Bayes' theorem

English

Alternative forms

Bayes theorem
Bayes's theorem

Etymology

Named after English mathematician Thomas Bayes (1701–1761), who developed an early formulation. The modern expression of the theorem is due to Pierre-Simon Laplace, who extended Bayes' work but was apparently unaware of it.

Proper noun

Bayes' theorem

(probability theory) A theorem expressed as an equation that describes the conditional probability of an event or state given prior knowledge of another event.
- 2010, Jonathan Harrington, Phonetic Analysis of Speech Corpora, page 327,
  The starting point for many techniques in probabilistic classification is Bayes' theorem, which provides a way of relating evidence to a hypothesis.
- 2011, Allen Downey, Think Stats, O'Reilly, page 56,
  Bayes's theorem is a relationship between the conditional probabilities of two events.
- 2013, Norman Fenton, Martin Neil, Risk Assessment and Decision Analysis with Bayesian Networks, Taylor & Francis (CRC Press), page 131,
  We have now seen how Bayes' theorem enables us to correctly update a prior probability for some unknown event when we see evidence about the event.

Usage notes

The theorem is stated mathematically as:

\displaystyle P(A\mid B)={\frac {P(B\mid A)\,P(A)}{P(B)}}

,

where $\textstyle A$ and $\textstyle B$ are events with $\textstyle P(B)\neq 0$ , and

$\textstyle P(A)$ and $\textstyle P(B)$ are the marginal probabilities of observing $\textstyle A$ and $\textstyle B$ without regard to each other.
The conditional probability $\textstyle P(A\mid B)$ is the probability of observing event $\textstyle A$ given that $\textstyle B$ is true.
Similarly, $\textstyle P(B\mid A)$ is the probability of observing event $\textstyle B$ given that $\textstyle A$ is true.