PLEASE ONLY AN EXPERT SOLVE THIS I GOT A MEDIOCRE GRADE FROM THE LAST HW CHEGG EXPERTS SOLVED!

THERE IS NO NEED FOR MORE INFORMATION WHO EVER WROTE THAT COMMENT PLEASE DONT ANSWER MY QUESTION I KNOW YOU WILL SOLVE IT WRONG.

3) (24pts) A production machine has two crucial parts which are subject to failures. The two parts are identical. The machine works as long as one of the two parts is functioning. A repair is done when both parts have failed. A repair takes one day and after each repair the part is as good as new. An inspection at the beginning of each day reveals the exact condition of each part. If at the beginning of each day both parts are in good condition, then at the end of day both parts are still in good condition with probability 0.6, one of them is broken down with probability 0.2 and both are broken down with probability 0.2. If at the beginning of the day one part is in good condition, this part is still in good condition at the end of the day with probability 0.5. a. Define a Markov chain to describe the functioning of the machine and specify the one-step transition probabilities. Explicitly state the definition of your state variable. b. Guess steady state probabilities without solving any systems of linear equations. (You can use a software to perform matrix multiplications). c. Given that both crucial parts are in good condition Monday, what is the expected number of parts in good condition on Wednesday? 3) (24pts) A production machine has two crucial parts which are subject to failures. The two parts are identical. The machine works as long as one of the two parts is functioning. A repair is done when both parts have failed. A repair takes one day and after each repair the part is as good as new. An inspection at the beginning of each day reveals the exact condition of each part. If at the beginning of each day both parts are in good condition, then at the end of day both parts are still in good condition with probability 0.6, one of them is broken down with probability 0.2 and both are broken down with probability 0.2. If at the beginning of the day one part is in good condition, this part is still in good condition at the end of the day with probability 0.5. a. Define a Markov chain to describe the functioning of the machine and specify the one-step transition probabilities. Explicitly state the definition of your state variable. b. Guess steady state probabilities without solving any systems of linear equations. (You can use a software to perform matrix multiplications). c. Given that both crucial parts are in good condition Monday, what is the expected number of parts in good condition on Wednesday