If the mean deviation about the median of the numbers is , then is equal to
- A
- B
- C
- D
If the mean deviation about the median of the numbers is , then is equal to
Correct answer:B
Standard Method
Given: The numbers are and the mean deviation about the median is .
Find: .
The given data forms an arithmetic progression with first term and last term .
Step 1: Find the median.
Since there are terms, the median is the average of the and terms:
Step 2: Mean deviation about the median.
For an arithmetic progression symmetric about the median,
This simplifies to
Step 3: Use given condition.
Given mean deviation is ,
Thus,
Therefore, the correct option is B and the value of is .
Using symmetry of the arithmetic progression
Given: The sequence is an arithmetic progression from to .
Find: The value of when the mean deviation about the median is .
The middle of an even-numbered arithmetic progression lies halfway between the two central terms, so the median is
Because the terms are equally spaced, the absolute deviations from the median are symmetric on both sides. Using the extracted working,
Now apply the given condition:
Hence,
Therefore, the required value is .
Taking the median as the term alone. This is wrong because there are an even number of observations, so the median is the average of the two middle terms. Use the average of the and terms instead.
Confusing mean deviation about the median with deviation about the mean. This is wrong because the question explicitly asks for mean deviation about the median. First find the median, then compute the average of absolute deviations from that value.
Stopping at the value of and forgetting that the question asks for . This is wrong because the final required quantity is not . After finding , square it to obtain the answer.
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