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A Note on Derangements

Published online by Cambridge University Press:  03 November 2016

M. T. L. Bizley
M. T. L. Bizley*
Affiliation:
Empire House, St. Martins-le-Grand, London, E.C.I
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Extract

One of the best known of all classical elementary combinatorial problems is the enumeration of the derangements of n letters A1 A2,…, An, i.e., the permutations of these letters in a row so that, for every i, At is not the ¿th letter. The question is frequently presented in the form of an office boy who puts n differently addressed letters into n envelopes; we then seek the number of ways (w„) in which he can send every letter to a wrong address. Textbooks almost invariably solve the problem by deducing from general reasoning the recurrence relation :

Type
Research Article
Information
The Mathematical Gazette , Volume 51 , Issue 376 , May 1967 , pp. 118 - 120
Copyright
Copyright © Mathematical Association 1967 

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References

1. Bizley, M. T. L., (1957), Probability: an intermediate textbook. Cambridge Univ. Press. Google Scholar
2. Bizley, M. T. L., (1960), “A note on some elementary derangement and allied problems”. J. Inst. Actuar. Stud. Soc, Cambridge Univ. Press 16, p. 147.Google Scholar
3. Joseph, A. W. and Bizley, M. T. L. (1960), “The two-pack matching problem”. J. Boy. Statist. Soc. (B), 22, p. 114.Google Scholar
4. Bizley, M. T. L. (1963), “A problem in permutations”. Amer. Math. Monthly, 70, p. 722.Google Scholar