Let 1, 1.4, 2, 3.2 be 4 independent random samples from a uniform distribution on [0,...

Let ? and ? be two independent random variables with uniform distribution. ?(? = 0|? =...

Let ? and ? be two independent random variables with uniform distribution. ?(? = 0|? = ?, ? = ?) = 1 − ?, ?(? = 1|? = ?, ? = ?) = ?(1 − ?) and ?(? = 2|? = ?, ? = ?) = ??. 1. Find the conditional joint p.d.f. (the posterior) ??,?|?=?. 2.Write down the conditional expectation ?[?|? = ?] and ?[?|? = ?] as functions of ?.

Let ? and ? be two independent random variables with uniform distribution. ?(? = 0|? =...

Let ? and ? be two independent random variables with uniform distribution. ?(? = 0|? = ?, ? = ?) = 1 − ?, ?(? = 1|? = ?, ? = ?) = ?(1 − ?) and ?(? = 2|? = ?, ? = ?) = ??. 1.Write down the conditional expectation ?[?|? = ?] and ?[?|? = ?] as functions of ?.

Let X and Y be independent random variables each having the uniform distribution on [0, 1]....

Let X and Y be independent random variables each having the uniform distribution on [0, 1]. (1)Find the conditional densities of X and Y given that X > Y . (2)Find E(X|X>Y) and E(Y|X>Y) .

Let Y1, Y2, . . . , Yn denote a random sample from a uniform distribution...

Let Y1, Y2, . . . , Yn denote a random sample from a uniform distribution on the interval (0, θ). (a) (5 points)Find the MOM for θ. (b) (5 points)Find the MLE for θ.

Let X have a gamma distribution with  and  which is unknown. Let  be a random sample from this distribution....

Let X have a gamma distribution with  and  which is unknown. Let  be a random sample from this distribution. (1.1) Find a consistent estimator for  using the method-of-moments. (1.2) Find the MLE of  denoted by . (1.3) Find the asymptotic variance of the MLE, i.e. (1.4) Find a sufficient statistic for . (1.5) Find MVUE for .

A random variable Y follows a continuous uniform distribution from 0 to 4.   Express each question...

A random variable Y follows a continuous uniform distribution from 0 to 4.   Express each question using proper probability notation. Find probability by applying the area law i.e. draw the distribution, mark the event, shade the area, find the amount of shaded area. What is the probability random variable Y takes a value less than 3.2? P[Y < 3.2] =   What is the probability random variable Y falls below 1.2? P[Y < 1.2] =   What is the probability random variable...

7. Let U1, . . . , Un be a random sample from the Uniform(0, θ)...

7. Let U1, . . . , Un be a random sample from the Uniform(0, θ) distribution. (a) Find the joint density of order statistics U(1) and U(n) . (b) Find the joint density of the random variables R = U(1)/U(n) and M = U(n) . (c) State whether R and M are independent. (d) Give the marginal pdf of R and identify the distribution

Let {?1,?2, … , ?? } be ? independent random draws from any given distribution with...

Let {?1,?2, … , ?? } be ? independent random draws from any given distribution with finite expected value ? and variance ? 2 > 0. Let ?̅ = 1 ? ∑ ?? ? ?=1 denote the average draw, which in turn is a random variable with its own distribution. This question works through successive proofs to derive the expected value and variance of this distribution, culminating in a proof of the Law of Large Numbers. a. Show that ?(??...

Let X and Y be independent random variables, with X following uniform distribution in the interval...

Let X and Y be independent random variables, with X following uniform distribution in the interval (0, 1) and Y has an Exp (1) distribution. a) Determine the joint distribution of Z = X + Y and Y. b) Determine the marginal distribution of Z. c) Can we say that Z and Y are independent? Good

1. Let ?1 and ?2 be two independent random variables with normal distribution with expectation 0...

1. Let ?1 and ?2 be two independent random variables with normal distribution with expectation 0 and variance 1. (1) Find the covariance between ?1 + ?2 and ?1 − ?2. (2) Find the probability that ?2 1 + ?2 2 ≤ 2. (3) Find the expectation of ?2 1 + ?2^2 . 2. Estimate the approximated value of (︂ 10000 5100 )︂ = 10000! 5100!4900! by central limit theorem.