quote:
Originally posted by Grue
quote:
Originally posted by haydn
The probabilty of getting at least 2 should be Probability of getting two (P2) + P3 + P4 + P5 (As said above).
A simpler way to determine it would be to work out the probability of one being picked plus the probability of none being picked and subtract this amount from one. I think markee's calculation was off after he didn't include the possibility of none being picked.
That is exactly right so working it out....
quote:
Originally posted by markee
So there are 5 possibilities (for the 1 out of 5 trails) ABBBB BABBB BBABB BBBAB BBBBA
1/10*9/10*9/10*9/10*9/10*5 = 32.805% of it NOT being at least 2 out of 5
And the probability of of it being 0 out of 5 would be 9/10*9/10*9/10*9/10*9/10 = .59049 or 59.049%
So 100%-59.049%-32.805%=8.146% which is less than 10% 
Thanks for fixing that, I'm used to using nPr and nCr for things so I forget a bit of the binomial stuff, sorry about that .Roy.
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![[Image: markee.png]](http://mark.kernke.org/markee.png)