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12 Aug 2010, 23:11
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
25%
(medium)
Question Stats:
72% (01:09) correct
28%
(01:04)
wrong
based on 326
sessions
History
Date
Time
Result
Not Attempted Yet
If \(x\) and \(y\) are integers is \(xy\) a prime number?
(1) \(x^2 = 1\)
(2) \(y\) is a prime number and \(x\) is a positive number but not a prime number.
M01-30
(1) \(x^2 = 1\)
(2) \(y\) is a prime number and \(x\) is a positive number but not a prime number.
M01-30
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14 Aug 2010, 08:28
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I don't understand.
1. x = 1 or -1, I get the insuf part
2. y=prime, x=not prime, right here xy we know is NOT prime.
Why cannot I stop at B? I don't need the A part anymore.
If I look at C, then ok x=1, xy=y, y is prime, ok xy is prime. But my question is why do I have to go to C.. Is it not that if I can answer with less information, I go with that option?
I also hear that the options cannot contradict each other, which means that x=1 and hence I am forced to use that information to go with C? Bunuel please enlighten...
1. x = 1 or -1, I get the insuf part
2. y=prime, x=not prime, right here xy we know is NOT prime.
Why cannot I stop at B? I don't need the A part anymore.
If I look at C, then ok x=1, xy=y, y is prime, ok xy is prime. But my question is why do I have to go to C.. Is it not that if I can answer with less information, I go with that option?
I also hear that the options cannot contradict each other, which means that x=1 and hence I am forced to use that information to go with C? Bunuel please enlighten...
14 Aug 2010, 10:03
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Excellent Bunuel. it is the x=1 case that does the complication. Thanks for all your time and help!
