Answer:
Explanation:
We can use the law of total probability to calculate the probability that the Hope River will overflow its banks this season:
P(overflow) = P(overflow | heavy rain) x P(heavy rain) + P(overflow | no heavy rain) x P(no heavy rain)
From the problem statement, we are given:
P(overflow | heavy rain) = 0.65 (the probability of overflow given heavy rain)
P(overflow | no heavy rain) = 0.15 (the probability of overflow given no heavy rain)
P(heavy rain) = 0.75 (the probability of heavy rain)
We can find P(no heavy rain) as:
P(no heavy rain) = 1 - P(heavy rain) = 1 - 0.75 = 0.25
Substituting these values, we get:
P(overflow) = 0.65 x 0.75 + 0.15 x 0.25
= 0.4875 + 0.0375
= 0.525
Therefore, the probability that the Hope River will overflow its banks this season is 0.525, or 52.5%.