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Re: x=4√(x3+6x2) [#permalink]
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Sawant91 wrote:
\(x=4\)\(\sqrt{(x^3+6x^2)}\)

Quantity A
Quantity B
The sum of all possible roots of x
1



Quantity A is greater
Quantity B is greater
The two quantities are equal
The relationship cannot be determined from the information given


the answer depends on what 4 means is it 4th root, or 4* something
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Re: x=4√(x3+6x2) [#permalink]
If we consider that the expression given is the 4th root , then the answer should be C . Can someone please explain how is the answer A ?
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Re: x=4√(x3+6x2) [#permalink]
kunalkmr62 wrote:
If we consider that the expression given is the 4th root , then the answer should be C . Can someone please explain how is the answer A ?


Agree, For the 4th root, x can be solved for 3&-2, hence sum of the roots is 1, so C should be the option.
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Re: x=4√(x3+6x2) [#permalink]
It is said sum of all possible root:
I am getting possible values 1,3
As 3 is greater than 1 hence answer is A
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Re: x=4√(x3+6x2) [#permalink]
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Expert Reply
Sawant91 wrote:
\(x=4\)\(\sqrt{(x^3+6x^2)}\)

Quantity A
Quantity B
The sum of all possible roots of x
1



Quantity A is greater
Quantity B is greater
The two quantities are equal
The relationship cannot be determined from the information given



The question could mean two things..
(I) If it is what it is given- \(x=4\)\(\sqrt{(x^3+6x^2)}\)
Square both sides - \(x^2=16(x^3+6x^2).......16x^3-95x^2=0....x^2(16x-95)=0\).. Sum of roots = \(0+\frac{95}{16}\) so A>B
(II) If there is a typo and it meant $th root and not 4*..
so take the 4th power - \(x^4=x^3+6x^2......x^4-x^3-6x^2=0.....x^2(x-3)(x+2)=0\) Hence, the sum is 0+3-2=1
here A=B..
so C
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Re: x=4√(x3+6x2) [#permalink]
''x2=16(x3+6x2).......16x3−95x2=0....x2(16x−95)=0''
how is the above possible , i.e. ( -95x)?
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Re: x=4√(x3+6x2) [#permalink]
Expert Reply
JelalHossain wrote:
''x2=16(x3+6x2).......16x3−95x2=0....x2(16x−95)=0''
how is the above possible , i.e. ( -95x)?


\(\(x^2=16(x^3+6x^2).......16x^3-95x^2=0....x^2(16x-95)=0\)\)

Take out x^2 from \(16x^3-95x^2=0......x^2*16x-x^2*95=x^2(16x-95)=0\)
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Re: x=4√(x3+6x2) [#permalink]
1
If presented with clear algebraic information in a Quantitative Comparison, initially look to solve algebraically.

First, raise the given equation to the 4th power to eliminate the radical resulting in x4=x3+6x2.
Next, subtract x3+6x2 from each side to set the quadratic equal to 0 in order to solve.
Then, factor x2 out of each term resulting in x2(x2−x−6) = 0.
Next, factor the interior quadratic x2−x−6 resulting in the equation x2(x−3)(x+2)=0.
Thus, it would appear that the roots are x = 0, x = 3 , and x= -2.

However, be careful to not conclude that the quantities are equal because 0 + 3 + -2 = 1.
Remember that the result of an even radical applied to a negative value is an imaginary number and thus invalid on the GRE.
So, x cannot be negative, because if it were, the result would be (4

(−23+6(−2)2)
=−2 which would not be an acceptable result of real arithmetic.

Subsequently, there are only two valid solutions : x = 0 and x = 3, and the sum of those valid roots will be 3 + 0 = 3, and 3 > 1.

So answer is A
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Re: x=4√(x3+6x2) [#permalink]
How to solve this sum?
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x=4(x3+6x2) [#permalink]
I still did not get this part

4√(−23+6(−2)2) =-2 ,

(-2)^3=-8 and 6(-2)^2=24 and 24 -8=16 . 4th root of 16 can +2 or -2. Where do we get imaginary number here.
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Re: x=4(x3+6x2) [#permalink]
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Hey,

In the stem, something is missing hence we are not getting a clear answer. Also, this will never happen in the original exam so leave this one.
shardul171 wrote:
I still did not get this part

4√(−23+6(−2)2) =-2 ,

(-2)^3=-8 and 6(-2)^2=24 and 24 -8=16 . 4th root of 16 can +2 or -2. Where do we get imaginary number here.
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Re: x=4(x3+6x2) [#permalink]
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Re: x=4(x3+6x2) [#permalink]
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