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For Binary tree: You no need to consider tree node values, I am interested about different tree topologies with 'N' nodes.

For Binary Search Tree: We obviously consider tree node values.

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10 Answers

up vote 18 down vote accepted

I recommend this article by my colleague Nick Parlante (from back when he was still at Stanford). The count of structurally different binary trees (problem 12) has a simple recursive solution (which in closed form ends up being the Catalan formula which @codeka's answer already mentioned).

I'm not sure how the number of structurally different binary search trees (BSTs for short) would differ from that of "plain" binary trees -- except that, if by "consider tree node values" you mean that each node may be e.g. any number compatible with the BST condition, then the number of different (but not all structurally different!-) BSTs is infinite. I doubt you mean that, so, please clarify what you do mean with an example!

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Alex, Thanks allot. –  siva Jun 15 '10 at 14:46
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I recommend this article which really nicely tackles this problem and describe the approach using recursion as well as dynamic programming. Count Binary Search Trees created from N unique elements –  dharam Aug 25 '13 at 11:11
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  1. Total no of Binary Trees are = enter image description![enter image description here

  2. Summing over i gives the total number of binary search trees with n nodes. enter image description here

The base case is t(0) = 1 and t(1) = 1, i.e. there is one empty BST and there is one BST with one node. enter image description here

So, In general you can compute total no of Binary Search Trees using above formula. I was asked a question in Google interview related on this formula. Question was how many total no of Binary Search Trees are possible with 6 vertices. So Answer is t(6) = 132

I think that I gave you some idea...

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Note that 1 and 2 are actually different ways of expressing the same formula, not formulas for different quantities, in case that wasn't clear. –  TOB Oct 30 '13 at 3:11
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Eric Lippert recently had a very in-depth series of blog posts about this: "Every Binary Tree There Is" and "Every Tree There Is" (plus some more after that).

In answer to your specific question, he says:

The number of binary trees with n nodes is given by the Catalan numbers, which have many interesting properties. The nth Catalan number is determined by the formula (2n)! / (n+1)!n!, which grows exponentially.

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Different binary trees with n nodes:

(1/(n+1))*(2nCn)

where C=combination eg.

n=6,
possible binary trees=(1/7)*(12C6)=132
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(2n)!/n!*(n+1)!
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If given no. of Nodes are N Then.

Different No. of BST=Catalan(N)
Different No. of Structurally Different Binary trees are = Catalan(N)

Different No. of Binary Trees are=N!*Catalan(N)

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The number of binary trees can be calculated using the catalan number.

The number of binary search trees can be seen as a recursive solution. i.e., Number of binary search trees = (Number of Left binary search sub-trees) * (Number of Right binary search sub-trees) * (Ways to choose the root)

In a BST, only the relative ordering between the elements matter. So, without any loss on generality, we can assume the distinct elements in the tree are 1, 2, 3, 4, ...., n. Also, let the number of BST be represented by f(n) for n elements.

Now we have the multiple cases for choosing the root.

  1. choose 1 as root, no element can be inserted on the left sub-tree. n-1 elements will be inserted on the right sub-tree.
  2. Choose 2 as root, 1 element can be inserted on the left sub-tree. n-2 elements can be inserted on the right sub-tree.
  3. Choose 3 as root, 2 element can be inserted on the left sub-tree. n-3 elements can be inserted on the right sub-tree.

...... Similarly, for i-th element as the root, i-1 elements can be on the left and n-i on the right.

These sub-trees are itself BST, thus, we can summarize the formula as:

f(n) = f(0)f(n-1) + f(1)f(n-2) + .......... + f(n-1)f(0)

Base cases, f(0) = 1, as there is exactly 1 way to make a BST with 0 nodes. f(1) = 1, as there is exactly 1 way to make a BST with 1 node.

Final Formula

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The number of possible binary search tree with n nodes (elements,items) is

=(2n C n) / (n+1) = ( factorial (2n) / factorial (n) * factorial (2n - n) ) / ( n + 1 ) 

where 'n' is number of nodes  (elements,items ) 

Example :

for 
n=1 BST=1,
n=2 BST 2,
n=3 BST=5,
n=4 BST=14 etc
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Just for reference :

You could refer to problem 12-4 second edition from Cormen - Introduction to Algorithms. Solutions are pretty much available online.

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Answer for distinct binary trees is 2nCn/(n+1) (if nodes are unlabeled)

Answer for distinct BST is also 2nCn/(n+1) (because here nodes must be labelled)

The below link contains an intuitive explanation.

http://gatecse.in/wiki/Number_of_Binary_trees_possible_with_n_nodes

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Link only answers are generally frowned upon as they could change the content and be incorrect –  Sterling Archer Jan 6 at 14:32
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