You are given an n x n grid where we place some 1 x 1 x 1 cubes that are axis-aligned with the x, y, and z axes.

Each value v = grid[i][j] represents a tower of v cubes placed on top of the cell (i, j).

We view the projection of these cubes onto the xy, yz, and zx planes.

A projection is like a shadow, that maps our 3-dimensional figure to a 2-dimensional plane. We are viewing the "shadow" when looking at the cubes from the top, the front, and the side.

Return the total area of all three projections.

Example 1:

Input: grid = [[1,2],[3,4]]
Output: 17
Explanation: Here are the three projections ("shadows") of the shape made with each axis-aligned plane.
Example 2:

Input: grid = [[2]]
Output: 5
Example 3:

Input: grid = [[1,0],[0,2]]
Output: 8
Example 4:

Input: grid = [[1,1,1],[1,0,1],[1,1,1]]
Output: 14
Example 5:

Input: grid = [[2,2,2],[2,1,2],[2,2,2]]
Output: 21

Constraints:

n == grid.length
n == grid[i].length
1 <= n <= 50
0 <= grid[i][j] <= 50