hypergeometric_pdf
Evaluates the hypergeometric probability function.
Synopsis
#include<imsls.h>
floatimsls_f_hypergeometric_pdf (intk, intn, intm, intl)
The type doublefunction is imsls_d_hypergeometric_pdf.
Required Arguments
intk (Input)
Argument for which the hypergeometric probability function is to be evaluated.
intn (Input)
Sample size. n must be greater than zero and greater than or equal to k.
intm (Input)
Number of defectives in the lot.
int l (Input)
Lot size. l must be greater than or equal to n and m.
Return Value
The probability that a hypergeometric random variable takes a value equal to k. This value is the probability that exactly k defectives occur in a sample of size n drawn from a lot of size l that contains m defectives.
Description
The function imsls_f_hypergeometic_pdf evaluates the probability function of a hypergeometric random variable with parameters n, l, and m. The hypergeometric random variable X can be thought of as the number of items of a given type in a random sample of size n that is drawn without replacement from a population of size l containing m items of this type. The probability function is
where
and
imsls_f_hypergeometic_pdf evaluates the expression using log gamma functions.
Example
Suppose X is a hypergeometric random variable with n = 100, l = 1000, and m = 70. In this example, we evaluate the probability function at 7.
 
#include <imsls.h>
#include <stdio.h>
 
int main()
{
    int    k=7, n = 100, l = 1000, m = 70;
    float  pr;
    pr = imsls_f_hypergeometric_pdf(k, n, m, l);
    printf("The probability that X is equal to "
        "%d is %6.4f\n", k, pr);
}
Output
 
The probability that X is equal to 7 is 0.1628