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24 Jun 2017, 00:07
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D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
55%
(hard)
Question Stats:
62% (01:30) correct
38%
(01:34)
wrong
based on 870
sessions
History
Date
Time
Result
Not Attempted Yet
Given that \(x^3*y > 0\) and that \(x^2*y^3 < 0\) which of the following statements must be true?
I. \(x < 0\)
II. \(x < y < 0\)
III. \(y^3 < x^2\)
A. I only
B. II only
C. I and II only
D. I and III only
E. I, II, and III
I. \(x < 0\)
II. \(x < y < 0\)
III. \(y^3 < x^2\)
A. I only
B. II only
C. I and II only
D. I and III only
E. I, II, and III
Luckisnoexcuse
Current Student
Joined: 18 Aug 2016
Last visit: 31 Mar 2026
Posts: 513
Given Kudos: 198
Concentration: Strategy, Technology
Schools: Kenan-Flagler '20 (M)
GMAT 1: 630 Q47 V29
GMAT 2: 740 Q51 V38
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24 Jun 2017, 01:22
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Bunuel
From the stem we can deduce that y<0 and x<0
(x^3)*y >0 means either both are -ve or both are +ve
(x^2)*(y^3)<0 means y is -ve
Hence y<0 and x<0
I holds true
II does not always (e.g. y = -4 and x = -2)
III will always hold as (y = -ve number)^3 < Positive number (x = -ve number)^2
Hence D
24 Jun 2017, 02:02
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Bunuel
(i) \(x^3*y > 0\)
Either both \(x\) and \(y\) must be negative or both must be positive for the above result to be true.
(ii) \(x^2*y^3 < 0\)
Since square of any number must be positive, \(y\) must be negative for the above result to be true.
From (i) and (ii), it can be concluded that both \(x\) and \(y\) are negative.
I) This is true from the above.
II) This need not necessarily be true. For e.g., let \(x = y = -2\), then \((-2)^{2} * (-2)^{3} = 4 * -8 = -32\), but here \(x\) is not less than \(y\).
III) This must be true as both \(x\) and \(y\) are negative numbers.
So, only I and III are true. Ans - D.
