# Finding height in Binary Search Tree

Hey I was wondering if anybody could help me rework this method to find the height of a binary search tree. So far my code looks like this however the answer im getting is larger than the actual height by 1, but when I remove the +1 from my return statements its less than the actual height by 1? I'm still trying to wrap my head around recursion with these BST any help would be much appreciated.

``````public int findHeight(){
if(this.isEmpty()){
return 0;
}
else{
TreeNode<T> node = root;
return findHeight(node);
}
}
private int findHeight(TreeNode<T> aNode){
int heightLeft = 0;
int heightRight = 0;
if(aNode.left!=null)
heightLeft = findHeight(aNode.left);
if(aNode.right!=null)
heightRight = findHeight(aNode.right);
if(heightLeft > heightRight){
return heightLeft+1;
}
else{
return heightRight+1;
}
}
``````
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Well I got it to return the correct height by returning findHeight(node)-1 in my public method. However I just feel like this is sloppy code, any suggestions on a revamp? –  mike Apr 8 '10 at 5:03

The problem lies in your base case. "The height of a tree is the length of the path from the root to the deepest node in the tree. A (rooted) tree with only a node (the root) has a height of zero." - Wikipedia If there is no node you want to return -1 not 0 because you are adding 1 at the end so if there isn't a node you return -1 which cancels out the +1.

``````int findHeight(TreeNode<T> aNode)
{
if(aNode == 0)
return -1;

int lefth = findHeight(aNode.left);
int righth = findHeight(aNode.right);

if(lefth > righth)
return lefth + 1;
else
return righth +1
}
``````
-
Yes this works correctly without having to subtract 1 in my public method. I am still confused as to how this method works with recursion. I declared ints left and right after the if statement, but I dont understand how they are incremented through this method –  mike Apr 8 '10 at 5:38
This method works by subtracting 1 at the base case, they are incremented like every other method given, when you go deeper into the tree you add 1 to the height. –  Corey Apr 8 '10 at 5:44

IMO, you code would benefit from being simplified a bit. Rather than attempting to end the recursion when a child pointer is null, only end it when the current pointer is null. That makes the code a lot simpler to write. In pseudo-code it looks something like this:

``````if (node = null)
return 0;
else
left = height(node->left);
right = height(node->right);
return 1 + max(left, right);
``````
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Can't call a method on a null object, though :) –  jemfinch Apr 8 '10 at 5:11
@jemfinch, where is he calling it on a null object, isn't that what the base case is for? –  Corey Apr 8 '10 at 5:15
@jemfinch:I guess it's a good thing I didn't suggest doing such a thing! –  Jerry Coffin Apr 8 '10 at 5:21
+1 for giving some extra information. @jemfinch: Huh? –  Dykam Apr 8 '10 at 5:30

The height of a binary search tree is equal to `number of layers - 1`.

See the diagram at http://en.wikipedia.org/wiki/Binary_tree

Your recursion is good, so just subtract one at the root level.

Also note, you can clean up the function a bit by handling null nodes:

``````int findHeight(node) {
if (node == null) return 0;
return 1 + max(findHeight(node.left), findHeight(node.right));
}
``````
-
My first attempt at this method I used something along these lines however I kept getting a StackOverFlow exception for some reason when I ran my code? Im assuming because I check for pointers pointing to null? –  mike Apr 8 '10 at 5:14
(Removed comment about c++, which doesn't apply). It's likely that your "node == null" wasn't terminating properly. –  Stephen Apr 8 '10 at 5:21
Stephen, shouldn't it be 0 for a single-node tree? This returns 1. –  Matthew Flaschen Apr 8 '10 at 5:27
@Matthew: You're right, but I had suggested that his public function subtract one from the result. Instead, you could "fix" the recursive function by returning -1 in the base case. –  Stephen Apr 8 '10 at 5:57

Here's a concise and hopefully correct way to express it:

``````  private int findHeight(TreeNode<T> aNode){
if(aNode == null || (aNode.left == null && aNode.right == null))
return 0;
return Math.max(findHeight(aNode.left), findHeight(aNode.right)) + 1;
}
``````

If the current node is null, there's no tree. If both children are, there's a single layer, which means 0 height. This uses the definition of height (mentioned by Stephen) as # of layers - 1

-

This is untested, but fairly obviously correct:

```private int findHeight(Treenode aNode) {
if (aNode.left == null && aNode.right == null) {
return 0; // was 1; apparently a node with no children has a height of 0.
} else if (aNode.left == null) {
return 1 + findHeight(aNode.right);
} else if (aNode.right == null) {
return 1 + findHeight(aNode.left);
} else {
return 1 + max(findHeight(aNode.left), findHeight(aNode.right));
}
}
```

Often simplifying your code is easier than figuring out why it's off by one. This code is easy to understand: the four possible cases are clearly handled in an obviously correct manner:

• If both the left and right trees are null, return 1, since a single node by definition has a height of 1.
• If either the left or right trees (but not both!) are null, return the height of the non-null tree, plus 1 to account for the added height of the current node.
• If neither tree is null, return the height of the taller subtree, again plus one for the current node.
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This code works, and is clearer than what I had however, it is still returning the height +1. In my book, height is defined as the length of the path from the root to its deepest leaf. So from my understanding a BST containing 15, 25, 30, 45 (in this order) would have a height of only 3 correct? –  mike Apr 8 '10 at 5:30
Actually, a tree with only the root node has a height of 0 not 1. –  Corey Apr 8 '10 at 5:40
Strange. It really ought not be called "height" if what they really mean is "paths-to-descend," but that seems to be the standard terminology, unfortunately. The correct way to fix this is to change the first case (node.left == null && node.right == null) to return 0. –  jemfinch Apr 8 '10 at 5:59
``````    public void HeightRecursive()
{
Console.WriteLine( HeightHelper(root) );
}

private int HeightHelper(TreeNode node)
{
if (node == null)
{
return -1;
}
else
{
return 1 + Math.Max(HeightHelper(node.LeftNode),HeightHelper(node.RightNode));
}
}
``````

C# code. Include these two methods in your BST class. you need two method to calculate height of tree. HeightHelper calculate it, & HeightRecursive print it in main().

-

The definition given above of the height is incorrect. That is the definition of the depth.

"The depth of a node M in a tree is the length of the path from the root of the tree to M. The height of a tree is one more than the depth of the deepest node in the tree. All nodes of depth d are at level d in the tree. The root is the only node at level 0, and its depth is 0."

Citation: "A Practical Introduction to Data Structures and Algorithm Analysis" Edition 3.2 (Java Version) Clifford A. Shaffer Department of Computer Science Virginia Tech Blacksburg, VA 24061

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For anyone else that reads this!!!!

HEIGHT is defined as the number of nodes in the longest path from the root node to a leaf node. Therefore: a tree with only a root node has a height of 1 and not 0.

The LEVEL of a given node is the distance from the root plus 1. Therefore: The root is on level 1, its child nodes are on level 2 and so on.

(Information courtesy of Data Structures: Abstraction and Design Using Java, 2nd Edition, by Elliot B. Koffman & Paul A. T. Wolfgang) - Book used in Data Structures Course I am currently taking at Columbus State University.

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```int calcHeight(node* root){ if(root==NULL) return 0; int l=calcHeight(root->left); int r=calcHeight(root->right); if(l>r) return l+1; else return r+1; } ```
```int calcSize(node* root){ if(root==NULL) return 0; return(calcSize(root->left)+1+calcSize(root->right)); }```