Actuarial Prob II A loss has an exponential distribution with mean 2. A deductible of 1...

Actuarial Science A loss has an exponential distribution with mean 2. A deductible of 1 is...

Actuarial Science A loss has an exponential distribution with mean 2. A deductible of 1 is imposed. Find the PF of payment.

Given that X has an exponential distribution with mean 1, what is (a) the probability that...

Given that X has an exponential distribution with mean 1, what is (a) the probability that X > 1? (b) the probability that X < 1 assuming X < 2? (c) the median of this distribution?

f(x\o)= ox ^-o-1 I{x> 1}, o>1. (a)Show that logX_i has an exponential distribution with a mean...

f(x\o)= ox ^-o-1 I{x> 1}, o>1. (a)Show that logX_i has an exponential distribution with a mean of 1/o (b) Find the form foa a UMP test of H_0: o\leq o_{0 vs. H_{A}: o> o_{o}

Suppose Y1, . . . , Yn is a sample from an Exponential distribution with mean...

Suppose Y1, . . . , Yn is a sample from an Exponential distribution with mean β. (a)Find the distribution of Sn =Y1 +···+Yn (b) Find E[Sn] and V [Sn]

6. Assume X follows an exponential distribution with mean 3. Find the probability X is greater...

6. Assume X follows an exponential distribution with mean 3. Find the probability X is greater than 6 given X has already surpassed 2.

Computer response time is an important application of exponential distribution. Suppose that a study of a...

Computer response time is an important application of exponential distribution. Suppose that a study of a certain computer system reveals that the response time (X), in seconds, has an exponential distribution with a rate parameter θ. The study also showed that 90% of these computers respond within 5 seconds. a) Find the value of θ (round it to one decimal place) [4 points] b) What is the probability that a randomly selected computer will respond between 4 and 6 seconds?...

The life of an electric component has an exponential distribution with a mean of 8.9 years....

The life of an electric component has an exponential distribution with a mean of 8.9 years. What is the probability that a randomly selected one such component has a life more than 8 years? Answer: (Round to 4 decimal places.)

Suppose Y1,··· ,Yn is a sample from a exponential distribution with mean θ, and let Y(1),···...

Suppose Y1,··· ,Yn is a sample from a exponential distribution with mean θ, and let Y(1),··· ,Y(n) denote the order statistics of the sample. (a) Find the constant c so that cY(1) is an unbiased estimator of θ. (b) Find the sufficient statistic for θ and MVUE for θ.

Suppose that the time to death X has an exponential distribution with hazard rate and that...

Suppose that the time to death X has an exponential distribution with hazard rate and that the right-censoring time C is exponential with hazard rate . LetT min(X,C) and 1 ifX C;0 ,if X C. Assume that X and C are independent. (a) Find P( 1) (b) Find the distribution of T. (c) Show that and T are independent. (d) Let (T1, 1),...,(Tn, n) be a random sample from this model. Show that the maximum likelihood estimator of is n...

Q4. Find the mean and variance for the following distributions 1-Gamma distribution with α=2 and β=...

Q4. Find the mean and variance for the following distributions 1-Gamma distribution with α=2 and β= 3 2-Exponential distribution with β= 30 3-Chi squire distribution with v= 30 4-Beta distribution with α=2 and β= 3