Sum of both diagonals of a spiral odd-order square matrix

We have given a spiral matrix of odd-order, in which we start with the number 1 as center and moving to the right in a clockwise direction.

Examples : 

Input : n = 3 
Output : 25
Explanation : spiral matrix = 
7 8 9
6 1 2
5 4 3
The sum of diagonals is 7+1+3+9+5 = 25

Input : n = 5
Output : 101
Explanation : spiral matrix of order 5
21 22 23 23 25
20  7  8  9 10
19  6  1  2 11
18  5  4  3 12
17 16 15 14 13
The sum of diagonals is 21+7+1+3+13+
25+9+5+17 = 101

If we take a closer look at the spiral matrix of n x n, we can notice that top right corner element has value n². Value of top left corner is (n^2) – (n-1) [Why? not that we move ant-clockwise in spiral matrix, therefore we get value of top left after subtracting n-1 from top right]. Similarly values of bottom left corner is (n^2) – 2(n-1) and bottom right corner is (n^2) – 3(n-1). After adding all the four corners we get 4[(n^2)] – 6(n-1).

Let f(n) be sum of diagonal elements for a n x n matrix. Using above observations, we can recursively write f(n) as: 

f(n) = 4[(n^2)] – 6(n-1) + f(n-2)  

From above relation, we can find the sum of all diagonal elements of a spiral matrix with the help of iterative method.

spiralDiaSum(n)
{
    if (n == 1)
       return 1;

    // as order should be only odd
    // we should pass only odd-integers
    return (4*n*n - 6*n + 6 + spiralDiaSum(n-2));
}

Below is the implementation. 

Output : 

261

Time complexity: O(n).
Auxiliary Space: O(n), as implicit stack is created due to recursive call

This article is contributed by Aarti_Rathi and Shivam Pradhan . If you like neveropen and would like to contribute, you can also write an article using write.geeksforgeeks.org or mail your article to review-team@geeksforgeeks.org. See your article appearing on the neveropen main page and help other Geeks.