If x<0, then Sqrt( -x|x| ) is
(A) -x
(B) -1
(C) 1
(D) x
(A) sqrt(x)
OA [spoiler]A[/spoiler]
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- yankee.musk
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- yankee.musk
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Nope. My first response was D, but I was wrong
Last edited by yankee.musk on Tue Jun 01, 2010 3:34 pm, edited 1 time in total.
- indiantiger
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Sqrt( -x|x| )
=> sqrt(-(-x)|-x|) ( as x has negative sign)
=> sqrt(x^2)
=>-x ( x is less then 0)
=> sqrt(-(-x)|-x|) ( as x has negative sign)
=> sqrt(x^2)
=>-x ( x is less then 0)
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- uwhusky
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Is this a legitimate GMAT question? I thought GMAT doesn't test questions like sqrt of a negative number.
I guess to approach this question, I would convert sqrt to exponent: (-x|x|)^1/2 and then (-x^2)^(1/2) is equal to -x^(2/2), which is -x^1 = -x.
Due to its ugliness, I don't think it is a GMAT question.
I guess to approach this question, I would convert sqrt to exponent: (-x|x|)^1/2 and then (-x^2)^(1/2) is equal to -x^(2/2), which is -x^1 = -x.
Due to its ugliness, I don't think it is a GMAT question.
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When we apply the square root function, the result must be positive. So, we can eliminate negative answers. Choice B is clearly negative.
But because x itself is negative, we can also automatically eliminate choice D (square root can't result in negative).
Similarly, because we can't take the square root of a negative number, we can eliminate choice E.
We don't know x's value, so we can eliminate choice C.
The answer must be choice A!
Because x is negative, "-x" must be positive. The "-" sign doesn't mean we were taking the square root of a negative or that the square root operation yielded a negative result. The "-" doesn't denote the sign of "x". It just tells you to multiply x by -1.
If x<0, then square root of (x^2) is (-1)*x or -x.
But because x itself is negative, we can also automatically eliminate choice D (square root can't result in negative).
Similarly, because we can't take the square root of a negative number, we can eliminate choice E.
We don't know x's value, so we can eliminate choice C.
The answer must be choice A!
Because x is negative, "-x" must be positive. The "-" sign doesn't mean we were taking the square root of a negative or that the square root operation yielded a negative result. The "-" doesn't denote the sign of "x". It just tells you to multiply x by -1.
If x<0, then square root of (x^2) is (-1)*x or -x.
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Can you please show, in detail ,how this works.Testluv wrote:If x<0, then square root of (x^2) is (-1)*x or -x.
i was working on following lines:
for x<0 ,sq rt(x^2)=>sqrt (-1*x*x)=>x*sqrt(-1)...am stuck here..
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- selango
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Sqrt(x^2)=x if x>0 or -x if x<0this_time_i_will wrote:Can you please show, in detail ,how this works.Testluv wrote:If x<0, then square root of (x^2) is (-1)*x or -x.
i was working on following lines:
for x<0 ,sq rt(x^2)=>sqrt (-1*x*x)=>x*sqrt(-1)...am stuck here..
if x<0,sqrt(x^2)=sqrt(-x*-x)=-x
Hope this clarify
- uwhusky
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Think of this way, what is sqrt of (x * x)?
This question is essentially asking the same thing, except that x is a negative number, so -x is a positive number.
Sqrt( -x|x| ) is essentially a positive x multiplies an absolute value of x, which is the same as x * x.
This question is essentially asking the same thing, except that x is a negative number, so -x is a positive number.
Sqrt( -x|x| ) is essentially a positive x multiplies an absolute value of x, which is the same as x * x.
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Hi!Testluv wrote:When we apply the square root function, the result must be positive. So, we can eliminate negative answers. Choice B is clearly negative.
But because x itself is negative, we can also automatically eliminate choice D (square root can't result in negative).
Similarly, because we can't take the square root of a negative number, we can eliminate choice E.
We don't know x's value, so we can eliminate choice C.
The answer must be choice A!
Because x is negative, "-x" must be positive. The "-" sign doesn't mean we were taking the square root of a negative or that the square root operation yielded a negative result. The "-" doesn't denote the sign of "x". It just tells you to multiply x by -1.
If x<0, then square root of (x^2) is (-1)*x or -x.
From your answer can we conclude :
sqrt(x2)= IxI (for all real x)
but i have a query here,
for all x<0 or x>0
x2 is always positive (i.e. x2>0)
so sqrt(x2) = x or -x (as a square of +ve or -ve number is always +ve, so sqrt (x2) in its result show both the number, as it )
x2
- uwhusky
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x square will always be a positive number is correct, but we're not squaring x in the question. Read the question carefully, it is Sqrt( -x|x| ), which is -x * |x|.
-x * |x| is not the same as (-x)^2 or x^2.
-x * |x| is not the same as (-x)^2 or x^2.
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|x| = sqrt(x^2) (this is how absolute value is defined)this_time_i_will wrote:Can you please show, in detail ,how this works.Testluv wrote:If x<0, then square root of (x^2) is (-1)*x or -x.
i was working on following lines:
for x<0 ,sq rt(x^2)=>sqrt (-1*x*x)=>x*sqrt(-1)...am stuck here..
Both the absolute value and the square root functions must be positive. Therefore:
If x>0, then both sqrt(x^2) and |x| are x;
and
if x<0, then both sqrt(x^2) and |x| are -x.
(if x<0, then because absolute value and square root operations must result in positive, |x| and sqrt(x^2) have to be -x; they can't yield x because x is negative)
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In this question, confusion may arise from wanting/having to diagram "-x" when x itself is negative. (We can't let "-x" be x since "-x" is positive and x is negative).
x is negative. But suppose there is a number, z. If z is positive and equal in absolute value to x, then z = -x or x = -z.
The question asks for sqrt(-x*|x|) or sqrt[(-1)*(x)*|x|]
Subbing "-z" into "x", the question becomes:
what is sqrt[(-1)*(-z)*|-z|]?
Because z is positive, clearly (-1)*(-z) is just z. Likewise |-z| is just z. Thus, we have:
sqrt(z*z)
which is just z
which is equal to -x.
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thank youTestluv wrote:|x| = sqrt(x^2) (this is how absolute value is defined)this_time_i_will wrote:Can you please show, in detail ,how this works.Testluv wrote:If x<0, then square root of (x^2) is (-1)*x or -x.
i was working on following lines:
for x<0 ,sq rt(x^2)=>sqrt (-1*x*x)=>x*sqrt(-1)...am stuck here..
Both the absolute value and the square root functions must be positive. Therefore:
If x>0, then both sqrt(x^2) and |x| are x;
and
if x<0, then both sqrt(x^2) and |x| are -x.
(if x<0, then because absolute value and square root operations must result in positive, |x| and sqrt(x^2) have to be -x; they can't yield x because x is negative)
________________
In this question, confusion may arise from wanting/having to diagram "-x" when x itself is negative. (We can't let "-x" be x since "-x" is positive and x is negative).
x is negative. But suppose there is a number, z. If z is positive and equal in absolute value to x, then z = -x or x = -z.
The question asks for sqrt(-x*|x|) or sqrt[(-1)*(x)*|x|]
Subbing "-z" into "x", the question becomes:
what is sqrt[(-1)*(-z)*|-z|]?
Because z is positive, clearly (-1)*(-z) is just z. Likewise |-z| is just z. Thus, we have:
sqrt(z*z)
which is just z
which is equal to -x.