The code below retains, for a given integer n, the first n items from a list, drops the following n items, keeps the following n and so on. It works correctly for any finite list.

In order to make it usable with infinite lists, I used the 'seq' operator to force the accumulator evaluation before the recursive step as in foldl' as example.

I tested by tracing the accumulator's value and it seems that it is effectively computed as desired with finite lists.

Nevertheless, it doesn't work when applied to an infinite list. The "take" in the main function is only executed once the inner calculation is terminated, what, of course, never happens with an infinite list.

Please, can someone tell me where is my mistake?

```
main :: IO ()
main = print (take 2 (foo 2 [1..100]))
foo :: Show a => Int -> [a] -> [a]
foo l lst = inFoo keepOrNot 1 l lst []
inFoo :: Show a => (Bool -> Int -> [a] -> [a] -> [a]) -> Int -> Int -> [a] -> [a] -> [a]
inFoo keepOrNot i l [] lstOut = lstOut
inFoo keepOrNot i l lstIn lstOut = let lstOut2 = (keepOrNot (odd i) l lstIn lstOut) in
stOut2 `seq` (inFoo keepOrNot (i+1) l (drop l lstIn) lstOut2)
keepOrNot :: Bool -> Int -> [a] -> [a] -> [a]
keepOrNot b n lst1 lst2 = case b of
True -> lst2 ++ (take n lst1)
False -> lst2
```

`inFoo`

returns a value only when the input list is`[]`

. If the input list is infinite, no amount of`drop`

ping can achieve a call to`inFoo`

where the remainder of the input list is`[]`

. – pigworker Oct 23 '12 at 8:46