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Urn, urn, urn (Posted on 2007-02-20) Difficulty: 3 of 5
Before you are three urns. The first two each contain 4 white and 6 black balls. The third has 3 white and 6 black.

Take one ball from the first urn and add it to the second with out looking at it. Stir it in, then take one ball from the second and add it to the third without looking at it.

If you pick a ball from the third urn, what is the probability it will be white?

What is the least number of balls you can put in the urns (at least one black and one white in each) to make the probability at the end equal to exactly 1/3?

No Solution Yet Submitted by Jer    
Rating: 5.0000 (1 votes)

Comments: ( Back to comment list | You must be logged in to post comments.)
Some Thoughts re: Solution - Part I | Comment 3 of 5 |
(In reply to Solution - Part I by hoodat)

I came up with the same answer, hoodat, but I think you've got two of your figures switched around.

There should be 96 possibilities for Black/White/White and 72 possibilities for White/Black/White.

  Posted by Jyqm on 2007-02-20 16:46:23

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