Sheppard’s Correction for Moments | ML

Last Updated : 23 Jan, 2020

Prerequisite: Raw and Central Moments We assume in grouped data that the frequencies are concentrated in the middle part of the class interval. This assumption does not hold true in general and grouping error is introduced. Such an effect can be corrected in calculating the moments by using the information on the width of the class interval. Sheppard’s Correction for grouping error is nothing but the adjustment to calculated sample moments for the grouped data or continuous data. Prof. W.F. Sheppard proved that if the frequency distribution is continuous and the frequency tapers off to zero in both directions, the grouping error can be corrected as follows: Let ‘c’ be the width of the class interval. Then, Raw Moments $\mu {}'_1_(_c_o_r_r) = \mu {}'_1$ $\mu {}'_2_(_c_o_r_r) = \mu {}'_2 - c^{2}/12$ $\mu {}'_3_(_c_o_r_r) = \mu {}'_3 - \mu {}'_1 * c^{2}/4$ $\mu {}'_4_(_c_o_r_r) = \mu {}'_4 - \mu {}'_2 * c^{2}/2 + c^{4} * 7/240$ Central Moments $\mu {}_2_(_c_o_r_r) = \mu {}_2 - c^{2}/12$ $\mu {}_3_(_c_o_r_r) = \mu {}_3$ $\mu {}_4_(_c_o_r_r) = \mu {}_4 - \mu {}_2 * c^{2}/2 + c^{4} * 7/240$ What Kind of data can be corrected?

This method of correction to moments is only possible for the continuous variables i.e. the continuous data.
The width of the class interval should be equal.
Frequencies should be symmetrical. Frequency should taper off to zero in both directions.

Consider the given distribution of marks.

Marks	Number of Students
0 – 10	1
10 – 20	6
20 – 30	11
30 – 40	17
40 – 50	21
50 – 60	16
60 – 70	13
70 – 80	7
80 – 90	5
90 – 100	2

For the distribution of marks above, the value for moments are given below: Raw Moments – $\mu {}'_r = \frac{1}{n}\sum_{i=1}^{n}f_i x_i^{r}$ , is the rth raw moment, where $f_i$ is the frequency count and $x_i$ is the mid value of class. So, using the above formula for the Raw Moment we get following values for moments. $\mu {}'_1 = 48.23$ $\mu {}'_2 = 2711.87$ $\mu {}'_3 = 169751.26$ $\mu {}'_4 = 11515978.53$ Sheppard’s correction for Raw Moments – $\mu {}'_1_(_c_o_r_r_) = \mu {}'_1 = 48.23$ $\mu {}'_2_(_c_o_r_r_) = 2703.53$ $\mu {}'_3_(_c_o_r_r_) = 168545.51$ $\mu {}'_4_(_c_o_r_r_) = 11380676.70$ Similarly central moments can be corrected using Sheppard’s Correction.

Suggest improvement

Pearson Product Moment Correlation

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