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Question
Find the coefficient of variation for the following data:
| Size (in cms): | 10-15 | 15-20 | 20-25 | 25-30 | 30-35 | 35-40 |
| No. of items: | 2 | 8 | 20 | 35 | 20 | 15 |
Solution
| Size (cm) |
\[f_i\]
|
Midpoint
\[\left( x_i \right)\]
|
\[u_i = \frac{x_i - 27 . 5}{5}\]
|
\[f_i u_i\]
|
\[f_i {u_i}^2\]
|
| 10−15 | 2 | 12.5 |
- 3
|
- 6
|
18 |
| 15−20 | 8 | 17.5 |
- 2
|
- 16
|
32 |
| 20−25 | 20 | 22.5 |
- 1
|
- 20
|
20 |
| 25−30 | 35 | 27.5 | 0 | 0 | 0 |
| 30−35 | 20 | 32.5 | 1 | 20 | 20 |
| 35−40 | 15 | 37.5 | 2 | 30 | 60 |
|
\[\sum f_i = N = 100\]
|
\[\sum f_i u_i = 8 \]
|
\[\sum f_i {u_i}^2 = 150\]
|
Here,
\[CV = \frac{\sigma}{\bar{X}} \times 100\]
\[ = \frac{6 . 11}{27 . 9} \times 100 = 21 . 9\]
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