The number of people who enter an elevator on the ground floor is a Poisson random variable with mean 10. If there are N floors above the ground floor and if each person is equally likely to get off at any one of these N floors, independently of where the others get off, compute the expected number of stops that the elevator will make before discharging all of its passengers.

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naqiraza944 naqiraza944 · Answer 1 · 2020-04-04T04:27:32+02:00

Answer:

Expected no of stops=N(1-exp(-10/N)

Step-by-step explanation:

Using equation

X=∑[tex]I_{m}[/tex]

where m lies from 1 to N

solve equation below

E(X)=N(1-exp(-10/N)

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nafeesahmed nafeesahmed · Answer 2 · 2020-04-04T17:39:55+02:00

Given Information:

Distribution = Poisson

Mean = 10

Required Information:

Expected number of stops = ?

Answer:

[tex]E(N) = N(1 - e^{-0.1N} )[/tex]

Explanation:

The number of people entering on the elevator is a Poisson random variable.

There are N floors and we want to find out the expected number of stops that the elevator will make before discharging all of its passengers.

Mean = μ = 10

The expected number of stops is given by

[tex]E(N) = N(1 - e^{-mN} )[/tex]

Where m is the decay rate and is given by

Decay rate = m = 1 /μ = 1/10 = 0.10

Therefore, the expected number of stops is

[tex]E(N) = N(1 - e^{-0.1N} )[/tex]

If we know the number of floor (N) then we can the corresponding expected value.