# Retrieving an element of a balanced binary tree in Haskell

Assuming I have a custom tree datatype of the following form:

``````data BalTree a = Leaf | Node Integer (BalTree a) a (BalTree a) deriving (Eq, Show, Read)
``````

and creating a new tree of size 10, I'll get this:

``````Node 10 (Node 5 (Node 2 (Node 1 Leaf 'Z' Leaf) 'Z' Leaf)
'Z'
(Node 2 (Node 1 Leaf 'Z' Leaf) 'Z' Leaf))
'Z'
(Node 4 (Node 2 (Node 1 Leaf 'Z' Leaf) 'Z' Leaf)
'Z'
(Node 1 Leaf 'Z' Leaf))
``````

How do I retrieve an element in in-order transversal when given an index?

My attempt:

``````ind Leaf pos            = Nothing
ind tree@(Node n lt x rt) pos
| pos < 0           = Nothing
| pos > treeSize-1  = Nothing
| pos < hTreeSize   = ind lt pos
| pos == hTreeSize  = Just x
| pos > hTreeSize   = ind rt (pos - hTreeSize)
where treeSize = size tree
hTreeSize = treeSize `div` 2
``````

I'm not exactly sure if this is in-order transversal and it doesn't return the correct result.

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What's wrong with your attempt? –  dave4420 Mar 27 at 19:29
btw, concrete type names (as opposed to variables) in Haskell must be capitalized. So `BalTree` not `balTree`. –  luqui Mar 27 at 19:53
Sorrry guys! I'm trying to retrieve an element at a given index and not the first element. Dave: I have a feeling that I'm not doing in-order transversal at all, it doesn't return the correct result. luqui: Sorry, it was a typo. –  user1043625 Mar 27 at 19:58
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## 1 Answer

We want to get the nth value stored in a binary tree in an in-order walk. We know the number of values stored in each tree rooted at each node (the `Integer` parameter of `Node`).

``````data BalTree a = Leaf
| Node Integer (BalTree a) a (BalTree a)

size :: BalTree a -> Integer
size Leaf              = 0
size (Node size _ _ _) = size

nthInOrder :: BalTree a -> Integer -> Maybe a
nthInOrder Leaf _ =
Nothing
nthInOrder (Node _ left x right) n
| leftSize == n - 1 = Just x
| n <= leftSize     = nthInOrder left n
| otherwise         = nthInOrder right (n - leftSize - 1)
where
leftSize  = size left
``````

The idea is this: suppose we're at node `A` and want the `n`th value:

``````  A
/ \
B   C
``````

If `B` holds `n-1` values, then the `n`th value is that of `A`. If `B` holds more or equal than `n` values, then we can ignore the rest of the tree and search only `B`; so we just recurse into it. Otherwise, we should be looking for the value in `C`, so we recurse into it; in this case, we also need to update the `n` to reflect that there are some values in `B`, and 1 value in `A`.

In the worst case, this algorithm walks down to a `Leaf`, so, the complexity is `O(depth of tree)`. If the tree is balanced, the complexity is `O(log2(size of tree))`.

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Sooooo sorry. I'm trying to retrieve some random element when I'm given an index. Sorry for the typo. –  user1043625 Mar 27 at 19:57
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