Continuous Time Markov Chains 1. Find the limiting probabilities for the M/M/s system 2. Determine the...

the Markov chain on S = {1, 2, 3} with transition matrix p is 0 1...

the Markov chain on S = {1, 2, 3} with transition matrix p is 0 1 0 0 1/2 1/2; 1/2 0 1/2 We will compute the limiting behavior of pn(1,1) “by hand”. (A) Find the three eigenvalues λ1, λ2, λ3 of p. Note: some are complex. (B) Deduce abstractly using linear algebra and part (A) that we can write pn(1, 1) = aλn1 + bλn2 + cλn3 for some constants a, b, c. Don’t find these constants yet. (C)...

Consider a Markov chain {Xn; n = 0, 1, 2, . . . } on S...

Consider a Markov chain {Xn; n = 0, 1, 2, . . . } on S = N = {0, 1, 2, . . . } with transition probabilities P(x, 0) = 1/2 , P(x, x + 1) = 1/2 ∀x ∈ S, . (a) Show that the chain is irreducible. (b) Find P0(T0 = n) for each n = 1, 2, . . . . (c) Use part (b) to show that state 0 is recurrent; i.e., ρ00 =...

Markov Chain Transition Matrix for a three state system. 1 - Machine 1: 2- Machine 2:...

Markov Chain Transition Matrix for a three state system. 1 - Machine 1: 2- Machine 2: 3- Inspection 1 2 3 1 0.05 0 .95 2 0 0.05 .95 3 .485 .485 .03 A. For a part starting at Machine 1, determine the average number of visits this part has to each state. (mean time until absorption, I believe) B. 1-1, 2-2, & 3-3 represent BAD units (stays at state). If a batch of 1000 units is started on Machine...

Markov Chains Three companies provide internet service in a city of 20,000 people. At the beginning...

Markov Chains Three companies provide internet service in a city of 20,000 people. At the beginning of the year, the market shares of each company are as follows: 11,800 people use company A, 6200 people use company B, and only 2000 people use company C. Each month, 5% of company A’s customers switch to company B, and 3% of company A’s customers switch to company C. During the same time, 4% of company B’s customers switch to A, and 6.5%...

1)Find the Inverse Laplace Transform of X(s) = (s-1)/((s+1)(s+2)^2) 2)A system with the transfer function H(s)...

1)Find the Inverse Laplace Transform of X(s) = (s-1)/((s+1)(s+2)^2) 2)A system with the transfer function H(s) = (s-5)/((s+1)(s+10)) a)If the input is 2u(t), find the steady-state output of the system.

Find the ratio of the probabilities between state 1 and state 2 (P(system in state 1)/P(system...

Find the ratio of the probabilities between state 1 and state 2 (P(system in state 1)/P(system in state 2)) of the following question. Find the probability that a tank of 100 grams of water will go from the state with the whole at 47 degrees (Celsius) to the state with the left half at 7 degrees (Celsius) and the right half at 87 degrees (Celsius). Please, derive the equation you are going to use, so I can now from where...

1. Given a P matrix for a discrete time Markov chain consisting of transient and absorbing...

1. Given a P matrix for a discrete time Markov chain consisting of transient and absorbing states, list the steps you would take to determine the probability of ending in a certain absorbing state given the current transient state. 2. For an M/M/1/GD/∞/∞ queuing system with arrival rate λ = 5 customers per hour and service rate μ = 15 customers per hour, on the average, how long (in minutes) does a customer wait in line (round off to 3...

Markov Chains (a) Three companies provide internet service in a city of 20,000 people. At the...

Markov Chains (a) Three companies provide internet service in a city of 20,000 people. At the beginning of the year, the market shares of each company are as follows: 11,800 people use company A, 6200 people use company B, and only 2000 people use company C. Each month, 5% of company A’s customers switch to company B, and 3% of company A’s customers switch to company C. During the same time, 4% of company B’s customers switch to A, and...

Markov Chains Three companies provide internet service in a city of 20,000 people. At the beginning...

Markov Chains Three companies provide internet service in a city of 20,000 people. At the beginning of the year, the market shares of each company are as follows: 11,800 people use company A, 6200 people use company B, and only 2000 people use company C. Each month, 5% of company A’s customers switch to company B, and 3% of company A’s customers switch to company C. During the same time, 4% of company B’s customers switch to A, and 6.5%...

A continuous-time system, with time t in seconds (s), input f(t), and output y(t), is specified...

A continuous-time system, with time t in seconds (s), input f(t), and output y(t), is specified by the equations: y(t) = f(sin(t)) y(t) = f(cos(t)) a) are these systems causal? Justify your answer. b) are these systems linear? Clearly show and explain your work