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Suppose a and b are both of type int, and b is nonzero. Consider the result of performing a/b in the following cases:

  1. a and b are both nonnegative.
  2. a and b are both negative.
  3. Exactly one of them is negative.

In Case 1 the result is rounded down to the nearest integer. But what does the standard say about Cases 2 and 3? An old draft I found floating on the Internet indicates that it is implementation dependent (yes, even case 2) but the committee is leaning toward making it always 'round toward zero.' Does anyone know what the (latest) standard says? Please answer only based on the standard, not what makes sense, or what particular compilers do.

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Incredible research opportunity given the 1200 page nature of the standard. I'm going to give it a quick grep and give up :) –  Stefan Mai Nov 26 '08 at 6:14

3 Answers 3

up vote 21 down vote accepted

According to the May 2008 revision,

You're right:

The binary / operator yields the quotient, and the binary % operator yields the remainder from the division of the first expression by the second. If the second operand of / or % is zero the behavior is undefined; otherwise (a/b)*b + a%b is equal to a. If both operands are nonnegative then the remainder is nonnegative; if not, the sign of the remainder is implementation-defined75).

Note 75 says:

According to work underway toward the revision of ISO C, the preferred algorithm for integer division follows the rules defined in the ISO Fortran standard, ISO/IEC 1539:1991, in which the quotient is always rounded toward zero.

Chances are that C++ will lag C in this respect. As it stands, it's undefined but they have an eye towards changing it.

I work in the same department as Stroustrup and with a member of the committee. Things take AGES to get accomplished, and its endlessly political. If it seems silly, it probably is.

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The quoted statement is old. It dates back to the C++98 standard and refers to the C99 revision. C99 specifies rounding toward zero and C++11 follows suit. –  Jed May 29 '12 at 14:30

As an update to the other answers:

The last draft of C++11, n3242 which is for most practical purposes identical to the actual C++11 standard, says this in 5.6 point 4 (page 118):

For integral operands the / operator yields the algebraic quotient with any fractional part discarded; (see note 80)

Note 80 states (note that notes are non-normative):

80) This is often called truncation towards zero.

Point 4 goes on to state:

if the quotient a/b is representable in the type of the result, (a/b)*b + a%b is equal to a.

which can be shown to require the sign of a%b to be the same as the sign of a (when not zero).

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Just a comment. The current working draft for the C++ standard indeed corrects the "implementation-defined" issue and asks for truncation towards zero. Here is the committee's webpage, and here is the draft. The issue is at page 112.

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