# How to select every n-th element from a list [duplicate]

Possible Duplicate:
How to get every Nth element of an infinite list in Haskell?

Simple task - we have a list and want to leave only each nth element in that list. What is the most idiomatic way to do it in haskell?

off the top of my head it is something like:

dr n [] = []
dr n (x : xs) = x : (dr n \$ drop n xs)


but I have a strong feeling that I'm overcomplicating the problem.

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## marked as duplicate by sdcvvc, hammar, yairchu, Daniel Wagner, GravitonOct 1 '11 at 2:15

that looks pretty idiomatic to me. –  Jeremy Powell Sep 29 '11 at 15:41
don't think you will get this any cheaper - looks fine to me. The only point is that this don't fit well to your description as dr k [1..] don't yield your questions sequence. –  Carsten Sep 29 '11 at 15:41

Your solution is fine, but here are three other solutions using functions from Haskell's base library.

dr1 m = concatMap (take 1) . iterate (drop m)


Of coarse, this will never terminate (because iterate never terminates). So perhaps a better solution would be to use unfoldr:

{-# LANGUAGE TupleSections #-}
import Data.Maybe
dr2 m = unfoldr ((\x-> fmap (,drop m x) (listToMaybe x)))


The function you pass to an unfold can get a bit ugly if you don't know GHC extensions and concepts such as functors, here's that solution again without the fancy foot-work (untested):

dr2 m = unfoldr ((\x -> case listToMaybe x of
Nothing -> Nothing
Just i  -> Just (i,drop m x)))


If you don't like unfolds then consider a zip and a filter:

dr3 m = map snd . filter ((== 1) . fst) . zip (cycle [1..m])


Review

Understand all these solutions are slightly different. Learning why will make you a better Haskell progammer. dr1 uses iterate and will thus never terminate (perhaps this is ok for infinite lists, but probably not a good overall solution):

> dr1 99 [1..400]
[1,100,199,298,397^CInterrupted.


The dr2 solution will show every mth value by skipping values in the unfold. The unfold passes both the value to be used for the next unfolding and the result of the current unfolding in a single tuple.

> dr2 99 [1..400]
[1,100,199,298,397]


The dr3 solution is slightly longer but probably easier for a beginner to understand. First you tag every element in the list with a cycle of [1..n, 1..n, 1..n ...]. Second, you select only the numbers tagged with a 1, effectively skipping n-1 of the elements. Third you remove the tags.

> dr3 99 [1..400]
[1,100,199,298,397]

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Thomas, thank you very much. It is very important to know all the ways you can perform relatively simple tasks, and you've just gave me some new ideas. –  shabunc Sep 29 '11 at 19:56

My variant would be:

each :: Int -> [a] -> [a]
each n = map head . takeWhile (not . null) . iterate (drop n)


Fast and plays well with laziness.

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this one is nice! –  shabunc Sep 29 '11 at 20:01
yes, it is very nice. I didn't want to get into discussing laziness (and honestly didn't consider adding a null guard) but this is a good alternative to my broken first example. –  Thomas M. DuBuisson Sep 29 '11 at 20:09

Lots of ways to shave this yak! Here's yet another:

import Data.List.Split -- from the "split" package on Hackage
dr n = map head . chunk n

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chunk is implemented very alike, actually -- | split at regular intervals chunk :: Int -> [a] -> [[a]] chunk _ [] = [[]] chunk n xs = y1 : chunk n y2 where (y1, y2) = splitAt n xs –  shabunc Sep 30 '11 at 8:53
@shabunc You bet! Code reuse is the name of the game. –  Daniel Wagner Sep 30 '11 at 12:45

Try this:

getEach :: Int -> [a] -> [a]
getEach _ [] = []
getEach n list
| n < 1     = []
| otherwise = foldr (\i acc -> list !! (i - 1):acc) [] [n, (2 * n)..(length list)]


Then in GHC:

*Main> getEach 2 [1..10]
[10,8,6,4,2]

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This solution doesn't work for infinite lists (because of length list); leaks space (it forces the list spine, but doesn't release the start of the list until it terminates); is inefficient in fetching elements from the list (!! is O(n); this is a Schlemiel the Painter's algorithm); and is too complex. –  dave4420 Sep 30 '11 at 8:33