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05 Oct 2020, 02:45
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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:
15%
(low)
Question Stats:
82% (01:04) correct
18%
(01:08)
wrong
based on 109
sessions
History
Date
Time
Result
Not Attempted Yet
05 Oct 2020, 02:53
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We need to find if uv> 0
Statement 1:
\(u^2v^3<0\)
Irrespective of the sign of u, \(u^2\) will always be positive
For the inequality to hold \(v^3 < 0\) which implies that v<0
If u>0, then uv<0 (since v<0)
If u<0, then uv>0
Hence Statement 1 alone is insufficient
Statement 2:
\(uv^2<0\)
Since v^2 is always positive, we have u<0
If v < 0, then uv>0
If v>0, then uv<0
Combining Statement 1 and 2
Through statement 1 we know that v<0 and through statement 2 we know that u<0
Hence uv>0
Therefore IMO it is C
Statement 1:
\(u^2v^3<0\)
Irrespective of the sign of u, \(u^2\) will always be positive
For the inequality to hold \(v^3 < 0\) which implies that v<0
If u>0, then uv<0 (since v<0)
If u<0, then uv>0
Hence Statement 1 alone is insufficient
Statement 2:
\(uv^2<0\)
Since v^2 is always positive, we have u<0
If v < 0, then uv>0
If v>0, then uv<0
Combining Statement 1 and 2
Through statement 1 we know that v<0 and through statement 2 we know that u<0
Hence uv>0
Therefore IMO it is C
05 Oct 2020, 07:09
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Bunuel
Target question: Is uv > 0?
Statement 1: u²v³ < 0
Since u²v² must be POSITIVE, we can divide both sides of the inequality by u²v² to get: v < 0
We now know that v is NEGATIVE, but we don't know anything about u.
So there's no way to answer the target question with certainty
Statement 1 is NOT SUFFICIENT
Statement 2: uv² < 0
Since v² must be POSITIVE, we can divide both sides of the inequality by v² to get: u < 0
We now know that u is NEGATIVE, but we don't know anything about v.
So there's no way to answer the target question with certainty
Statement 2 is NOT SUFFICIENT
Statements 1 and 2 combined
Statement 1 tells us that v is NEGATIVE
Statement 2 tells us that u is NEGATIVE
So, the product uv = (NEGATIVE)(NEGATIVE) = POSITIVE
In other words, uv > 0
Since we can answer the target question with certainty, the combined statements are SUFFICIENT
Answer: C
Cheers,
Brent
