Manuals/calci/HYPGEOMDIST
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HYPGEOMDIST(n1,n2,n3,n4)
- is the sample's success.
- is the sample's size.
- is population's success.
- is the population size.
is the sample's success.
is the sample's size.
is population's success.
is the population size.Description
- This function gives the result of Hypergeometric distribution.
- This distribution is a discrete probability distribution which is contrast to the binomial distribution.
- A hypergeometric random variable is the number of successes that result from a hypergeometric experiment.
- The probability distribution of a hypergeometric random variable is called a hypergeometric distribution.
- In HYPGEOMDIST(n1,n2,n3,n4) where n1 is thenumber of items in the Sample that are classified as successes.
- n2 is the total number of items in the sample.
- n3 is thenumber of items in the population that are classified as successes and n4 is the total number of items in the sample.
- The following conditions are applied to the Hypergeometric distribution:
- This distribution is applies to sampling without replacement from a finite population whose elements can be classified into two categories like success or Failure.
- The population or set to be sampled consists of N individuals, objects,or elements
- Each individual can be success (S) or a failure (F),
and there areM successes in the population.
- A sample of n individuals is selected without replacement in such a way that each subset of size n is equally likely to be chosen. The Hyper geometric probability distribution is:
P(X=x)=h(x;n,M,N)=(M (N-M
x) n-x) /(N
n) for x is an integer satisfying max(0, n-N+M)<=x<=min(n,M). where x is sample's success.
- n is the sample's size.
- M is population's success and N is the population size.
- Here we can give any positive real numbers.
- Suppose we are assigning any decimals numbers it will change in to Integers.
- This function will give result as error when
- Any one of the argument is nonnumeric.
- n1<0 or n1 is greater than the smaller value of n2 or n3.
- n1 is less than the bigger of 0 or(n2-n4+n3)
- n2<=0 or n2>n4
- n3<=0 or n3>n4 or n4<=0"
Examples
- HARMEAN(1,2,3,4,5)=2.18978102189781
- HARMEAN(20,25,32,41)=27.4649361523969
- HARMEAN(0.25,5.4,3.7,10.1,15.2)=1.0821913906985883
- HARMEAN(3,5,0,2)=NAN
- HARMEAN(1,-2,4)=NAN
See Also