# 99 questions/Solutions/22

### From HaskellWiki

< 99 questions | Solutions(Difference between revisions)

The swerve (Talk | contribs) (another scanl example) |
|||

Line 36: | Line 36: | ||

<haskell> | <haskell> | ||

range l r = scanl (+) l (replicate (l - r) 1) | range l r = scanl (+) l (replicate (l - r) 1) | ||

+ | </haskell> | ||

+ | with support for both directions | ||

+ | <haskell> | ||

+ | range l r = scanl op l $ replicate diff 1 | ||

+ | where | ||

+ | op = if l < r then (+) else (-) | ||

+ | diff = abs $ l - r | ||

</haskell> | </haskell> | ||

## Latest revision as of 02:08, 5 April 2014

Create a list containing all integers within a given range.

range x y = [x..y]

or

range = enumFromTo

or

range x y = take (y-x+1) $ iterate (+1) x

or

range start stop | start > stop = reverse (range stop start) | start == stop = [stop] | start < stop = start:range (start+1) stop

The following does the same but without using a reverse function

range :: Int -> Int -> [Int] range n m | n == m = [n] | n < m = n:(range (n+1) m) | n > m = n:(range (n-1) m)

or, a generic and shorter version of the above

range :: (Ord a, Enum a) => a -> a -> [a] range a b | (a == b) = [a] range a b = a:range ((if a < b then succ else pred) a) b

or with scanl

range l r = scanl (+) l (replicate (l - r) 1)

with support for both directions

range l r = scanl op l $ replicate diff 1 where op = if l < r then (+) else (-) diff = abs $ l - r

Since there's already syntactic sugar for ranges, there's usually no reason to define a function like 'range' in Haskell. In fact, the syntactic sugar is implemented using the enumFromTo function, which is exactly what 'range' should be.