Respuesta :
Answer:
The expected value for the game is of -$4.5
Step-by-step explanation:
The expected value of the game is given by each scenario multiplied by its probability.
Scenario 1: Player wins
1 correct number from a set of 1000, so probability of 1/1000.
In this case, the player spent $5, but earns $500, so a net of 500 - 5 = $495
Scenario 2: Player loses
Probability of 999/1000.
In this case, the player loses $5.
So, the expected value for the game is:
[tex]E = \frac{495*1}{1000} - \frac{5*999}{1000} = -4.5[/tex]
The expected value for the game is of -$4.5
