# Difference between binary tree and binary search tree

Can anyone please explain the difference between binary tree and binary search tree with an example?

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Binary tree: Tree where each node has up to two leaves

``````  1
/ \
2   3
``````

Binary search tree: Used for searching. A binary tree where the left child contains only nodes with values less than the parent node, and where the right child only contains nodes with values greater than or equal to the parent.

``````  2
/ \
1   3
``````
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What is the point of the "non-search" binary tree? – pete Feb 10 '15 at 7:33
@pete: It's a conceptual thing, you won't necessarily ever actually make one that is completely unconstrained. However, there are lots of non-search binary trees that are special in some other way, e.g. binary heaps. – Mehrdad Feb 10 '15 at 7:45
@pete birary trees do not necessarily have to contain comparable data, many (non search) binary trees are used for parsing algebraic expression, binary tree is perfect t write a infix notation parser, by placing the operator as node(s) and numerical values as leafs – JBoy May 27 '15 at 20:33
@JBoy: They're not going to be binary trees in that case though. (e.g. unary operators can't have two children.) I really can't think of a practical use case for unconstrained binary trees, that's why I made that comment. – Mehrdad Jul 8 '15 at 2:20
Great and simple. +1 for visual example :) – Andrey Konstantinov Nov 1 '15 at 13:05

Binary Tree is a specialized form of tree with two child (left child and right Child). It is simply representation of data in Tree structure

Binary Search Tree (BST) is a special type of Binary Tree that follows following condition:

1. left child node is smaller than its parent Node
2. right child node is greater than its parent Node
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These conditions are not sufficient. The entire left subtree must contain no keys only less than the parent's, and the entire right subtree must contain nodes greater. – EJP Nov 28 '15 at 3:28

A binary tree is made of nodes, where each node contains a "left" pointer, a "right" pointer, and a data element. The "root" pointer points to the topmost node in the tree. The left and right pointers recursively point to smaller "subtrees" on either side. A null pointer represents a binary tree with no elements -- the empty tree. The formal recursive definition is: a binary tree is either empty (represented by a null pointer), or is made of a single node, where the left and right pointers (recursive definition ahead) each point to a binary tree.

A binary search tree (BST) or "ordered binary tree" is a type of binary tree where the nodes are arranged in order: for each node, all elements in its left subtree are less to the node (<), and all the elements in its right subtree are greater than the node (>). The tree shown above is a binary search tree -- the "root" node is a 5, and its left subtree nodes (1, 3, 4) are < 5, and its right subtree nodes (6, 9) are > 5. Recursively, each of the subtrees must also obey the binary search tree constraint: in the (1, 3, 4) subtree, the 3 is the root, the 1 < 3 and 4 > 3.

Watch out for the exact wording in the problems -- a "binary search tree" is different from a "binary tree".

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As everybody above has explained about the difference between binary tree and binary search tree, i am just adding how to test whether the given binary tree is binary search tree.

``````boolean b = new Sample().isBinarySearchTree(n1, Integer.MIN_VALUE, Integer.MAX_VALUE);
.......
.......
.......
public boolean isBinarySearchTree(TreeNode node, int min, int max)
{

if(node == null)
{
return true;
}

boolean left = isBinarySearchTree(node.getLeft(), min, node.getValue());
boolean right = isBinarySearchTree(node.getRight(), node.getValue(), max);

return left && right && (node.getValue()<max) && (node.getValue()>=min);

}
``````

Hope it will help you. Sorry if i am diverting from the topic as i felt it's worth mentioning this here.

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Either the left or the right subtree can be empty. Your code doesn't handle that case correctly. – EJP Nov 28 '15 at 2:48

A binary search tree is a special kind of binary tree which exhibits the following property: for any node n, every descendant node's value in the left subtree of n is less than the value of n, and every descendant node's value in the right subtree is greater than the value of n.

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a binary tree is a whose children are not more than two while a binary search tree is a tree that follows the variant property which says that, the left child should be less than the root node's key and the right child should be greater than the root node's key.

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Binary search tree: when inorder traversal is made on binary tree, you get sorted values of inserted items Binary tree: no sorted order is found in any kind of traversal

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No sorted order need be found. A binary search tree is also a binary tree. They are not mutually exclusive. BST is a proper subset of BT. – EJP Nov 28 '15 at 2:49

Binary Tree stands for a data structure which is made up of nodes that can only have two children references.

Binary Search Tree (BST) on the other hand, is a special form of Binary Tree data structure where each node has a comparable value, and smaller valued children attached to left and larger valued children attached to the right.

Thus, all BST's are Binary Tree however only some Binary Tree's may be also BST. Notify that BST is a subset of Binary Tree.

So, Binary Tree is more of a general data-structure than Binary Search Tree. And also you have to notify that Binary Search Tree is a sorted tree whereas there is no such set of rules for generic Binary Tree.

### Binary Tree

A `Binary Tree` which is not a `BST`;

``````         5
/   \
/     \
9       2
/ \     / \
15   17  19  21
``````

### Binary Search Tree (sorted Tree)

A Binary Search Tree which is also a Binary Tree;

``````         50
/    \
/      \
25      75
/  \    /  \
20    30 70   80
``````

### Binary Search Tree Node property

Also notify that for any parent node in the BST;

• All the left nodes have smaller value than the value of the parent node. In the upper example, the nodes with values { 20, 25, 30 } which are all located on the left (left descendants) of 50, are smaller than 50.

• All the right nodes have greater value than the value of the parent node. In the upper example, the nodes with values { 70, 75, 80 } which are all located on the right (right descendants) of 50, are greater than 50.

There is no such a rule for Binary Tree Node. The only rule for Binary Tree Node is having two childrens so it self-explains itself that why called binary.

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To check wheather or not a given Binary Tree is Binary Search Tree here's is an Alternative Approach .

Traverse Tree In Inorder Fashion (i.e. Left Child --> Parent --> Right Child ) , Store Traversed Node Data in a temporary Variable lets say temp , just before storing into temp , Check wheather current Node's data is higher then previous one or not . Then just break it out , Tree is not Binary Search Tree else traverse untill end.

Below is an example with Java:

``````public static boolean isBinarySearchTree(Tree root)
{
if(root==null)
return false;

isBinarySearchTree(root.left);
if(tree.data<temp)
return false;
else
temp=tree.data;
isBinarySearchTree(root.right);
return true;
}
``````

Maintain temp variable outside

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Either subtree can be null. Your algorithm doesn't handle that case correctly. – EJP Nov 28 '15 at 2:50

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