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24 Nov 2016, 13:29
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
45%
(medium)
Question Stats:
67% (01:44) correct
33%
(01:56)
wrong
based on 1806
sessions
History
Date
Time
Result
Not Attempted Yet
Attachment:
shaded number line.jpeg [ 11.14 KiB | Viewed 20175 times ]
(A) 10 < |x + 10| < 80
(B) 10 < |x – 100| < 80
(C) |x – 20| < 70
(D) |x – 20| < | x – 90|
(E) |x – 55| < 35
Absolute value inequalities are a rare and challenging category of test questions. This question may look very hard, but with the proper perspective, it is relatively straightforward. For a complete discussion of this question type, as well as the OE for this question, see:
Absolute Value Inequalities
Mike
27 Nov 2016, 15:07
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Step one: find the midpoint of the region. The midpoint, halfway between and 20 and 90, is 55. In other words, 20 and 90 have the same distance from 55, a distance of 35. These endpoints are not included, but the region includes all the points that have a distance from from x = 55 that is less than 35. Translating that into math, we get the following:
|x – 55| < 35
Answer = (E)
Source: magoos url provided!!!
|x – 55| < 35
Answer = (E)
Source: magoos url provided!!!
10 Feb 2017, 11:55
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OreoShake
Dear OreoShake,
I'm happy to respond.
We are looking for an inequality that expresses exactly that range--an inequality that includes every single point on that purple line and excludes every single point not on the purpose line. (E) does this perfectly.
The problem with (B) is that it certainly includes everything on the purple line, but it also includes a bunch of other points that are not on the line. For example, the points x = 100 and x = 150 both satisfy the inequality in (B), but these are points not included in the purple region.
Under-inclusion and over-inclusion are opposites, but they are both problems. We are looking for an exact fit.
Does this make sense?
Mike
