打印高度为素数的二叉树的节点
给定一棵二叉树,我们的任务是从根节点开始打印高度为素数的节点。
*例:*
**Input:**
1
/ \
2 3
/ \
4 5
**Output:** 4 5
**Explanation:**
For this tree:
Height of Node 1 - 0,
Height of Node 2 - 1,
Height of Node 3 - 1,
Height of Node 4 - 2,
Height of Node 5 - 2\.
Hence, the nodes whose height
is a prime number are 4, and 5.
**Input:**
1
/ \
2 5
/ \
3 4
**Output:** 3 4
**Explanation:**
For this tree:
Height of Node 1 - 0,
Height of Node 2 - 1,
Height of Node 3 - 2,
Height of Node 4 - 2,
Height of Node 5 - 1\.
Hence, the nodes whose height
is a prime number are 3, and 4.
*方法:*为了解决上面提到的问题,
We must perform Depth First Search (DFS) on the tree, and for each node, store the height of each node when we move down. Iterate the height array of each node and check whether it is prime or prime .* If yes, print the node; otherwise, ignore it.
下面是上述方法的实现:
C++
// C++ implementation of nodes
// at prime height in the given tree
#include <bits/stdc++.h>
using namespace std;
#define MAX 100000
vector<int> graph[MAX + 1];
// To store Prime Numbers
vector<bool> Prime(MAX + 1, true);
// To store height of each node
int height[MAX + 1];
// Function to find the
// prime numbers till 10^5
void SieveOfEratosthenes()
{
int i, j;
Prime[0] = Prime[1] = false;
for (i = 2; i * i <= MAX; i++) {
// Traverse all multiple of i
// and make it false
if (Prime[i]) {
for (j = 2 * i; j < MAX; j += i) {
Prime[j] = false;
}
}
}
}
// Function to perform dfs
void dfs(int node, int parent, int h)
{
// Store the height of node
height[node] = h;
for (int to : graph[node]) {
if (to == parent)
continue;
dfs(to, node, h + 1);
}
}
// Function to find the nodes
// at prime height
void primeHeightNode(int N)
{
// To precompute prime number till 10^5
SieveOfEratosthenes();
for (int i = 1; i <= N; i++) {
// Check if height[node] is prime
if (Prime[height[i]]) {
cout << i << " ";
}
}
}
// Driver code
int main()
{
// Number of nodes
int N = 5;
// Edges of the tree
graph[1].push_back(2);
graph[1].push_back(3);
graph[2].push_back(4);
graph[2].push_back(5);
dfs(1, 1, 0);
primeHeightNode(N);
return 0;
}
Java 语言(一种计算机语言,尤用于创建网站)
// Java implementation of nodes
// at prime height in the given tree
import java.util.*;
class GFG{
static final int MAX = 100000;
@SuppressWarnings("unchecked")
static Vector<Integer> []graph = new Vector[MAX + 1];
// To store Prime Numbers
static boolean []Prime = new boolean[MAX + 1];
// To store height of each node
static int []height = new int[MAX + 1];
// Function to find the
// prime numbers till 10^5
static void SieveOfEratosthenes()
{
int i, j;
Prime[0] = Prime[1] = false;
for(i = 2; i * i <= MAX; i++)
{
// Traverse all multiple of i
// and make it false
if (Prime[i])
{
for(j = 2 * i; j < MAX; j += i)
{
Prime[j] = false;
}
}
}
}
// Function to perform dfs
static void dfs(int node, int parent, int h)
{
// Store the height of node
height[node] = h;
for(int to : graph[node])
{
if (to == parent)
continue;
dfs(to, node, h + 1);
}
}
// Function to find the nodes
// at prime height
static void primeHeightNode(int N)
{
// To precompute prime number till 10^5
SieveOfEratosthenes();
for(int i = 1; i <= N; i++)
{
// Check if height[node] is prime
if (Prime[height[i]])
{
System.out.print(i + " ");
}
}
}
// Driver code
public static void main(String[] args)
{
// Number of nodes
int N = 5;
for(int i = 0; i < Prime.length; i++)
Prime[i] = true;
for(int i = 0; i < graph.length; i++)
graph[i] = new Vector<Integer>();
// Edges of the tree
graph[1].add(2);
graph[1].add(3);
graph[2].add(4);
graph[2].add(5);
dfs(1, 1, 0);
primeHeightNode(N);
}
}
// This code is contributed by 29AjayKumar
Python 3
# Python3 implementation of nodes
# at prime height in the given tree
MAX = 100000
graph = [[] for i in range(MAX + 1)]
# To store Prime Numbers
Prime = [True for i in range(MAX + 1)]
# To store height of each node
height = [0 for i in range(MAX + 1)]
# Function to find the
# prime numbers till 10^5
def SieveOfEratosthenes():
Prime[0] = Prime[1] = False
i = 2
while i * i <= MAX:
# Traverse all multiple of i
# and make it false
if (Prime[i]):
for j in range(2 * i, MAX, i):
Prime[j] = False
i += 1
# Function to perform dfs
def dfs(node, parent, h):
# Store the height of node
height[node] = h
for to in graph[node]:
if (to == parent):
continue
dfs(to, node, h + 1)
# Function to find the nodes
# at prime height
def primeHeightNode(N):
# To precompute prime
# number till 10^5
SieveOfEratosthenes()
for i in range(1, N + 1):
# Check if height[node] is prime
if (Prime[height[i]]):
print(i, end = ' ')
# Driver code
if __name__=="__main__":
# Number of nodes
N = 5
# Edges of the tree
graph[1].append(2)
graph[1].append(3)
graph[2].append(4)
graph[2].append(5)
dfs(1, 1, 0)
primeHeightNode(N)
# This code is contributed by rutvik_56
C#
// C# implementation of nodes
// at prime height in the given tree
using System;
using System.Collections.Generic;
class GFG{
static readonly int MAX = 100000;
static List<int>[] graph = new List<int>[ MAX + 1 ];
// To store Prime Numbers
static bool[] Prime = new bool[MAX + 1];
// To store height of each node
static int[] height = new int[MAX + 1];
// Function to find the
// prime numbers till 10^5
static void SieveOfEratosthenes()
{
int i, j;
Prime[0] = Prime[1] = false;
for (i = 2; i * i <= MAX; i++)
{
// Traverse all multiple of i
// and make it false
if (Prime[i])
{
for (j = 2 * i; j < MAX; j += i)
{
Prime[j] = false;
}
}
}
}
// Function to perform dfs
static void dfs(int node, int parent, int h)
{
// Store the height of node
height[node] = h;
foreach(int to in graph[node])
{
if (to == parent)
continue;
dfs(to, node, h + 1);
}
}
// Function to find the nodes
// at prime height
static void primeHeightNode(int N)
{
// To precompute prime number till 10^5
SieveOfEratosthenes();
for (int i = 1; i <= N; i++)
{
// Check if height[node] is prime
if (Prime[height[i]])
{
Console.Write(i + " ");
}
}
}
// Driver code
public static void Main(String[] args)
{
// Number of nodes
int N = 5;
for (int i = 0; i < Prime.Length; i++)
Prime[i] = true;
for (int i = 0; i < graph.Length; i++)
graph[i] = new List<int>();
// Edges of the tree
graph[1].Add(2);
graph[1].Add(3);
graph[2].Add(4);
graph[2].Add(5);
dfs(1, 1, 0);
primeHeightNode(N);
}
}
// This code is contributed by Amit Katiyar
java 描述语言
<script>
// Javascript implementation of nodes
// at prime height in the given tree
let MAX = 100000;
let graph = []
for(let i = 0; i < MAX + 1; i++){
graph.push([])
}
// To store Prime Numbers
let Prime = new Array(MAX + 1).fill(true);
// To store height of each node
let height = new Array(MAX + 1);
// Function to find the
// prime numbers till 10^5
function SieveOfEratosthenes()
{
let i, j;
Prime[0] = Prime[1] = false;
for (i = 2; i * i <= MAX; i++) {
// Traverse all multiple of i
// and make it false
if (Prime[i]) {
for (j = 2 * i; j < MAX; j += i) {
Prime[j] = false;
}
}
}
}
// Function to perform dfs
function dfs(node, parent, h)
{
// Store the height of node
height[node] = h;
for (let to of graph[node]) {
if (to == parent)
continue;
dfs(to, node, h + 1);
}
}
// Function to find the nodes
// at prime height
function primeHeightNode(N)
{
// To precompute prime number till 10^5
SieveOfEratosthenes();
for (let i = 1; i <= N; i++) {
// Check if height[node] is prime
if (Prime[height[i]]) {
document.write(i + " ");
}
}
}
// Driver code
// Number of nodes
let N = 5;
// Edges of the tree
graph[1].push(2);
graph[1].push(3);
graph[2].push(4);
graph[2].push(5);
dfs(1, 1, 0);
primeHeightNode(N);
// This code is contributed by gfgking
</script>
**Output:
4 5
**
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