# Hypergeometric Distribution Calculator English Español

In statistics, the hypergeometric distribution is a function to predict the probability of success in a random 'n' draws of elements from the sample without repetition. The method is used if the probability of success is not equal to the fixed number of trials. It is applied in number theory, partitions, physics, etc. Enter the number of size and success of the population and sample in the hypergeometric distribution calculator to find the cumulative and hypergeometric distribution.

In statistics, the hypergeometric distribution is a function to predict the probability of success in a random 'n' draws of elements from the sample without repetition. The method is used if the probability of success is not equal to the fixed number of trials. It is applied in number theory, partitions, physics, etc. Enter the number of size and success of the population and sample in the hypergeometric distribution calculator to find the cumulative and hypergeometric distribution.

Code to add this calci to your website  #### Formula:

Hypergeometric Distribution h(x, N, n, k) = [kCx] [N - kCn - x] / [NCn] Where, k = Number of Selected Items from the Population Size x = Random Variable N = Total Population Size n = Total Sample Size

The hypergeometric distribution calculator finds the probability of success in a population. This technique can be used by a marketing company to know the customers or public views.