5. The management of Hunger Quest is interested in the joint behaviour of the random variables...
(Q6) The management at a fast-food outlet is interested in the joint behaviour of the random variables Yı, defined as the total time between a customer's arrival at the store and departure from the service window, and Y2, the time a customer waits in line before reaching the service window. Because Yſ includes the time a customer waits in line, we must have Yi > Y. The relative frequency distribution of observed values of Yi and Y2 can be modelled...
2. Let the random variables Y1 and Y, have joint density Ayſy22 - y2) 0<yi <1, 0 < y2 < 2 f(y1, y2) = { otherwise Stom.vn) = { isiml2 –») 05451,05 ms one a independent, amits your respon a) Are Y1 and Y2 independent? Justify your response. b) Find P(Y1Y2 < 0.5). on the
3. Suppose that Yi and 2 are continuous random variables with joint pdf given by and zero otherwise, for some constant c >。 (a) Find the value of c. (b) Are Yi and Y2 independent ? Justify your answer. (c) Let Y = Yi + ½. compute the probability P(Y 3). (d) Let U and V be independent continuous random variables having the same (marginal) distri- 3 MARKS 1 MARK 3 MARKS bution as Y2. Identify the distribution of random...
2. Suppose that Y and Y2 are continuous random variables with the joint probability density function (joint pdf) a) Find k so that this is a proper joint pdf. b) Find the joint cumulative distribution function (joint cdf), FV1,y2)-POİ уг). Be y, sure it is completely specified! c) Find P(, 0.5% 0.25). d) Find P (n 292). e) Find EDY/ . f) Find the marginal distributions fiv,) and f2(/2). g) Find EM] and E[y]. h) Find the covariance between Y1...
(2) Suppose the random variables Yi and Yg have joint probability density function (n 2)-10 The marginal distributions are fi (y) = y/2 for 0 yIS 2 (zero otherwise) and fn (Y2)-2-2y2 for 0 Y2 1 (zero otherwise). (a) Calculate E(Y) and E(Y2) (b) Calculate the conditional densities of YilY2-/2 and Y2Y- (c) Derive ElYalyǐ-m] and EMM-Y21 (d) Calculate EIE(Y1Yİ)] and E [E(YĪ½j. and confirm your answers in (a). (e) Calculate E(YiYo) and compare it with E(Y)E(5). (2) Suppose the...
5. In studying the behaviour of air support roofs, the random variables X, the inside barometric pressure (in inches of mercury), and Y, the outside pressure, are considered. Assume that the joint density for (X Y) is given by с /х 27 < у <x< 33 fxxx, y) = otherwise A. Find c B. Find fx(x) and fyy) C. Find P(X30 and Y<28).