Eleven checkered pieces: ten P-shaped and one
L-shaped. Goal: arrange into a regular 8x8 chessboard. Key features:
no overlapping but proper altering of the two-colored cells.
Checkered capital L-shaped pieces have to create an ordinary 8x8
chessboard. Your goal is just to find their proper positions within it.
Guess it will be easy?
Can you pack a checkered T-shape and seven checkered L-shapes into a
regular 8x8 checkerboard so that to completely fill it in a way that dark and
light cells are properly alternating?
Do you think it is hard enough to assemble 14 different pieces into a
regular 8x8 checkerboard? Isn't there any connection between the name and
the puzzle itself?
Restore a simple 5x5 checkerboard from the six pieces scattered around.
Don't forget to alternate the colors of the cells. Are there many ways to
make the board?
