Answer: by using Poisson distribution
The warranty for a particular system on a new car is 2 years
P(x=2)= 0.143
There is no limit to the number of warranty claims per car
P(X=0) = 0.449
Step-by-step explanation:
step:-1
A random variable X is said to follow a Poisson distribution if it assumes only non-negative values and its probability distribution is given by
P(X=x) = [tex]\frac{e^{-w}w^{x} }{x!}[/tex]
here w>0 is called the parameter of the distribution
Step 2:- Given mean value of Poisson distribution = 0.8
The warranty for a particular system a new car is 2 years
P(X=x)=P(X=2)=[tex]\frac{e^{-0.8}{0.8^{2} } }{2!}[/tex]
P(x=2)= 0.143
Step 3:-
Given mean value of Poisson distribution = 0.8
There is no limit to the number of warranty claims per car
P(X=x)=P(X=0)=[tex]\frac{e^{-0.8}{0.8^{0} } }{0!}[/tex]
P(X=0) = 0.449
