Print all nodes that are at distance k from a leaf node
Given a Binary Tree and a positive integer k, print all nodes that are distance k from a leaf node.
Here the meaning of distance is different from previous post. Here k distance from a leaf means k levels higher than a leaf node. For example if k is more than height of Binary Tree, then nothing should be printed. Expected time complexity is O(n) where n is the number nodes in the given Binary Tree.
The idea is to traverse the tree. Keep storing all ancestors till we hit a leaf node. When we reach a leaf node, we print the ancestor at distance k. We also need to keep track of nodes that are already printed as output. For that we use a boolean array visited[].
C++
/* Program to print all nodes which are at distance k from a leaf */#include <iostream> using namespace std; #define MAX_HEIGHT 10000 struct Node { int key; Node *left, *right; }; /* utility that allocates a new Node with the given key */Node* newNode(int key) { Node* node = new Node; node->key = key; node->left = node->right = NULL; return (node); } /* This function prints all nodes that are distance k from a leaf node path[] --> Store ancestors of a node visited[] --> Stores true if a node is printed as output. A node may be k distance away from many leaves, we want to print it once */void kDistantFromLeafUtil(Node* node, int path[], bool visited[], int pathLen, int k) { // Base case if (node==NULL) return; /* append this Node to the path array */ path[pathLen] = node->key; visited[pathLen] = false; pathLen++; /* it's a leaf, so print the ancestor at distance k only if the ancestor is not already printed */ if (node->left == NULL && node->right == NULL && pathLen-k-1 >= 0 && visited[pathLen-k-1] == false) { cout << path[pathLen-k-1] << " "; visited[pathLen-k-1] = true; return; } /* If not leaf node, recur for left and right subtrees */ kDistantFromLeafUtil(node->left, path, visited, pathLen, k); kDistantFromLeafUtil(node->right, path, visited, pathLen, k); } /* Given a binary tree and a nuber k, print all nodes that are k distant from a leaf*/void printKDistantfromLeaf(Node* node, int k) { int path[MAX_HEIGHT]; bool visited[MAX_HEIGHT] = {false}; kDistantFromLeafUtil(node, path, visited, 0, k); } /* Driver program to test above functions*/int main() { // Let us create binary tree given in the above example Node * 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->right->left->right = newNode(8); cout << "Nodes at distance 2 are: "; printKDistantfromLeaf(root, 2); return 0; } |
chevron_right
filter_none
Java
// Java program to print all nodes at a distance k from leaf // A binary tree node class Node { int data; Node left, right; Node(int item) { data = item; left = right = null; } } class BinaryTree { Node root; /* This function prints all nodes that are distance k from a leaf node path[] --> Store ancestors of a node visited[] --> Stores true if a node is printed as output. A node may be k distance away from many leaves, we want to print it once */ void kDistantFromLeafUtil(Node node, int path[], boolean visited[], int pathLen, int k) { // Base case if (node == null) return; /* append this Node to the path array */ path[pathLen] = node.data; visited[pathLen] = false; pathLen++; /* it's a leaf, so print the ancestor at distance k only if the ancestor is not already printed */ if (node.left == null && node.right == null && pathLen - k - 1 >= 0 && visited[pathLen - k - 1] == false) { System.out.print(path[pathLen - k - 1] + " "); visited[pathLen - k - 1] = true; return; } /* If not leaf node, recur for left and right subtrees */ kDistantFromLeafUtil(node.left, path, visited, pathLen, k); kDistantFromLeafUtil(node.right, path, visited, pathLen, k); } /* Given a binary tree and a nuber k, print all nodes that are k distant from a leaf*/ void printKDistantfromLeaf(Node node, int k) { int path[] = new int[1000]; boolean visited[] = new boolean[1000]; kDistantFromLeafUtil(node, path, visited, 0, k); } // Driver program to test the above functions public static void main(String args[]) { BinaryTree tree = new BinaryTree(); /* Let us construct the tree shown in above diagram */ tree.root = new Node(1); tree.root.left = new Node(2); tree.root.right = new Node(3); tree.root.left.left = new Node(4); tree.root.left.right = new Node(5); tree.root.right.left = new Node(6); tree.root.right.right = new Node(7); tree.root.right.left.right = new Node(8); System.out.println(" Nodes at distance 2 are :"); tree.printKDistantfromLeaf(tree.root, 2); } } // This code has been contributed by Mayank Jaiswal |
chevron_right
filter_none
Python3
# Program to print all nodes which are at # distance k from a leaf # utility that allocates a new Node with # the given key class newNode: def __init__(self, key): self.key = key self.left = self.right = None # This function prints all nodes that # are distance k from a leaf node # path[] -. Store ancestors of a node # visited[] -. Stores true if a node is # printed as output. A node may be k distance # away from many leaves, we want to print it once def kDistantFromLeafUtil(node, path, visited, pathLen, k): # Base case if (node == None): return # append this Node to the path array path[pathLen] = node.key visited[pathLen] = False pathLen += 1 # it's a leaf, so print the ancestor at # distance k only if the ancestor is # not already printed if (node.left == None and node.right == None and pathLen - k - 1 >= 0 and visited[pathLen - k - 1] == False): print(path[pathLen - k - 1], end = " ") visited[pathLen - k - 1] = True return # If not leaf node, recur for left # and right subtrees kDistantFromLeafUtil(node.left, path, visited, pathLen, k) kDistantFromLeafUtil(node.right, path, visited, pathLen, k) # Given a binary tree and a nuber k, # print all nodes that are k distant from a leaf def printKDistantfromLeaf(node, k): global MAX_HEIGHT path = [None] * MAX_HEIGHT visited = [False] * MAX_HEIGHT kDistantFromLeafUtil(node, path, visited, 0, k) # Driver Code MAX_HEIGHT = 10000 # Let us create binary tree given in # the above example 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.right.left.right = newNode(8) print("Nodes at distance 2 are:", end = " ") printKDistantfromLeaf(root, 2) # This code is contributed by pranchalK |
chevron_right
filter_none
C#
using System; // C# program to print all nodes at a distance k from leaf // A binary tree node public class Node { public int data; public Node left, right; public Node(int item) { data = item; left = right = null; } } public class BinaryTree { public Node root; /* This function prints all nodes that are distance k from a leaf node path[] --> Store ancestors of a node visited[] --> Stores true if a node is printed as output. A node may be k distance away from many leaves, we want to print it once */ public virtual void kDistantFromLeafUtil(Node node, int[] path, bool[] visited, int pathLen, int k) { // Base case if (node == null) { return; } /* append this Node to the path array */ path[pathLen] = node.data; visited[pathLen] = false; pathLen++; /* it's a leaf, so print the ancestor at distance k only if the ancestor is not already printed */ if (node.left == null && node.right == null && pathLen - k - 1 >= 0 && visited[pathLen - k - 1] == false) { Console.Write(path[pathLen - k - 1] + " "); visited[pathLen - k - 1] = true; return; } /* If not leaf node, recur for left and right subtrees */ kDistantFromLeafUtil(node.left, path, visited, pathLen, k); kDistantFromLeafUtil(node.right, path, visited, pathLen, k); } /* Given a binary tree and a nuber k, print all nodes that are k distant from a leaf*/ public virtual void printKDistantfromLeaf(Node node, int k) { int[] path = new int[1000]; bool[] visited = new bool[1000]; kDistantFromLeafUtil(node, path, visited, 0, k); } // Driver program to test the above functions public static void Main(string[] args) { BinaryTree tree = new BinaryTree(); /* Let us construct the tree shown in above diagram */ tree.root = new Node(1); tree.root.left = new Node(2); tree.root.right = new Node(3); tree.root.left.left = new Node(4); tree.root.left.right = new Node(5); tree.root.right.left = new Node(6); tree.root.right.right = new Node(7); tree.root.right.left.right = new Node(8); Console.WriteLine(" Nodes at distance 2 are :"); tree.printKDistantfromLeaf(tree.root, 2); } } // This code is contributed by Shrikant13 |
chevron_right
filter_none
Output:
Nodes at distance 2 are: 1 3
Time Complexity: Time Complexity of above code is O(n) as the code does a simple tree traversal.
Please write comments if you find anything incorrect, or you want to share more information about the topic discussed above
Recommended Posts:
- Print the nodes of binary tree as they become the leaf node
- Print all nodes at distance k from a given node
- Number of leaf nodes in the subtree of every node of an n-ary tree
- Sum of nodes on the longest path from root to leaf node
- Implementing a BST where every node stores the maximum number of nodes in the path till any leaf
- Print all leaf nodes of an n-ary tree using DFS
- Print Leaf Nodes at a given Level
- Distance between two nodes of binary tree with node values from 1 to N
- Print all leaf nodes of a binary tree from right to left
- Print Sum and Product of all Non-Leaf nodes in Binary Tree
- Print all leaf nodes of a Binary Tree from left to right
- Print leaf nodes in binary tree from left to right using one stack
- Print All Leaf Nodes of a Binary Tree from left to right | Set-2 ( Iterative Approach )
- Print nodes at k distance from root
- Print nodes at k distance from root | Iterative
- Convert ternary expression to Binary Tree using Stack
- String Range Queries to find the number of subsets equal to a given String
- Cartesian tree from inorder traversal | Segment Tree
- Minimum distance to visit all the nodes of an undirected weighted tree
- Find the largest Complete Subtree in a given Binary Tree
