Sum of first N natural numbers which are divisible by 2 and 7

Given a number N. The task is to find the sum of all those numbers from 1 to N that are divisible by 2 or by 7.
Examples: 
 

Input : N = 7
Output : 19
sum = 2 + 4 + 6 + 7
Input : N = 14 
Output : 63
sum = 2 + 4 + 6 + 7 + 8 + 10 + 12 + 14

Brute Force Approach:

A brute force approach to solve this problem would be to loop through all the numbers from 1 to N, and for each number, check if it is divisible by 2 or 7. If it is, then add it to the result. At the end of the loop, return the result.

Below is the implementation of the above approach: 

117

Time Complexity: O(N)

Space Complexity: O(1)

Approach: To solve the problem, follow the below steps:
->Find the sum of numbers that are divisible by 2 upto N. Denote it by S1. 
->Find the sum of numbers that are divisible by 7 upto N. Denote it by S2. 
->Find the sum of numbers that are divisible by 14(2*7) upto N. Denote it by S3. 
->The final answer will be S1 + S2 – S3.
In order to find the sum, we can use the general formula of A.P. which is: 
 

Sn = (n/2) * {2*a + (n-1)*d}

For S1: The total numbers that will be divisible by 2 upto N will be N/2 and the series will be 2, 4, 6, 8, …. 
 

Hence, 
S1 = ((N/2)/2) * (2 * 2 + (N/2 - 1) * 2)

For S2: The total numbers that will be divisible by 7 up to N will be N/7 and the series will be 7, 14, 21, 28, …… 
 

Hence, 
S2 = ((N/7)/2) * (2 * 7 + (N/7 - 1) * 7)

For S3: The total numbers that will be divisible by 14 upto N will be N/14. 
 

Hence, 
S3 = ((N/14)/2) * (2 * 14 + (N/14 - 1) * 14)

Therefore, the result will be: 
 

S = S1 + S2 - S3

Below is the implementation of the above approach: 
 

117

Time Complexity: O(1), since there is no loop or recursion.

Auxiliary Space: O(1), since no extra space has been taken.