at 7:11
-5 % 2 = -(5 % 2) in fact. –  Petar Ivanov Sep 10 '11 at 7:12
@Petar: No. -5 % 2 is NOT -(5 % 2) in fact. It's implementation-defined. The spec says, If both operands are nonnegative then the remainder is nonnegative; if not, the sign of the remainder is implementation-defined –  Nawaz Sep 10 '11 at 7:38
The above is true for mathematics modulus. But CPUs and C compiler implementations often return R that have the same sign as X, so -5 % 2 = -(5 % 2) is true. OTOH Python will return the "true" mathematics modulus so the above wouldn't be true anymore stackoverflow.com/questions/1907565/… –  Lưu Vĩnh Phúc Oct 29 '13 at 1:11
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May wanna see this.

As division by 0 is undefined, mod, which relies on division, is also undefined.

This represents division; it's made up of the integral part and remainder:

(X / D) = floor(X / D) + (X % D) / D

Rearranged, you get:

(X % D) / D = (X / D) - floor(X / D)
(X % D) = D * ((X / D) - floor(X / D))

Substituting 0 for D:

(X % D) = D * ((X / 0) - floor(X / 0))

Since division by 0 is undefined:

(X % D) = D * (undefined - floor(undefined))
(X % D) = D * (undefined)
(X % D) = undefined
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Why can't you just substitute 0 for the outer D in the second equation making it (X % 0) = 0 * (w/e) and just call it zero? –  YatharthROCK Nov 29 '13 at 5:52
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I think because to get the remainder of X % 0 you need to first calculate X / 0 which yields infinity, and trying to calculate the remainder of infinity is not really possible.

However, the best solution in line with your thinking would be to do something like this

REMAIN = Y ? X % Y : X
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Another way that might be conceptually easy to understand the issue:

Ignoring for the moment the issue of argument sign, a % b could easily be re-written as a - ((a / b) * b). The expression a / b is undefined if b is zero, so in that case the overall expression must be too.

In the end, modulus is effectively a divisive operation, so if a / b is undefined, it's not unreasonable to expect a % b to be as well.

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