In statistics, the power function is a function that links the true value of a parameter to the probability of rejecting a null hypothesis about the value of that parameter.
Here is a more formal definition.
Definition
In a test of hypothesis about a parameter
,
let the null hypothesis
be![[eq1]](/images/power-function__2.png){kind=small}
The
power function
is a function that gives, for any
,
the probability of rejecting the null hypothesis when the true parameter is
equal to
.
Note that the power function depends on the null hypothesis: if we change
,
also the power function changes.
Suppose that we are testing the null hypothesis that the true parameter is
equal to zero:
![[eq3]](/images/power-function__7.png){kind=small}
Suppose that the value of the power function at
is
![[eq4]](/images/power-function__9.png){kind=small}
What does this mean? It means that if the true parameter is equal to
,
then there is a 50%
probability that the
test will reject the (false) null hypothesis that the parameter is equal to
.
The parameter
is often called alternative hypothesis and
is called power against the alternative
.
The size of a test is the probability of rejecting the null hypothesis when it is true.
Therefore,
whenthe
power function evaluated at
gives the size
of the
test:![[eq7]](/images/power-function__18.png){kind=small}
We plot below the graph of a typical power function.
It plots the probability of rejecting an alternative
in a z-test for the mean of a
normal
distribution, in which:
is the unknown mean of the distribution;
the variance of the distribution is known:
;
the null is
;
the size of the test is equal to 5%;
the sample is made of 100 independent draws from the distribution.
Note that the minimum of the graph corresponds to the null and it is equal to the size of the test.
The power function, known in closed form,
is![[eq8]](/images/power-function__23.png){kind=small}
where
is the cumulative distribution function of the normal distribution,
is the critical value corresponding to
a 5% size, and
is the number of draws.
For examples of how to derive the power function, see the lectures:
Hypothesis testing about the mean (z-test and t-test);
Hypothesis testing about the variance (Chi-square test).
Usually, the power of a test is an increasing function of sample size: the more observations we have, the more powerful the test.
You can find a more exhaustive explanation of the concept of power function in the lecture entitled Hypothesis testing.
Some related concepts are found in the following glossary entries:
Previous entry: Posterior probability
Next entry: Precision matrix
Please cite as:
Taboga, Marco (2021). "Power function", Lectures on probability theory and mathematical statistics. Kindle Direct Publishing. Online appendix. https://www.statlect.com/glossary/power-function.
Most of the learning materials found on this website are now available in a traditional textbook format.
