STA 756 UNLV

STAT 756 - Homework 1 Due Thursday, February 5 1. Re-estimate the Snoqualmie Falls transition probability matrix by the method of maximum likelihood, assuming the chain is first order and also stationary . That is, you should assume that the margina

STAT 756 - Homework 3 Due Tuesday, March 3 1. (Page 407 Problem 1) A population of organisms consists of both male and female members. In a small colony any particular male is likely to mate with any particular female in any time interval of length

STAT 756 - Homework 4 Due Tuesday, March 10 1. (Page 408 Problem 11) Consider a Yule process starting with a single individualthat is, suppose X(0) = 1. Let Ti denote the time it takes the process to go from a population of size i to one of size i +

STAT 756 - Homework 2 Due Tuesday, February 17 1. A Markov chain {Xn , n 0} with state space 0, 1, 2, has the transition probability matrix 1 1 1 2 0 1 2 3 1 3 0 6 2 3 1 2 For the given Markov chain, suppose that p(s|j) is the probability

STAT 756 - Homework 5 Due Thursday, March 26 1. (Page 409 Problem 12) Each individual in a biological population is assumed to give birth at an exponential rate , and to die at an exponential rate . In addition, there is an exponential rate of incre

STAT 756 - Homework 6 Due Tuesday, April 14 1. (Page 412 Problem 29) Consider a set of n machines and a single repair facility to service these machines. Suppose that when machine i, i = 1, ., n, fails it requires an exponentially distributed amount

STAT 756 - Homework 7 Due Thusday, April 23 1. Estimating a proportion with a discrete prior Bob claims to have ESP (extra-sensory perception). To test this claim, you propose the following experiment. You will select one from four large cards with

STAT 756 - Homework 1 Due Thursday, February 5 1. Re-estimate the Snoqualmie Falls transition probability matrix by the method of maximum likelihood, assuming the chain is first order and also stationary . That is, you should assume that the margina

STAT 756 - Homework 3 Due Tuesday, March 3 1. (Page 407 Problem 1) A population of organisms consists of both male and female members. In a small colony any particular male is likely to mate with any particular female in any time interval of length