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I was reading the section on C portability in the book C Traps and Pitfalls by Andrew Koening..

On an integer divison

q = a/b;
r = a%b;

If a is a negative number, apparently the reminder r can be a negative or positive number, while satisfying the property

q * b + r == a

Normally I would expect r to be negative if dividend a is negative. And that is what I see in a intel machine with gcc. I am just curious have you ever seen a machine that would return a positive reminder when the dividend is a negative number ?

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Because of this problem, The coding standard MISRA-C has a rule (3.3) that states that you must be aware and document how the reminder behaves on a specific implementation. MISRA-C is heavily influenced by Koenig, so if you try to implement all advises in that book, you should consider taking a closer look at MISRA-C. –  Lundin Apr 5 '12 at 6:47

1 Answer 1

up vote 8 down vote accepted

C99 formalized the remainder as having the same sign as the dividend. Prior to C99 (C89 and K&R), it could have gone either way as both results meet the technical requirements. There are indeed compilers out there non-conforming to the C99 spec in this matter, though I don't know of any off the top of my head.

In particular, section 6.5.5 (Multiplicative operators) states:

¶5 The result of the / operator is the quotient from the division of the first operand by the second; the result of the % operator is the remainder. In both operations, if the value of the second operand is zero, the behavior is undefined.

¶6 When integers are divided, the result of the / operator is the algebraic quotient with any fractional part discarded.87) If the quotient a/b is representable, the expression (a/b)*b + a%b shall equal a.

87) This is often called "truncation toward zero".

With this new definition, the remainder is basically defined as what you'd expect it to be mathematically speaking.

EDIT

To address a question in the comments, the C99 spec also specifies (footnote 240) that if the remainder is zero, on systems where zero is not signed the sign of r will be the same as that of divisor, x.

‘‘When y ≠ 0, the remainder r = x REM y is defined regardless of the rounding mode by the mathematical relation r = x − ny, where n is the integer nearest the exact value of x/y; whenever | n − x/y | = 1/2, then n is even. Thus, the remainder is always exact. If r = 0, its sign shall be that of x.’’ This definition is applicable for all implementations.

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Wow... Yet another thing that simply can not be used in C89. –  orlp Apr 5 '12 at 6:22
    
@Mahmoud interesting maybe i'm just being picky but would 0 be considered a negative number ex : -4%2 :) –  keety Apr 5 '12 at 6:23
    
@keety: In an implementation without signed zeros that would always be simply zero, in an implementation with signed zeroes it depends. In C89 it could be +0 or -0, but in C99 only -0. I think. –  orlp Apr 5 '12 at 6:25
    
@nightcracker see my revised post. –  Mahmoud Al-Qudsi Apr 5 '12 at 6:29
1  
@Mahmoud, Thanks.. but the quote from Section 6.5.5 doesn't say anything about the sign. From this how did you conclude that remainder will be signed when dividend is signed ? May be the C89 had different wordings and your conclusion is based on how it has been changed in C99 ? –  Santhosh Apr 5 '12 at 6:47

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