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Question
From the prices of shares X and Y given below: find out which is more stable in value:
| X: | 35 | 54 | 52 | 53 | 56 | 58 | 52 | 50 | 51 | 49 |
| Y: | 108 | 107 | 105 | 105 | 106 | 107 | 104 | 103 | 104 | 101 |
Solution
Let Ax = 51
|
\[x_i\]
|
\[d_i = x_i - 51\]
|
\[{d_i}^2\]
|
| 35 |
- 16
|
256 |
| 54 | 3 | 9 |
| 52 | 1 | 1 |
| 53 | 2 | 4 |
| 56 | 5 | 25 |
| 58 | 7 | 49 |
| 52 | 1 | 1 |
| 50 |
- 1
|
1 |
| 51 | 0 | 0 |
| 49 |
- 2
|
4 |
|
\[\sum d_i = 0\]
|
\[\sum d_i^2 = 350\]
|
Here, we have \[n = 10, \bar{X} = 51\]
\[ \sigma^2 = \frac{\sum {d_i}^2}{n} - \left( \frac{\sum d_i}{n} \right)^2 \]
\[ = \frac{350}{10} - \left( \frac{0}{10} \right)^2 \]
\[ = 35 - 0\]
\[ = 35\]
\[\sigma = \sqrt{35} = 5 . 91\]
\[ = 11 . 58\]
|
\[x_i\]
|
\[d_i = x_i - 105\]
|
\[{d_i}^2\]
|
| 108 | 3 | 9 |
| 107 | 2 | 4 |
| 105 | 0 | 0 |
| 105 | 0 | 0 |
| 106 | 1 | 1 |
| 107 | 2 | 4 |
| 104 |
- 1
|
1 |
| 103 |
- 2
|
4 |
| 104 |
- 1
|
1 |
| 101 |
- 4
|
16 |
|
\[\sum d_i = 0\]
|
\[\sum d_i^2 = 40\]
|
\[n = 10, \bar{Y} = 105\]
\[ \sigma^2 = \frac{\sum {d_i}^2}{n} - \left( \frac{\sum d_i}{n} \right)^2 \]
\[ = \frac{40}{10} - \left( \frac{0}{10} \right)^2 \]
\[ = 4 - 0\]
\[ = 4\]
\[\sigma = \sqrt{4} = 2\]
\[{CV}_y = \frac{2}{105} \times 100\]
\[ = 1 . 90\]
Since CV of prices of share Y is lesser than that of X, prices of shares Y are more stable.
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