If the student attends class on a certain Friday, then he is twice as likely to be absent the next Friday as to attend. If the student is absent on a certain Friday, then he is four times as likely to attend class the next Friday as to be absent again. Assume that state 1 is Attends Class and that state 2 is Absent from Class. (Note: Express your answers as rational fractions or as decimal fractions rounded to 4 decimal places (if the answers have more than 4 decimal places).) (1) Find the transition matrix for this Markov process. P =

If the student attends class on a certain Friday, then he is twice as likely to be absent the next Friday as to attend. If the student is absent on a certain Friday, then he is four times as likely to attend class the next Friday as to be absent again. Assume that state 1 is Attends Class and that state 2 is Absent from Class. (Note: Express your answers as rational fractions or as decimal fractions rounded to 4 decimal places (if the answers have more than 4 decimal places).) (1) Find the transition matrix for this Markov process. P =

MATLAB: An Introduction with Applications

6th Edition

ISBN:9781119256830

Author:Amos Gilat

Publisher:Amos Gilat

Chapter1: Starting With Matlab

Section: Chapter Questions

Problem 1P

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If the student attends class on a certain Friday, then he is twice as likely to be absent the next Friday as to attend. If the student is absent on a certain
Friday, then he is four times as likely to attend class the next Friday as to be absent again.
Assume that state 1 is Attends Class and that state 2 is Absent from Class.
(Note: Express your answers as rational fractions or as decimal fractions rounded to 4 decimal places (if the answers have more than 4 decimal places).)
(1) Find the transition matrix for this Markov process.
P =
(2) Find the three-step transition matrix P(3)
P(3) =
(3) If the student is absent on a given Friday afternoon, what is the probability that he will be present 3 weeks later?

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