Re: Fun with Bayes' Theorem (Answers)

From: Lee Corbin (lcorbin@ricochet.net)
Date: Wed May 09 2001 - 06:30:46 MDT


On 5/4/01 I posted the following problems. See below
for answers.

1. There are two bags, each with 10 coins. Half the coins
    in the first bag are counterfeit, and all the coins in
    the second bag are counterfeit. Someone hands you a bag,
    and you happen to pull a coin out of that bag and examine
    it. If you see that the coin is counterfeit, what is the
    probability that you were handed the counterfeit bag?

2. A little girl's father discovers that his wife is
    pregnant again (but they don't know the sex of the
    unborn child). The man decides to visit a mathematician.
    "I have two children, sir", he says, "and one of them
    is a girl. What is the probability that the other is
    a boy?" What did the mathematician tell him?

3. You're on the Monte Hall show, and there is a big prize
    behind one curtain, and junk prizes behind the other two
    curtains. You pick one of the three at random. Monte
    then opens one of the other curtains and shows you a
    junk prize, and asks if you still want to keep playing.
    You say, "Yes, but let me switch my choice to the other
    curtain!". Monte says, "That's weird," but allows the
    switch. What is the probability of your getting the big
    prize? (As is widely known, Marilyn Vos Savant humiliated
    some experienced mathematicians with this old problem.)

4. You wash up on a desert island where it is known that Long
    John Silver has hid a lot of gold in one of three strongly
    built shacks. You begin dismantling one of the three. A
    lightning bolt comes out of the overcast sky and strikes
    one of the other shacks, destroying it and revealing that
    the gold wasn't there. What is the probability that the
    gold will turn up in the shack that you are not working on?

Hint: one of the answers is 1/2 and the others have the same
answer.

***Answers*** For problems 1, 2, and 3, the answer is 2/3. For
problem number 4, the answer is 1/2. Thanks to Amara for an
especially nice explanation of the Monte Hall problem.

Lee Corbin



This archive was generated by hypermail 2.1.5 : Sat Nov 02 2002 - 08:07:33 MST