Final answer:
Calculating the expected value of the described card game shows that playing 914 times would result in an expected loss of $11,425.
Step-by-step explanation:
To calculate the expected value of playing this card game 914 times, we need to determine the chance of drawing a card with a value of four or less and the outcomes associated with it. In a standard deck of 52 cards, each suit (hearts, spades, clubs, diamonds) has 4 cards that are 4 or less (2, 3, and 4, since aces are high). This gives us a total of 4 suits × 3 cards per suit = 12 cards. So, the probability of drawing one of these cards is 12/52.
The expected value (EV) for a single game is calculated by multiplying the probability of an outcome by the payout or loss for that outcome and summing these values. For this game, EV = (probability of winning) × (payout) + (probability of losing) × (loss). Substituting the values: EV = (12/52) × $175 + (40/52) × (-$49).
After simplifying, we can determine the EV for a single game and then multiply it by 914 to see the expected total value over those games. The calculations would be as follows:
Expected value per game: EV = (12/52) × $175 + (40/52) × (-$49) = ($25) + (-$37.5) = -$12.5
Expected value over 914 games: Total EV = 914 × (-$12.5) = -$11,425
Thus, if you played this game 914 times, you would expect to lose $11,425 in the long run.
.