Given a positive integer, check if the number is prime or not. A prime is a natural number greater than 1 that has no positive divisors other than 1 and itself. Examples of first few prime numbers are {2, 3, 5,
Examples :
Input: n = 11 Output: true Input: n = 15 Output: false Input: n = 1 Output: false
School Method
A simple solution is to iterate through all numbers from 2 to n-1 and for every number check if it divides n. If we find any number that divides, we return false.
Below is the implementation of this method.
C++
// A school method based C++ program to check if a // number is prime #include <bits/stdc++.h> using namespace std; bool isPrime(int n) { // Corner case if (n <= 1) return false; // Check from 2 to n-1 for (int i=2; i<n; i++) if (n%i == 0) return false; return true; } // Driver Program to test above function int main() { isPrime(11)? cout << " true\n": cout << " false\n"; isPrime(15)? cout << " true\n": cout << " false\n"; return 0; } |
Java
// A school method based JAVA program // to check if a number is prime class GFG { static boolean isPrime(int n) { // Corner case if (n <= 1) return false; // Check from 2 to n-1 for (int i = 2; i < n; i++) if (n % i == 0) return false; return true; } // Driver Program public static void main(String args[]) { if(isPrime(11)) System.out.println(" true"); else System.out.println(" false"); if(isPrime(15)) System.out.println(" true"); else System.out.println(" false"); } } // This code is contributed // by Nikita Tiwari. |
Python3
# A school method based Python3 # program to check if a number # is prime def isPrime(n): # Corner case if n <= 1: return False # Check from 2 to n-1 for i in range(2, n): if n % i == 0: return False; return True # Driver Program to test above function print("true") if isPrime(11) else print("false") print("true") if isPrime(14) else print("false") # This code is contributed by Smitha Dinesh Semwal |
C#
// A optimized school method based C# // program to check if a number is prime using System; namespace prime { public class GFG { public static bool isprime(int n) { // Corner cases if (n <= 1) return false; for (int i = 2; i < n; i++) if (n % i == 0) return false; return true; } // Driver program public static void Main() { if (isprime(11)) Console.WriteLine("true"); else Console.WriteLine("false"); if (isprime(15)) Console.WriteLine("true"); else Console.WriteLine("false"); } } } // This code is contributed by Sam007 |
PHP
<?php // A school method based PHP // program to check if a number // is prime function isPrime($n) { // Corner case if ($n <= 1) return false; // Check from 2 to n-1 for ($i = 2; $i < $n; $i++) if ($n % $i == 0) return false; return true; } // Driver Code $tet = isPrime(11) ? " true\n" : " false\n"; echo $tet; $tet = isPrime(15) ? " true\n" : " false\n"; echo $tet; // This code is contributed by m_kit ?> |
Output :
true false
Time complexity of this solution is O(n)
Optimized School Method
We can do following optimizations:
- Instead of checking till n, we can check till √n because a larger factor of n must be a multiple of smaller factor that has been already checked.
- The algorithm can be improved further by observing that all primes are of the form 6k ± 1, with the exception of 2 and 3. This is because all integers can be expressed as (6k + i) for some integer k and for i = ?1, 0, 1, 2, 3, or 4; 2 divides (6k + 0), (6k + 2), (6k + 4); and 3 divides (6k + 3). So a more efficient method is to test if n is divisible by 2 or 3, then to check through all the numbers of form 6k ± 1. (Source: wikipedia)
- Primality Test | Set 2 (Fermat Method)
- Sieve of Eratosthenes
- Primality Test | Set 3 (Miller–Rabin)
- Efficient program to print all prime factors of a given number
- Prime Numbers
- Number of Permutations such that no Three Terms forms Increasing Subsequence
- Check if the first and last digit of the smallest number forms a prime
- Print all substring of a number without any conversion
- Complement of a number with any base b
- Check if Decimal representation of an Octal number is divisible by 7
Below is the implementation of this solution.
C++
// A optimized school method based C++ program to check // if a number is prime #include <bits/stdc++.h> using namespace std; bool isPrime(int n) { // Corner cases if (n <= 1) return false; if (n <= 3) return true; // This is checked so that we can skip // middle five numbers in below loop if (n%2 == 0 || n%3 == 0) return false; for (int i=5; i*i<=n; i=i+6) if (n%i == 0 || n%(i+2) == 0) return false; return true; } // Driver Program to test above function int main() { isPrime(11)? cout << " true\n": cout << " false\n"; isPrime(15)? cout << " true\n": cout << " false\n"; return 0; } |
Java
// A optimized school method based Java // program to check if a number is prime import java.io.*; class GFG { static boolean isPrime(int n) { // Corner cases if (n <= 1) return false; if (n <= 3) return true; // This is checked so that we can skip // middle five numbers in below loop if (n % 2 == 0 || n % 3 == 0) return false; for (int i = 5; i * i <= n; i = i + 6) if (n % i == 0 || n % (i + 2) == 0) return false; return true; } // Driver Program public static void main(String args[]) { if(isPrime(11)) System.out.println(" true"); else System.out.println(" false"); if(isPrime(15)) System.out.println(" true"); else System.out.println(" false"); } } /*This code is contributed by Nikita Tiwari.*/ |
Python3
# A optimized school method based # Python3 program to check # if a number is prime def isPrime(n) : # Corner cases if (n <= 1) : return False if (n <= 3) : return True # This is checked so that we can skip # middle five numbers in below loop if (n % 2 == 0 or n % 3 == 0) : return False i = 5 while(i * i <= n) : if (n % i == 0 or n % (i + 2) == 0) : return False i = i + 6 return True # Driver Program if(isPrime(11)) : print(" true") else : print(" false") if(isPrime(15)) : print(" true") else : print(" false") # This code is contributed # by Nikita Tiwari. |
C#
// A optimized school method based C# // program to check if a number is prime using System; class GFG { public static bool isPrime(int n) { // Corner cases if (n <= 1) return false; if (n <= 3) return true; // This is checked so that we // can skip middle five numbers // in below loop if (n % 2 == 0 || n % 3 == 0) return false; for (int i = 5; i * i <= n; i = i + 6) if (n % i == 0 || n % (i + 2) == 0) return false; return true; } // Driver Code public static void Main() { if (isPrime(11)) Console.WriteLine("true"); else Console.WriteLine("false"); if (isPrime(15)) Console.WriteLine("true"); else Console.WriteLine("false"); } } // This code is contributed by aj_36 |
PHP
<?php // A optimized school method // based PHP program to check // if a number is prime function isPrime($n) { // Corner cases if ($n <= 1) return false; if ($n <= 3) return true; // This is checked so that we can skip // middle five numbers in below loop if ($n % 2 == 0 || $n % 3 == 0) return false; for($i = 5; $i * $i <= $n; $i = $i + 6) if ($n % $i == 0 || $n % ($i + 2) == 0) return false; return true; } // Driver Code if(isPrime(11)) echo " true\n"; else echo " false\n"; if(isPrime(15)) echo " true\n"; else echo " false\n"; // This code is contributed ajit ?> |
Output :
true false
Time complexity of this solution is O(√n)
Primality Test | Set 2 (Fermat Method)
References:
https://en.wikipedia.org/wiki/Prime_number
http://www.cse.iitk.ac.in/users/manindra/presentations/FLTBasedTests.pdf
https://en.wikipedia.org/wiki/Primality_test
This article is contributed by Ajay. Please write comments if you find anything incorrect, or you want to share more information about the topic discussed above
Improved By : jit_t
Recommended Posts:
Writing code in comment? Please use ide.geeksforgeeks.org, generate link and share the link here.