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09 Dec 2019, 00:56
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B
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Difficulty:
75%
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Question Stats:
50% (02:33) correct
50%
(02:36)
wrong
based on 141
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Is \(x^{12}- 2x^{11}\) negative?
(1) \(x^2 < |x|\)
(2) \(x^{-1} < -1\)
Are You Up For the Challenge: 700 Level Questions
(1) \(x^2 < |x|\)
(2) \(x^{-1} < -1\)
Are You Up For the Challenge: 700 Level Questions
Archit3110
Major Poster
Updated on: 09 Aug 2020, 05:23
Originally posted by Archit3110 on 09 Dec 2019, 03:17.
Last edited by Archit3110 on 09 Aug 2020, 05:23, edited 1 time in total.
Last edited by Archit3110 on 09 Aug 2020, 05:23, edited 1 time in total.
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given
\(x^{12}- 2x^{11}\) negative
#1
\(x^2 < |x|\)
x will be a fraction only possibility
but for x = + fraction we get yes and x = -ve we get no
insufficient
#2
\(x^{-1} < -1\)
is -ve ; possiblity ; x=-1/2,-1/3; we get NO
IMO B sufficient
\(x^{12}- 2x^{11}\) negative
#1
\(x^2 < |x|\)
x will be a fraction only possibility
but for x = + fraction we get yes and x = -ve we get no
insufficient
#2
\(x^{-1} < -1\)
is -ve ; possiblity ; x=-1/2,-1/3; we get NO
IMO B sufficient
Bunuel
09 Dec 2019, 09:47
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We can factor out \(x^{11}\) to get
\(x^{11}*(x-2)\)
the only possibility for this expression to be negative is
when 0<x<2
1 stm --> gives us a range -1<x<1. Not sufficient
2 stm -- \(\frac{1}{x}<-1\) means x is negative. Sufficient
IMO
Ans: B
\(x^{11}*(x-2)\)
the only possibility for this expression to be negative is
when 0<x<2
1 stm --> gives us a range -1<x<1. Not sufficient
2 stm -- \(\frac{1}{x}<-1\) means x is negative. Sufficient
IMO
Ans: B
