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Correspondence

Published online by Cambridge University Press:  01 August 2016

J. A. MacDougall
Affiliation:
Department of Mathematics, University of Newcastle, Callaghan, Newcastle, NSW 2308, Australia
Barry Bristow
Affiliation:
Knoll Cottage, The Street, Mortimer, Berks RG7 3PE
Alan D. Cox
Affiliation:
Pen-y-Maes, Ostrey Hill, St Clears, Dyfed SA33 4AJ
Robert MacMillan
Affiliation:
43 Church Road, Woburn Sands MK17 8TG
David Singmaster
Affiliation:
87 Rodenhurst Road, London SW4 8AF Computing, Information Systems and Mathematics, South Bank University, London SE1 0AA
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Abstract

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Type
Letter
Copyright
Copyright © The Mathematical Association 1995

References

1. Althoen, S.C., King, L. & Schilling, K., How long is a game of snakes and ladders? Math. Gaz. 77 (March 1993) pp. 7176.Google Scholar
2. Fawdry, Marguerite, Chinese Childhood. Pollock’s Toy Theatres. London, 1977, p. 183.Google Scholar
3. Tatsuzo, Nasgao, Shina Minzoku-shi [Manners and Customs of the Chinese], Tokyo, 1940–1942, perhaps vol. 2, p. 707.Google Scholar
4. Bell, Robbie and Cornelius, Michael, Board Games Round the World Cambridge Univ. Press, 1988. Snakes and Ladders and the Chinese Promotion Game, pp. 6567.Google Scholar
5. Topsfield, Andrew, The Indian game of snakes and ladders, Artibus Asiae 46: 3 (1985) pp. 203214 + 14 figures.Google Scholar
6. Love, Brian Play The Game Michael Joseph, London, 1978. Snakes & Ladders 1, pp. 2223.Google Scholar
7. Daykin, D.E., Jeacocke, J.E. & Neal, D.G., Markov chains and snakes and ladders. Math. Gaz. 51 (December 1967) pp. 313317.Google Scholar