C89, not totally (§3.3.5/6). It can be either -5 or 5, because -5 / 10 can return 0 or -1 (`%`

is defined in terms of a linear equation involving `/`

, `*`

and `+`

):

When integers are divided and the division is inexact, if both operands are positive the result of the `/`

operator is the largest integer less than the algebraic quotient and the result of the `%`

operator is positive. **If either operand is negative**, whether the result of the `/`

operator is the largest integer less than the algebraic quotient or the smallest integer greater than the algebraic quotient is **implementation-defined**, as is the sign of the result of the `%`

operator. If the quotient `a/b`

is representable, the expression `(a/b)*b + a%b`

shall equal `a`

.

C99, yes (§6.5.5/6), the result must be -5:

When integers are divided, the result of the `/`

operator is the algebraic quotient with any fractional part discarded.^{88)} If the quotient `a/b`

is representable, the expression `(a/b)*b + a%b`

shall equal `a`

.

_{88) This is often called "truncation toward zero".}

Similarly, in C++98 the result is implementation defined (§5.6/4), following C89's definition, but mentions that the round-towards-zero rule is preferred,

... If both operands are nonnegative then the remainder is nonnegative; if not, the sign of the remainder is implementation-defined^{74)}.

_{74) 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.}

and indeed it becomes the standard rule in C++0x (§5.6/4):

... For integral operands the `/`

operator yields the algebraic quotient with any fractional part discarded;^{82} ...

_{82) This is often called truncation towards zero.}