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==A coin puzzle==
==A coin puzzle==
[A coin problem]
[http://wordplay.blogs.nytimes.com/2014/03/17/coin/?module=BlogPost-Title&version=Blog%20Main&contentCollection=Numberplay&action=Click&pgtype=Blogs&region=Body A coin problem]<br>
by Gary Antonik, Numberplay blog, ''New York Times'', 17 March 2014
 
The post begins with this simple problem:
<blockquote>
<blockquote>
Consider this simple game: flip a fair coin twice. You win if you get two heads, and lose otherwise. It’s not hard to calculate that the chances of winning are 1/4.
Consider this simple game: flip a fair coin twice. You win if you get two heads, and lose otherwise. It’s not hard to calculate that the chances of winning are 1/4.
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Continues "And here is my recipe for getting the most out of this problem: if you can solve it, do not stop with one answer. Rather, see how many answers you can come up with. I’ve posed this problem to many people, and I continue to hear novel solutions."
Continues "And here is my recipe for getting the most out of this problem: if you can solve it, do not stop with one answer. Rather, see how many answers you can come up with. I’ve posed this problem to many people, and I continue to hear novel solutions."


[http://wordplay.blogs.nytimes.com/2014/03/24/urn/ A large urn]<br>
by Gary Antonik, Numberplay blog, ''New York Times'', 24 March 2014


<blockquote>
<blockquote>

Revision as of 01:20, 7 April 2014

A coin puzzle

A coin problem
by Gary Antonik, Numberplay blog, New York Times, 17 March 2014

The post begins with this simple problem:

Consider this simple game: flip a fair coin twice. You win if you get two heads, and lose otherwise. It’s not hard to calculate that the chances of winning are 1/4.

Your challenge is to design a game, using only a fair coin, that you have a 1/3 chance of winning.

Continues "And here is my recipe for getting the most out of this problem: if you can solve it, do not stop with one answer. Rather, see how many answers you can come up with. I’ve posed this problem to many people, and I continue to hear novel solutions."


There are 600 black marbles and 400 white marbles mixed well in a large urn. You draw marbles one by one at random without replacement until you take out all the marbles of one of the colors. What is the probability that at least one white marble will be left in the urn?

Bonus: On average, how many marbles will be left in the urn?

Submitted by Bill Peterson