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Find maximum (or minimum) in Binary Tree

Given a Binary Tree, find the maximum(or minimum) element in it. For example, maximum in the following Binary Tree is 9.

In Binary Search Tree, we can find maximum by traversing right pointers until we reach the rightmost node. But in Binary Tree, we must visit every node to figure out maximum. So the idea is to traverse the given tree and for every node return maximum of 3 values. 

  1. Node’s data.
  2. Maximum in node’s left subtree.
  3. Maximum in node’s right subtree.

Below is the implementation of above approach. 




// C++ program to find maximum and
// minimum in a Binary Tree
#include <bits/stdc++.h>
#include <iostream>
using namespace std;
 
// A tree node
class Node {
public:
    int data;
    Node *left, *right;
 
    /* Constructor that allocates a new
    node with the given data and NULL
    left and right pointers. */
    Node(int data)
    {
        this->data = data;
        this->left = NULL;
        this->right = NULL;
    }
};
 
// Returns maximum value in a given
// Binary Tree
int findMax(Node* root)
{
    // Base case
    if (root == NULL)
        return INT_MIN;
 
    // Return maximum of 3 values:
    // 1) Root's data 2) Max in Left Subtree
    // 3) Max in right subtree
    int res = root->data;
    int lres = findMax(root->left);
    int rres = findMax(root->right);
    if (lres > res)
        res = lres;
    if (rres > res)
        res = rres;
    return res;
}
 
// Driver Code
int main()
{
    Node* NewRoot = NULL;
    Node* root = new Node(2);
    root->left = new Node(7);
    root->right = new Node(5);
    root->left->right = new Node(6);
    root->left->right->left = new Node(1);
    root->left->right->right = new Node(11);
    root->right->right = new Node(9);
    root->right->right->left = new Node(4);
 
    // Function call
    cout << "Maximum element is " << findMax(root) << endl;
 
    return 0;
}
 
// This code is contributed by
// rathbhupendra




// C program to find maximum and minimum in a Binary Tree
#include <limits.h>
#include <stdio.h>
#include <stdlib.h>
 
// A tree node
struct Node {
    int data;
    struct Node *left, *right;
};
 
// A utility function to create a new node
struct Node* newNode(int data)
{
    struct Node* node
        = (struct Node*)malloc(sizeof(struct Node));
    node->data = data;
    node->left = node->right = NULL;
    return (node);
}
 
// Returns maximum value in a given Binary Tree
int findMax(struct Node* root)
{
    // Base case
    if (root == NULL)
        return INT_MIN;
 
    // Return maximum of 3 values:
    // 1) Root's data 2) Max in Left Subtree
    // 3) Max in right subtree
    int res = root->data;
    int lres = findMax(root->left);
    int rres = findMax(root->right);
    if (lres > res)
        res = lres;
    if (rres > res)
        res = rres;
    return res;
}
 
// Driver code
int main(void)
{
    struct Node* NewRoot = NULL;
    struct Node* root = newNode(2);
    root->left = newNode(7);
    root->right = newNode(5);
    root->left->right = newNode(6);
    root->left->right->left = newNode(1);
    root->left->right->right = newNode(11);
    root->right->right = newNode(9);
    root->right->right->left = newNode(4);
 
    // Function call
    printf("Maximum element is %d \n", findMax(root));
 
    return 0;
}




// Java code to Find maximum (or minimum) in
// Binary Tree
 
// A binary tree node
class Node {
    int data;
    Node left, right;
 
    public Node(int data)
    {
        this.data = data;
        left = right = null;
    }
}
 
class BinaryTree {
    Node root;
 
    // Returns the max value in a binary tree
    static int findMax(Node node)
    {
        if (node == null)
            return Integer.MIN_VALUE;
 
        int res = node.data;
        int lres = findMax(node.left);
        int rres = findMax(node.right);
 
        if (lres > res)
            res = lres;
        if (rres > res)
            res = rres;
        return res;
    }
 
    /* Driver code */
    public static void main(String args[])
    {
        BinaryTree tree = new BinaryTree();
        tree.root = new Node(2);
        tree.root.left = new Node(7);
        tree.root.right = new Node(5);
        tree.root.left.right = new Node(6);
        tree.root.left.right.left = new Node(1);
        tree.root.left.right.right = new Node(11);
        tree.root.right.right = new Node(9);
        tree.root.right.right.left = new Node(4);
 
        // Function call
        System.out.println("Maximum element is "
                           + tree.findMax(tree.root));
    }
}
 
// This code is contributed by Kamal Rawal




# Python3 program to find maximum
# and minimum in a Binary Tree
 
# A class to create a new node
 
 
class newNode:
    def __init__(self, data):
        self.data = data
        self.left = self.right = None
 
# Returns maximum value in a
# given Binary Tree
 
 
def findMax(root):
 
    # Base case
    if (root == None):
        return float('-inf')
 
    # Return maximum of 3 values:
    # 1) Root's data 2) Max in Left Subtree
    # 3) Max in right subtree
    res = root.data
    lres = findMax(root.left)
    rres = findMax(root.right)
    if (lres > res):
        res = lres
    if (rres > res):
        res = rres
    return res
 
 
# Driver Code
if __name__ == '__main__':
    root = newNode(2)
    root.left = newNode(7)
    root.right = newNode(5)
    root.left.right = newNode(6)
    root.left.right.left = newNode(1)
    root.left.right.right = newNode(11)
    root.right.right = newNode(9)
    root.right.right.left = newNode(4)
 
    # Function call
    print("Maximum element is",
          findMax(root))
 
# This code is contributed by PranchalK




// C# code to Find maximum (or minimum) in
// Binary Tree
using System;
 
// A binary tree node
public class Node {
    public int data;
    public Node left, right;
 
    public Node(int data)
    {
        this.data = data;
        left = right = null;
    }
}
 
public class BinaryTree {
    public Node root;
 
    // Returns the max value in a binary tree
    public static int findMax(Node node)
    {
        if (node == null) {
            return int.MinValue;
        }
 
        int res = node.data;
        int lres = findMax(node.left);
        int rres = findMax(node.right);
 
        if (lres > res) {
            res = lres;
        }
        if (rres > res) {
            res = rres;
        }
        return res;
    }
 
    /* Driver code */
    public static void Main(string[] args)
    {
        BinaryTree tree = new BinaryTree();
        tree.root = new Node(2);
        tree.root.left = new Node(7);
        tree.root.right = new Node(5);
        tree.root.left.right = new Node(6);
        tree.root.left.right.left = new Node(1);
        tree.root.left.right.right = new Node(11);
        tree.root.right.right = new Node(9);
        tree.root.right.right.left = new Node(4);
 
        // Function call
        Console.WriteLine("Maximum element is "
                          + BinaryTree.findMax(tree.root));
    }
}
 
// This code is contributed by Shrikant13




<script>
 
    // Javascript code to Find maximum (or minimum)
    // in Binary Tree
     
    let root;
     
    class Node
    {
        constructor(data) {
           this.left = null;
           this.right = null;
           this.data = data;
        }
    }
   
    // Returns the max value in a binary tree
    function findMax(node)
    {
        if (node == null)
            return Number.MIN_VALUE;
   
        let res = node.data;
        let lres = findMax(node.left);
        let rres = findMax(node.right);
   
        if (lres > res)
            res = lres;
        if (rres > res)
            res = rres;
        return res;
    }
     
    root = new Node(2);
    root.left = new Node(7);
    root.right = new Node(5);
    root.left.right = new Node(6);
    root.left.right.left = new Node(1);
    root.left.right.right = new Node(11);
    root.right.right = new Node(9);
    root.right.right.left = new Node(4);
 
    // Function call
    document.write("Maximum element is "
                       + findMax(root));
     
</script>

Output
Maximum element is 11

Time Complexity: O(N), where N is number of nodes as every node of tree is traversed once by findMax() and findMin().
Auxiliary Space: O(N) , Recursive call for each node tree considered as stack space.

 Similarly, we can find the minimum element in a Binary tree by comparing three values. Below is the function to find a minimum in Binary Tree. 




int findMin(Node *root)
    {
        //code
        if(root==NULL)
     {
         return INT_MAX;
     }
       int res=root->data;
       int left=findMin(root->left);
       int right=findMin(root->right);
       if(left<res)
       {
           res=left;
       }
       if(right<res)
       {
           res=right;
       }
       return res;
    }




// Returns minimum value in a given Binary Tree
int findMin(struct Node* root)
{
    // Base case
    if (root == NULL)
      return INT_MAX;
 
    // Return minimum of 3 values:
    // 1) Root's data 2) Max in Left Subtree
    // 3) Max in right subtree
    int res = root->data;
    int lres = findMin(root->left);
    int rres = findMin(root->right);
    if (lres < res)
      res = lres;
    if (rres < res)
      res = rres;
    return res;
}




// Returns the min value in a binary tree
static int findMin(Node node)
{
    if (node == null)
        return Integer.MAX_VALUE;
 
    int res = node.data;
    int lres = findMin(node.left);
    int rres = findMin(node.right);
 
    if (lres < res)
        res = lres;
    if (rres < res)
        res = rres;
    return res;
}




# Returns the min value in a binary tree
 
def find_min_in_BT(root):
    if root is None:
        return float('inf')
    res = root.data
    lres = find_min_in_BT(root.leftChild)
    rres = find_min_in_BT(root.rightChild)
    if lres < res:
        res = lres
    if rres < res:
        res = rres
    return res
 
# This code is contributed by Subhajit Nandi




// Returns the min value in a binary tree
public static int findMin(Node node)
{
    if (node == null)
        return int.MaxValue;
 
    int res = node.data;
    int lres = findMin(node.left);
    int rres = findMin(node.right);
 
    if (lres < res)
        res = lres;
    if (rres < res)
        res = rres;
    return res;
}
 
// This code is contributed by Code_Mech




<script>
 
      // Returns the min value in a binary tree
      function findMin(node) {
        if (node == null) return 2147483647;
 
        var res = node.data;
        var lres = findMin(node.left);
        var rres = findMin(node.right);
 
        if (lres < res) res = lres;
        if (rres < res) res = rres;
        return res;
      }
       
</script>

Complexity Analysis:

Time Complexity: O(N).
In the recursive function calls, every node of the tree is processed once and hence the complexity due to the function is O(N) if there are total N nodes in the tree. Therefore, the time complexity is O(N).

Space Complexity: O(N).
Recursive call is happening. The every node is processed once and considering the stack space, the space complexity will be O(N).


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