Variance and Standard Deviation
One measure of spread based on the mean is the variance . By definition, the variance is the average
squared deviation from the mean. That is, it is a measure of spread because the more distant a value is
from the mean, the larger will be the square of the difference between it and the mean.
Symbolically, the variance is defined by
Note that we average by dividing by n – 1 rather than n as you might expect. This is because there are
only n – 1 independent datapoints, not n , if you know . That is, if you know n – 1 of the values and you
also know , then the n th datapoint is determined.
One problem using the variance as a measure of spread is that the units for the variance won’t match
the units of the original data because each difference is squared. For example, if you find the variance of a
set of measurements made in inches, the variance will be in square inches. To correct this, we often take
the square root of the variance as our measure of spread.
The square root of the variance is known as the standard deviation . Symbolically,
As discussed earlier, it is common to leave off the indices and write:In practice, you will rarely have to do this calculation by hand because it is one of the values returned
when you use you calculator to do 1-Var Stats on a list (it’s the Sx near the bottom of the first screen).
Calculator Tip: When you use 1-Var Stats , the calculator will, in addition to Sx , return σ x , whichis the standard deviation of a distribution. Its formal definition is . Note that thisassumes you know μ , the population mean, which you rarely do in practice unless you are dealing
with a probability distribution (see Chapter 9 ). Most of the time in statistics, you are dealing with
sample data and not a distribution. Thus, with the exception of the type of probability material found in
Chapters 9 and 10 , you should use only s and not σ.The definition of standard deviation has three useful qualities when it comes to describing the spread
of a distribution:
• It is independent of the mean . Because it depends on how far datapoints are from the mean, it doesn’t
matter where the mean is.