Independent events in elementary probability theory

Autores: Attila Csenki
Localización: International journal of mathematical education in science and technology, ISSN 0020-739X, Vol. 42, Nº. 5, 2011, págs. 685-691
Idioma: inglés
DOI: 10.1080/0020739x.2011.562313
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Resumen
- In Probability and Statistics taught to mathematicians as a first introduction or to a non-mathematical audience, joint independence of events is introduced by requiring that the multiplication rule is satisfied. The following statement is usually tacitly assumed to hold (and, at best, intuitively motivated): If the n events E1, E2, � , En are jointly independent then any two events A and B built in finitely many steps from two disjoint subsets of {E1, E2, � , En} are also independent. The operations 'union', 'intersection' and 'complementation' are permitted only when forming the events A and B.Here we examine this statement from the point of view of elementary probability theory. The approach described here is accessible also to users of probability theory and is believed to be novel.