Proportion Estimation
Proportion estimation is another common task for sample statistics.
We have sample proportion
where is the number of subjects in the sample with a particular trait, and is the sample size.
We have
and standard error
Assumptions
We assume that
- A random sample was taken
- and
- rooted in normal approximation of binomial
Wilson-Adjusted CI for p
Correcting the sample proportion narrows the confidence interval. We do this with the Wilson-Adjusted estimate for
with standard error
Remember that the confidence interval is ca
is slightly skewed towards , but results in better CIs for . I don't know why.
Confidence Interval
We use normal distribution since is bounded between 0 and 1, and we don't have extra error from extra parameters such as multiple sample mean.
Remember that the confidence interval is just mean plus-or-minus error margin, and the error margin is just the z score multiplied by standard error (since we are using normal distribution).
Notaby, it is possible to have a bound above 1 or below 0. This usually happens when the point estimate is close to 0 or 1. In this case, instead of listing the impossible bounds, we report that they have been cut off.