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Question
Calculate mean deviation about median age for the age distribution of 100 persons given below:
| Age: | 16-20 | 21-25 | 26-30 | 31-35 | 36-40 | 41-45 | 46-50 | 51-55 |
| Number of persons | 5 | 6 | 12 | 14 | 26 | 12 | 16 | 9 |
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Solution
Since the function is not continuous, we subtract 0.5 from the lower limit of the class and add 0.5 to the upper limit of the class so that the class interval remains same, while the function becomes continuous.
Thus, the mean distribution table will be as follows:
| Age | Number of Persons \[f_i\]
|
Midpoint \[x_i\]
|
Cumulative Frequency | \[\left| d_i \right| = \left| x_i - 38 \right|\] |
<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>f</mi><mi>i</mi></msub><msub><mi>d</mi><mi>i</mi></msub></math>
LaTeX
\[f_i d_i\]
|
| 15.5−20.5 | 5 | 18 | 5 | 20 | 100 |
| 20.5−25.5 | 6 | 23 | 11 | 15 | 90 |
| 25.5−30.5 | 12 | 28 | 23 | 10 | 120 |
| 30.5−35.5 | 14 | 33 | 37 | 5 | 70 |
| 35.5−40.5 | 26 | 38 | 63 | 0 | 0 |
| 40.5−45.5 | 12 | 43 | 75 | 5 | 60 |
| 45.5−50.5 | 16 | 48 | 91 | 10 | 160 |
| 50.5−55.5 | 9 | 53 | 100 | 15 | 135 |
|
\[N = \sum^8_{i = 1} f_i = 100\]
|
\[\sum^8_{i = 1} f_i d_i = 735\] |
\[N = 100 \]
\[ \Rightarrow \frac{N}{2} = 50\]
Thus, the cumulative frequency slightly greater than 50 is 63 and falls in the median class 35.5−40.5.
\[\text{ Median } = l +{\frac{\frac{N}{2} - F}{f}} \times h \]
\[ = 35 . 5 + {\frac{\left( 50 - 37 \right)}{26}} \times 5\]
\[ = 35 . 5 + 2 . 5 \]
\[ = 38 \]
\[\text{ Mean deviation about the median age } = {\frac{\sum^8_{i = 1} f_i \left| d_i \right|}{N}}\]
\[ =^{\frac{735}{100}}\]
\[ = 7 . 35\]
Thus, the mean deviation from the median age is 7.35 years.
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