Poisson distribution

In probability and statistics, Poisson distribution is a probability distribution. It is named after Siméon Denis Poisson. It measures the probability that a certain number of events occur within a certain period of time. The events need to be unrelated to each other. They also need to occur with a known average rate, represented by the symbol ${\displaystyle \lambda }$ (lambda).^[1]

More specifically, if a random variable ${\displaystyle X}$ follows Poisson distribution with rate ${\displaystyle \lambda }$, then the probability of the different values of ${\displaystyle X}$ can be described as follows:^[2][3]

${\displaystyle P(X=x)=\frac{e^{-\lambda }{\lambda }^x}{x!}}$ for ${\displaystyle x=0,1,2,\dots }$

Examples of Poisson distribution include:

• The numbers of cars that pass on a certain road in a certain time
• The number of telephone calls a call center receives per minute
• The number of light bulbs that burn out (fail) in a certain amount of time
• The number of mutations in a given stretch of DNA after a certain amount of radiation
• The number of errors that occur in a system
• The number of Property & Casualty insurance claims experienced in a given period of time

• Binomial distribution
• Exponential distribution

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