Answer:
expected net winnings -0.741
Explanation:
given data
chance of winning = 1 in approximately 27 million
buy a lottery ticket = $1
win grand prize = $7
solution
we get here expected net winnings for this single ticket is
we consider here X be the winnings from the lotto game
so
Probability if win (X = 7000 000) = [tex]\frac{1}{27000000}[/tex]
and
Probability if not win (X = 0) = [tex]\frac{26999999}{27000000}[/tex]
so
Expected (X) = ∑x P(X=x)
Expected (X) = [tex]\frac{7000000}{27000000}[/tex] + 0
Expected (X) = 0.259
so that we have expected to win $0.25 but we pay $1 for ticket
as expected net winning is = 0.259 - 1 = -0.741
it is negative so so it is expected loss
