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up vote 16 down vote favorite
5

i.e. -

int result;

result = 125/100;

or 

result = 43/100;

Will result always be the floor of the division? What is the defined bahavior?

If you could point me in the right direction, i would appreciate it.

Thank You.

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4 Answers

up vote 14 down vote accepted

Will result always be the floor of the division? What is the defined bahavior?

Yes, integer quotient of the two operands.

6.5.5 Multiplicative operators

6 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.

and the corresponding footnote:

88) This is often called ‘‘truncation toward zero’’.

Of course two points to note are:

3 The usual arithmetic conversions are performed on the operands.

and:

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.

[Note: Emphasis mine]

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1  
...unless, of course, you're dividing a negative number by a positive (or v.v.), in which case it'll be the ceiling. – Will A Aug 30 '10 at 17:45
6  
It is neither flooring nor ceiling, it is truncation of fractional part, it is conceptually different! – Lorenzo Aug 30 '10 at 17:48
8  
@Will A: No. It is defined as truncation towards zero. Calling it anything else will just add to confusion so please refrain from doing so. – Loki Astari Aug 30 '10 at 17:49
2  
At least from a mathematical perspective, truncation towards zero is equivalent to "if > 0 then floor else ceiling." I think just calling it truncation is simpler than calling it floor/ceiling, but either is valid. Regardless, Will A's point is valid: Dirkgently's answer is partially incorrect, since he stated that the OP is right about the result being the floor of the division. – Brian Aug 30 '10 at 18:17
3  
@Philip Potter: I don't think it was defined in C89, and it isn't in the 1998 C++ standard. In those, of course (a / b) * b + a % b == a had to be satisfied, and the absolute value of a % b had to be less than a, but whether a % b was negative for negative a or b was not specified. – David Thornley Aug 30 '10 at 21:28
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up vote 5 down vote

Yes, the result is always floor of the division for positive integers. It will round towards smallest absolute value.
-5 / 2 = -2
5 / 2 = 2

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8  
Truncation, not floor. – dan04 Aug 30 '10 at 17:44
2  
@dan04: yep floor would be valid only for positive integers :) – Leonid Aug 30 '10 at 17:46
up vote 4 down vote

Dirkgently gives an excellent description of integer division in C99, but you should also know that in C89 integer division with a negative operand has an implementation-defined direction.

From the ANSI C draft (3.3.5):

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.

So watch out with negative numbers when you are stuck with a C89 compiler.

It's a fun fact that C99 chose truncation towards zero because that was how FORTRAN did it. See this message on comp.std.c.

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up vote 2 down vote

Where the result is negative, C truncates towards 0 rather than flooring - I learnt this reading about why Python integer division always floors here: Why Python's Integer Division Floors

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I agree with the comment wondering whether having (neg % pos) go negative is ever useful? On a related note, I wonder if the required arithmetically-incorrect behavior in some cases of "unsignedvar > signedvar" is ever useful? I can understand the rationale for not requiring always-correct behavior; I see no rationale for requiring wrong behavior. – supercat Aug 30 '10 at 18:34
+1 for an excellent reference on why flooring is the correct behavior for integer division (contrary to C's definition, which is broken and almost-never useful). – R.. Aug 30 '10 at 19:19

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