Suppose that N(t) is a λ=5-Poisson process. Calculate E[N(1)N(2)N(3)].

Poisson Distribution: p(x, λ)  =   λx  exp(-λ) /x!  ,  x = 0, 1, 2, ….. Find the moment generating function Mx(t)...

Poisson Distribution: p(x, λ)  =   λx  exp(-λ) /x!  ,  x = 0, 1, 2, ….. Find the moment generating function Mx(t) Find E(X) using the moment generating function 2. If X1 , X2 , X3  are independent and have means 4, 9, and 3, and variencesn3, 7, and 5. Given that Y = 2X1  -  3X2  + 4X3. find the mean of Y variance of  Y. 3. A safety engineer claims that 2 in 12 automobile accidents are due to driver fatigue. Using the formula for Binomial Distribution find the...

Consider a Poisson process with rate λ and let L be the time of the last...

Consider a Poisson process with rate λ and let L be the time of the last arrival in the interval [0, t], with L = 0 if there was no arrival. (a) Compute E(t − L). (b) What happens when we let t → ∞ in the answer to (a)?

Suppose passengers arrive at a MARTA station between 10am-5pm following a Poisson process with rate λ=...

Suppose passengers arrive at a MARTA station between 10am-5pm following a Poisson process with rate λ= 60 per hour. For notation, let N(t) be the number of passengers arrived in the first t hours, S0= 0 , Sn be the arrival time of the nth passenger, Xn be the interrarrival time between the (n−1)st and nth passenger. a. What is the probability that ten passengers arrive between 2pm and 4pm given that no customer arrive in the first half hour?...

Suppose X and Y are independent Poisson random variables with respective parameters λ = 1 and...

Suppose X and Y are independent Poisson random variables with respective parameters λ = 1 and λ = 2. Find the conditional distribution of X, given that X + Y = 5. What distribution is this?

suppose we draw a random sample of size n from a Poisson distribution with parameter λ....

suppose we draw a random sample of size n from a Poisson distribution with parameter λ. show that the maximum likelihood estimator for λ is an efficient estimator

b. If a random variable follows a Poisson distribution with λ = 4 and t =...

b. If a random variable follows a Poisson distribution with λ = 4 and t = 2. Find     (i) The probability of more than 5 successes.    (ii) The probability of at most 2 successes.    (iii) The probability of less than 2 successes.    (iv) The probability of between 2 and 5 successes, P(2 ≤ X ≤ 5). The expected value (E(x)), variance (σ2), and standard deviation of this Poisson distribution. (Show work)

A Poisson distribution has λ = 4.7.   (a )[2] Use the Excel function POISSON.DIST() and 5...

A Poisson distribution has λ = 4.7.   (a )[2] Use the Excel function POISSON.DIST() and 5 decimals to fill in the following table: 4 x 0 1 2 3 4 5 6 7 8 9 10 11 12+ P(x) (b)[2] Use a column chart to visualize the probability distribution above. How is it skewed? (c)[1] Find P(x ≤ 3). [steps & result] (d)[1] Find P(x ≥ 7). [steps & result] (e)[2] Find P(5 < x ≤ 9). [steps & result]...

Let {N1(t), t ≥ 0} and {N2(t), t ≥ 0} be two independent Poisson processes with...

Let {N1(t), t ≥ 0} and {N2(t), t ≥ 0} be two independent Poisson processes with rates λ1 and λ2, respectively. Define N(t) = N1(t) + N2(t). Use the definition to prove that {N(t), t ≥ 0} is a Poisson process with rate λ = λ1 + λ2.

Let Wn be a wheel with n vertices. Prove that P(Wn, λ) = λ(λ-2)^n + (-1)^n(λ-2).

Let Wn be a wheel with n vertices. Prove that P(Wn, λ) = λ(λ-2)^n + (-1)^n(λ-2).

Suppose thatA∼N(μ= 3,σ= 5),B∼N(μ= 2,σ= 4), andC∼Exp(λ= 1/6) areindependent RVs. Find the distribution (shape, center, spread)...

Suppose thatA∼N(μ= 3,σ= 5),B∼N(μ= 2,σ= 4), andC∼Exp(λ= 1/6) areindependent RVs. Find the distribution (shape, center, spread) of the following RV expressions and state whether the distribution is exactly or approximately equal to your claim. 1.D=A+B 2.E= 3A−2B 3.F=A1+A2+···+A14, whereA1,...,A14are independent values fromA. 4.G=C1+C2+···+C47, whereC1,...,C47are independent values fromC.