Mean Deviation About Mean and Median – Formula and Examples

Here you will learn what is the mean deviation formula with examples.

Let’s begin – 

Mean Deviation Formula

(i) For Ungrouped distribution :

Definition : If \(x_1\), \(x_2\), ….. , \(x_n\) are n values of a variable X, then the mean deviation from an average A (median or arithmetic mean) is given by

Mean Deviation (M.D)  = \({\sum_{i=1}^{n}{|x_i – A|}}\over n\)

M.D = \({\sum{d_i}}\over n\),  where \(d_i\) = \(x_i\) – A

Example : Calculate the mean deviation about median from the following data : 340, 150, 210, 240, 300, 310, 320

Solution : Arranging the observations in ascending order of magnitude, we have 150, 210, 240, 300, 310, 320, 340.

Clearly, the middle observation is 300. So, median is 300.

\(x_i\)	\(|d_i|\) = \(|x_i – 300|\)
340	40
150	150
210	90
240	60
300	0
310	10
320	20
Total	\(d_i\) = 370

\(\therefore\) Mean Deviation (M.D.) = \({\sum{d_i}}\over n\) = \(370\over 7\) = 52.8

Also Read : What is the Formula for Mean Median and Mode

(ii) For discrete frequency distribution :

Definition : If \(x_i\)/\(f_i\); i = 1, 2, …. , n is the frequency distribution, then the mean deviation from an average A (median or arithmetic mean) is given by

Mean Deviation (M.D)  = \({\sum_{i=1}^{n}{f_i|x_i – A|}}\over N\)

where \({\sum_{i=1}^{n}{f_i}}\) = N

Example : Calculate the mean deviation about mean from the following data :

\(x_i\)	3	9	17	23	27
\(f_i\)	8	10	12	9	5

Solution : Calculation of mean deviation about mean.

\(x_i\)	\(f_i\)	\(f_i x_i\)	\(|x_i – 15|\)	\(f_i|x_i – 15|\)
3	8	24	12	96
9	10	90	6	60
17	12	204	2	24
23	9	207	8	72
27	5	135	12	60
	N = \(\sum{f_i}\) = 44	\(\sum{f_ix_i}\) = 660		\(\sum{f_i|x_i – 15|}\) = 312

Mean = \(\sum{f_ix_i}\over N\) = \(660\over 44\) = 15

Mean Deviation = M.D. = \({\sum_{i=1}^{n}{f_i|x_i – 15|}}\over N\) = \(312\over 44\) = 7.09