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Bayes' theorem

2007-08-01 16:48:46

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Bayes' theorem (also known as Bayes' rule or Bayes' law) is a result in

probability theory, which relates the conditional and marginal probability

distributions of random variables. In some interpretations of probability,

Bayes' theorem tells how to update or revise beliefs in light of new evidence a

posteriori.

The probability of an event A conditional on another event B is generally

different from the probability of B conditional on A. However, there is a

definite relationship between the two, and Bayes' theorem is the statement of

that relationship.

As a formal theorem, Bayes' theorem is valid in all interpretations of

probability. However, frequentist and Bayesian interpretations disagree about

the kinds of things to which probabilities should be assigned in applications:

frequentists assign probabilities to random events according to their

frequencies of occurrence or to subsets of populations as proportions of the

whole; Bayesians assign probabilities to propositions that are uncertain. A

consequence is that Bayesians have more frequent occasion to use Bayes'

theorem. The articles on Bayesian probability and frequentist probability

discuss these debates at greater length.