2017 AMC 12B Problem 17

Below is the professionally curated solution for Problem 17 of the 2017 AMC 12B, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2017 AMC 12B solutions, or check the answer key.

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Concepts:independent eventsbasic probability

Difficulty rating: 1800

17.

A coin is biased in such a way that on each toss the probability of heads is 23\dfrac{2}{3} and the probability of tails is 13.\dfrac{1}{3}. The outcomes of the tosses are independent. A player has the choice of playing Game A or Game B. In Game A she tosses the coin three times and wins if all three outcomes are the same. In Game B she tosses the coin four times and wins if both the outcomes of the first and second tosses are the same and the outcomes of the third and fourth tosses are the same. How do the chances of winning Game A compare to the chances of winning Game B?

The probability of winning Game A is 481\dfrac{4}{81} less than the probability of winning Game B.

The probability of winning Game A is 281\dfrac{2}{81} less than the probability of winning Game B.

The probabilities are the same.

The probability of winning Game A is 281\dfrac{2}{81} greater than the probability of winning Game B.

The probability of winning Game A is 481\dfrac{4}{81} greater than the probability of winning Game B.

Solution:

Let p=23.p = \dfrac23. Game A is won when all three tosses match: p3+(1p)3.p^3 + (1-p)^3. Game B needs the first pair to match and the second pair to match, each with probability p2+(1p)2,p^2 + (1-p)^2, so the win probability is (p2+(1p)2)2.\bigl(p^2 + (1-p)^2\bigr)^2. With p=23,p = \tfrac23, Game A gives (23)3+(13)3=927=13,\left(\tfrac23\right)^3 + \left(\tfrac13\right)^3 = \tfrac{9}{27} = \tfrac13, and Game B gives (49+19)2=(59)2=2581.\left(\tfrac49 + \tfrac19\right)^2 = \left(\tfrac59\right)^2 = \tfrac{25}{81}. The difference is 27812581=281,\tfrac{27}{81} - \tfrac{25}{81} = \tfrac{2}{81}, so Game A is 281\tfrac{2}{81} more likely.

Thus, the correct answer is D.

Problem 17 in Other Years