Problems

Anna and Beth played rock paper scissors ten times. Rock beat scissors, scissors beat paper and paper beat rock. Anna used rock three times, scissors six times and paper once. Beth used rock twice, scissors four times and paper four times. None of the ten games was a tie. Who won more games?

Consider the \(4!\) possible permutations of the numbers \(1,2,3,4\). Which of those permutations keep the expression \(x_1x_2+x_3x_4\) the same?

In the picture below, there are the \(12\) pentominoes. Is it possible to tile a \(6\times10\) rectangle with them?

Show how to tile a \(5\times12\) rectangle with the twelve pentominoes.

Show how to tile a \(4\times15\) rectangle with the twelve pentominoes.

Is it possible to tile a \(3\times20\) rectangle with the twelve pentominoes?

Show to how to cover the plane with this cube net:

Show how to tile the plane with this cube net:

Imagine a \(5\times6\) rectangular chocolate bar, and you want to split it between you and your \(29\) closest friends, so that each person gets one square. You repeatedly snap the chocolate bar along the grid lines until the rectangle is in \(30\) individual squares. You can’t snap more than one rectangle at a time.

The diagram shows a couple of choices for your first two snaps. For example, in the first picture, you snap along a vertical line, and then snap the left rectangle along a horizontal line.
How many snaps do you need to get the \(30\) squares?

Prove that it’s impossible to cover a \(4\times9\) rectangle with \(9\) ‘T’ tetrominoes (one copy seen in red).