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09 Sep 2022, 04:21
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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:
45%
(medium)
Question Stats:
61% (01:35) correct
39%
(01:54)
wrong
based on 85
sessions
History
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Time
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Is xy < 0 ?
(1) x^2 = y^2
(2) 1/(x + y) < 1
(1) x^2 = y^2
(2) 1/(x + y) < 1
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09 Sep 2022, 04:28
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Bunuel
Question: Is xy < 0?
x*y will be less than zero when one of them is positive and other is negative
STatement 1: \(x^2 = y^2\)
i.e. x = ±y hence
NOT SUFFICIENT
Statement 2: 1/(x + y) < 1
i.e. x+y could be positive or negative both hence
NOT SUFFICIENT
Combining the two statements
\(x^2 = y^2\) and 1/(x + y) < 1
now, x can NOT be equal to -y because in that case x+y = 0 and denominator can NOT be zero in a fraction else it's not defined
also, and y both can NOT be zero
hence, x = y (non-zero)
ie. xy is NOT less than 0
answer to the question is DEFINITELY NO hence
SUFFICIENT
Answer: Option C
23 Sep 2022, 02:52
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Is xy < 0 ?
it is True iff x and y are of opposite sign
(1) \(x^2 = y^2\)
implies |x| = |y| i.e. both x and y have same value but we cannot say anything about their signs as they both can be of same sign or opp sign
so St 1 is Not Sufficient
(2) \(\frac{1}{(x + y)} < 1\)
or x+y > 1
implies x and y both cannot be negative
st 2 alone is Not Sufficient
St 1 & 2 combined
Note - x and y cannot be of opposite sign because in that case x+y = 0 and the fraction is Un-Defined
so we are left with x = y i.e both x and y are positive
therefore, xy < 0 is Not True - Hence combined st is Sufficient
Answer C
it is True iff x and y are of opposite sign
(1) \(x^2 = y^2\)
implies |x| = |y| i.e. both x and y have same value but we cannot say anything about their signs as they both can be of same sign or opp sign
so St 1 is Not Sufficient
(2) \(\frac{1}{(x + y)} < 1\)
or x+y > 1
implies x and y both cannot be negative
st 2 alone is Not Sufficient
St 1 & 2 combined
Note - x and y cannot be of opposite sign because in that case x+y = 0 and the fraction is Un-Defined
so we are left with x = y i.e both x and y are positive
therefore, xy < 0 is Not True - Hence combined st is Sufficient
Answer C
