Answer :
Answer:
(C). (Probability of state A*Value in state A)+(Probability of state B*Value in state B)
Step-by-step explanation:
The expected value of a probability distribution, E(X) is defined as:
[tex]E(x)=\sum_{i=1} ^{k} x_{i} \cdot P(x_{i})\\$Where x=An Outcome\\P(x)=Probability of that Outcome[/tex]
Given Outcome A and B, the Expected Value therefore is:
Expected Value = (Probability of state A*Value in state A)+(Probability of state B*Value in state B)