Lessons from the famous 17th-century paradox of the Chevalier de Méré

José Daniel López-Barrientos; Eliud Silva; Enrique Lemus-Rodríguez

doi:10.1111/test.12321

Lessons from the famous 17th-century paradox of the Chevalier de Méré

José Daniel López-Barrientos, Eliud Silva, Enrique Lemus-Rodríguez

Research output: Contribution to journal › Article › peer-review

1 Scopus citations

Abstract

We take advantage of a combinatorial misconception and the famous paradox of the Chevalier de Méré to present the multiplication rule for independent events; the principle of inclusion and exclusion in the presence of disjoint events; the median of a discrete-type random variable, and a confidence interval for a large sample. Moreover, we pay tribute to our original bibliographic sources by providing two computational tools to facilitate the students' insights on these topics.

Original language	English
Pages (from-to)	36-44
Number of pages	9
Journal	Teaching Statistics
Volume	45
Issue number	1
DOIs	https://doi.org/10.1111/test.12321
State	Published - 1 Jan 2023

Keywords

confidence intervals
median
multiplication rule
principle of inclusion and exclusion

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10.1111/test.12321

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Lessons from the famous 17th-century paradox of the Chevalier de Méré

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Keywords

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