Evaluates the hypergeometric distribution function.

The type double procedure is imsl_d_hypergeometric_cdf.

The probability that k or fewer defectives occur in a sample of size n drawn from a lot of size l that contains m defectives.

The function imsl_f_hypergeometric_cdf evaluates the distribution 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 i = max (0, n − l + m).

If k is greater than or equal to i and less than or equal to min (n, m), imsl_f_hypergeometric_cdf sums the terms in this expression for j going from i up to k. Otherwise, 0 or 1 is returned, as appropriate.

To avoid rounding in the accumulation, imsl_f_hypergeometric_cdf performs the summation differently, depending on whether k is greater than the mode of the distribution, which is the greatest integer in (m + 1) (n + 1)/(l + 2).

Suppose X is a hypergeometric random variable with n = 100, l = 1000, and m = 70. This example evaluates the distribution function at 7.