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21 Aug 2019, 03:16
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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:
73% (01:21) correct
27%
(01:29)
wrong
based on 141
sessions
History
Date
Time
Result
Not Attempted Yet
If k, n, and m are positive integers, is kn even?
(1) k = m^3
(2) n = (m - 1)^3
(1) k = m^3
(2) n = (m - 1)^3
21 Aug 2019, 03:38
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If k, n, and m are positive integers, is kn even?
Statement1: k = \(m^{3}\)
if m is odd, then \(m^{3}\) will be odd, --> k is odd
if m is even, then \(m^{3}\) will be even--> k is even.
Also, No info about what n is.
Insufficient
Statement2: n = \((m - 1)^{3}\)
If m is odd, then \((m-1)^{3}\) will be even --> n is even
if m is even, then \((m-1)^{3}\) will be odd--> n is odd.
Also, NO info about what k is.
Insufficient
Taken together 1 and 2,
In order kn to be even, one of k or n should be even.
If m is even, then (m-1) will be odd--> k=\(m^{3}\)-even, n=\((m-1)^{3}\)-odd
--> Even*Odd=Even
If m is odd, then (m-1) will be even--> k=\(m^{3}\)-odd, n=\((m-1)^{3}\)-even
--> Odd*Even=Even
in both cases, kn is EVEN
sufficient
The answer is C.
Statement1: k = \(m^{3}\)
if m is odd, then \(m^{3}\) will be odd, --> k is odd
if m is even, then \(m^{3}\) will be even--> k is even.
Also, No info about what n is.
Insufficient
Statement2: n = \((m - 1)^{3}\)
If m is odd, then \((m-1)^{3}\) will be even --> n is even
if m is even, then \((m-1)^{3}\) will be odd--> n is odd.
Also, NO info about what k is.
Insufficient
Taken together 1 and 2,
In order kn to be even, one of k or n should be even.
If m is even, then (m-1) will be odd--> k=\(m^{3}\)-even, n=\((m-1)^{3}\)-odd
--> Even*Odd=Even
If m is odd, then (m-1) will be even--> k=\(m^{3}\)-odd, n=\((m-1)^{3}\)-even
--> Odd*Even=Even
in both cases, kn is EVEN
sufficient
The answer is C.
Archit3110
Major Poster
21 Aug 2019, 05:44
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Bunuel
#1
n not know insufficient
#2
k not know insufficient
from 1 &2
k*n ; m may be odd or even but k*n will always be even sufficient
IMO C
