Sum of distances of all nodes from a given node
Given a Binary Tree and an integer target, denoting the value of a node, the task is to find the sum of distances of all nodes from the given node.
Examples:
Input: target = 3
Output: 19
Explanation:
Distance of Nodes 1, 6, 7 from the Node 3 = 1
Distance of the Node 2 from the Node 3 = 2
Distance of the Nodes 4, 5 from the Node 3 = 3
Distance of the Nodes 8, 9 from the Node 3 = 4
Sum of the distances = (1 + 1 + 1) + (2) + (3 + 3) + (4 + 4) = 19.Input: target = 4
Output: 18
Naive Approach: The simplest idea to solve this problem is that, whenever a node is traversed on the left or right of a node, then the distances of the nodes their subtrees reduces by 1, and distance of the rest of the nodes from that node increases by 1.
Therefore, the following relation gives the sum of distances of all nodes from a node, say u:
sumDists(u)= sumDists(parent(u)) – (Nodes in the left and right subtree of u) + (N – Nodes in the left and right subtree of u)
where,
sumDists(u): Sum of distances of all nodes from the node u
sumDists(parent(u)): Sum of distances of all nodes from the parent node of u
Follow the steps below to solve the problem:
- Create a function to find the number of nodes in the left and right subtree of the given node(including the given node).
- Create a function to find the sum of depths of the node and variable sum denotes the sum of the distance of all nodes from the target.
- Traverse the tree using DFS(Depth First Search) and for each node perform the following:
- If the target matches with the current node then update sum as distance.
- Else:
- If root->left is not null, Find the number of nodes in the left subtree and pass the sum of the distance of all nodes from the root->left node as tempSum.
- If root->right is not null, Find the number of nodes in the right subtree and pass the sum of the distance of all nodes from the root->rightnode as tempSum.
- On reaching the target node, print the sum of the distance of nodes from the target node.
Below is the implementation of the above approach:
C++
// C++ program for the above approach #include <bits/stdc++.h> using namespace std; // Structure of a // Binary Tree Node class TreeNode { public : int data; TreeNode* left; TreeNode* right; }; // Function that allocates a new node // with the given data and NULL to its // left and right pointers TreeNode* newNode( int data) { // Allocate the node TreeNode* Node = new TreeNode(); // Allocate Memory Node->data = data; Node->left = NULL; Node->right = NULL; return (Node); } // Function which calculates sum // of depths of all nodes int sumofdepth(TreeNode* root, int l) { // Base Case if (root == NULL) return 0; // Return recursively return l + sumofdepth(root->left, l + 1) + sumofdepth(root->right, l + 1); } // Function to count of nodes // in the left and right subtree int Noofnodes(TreeNode* root) { // Base Case if (root == NULL) return 0; // Return recursively return Noofnodes(root->left) + Noofnodes(root->right) + 1; } // Stores the sum of distances // of all nodes from given node int sum = 0; // Function to find sum of distances // of all nodes from a given node void distance(TreeNode* root, int target, int distancesum, int n) { // If target node matches // with the current node if (root->data == target) { sum = distancesum; return ; } // If left of current node exists if (root->left) { // Count number of nodes // in the left subtree int nodes = Noofnodes( root->left); // Update sum int tempsum = distancesum - nodes + (n - nodes); // Recur for the left subtree distance(root->left, target, tempsum, n); } // If right is not null if (root->right) { // Find number of nodes // in the left subtree int nodes = Noofnodes( root->right); // Applying the formula given // in the approach int tempsum = distancesum - nodes + (n - nodes); // Recur for the right subtree distance(root->right, target, tempsum, n); } } // Driver Code int main() { // Input tree TreeNode* root = newNode(1); root->left = newNode(2); root->right = newNode(3); root->left->left = newNode(4); root->left->right = newNode(5); root->right->left = newNode(6); root->right->right = newNode(7); root->left->left->left = newNode(8); root->left->left->right = newNode(9); int target = 3; // Sum of depth of all // nodes from root node int distanceroot = sumofdepth(root, 0); // Number of nodes in the // left and right subtree int totalnodes = Noofnodes(root); distance(root, target, distanceroot, totalnodes); // Print the sum of distances cout << sum; return 0; } |
Java
// Java program for the above approach import java.io.*; class GFG{ // Structure of a // Binary Tree Node static class TreeNode { int data; TreeNode left, right; } // Function that allocates a new node // with the given data and NULL to its // left and right pointers static TreeNode newNode( int data) { TreeNode Node = new TreeNode(); Node.data = data; Node.left = Node.right = null ; return (Node); } // Function which calculates sum // of depths of all nodes static int sumofdepth(TreeNode root, int l) { // Base Case if (root == null ) return 0 ; // Return recursively return l + sumofdepth(root.left, l + 1 ) + sumofdepth(root.right, l + 1 ); } // Function to count of nodes // in the left and right subtree static int Noofnodes(TreeNode root) { // Base Case if (root == null ) return 0 ; // Return recursively return Noofnodes(root.left) + Noofnodes(root.right) + 1 ; } // Stores the sum of distances // of all nodes from given node public static int sum = 0 ; // Function to find sum of distances // of all nodes from a given node static void distance(TreeNode root, int target, int distancesum, int n) { // If target node matches // with the current node if (root.data == target) { sum = distancesum; return ; } // If left of current node exists if (root.left != null ) { // Count number of nodes // in the left subtree int nodes = Noofnodes(root.left); // Update sum int tempsum = distancesum - nodes + (n - nodes); // Recur for the left subtree distance(root.left, target, tempsum, n); } // If right is not null if (root.right != null ) { // Find number of nodes // in the left subtree int nodes = Noofnodes(root.right); // Applying the formula given // in the approach int tempsum = distancesum - nodes + (n - nodes); // Recur for the right subtree distance(root.right, target, tempsum, n); } } // Driver Code public static void main(String[] args) { // Input tree TreeNode root = newNode( 1 ); root.left = newNode( 2 ); root.right = newNode( 3 ); root.left.left = newNode( 4 ); root.left.right = newNode( 5 ); root.right.left = newNode( 6 ); root.right.right = newNode( 7 ); root.left.left.left = newNode( 8 ); root.left.left.right = newNode( 9 ); int target = 3 ; // Sum of depth of all // nodes from root node int distanceroot = sumofdepth(root, 0 ); // Number of nodes in the // left and right subtree int totalnodes = Noofnodes(root); distance(root, target, distanceroot, totalnodes); // Print the sum of distances System.out.println(sum); } } // This code is contributed by Dharanendra L V |
Python3
# Python3 program for the above approach # Structure of a # Binary Tree Node class TreeNode: def __init__( self , x): self .data = x self .left = None self .right = None # Function which calculates sum # of depths of all nodes def sumofdepth(root, l): # Base Case if (root = = None ): return 0 # Return recursively return l + sumofdepth(root.left, l + 1 ) + sumofdepth(root.right, l + 1 ) # Function to count of nodes # in the left and right subtree def Noofnodes(root): # Base Case if (root = = None ): return 0 # Return recursively return Noofnodes(root.left) + Noofnodes(root.right) + 1 # Stores the sum of distances # of all nodes from given node sum = 0 # Function to find sum of distances # of all nodes from a given node def distance(root, target, distancesum, n): global sum # If target node matches # with the current node if (root.data = = target): sum = distancesum return # If left of current node exists if (root.left): # Count number of nodes # in the left subtree nodes = Noofnodes(root.left) # Update sum tempsum = distancesum - nodes + (n - nodes) # Recur for the left subtree distance(root.left, target, tempsum, n) # If right is not null if (root.right): # Find number of nodes # in the left subtree nodes = Noofnodes(root.right) # Applying the formula given # in the approach tempsum = distancesum - nodes + (n - nodes) # Recur for the right subtree distance(root.right, target, tempsum, n) # Driver Code if __name__ = = '__main__' : # Input tree root = TreeNode( 1 ) root.left = TreeNode( 2 ) root.right = TreeNode( 3 ) root.left.left = TreeNode( 4 ) root.left.right = TreeNode( 5 ) root.right.left = TreeNode( 6 ) root.right.right = TreeNode( 7 ) root.left.left.left = TreeNode( 8 ) root.left.left.right = TreeNode( 9 ) target = 3 # Sum of depth of all # nodes from root node distanceroot = sumofdepth(root, 0 ) # Number of nodes in the # left and right subtree totalnodes = Noofnodes(root) distance(root, target, distanceroot, totalnodes) # Print the sum of distances print ( sum ) # This code is contributed by mohit kumar 29. |
C#
// C# program for the above approach using System; public class GFG{ // Structure of a // Binary Tree Node class TreeNode { public int data; public TreeNode left, right; } // Function that allocates a new node // with the given data and NULL to its // left and right pointers static TreeNode newNode( int data) { TreeNode Node = new TreeNode(); Node.data = data; Node.left = Node.right = null ; return (Node); } // Function which calculates sum // of depths of all nodes static int sumofdepth(TreeNode root, int l) { // Base Case if (root == null ) return 0; // Return recursively return l + sumofdepth(root.left, l + 1) + sumofdepth(root.right, l + 1); } // Function to count of nodes // in the left and right subtree static int Noofnodes(TreeNode root) { // Base Case if (root == null ) return 0; // Return recursively return Noofnodes(root.left) + Noofnodes(root.right) + 1; } // Stores the sum of distances // of all nodes from given node public static int sum = 0; // Function to find sum of distances // of all nodes from a given node static void distance(TreeNode root, int target, int distancesum, int n) { // If target node matches // with the current node if (root.data == target) { sum = distancesum; return ; } // If left of current node exists if (root.left != null ) { // Count number of nodes // in the left subtree int nodes = Noofnodes(root.left); // Update sum int tempsum = distancesum - nodes + (n - nodes); // Recur for the left subtree distance(root.left, target, tempsum, n); } // If right is not null if (root.right != null ) { // Find number of nodes // in the left subtree int nodes = Noofnodes(root.right); // Applying the formula given // in the approach int tempsum = distancesum - nodes + (n - nodes); // Recur for the right subtree distance(root.right, target, tempsum, n); } } // Driver Code public static void Main(String[] args) { // Input tree TreeNode root = newNode(1); root.left = newNode(2); root.right = newNode(3); root.left.left = newNode(4); root.left.right = newNode(5); root.right.left = newNode(6); root.right.right = newNode(7); root.left.left.left = newNode(8); root.left.left.right = newNode(9); int target = 3; // Sum of depth of all // nodes from root node int distanceroot = sumofdepth(root, 0); // Number of nodes in the // left and right subtree int totalnodes = Noofnodes(root); distance(root, target, distanceroot, totalnodes); // Print the sum of distances Console.WriteLine(sum); } } // This code is contributed by shikhasingrajput |
Javascript
<script> // Javascript program for the above approach // Structure of a // Binary Tree Node class TreeNode { constructor(data) { this .left = null ; this .right = null ; this .data = data; } } // Function that allocates a new node // with the given data and NULL to its // left and right pointers function newNode(data) { let Node = new TreeNode(data); return (Node); } // Function which calculates sum // of depths of all nodes function sumofdepth(root, l) { // Base Case if (root == null ) return 0; // Return recursively return l + sumofdepth(root.left, l + 1) + sumofdepth(root.right, l + 1); } // Function to count of nodes // in the left and right subtree function Noofnodes(root) { // Base Case if (root == null ) return 0; // Return recursively return Noofnodes(root.left) + Noofnodes(root.right) + 1; } // Stores the sum of distances // of all nodes from given node let sum = 0; // Function to find sum of distances // of all nodes from a given node function distance(root, target, distancesum, n) { // If target node matches // with the current node if (root.data == target) { sum = distancesum; return ; } // If left of current node exists if (root.left != null ) { // Count number of nodes // in the left subtree let nodes = Noofnodes(root.left); // Update sum let tempsum = distancesum - nodes + (n - nodes); // Recur for the left subtree distance(root.left, target, tempsum, n); } // If right is not null if (root.right != null ) { // Find number of nodes // in the left subtree let nodes = Noofnodes(root.right); // Applying the formula given // in the approach let tempsum = distancesum - nodes + (n - nodes); // Recur for the right subtree distance(root.right, target, tempsum, n); } } // Input tree let root = newNode(1); root.left = newNode(2); root.right = newNode(3); root.left.left = newNode(4); root.left.right = newNode(5); root.right.left = newNode(6); root.right.right = newNode(7); root.left.left.left = newNode(8); root.left.left.right = newNode(9); let target = 3; // Sum of depth of all // nodes from root node let distanceroot = sumofdepth(root, 0); // Number of nodes in the // left and right subtree let totalnodes = Noofnodes(root); distance(root, target, distanceroot, totalnodes); // Print the sum of distances document.write(sum); // This code is contributed by suresh07. </script> |
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Time Complexity: O(N2)
Auxiliary Space: O(1)
Efficient Approach: The above approach can be optimized by adding an extra variable, say size, to denote the count of nodes in its left and the right subtrees, in the structure of a node. This reduces the task of calculating the size of subtrees to constant computational time
Below is the implementation of the above approach:
C++
// C++ program for the above approach #include <bits/stdc++.h> using namespace std; // Structure of a // binary tree node class TreeNode { public : int data, size; TreeNode* left; TreeNode* right; }; // Function that allocates a new node // with the given data and NULL to // its left and right pointers TreeNode* newNode( int data) { TreeNode* Node = new TreeNode(); Node->data = data; Node->left = NULL; Node->right = NULL; // Return newly created node return (Node); } // Function to count the number of // nodes in the left and right subtrees pair< int , int > sumofsubtree(TreeNode* root) { // Initialize a pair that stores // the pair {number of nodes, depth} pair< int , int > p = make_pair(1, 0); // Finding the number of nodes // in the left subtree if (root->left) { pair< int , int > ptemp = sumofsubtree(root->left); p.second += ptemp.first + ptemp.second; p.first += ptemp.first; } // Find the number of nodes // in the right subtree if (root->right) { pair< int , int > ptemp = sumofsubtree(root->right); p.second += ptemp.first + ptemp.second; p.first += ptemp.first; } // Filling up size field root->size = p.first; return p; } // Stores the sum of distances of all // nodes from the given node int sum = 0; // Function to find the total distance void distance(TreeNode* root, int target, int distancesum, int n) { // If target node matches with // the current node if (root->data == target) { sum = distancesum; } // If root->left is not null if (root->left) { // Update sum int tempsum = distancesum - root->left->size + (n - root->left->size); // Recur for the left subtree distance(root->left, target, tempsum, n); } // If root->right is not null if (root->right) { // Apply the formula given // in the approach int tempsum = distancesum - root->right->size + (n - root->right->size); // Recur for the right subtree distance(root->right, target, tempsum, n); } } // Driver Code int main() { // Input tree TreeNode* root = newNode(1); root->left = newNode(2); root->right = newNode(3); root->left->left = newNode(4); root->left->right = newNode(5); root->right->left = newNode(6); root->right->right = newNode(7); root->left->left->left = newNode(8); root->left->left->right = newNode(9); int target = 3; pair< int , int > p = sumofsubtree(root); // Total number of nodes int totalnodes = p.first; distance(root, target, p.second, totalnodes); // Print the sum of distances cout << sum << endl; return 0; } |
Java
// Java program for the above approach import java.util.*; class GFG { static class pair { int first, second; public pair( int first, int second) { this .first = first; this .second = second; } } // Structure of a // binary tree node static class TreeNode { int data, size; TreeNode left; TreeNode right; }; // Function that allocates a new node // with the given data and null to // its left and right pointers static TreeNode newNode( int data) { TreeNode Node = new TreeNode(); Node.data = data; Node.left = null ; Node.right = null ; // Return newly created node return (Node); } // Function to count the number of // nodes in the left and right subtrees static pair sumofsubtree(TreeNode root) { // Initialize a pair that stores // the pair {number of nodes, depth} pair p = new pair( 1 , 0 ); // Finding the number of nodes // in the left subtree if (root.left != null ) { pair ptemp = sumofsubtree(root.left); p.second += ptemp.first + ptemp.second; p.first += ptemp.first; } // Find the number of nodes // in the right subtree if (root.right != null ) { pair ptemp = sumofsubtree(root.right); p.second += ptemp.first + ptemp.second; p.first += ptemp.first; } // Filling up size field root.size = p.first; return p; } // Stores the sum of distances of all // nodes from the given node static int sum = 0 ; // Function to find the total distance static void distance(TreeNode root, int target, int distancesum, int n) { // If target node matches with // the current node if (root.data == target) { sum = distancesum; } // If root.left is not null if (root.left != null ) { // Update sum int tempsum = distancesum - root.left.size + (n - root.left.size); // Recur for the left subtree distance(root.left, target, tempsum, n); } // If root.right is not null if (root.right != null ) { // Apply the formula given // in the approach int tempsum = distancesum - root.right.size + (n - root.right.size); // Recur for the right subtree distance(root.right, target, tempsum, n); } } // Driver Code public static void main(String[] args) { // Input tree TreeNode root = newNode( 1 ); root.left = newNode( 2 ); root.right = newNode( 3 ); root.left.left = newNode( 4 ); root.left.right = newNode( 5 ); root.right.left = newNode( 6 ); root.right.right = newNode( 7 ); root.left.left.left = newNode( 8 ); root.left.left.right = newNode( 9 ); int target = 3 ; pair p = sumofsubtree(root); // Total number of nodes int totalnodes = p.first; distance(root, target, p.second, totalnodes); // Print the sum of distances System.out.print(sum + "\n" ); } } // This code is contributed by shikhasingrajput |
Python3
# Python3 program for the above approach # Stores the sum of distances of all # nodes from the given node sum = 0 # Structure of a # binary tree node class TreeNode: def __init__( self , data): self .data = data self .size = 0 self .left = None self .right = None # Function to count the number of # nodes in the left and right subtrees def sumofsubtree(root): # Initialize a pair that stores # the pair {number of nodes, depth} p = [ 1 , 0 ] # Finding the number of nodes # in the left subtree if (root.left): ptemp = sumofsubtree(root.left) p[ 1 ] + = ptemp[ 0 ] + ptemp[ 1 ] p[ 0 ] + = ptemp[ 0 ] # Find the number of nodes # in the right subtree if (root.right): ptemp = sumofsubtree(root.right) p[ 1 ] + = ptemp[ 0 ] + ptemp[ 1 ] p[ 0 ] + = ptemp[ 0 ] # Filling up size field root.size = p[ 0 ] return p # Function to find the total distance def distance(root, target, distancesum, n): global sum # If target node matches with # the current node if (root.data = = target): sum = distancesum # If root.left is not null if (root.left): # Update sum tempsum = (distancesum - root.left.size + (n - root.left.size)) # Recur for the left subtree distance(root.left, target, tempsum, n) # If root.right is not null if (root.right): # Apply the formula given # in the approach tempsum = (distancesum - root.right.size + (n - root.right.size)) # Recur for the right subtree distance(root.right, target, tempsum, n) # Driver Code if __name__ = = '__main__' : # Input tree root = TreeNode( 1 ) root.left = TreeNode( 2 ) root.right = TreeNode( 3 ) root.left.left = TreeNode( 4 ) root.left.right = TreeNode( 5 ) root.right.left = TreeNode( 6 ) root.right.right = TreeNode( 7 ) root.left.left.left = TreeNode( 8 ) root.left.left.right = TreeNode( 9 ) target = 3 p = sumofsubtree(root) # Total number of nodes totalnodes = p[ 0 ] distance(root, target, p[ 1 ], totalnodes) # Print the sum of distances print ( sum ) # This code is contributed by ipg2016107 |
C#
// C# program for the above approach using System; public class GFG { class pair { public int first, second; public pair( int first, int second) { this .first = first; this .second = second; } } // Structure of a // binary tree node class TreeNode { public int data, size; public TreeNode left; public TreeNode right; }; // Function that allocates a new node // with the given data and null to // its left and right pointers static TreeNode newNode( int data) { TreeNode Node = new TreeNode(); Node.data = data; Node.left = null ; Node.right = null ; // Return newly created node return (Node); } // Function to count the number of // nodes in the left and right subtrees static pair sumofsubtree(TreeNode root) { // Initialize a pair that stores // the pair {number of nodes, depth} pair p = new pair(1, 0); // Finding the number of nodes // in the left subtree if (root.left != null ) { pair ptemp = sumofsubtree(root.left); p.second += ptemp.first + ptemp.second; p.first += ptemp.first; } // Find the number of nodes // in the right subtree if (root.right != null ) { pair ptemp = sumofsubtree(root.right); p.second += ptemp.first + ptemp.second; p.first += ptemp.first; } // Filling up size field root.size = p.first; return p; } // Stores the sum of distances of all // nodes from the given node static int sum = 0; // Function to find the total distance static void distance(TreeNode root, int target, int distancesum, int n) { // If target node matches with // the current node if (root.data == target) { sum = distancesum; } // If root.left is not null if (root.left != null ) { // Update sum int tempsum = distancesum - root.left.size + (n - root.left.size); // Recur for the left subtree distance(root.left, target, tempsum, n); } // If root.right is not null if (root.right != null ) { // Apply the formula given // in the approach int tempsum = distancesum - root.right.size + (n - root.right.size); // Recur for the right subtree distance(root.right, target, tempsum, n); } } // Driver Code public static void Main(String[] args) { // Input tree TreeNode root = newNode(1); root.left = newNode(2); root.right = newNode(3); root.left.left = newNode(4); root.left.right = newNode(5); root.right.left = newNode(6); root.right.right = newNode(7); root.left.left.left = newNode(8); root.left.left.right = newNode(9); int target = 3; pair p = sumofsubtree(root); // Total number of nodes int totalnodes = p.first; distance(root, target, p.second, totalnodes); // Print the sum of distances Console.Write(sum + "\n" ); } } // This code is contributed by shikhasingrajput |
Javascript
<script> // Javascript program for the above approach class pair { constructor(first,second) { this .first = first; this .second = second; } } // Structure of a // binary tree node class Node { // Function that allocates a new node // with the given data and null to // its left and right pointers constructor(data) { this .data=data; this .size=0; this .left= this .right= null ; } } // Function to count the number of // nodes in the left and right subtrees function sumofsubtree(root) { // Initialize a pair that stores // the pair {number of nodes, depth} let p = new pair(1, 0); // Finding the number of nodes // in the left subtree if (root.left != null ) { let ptemp = sumofsubtree(root.left); p.second += ptemp.first + ptemp.second; p.first += ptemp.first; } // Find the number of nodes // in the right subtree if (root.right != null ) { let ptemp = sumofsubtree(root.right); p.second += ptemp.first + ptemp.second; p.first += ptemp.first; } // Filling up size field root.size = p.first; return p; } // Stores the sum of distances of all // nodes from the given node let sum = 0; // Function to find the total distance function distance(root,target,distancesum,n) { // If target node matches with // the current node if (root.data == target) { sum = distancesum; } // If root.left is not null if (root.left != null ) { // Update sum let tempsum = distancesum - root.left.size + (n - root.left.size); // Recur for the left subtree distance(root.left, target, tempsum, n); } // If root.right is not null if (root.right != null ) { // Apply the formula given // in the approach let tempsum = distancesum - root.right.size + (n - root.right.size); // Recur for the right subtree distance(root.right, target, tempsum, n); } } // Driver Code // Input tree let root = new Node(1); root.left = new Node(2); root.right = new Node(3); root.left.left = new Node(4); root.left.right = new Node(5); root.right.left = new Node(6); root.right.right = new Node(7); root.left.left.left = new Node(8); root.left.left.right = new Node(9); let target = 3; let p = sumofsubtree(root); // Total number of nodes let totalnodes = p.first; distance(root, target, p.second, totalnodes); // Print the sum of distances document.write(sum + "<br>" ); // This code is contributed by unknown2108 </script> |
19
Time Complexity: O(N)
Auxiliary Space: O(1)
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