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04 Jul 2023, 01:30
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C
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Difficulty:
75%
(hard)
Question Stats:
47% (01:58) correct
53%
(02:07)
wrong
based on 100
sessions
History
Date
Time
Result
Not Attempted Yet
Is n negative?
(1) \((1 – n^2) < 0\)
(2) \(n^2 – n – 2 < 0\)
(1) \((1 – n^2) < 0\)
(2) \(n^2 – n – 2 < 0\)
04 Jul 2023, 02:01
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According to my understanding.
Question Stem : Is n negative?
(1) (1–n2)<0
can be written as
(1+n)(1-n)<0
now, using in-equality properties, we can say that the equation will be 0 at n = -1 and n = +1.
Now note that this equation at n=+2 and n=-2 will be negative, however at n=0 will be positive so we get the sign ranges where A,C are -ve while B is +ve.
.......-1...........+1.......
---A---|-----B----|---C--
we need <0 neg so n can take values in the range (-inf,-1) U (1,inf).
Hence n can be +ve or negative.
Strike A,D
(2) n2–n–2<0
solving this equation, we get (n+1)(n-2) < 0
From here we get n = -1 and n = +2 as the =0 points.
Now take n = 0 we get a negative result, so the range of the above equation is n belongs to (-1,2) or [0,1]
Therefore from this we can say that :
B is enough to tell that x is not negative.
Strike C, E.
B is the answer.
Question Stem : Is n negative?
(1) (1–n2)<0
can be written as
(1+n)(1-n)<0
now, using in-equality properties, we can say that the equation will be 0 at n = -1 and n = +1.
Now note that this equation at n=+2 and n=-2 will be negative, however at n=0 will be positive so we get the sign ranges where A,C are -ve while B is +ve.
.......-1...........+1.......
---A---|-----B----|---C--
we need <0 neg so n can take values in the range (-inf,-1) U (1,inf).
Hence n can be +ve or negative.
Strike A,D
(2) n2–n–2<0
solving this equation, we get (n+1)(n-2) < 0
From here we get n = -1 and n = +2 as the =0 points.
Now take n = 0 we get a negative result, so the range of the above equation is n belongs to (-1,2) or [0,1]
Therefore from this we can say that :
B is enough to tell that x is not negative.
Strike C, E.
B is the answer.
04 Jul 2023, 03:01
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target is n -ve
#1
\((1 – n^2) < 0\)
test with n -2, -3/2,-1/2,0,1/2,1, 3/2, 2
we get yes at n = 2 , -2 , -3/2 , 3/2
insufficient
#2
\(n^2 – n – 2 < 0\)
test with n -2, -3/2,-1/2,0,1/2,1, 3/2, 2
n can be 0 , 3/2
insufficient
from 1 &2
n = +3/2
option C
#1
\((1 – n^2) < 0\)
test with n -2, -3/2,-1/2,0,1/2,1, 3/2, 2
we get yes at n = 2 , -2 , -3/2 , 3/2
insufficient
#2
\(n^2 – n – 2 < 0\)
test with n -2, -3/2,-1/2,0,1/2,1, 3/2, 2
n can be 0 , 3/2
insufficient
from 1 &2
n = +3/2
option C
Bunuel
