# Combine 2 list functions into 1?

How would I combine the following 2 functions:

``````replaceNth n newVal (x:xs)
| n == 0 = newVal:xs
| otherwise = x:replaceNth (n-1) newVal xs

replaceMthNth m n v arg = replaceNth m (replaceNth n v (arg !! m)) arg
``````

into a single function?

Is it possible?

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What do you want the new function to do? –  interjay May 3 '11 at 22:59
@interjay I'd like it to convert a series of list elements e.g: from: [["Off","Off","Off"],["Off,"Off","Off"]] ETA: Basically so I don't need the replaceNth function, I only need the replaceMthNth function to: [["Off","Off","Off"],["Off,"On","Off"]] –  maclunian May 3 '11 at 23:02
You mean that you want to implement `replaceMthNth` without calling other functions? If so, why would you want to do that? It would just complicate the code. –  interjay May 3 '11 at 23:05
@interjay it's mainly for a small project and I can't call any other functions - that's the criteria. –  maclunian May 3 '11 at 23:19
cause I hate to tell you, but `replaceNth m` is a new function. –  rampion May 4 '11 at 0:47

This is pretty hideous but it does the job:

``````replacemn 0 0 z ((x : xs) : xss) = (z : xs) : xss
replacemn 0 n z ((x : xs) : xss) =
let (ys : yss) = replacemn 0 (n-1) z (xs : xss)
in ((x : ys) : yss)
replacemn m n z (xs:xss) = xs : replacemn (m-1) n z xss
``````
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Function composition

Functions in Haskell may be composed at no cost. E.g. given two functions, `f` and `g`, you can compose them into a new function: `f . g`, which applies `g` to an argument, then applies `f` to the result. You should be able to use composition in the same way here.

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Ok, here it is with no other named functions in the global namespace, or using any `where` or `let` clauses or any other global functions.

``````{-# LANGUAGE ScopedTypeVariables,RankNTypes #-}
module Temp where
newtype Mu a = Mu (Mu a -> a)

replaceMthNth :: Int -> Int -> a -> [[a]] -> [[a]]
replaceMthNth = (\h (f :: Int -> forall b . b -> [b] -> [b]) -> h f f)
( \replaceNth replaceNth' ->
-- definition of replaceMthNth in terms of some replaceNth and replaceNth'
\m n v arg -> replaceNth m (replaceNth' n v (arg !! m)) arg
)
\$
-- y combinator
((\f -> (\h -> h \$ Mu h) \$ \x -> f \$ (\(Mu g) -> g) x \$ x) :: (a -> a) -> a) \$
(\replaceNth ->
-- definition of replaceNth given a recursive definition
(\(n::Int) newVal xs -> case xs of
[] -> []
(x:xs) -> if n == 0 then newVal:xs else x:replaceNth (n-1) newVal xs
)
)
``````
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This is great! :) However, you are using an additional function `fix`. –  Rotsor May 4 '11 at 3:19
@Rotsor: I'm using lots of anonymous functions too... should we count those? –  rampion May 4 '11 at 14:10
@Rotsor: Ok, I removed `fix`. (`Mu` is a constructor, not a function). –  rampion May 4 '11 at 15:11
This is cool, but it should be noted that this is terribly advanced fro a beginner question about function composition. –  Don Stewart May 4 '11 at 18:14

I don't understand what the question is at all :), but here is how I would implement it:

``````modifyNth :: Int -> (a -> a) -> [a] -> [a]
modifyNth n f (x:xs)
| n == 0 = f x : xs
| otherwise = x : modifyNth (n-1) f xs

replaceNthMth :: Int -> Int -> a -> [[a]] -> [[a]]
replaceNthMth m n v = modifyNth m (modifyNth n (const v))
``````

This way you don't need to traverse the list twice (first time with `!!`, second time with `replaceNth`)

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Here's a grotesque implementation that rebuilds the 2d list structure with nested list comprehensions over zips with infinite lists:

``````replaceMthNth :: Int -> Int -> a -> [[a]] -> [[a]]
replaceMthNth m n v ass = [[if (x,y) == (m,n) then v else a
| (y, a) <- zip [0..] as]
| (x, as) <- zip [0..] ass]
``````
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