(1) 1/x > -1karthikpandian19 wrote:Is x greater than 1?
(1) 1/x > -1
(2)1/x^5 > 1/x^3
rijul007 wrote:(1) 1/x > -1karthikpandian19 wrote:Is x greater than 1?
(1) 1/x > -1
(2)1/x^5 > 1/x^3
1 > -x
x > -1
If x =-2, 1/x = -1/2 > -1. x=-2 doesn't fall under the solution set x >-1 here. It is easy to solve such problems by drawing a graph attached. From the graph(attached) you clearly see that for x <-1 and x > 0 the value of 1/x > -1
Insufficient
(2)1/x^5 > 1/x^3
1 > x^2
-1<x<1
Here again, if x =-1/2(-1<x<1), 1/x^5 = -32 and 1/x^3=-8 and definitely 1/x^5 < 1/x^3 and not 1/x^5 > 1/x^3. You cannot multiply in equations without knowing the sign of the term or value you multiply.
1/x^5 > 1/x^3
1/x > x (Multiplying x^4, which is definitely positive)
From the graph attached,
x<-1 and 0<x<1 is the solution set.
sufficient to say that x <1
Option B
I agree that B is the solution. I overlooked and read it as Is x greater than 0? instead of Is x greater than 1?. However, there is a flaw in your solution.ArunangsuSahu wrote:This is a "YES" or "NO" Question
We are missing 1 point here about the Statement 2:
Statement 2:
Given,1/x^5 > 1/x^3
or 1/x^3-1/x^5 < 0
or (x^2-1) < 0
or, x^2 <1
This Clearly tells -1<x<1...
Therefore x<1
So, Statement 2 is sufficient
(B)
Statement 1 cant be sufficientkarthikpandian19 wrote:I have a doubt in Statement I
(1) 1/x > -1
1 > -x
x > -1 (In this step don't we need to change the equality sign as X<-1 as we are multiplying by minus sign from the previous step)
Actually I did like this and found the answer to be D
Insufficient
But the OA is B
rijul007 wrote:Statement 1 cant be sufficientkarthikpandian19 wrote:I have a doubt in Statement I
(1) 1/x > -1
1 > -x
x > -1 (In this step don't we need to change the equality sign as X<-1 as we are multiplying by minus sign from the previous step)
Actually I did like this and found the answer to be D
Insufficient
But the OA is B
you can check this by plugging no
say x = -2
1/x = -1/2 > -1
x is not greater than 1
now lts say x =2
1/x = 1/2 > -1
x > 1
Insufficient
