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09 Feb 2015, 06:40
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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:
45%
(medium)
Question Stats:
65% (02:03) correct
35%
(01:58)
wrong
based on 319
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If N different positive integers are added and the sum is denoted as S, and if S=NX, is X an integer?
(1) N is odd.
(2) All N numbers are consecutive integers.
Kudos for a correct solution.
(1) N is odd.
(2) All N numbers are consecutive integers.
Kudos for a correct solution.
09 Feb 2015, 07:35
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Bunuel
statement 1: pick 1, 2, 3. Sum=6=3x and x is an integer. pick a set of odd prime numbers excluding 3 such as 7, 17, 19 or 13, 17, 5 sum is 35=3x and x is not an integer.
statement 2: pick 1, 2, 3, 4 sum=10=4x and x is not an integer. pick 11, 12, 13 sum=avg(n)=36=3x and x is an integer.
1+2) the average of an odd number of consecutive integer is equal to its median. In an evenly spaced set with odd number of elements the sum will always be a multiple of the average, which is always going to be an integer because the number of elements in the set is odd. So x is our average/median and it is always going to be integer.
Answer C.
16 Feb 2015, 05:27
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Bunuel
VERITAS PREP OFFICIAL SOLUTION
Statement (1): N is Odd. If the numbers are 1,2 and 3 then 6=3 * 2 here X is an integer. and if we take 2, 3, 5, then 10=3 * (10/3) here X is a fraction. Insufficient.
Statement (2): All the N numbers are consecutive integers.
If N is even, and if we take 1 and 2, then S=3 = 2 * 1.5 so X is a fraction. if N is odd, and if we take 1,2 and 3, then S = 6 = 3 * 2, so X is a integer.
Insufficient.
If we combine both the statements, then N is odd and all the numbers are consecutive integers, in that case X has to be positive integer. Hence Option C.
