# checking diagonals in 2d list (Python)

The initial problem: for a given 3x3 tic tac toe board check if one of the players has won.

The simplest solution I have come up so far is rotating the matrix and summing up each row:

``````board
[[0, 1, 2], [3, 4, 5], [6, 7, 8]]

pr(board)
0 1 2
3 4 5
6 7 8

pr(zip(*board))
0 3 6
1 4 7
2 5 8
``````

0..9 numbers above are just for showing positions on the board, normally they would be filled with 1 for player 1 and -1 for player 2 and 0 for unfilled position. Go row by row and if it sums up to 3 or -3 this is the winning block.

However, diagonals are not checked. Is there some way to extract diagonals from such matrix in elegant + highly performant way? I don't mean using trivial indexes "manually" (0, 1, 2), but rather get diagonal of n x n matrix.

P.S. pr is just a helper function for printing 2d list:

``````def pr(x):
for row in x:
print ' '.join(map(str, row))
``````
-
What is the `pr` function? –  David Robinson Feb 26 '13 at 22:36
helper function, see P.S. after my edit now –  John Doe Feb 26 '13 at 22:38

Number your game field with a magic square

``````2|9|4
7|5|3
6|1|8
``````

Now sum up after three moves and check if the sum is 15 --> Winner. You have to check this for every player. Surely you have to recheck after 4th move and 5th move (only the player that started the game)

This is how I solved this problem in my first Java class.

-
although not the direct answer, this is the most creative solution –  John Doe Feb 28 '13 at 15:19

You can get one diagonal with:

``````[r[i] for i, r in enumerate(board)]
# [0, 4, 8]
``````

And the opposite diagonal with:

``````[r[-i-1] for i, r in enumerate(board)]
# [2, 4, 6]
``````
-

Probably what you need is in `numpy`, see Get all the diagonals in a matrix/list of lists in Python. Maybe you can use this, and flip it like you did to get the other solution.

``````if sum(board[i][i] for i in (0, 1, 2)) in (-3, 3):
true
``````
-

The diagonals on a square board lie either where the indices are equal, so for a 3x3 board they are `board[0][0]`, `board[1][1]`, and `board[2][2]` or where the two sum to the board size-1 (3 places in this case): such as `board[0][2]`, `board[1][1]`, and `board[2][0]` -- notice that `board[1][1]` is included in both sets, as it should be. These facts makes it fairly easy to write Python code to compute them:

``````board = [[0, 1, 2], [3, 4, 5], [6, 7, 8]]
BOARD_SIZE = len(board)

diags1 = [board[i][i] for i in xrange(BOARD_SIZE)]
diags2 = [board[i][BOARD_SIZE-1-i] for i in xrange(BOARD_SIZE)]

print diags1
print diags2
``````

Output:

``````[0, 4, 8]
[2, 4, 6]
``````
-

This will give you a list containing the diagonal elements of one direction (top left to bottom right):

``````[board[i][i] for i in range(len(board))]
``````

This will do the same for the opposite direction:

``````[board[i][len(board)-i-1] for i in range(len(board))]
``````
-