In Problems 3338, is there a unique way of filling in the missing probabilities in the transition diagram? If so, complete the transi- tion diagram and write the corresponding transition matrix. If not, explain why. 83. ? .4 B .7 In Problems 21-24, use the transition diagram to find S2 for the Figure 101 indicated initial-state matrix So. di. So = [.2 .8] 22. So = [.6 .4) 23. So = [.9.1] 24. So = [.7 3] In Problems 2532, could the given matrix be the transition matrix of a Markov chain? .9.1 4 .8 26. Li : 28. 0 .5 -.3 .2.8 .5 5 20 In Problems 9-12, find S for the indicated initial-state matrix So and interpret with a tree diagram. 9. So = [10] 11. So = [.5.5] 10. So = [01] 12. So = [.3 .7] in Problems 1316, find S2 for the indicated initial-state matrix Son and explain what it represents. 16. So = [10] 14. So = [01] 15. So = [.5 .5] 16. So = [.3 7] In Problems 17-20, use the transition diagram to find S, for the In Problems 3338, is there a unique way of filling in the missing probabilities in the transition diagram? If so, complete the transi- tion diagram and write the corresponding transition matrix. If not, explain why. 83. ? .4 B .7 In Problems 21-24, use the transition diagram to find S2 for the Figure 101 indicated initial-state matrix So. di. So = [.2 .8] 22. So = [.6 .4) 23. So = [.9.1] 24. So = [.7 3] In Problems 2532, could the given matrix be the transition matrix of a Markov chain? .9.1 4 .8 26. Li : 28. 0 .5 -.3 .2.8 .5 5 20 In Problems 9-12, find S for the indicated initial-state matrix So and interpret with a tree diagram. 9. So = [10] 11. So = [.5.5] 10. So = [01] 12. So = [.3 .7] in Problems 1316, find S2 for the indicated initial-state matrix Son and explain what it represents. 16. So = [10] 14. So = [01] 15. So = [.5 .5] 16. So = [.3 7] In Problems 17-20, use the transition diagram to find S, for the