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22 Mar 2017, 01:13
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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:
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Question Stats:
65% (02:57) correct
35%
(02:46)
wrong
based on 812
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If \(a + 1 = \frac{20}{a}\) and b is the average of a set of c consecutive integers, where c is odd, which of the following must be true?
I. \((a^2)(b^2)(c^2)\) is even.
II. \(a + b + c\) is odd.
III. \(ab(c^2 + c)\) is even.
A. I only
B. II only
C. III only
D. I and III only
E. I, II, and III
I. \((a^2)(b^2)(c^2)\) is even.
II. \(a + b + c\) is odd.
III. \(ab(c^2 + c)\) is even.
A. I only
B. II only
C. III only
D. I and III only
E. I, II, and III
22 Mar 2017, 02:05
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ziyuen
\(a + 1 = \frac{20}{a}\)
\(a^2 + a - 20 = 0\)
a = -5 or 4
a could be even or odd.
c is odd.
b is the average of c consecutive integers. Say 3 consecutive integers (1, 2, 3, then b = 2). Say 5 consecutive integers (1, 2, 3, 4, 5, then b = 3)
b could be even or odd.
I. \((a^2)(b^2)(c^2)\) is even.
a, b and c all could be odd in which case this will be odd. So not necessarily true.
II. a + b + c is odd.
If a is 4 and b and c are odd, this will be even. So not necessarily true.
III. \(ab(c^2 + c)\) is even.
Since c is odd, \(c^2\) is also odd.
Odd + Odd = Even
Since \((c^2 + c)\) is even, and any integer multiplied by an even number gives an even result, \(ab(c^2 + c)\) is certainly even.
Answer (C)
22 Mar 2017, 02:17
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ziyuen
Hi
\(a + 1 =\frac{20}{a}\)
\(a^2 + a - 20 = 0\)
\((a + 5)(a - 4) = 0\)
\(a= -5\) or \(a=4\)
\(b\) is the meadian of set S, which consists of \(c\) consecutive integers, where \(c\) is odd: S = {1,2,3} --> \(b=2\) or S={1,2,3,4,5} ----> \(b = 3\)
We have: \(c = odd\), \(a = even/odd\) and \(b = even/odd\).
I. \((a^2)(b^2)(c^2)\) is even. We can have \(odd^2*odd^2*odd^2 = odd\) No.
II. \(a + b + c\) is odd. We can have \(even + odd + odd = even\). No.
III. \(ab(c^2 + c)\) is even.
\(a*b*c*(c + 1) = even\). \(c\) is odd hence \(c + 1\) will always be even. Yes.
Answer C.
