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9 April, 21:48

Suppose a basketball team had a season of games with the following characteristics: Of all the games, 60% were at-home games. Denote this by H (the remaining were away games). Of all the games, 25% were wins. Denote this by W (the remaining were losses). Of all the games, 20% were at-home wins. Of the at-home games, we are interested in finding what proportion were wins. Which of the following probabilities do you need to find in order to determine the proportion of at-home games that were wins?

A. P (H)

B. P (W)

C. P (H and W)

D. P (H | W)

E. P (W | H)

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  1. 9 April, 22:06
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    E. P (W | H).

    Step-by-step explanation:

    We are given that 60% are at-home games. So,

    P (H) = 0.60.

    We are given that 25% are winning games. So,

    P (W) = 0.25.

    We are given that 20% are at-home winning games. So,

    P (H and W) = 0.20.

    We are interested in finding what proportion of at-home games wins. So, we want are given that basketball team had a home game and we want to find win games. So, we are interested in finding probability of win given that a game is at-home game. Thus, we want to determine P (W|H).

    Further, P (W|H) can be determine with the given information as

    P (W|H) = P (W and H) / P (H)

    P (W|H) = 0.2/0.6

    P (W|H) = 0.333.
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