Let the process of getting through undergraduate school be a homogeneous markov
process with t...
Mathematics, 20.12.2019 22:31 OnlineSchool
Let the process of getting through undergraduate school be a homogeneous markov
process with time unit one year. the states are freshman, sophomore, junior, senior,
graduated, and dropout. your class (freshman through graduated) can only stay the
same or increase by one step, but you can drop out at any time before graduation. you
cannot drop back in. the probability of a freshman being promoted in a given year is .8;
of a sophomore, .85; of a junior, .9, and of a senior graduating is .95. the probability of
a freshman dropping out is .10, of a sophomore, .07; of a junior, .04; and of a senior,
.02.
1. construct the markov transition matrix for this process.
2. if we were more realistic, and allowed for students dropping back in, this would no
longer be a markov process. why not?
3. construct the markov transition matrix for what happens to students in four years.
what is the probability that a student who starts out as a junior will graduate in that
time?
Answers: 2
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