164

What exactly is the difference between mod and rem in Haskell?

Both seems to give the same results

*Main> mod 2 3
2
*Main> rem 2 3
2
*Main> mod 10 5
0
*Main> rem 10 5
0
*Main> mod 1 0
*** Exception: divide by zero
*Main> rem 1 0
*** Exception: divide by zero
*Main> mod 1 (-1)
0
*Main> rem 1 (-1)
0
4
  • 3
    Don't know Haskell, but it's likely these are the same operation. modulus == remainder. May 4, 2011 at 23:49
  • To be fair, it wasn't the same question. The other question assumed understanding of the answer to this question.
    – Dan Burton
    May 5, 2011 at 3:40
  • @Dan Reading that question, because of another question I had (stackoverflow.com/questions/5892188/…), I realized the same :/ May 5, 2011 at 3:47
  • 3
    it's the same difference as between div and quot
    – newacct
    Feb 4, 2013 at 10:49

7 Answers 7

214

They're not the same when the second argument is negative:

2 `mod` (-3)  ==  -1
2 `rem` (-3)  ==  2
4
  • 23
    I had the same question about rem and mod in Clojure, and this was the answer.
    – noahlz
    Jul 11, 2012 at 15:29
  • 12
    Nor are they the same when the first argument is negative. See stackoverflow.com/a/8111203/1535283 and stackoverflow.com/a/339823/1535283 for some more info about these tricky operations. Apr 10, 2013 at 9:22
  • 4
    Also from stackoverflow.com/a/6964760/205521 it seems like rem is fastest. Sep 28, 2014 at 10:53
  • 25
    Though this answer is correct, an answer claiming no more than "not the same" to a question "what is the difference" is a very bad one. I would welcome it if you could expand on "how" they are different and some usecases probably.
    – poitroae
    Jan 13, 2015 at 10:35
81

Yes, those functions act differently. As defined in the official documentation:

quot is integer division truncated toward zero

rem is integer remainder, satisfying:

(x `quot` y)*y + (x `rem` y) == x

div is integer division truncated toward negative infinity

mod is integer modulus, satisfying:

(x `div` y)*y + (x `mod` y) == x

You can really notice the difference when you use a negative number as second parameter and the result is not zero:

5 `mod` 3 == 2
5 `rem` 3 == 2

5 `mod` (-3) == -1
5 `rem` (-3) == 2

(-5) `mod` 3 == 1
(-5) `rem` 3 == -2

(-5) `mod` (-3) == -2
(-5) `rem` (-3) == -2

 

3
  • Your last four examples are probably not what you mean, since mod and rem associate more strongly than (-). I've edited your comment since I can't seem to put multi line stuff in this comment. Apr 13, 2015 at 9:16
  • 1
    @ErikHesselink: you introduced an error with your edit. (-5) `mod` 3 == 1
    – Cheng Sun
    Apr 19, 2016 at 16:37
  • @ChengSun Thanks, I've fixed it. Should be live after review. Apr 21, 2016 at 19:31
23

Practically speaking:

If you know both operands are positive, you should usually use quot, rem, or quotRem for efficiency.

If you don't know both operands are positive, you have to think about what you want the results to look like. You probably don't want quotRem, but you might not want divMod either. The (x `div` y)*y + (x `mod` y) == x law is a very good one, but rounding division toward negative infinity (Knuth style division) is often less useful and less efficient than ensuring that 0 <= x `mod` y < y (Euclidean division).

9

In case you only want to test for divisibility, you should always use rem.

Essentially x `mod` y == 0 is equivalent to x `rem` y == 0, but rem is faster than mod.

2
3
quotRem' a b = (q, r) where
    q = truncate $ (fromIntegral a / fromIntegral b :: Rational)
    r = a - b * q
divMod'  a b = (q, r) where
    q = floor    $ (fromIntegral a / fromIntegral b :: Rational)
    r = a - b * q

ex:

(-3) / 2 = -1.5
(-3) `quot` 2 = truncate (-1.5) = -1
(-3) `div`  2 = floor    (-1.5) = -2
(-3) `rem` 2 = -3 - 2 * (-1) = -1
(-3) `mod` 2 = -3 - 2 * (-2) = 1

3 / (-2) = -1.5
3 `quot` (-2) = truncate (-1.5) = -1
3 `div`  (-2) = floor    (-1.5) = -2
3 `rem` (-2) = 3 - (-2) * (-1) = 1
3 `mod` (-2) = 3 - (-2) * (-2) = -1
1
  • While this code may solve the question, including an explanation of how and why this solves the problem would really help to improve the quality of your post, and probably result in more up-votes. Remember that you are answering the question for readers in the future, not just the person asking now. Please edit your answer to add explanations and give an indication of what limitations and assumptions apply. Sep 15, 2021 at 12:08
1

This is a graph of haskell's mod and rem over [-20,20] integer range:

enter image description here

1
  • 1
    That's useful, but the captions are rather confusing and the colours hard to keep apart. Three individual plots and a line of actual Haskell code for each would be much better to understand. Jan 16, 2023 at 14:12
0

I cannot upload an image to explain it. But you can draw it yourself.

suppose :

X = mod(a,b)  ; Y = rem(a,b)

---(-(n+1)b)---a---(-nb)---.......--(-2b)-----(-b)-----0-----b--->

X = a - [ -(n+1)b ]  

so that X is always positive

Y = a - [ -nb ]  

in standard documentation:

mod  -->  a - b.*floor(a./b).......floor is closer to negative infinity

rem  -->  a - b.*fix(a./b).........fix is closer to 0

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