The best way to look at it is to realize that the door-opening is essentially misdirection in this problem. Many will remember the game show "Let´s make a Deal" from the 90ies where candidates had to choose one of three gates. By working through Bayes Theorem, we can calculate the actual odds of winning the car if we stick with door A, or … The Monty Hall Problem in 10 Python Lines - b.telligent. Solving the Monty Hall Problem with Bayes Theorem. Now "Monty" takes the other two doors state1 P - state2 - P. Our chances are 1/3 for "P", and 2/3 for "-". Monty Hall problem Suppose you're on a game show, and you're given the choice of three doors: Behind one door is a car behind the others, goats. 3 doors math problem - When you first choose door #1 from three, there's a 1/3 chance that the prize is behind that one and a 2/3 chance that it's behind one. A number of years after Hall stopped hosting the show, in an article published in Parade, … 3 doors math problem | Math Assignments. In the way-back, Let’s Make a Deal was a TV show hosted by Monty Hall. 1, and the host, who knows what's behind the other doors, opens another door, say No. Don't Switch! Why Mathematicians' Answer to the Monty Hall. You can also smimilarly scale the problem up to n doors. The last door is always the prize door and so you win 2/3 times on average. Now, in every case you dont initially pick the prize door, which is 2/3, the only non-prize door left is revealed. In this case you always lose since you will always be switching to a non-prize door. No matter how hard I try I can't understand the Monty Hall problem.
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