Out of the blue, a couple of months ago, I was contacted by
Abhishek
informing me of his latest creation and asking whether I wanted one. I had just
mortgaged my soul to the devils (aka Dee Dixon and Tye Stahly) and asked whether
he would wait a month for me to replenish my PayPal and also soothe over the
disgruntled first wife (
Whack! Ouch!)
He was very happy to wait for a bit and duly reminded me after a suitable
period. Luckily, I had a little spare cash and it flew over the wires to
India. This puzzle is available in Oak, Ash, Teak and Mahogany - I decided on
the Oak version but they all look nice.
It drives in a nice green box (the corners of mine had taken a slight
beating from the postal service) and inside is a little folded leaflet with
the instructions (and if you need it, the solution).
Abhishek obviously has a penchant for knots and topology as his previous
puzzle also involved wooden pieces with magnets that needed to be assembled
into an intertwined shape. I needed to resort to Google to understand the
name of the puzzle. I was aware of
David Hilbert
as a famous mathematician but did not know why this puzzle was named after
him. Within a minute the reason sang out to me - the
Hilbert curve
is a fascinating concept describing fractal curves that can be both 2D and
3D space filling:
When I removed the pieces, I realised that there were 8 of them and they all
have similar but not identical shapes and now the reason for the name really
became clear. This is a 3D filling puzzle:
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8 very similar shapes with magnets!
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I set to work making chains of pieces to try and form a cube. It didn't look
too tough and was helped by the fact that the polarities of the magnets were
the same on the equivalent ends of all the pieces. After about a ½ hour, I
realised this was not quite as simple as expected. The pieces fit together
making interesting shapes but after 5 or 6 of them the curve interested itself
or blocked the insertion of the next piece. I made several dozen interesting
shapes that didn't go anywhere:
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Not getting anywhere!
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Finally, I got fed up of random assembling of pieces and actually looked
properly at the shapes that I had - there are 4 pairs of identical pieces which
need to be arranged into the cube shape. It could not possibly be a random
assembly - they had to work in a logical sequence which needed me to to some
think©ing.
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| 4 pairs of pieces |
Once I understood this, then there was much less random trial and error. Thinking in terms of 6 faces and dividing up 8 pieces as 4 pairs was not helping me at all. It needed a few attempts at looking how the pairs could be arranged and thinking of edges (there are 8 in a cube) and I had a lovely little Aha! moment and managed to arrange my magnets in such a way that they all met end to end and formed a cube. Simply delightful - combining mathematics and mechanical puzzling cannot be beaten!
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| A Hilbert cube |
Thank you, Abhishek, this was a delight. I have just realised that putting the pieces back in the box will be another challenge!
I am sure that he would be delighted to sell you a copy if you contact him.
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