At any given time, a subatomic particle can be in one of two states, and it moves randomly from one state to another when it is excited. If it is in state 1 on one observation, then it is 3 times as likely to be in state 1 as state 2 on the next observation. Likewise, if it is in state 2 on one observation, then it is 3 as likely to be in state 2 as state 1 on the next observation. 1. Find the transition matrix for this Markov chain. 2. Based on this estimation, what is the probability that the particle will be in state 2 two weeks from now? 3. What is the probability that the particle will be in the state 1 three weeks from now?
At any given time, a subatomic particle can be in one of two states, and it moves randomly from one state to another when it is excited. If it is in state 1 on one observation, then it is 3 times as likely to be in state 1 as state 2 on the next observation. Likewise, if it is in state 2 on one observation, then it is 3 as likely to be in state 2 as state 1 on the next observation. 1. Find the transition matrix for this Markov chain. 2. Based on this estimation, what is the probability that the particle will be in state 2 two weeks from now? 3. What is the probability that the particle will be in the state 1 three weeks from now?
Trigonometry (MindTap Course List)
10th Edition
ISBN:9781337278461
Author:Ron Larson
Publisher:Ron Larson
Chapter6: Topics In Analytic Geometry
Section6.4: Hyperbolas
Problem 5ECP: Repeat Example 5 when microphone A receives the sound 4 seconds before microphone B.
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At any given time, a subatomic particle can be in one of two states, and it moves randomly from one state to another when it is excited. If it is in state 1 on one observation, then it is 3 times as likely to be in state 1 as state 2 on the next observation. Likewise, if it is in state 2 on one observation, then it is 3 as likely to be in state 2 as state 1 on the next observation.
1. Find the transition matrix for this Markov chain.
2. Based on this estimation, what is the probability that the particle will be in state 2 two weeks from now?
3. What is the probability that the particle will be in the state 1 three weeks from now?
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