Answer:
The probability of the temperature exceeding 65 degrees Fahreneit but not needing a rolling blackout is 0.4- Hence, there is a 40% chance.
Step-by-step explanation:
Lets call F the event 'the temperature will exceed 85 degrees Fahrenheit' and B the event 'a blackout will be needed'.
We want P(F ∩ B^c), note that if F happens, there could be 2 disjoint possible events: B or B^c, hence
P(F) = P(F ∩ B) + P(F ∩ B^c)
Hence
P(F ∩ B^c) = P(F) - P(F ∩ B) = 0.6 - 0.2 = 0.4
Answer:
Step-by-step explanation:
Define the events,
A. The temperature will exceed 85°F on a given july day.
B. The rolling blackout will be needed on that day.
From the given information, there is 60% chance that the temperature will exceed 85°F on any given july day in a particular area. That is P(A)=0.60, that 30% chance that a rolling blackout will be needed in that area. That is P(B)=0.30, and the 20% chance that both events will occur. That is P(A∩B)=0.20
Therefore, the probability that the temperature will exceed 85°F on a given july day but that no rolling blackout will be needed on that day is.
P(A∩B')=P(A)-P(A∩B)=0.60-0.20=0.40
Thus, th probability that the temperature will exceed 85°F on a given july day but that no rolling blackout will be needed on that day is 0.40
