Using the competed discrete probability table, the expected value of the equation would be -$0.50
Number of possible outcomes = 4
- P(choosing same number) = 2/4 × 1/3 = 2/12 = 1/6
- P(not same number) = 1 - 1/6 = 5/6
The probability distribution :
- X ______ $2 _______ - $1
- P(x) :__ 0.1667 ______ 0.8333
Expected value = Σ(X × P(x)) = (2 × 0.16667) + (-1 × 0.8333)
Expected value = - $0.50
The amount of money Miguel should expect to win or lose :
Since the expected value is negative, Hence, Miguel should expect to lose -$0.5 each time he plays.
To make the game fair :
Expected value should be equal to 0 ;
Let the value = v
(0.16667v) + (-0.8333) = 0
0.16667v = 0.8333
v = (0.8333 ÷ 0.16667)
v = $4.998
v = $5.0
Hence, to make the game fair, the winning value should be $5.0
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