If S is a finite set of consecutive even numbers, is the median of S an odd number?
(1) The mean of set S is an even number.
(2) The range of set S is divisible by 4.
OA D
Source: Manhattan Prep
If S is a finite set of consecutive even numbers, is the median of S an odd number?
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We need to recall the following for this problem:BTGmoderatorDC wrote: ↑Sat Jun 25, 2022 6:41 pmIf S is a finite set of consecutive even numbers, is the median of S an odd number?
(1) The mean of set S is an even number.
(2) The range of set S is divisible by 4.
OA D
Source: Manhattan Prep
- "If the number of terms in a set of consecutive even integers is even, then the median is odd"
- "If the number of terms in a set of consecutive even integers is odd, then the median is even"
We can try this with the following sets:
\(2, 4, 6, 8\) (Median \(= 5\))
\(2, 4, 6, 8, 10\) (Median \(= 6\))
As we know, mean and median are equal in evenly spaced sets.
Statement 1: Sufficient \(\Large{\color{green}\checkmark}\)
If the mean is even, then the median is even.
Statement 2: Sufficient \(\Large{\color{green}\checkmark}\)
You can try different scenarios and you'll always yield the right answer. However, I wouldn't know how to explain the algebraic approach.
Therefore, D
Hope this helps.