MathDB

For a positive integer

n

, we consider an

n \times n

board and tiles with dimensions

1 \times 1, 1 \times 2, ..., 1 \times n

. In how many ways exactly can

\frac12 n (n + 1)

cells of the board are colored red, so that the red squares can all be covered by placing the

n

tiles all horizontally, but also by placing all

n

tiles vertically?
Two colorings that are not identical, but by rotation or reflection from the board into each other count as different.

Problem Statement