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24 Aug 2020, 08:00
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B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
65%
(hard)
Question Stats:
59% (02:06) correct
41%
(02:12)
wrong
based on 823
sessions
History
Date
Time
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Not Attempted Yet
Is \(|x+y| > |x-y|\) ?
(1) \(|x| > |y|\)
(2) \(|x - y| < |x|\)
(1) \(|x| > |y|\)
(2) \(|x - y| < |x|\)
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25 Aug 2020, 09:00
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Bunuel
Is |x + y| > |x - y| ?
Is \(|x+y| > |x-y|\)? --> square it: is \(x^2+2xy+y^2>x^2-2xy+y^2\) --> is \(xy>0\)?
(1) |x| > |y|. We cannot get from this whether x and y have the same sign. Not sufficient.
(2) |x - y| < |x| --> square again: \(x^2-2xy+y^2<x^2\) --> \(xy>\frac{y^2}{2}\) --> since \(y^2\geq{0}\) (the square of any number is more than or equal to 0), then we have that \(xy>\frac{y^2}{2}\geq{0}\). Sufficient.
Answer: B.
General Discussion
yashikaaggarwal
Senior Moderator - Masters Forum
Joined: 19 Jan 2020
Last visit: 17 Jul 2025
Posts: 3,086
Given Kudos: 1,510
Location: India
Schools: Cranfield (A) Warwick MiM "23 (M)
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WE:Analyst (Internet and New Media)
24 Aug 2020, 08:08
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Bookmarks
Statement 1: |X| > |Y|
X>±Y
Case 1: X>Y
X-Y > 0
Case 2: X>-Y
X+Y > 0
No sufficient constraint to determine answer.
(Insufficient)
Statement 2: |x-y|<|X|
If |x-y|<|X|
|x-y| will definitely be less than |X+Y|
(Sufficient)
Answer is B
Posted from my mobile device
X>±Y
Case 1: X>Y
X-Y > 0
Case 2: X>-Y
X+Y > 0
No sufficient constraint to determine answer.
(Insufficient)
Statement 2: |x-y|<|X|
If |x-y|<|X|
|x-y| will definitely be less than |X+Y|
(Sufficient)
Answer is B
Posted from my mobile device
