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Explore the mathematical challenge of fitting 21 triominoes on an 8x8 chessboard with a one-square gap. Discover the unique solution using colorings and polynomials in this intriguing puzzle.
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www.carom-maths.co.uk Activity 2-16: Triominoes
64 = 3 x 21 + 1 So if we can fit 21 triominoes onto the board, then there will be a one square gap. Is this possible? Draw an 8 by 8 grid and try it!
If we can fit 21 triominoes onto the board, then there will be a one square gap. This is possible.
But... try as we might, the gap always appears in the same place, or in one of its rotations.
Can we prove that the blue position is the only position possible for the gap?
Proof 1: Colouring So the gap must be white.
So the only possible solution has the gap as it is below: We should note that we know this solution IS possible!
Proof 2: Polynomials Let us put an algebraic term logically into each square.
Now we will add all the terms in two different ways. Way 1: • (1+x+x2+x3+x4+x5+x6+x7) (1+y+y2+y3+y4+y5+y6+y7) Way 2: ?
What happens if we put down a triominohorizontally? We get (1+x+x2)f(x, y) What happens if we put down a triominovertically? We get (1+y+y2)g(x, y)
So adding all thetriominosplus the gap we get: F(x, y)(1+x+x2)+ G(x, y)(1+y+y2) +xayb and so • (1+x+x2+x3+x4+x5+x6+x7)(1+y+y2+y3+y4+y5+y6+y7) = F(x, y)(1+x+x2)+ G(x, y)(1+y+y2) + xayb
Now we know that if w is one of the complex cube roots of 1, then 1 + w + w2 = 0. So let’s put x = w, y = w in • (1+x+x2+x3+x4+x5+x6+x7)(1+y+y2+y3+y4+y5+y6+y7) = F(x, y)(1+x+x2)+ G(x, y)(1+y+y2) +xayb
What do we get? (1+w)2 = wa+b So w= wa+b So 1= wa+b-1 So a+b-1is divisible by 3.
So possible values for a + b are 4, 7, 10, 13.
Now we know that if w is one of the complex cube roots of 1, then 1 + w2 + w4= 0. So let’s put x = w, y = w2in • (1+x+x2+x3+x4+x5+x6+x7)(1+y+y2+y3+y4+y5+y6+y7) = F(x, y)(1+x+x2)+ G(x, y)(1+y+y2) +xayb
What do we get? (1+w)(1+w2)= wa+2b So 1= wa+2b So a+2bis divisible by 3.
So possible values for a + 2b are 0, 3, 6, 9, 12, 15, 18, 21. Possible values for a + b are 4, 7, 10, 13. So possible values for b < 8 are 2, 5. So possible values for a are 2, 5 (QED!)
With thanks to: Bernard Murphy, and Nick MacKinnon. Carom is written by Jonny Griffiths, mail@jonny.griffiths.net