The adjusted sample variance is a measure of the dispersion of a sample around its mean.
It is obtained by:
summing the squared deviations from the mean;
dividing the result thus obtained by the number of observations minus one.
Below we provide a precise definition, we illustrate its calculation with an example, and we introduce some of its properties.
It is also often called unbiased sample variance because, under certain conditions, it is an unbiased estimator of the population variance.
It is defined as follows.
Definition
Given a sample
![[eq1]](/images/adjusted-sample-variance__1.png){kind=small}
of
observations, their adjusted sample variance
is![[eq2]](/images/adjusted-sample-variance__3.png)
where
is their sample
mean:![[eq3]](/images/adjusted-sample-variance__5.png)
The adjective "adjusted" refers to the fact that the sum of squared deviations
is divided by
rather than by
.
Suppose that we have observed the following sample of six
observations:![[eq4]](/images/adjusted-sample-variance__8.png)
The sample mean
is![[eq5]](/images/adjusted-sample-variance__9.png)
The adjusted sample variance
is![[eq6]](/images/adjusted-sample-variance__10.png)
Another common way to compute the sample variance is
![[eq7]](/images/adjusted-sample-variance__11.png)
which
is called unadjusted or biased sample
variance.
The main difference is that the sum of squared deviations:
is divided by
in the unadjusted variance;
is divided by
in the adjusted variance.
We can write the adjusted variance in terms of the unadjusted
one:![[eq8]](/images/adjusted-sample-variance__14.png){kind=small}
The ratio
![[eq9]](/images/adjusted-sample-variance__15.png){kind=small}
is
called a degrees of freedom adjustment. It is also sometimes
called Bessel's correction.
Suppose that the observations
are all drawn from probability distributions having the same mean
and the same variance
.
It is possible to prove (see
Variance
estimation) that, if
are
independent,
then the adjusted sample variance is an unbiased estimator of
.
The degrees of freedom adjustment is not a free lunch: it eliminates the bias, but it usually increases the variance of the sample variance.
This can be proved rigorously when
are drawn from a
normal
distribution (see
Variance
estimation).
The lecture entitled Variance estimation presents more details about the adjusted sample variance and its properties (e.g., its consistency and lack of bias).
For more details about the biased version, you can instead see the glossary entry on the Unadjusted sample variance.
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Please cite as:
Taboga, Marco (2021). "Adjusted sample variance", Lectures on probability theory and mathematical statistics. Kindle Direct Publishing. Online appendix. https://www.statlect.com/glossary/adjusted-sample-variance.
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