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I have a quick question about Haskell. I've been following Learn You a Haskell, and am just a bit confused as to the execution order / logic of the following snippet, used to calculate the side lengths of a triangle, when all sides are equal to or less than 10 and the total perimeter of the triangle is 24:

[(a,b,c) | c <- [1..10], b <- [1..c], a <- [1..b], a^2 + b^2 == c^2, a+b+c==24]

The part that is confusing to me is the upper expansion bound on the b and a binding. From what I gather, the ..c and ..b are used to remove additional permutations (combinations?) of the same set of triangle sides.

When I run it with the ..c/b, I get the answer:


When I don't have the ..c/b:

[(a,b,c) | c <- [1..10], b <- [1..10], a <- [1..10], a^2 + b^2 == c^2, a+b+c==24]

as I didn't when I initially typed it in, I got:


Which is obviously representative of the same triangle, save for the a and b values have been swapped.

So, can someone walk me through the logic / execution / evaluation of what's going on here?

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3 Answers 3

up vote 7 down vote accepted

The original version considers all triplets (a,b,c) where c is a number between 1 and 10, b is a number between 1 and c and a is a number between 1 and b. (6,8,10) fits that criteria, (8,6,10) doesn't (because here a is 8 and b is 6, so a isn't between 0 and 6).

In your version you consider all triplets (a,b,c) where a, b and c are between 1 and 10. You make no restrictions on how a, b and c relate to each other, so (8, 6, 10) is not excluded since all numbers in it are indeed between 1 and 10.

If you think of it in terms of imperative for-loops, your version does this:

for c from 1 to 10:
  for b from 1 to 10:
    for a from 1 to 10:
      if a^2 + b^2 == c^2 and a+b+c==24:
        add (a,b,c) to the result

while the original version does this:

for c from 1 to 10:
  for b from 1 to c:
    for c from 1 to b:
      if a^2 + b^2 == c^2 and a+b+c==24:
        add (a,b,c) to the result
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Gotcha, thanks! –  Josh Jun 8 '12 at 14:34

It's not about execution order. In the first example you don't see the degenerate solution


since a <= b <= c. In the second case a > b is included in the list comprehension.

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List comprehensions can be written in terms of other functions like concatMap, which clarifies the scope of the bindings. As a one-liner, your example becomes something like this:

concatMap (\c -> concatMap (\b -> concatMap (\a -> if a^2 + b^2 == c^2 then (if a+b+c == 24 then [(a,b,c)] else []) else []) (enumFromTo 1 b)) (enumFromTo 1 c)) (enumFromTo 1 10)

Yeah, that looks ugly, but it's similar to what Haskell desugars your comprehensions into. The scope of each of the variables a, b and c, should be obvious from this.

Or alternatively, this can be written with the List monad:

import Control.Monad

example = do c <- [1..10]
             b <- [1..c]
             a <- [1..b]
             guard (a^2 + b^2 == c^2)
             guard (a+b+c == 24)
             return (a,b,c)

This is actually very similar as the one-liner above, given the definition of the List Monad and guard:

instance Monad [] where
    return x = [x]
    xs >>= f = concatMap f xs

instance MonadPlus [] where
    mzero = []
    mconcat = (++)

guard bool = if bool then return () else mzero
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While I can't say I followed all of that, I can say thank you very much, and hopefully, in a few weeks I can understand it clearly. Thanks! –  Josh Jun 8 '12 at 18:02
Did you at least follow the one-liner? concatMap f xs is like map f xs except that f produces a list of items and concatMap appends them: map (\n -> [1..n]) [1..3] is [[1],[1,2],[1,2,3]], concatMap (\n -> [1..n]) [1..3] is [1,1,2,1,2,3]. Basically, the one-liner is using nested concatMap over [1..10], [1..c] and [1..b] to generate the triples, returning [] to reject a triple and [(a,b,c)] to accept a triple. The final result concatenates all the singleton [(a,b,c)] lists for good triples and empty lists for bad ones. –  Luis Casillas Jun 8 '12 at 18:15

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