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So I made these functions to swap the arguments of functions

swap1_3 f x y z = f z y x

toFront3 f x y z = f z x y

These functions work as follows

foo x y z = [x,y,z]
a = foo 1 2 3 -- returns [1,2,3]
b = swap1_3 foo 1 2 3 -- returns [3,2,1]
c = toFront3 foo 1 2 3 -- returns [3,1,2]

Now, what I don't understand are the type signatures of these functions.

The type signatures are as follows

swap1_3 :: (a -> b -> c -> d) -> c -> b -> a -> d

toFront3 :: (a -> b -> c -> d) -> b -> c -> a -> d

From just looking at


one would think that

a corresponds to the type of x
b corresponds to the type of y
c corresponds to the type of z
d corresponds to the return type of f

but, when you look at the second half of the the type signature of


it seems like there isn't that correspondence.

So, what's going on here?

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"d corresponds to the return type of f" — it's quite ok to say that, but actually, b->c->d correspondents to the return type of f, whose only argument is a! –  leftaroundabout Apr 29 '14 at 22:59

2 Answers 2

up vote 5 down vote accepted

It's a bit confusing, but look at it this way

f       :: a -> b -> c -> d
f z     ::      b -> c -> d
f z x   ::           c -> d
f z x y ::                d

Which implies

z :: a
x :: b
y :: c

So, we have

    :: (a -> b -> c -> d)       -- f
    -> b                        -- x
    -> c                        -- y
    -> a                        -- z
toFront3 f x y z = f z x y
share|improve this answer
OOOOOOOOOHHHHHHHH! I see now! Thank you so much. I completely forgot that on the right side of the equation, I was going to apply f to z then x then y. So, obviously in the input I fed it in a jumbled up order. Thank you. It totally clicked. –  TheSeamau5 Apr 29 '14 at 22:40
:) :) :) And that, fellow stackoverflow users, is called teaching and learning happening. Well done both of you. –  AndrewC Apr 29 '14 at 22:57
@TheSeamau5 No problem! I was initially puzzled by it myself, it just took a minute of looking at the types to figure out exactly what was going on. I figured the easiest way to show how it worked was with the incremental and annotated type signatures. Sometimes a bit of whitespace can make all the difference in the world when trying to understand how something works. –  bheklilr Apr 29 '14 at 23:56

I'm often confused by the types of these sorts of function-transforming functions for a minute before I think about them. Another good way of looking at them is to add unnecessary parentheses to their types, and look at them like this:

toFront3 :: (a -> b -> c -> d) -> (b -> c -> a -> d)

That is, toFront3 takes a function of 3 arguments, and gives you a function of the same arguments in a different order.

To have some names:

let g = toFront3 f

g and f are both functions of 3 arguments. g is going to call f after shuffling its 3rd argument to the front. Therefore the arguments g will receive are the pre-shuffled arguments. So to go from f :: a -> b -> c -> d to the type of g we have to apply the inverse shuffling of arguments that toFront3 does, so that shuffling them will restore the argument order to a -> b -> c -> d, as is required to be passed to f post-shuffle.

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Thanks. The parentheses help. Turns out, it makes so much more sense if you shuffle the input types. toFront3 :: (c -> a -> b -> d) -> (a -> b -> c -> d) I know that this is just a cosmetic change, but it is so much clearer. It says that toFront3 accepts a function of 3 arguments and 3 arguments. The first argument of f is of type the third argument of toFront3, the second argument of f is of type the first argument of toFront3, the third argument of f is of type the second argument of toFront3. –  TheSeamau5 Apr 30 '14 at 5:45

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