The Monte Hall Problem. You choose door 1 knowing you have a 1 in 3 chance of winning. The Monty Hall problem is a famous seemingly paradoxical problem in conditional probability and reasoning using Bayes theorem. This problem known as the Monty Hall problem is famous for being so bizarre and counter-intuitive. Unfortunately for me thats 100 wrong.
The Monty Hall Problem is a famous or rather infamous probability puzzle. You pick a door say No1 and the host who knows whats behind the doors opens another door say No3 which has a donkey. The scenario is such. Information affects your decision that at first glance seems as though it shouldnt. In Monty Hall problem note that since according to the rules of the game the host knows the locations of the contents and must reveal one door that is not which the contestant chose and neither which has the car that means that he has two possible doors to reveal when the players one is which has thar car but he only has one possible to reveal when the players one has a goat. Its a long listing.
Ron Clarke takes you through the puzzle and explains the counter-intuitive answer.
You are given the opportunity to select one closed door of three behind one of which there is a prize. Monty Hall the game show host examines the other doors B C and opens one with a. Ron Clarke takes you through the puzzle and explains the counter-intuitive answer. Youre hoping for the car of course. Suppose youre on a game show and youre given the choice of three doors. Should you change your pick from door 1 to door 2.