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09 Oct 2010, 04:09
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A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
65%
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Question Stats:
60% (02:22) correct
40%
(02:29)
wrong
based on 199
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If |a - b| = |b - c| = 2 , what is |a - c| ?
(1) \(a \lt b \lt c\)
(2) \(c - a \gt c - b\)
(C) 2008 GMAT Club - [t]m16#37[/t]
(1) \(a \lt b \lt c\)
(2) \(c - a \gt c - b\)
(C) 2008 GMAT Club - [t]m16#37[/t]
09 Oct 2010, 04:40
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AndreG
\(|a - b| = |b - c| = 2\)
Imagine the points on a number line. There is two possibilities, either a & c are on the same side of the line relative to b, or on the opposite sides. Also remember that |x-y| represents distance between x and y on the number line.
So if a & c ar on the same side then a=c. |a-c|=0
If they are on opposite sides, |a-c|=4
(1) \(a \lt b \lt c\)
a and c on opposite sides, answer is 4. Sufficient
(2) \(c - a \gt c - b\)
This only implies \(a \lt b\)
Insufficient to know where c is, same side or opposite side. Insufficient
Answer is (A)
09 Oct 2010, 05:51
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AndreG
Generally for \(|x|\):
When \(x\leq{0}\), then \(|x|=-x\);
When \(x\geq{0}\), then \(|x|=-x\).
(1) \(a<b<c\) --> as \(a<b\) (\(a-b<0\)) then \(|a - b|=2\) becomes: \(-a+b=2\), so \(b=2+a\) and as \(b<c\) (\({b-c}<0\)) then \(|b-c|=2\) becomes: \({-b+c}=2\). Substituting \(b\) --> \(-2-a+c=2\) --> \(a-c=-4\) --> \(|a - c|=|-4|=4\) . Sufficient.
(2) \(c-a>c-b\) --> \(b-a>0\) --> \(|a - b|=2\) becomes: \(-a+b=2\), so \(b=2+a\) --> \(|b - c|=|a-c+2| = 2\) --> either \(a-c=0\) or \(a-c=-4\). Not sufficient.
Answer: A.
