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The "reverse=true" parameter causes the board to be shown from Black's point of view, that is, with the h8 square at lower-left corner, and a1 at the upper-right. This works for all sizes of the normal chessboard template, but not for the Alice, Bughouse, Omega, or Raumschach templates.
An open knight's tour of a chessboard An animation of an open knight's tour on a 5 × 5 board. A knight's tour is a sequence of moves of a knight on a chessboard such that the knight visits every square exactly once. If the knight ends on a square that is one knight's move from the beginning square (so that it could tour the board again ...
Minishogi board setup. Minishogi (5五将棋 gogo shōgi "5V chess" or "5×5 chess") is a modern variant of shogi (Japanese chess). The game was invented (or rediscovered) around 1970 by Shigenobu Kusumoto of Osaka, Japan.
Sam Loyd's chessboard paradox demonstrates two rearrangements of an 8×8 square. In the "larger" rearrangement (the 5×13 rectangle in the image to the right), the gaps between the figures have a combined unit square more area than their square gaps counterparts, creating an illusion that the figures there take up more space than those in the ...
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The mutilated chessboard Unsuccessful solution to the mutilated chessboard problem: as well as the two corners, two center squares remain uncovered. The mutilated chessboard problem is a tiling puzzle posed by Max Black in 1946 that asks: Suppose a standard 8×8 chessboard (or checkerboard) has two diagonally opposite corners removed, leaving ...
A mathematical chess problem is a mathematical problem which is formulated using a chessboard and chess pieces. These problems belong to recreational mathematics.The most well-known problems of this kind are the eight queens puzzle and the knight's tour problem, which have connection to graph theory and combinatorics.