Hi Stacey -
Is x > 0?
(1) |x + 3| = 4x - 3
(2) |x - 3| = |2x - 3|
(1) Sufficient
CONDITION :: x+3>0
x + 3 = 4x - 3 or x = 2 ... valid solution (Substituting x=2 makes x+3>0 )
CONDITION :: x+3<0
-(x + 3) = 4x - 3 or x = 0 ... invalid solution. (Substituting x=0 DOESN'T satisfy x+3<0 )
We know that 2 is the only solution possible and we can say that x is definitely positive.
(2) |x - 3| = |2x - 3| - INSUFFICIENT
Im not sure how to check here can u please help.
My guess work -
X-3> 0
X-3 = 2X -3 => x = 0 (Substituting x=0 DOESN'T satisfy X-3> 0)
Is this correct how do i proceed?
Correct Ans A
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- jp.jprasanna
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- njospe2
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Re: Is x > 0? ; (2) |x – 3| = |2x – 3|
Hey,
I would do the following to solve for (2)
CONDITION 1: x+3>0
x - 3 = 2x - 3 or x = 0 ---which is a valid solution
CONDITION 2: x+3<0
-( x - 3) = 2x - 3 or x=2 ---which is also a valid solution
Thus is x > 0 not always - INSUFFICIENT
I would do the following to solve for (2)
CONDITION 1: x+3>0
x - 3 = 2x - 3 or x = 0 ---which is a valid solution
CONDITION 2: x+3<0
-( x - 3) = 2x - 3 or x=2 ---which is also a valid solution
Thus is x > 0 not always - INSUFFICIENT
- jp.jprasanna
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Re: Is x > 0? ; (2) |x – 3| = |2x – 3|
njospe2 Wrote:Hey,
I would do the following to solve for (2)
CONDITION 1: x+3>0
x - 3 = 2x - 3 or x = 0 ---which is a valid solution
CONDITION 2: x+3<0
-( x - 3) = 2x - 3 or x=2 ---which is also a valid solution
Thus is x > 0 not always - INSUFFICIENT
Hey- thanks
But can u please let me know why would take the condition x+3>0 while the mods in option B says |x - 3| = |2x - 3|?
Cheers
- bineeshnair4u
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Re: Is x > 0? ; (2) |x – 3| = |2x – 3|
jp.jprasanna Wrote:(1) Sufficient
CONDITION :: x+3>0
x + 3 = 4x - 3 or x = 2 ... valid solution (Substituting x=2 makes x+3>0 )
CONDITION :: x+3<0
-(x + 3) = 4x - 3 or x = 0 ... invalid solution. (Substituting x=0 DOESN'T satisfy x+3<0 )
We know that 2 is the only solution possible and we can say that x is definitely positive.
this is correct.. so 1 is sufficient..
jp.jprasanna Wrote:(2) |x - 3| = |2x - 3| - INSUFFICIENT
Im not sure how to check here can u please help.
My guess work -
X-3> 0
X-3 = 2X -3 => x = 0 (Substituting x=0 DOESN'T satisfy X-3> 0)
I would go with taking combination of signs. We have 4 choices
A. +=+
B. -=-
C. +=-
D. -=+
A and B are same
C and D are same
so we have to solve only 2 equations
for A,B => x-3 = 2x - 3 => x=0 which is a valid solution
when x=0 then x-3 = 2x-3 => -3 = -3 still valid solution also i eliminates the possibility of A
for C,D => x-3 = -(2x-3) => x=2 which is valid solution
by substituting it back u get
2-3 = 2.2 - 3 => C is invalid but D is valid
still we have 2 option left with us. so 2) is insufficient to find whether x>0 or not
Hence answer A......
- RonPurewal
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Re: Is x > 0? ; (2) |x – 3| = |2x – 3|
hi,
is this problem actually from the official gmat prep software?
if so, please post a screenshot from the software. if not, please cite the correct source, so that we can move the thread to the appropriate folder.
thanks.
is this problem actually from the official gmat prep software?
if so, please post a screenshot from the software. if not, please cite the correct source, so that we can move the thread to the appropriate folder.
thanks.
5 posts Page 1 of 1