# How to get the both diagonals of an element in a matrix?

Given an mxn matrix, and an element's indices, how can I use pure python (no numpy or any matrix packages) to obtain both diagonals that contain that element?

For example:

``````1  2  3  4
5  6  7  8
9 10 11 12
0  1  0  1
``````

Given element (1, 2), I could get the main diagonal: [2, 7, 12], and [4, 7, 10, 0]. I've seen this post, but I don't care to wrap around the matrix. Also, that solution is very difficult for me to understand, so I'm having trouble re-writing it to fit my needs.

• What exactly is a "matrix" supposed to be in pure Python? – Stefan Pochmann Oct 21 '17 at 21:36
• a multidimensinoal array – AlanH Oct 21 '17 at 21:36
• Given an arbitrary element's location, `mat[i][j]`, the diagonals it is in are realated to `i` & `j` in a fixed way: i.e. `mat[i, j-1]` and `mat[i, j+1]` are two candidate locations (assuming the computed indices are valid). For the other diagonal, examples would be `mat[i-1, j]` and `mat[i+1, j]`. You simply have to gather them together in both directions. Python has no built-in matrix `get_diagonal()` functions. If you don't want wrapping, then don't do it. – martineau Oct 21 '17 at 21:48
• @martineau Those four neighbor locations don't look like diagonals to me... – Stefan Pochmann Oct 21 '17 at 22:30
• @Stefan: Your right, I got the math for the diagonal neighbors wrong, but the basic idea that they all follow the same pattern—which was the main point—and still holds true. – martineau Oct 21 '17 at 23:27

Here's something that does what you want in Pure Python™:

``````mat = [[ 1,  2,  3,  4],
[ 5,  6,  7,  8],
[ 9, 10, 11, 12],
[ 0,  1,  0,  1]]

def get_diags(mat, i0, j0):
""" Return both diagonals that contain element mat[i0][j0]. """
height, width = len(mat), len(mat[0])
summ, diff = i0+j0, i0-j0
diag1, diag2 = [], []
for i in range(height):
for j in range(width):
if i-j == diff:
diag1.append(mat[i][j])
if i+j == summ:
diag2.append(mat[i][j])

return diag1, diag2

print(get_diags(mat, 1, 2))  # -> ([2, 7, 12], [4, 7, 10, 0])
``````