Bertrand's box paradox
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For other paradoxes by Joseph Bertrand, see Bertrand's paradox.
Bertrand's Box Paradox is a logic paradox which first appeared in Joseph Bertrand's Calcul des probabilités (1889):
You have three boxes, each with two drawers on opposite sides. Each drawer contains a coin. One box has a gold coin on both sides, one a silver coin on both sides, and the third gold on one side and silver on the other. You choose a box at random, open one drawer, and find a gold coin; what is the chance of the coin on other side being silver?
The correct answer is one-third; the coin you see is equally likely to be any of the three gold coins, only one of which is opposite a silver coin. However, there is a tendency to fall into the following fallacious reasoning, which has been compared to the Monty Hall problem:
- You cannot be looking at the box SS; so you must be looking at GG or GS
- You were equally likely to pick either one.
- So there must be a 50/50 chance of GG or GS now.
[edit] See also
[edit] References
- Michael Clark, Paradoxes from A to Z, p.16;
- Howard Margolis Wason, Monty Hall, and Adverse Defaults.
