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19 Apr 2011, 05:54
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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:
65%
(hard)
Question Stats:
53% (01:57) correct
47%
(01:56)
wrong
based on 174
sessions
History
Date
Time
Result
Not Attempted Yet
19 Apr 2011, 06:35
Kudos
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(1)
n^5 (1-n^4) < 0
So either n^5 < 0 and (1-n^4) > 0
Or n^5 > 0 and 1 - n^4 < 0
So insufficient (n^4 is always > 0)
(2)
n^4 - 1 < 0
But we're not sure about sign of n
(1) and (2) say :
n^5 < 0, so n < 0
Answer - C
n^5 (1-n^4) < 0
So either n^5 < 0 and (1-n^4) > 0
Or n^5 > 0 and 1 - n^4 < 0
So insufficient (n^4 is always > 0)
(2)
n^4 - 1 < 0
But we're not sure about sign of n
(1) and (2) say :
n^5 < 0, so n < 0
Answer - C
19 Apr 2011, 08:30
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gmatpapa
Is \(n<0\)
1. \(n^5(1-n^4)< 0\)
\(n^5(n^4-1)> 0\)
is similar to saying:
\(n(n^2-1)>0\)
\((n-1)n(n+1)>0\)
Three roots: -1, 0, 1.
The above expression would be true for;
\(n>1 \hspace{2} OR \hspace{2} -1<n<0\)
Not Sufficient.
2. \(n^4-1 < 0\)
Similar to:
\(n^2-1<0\)
\((n+1)(n-1)<0\)
Two roots: -1,1.
The above expression would be true for;
\(-1<n<1\)
Not Sufficient.
Combining both;
\(-1<n<0\)
Sufficient.
Ans: "C"
