Only began using Haskell a couple of weeks ago - I am attempting to randomly shuffle a list of type Card by splitting the list into two at a random point int eh list (depending on an array of random integers produced by the randomList function) and swapping the order of these two parts a number of times, but the output is not at all random, and the parse only seems to be happening once, pretty desperate as I need it working and the deadline is tonight!

randomList :: (Random a) => (a,a) -> Int -> StdGen -> [a]
randomList bnds n = take n . randomRs bnds

randomise :: [Int] -> [Card] -> [Card]
randomise [] p = p
randomise (x : xs) p = do
                    randomise xs ((drop x p) ++ (take x p))

shuffle :: Int -> [Card] -> [Card]
shuffle r p = do
          let g = mkStdGen r
          randomise(randomList (1, (length p)-1) 500 g :: [Int]) p
  • 2
    "Deadline"? If this is homework, you need to tag it as such. Moreover, could you explain what you mean by "not at all random"? How are you determining the randomness of the output? – jwodder Mar 26 '12 at 18:54
  • 1
    You might be interested in the Fisher-Yates shuffle. It can be pretty readily adapted to linked lists. – Louis Wasserman Mar 26 '12 at 18:58
  • 2
    xkcd.com/221 – leftaroundabout Mar 26 '12 at 19:03
  • 1
    @RyanConnolly: And is it split & reordered 500 times? If not, how can you tell? – jwodder Mar 26 '12 at 19:15
  • 4
    Try working through with pen and paper what randomise [3,4,14,20] ['A'..'Z'] evaluates to (imagine type Card = Char for this exercise). – dave4420 Mar 26 '12 at 19:25

You can just make a random number of permutations on your list. You can do it like:

import System.Random
import Data.List

shuffle xs = do
    gen <- getStdGen
    let (permNum,newGen) = randomR (0,fac (length xs) -1) gen
    return $ permutation permNum xs

permutation makes n permutations on the (assumed sorted) list xs. When randomizing, xs need not be sorted however.

fac is just an implementation of the factorial function.

shuffle makes a random number and applies that many permutations to xs.

It's a bit different from what you are trying to do, but it works wonders. I assumed you didn't need to explicitly use your proposed method. You will have to implement permutation and fac yourself though.

For help on permutation, you could look here. It's a description to solve a Project Euler Problem, but you could use the same procedure to make n permutations.

EDIT: I don't know if anyone cares anymore, but I found another way to do it WAY easier:

import System.Random

randPerm :: StdGen -> [a] -> [a]
randPerm _ []   = []
randPerm gen xs = let (n,newGen) = randomR (0,length xs -1) gen
                      front = xs !! n
                  in  front : randPerm newGen (take n xs ++ drop (n+1) xs)
  • 1
    It's good practice to answer homework questions with hints and clues, rather than providing a complete solution. – huon Mar 27 '12 at 10:22
  • 2
    Well, I just thought that it didn't matter since the deadline has expired. Fixed it. :) – Undreren Mar 27 '12 at 10:29
  • Ah! Good point. – huon Mar 27 '12 at 10:33

Quite late to the party, but a small improvement over the suggested solution is to use splitAt instead of take & drop:

shuffle :: [a] -> StdGen -> [a]
shuffle []   _   = []
shuffle list generator = let (index,newGenerator) = randomR (0,length list -1) generator
                             (listUntilIndex, element:listAfterIndex) = splitAt index list
                         in  element : shuffle (listUntilIndex ++ listAfterIndex) newGenerator

Your Answer

By clicking "Post Your Answer", you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.