Answer:
The expected value for your profit is -$0.10
Step-by-step explanation:
The expected value of a discrete variable is calculated as:
[tex]E(x)=x_1p(x_1)+x_2p(x_2)+...+x_np(x_n)[/tex]
Where, [tex]x_1, x_2[/tex] and [tex]x_n[/tex] are the values that the variable can take and [tex]p(x_1), p(x_2)[/tex] and [tex]p(x_n)[/tex] are their respective probabilities.
So, the expected value of your income is:
[tex]E(x)=600(1/1500)+50(5/1500)+25(20/1500)+0(1474/1500)[/tex]
[tex]E(x)=0.9[/tex]
Because, you can win $600 with a probability of 1/1500, $50 with a probability of 5/1500, $25 with a probability of 20/1500 or $0 with a probability of 1474/1500.
Then, if you buy a ticket for $1, the expected value for your profit is:
Expected Value = Expected Income - Cost
Expected Value = $0.9 - $1
Expected Value = -$0.1
