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25 Jan 2023, 02:30
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B
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Difficulty:
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Question Stats:
51% (02:18) correct
49%
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wrong
based on 81
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If x is the sum of n consecutive positive integers, and n>2, is n divisible by 4?
(1) The smallest number among the consecutive integers is even.
(2) x is odd.
Quite a challenging one.
(1) The smallest number among the consecutive integers is even.
(2) x is odd.
Quite a challenging one.
26 Jan 2023, 13:07
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(i) n=4 -> 2,3,4,5 = 14 n is divisible by 4 when the smallest is even.
n=3 -> 2,3,4=9 n is not divisible by 4 when the smallest is even
NOT SUFFICIENT
(II) x is odd
in order to x to be odd, we need an odd N, and that always the set of numbers start with 1, and when that happen, n is always odd, hence, not a multiple of 4.
IMO B
n=3 -> 2,3,4=9 n is not divisible by 4 when the smallest is even
NOT SUFFICIENT
(II) x is odd
in order to x to be odd, we need an odd N, and that always the set of numbers start with 1, and when that happen, n is always odd, hence, not a multiple of 4.
IMO B
28 Jan 2023, 13:14
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Bunuel
We can represent the series as
\(a \quad a+1 \quad a+2 \quad a+3 \quad - - - - - \quad a+(n-1)\)
Sum = \(na + (1 + 2 + 3 + - - - + (n-1))\)
Sum = \(na + \frac{n(n-1)}{2}\)
x = \(n(\frac{ 2a + (n-1)}{2})\)
Let's start with Statement 2
Statement 2
(2) x is odd.
If x is odd, n is odd.
Is n divisible by 4 -- No !
The statement is sufficient and we can eliminate A, C, and E.
Statement 1
(1) The smallest number among the consecutive integers is even.
a = even
However, the statement doesn't tell us anything about the nature of n.
Hence the statement is not sufficient.
Option B
