11.04 Standard deviation
Ideas
Standard deviation
Standard deviation is a measure of spread, which helps give us a meaningful estimate of the variability in a data set. It is a weighted average of the distance of each data point from the mean. A small standard deviation indicates that most scores are close to the mean, while a large standard deviation indicates that the scores are more spread out away from the mean value.
Larger standard deviation - more spread out:
Smaller standard deviation - closer to the mean:
The symbol used for the standard deviation of a population is:
| \displaystyle \text{Standard deviation} | \displaystyle = | \displaystyle \sigma | (pronounced sigma) |
In statistics mode on a calculator, the symbol \sigma_{n} or \sigma_{x} may be used.
Standard deviation can be calculated using a formula. However, as this process is time consuming we will be using our calculator to find the standard deviation.
Standard deviation is a weighted average of how far each piece of data varies from the mean.
The standard deviation is a more complex calculation but takes every data point into account. The standard deviation is significantly impacted by outliers.
There is a second type of standard deviation for if you are working with a sample and not a population. This is the sample standard deviation, with the symbol s_{x}. This will normally have a value very close to \sigma_{x}. In this course, when standard deviation is mentioned it will only be referring to population standard deviation and represented by \sigma_{x}. Be careful when using your calculator or online tools that you are finding the population standard deviation and not the sample standard deviation.
Examples
Example 1
The test results for four Geography classes are shown. The classes are labelled as \text{W},\,\text{X},\,\text{Y}, and \text{Z}.
Select the the option that correctly lists the classes in order from largest standard deviation to smallest standard deviation.
Example 2
The number of runs scored by Mario in each of his innings is listed below. 33,\,32,\,32,\,32,\,31,\,32,\,32,\,32,\,32,\,32
What was his standard deviation? Round your answer to two decimal places.
Example 3
Use technology to determine the standard deviation for the data represented by the frequency table.
| Score | Frequency |
|---|---|
| 15 | 13 |
| 16 | 9 |
| 17 | 23 |
| 18 | 19 |
| 19 | 8 |
| 20 | 13 |
Round your answer to two decimal places.
Example 4
Use technology to determine the standard deviation for the data represented by the grouped frequency table, using the class centres.
| Class | Class centre | Frequency |
|---|---|---|
| 40 \leq x \lt 45 | 42.5 | 4 |
| 45 \leq x \lt 50 | 47.5 | 11 |
| 50 \leq x \lt 55 | 52.5 | 16 |
| 55 \leq x \lt 60 | 57.5 | 17 |
| 60 \leq x \lt 65 | 62.5 | 7 |
| 65 \leq x \lt 70 | 67.5 | 12 |
| 70 \leq x \lt 75 | 72.5 | 11 |
| 75 \leq x \lt 80 | 77.5 | 5 |
Round your answer to two decimal places.
Standard deviation is a weighted average of how far each piece of data varies from the mean. It takes every data point into account and is significantly impacted by outliers.
A larger value indicates a wider spread (more variable) data set.
A smaller value indicates a more tightly packed (less variable) data set.
For this course you should always use the \sigma_{x} value for standard deviation.