Suppose that the number of complaints for a company has a Poisson distribution with mean a)5.3...

The number of hurricanes (Y) in a season follows a Poisson distribution with a mean of...

The number of hurricanes (Y) in a season follows a Poisson distribution with a mean of 3. The damage (X) done by a hurricane during a given season follows an exponential distribution with mean 2Y. What is the variance of the yearly damage?

Suppose that the number of defects on a roll of magnetic recording tape has a Poisson...

Suppose that the number of defects on a roll of magnetic recording tape has a Poisson distribution for which the mean λ is known to be either 1 or 5. Suppose the prior pmf for λ is: P[λ = 1] = 0.4 P[λ = 5] = 0.6 Suppose that we examine five tapes, and find that the number of defects are x1 = 3,x2 = 1,x3 = 4,x4 = 6 and x5 = 2. Show that the posterior distribution for...

Suppose X has a Poisson distribution with a mean of 1.5. Determine the following probabilities. Round...

Suppose X has a Poisson distribution with a mean of 1.5. Determine the following probabilities. Round your answers to four decimal places (e.g. 98.7654). (a)P(X = 1) (b)P(X ≤ 3) (c)P(X = 7) (d)P(X = 2)

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...

Suppose small aircraft arrive at a certain airport according to a Poisson process with a mean...

Suppose small aircraft arrive at a certain airport according to a Poisson process with a mean rate of 8 per hour. a. Let be the waiting time until the 4th aircraft arrives. Identify the distribution of T, including any parameters, and find P(T ≤ 1) b. Let Y be the number of aircraft that arrive during a one-half hour period. Identify the distribution of Y, including any parameters, and find P(Y ≥ 3)

Suppose that x has a Poisson distribution with μ = 19. (a) Compute the mean, μx,...

Suppose that x has a Poisson distribution with μ = 19. (a) Compute the mean, μx, variance, σ2x , and standard deviation, σx. (Do not round your intermediate calculation. Round your final answer to 3 decimal places.)   µx = , σx2 = , σx = (b) Calculate the intervals [μx ± 2σx] and [μx ± 3σx ]. Find the probability that x will be inside each of these intervals. Hint: When calculating probability, round up the lower interval to next...

Suppose that x has a Poisson distribution with μ = 8. (a) Compute the mean, μx,...

Suppose that x has a Poisson distribution with μ = 8. (a) Compute the mean, μx, variance, σ 2 x  σx2 , and standard deviation, σx. (Do not round your intermediate calculation. Round your final answer to 3 decimal places.) (b) Calculate the intervals [μx ± 2σx] and [μx ± 3σx ]. Find the probability that x will be inside each of these intervals. Hint: When calculating probability, round up the lower interval to next whole number and round down the...

The customer service manager of a company has tracked the number of customer complaints that she...

The customer service manager of a company has tracked the number of customer complaints that she has received each day for the last 25 days. The data is: 0 complaints, 1 day 1 complaint, 2 days 2 complaints, 0 days 3 complaints, 2 days 4 complaints, 4 days 5 complaints, 1 day 6 complaints, 3 days 7 complaints, 3 days 8 complaints, 5 days 9 complaint, 3 days 10 complaints, 1 day Based on this probability distribution, calculate: The probability...

Suppose that a random variable X has a binomial distribution with n=2, p=0.5. Find the mean...

Suppose that a random variable X has a binomial distribution with n=2, p=0.5. Find the mean and variance of Y = X2

Assume that the Poisson distribution applies and that the mean number of aircraft accidents is 10...

Assume that the Poisson distribution applies and that the mean number of aircraft accidents is 10 per month. Find P(0), the probability that in a month, there will be no aircraft accidents. Is it unlikely to have a month with no aircraft accidents?