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01 Oct 2018, 04:55
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A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
45%
(medium)
Question Stats:
60% (01:34) correct
40%
(01:57)
wrong
based on 136
sessions
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If x, y and z are positive integers, is xz even?
(1) (2xy − x) is even
(2) (x^2 + xz) is even
(1) (2xy − x) is even
(2) (x^2 + xz) is even
01 Oct 2018, 05:06
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Bunuel
Given: If x, y and z are positive integers
Question: is xz even?
Statement 1: (2xy − x) is even
i.e. \(x(2y-1) = Even\)
But (2y-1) = Even - 1 = Odd therefore,
x = Even
i.e. xz = even
SUFFICIENT
Statement 2: \((x^2 + xz)\) is even
\((x^2 + xz) = x(x+z) = even\)
Case 1: x = even and z is odd i.e. xz = even
Case 2: x = even and z is Even
Case 3: x = Odd and z is Odd i.e. xz = Odd
NOT SUFFICIENT
Answer: Option A
01 Oct 2018, 06:50
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Bunuel
Some important rules:
#1. ODD +/- ODD = EVEN
#2. ODD +/- EVEN = ODD
#3. EVEN +/- EVEN = EVEN
#4. (ODD)(ODD) = ODD
#5. (ODD)(EVEN) = EVEN
#6. (EVEN)(EVEN) = EVEN
Target question: Is xz even?
Given: x, y and z are positive integers
Statement 1: (2xy − x) is even
Notice that 2xy will be EVEN for all values of x and y.
So, statement 1 is really telling us that EVEN - x = EVEN, which we can rewrite as: EVEN + EVEN = x
By rule #3, we can conclude that x is EVEN
If x is EVEN, them we can be certain (from rules #5 and #6) that xz is EVEN
So, the answer to the target question is YES, xz is even
Since we can answer the target question with certainty, statement 1 is SUFFICIENT
Statement 2: (x² + xz) is even
There are several values of x and z that satisfy statement 2. Here are two:
Case a: x = 2 and z = 1. Notice that x² + xz = 2² + (2)(1) = 6, which is even. In this case, xz = (2)(1) = 2. So, the answer to the target question is YES, xz IS even
Case b: x = 1 and z = 1. Notice that x² + xz = 1² + (1)(1) = 2, which is even. In this case, xz = (1)(1) = 1. So, the answer to the target question is NO, xz is NOT even
Since we cannot answer the target question with certainty, statement 2 is NOT SUFFICIENT
Answer: A
Cheers,
Brent
