hypergeometric_uncertain
Aleatory uncertain discrete variable - hypergeometric
Topics
discrete_variables, aleatory_uncertain_variables
Specification
Alias: None
Arguments: INTEGER
Default: no hypergeometric uncertain variables
Child Keywords:
Required/Optional |
Description of Group |
Dakota Keyword |
Dakota Keyword Description |
|---|---|---|---|
Required |
Parameter for the hypergeometric probability distribution describing the size of the total population |
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Required |
Distribution parameter for the hypergeometric distribution describing the size of the population subset of interest |
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Required |
Distribution parameter for the hypergeometric distribution describing the number of draws from a combined population |
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Optional |
Initial values for variables |
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Optional |
Labels for the variables |
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Description
The hypergeometric probability density is used when sampling without replacement from a total population of elements where
The resulting element of each sample can be separated into one of two non-overlapping sets
The probability of success changes with each sample.
The density function for the hypergeometric distribution is given by:
where the three distribution parameters are:
\(N\): the total population
\(m\): the number of items in the selected population (e.g. the number of white balls in the full urn of \(N\) items)
\(n\) the size of the sample drawn (e.g. number of balls drawn)
In addition,
\(x\), the abscissa of the density function, indicates the number of successes (e.g. drawing a white ball)
\(\left(\begin{array}{c}a\\b\end{array}\right)\) indicates a binomial coefficient (“a choose b”)
Theory
The hypergeometric is often described using an urn model. For example, say we have a total population containing \(N\) balls, and we know that \(m\) of the balls are white and the remaining balls are green. If we draw \(n\) balls from the urn without replacement, the hypergeometric distribution describes the probability of drawing \(x\) white balls.
