Can the king change all the numbers in the squares
Source:
April 19, 2013
Problem Statement
In each of the squares of a chessboard an arbitrary integer is written. A king starts to move on the board. Whenever the king moves to some square, the number in that square is increased by . Is it always possible to make the numbers on the chessboard:
(a) all even;
(b) all divisible by ;
(c) all equal?