2 Answers

Yersin · Answer 1 · 2020-05-09T10:38:50+0000

Answer:

Correct choice is A.
P(A|B)=(40)/(49) .

Explanation:

Given that
$P(A\cap B)=(5)/(7)$ ,
P(B)=(7)/(8) .

Now using those values , we need to find the value of
P(A|B) .

So apply the formula of conditional probability:

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

Plug the given values into above formula, we get:

(5)/(7)=(7)/(8) * P(A|B)

(7)/(8) * P(A|B)=(5)/(7)

P(A|B)=((5)/(7))/((7)/(8))

$P(A|B)=(5)/(7)\cdot(8)/(7)$

P(A|B)=(40)/(49)

Hence correct choice is A.
P(A|B)=(40)/(49) .

Kukuh Tw · Answer 2 · 2020-05-13T15:29:17+0000

Answer: Option A

P(A|B) = (40)/(49)

Explanation:

In a probabilistic experiment, when two events A and B are dependent on each other, then the probability of occurrence A since B occurs is:

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

Then if
$P(A\ and\ B) = (5)/(7)$ and
P(B) = (7)/(8) then:

$P(A|B) = ((5)/(7))/((7)/(8))\\\\P(A|B) = (40)/(49)$

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