# Mapping one list to another (in Haskell, + abstract solution) - 'map reduce'?

Say we have a list of coordinates like:
(1,2)
(0,3)
(4,1)
(0,3)
(-2,3)
(6,5)

And we wanted to result in the following list, which is defined as the summation of each consecutive coordinates. (Sorry bad definition) like so:
(1,5)
(4,4)
(4,4)
(-2,6)
(4,8)

So there exists a set A = (a,b,c,...,n) where a,b,c,...,n are coordinates in R^2.
There exists a function f such that f(A) = B = (a+b,b+c,c+d,...,n-1+n).

~

How would you write something like that in a functional language like Haskell? A program that applies f to a given A to give B.

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is it homework? –  Drakosha Nov 15 '10 at 17:15

You can use `zip` to zip the list with its tail, you get pairs of pairs like `[((1,2), (0,3)), ((0,3),(4,1)), ...]`. Then you can use `map` to replace each pair of pairs with its sum. Or you can use `zipWith` which is basically `zip` + `map` in one function, except the function given to `zipWith` has type `a -> b -> c`, not `(a,b) -> c`:

``````summedCoords = zipWith (\ (a,b) (c,d) -> (a+c, b+d)) coords (tail coords)
``````
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I think you meant `summedCoords coords = zipWith (\ (a,b) (c,d) -> (a+c, b+d)) coords (tail coords)`? :) –  ShinNoNoir Nov 15 '10 at 17:18
@Shin: Yes, I absolutely did. Thanks. –  sepp2k Nov 15 '10 at 17:19

You can write a generic function like this

``````g:: (a -> a -> b) -> [a] -> [b]
g f (x1:x2:xs) = (f x1 x2):(g (x2:xs))
g _ (x1:[]) = []
``````

``````f = g f' where