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Stockmoose16
- Master | Next Rank: 500 Posts
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- Joined: Mon Aug 04, 2008 1:42 pm
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A certain football team played x games last season, of which the team won exactly y games. If tied games were not possible, how many games did the team win last season?
(1) If the team had lost two more of its games last season, it would have won 20 percent of its games for the season.
(2) If the team had won three more of its games last season, it would have lost 30 percent of its games for the season.
.... My answer is D, each statement alone is sufficient, but the answer key says it's C, both statements together. You can figure out that the correct number of wins is four, by trial-and-error. I.e. For statement 1, if the team has 4 out of 10 wins, and loses 2 more games, they'd have 2 out of 10 wins (won 20% for the season). Why does the answer key say this isn't sufficient? I can't think of any other way a team could lose two more games and still win exactly 20%, other than when they play exactly 10 games. I know they want you to make a formula, but what's wrong with logical trial and error to show sufficiency?
(1) If the team had lost two more of its games last season, it would have won 20 percent of its games for the season.
(2) If the team had won three more of its games last season, it would have lost 30 percent of its games for the season.
.... My answer is D, each statement alone is sufficient, but the answer key says it's C, both statements together. You can figure out that the correct number of wins is four, by trial-and-error. I.e. For statement 1, if the team has 4 out of 10 wins, and loses 2 more games, they'd have 2 out of 10 wins (won 20% for the season). Why does the answer key say this isn't sufficient? I can't think of any other way a team could lose two more games and still win exactly 20%, other than when they play exactly 10 games. I know they want you to make a formula, but what's wrong with logical trial and error to show sufficiency?
