binomial distribution
Contents
EnglishEdit
NounEdit
binomial distribution (plural binomial distributions)
 (probability theory, statistics) The discrete probability distribution of the number of successes in a sequence of n independent trials, each of which yields success with probability p.
 1979, M. G. Bulmer, Principles of Statistics, Dover, page 81,
 The first two have long histories in statistical theory, the binomial distribution having been discovered by James Bernoulli about 1700 and the Poisson distribution, which is a limiting form of the binomial distribution, by S. D. Poisson in 1837.
 2003, Jim Albert, Teaching Statistics Using Baseball, Mathematical Association of America, page 263,
 The number of hits by a player in a given number of atbats can be represented by a binomial distribution where the probability of a hit is the player's "true" batting average.
 2008, Lisa Marie Sullivan, Essentials of Biostatistics, Jones and Bartlett Publishers, page 67,
 In any application of the binomial distribution, we must clearly specify which outcome is the success and which is the failure. The binomial distribution model allows us to compute the probability of observing a specified number of successes when the process is repeated a specific number of times (e.g., in a set of patients) and the outcome for a given patient is either a success or a failure.
 1979, M. G. Bulmer, Principles of Statistics, Dover, page 81,
Usage notesEdit
The special case n = 1 (a single trial) is called the Bernoulli distribution.
Derived termsEdit
Related termsEdit
TranslationsEdit
probability distribution

