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26 Nov 2010, 19:55
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
75%
(hard)
Question Stats:
52% (02:20) correct
48%
(02:31)
wrong
based on 246
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If x is an integer, what is the sum of all distinct positive factors of \(\sqrt{x}\)?
(1) x has exactly 3 distinct positive factors
(2) \(x^2 -1 =3k\) where k is an odd integer
Please explain. I could solve this but it took me more than 3 mins.
Thanks
NAD
(1) x has exactly 3 distinct positive factors
(2) \(x^2 -1 =3k\) where k is an odd integer
Please explain. I could solve this but it took me more than 3 mins.
Thanks
NAD
27 Nov 2010, 12:16
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nades09
You got most of it. If you go through factors theory, it will help you understand that only a square of a prime number can have 3 factors. e.g. 4 or 25 or 49 or 121 or 169..
1 , 2, 4 are factors of 4
1, 5, 25 are factors of 25
1, 7, 49 are factors of 49
1, 11, 121 are factors of 121 etc
So if \(x\) has 3 factors, \(\sqrt{x}\) must be prime.
Also from statement 2, \(x^2 = 3k + 1\) where k is odd. So 3k is odd and 3k + 1 is even. So \(x^2\) is even. Now, if \(x^2\) is even, x has to be even too (It is not possible that a power of an odd number becomes even. If x is odd, \(x^2, x^3\) etc all will be odd. If x is even, \(x^2, x^3\)etc all will be even.). Then \(\sqrt{x}\) must also be even.
The only number that is even and prime is 2. So \(\sqrt{x}\) must be 2.
General Discussion
26 Nov 2010, 21:08
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nades09
You can quickly solve it using logic. I will give you a teaser and see if you can arrive at the answer on your own.
Statement 1 tells you \(\sqrt{x}\) is prime.
Statement 2 tells you \(x^2\) is even.
