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For my very first lecture in haskell we where given a series of problems. One of them is to return True when n number is present in a list, or False otherwise. I managed to get what i think is half-way there but am getting different compile errors and am pretty frustated because I can even understand what they mean.

So far I have done the following

// No problem with this function
matches :: Int -> [Int] -> [Int]    // This function is to return the matches 
matches x y = [a | a <-y, a==x]     // ie. main> 1 [1,3,5,7,1,4] outputs [1,1]

// Here am stuck
myelem :: Int -> [Int] -> Bool
myelem x [] = False
myelem x (y:ys)
 | x == y = y : x myelem ys       // Am not sure about recursion as 
                                  // we have not yet covered

Obviously this is for a class so please do not post the answer. But maybe a few examples that will help me reason about both the workings of Haskell and how to approach the problem. Any pointer will be massively appreciated.


matches :: Int -> [Int] -> [Int]
matches x y = [a | a <-y, a==x]

myelem :: Int -> [Int] -> Bool
myelem x [] = False
myelem x (y:ys)
 | x == y = True
 | otherwise = myelem x (ys)

Cheers guys

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@pelotom, @Jeremiah Willcock, @9000: Thanks so much guys, am just finding it quite challenging to switch my reasoning from imperative to declarative. Just to clarify; when myelem x (ys) is executed does it actually deletes elements from the list until empty, or is it just evaluating the remaining elements on the list until none left? –  Carlos Feb 19 '11 at 3:13
@Carlos: In a pure functional language such as Haskell, functions can never "delete" anything, because that would be a side-effect, violating purity. In order to see how a functional list works, it helps to write it out in its nested form: [1,2,3,4] is actually 1:(2:(3:(4:[]))). In other words, this list is made up of 1 prepended to another list, 2:(3:(4:[])), which in turn is made up of 2 prepended to another list, and so on. Each inner list is "unaware" of the outer lists referring to it. –  pelotom Feb 19 '11 at 4:09
@Carlos: For example, let xs = [1,2,3] in (4:xs, 5:xs)... this results in a pair of lists, ([4,1,2,3],[5,1,2,3]), which share the same inner list xs = [1,2,3]. Recursive functions which act on lists mirror this nested form. They pattern match on a list which looks like x:xs, do something with x, recurse on the inner list xs, and so on, until bottoming out at []. Nothing is altered by a pattern match, it's simply analyzing the list into its components. –  pelotom Feb 19 '11 at 4:12
@pelotom: wow buddy thanks a lot, I really appreciate the great explanation, time and effort you putted into my question. Good karma to you. –  Carlos Feb 19 '11 at 4:31
Whenever you have a function that looks at the items in a list one at a time and spits out something, foldr is usually a good way to go. I suggest you rewrite your function with a fold, as this is a very good exercise for getting used to Haskell and the functional programming mentality. –  Dan Burton Feb 19 '11 at 6:51

5 Answers 5

up vote 1 down vote accepted

The problem is in your last equation:

myelem x (y:ys)
 | x == y = y : x myelem ys

There are two problems here:

  1. If you want to use myelem as an infix operator, you have to surround it in backticks, like so:

    x `myelem` ys
  2. Given that's what you meant, the right hand side of your equation doesn't type check; the list constructor (:) requires its second argument to be a list, not a Bool. Furthermore, (:) constructs a list, and myelem is supposed to return a Bool!

Think about what you're trying to do. If x == y, you just want to return True, right? And otherwise, you want to return the result of checking the rest of the list (ys). Hope that helps.

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You are actually pretty close to the right answer. I see two main issues, though. One is that the call to myelem on the last line of code needs to have backquotes around it to make it infix (x `myelem` ys) or a prefix call without backquotes (myelem x ys). Also, you do not want to prepend y to the result of the recursive call. You actually do not need a condition on your second pattern: just think about what myelem x (y:ys) should return using simple Boolean operations and the recursive call you already have there.

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You try to concat an Int and a Bool in the last line; think again.

You never return True from myelem; sometimes it is appropriate.

Once these issues are fixed, the code works.

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You could also write your function using some combination of the following functions (there are at least two ways of doing it using the functions below):

filter :: (a -> Bool) -> [a] -> [a]

removes elements from a list unless they satisfy some set of criteria

null :: [a] -> Bool

returns whether the list is empty or not

not :: Bool -> Bool

is logical negation

or :: [Bool] -> Bool

returns True if a list of Bool contains one or more True values.

Obviously, you've solved your problem, but it might help you to explore other ways of doing the same thing.

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Note that you could also define your myelem function in terms of matches.

  • What will matches return if the item is not in the list?
  • What will matches return if the item is in the list once? twice? many times?
  • Do you care about the entire return value in the second case? (hint: no)
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