# Integral operators quot vs. div

Type class Integral has two operations `quot` and `div`, yet in the Haskell 2010 Language Report it is not specified what they're supposed to do. Assuming that `div` is integral division, what does `quot` differently, or what is the purpose of `quot`? When do you use one, and when the other?

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This seems like a promising link: cdsmith.wordpress.com/2007/06/02/… –  Stuart Golodetz Nov 13 '11 at 11:19

To quote section 6.4.2 from the Haskell report:

The quot, rem, div, and mod class methods satisfy these laws if y is non-zero:

``````(x ‘quot‘ y)⋆y + (x ‘rem‘ y) == x
(x ‘div‘  y)⋆y + (x ‘mod‘ y) == x
``````

‘quot‘ is integer division truncated toward zero, while the result of ‘div‘ is truncated toward negative infinity.

The `div` function is often the more natural one to use, whereas the `quot` function corresponds to the machine instruction on modern machines, so it's somewhat more efficient.

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+1 for the discussion of when you might prefer one over the other –  Stuart Golodetz Nov 13 '11 at 11:35
This is clearly the better answer... –  FUZxxl Nov 13 '11 at 11:46
or, equivalently, the result of `mod` has the same sign as the divisor, while the result of `rem` has the same sign as the dividend –  newacct Nov 13 '11 at 12:12
Thanks for the answer, especially for mentioning the paragraph in the HR. I was looking only in chapter 9. –  Ingo Nov 13 '11 at 16:05

The two behave differently when dealing with negative numbers. Consider:

``````Hugs> (-20) `divMod` 3
(-7,1)
Hugs> (-20) `quotRem` 3
(-6,-2)
``````

Here, `-7 * 3 + 1 = -20` and `-6 * 3 + (-2) = -20`, but the two ways give you different answers.

The definition for `quot` is "integer division truncated toward zero", whereas the definition for `div` is "integer division truncated toward negative infinity".

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You know, there is also `divMod` and `quotRem`... –  FUZxxl Nov 13 '11 at 11:45
Your expressions do not compile on my version of GHC (precedence issue). Perhaps it is different in Hugs; however, it is highly deceptive and not doing what it seems: `((-20) `div` (-3), (-20) `mod` (-3))` evaluates to `(6,-2)`, which is not what your code is showing. The only way to have gotten what you got is if it was somehow parsed as `(-(20 `div` (-3)), -(20 `mod` (-3)))`, which does produce `(7,1)`. However, if this is the case, then the extra negation simply negates the results, and is otherwise irrelevant and confuses the issue. –  newacct Nov 13 '11 at 11:53
@newacct: Good spot, I've corrected the example. It looks like GHC and Hugs do different things here, as a side issue. –  Stuart Golodetz Nov 13 '11 at 14:00
@FUZxxl: True enough - fixed. It's been a few years since I did much Haskell programming. –  Stuart Golodetz Nov 13 '11 at 14:02