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Re: A bag contains six red , five white , and four [#permalink]
why doesn't it work when we calculate (1-probability of both balls being red) 1-6/15*5/14
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Re: A bag contains six red , five white , and four [#permalink]
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benjaminjacob98 wrote:
why doesn't it work when we calculate (1-probability of both balls being red) 1-6/15*5/14

because when you mltiply by 5/14, this implies that your second pick is red given the first one has been red :(
we cannot select red at all

it's (1-6/15)*(1-6/14)=9/15*8/14=24/70 simplied to 12/35

Also, we can select two slots: ____ ____ ----> 9 (not red for the first slot)*8 (not red for the second slot). Since this is not permutation, we must divide by a factor of 2 or the number of slots. Hence 9*8/2=36 is the number of favorable outcomes.

In total there are 15C2 outcomes or 15!/(2!*13!)=15*14/2=105

The answer must be 36/105 and this is the same as 12*3/35*3 reduced to 12/35
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Re: A bag contains six red , five white , and four [#permalink]
motion2020 wrote:
benjaminjacob98 wrote:
why doesn't it work when we calculate (1-probability of both balls being red) 1-6/15*5/14

because when you mltiply by 5/14, this implies that your second pick is red given the first one has been red :(
we cannot select red at all

it's (1-6/15)*(1-6/14)=9/15*8/14=24/70 simplied to 12/35

Also, we can select two slots: ____ ____ ----> 9 (not red for the first slot)*8 (not red for the second slot). Since this is not permutation, we must divide by a factor of 2 or the number of slots. Hence 9*8/2=36 is the number of favorable outcomes.

In total there are 15C2 outcomes or 15!/(2!*13!)=15*14/2=105

The answer must be 36/105 and this is the same as 12*3/35*3 reduced to 12/35


Oh okayy I got it now. Thanks for the fast reply mate!
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Re: A bag contains six red , five white , and four [#permalink]
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