Maximum possible prime divisors that can exist in numbers having exactly N divisors
Given an integer N which denotes the number of divisors of any number, the task is to find the maximum prime divisors that are possible in number having N divisors.
Examples:
Input: N = 4
Output: 2Input: N = 8
Output: 3
Approach: The idea is to find the prime factorization of the number N, then the sum of the powers of the prime divisors is the maximum possible prime divisors of a number can have with N divisors.
For Example:
Let the number of divisors of number be 4, Then the possible numbers can be 6, 10, 15,... Divisors of 6 = 1, 2, 3, 6 Total number of prime-divisors = 2 (2, 3) Prime Factorization of 4 = 22 Sum of powers of prime factors = 2
Below is the implementation of the above approach:
C++
// C++ implementation to find the// maximum possible prime divisor// of a number can have N divisors#include <iostream>using namespace std;#define ll long long int// Function to find the// maximum possible prime divisors// of a number can have with N divisorsvoid findMaxPrimeDivisor(int n){ int max_possible_prime = 0; // Number of time number // divided by 2 while (n % 2 == 0) { max_possible_prime++; n = n / 2; } // Divide by other prime numbers for (int i = 3; i * i <= n; i = i + 2) { while (n % i == 0) { max_possible_prime++; n = n / i; } } // If the last number of also // prime then also include it if (n > 2) { max_possible_prime++; } cout << max_possible_prime << "\n";}// Driver Codeint main(){ int n = 4; // Function Call findMaxPrimeDivisor(n); return 0;} |
Java
// Java implementation to find the// maximum possible prime divisor// of a number can have N divisorsimport java.util.*;class GFG{// Function to find the// maximum possible prime divisors// of a number can have with N divisorsstatic void findMaxPrimeDivisor(int n){ int max_possible_prime = 0; // Number of time number // divided by 2 while (n % 2 == 0) { max_possible_prime++; n = n / 2; } // Divide by other prime numbers for(int i = 3; i * i <= n; i = i + 2) { while (n % i == 0) { max_possible_prime++; n = n / i; } } // If the last number of also // prime then also include it if (n > 2) { max_possible_prime++; } System.out.print(max_possible_prime + "\n");}// Driver Codepublic static void main(String[] args){ int n = 4; // Function Call findMaxPrimeDivisor(n);}}// This code is contributed by amal kumar choubey |
Python3
# Python3 implementation to find the# maximum possible prime divisor# of a number can have N divisors# Function to find the maximum# possible prime divisors of a# number can have with N divisorsdef findMaxPrimeDivisor(n): max_possible_prime = 0 # Number of time number # divided by 2 while (n % 2 == 0): max_possible_prime += 1 n = n // 2 # Divide by other prime numbers i = 3 while(i * i <= n): while (n % i == 0): max_possible_prime += 1 n = n // i i = i + 2 # If the last number of also # prime then also include it if (n > 2): max_possible_prime += 1 print(max_possible_prime)# Driver Coden = 4# Function CallfindMaxPrimeDivisor(n)# This code is contributed by SHUBHAMSINGH10 |
C#
// C# implementation to find the// maximum possible prime divisor// of a number can have N divisorsusing System;class GFG{// Function to find the// maximum possible prime divisors// of a number can have with N divisorsstatic void findMaxPrimeDivisor(int n){ int max_possible_prime = 0; // Number of time number // divided by 2 while (n % 2 == 0) { max_possible_prime++; n = n / 2; } // Divide by other prime numbers for(int i = 3; i * i <= n; i = i + 2) { while (n % i == 0) { max_possible_prime++; n = n / i; } } // If the last number of also // prime then also include it if (n > 2) { max_possible_prime++; } Console.Write(max_possible_prime + "\n");}// Driver Codepublic static void Main(String[] args){ int n = 4; // Function Call findMaxPrimeDivisor(n);}}// This code is contributed by amal kumar choubey |
Javascript
<script>// JavaScript implementation to find the// maximum possible prime divisor// of a number can have N divisors// Function to find the maximum// possible prime divisors of a// number can have with N divisorsfunction findMaxPrimeDivisor(n){ let max_possible_prime = 0; // Number of time number // divided by 2 while (n % 2 == 0) { max_possible_prime++; n = Math.floor(n / 2); } // Divide by other prime numbers for(let i = 3; i * i <= n; i = i + 2) { while (n % i == 0) { max_possible_prime++; n = Math.floor(n / i); } } // If the last number of also // prime then also include it if (n > 2) { max_possible_prime++; } document.write(max_possible_prime + "\n");}// Driver Codelet n = 4;// Function CallfindMaxPrimeDivisor(n);// This code is contributed by Surbhi Tyagi.</script> |
Output:
2
Time Complexity: O(sqrt(N) * logN )
Auxiliary Space: O(1)
Please Login to comment...