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I need some help with recursion. I'm trying do a binary tree in C#, I'm wondering if it's possible to demonstrate all Inorder/PostOrder and PreOrder traversal with a recursive function.

I have completed it for PreOrder and then attempted InOrder however caused a StackOverflow Exception, my grasp on Binary Tree's is flimsy at best so any help with this would be much appreciated, even if it does seem like a stupid question.

The following code is what I'm using for PreOrder Traversal;

     public void recursivePreorder(BinaryTreeNode root)
    {
        Console.Write(root.Data.ToString());
        if (root.Left != null)
        {
            recursivePreorder(root.Left);
        }
        if (root.Right != null)
        {
            recursivePreorder(root.Right);
            }
    }

     public void preorderTraversal()
    {
        if (Root != null)
        {
            recursivePreorder(Root);
        }
        else
        {
            Console.WriteLine("There is no tree to process");
        }

    static void Main(string[] args)
    {

        // Build the tree
        Test.Add(5);
        Test.Add(2);
        Test.Add(1);
        Test.Add(3);
        Test.Add(3); // Duplicates are OK
        Test.Add(4);
        Test.Add(6);
        Test.Add(10);
        Test.Add(7);
        Test.Add(8);
        Test.Add(9);
        // Test if we can find values in the tree

        for (int Lp = 1; Lp <= 10; Lp++)
            Console.WriteLine("Find Student ID ({0}) = {1}", Lp, Test.Find(Lp));

        // Test if we can find a non-existing value
        Console.WriteLine("Find Student ID (999) = {0}", Test.Find(999));

        // Iterate over all members in the tree -- values are returned in sorted order
        foreach (int value in Test)
        {
            Console.WriteLine("Value: {0}", value);
        }

        Console.WriteLine("Preorder Traversal");
        Console.WriteLine("");
        Test.preorderTraversal();
        Console.WriteLine("");
    }

Thanks in advance, this is definitely something I'm having trouble getting my head around and I'm not even sure if it's possible.

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2 Answers 2

up vote 0 down vote accepted

Inorder is very similar to what you already have, just move your code around a little bit in where you are handling the current node:

public void recursiveInorder(BinaryTreeNode root)
{
    if (root.Left != null)
    {
        recursiveInorder(root.Left);
    }
    Console.Write(root.Data.ToString());
    if (root.Right != null)
    {
        recursiveInorder(root.Right);
    }
}

The difference to preorder is just that you first traverse the left subtree, then process the current node and finally traverse the right subtree.

share|improve this answer
    
Thanks very much for the fast reply, any chance you could also show me PostOrder? And anychance you could help explain how it actually works for me? I'm just stuck on both how Binary Trees work and how recursion works because although your answer is perfectly clear I seem to be struggling with understanding anything surrounding this topic. –  Steffan Caine Jan 16 '12 at 0:21
    
@SteffanCaine: Think about it for a second: post order just moves the processing of the current node last - so where would you place your Console.Write statement then? Also check out the wikipedia article that @Mitch linked below. –  BrokenGlass Jan 16 '12 at 0:23
    
Ha, I knew it would be simple and with the article link below and your reply it is indeed very obvious. Thanks alot mate much appreciato ;) –  Steffan Caine Jan 16 '12 at 0:25
    
We can add a validation at the starting of the method to check if root is null. –  Pritam Karmakar Oct 13 at 3:18

The wiki page for tree traversal states:

Binary Tree

To traverse a non-empty binary tree in preorder, perform the following operations recursively at each node, starting with the root node:

  1. Visit the root.
  2. Traverse the left subtree.
  3. Traverse the right subtree.

To traverse a non-empty binary tree in inorder (symmetric), perform the following operations recursively at each node:

  1. Traverse the left subtree.
  2. Visit the root.
  3. Traverse the right subtree.

To traverse a non-empty binary tree in postorder, perform the following operations recursively at each node:

  1. Traverse the left subtree.
  2. Traverse the right subtree.
  3. Visit the root.

[BTW, it was the first search hit.]

share|improve this answer
    
I've actually already got a document that attempts to explain this I just didn't get it so wanted a more human answer however that post you linked is very helpful so thanks very much :) –  Steffan Caine Jan 16 '12 at 0:24

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