(New page: Couple things to remember for this proof:)
 
 
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Couple things to remember for this proof:
 
Couple things to remember for this proof:
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<MATH>P(A|B)= P(A \bigcap B)/P(B) </MATH>
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so
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<MATH>P(A \bigcap B)= P(A|B)*P(B) </MATH>
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Make sure you use the theorem of total probability, which states:
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<MATH>P(A)=P(A|C)P(C)+P(A|C^c)P(C^c) \!</MATH>
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Try and rearrange what we want to proof so it looks like what we know is true.

Latest revision as of 09:12, 17 September 2008

Couple things to remember for this proof:

$ P(A|B)= P(A \bigcap B)/P(B) $

so

$ P(A \bigcap B)= P(A|B)*P(B) $

Make sure you use the theorem of total probability, which states:

$ P(A)=P(A|C)P(C)+P(A|C^c)P(C^c) \! $

Try and rearrange what we want to proof so it looks like what we know is true.

Alumni Liaison

Recent Math PhD now doing a post-doctorate at UC Riverside.

Kuei-Nuan Lin