making a new puzzle from an old one A bandsaw project making a new puzzle from an old one Sam Loyd (1841 to 1911) was a great puzzler. His little books contain hundreds of original ideas. Here is one of his puzzles “Dissect a Greek cross and re-arrange the pieces to make a square. Do it with as few cuts as possible”
Making a new puzzle from an old one Here is Sam Loyd’s solution – only two cuts. And a nice “Aha!” moment. Interesting – but quite a lot of trouble for a puzzle that will be used only once. Can it be made better?
Making a new puzzle from an old one But cut one of the complicated pieces in two (making five in all). Now several more re-arrangements are possible And the woodwork is a bit easier
Making a new puzzle from an old one Make just one more cut (that makes six pieces) and a whole range of new shapes becomes possible
Making a new puzzle from an old one With a six piece puzzle, the pieces are easy to make and the number of nice shapes is over 30
Making a new puzzle from an old one The basic triangle behind the cross to square puzzle. Sides are 2, 1, and √5 (about 2.236) Angles are 26 ½ and 63 ½ degrees (but let's calculate these numbers)
Making a new puzzle from an old one The sizes of the three triangles are in the ratio of 1 : 2 : √5. (remember Pythagoras?) They fit together in unusual ways
cos(θ) = (a2 + b2 – c2) / 2ab a = 1.0, b = √5 = 2.236, c = 2.0 Use the "cosine rule" and the cos-1 button on the calculator to calculate angles cos(θ) = (a2 + b2 – c2) / 2ab a = 1.0, b = √5 = 2.236, c = 2.0 cos(θ) = (1.0 + 5.0 – 4.0) / 2 x 1.0 x 2.236 = 2.0 / 4.472 = 0.4472 so θ = 63.43°
Cutting the pieces for the new puzzle – jigs for the bandsaw The six pieces of the puzzle are cut from sheet that is 60mm wide and about 8mm thick. The angles of the triangles are 63 ½ , 23 ½ and 90 degrees
Cutting the pieces for the new puzzle – jigs for the bandsaw Several pieces 60mm wide and 8mm thick can be cut at the same time. The first jig is used to make the long cut at 63 ½ degrees. The others are used in sequence to produce all the pieces. Each jig is designed to be used with the rip fence set accurately at 60mm
A puzzle made on the router The 6-piece "burr" Burr puzzles all look alike from the outside, the complexity is in the details of the cuts This one is the simplest Three identical pieces Two identical pieces One solid piece
Six-piece "burr" puzzles Six blocks are needed for each puzzle – there are many ways of cutting the internal notches. In these pieces the notches go all the way through (so they can be cut by a router). This is not always the case.
Six-piece "burr" puzzles Six blocks are needed for each puzzle – in this case 25mm x 25mm x 75mm There are four ways of making router cuts in the pieces. Two "outer" cuts (red and blue) and two "inner" cuts (green and yellow)
Six-piece "burr" puzzles The router jig has two position for holding the 75mm pieces, one for an "outer" cut and one for an "inner" cut The cover holds the two pieces in place and prevents them rising up while the router is operating The bottom is attached to a dust extractor (not shown)
Six-piece "burr" puzzles The router sits on the cover and is guided by the side rails. To get a good finish the sides of each groove are pre-cut on the bandsaw A 12.5mm square end router bit is used for making the grooves
Using the lathe and the pillar drill A cylindrical "burr" Instead of square section pieces, this puzzle has six cylinders and a base. They are turned on the lathe and bored on the pillar drill
Six-piece cylindrical "burr" puzzle After turning, the cylinders are cross-bored (off-centre) in a jig to form the semi-circular depressions As before there are three identical pieces, two identical pieces and a solid piece
Six-piece cylindrical "burr" puzzle The base is also turned and bored (off-centre) on the lathe Using the base, the pieces may be re-assembled, like this
Web site : www.bellwoodwork.com Puzzle Making for Woodworkers Donald Bell SFW Meeting, January 2011 Email : donald@marchland.org Web site : www.bellwoodwork.com