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10 Mar 2011, 13:18
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
55%
(hard)
Question Stats:
61% (02:19) correct
39%
(02:09)
wrong
based on 590
sessions
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If p, q, and r are integers, is pq + r even?
(1) p + r is even.
(2) q + r is odd.
(1) p + r is even.
(2) q + r is odd.
10 Mar 2011, 13:52
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GMATD11
We want to know if pq+r is even
Statement 1) says p+r is even implying that p and r are either both odd or both even. When they are both even, then irrespective of q being even or odd, pq+r will be even. When they are both odd, depending on q, pq+r can be odd or even. So, insufficient
Statement 2) says q+r is odd, implying at least one of q or r is odd and the other one is even. When r is odd and q is even, pq+r is odd. When q is odd and r is even, pq+r is even or odd depending on value of p, so insufficient.
Combining the two, when p and r are even and hence q is odd, pq+r is even
when p and r are odd and hence q is even, pq+r is odd, so again insufficient
Answer E
10 Mar 2011, 20:15
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1) Insufficient
p + r = even
p = even r = even. The answer is YES
p = odd r = odd q = even. The answer is NO
2) Insufficient
q + r = odd
q = odd r = even p = even. The answer is YES
q = odd r = even p = odd. The answer is NO
combine 1) and 2) Insufficient
p + r = even
q + r = odd
let r = even, p = even, q=odd. The answer is YES
let r = odd, p = odd, q= even. The answer is NO
Hence E.
p + r = even
p = even r = even. The answer is YES
p = odd r = odd q = even. The answer is NO
2) Insufficient
q + r = odd
q = odd r = even p = even. The answer is YES
q = odd r = even p = odd. The answer is NO
combine 1) and 2) Insufficient
p + r = even
q + r = odd
let r = even, p = even, q=odd. The answer is YES
let r = odd, p = odd, q= even. The answer is NO
Hence E.
GMATD11
