Basic probability confusion with independence

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Jeff_McD18
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Q. Consider the following statements about events A, B, and C.

- p(A) = 2/3
- p(B) = 1/2
- B c A
- Events A and C are independent
- Events B and C are mutually exclusive

Given that B is a subset of A is what is P(A n B). B is completely contained in A so any point in B is also in A which means that (A n B) = B which implies P(A n B) = P(B).

so therefor p(A|B) = 1/3

&

p(B|A)= 1/3

Is this correct?
 
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Welcome to PF!

Hi Jeff! Welcome to PF! :wink:
Jeff_McD18 said:
Given that B is a subset of A is what is P(A n B). B is completely contained in A so any point in B is also in A which means that (A n B) = B which implies P(A n B) = P(B).

Yes. :smile:
so therefor p(A|B) = 1/3

&

p(B|A)= 1/3

No.

p(A|B) is pronounced "the probability of A given B", and means the probability that something in B is also in A.
 


okay, so p(A|B)=p(B)=1/3

How would you go about solving p(B|A)?
 


P(A|B) = p(A n B)/p(B)