Sample Size

The size of a sample influences the cost of a study, as well as the usefulness of the results. A sample that is too small can exclude information. One too large is costly and cumbersome.



Often, researchers need to know the smallest sample that can be taken and yet still have estimates that are accurate.



Decision-makers first agree to the amount of error they will tolerate from the results. This is called the margin of error (E).



Along with margin of error, researchers also assign a critical value (C.V.) that is based upon the probability for extreme values in the population.



These two factors are combined with knowledge about the population's standard deviation (sigma) to reach a recommmended sample size.



n= [(C.V. * sigma) / E]^2



In order to apply the Central Limit Theorem, the common rule of thumb is a minimum sample size of 30. However, if the population is bell-shaped, it can be smaller.

Margin of Error

Margin of Error (E) is the error that can be tolerated when estimating a value.

For confidence intervals, it is calculated as the critical value multiplied by the standard error -

E = Crit Val * Std Err

First, you look up the critical value from the probability table (t or z), then you calculate the standard error. Multiply these together.

Margin of Error tells you how much 'cushion' to place on your estimated value.

This cushion will be larger or smaller depending on the critical value that the researcher has chosen.

However, to determine sample size (n), the margin of error is chosen, not calculated.

For example, a buyer wants to know the sample size needed to estimate the average cost of shoes. He needs the estimate to be within ten dollars of the true population mean.

In this case, you will use E=10 in the formula for solving sample size.