Let A1 = The land has oil
A2 = Land has no oil
B1 = Test Predicted that land has oil
B2 =Test Predicted that land has no oil
Required probability = P(A1/B2)
A1 and A2 are mutually exclusive and exhaustive. Hence we can use Baye theorem
P(A1/B2) = P(A1B2)/P(B2) =
[tex]\frac{P(A1B2}{P(A1B1)+P(A1B2)} =\frac{0.20(0.45)}{(0,20)(0.45)+0.80(0.45)} \\= 0.20[/tex][tex]\frac{P(A1B2}{P(A1B2)+P(A1B1)}[/tex]
Answer:
The probability that the land has oil and the test predicts it is 36%
Step-by-step explanation:
So for plato users the correct option is C. 0.36
