Solve the following problem:
Find the probability for the various situations
1. 5 individuals enter the ground floor of an elevator of a building which has 10 floors(9 floors above the ground floor). Assuming that each of the 5 individuals is going to depart the elevator on one of the 9 floors above the ground floor, (a) what is the probability that all 5 individuals will get o� on the same floor?
(b) What is the probability that all 5 individuals will get o� on 2 diferent floors?
(c) What is the probability that all 5 individuals will get o� on 3 diferent floors?
2. One method of arriving at economic forecasts is to use a consensus approach. A forecast is obtained from each of a large number of analysts; the average of these individual forecasts is the consensus forecast.
Suppose that the individual 1998 January prime-interest-rate forecasts of all economic analysts are approximately normally distributed with a mean of 7.1% and a standard deviation of 2.65%. If a single analyst is randomly selected from among this group, what is the probability that the analyst's forecast of the prime interest rate will
(a) exceed 9.85%
(b) 10 analysts from this group are randomly selected. What is the probability that at most 8 of these analysts forecasted the prime interest rate to be less than 9%.
3. A random variable X having a geometic distribution has the following probability function
P(X = x) = (1 -p)x-1p x = 1, 2.... � �
(a) Find MX(t), the moment-generating function of X.
(b) Use your result in (a) to �nd the mean of X and the variance of X. [4]
4. A tool and die company makes casting for steel stress-monitoring gauges. Their annual pro�t, Q (in $100,000's), can be expressed as a function of demand (X):
Q(x) = 3(1-e-3x)
Suppose the total demand (in 1000's) for their castings follows the probability distribution with density:
f(x) = 5e-5x for x > 0:
(a) What is the probability that the total demand for castings is between 2000 and 5000?
(b) Find the company's expected pro�t.
5. A dice is unbalanced in such a way that the probability of the dice showing i" dots is proportional to how many dots on the dice1.
Three roommates, Je�, Mike, and Wai play a game where this unbalanced dice is tossed until the �rst 6 appears. The guy who tosses the �rst 6 wins, the prize being that the losers will pay the winner's portion of July's rent. Je�, being the oldest, tossess �rst, followed by Wai and then Mike. This sequence continues until the �rst 6" appears.
(a) How many tosses can be expected to occur until the �rst 6" appears?
(b) What is the probability that Je� will not have to pay next month's rent? For example, a 6" is six times as likely as a 1", a 5" is �ve times as likely as a 1", etc.
6. Guests arriving at a hotel in accordance with a Poisson process, at a rate of 5 per hour.
(a) What is the probability that no one will arrive in the next hour?
(b) What is the probability that the �rst guest will arrive within the �rst 10 minutes?
(c) How much time (in minutes) should the hotel expect to pass until the fourth guest arrives from the top of the hour? Provide a measure of dispersion as well.
7. Let X1,X2,..... �Xn be a random sample from a population with a �nite mean � and a �nite variance �2, with a moment generating function
MXi (t) = e1.5t+3t2
(a) What is the distribution of each Xi
(b) Compute the moment generating function of
X‾= i=110ΣXi/10
and identify the distribution of X‾.
8. A random sample of size 2 is available from a Poisson distribution with parameter �. Let X denote the sample mean and let Y = (6X1-3X3)=10. Are Y and X unbiased estimators for �? Is so, which of the two estimators would you recommend. Explain.