Suppose a Markov chain has three states, A, B,and C From state A,the process changes randomly to a different state. From state B
, the process is equally likely to stay as to change. If it changes, each other state is equally ikely From state C, the process is three times as likely to change as to stay, but it never changes to B P(B-+C)? (a) Carefully set up a transition diagram or transition matrix. What is Give exact answer.) (b) What is P(C- A) Give exact answer.) (c) Right now the process is at state C. What is the probability that the next three states will be ABC (in that order)? Give exact answer.) (d) Right now the process is at state B. What is the probability that in two moves, the process will be at state C? (Give exact answer.)
Think of this as finding equivalent fractions/ratios. 3/5 puppies are gray. what over 30 puppies would be gray? to find 3/5=?/30, you multiply the numerator and denominator by 6. 3 times 6 is 18.
Rhombus is a quadrilateral that has 4 congruent sides and diagonals bisect angles and diagonals which are perpendicular. Squares, rectangles and parallelograms do not have diagonals that are perpendicular. Answer thus is C. rhombus