# Haskell Tree to List - preorder traversal

Given the following tree structure in Haskell:

``````data Tree = Leaf Int | Node Int Tree Tree deriving Show
``````

How can I get Haskell to return a list of the data in pre-order?

e.g. given a tree:

``````Node 1 (Leaf 2) (Leaf 3)
``````

return something like:

``````preorder = [1,2,3]
``````
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Don't forget to accept an answer once you're satisfied. –  Riccardo Mar 17 '12 at 10:10

Use pattern matching

``````preorder (Leaf n) = [n]
preorder (Node n a b) = n:(preorder a) ++ (preorder b)
``````
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I get the following error: Couldn't match expected type `[t0]' with actual type `Tree' In the pattern: Node n a b In an equation for `preorder' preorder (Node n a b) = n : (preorder a) ++ (preorder b) –  Gravy Feb 29 '12 at 1:00
@Gravy That is bizarre. Try adding an explicit type signature `preorder :: Tree -> [Int]`. It doesn't make sense to me that you would be having an error. –  Philip JF Feb 29 '12 at 2:10
That's weird I just tested it and seems to be working. Are you sure you copied everything correctly? –  mck Feb 29 '12 at 2:14
@Gravy Also make sure you have `preorder (Leaf n) = [n]` not `preorder (Lead n) = n`. Those `[ ]` are important. –  Philip JF Feb 29 '12 at 2:18
preorder(Leaf n) = [n] preorder(Node n treeL treeR) = [n] ++ preorder treeL ++ preorder treeR –  Gravy Mar 19 '12 at 3:21

You could aim to a more general solution and make your data type an instance of `Foldable`. There is a very similar example at hackage, but that implements a post-order visit. If you want to support pre-order visits you will have to write something like this:

``````import qualified Data.Foldable as F

data Tree a = Leaf a | Node a (Tree a) (Tree a) deriving Show

instance F.Foldable Tree where
foldr f z (Leaf x) = f x z
foldr f z (Node k l r) = f k (F.foldr f (F.foldr f z r) l)
``````

With this, you'll be able to use every function that works on `Foldable` types, like `elem`, `foldr`, `foldr`, `sum`, `minimum`, `maximum` and such (see here for reference).

In particular, the list you are searching for can be obtain with `toList`. Here are some examples of what you could write by having that instance declaration:

``````*Main> let t = Node 1 (Node 2 (Leaf 3) (Leaf 4)) (Leaf 5)
*Main> F.toList t
[1,2,3,4,5]
*Main> F.foldl (\a x -> a ++ [x]) [] t
[1,2,3,4,5]
*Main> F.foldr (\x a -> a ++ [x]) [] t
[5,4,3,2,1]
*Main> F.sum t
15
*Main> F.elem 3 t
True
*Main> F.elem 12 t
False
``````
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Ok, sorry about the late reply, but I got this working as follows:

``````preorder(Leaf n) = [n]
preorder(Node n treeL treeR) = [n] ++ preorder treeL ++ preorder treeR'code'
``````

This however does not work for me still

``````preorder (Leaf n) = [n]
preorder (Node n a b) = n:(preorder a) ++ (preorder b)
``````
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