Answer:
-$0.90
Step-by-step explanation:
There are only two possible outcomes, winning $23 (W) or losing $15 (L). Therefore:
[tex]P(W) + P(L) = 1[/tex]
The probability of the player making his next 3 free throws (P(W)) is:
[tex]P(W) = \frac{217}{302}*\frac{217}{302}*\frac{217}{302}\\P(W) = 0.37098[/tex]
The probability of the player NOT making his next 3 free throws (P(L)) is:
[tex]P(L) = 1 - P(W) = 1 - 0.37098\\P(L) = 0.62902[/tex]
Expected value (EV) is given by the payoff of each outcome multiplied by its probability:
[tex]EV = (23*0.37098) -(15*0.62902)\\EV = -\$0.90[/tex]
The expected value of the proposition is -$0.90
