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27 Jun 2014, 10:21
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
35%
(medium)
Question Stats:
68% (01:47) correct
32%
(01:38)
wrong
based on 1642
sessions
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If \(xyz < 0\), is \(x < 0\)?
(1) \(x - y < 0\)
(2) \(x - z < 0\)
(1) \(x - y < 0\)
(2) \(x - z < 0\)
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27 Jun 2014, 10:22
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SOLUTION
If \(xyz < 0\), is \(x < 0\)?
\(xyz < 0\) implies that either all three unknowns are negative or only one of them, the smallest one, is negative and the other two are positive.
(1) \(x - y < 0\).
This means that \(x < y\). Could \(x\) be negative? Yes, if all of \(x\), \(y\), and \(z\) are negative. Could \(x\) be positive? Yes, if \(x\) and \(y\) are positive and \(z\) is negative. Not sufficient.
(2) \(x - z < 0\).
Basically the same here. We have \(x < z\). Could \(x\) be negative? Yes, if all of \(x\), \(y\), and \(z\) are negative. Could \(x\) be positive? Yes, if \(x\) and \(z\) are positive and \(y\) is negative. Not sufficient.
(1)+(2) We have \(x < y\) and \(x < z\). Hence, \(x\) is the smallest of the three. Could \(x\), the smallest of the three, be positive? No, because if \(x\) is positive, then both \(y\) and \(z\) must also be positive. But in this case, \(xyz\) would be positive, not negative as given in the stem. Therefore, \(x\) must be negative. Sufficient.
Answer: C
Try NEW inequalities PS question.
If \(xyz < 0\), is \(x < 0\)?
\(xyz < 0\) implies that either all three unknowns are negative or only one of them, the smallest one, is negative and the other two are positive.
(1) \(x - y < 0\).
This means that \(x < y\). Could \(x\) be negative? Yes, if all of \(x\), \(y\), and \(z\) are negative. Could \(x\) be positive? Yes, if \(x\) and \(y\) are positive and \(z\) is negative. Not sufficient.
(2) \(x - z < 0\).
Basically the same here. We have \(x < z\). Could \(x\) be negative? Yes, if all of \(x\), \(y\), and \(z\) are negative. Could \(x\) be positive? Yes, if \(x\) and \(z\) are positive and \(y\) is negative. Not sufficient.
(1)+(2) We have \(x < y\) and \(x < z\). Hence, \(x\) is the smallest of the three. Could \(x\), the smallest of the three, be positive? No, because if \(x\) is positive, then both \(y\) and \(z\) must also be positive. But in this case, \(xyz\) would be positive, not negative as given in the stem. Therefore, \(x\) must be negative. Sufficient.
Answer: C
Try NEW inequalities PS question.
27 Jun 2014, 10:43
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If \(xyz < 0\), is \(x < 0\)?
(1) \(x - y < 0\)
(2) \(x - z < 0\)
Untitled.png [ 4.29 KiB | Viewed 19654 times ]
Product of 3 nos can be negative if one of them is negative and other two nos are of the same sign or if all the nos are negative.
Case 1:x=-1,y=2,z=100
Case 2:x=1,z=2,y=-100
Case 3 x=1,y=3,z=-100
Case 4:x=-100,y=-2,z=-1
Consider St 1 says : x<y...So out of the table following cases are possible
Cases 1,3 and 4: For cases 1,4 we see that x<0 but case 3 x>0...So St 1 is insufficient
St 2 says x<z, so we have case 1,2 and 4
If it is case 1 and 4 then x<0 and answer to our question is yes but if it case 2 then answer is no
Combining we see that for both statements Case and 1 and 4 are applicable and for these cases x<0.
Ans is C
(1) \(x - y < 0\)
(2) \(x - z < 0\)
Attachment:
Untitled.png [ 4.29 KiB | Viewed 19654 times ]
Product of 3 nos can be negative if one of them is negative and other two nos are of the same sign or if all the nos are negative.
Case 1:x=-1,y=2,z=100
Case 2:x=1,z=2,y=-100
Case 3 x=1,y=3,z=-100
Case 4:x=-100,y=-2,z=-1
Consider St 1 says : x<y...So out of the table following cases are possible
Cases 1,3 and 4: For cases 1,4 we see that x<0 but case 3 x>0...So St 1 is insufficient
St 2 says x<z, so we have case 1,2 and 4
If it is case 1 and 4 then x<0 and answer to our question is yes but if it case 2 then answer is no
Combining we see that for both statements Case and 1 and 4 are applicable and for these cases x<0.
Ans is C
