Poisson Cumulative Distribution ....

[Distribution] - [Poisson CD]

Calculates the cumulative probability in a Poisson distribution that success will occur on or before a specified trial.

0713 To calculate Poisson cumulative probability for the data below and graph the result

Lower bound: 2

Upper bound: 3

Mean: 2.26

Inverse Poisson Cumulative Distribution ....

[Inv. Distribution] - [Inverse Poisson CD]

Calculates the minimum number of trials of a Poisson cumulative probability distribution for specified values.

-

 t

 

0714 To calculate inverse Poisson cumulative distribution for the data below and graph the result

Poisson cumulative probability: 0.8074

Mean: 2.26

Geometric Distribution Probability ....

[Distribution] - [Geometric PD]

Calculates the probability in a geometric distribution that the success will occur on a specified trial.



(x = 1, 2, 3, ...)

p: probability of success (0 s p s 1)

Geometric Cumulative Distribution ....

[Distribution] - [Geometric CD]

Calculates the cumulative probability in a geometric distribution that the success will occur on or before a specified trial.

Inverse Geometric Cumulative Distribution ....

[Inv. Distribution] - [Inverse Geo CD]

Calculates the minimum number of trials of a geometric cumulative probability distribution for specified values.

m

Σ t

x =1

Hypergeometric Distribution Probability .... [Distribution] - [Hypergeometric PD]

$ = 2×102 0

 

Calculates the probability in a hypergeometric distribution that the success will occur on a

1

specified trial.

 

Hypergeometric Cumulative Distribution ....

[Distribution] - [Hypergeometric CD]

Calculates the cumulative probability in a hypergeometric distribution that the success will occur on or before a specified trial.

3

 

$ = 2×102 0

45$6

1

Inverse Hypergeometric Cumulative Distribution .... [Inv. Distribution] - [Inverse Hypergeometric]

 

Calculates the minimum number of trials of a hypergeometric cumulative probability

7

 

distribution for specified values.

$ s 2×102 0

 

48

1

Chapter 7: Statistics Application

147