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If \(|2x - 7| > 17,\) which of the following must be true?

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Vincen: Legendary Member; Posts: 2898; Joined: Thu Sep 07, 2017 2:49 pm; Thanked: 6 times; Followed by:5 members

If \(|2x - 7| > 17,\) which of the following must be true?

by Vincen » Tue Sep 08, 2020 7:34 am

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If \(|2x - 7| > 17,\) which of the following must be true?

A. \(-5 < x < 0\)
B. \(0 < x < 12\)
C. \(-5 < x < 12\)
D. \(x < -5\) or \(x > 12\)
E. \(x < -12\) or \(x > 5\)

Answer: D

Source: e-GMAT

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Source: Beat The GMAT — Problem Solving | Tue Sep 08, 2020 7:34 am

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Scott@TargetTestPrep: GMAT Instructor; Posts: 8086; Joined: Sat Apr 25, 2015 10:56 am; Location: Los Angeles, CA; Thanked: 43 times; Followed by:29 members

Re: If \(|2x - 7| > 17,\) which of the following must be true?

by Scott@TargetTestPrep » Fri Sep 11, 2020 1:14 pm

Vincen wrote: ↑
Tue Sep 08, 2020 7:34 am
If \(|2x - 7| > 17,\) which of the following must be true?

A. \(-5 < x < 0\)
B. \(0 < x < 12\)
C. \(-5 < x < 12\)
D. \(x < -5\) or \(x > 12\)
E. \(x < -12\) or \(x > 5\)

Answer: D

Solution:

We need to solve the inequality without the absolute value sign. If 2x - 7 is positive or 0, then |2x -7| = 2x - 7, and the inequality becomes:

2x - 7 > 17

2x > 24

x > 12

As we can see, the correct answer must be D. However, let’s finish the solution, solving for x when 2x - 7 is negative. In that case, |2x - 7| = -(2x - 7) = -2x + 7 and the inequality becomes:

-2x + 7 > 17

-2x > 10

x < -5

Answer: D

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