Primality Test | Set 1 (Introduction and School Method)

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 the 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. 

 true
 false

Time complexity: O(n)
Auxiliary Space: O(1)

Optimized School Method: We can do the following optimizations: Instead of checking till n, we can check till √n because a larger factor of n must be a multiple of a smaller factor that has been already checked. The implementation of this method is as follows:

 true
 false

Time Complexity: √n
Auxiliary Space: O(1)

Another approach: It is based on the fact that all primes greater than 3 are of the form 6k ± 1, where k is any integer greater than 0. This is because all integers can be expressed as (6k + i), where i = −1, 0, 1, 2, 3, or 4. And note that 2 divides (6k + 0), (6k + 2), and (6k + 4) and 3 divides (6k + 3). So, a more efficient method is to test whether n is divisible by 2 or 3, then to check through all numbers of the form 6k ± 1 <= √n. This is 3 times faster than testing all numbers up to √n. (Source: wikipedia).  

Below is the implementation of the above approach:

 true
 false

Time Complexity: √n
Auxiliary Space: O(1)