Hyper Geometric Distribution:
In statistics, a distribution where selections are made from two groups without replacing members of the groups is known as Hyper geometric distribution. Hyper geometric distribution is the probability distribution of a hyper geometric random variable.
Example:
- balls in an urn – either redor green
- a batch of components – either goodor defective
- a population of people – either male or female
- a population of animals in zoo – either tagged or untagged
- voters – either democrats or republicans
A hyper geometric random variable X has the following probability distribution:
P(X=k) =
Where N – population size,
K – Number of successful states in the population,
n – Number of draws or events,
k – Number of successes.
Properties of a hyper geometric experiment are:
- A sample size of n is collected from a population of N without replacement.
- If k is defined as successes in the population N, then (N−k) items will be defined as failures.
Mean = 
Variance =
There are 52 cards in a deck. Find the probability of getting randomly 1 red card out of two cards chosen without replacement.
total population, N = 52(total cards in a deck)
sample population, n = 2( number of cards chosen)
number of successes in total population, K = 26 (number of red cards)
number of successes in draws, k = 1(number of red cards to be chosen)
P(X=1) =
Let us solve this example using Excel function,
HYPGEOMDIST (sample_s,number_sample,population_s,number_population)
Sample_s is the number of successes in the sample(k).
Number_sample is the size of the sample(n).
Population_s is the number of successes in the population(K).
Number_population is the population size(N).
