On a chessboard with a width of $n$ and a height of $n$, rows are numbered from bottom to top from $1$ to $n$, columns are numbered from left to right from $1$ to $n$. Therefore, for each cell of the chessboard, you can assign the coordinates $(r,c)$, where $r$ is the number of the row, and $c$ is the number of the column.

The white king has been sitting in a cell with $(1,1)$ coordinates for a thousand years, while the black king has been sitting in a cell with $(n,n)$ coordinates. They would have sat like that further, but suddenly a beautiful coin fell on the cell with coordinates $(x,y)$...

Each of the monarchs wanted to get it, so they decided to arrange a race according to slightly changed chess rules:

As in chess, the white king makes the first move, the black king makes the second one, the white king makes the third one, and so on. However, in this problem, kings can stand in adjacent cells or even in the same cell at the same time.

The player who reaches the coin first will win, that is to say, the player who reaches the cell with the coordinates $(x,y)$ first will win.

Let's recall that the king is such a chess piece that can move one cell in all directions, that is, if the king is in the $(a,b)$ cell, then in one move he can move from $(a,b)$ to the cells $(a + 1,b)$, $(a - 1,b)$, $(a,b + 1)$, $(a,b - 1)$, $(a + 1,b - 1)$, $(a + 1,b + 1)$, $(a - 1,b - 1)$, or $(a - 1,b + 1)$. Going outside of the field is prohibited.

Determine the color of the king, who will reach the cell with the coordinates $(x,y)$ first, if the white king moves first.