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23 Apr 2012, 05:43
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A
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If x and s are both positive integers, is the product of x and s even?
(1) (x+3) is a prime number
(2) (s+1) is a prime number
(1) (x+3) is a prime number
(2) (s+1) is a prime number
I thought the answer could be D, but instead it was another choice, please could one person kindly explain this question
23 Apr 2012, 05:51
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If x and s are both positive integers, is the product of x and s even?
In order \(xs\) to be even at least on of them must be even.
(1) (x+3) is a prime number --> since \(x\) is a positive integer then \(x+3\geq{4}\), so \(x+3=odd \ prime\) --> \(x=even\). Sufficient.
(2) (s+1) is a prime number --> \(s\) can be 1 (1+1=2=prime) and in this case depending \(x\) the product of \(x\) and \(s\), can be even as well as odd. Not sufficient.
Answer: A.
In order \(xs\) to be even at least on of them must be even.
(1) (x+3) is a prime number --> since \(x\) is a positive integer then \(x+3\geq{4}\), so \(x+3=odd \ prime\) --> \(x=even\). Sufficient.
(2) (s+1) is a prime number --> \(s\) can be 1 (1+1=2=prime) and in this case depending \(x\) the product of \(x\) and \(s\), can be even as well as odd. Not sufficient.
Answer: A.
JubtaGubar
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23 Apr 2012, 06:01
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dzodzo85
The product could be even if:
x - even, s - even
x - even, s - odd
x - odd, s - even.
As a result, we should know what are the numbers are.
A) (x+3) is a prime number - all prime numbers are odd, so (odd-3) = even. (x+3) cannot equal 2 because then x <0. so x is even. SUFFICIENT
B) (s+1) is a prime number -if s =1, then x*s could be odd or even depending on x. NOT SUFFICIENT.
Answer is A
