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Re: x^y where x>1 [#permalink]
Carcass wrote:
Given that \(x^{\sqrt{y}}=\sqrt[y]{x }\), where \(x>1\)

\(x^{\sqrt{y}}=\sqrt[y]{x }\)

=> \(x^{\sqrt{y}}= x^{\frac{1}{y}}\)

Since the base of the two exponents is same (x) => power will also be the same
=> \(\sqrt{y}\) = \(\frac{1}{y}\)
=> \(y*\sqrt{y}\) = 1
=> \(y ^ {1 + \frac{1}{2}}\) = 1
=> \(y ^ {\frac{3}{2}}\) = 1
=> y = \(1^{\frac{2}{3}}\) = 1

Clearly, Quantity A = Quantity B = 1


So, Answer will be C


The solution is also located here https://gre.myprepclub.com/forum/gre-mi ... ml#p105811





Hi Sir,

I m sorry but I believe the QA is x^y and not x^root y. Let me know, if i m interpreting it incorrectly.
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x^y where x>1 [#permalink]
Expert Reply
Prakshi wrote:
Carcass wrote:
Given that \(x^{\sqrt{y}}=\sqrt[y]{x }\), where \(x>1\)

\(x^{\sqrt{y}}=\sqrt[y]{x }\)

=> \(x^{\sqrt{y}}= x^{\frac{1}{y}}\)

Since the base of the two exponents is same (x) => power will also be the same
=> \(\sqrt{y}\) = \(\frac{1}{y}\)
=> \(y*\sqrt{y}\) = 1
=> \(y ^ {1 + \frac{1}{2}}\) = 1
=> \(y ^ {\frac{3}{2}}\) = 1
=> y = \(1^{\frac{2}{3}}\) = 1

Clearly, Quantity A = Quantity B = 1


So, Answer will be C


The solution is also located here https://gre.myprepclub.com/forum/gre-mi ... ml#p105811





Hi Sir,

I m sorry but I believe the QA is x^y and not x^root y. Let me know, if i m interpreting it incorrectly.


Fixed the stem. I believe some sort of problem with the Latex code or my browser.

Now see above both the stem and the explanation are correct.

My bad
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Re: x^y where x>1 [#permalink]
1
i think we can solve this by simply squaring both sides and eliminating the power of y.
So, essentially we will be left with X^1 = x^y
SO, Y = 1
Hence, C
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Re: x^y where x>1 [#permalink]
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