Write neatiy ana legibly Untidy work will NOT attract marks. Question 1 [29 Marks] For a random v...
I can do the first part of the question 1a, could
someone show me step by step how to do do 1b?
) Y.Ya..., Y, form a random sample from a probability distribution with cumu- lative distribution function Fy (u) and probability density function fr(u). Let Write the cumulative distribution function for Ya) in terms of Fy(y) and hence show that the probability density function for Yy is fy(1)(y) = n(1-Fr (v))"-ify(y). [8 marks] (b) An engineering system consists of...
5. (12 marks) Consider a simple random sample x..X, from the shifted exponential proba- bility density function (Note that taking 0 - 0 gives the probability density function of the exponential distribution.) (a) Givc the likelihood function for 0 and λ in as simplificd of a form as possible. (4 marks) (b) Obtain the maximum likelihood estimators of θ and λ. (6 marks) (c) If ten observations are made, resulting in the values 3.11, 0.64, 2.55, 2.20, 5.44, 3.42, 10.39,...
Use the method of distribution functions
2. (5 marks) Consider a random variable Y with density function 3y2 0 ,else Find the probability density function of U 4-Y
[Total Marks: 301 ={} Question 1 A random variable X has a probability density function as defined below. (x + 1 -1<x<0 fx(x) = (-x+1 0<x< 1 Find the following: a) The cumulative distribution function of X, Fx(x). b) P(x > 0.1 X < 0.5). c) The conditional probability density function fx(x = 0.6 X > 0.5). [10 Marks [5 Marks [15 Marks]
1. X,,x2,..., X, is a random sample from a Poisson (0) distribution with probability mass function 0*e f(x) = x=0,1,..., 0 >0. x! (1) Write Poisson (0) as an exponential family of the form fo(x) = exp{c(0)T(x)-v (0)}h(x) State what c(0), 7(x), and y (@) are. (ii) a. Prove that for the exponential family given in (i), E[T(X)]=y'(c). b. Hence find the mean of the Poisson (0) distribution. [3] [6] [2] 21 (iii) Show that for the Poisson (0) distribution,...
Use the Method of Distribution Functions 2. (5 marks) Consider a random variable Y with density function 3 v 0 .else Find the probability density function of U 4- r2
Question 4: (5 Marks) Let X and Y be continuous random variables have a joint probability density function of the form: f(x,y) = cy2 + x 0 SX S1, 0 Sys1. Determine the following: 1. The value of c. 2. The marginal distributions f(x) and f(y). 3. The conditional distribution f(xly). 4. Are X and Y independent? Why? - the
PHYS1047 a) Given a random variable x, with a continuous probability distribution function fx) 4 marks b) The life expectancy (in days) of a mechanical system has a probability density write down equations for the cumulative distribution C(x) and the survival distribution Px). State a relationship between them. function f(x)=1/x, for x21, and f(x)=0 for x <1. i Find the probability that the system lasts between 0 and I day.2 marks i) Find the probability that the system lasts between...
Consider the random variable Y, whose probability density function is defined as: if 0 y1 2 y if 1 y < 2 fr(v) 0 otherwise (a) Determine the moment generating function of Y (b) Suppose the random variables X each have a continuous uniform distribution on [0,1 for i 1,2. Show that the random variable Z X1X2 has the same distribution = as the random variable Y defined above.
Consider the random variable Y, whose probability density function is defined...
1. (Distributions with Random Parameters) Suppose that the density X of red blood corpuscles in humans follows a Poisson distribution whose parameter depends on the observed individual. This means that for Jason we have X ~ Poi(mj), where mj is Jason's parameter value, while for Alice we have X ~Poi(mA), where mA is Alice's parameter value. For a person selected at random we may consider the parameter value M as a random variable such that, given that M, we have...