Mathematics, 22.10.2020 16:01 zaniathomasel
A Markov chain has 3 possible states: A, B, and C. Every hour, it makes a transition to a different state. From state A, transitions to states B and C are equally likely. From state B, transitions to states A and C are equally likely. From state C, it always makes a transition to state A. (a) Write down the transition probability matrix. (b) If the initial distribution for states A, B, and C is P0 = ( 1 3 , 1 3 , 1 3 ), find the distribution of state after 2 transitions, i. e., the distribution of X2. (c) Show that this is a regular Markov Chain. (d) Find the steady-state distribution for this chain.
Answers: 2
Mathematics, 21.06.2019 13:40
What is the correlation coefficient for the data? don't forget to turn the diagnoisticon (in the catalog menu of the calculator). r = answer (round to the nearest thousandth)
Answers: 1
Mathematics, 21.06.2019 21:50
If you double the input of a function and it results in half the output, and if you triple the input and it results in a third of the output, what can be guessed about the function? check all that apply.
Answers: 3
Mathematics, 22.06.2019 05:00
Mr. barth is painting an arrow on the school parking lot. he plots the arrow on the coordinate plane as shown below. what is the area of the arrow he is painting?
Answers: 1
A Markov chain has 3 possible states: A, B, and C. Every hour, it makes a transition to a different...
Social Studies, 02.03.2021 18:40
Mathematics, 02.03.2021 18:40
History, 02.03.2021 18:40
Physics, 02.03.2021 18:40
Mathematics, 02.03.2021 18:40
Mathematics, 02.03.2021 18:40
Mathematics, 02.03.2021 18:40
History, 02.03.2021 18:40
English, 02.03.2021 18:40
Mathematics, 02.03.2021 18:40
Mathematics, 02.03.2021 18:40
English, 02.03.2021 18:40