Adam of Moorside School sent us in his
description of a possible painting for the three by three
square:
The outside of the square should be green. The rest of one of the
corner squares should be yellow. The rest of another corner
square should be blue. The other two corner squares should have
one side blue and the other side yellow. Then two of the squares
in between the corner squares should have two touching sides
yellow and one side blue. The other two squares in between the
corner squares should have two touching sides blue and one side
yellow. The middle square should be half yellow, half blue.
Adam's square looks like this:
Arthur sent us these great pictures for
four by four and five by five squares. Thank you Arthur!
Jenny made a prediction:
``I noticed that in an n ×n square there are a total on n2
small squares, and therefore a total of 4 n2 edges to be coloured.
Each colour takes up 4 n of these edges, so it should be possible to
colour an n ×n square with n different colours. To do this,
we need to arrange for all the colours to have four cornerpieces and 4 (n-2)
edge pieces."
