Hypergeometric distribution |
In mathematics, the hypergeometric distribution is a
discrete probability distribution that describes
the number of successes in a sequence of n draws from a finite population without replacement.
A typical example is the following: There is a shipment of N objects in which D are defective. The
hypergeometric distribution describes the probability that in a sample of n distinctive objects drawn from the shipment exactly k objects are
defective.
In general, if a random variable X follows the
hypergeometric distribution with parameters N, D and n, then the probability of getting exactly
k successes is given by
The probability is positive, when k is between max(0, D + n - N) and min(n,
D).
The formula can be understood as follows: There are possible samples (without replacement). There are ways to obtain k defective objects and there are
ways to fill out the rest of the
sample with non-defective objects.
When the population size is large (i.e. N is large) the hypergeometric distribution can be approximated reasonably
well with a binomial distribution with parameters
n (number of trials) and p = D / N (probability of success in a single trial).
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