The transition matrix of a Markov chain is $P=\left[\begin(array) {ccc)3 & 0 & .7 \.1 & .8 & .1 \.6 & .2 & .2\end[array)\right] .$ On the 4th observation the chain is in state 2. What is the...

I need the answer as soon as possibleThe transition matrix of a Markov chain<br>is $P=\left[\begin(array) {ccc)3 & 0 &<br>.7 \.1 & .8 & .1 \.6 & .2 &<br>.2\end[array)\right] .$ On the 4th<br>observation the chain is in state 2.<br>What is the probability that it will be<br>in state 3 on the 6th observation?<br>$. 19$<br>$.01s<br>$. 17$<br>$. 02S<br>$. 25<br>SP.DL.172|<br>

Extracted text: The transition matrix of a Markov chain is $P=\left[\begin(array) {ccc)3 & 0 & .7 \.1 & .8 & .1 \.6 & .2 & .2\end[array)\right] .$ On the 4th observation the chain is in state 2. What is the probability that it will be in state 3 on the 6th observation? $. 19$ $.01s $. 17$ $. 02S $. 25 SP.DL.172|

Jun 11, 2022
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