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The Chinese Ring puzzle, the Crazy Elephant Dance puzzle, the b-Spinout puzzle, and Gray codes

Published online by Cambridge University Press:  21 October 2019

Curtis Cooper
Curtis Cooper*
Affiliation:
School of CS & Math., University of Central Missouri, Warrensburg, MO 64093USA e-mail: cooper@ucmo.edu
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Extract

The Chinese Ring puzzle consists of a long loop with a handle on one end and nine rings entwined on the loop (see Figure 1).

Type
Articles
Information
The Mathematical Gazette , Volume 103 , Issue 558 , November 2019 , pp. 431 - 441
Copyright
© Mathematical Association 2019 

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References

Saqiurila, Jenny, How to solve the Chinese ring puzzle (2016), available at https://www.youtube.com/watch?v=nylgimP-NrQ.Google Scholar
Knuth, D. E., Generating all n-tuples, The art of computer programming, Volume 4A: Enumeration and Backtracking, prefascicle 2a, www-cs-faculty.stanford.edu/~knuth/fasc2a.ps.gz Google Scholar
Sloane, N. J. A., The on-line encyclopedia of integer sequences (2018), available at http://oeis.org Google Scholar
John the Geometer, Spin Out solution (2010), available at https://www.youtube.com/watch?v=IkrcDefud2k Google Scholar
Lamphere, R. L., A recurrence relation in the Spinout puzzle, College Mathematics Journal 27 (4) (1996) pp. 286289.CrossRefGoogle Scholar
Merrill, L., Van, T. and Cull, P., A tale of two puzzles, Proceedings of REU in Mathematics at Oregon State (2010) pp. 101147.Google Scholar
TwistyPuzzles.com, Crazy Elephant Dance, accessed April 2019 at http://www.twistypuzzles.com/cgi-bin/puzzle.cgi?pkey=4415 Google Scholar
Kastellorizo, Crazy Elephant Dance puzzle (2015), available at https://www.youtube.com/watch?v=52cTbD7v8FI Google Scholar
Götz, H., Crazy Elephant Dance in Homage to a Pied Puzzler, (eds. E. Pegg Jr., A. H. Schoen and T. Todgers), A. K. Peters (2008) pp. 165174.Google Scholar
Gray, F., Pulse Code Communication, United States Patent Number 2632058, March 17, 1953.Google Scholar
Wikipedia, Gray Code (2019), available at https://en.wikipedia.org/wiki/Gray_code#n-ary_Gray_code Google Scholar
Nijenhuis, A. and Wilf, H., Combinatorial Algorithms for Computers and Calculators (2nd edn.), Academic Press, New York (1978).Google Scholar