If the mean and the variance of the data

are and respectively, then the value of is
- A
- B
- C
- D
If the mean and the variance of the data

are and respectively, then the value of is
Correct answer:C
Standard Method
Given: The class mid-points are with frequencies . The variance is .
Find: .
Using step-deviation, take assumed mean and class width . Define
So the values are .
The total frequency is
Now
Also,
Using variance under scale change,
Hence,
So,
That gives
Solving,
Since frequency must be positive,
Now,
Therefore,
So,
Therefore, the correct option is C.
Variance using step-deviation
Given: A grouped frequency distribution with unknown frequency and mean .
Find: .
The key idea is that variance is unaffected by change of origin but changes by the square of the scale factor. With
we use
The frequency table in terms of becomes:
Now compute the required sums:
Also,
So,
Since ,
Substituting,
After simplification,
This gives
Now the mean is recovered from
Hence,
Thus, the correct option is C.
Using class limits directly in place of class mid-points is incorrect because the mean and variance of grouped data are computed from the mid-points. First take the mid-points .
Applying the variance formula without accounting for scale is wrong. If , then , not just .
Rejecting the condition on frequency leads to an invalid value of . After solving the quadratic, keep only the positive value because frequency cannot be negative.
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