| Poisson_Theorem {ExpRep} | R Documentation |
Poisson Theorem.
Description
Given n Bernoulli experiments, with success probability p (p small), this function calculates the approximate probability that a successful event occurs exactly m times.
Usage
Poisson_Theorem(n, m, p)
Arguments
n |
An integer value representing the number of repetitions of the Bernoulli experiment. |
m |
An integer value representing the number of times that a successful event occurs in the n repetitions of the Bernoulli experiment. |
p |
A real value with the probability that a successful event will happen in any single Bernoulli experiment (called the probability of success). |
Details
Bernoulli experiments are sequences of events, in which successive experiments are independent and at each experiment the probability of appearance of a "successful" event (p) remains constant. The value of n must be high and the value of p must be very small.
Value
A numerical value representing the approximate probability that a successful event occurs exactly m times.
Note
Department of Mathematics. University of Oriente. Cuba.
Author(s)
Larisa Zamora and Jorge Diaz
References
Gnedenko, B. V. (1978). The Theory of Probability. Mir Publishers. Moscow.
See Also
Integral_Theorem, Local_Theorem.
Examples
Prob<-Poisson_Theorem(n=100,m=50,p=0.002)
Prob
## The function is currently defined as
function (n, m, p)
{
landa <- n * p
P <- dpois(m, landa)
return(P)
}