seanieg89
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Many of you will have heard of the Monty Hall problem, presented below:
1. There are three briefcases, two are empty and one contains one million dollars. Monty knows which one contains the prize.
2. The contestant chooses a case but does not open it.
3. Monty opens an empty case out of the two remaining cases (if they are both empty, he chooses the case to open at random.)
4. Monty offers you the choice to swap you case for the last unopened case.
Is it in your best interest to do so? What is your expected prize if you do/don't switch cases?
(If you do not know the answer, I will not spoil it here...view it as part A of the question.)
Now consider the following variant:
Monty has decided he is losing too much money by always offering this swap. He decides to only offer it some of the time.
Monty offers you a swap with probability p if your first choice is correct and offers you a swap with probability q if your first choice is incorrect.
Suppose you as the contestant decide to accept the swap with probability r.
For a given pair (p,q), which r maximises your expected prize and what is this expected prize in terms of p and q?
Hence find all optimal choices of p and q for Monty if his first priority is minimising the maximum expected prize of contestants (as he is paranoid about his assistants leaking the values of p and q) and his second priority is offering the switch as often as possible (as this is after all a game show and the swap adds entertainment). Remember that the first priority trumps the second priority though!
For these optimal choices of (p,q), what is the expected prize of the contestant?
1. There are three briefcases, two are empty and one contains one million dollars. Monty knows which one contains the prize.
2. The contestant chooses a case but does not open it.
3. Monty opens an empty case out of the two remaining cases (if they are both empty, he chooses the case to open at random.)
4. Monty offers you the choice to swap you case for the last unopened case.
Is it in your best interest to do so? What is your expected prize if you do/don't switch cases?
(If you do not know the answer, I will not spoil it here...view it as part A of the question.)
Now consider the following variant:
Monty has decided he is losing too much money by always offering this swap. He decides to only offer it some of the time.
Monty offers you a swap with probability p if your first choice is correct and offers you a swap with probability q if your first choice is incorrect.
Suppose you as the contestant decide to accept the swap with probability r.
For a given pair (p,q), which r maximises your expected prize and what is this expected prize in terms of p and q?
Hence find all optimal choices of p and q for Monty if his first priority is minimising the maximum expected prize of contestants (as he is paranoid about his assistants leaking the values of p and q) and his second priority is offering the switch as often as possible (as this is after all a game show and the swap adds entertainment). Remember that the first priority trumps the second priority though!
For these optimal choices of (p,q), what is the expected prize of the contestant?
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