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E
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Difficulty:
65%
(hard)
Question Stats:
52% (01:42) correct
48%
(01:33)
wrong
based on 691
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If z is a positive integer is \(\sqrt{z}\) an integer?
(1) \(\sqrt{xz}\) is an integer
(2) x = z^3
(1) \(\sqrt{xz}\) is an integer
(2) x = z^3
22 Sep 2010, 00:23
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rxs0005
If z is a positive integer is \(\sqrt{z}\) an integer?
(1) \(\sqrt{xz}=integer\), no info about \(x\), not sufficient.
(2) \(x=z^3\) --> \(z^3\) equals to some number \(x\), clearly insufficient.
(1)+(2) \(\sqrt{xz}=\sqrt{z^4}=z^2=integer\) --> well, from the stem we know that \(z\) is an integer, so no wonder that \(z^2\) is also an integer, which means that we have no more info than at the beginning. Not sufficient.
Answer: E.
Hope it helps.
General Discussion
21 Sep 2010, 17:35
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rxs0005
Z = int so is sqrt(z) = z^1/2 = int? for example, if z = 4 then 4^.5 = 2 and z =3 then 3^.5 != int
1. for this to be integer X has to be Z or their product is squarable - INSUFF
2. X =Z^3 - INSUFF by itself.
C. if we know both it can be Z^3 * Z =Z^4 Z^4 * .5 = Z^2. NOTE this is still insuff as we dont know Z - it could be anything...
E?????
