In a large casino, the house wins on one of its games with a probability of 50.6%. All bets are 1 :1. If you win, you gain the amount you bet; if you lose, you lose the amount you bet. If you play 180 games in an evening, betting $1 each time, how much should you expect to win or lose?

Question

Mathematics

Guest

15 October, 00:47

In a large casino, the house wins on one of its games with a probability of 50.6%. All bets are 1 :1. If you win, you gain the amount you bet; if you lose, you lose the amount you bet. If you play 180 games in an evening, betting $1 each time, how much should you expect to win or lose?

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Answers (1)

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Haven Knox · Answer 1

E (x) = - $ 2.16

Step-by-step explanation:

If the house wins on one of its games with a probability of 50.6 % (0.506), then you lose 180*0.506 games, it means you lose in 91.08 games, how your bet by game $1, then you lose $91.08.

You win in 180-91.08 = 88.92 games; how you gain the amount you bet, then you gain $88.92.

Thus the expect value of your gain is:

E (x) = 88.92 - 91.08

E (x) = - $ 2.16