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To derive a nice formula for the strength of a Rook on a board of Y height and Z width, here is what you do.
First, examine the geometry of the board. You can see that from the 4 corners, the King can be safely checked a total of (Y - 2) + (Z - 2) times. Recall is a Rook is next to the king while delivering check (like Y -1 or Z - 1) then the king can just capture it.
So, we have 4((Y-2)+(Z-2)) so far.
Basically, in the corner, the king can recapture 2 of the rook checks.
Now move over one square for the king (b8) or move down one square (a7). The king would be able to recapture against 3 rook checks. In the case of the a7 king, it could capture a Rook checking on a8,a6, or b7.
You notice on any rectangular board, there are 4 pairs of squares where this is true. On the 8x8 chessboard these are b8/a7, g8/h7, b2/a1, and g2/h1. So, we have 4 instances of (Y-2) + (Z-1) and 4 instances of (Y-1) + (Z-2).
To 4((Y-2)+(Z-2)) from the 1st calculation we add 4((Y-2) + (Z-1)) + 4((Y-1) + (Z-2)).
Recall a probability is a quotient, that being these total squares of safe check divided by the entire population of arrangements. After placing one piece on the board, there are ZY - 1 slots remaining for the next piece. But the first piece can occupy any one of those ZY squares, so you get fractions in terms of ZY-1 and ZY(ZY-1) when you compute the probabilities.
When you collect all such terms for the rook, you get:
P(safe check) = Z + Y - 6/(ZY - 1) + 2(Z + Y)/[ZY(ZY-1)] for the probability that a Rook can safely check a king on any such size board.
Dear Mr. Trice,
Far be it from my expertise to question your mathematics, but it seems to me that in the message from which I derived this reply opportunity (St. Patrick's Day, March 17th), in paragraph #6 you made an error, saying "b2/a1" when you should have said "b1/a2". The math does not change as a result, because it seems to presume the latter terms, anyway. /Fx/