I'm stuck on this exercise. Any help would be appreciated! Thanks in advance!

A function takeS takes a list of pairs and compares first elements of pairs. If they are not equal, the function returns that list of pairs. If they are equal, that means they have a conflict. The function will delete either one of these two pairs and returns the list with no conflict pairs. If the returning list still has some conflict pairs, the function recursively calls itself until there are no conflict pairs.

``````takeS :: [(a,b)] -> [(a,b)]
``````

Example: `takeS [("a",1),("b",2),("b",3),("c",4),("c",5)]` will return `[("a",1),("b",2),("c",4)]` since there are 2 conflict pairs: `("b",2)`, `("b",3)` and `("c",4)`, `("c",5)`.

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Sounds like a homework... :P –  rsenna Nov 3 '10 at 23:24
What did you try so far? Where are you stuck? –  poke Nov 3 '10 at 23:27
I think the wording is confusing: perhaps you should say "compares the first elements of pairs of pairs"? –  Andrew Jaffe Nov 3 '10 at 23:38
Is the list sorted so that you only have to compare adjacent pairs of pairs? (Sorry about the double comment, but these are pretty distinct.) –  Andrew Jaffe Nov 3 '10 at 23:39
This is what I have so far: takeS [(a1,b1),(a2,b2)] |a1 == a2 = [(a1,b1)] |a1 /= a2 = [(a1,b1),(a2,b2)] but it only takes 2 pairs and the function isn't recursive. And sorry for the confusion. The list isn't sorted though. –  user496579 Nov 3 '10 at 23:47

``````import Data.List (nubBy)

takeS :: Eq a => [(a, b)] -> [(a, b)]
takeS = nubBy \$ \(x, _) (y, _) -> x == y
``````

If you don't want to import anything, you can define `nubBy` yourself; here's one possible implementation (may be less efficient than the official version):

``````-- nubBy removes "duplicates" as defined by a binary predicate
nubBy :: (a -> a -> Bool) -> [a] -> [a]
nubBy f []     = []
nubBy f (x:xs) = x:(nubBy f (filter (not . f x) xs))
``````
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Thanks!!! But is there any way you can get this without importing? –  user496579 Nov 3 '10 at 23:48
Well, you could look up the definition of nubBy. Then substitute it into the definition of takeS above (just like you would in Algebra). –  Paul Johnson Nov 4 '10 at 0:14
@user496579: see my edit –  pelotom Nov 4 '10 at 0:16
Oh I see. Ok so I'm sorry for keep asking but what if I want to take an input? Ex: takeS [(x,y)] –  user496579 Nov 4 '10 at 0:32
@user496579: it does take an input, try it out in GHCi –  pelotom Nov 4 '10 at 0:33