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20 Sep 2019, 05:02
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B
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The median value of a set of 9 positive integers is 6. If the only mode in the set is 25 what is the least possible value of the average (arithmetic mean) of the set?
A. 8
B. 9
C. 10
D. 11
E. 12
A. 8
B. 9
C. 10
D. 11
E. 12
The median value of a set of 9 positive integers is 6. If the only mode in the distrubution is 25 what is the least possible mean of the distribution.
20 Sep 2019, 05:35
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Bunuel
Since we have to minimize the average, and the mode is 25. So, 25 occurs only two times. Rest all digits will be distinct and occur only once.
The median is given as 6 so the 5th digit is 6.
In order to minimise the average the set of numbers will be
{1,2,3,4,6,7,8,25,25}.
Also, as the question statement says positive, so we cannot consider 0.
The sum of these numbers is 81 and the average becomes 9.
Updated on: 17 May 2021, 07:35
Originally posted by BrentGMATPrepNow on 20 Sep 2019, 06:00.
Last edited by BrentGMATPrepNow on 17 May 2021, 07:35, edited 1 time in total.
Last edited by BrentGMATPrepNow on 17 May 2021, 07:35, edited 1 time in total.
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Bunuel
Let's add 9 slots to represent the 9 values in ASCENDING order: __, __, __, __, __, __, __, __, __
Since the median is 6, we get: __, __, __, __, 6 , __, __, __, __
If the mode is 25 and we're trying to MINIMIZE the average of the 9 numbers, we should add TWO 25's to the list
We get: __, __, __, __, 6 , __, __, 25 , 25
At this point, let's make the remaining values as small as possible, without repeating any values (since we need the mode to be 25)
We get: 1, 2, 3, 4, 6, 7, 8, 25, 25
Average \(= \frac{1+2+3+4+6+7+8+25+25}{9}=\frac{81}{9}=9\)
Answer: B
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