

A researcher has recruited males aged 45 to 65 years old for an exercise training study to investigate risk markers for heart disease (e.g., cholesterol). Why? Because the teacher is only interested in this class of pupils' scores and nobody else. Which standard deviation should be used?Ī. The teacher wants to summarize the results the pupils attained as a mean and standard deviation. In addition, the standard deviation, like the mean, is normally only appropriate when the continuous data is not significantly skewed or has outliers.Įxamples of when to use the sample or population standard deviation The standard deviation is used in conjunction with the mean to summarise continuous data, not categorical data. What type of data should you use when you calculate a standard deviation? Confusion can often arise as to which standard deviation to use due to the name "sample" standard deviation incorrectly being interpreted as meaning the standard deviation of the sample itself and not the estimate of the population standard deviation based on the sample. Therefore, if all you have is a sample, but you wish to make a statement about the population standard deviation from which the sample is drawn, you need to use the sample standard deviation. However, in statistics, we are usually presented with a sample from which we wish to estimate (generalize to) a population, and the standard deviation is no exception to this. Therefore, you would normally calculate the population standard deviation if: (1) you have the entire population or (2) you have a sample of a larger population, but you are only interested in this sample and do not wish to generalize your findings to the population. We are normally interested in knowing the population standard deviation because our population contains all the values we are interested in. When to use the sample or population standard deviation

In statistics, we are usually presented with having to calculate sample standard deviations, and so this is what this article will focus on, although the formula for a population standard deviation will also be shown. These two standard deviations - sample and population standard deviations - are calculated differently. However, as we are often presented with data from a sample only, we can estimate the population standard deviation from a sample standard deviation.

Usually, we are interested in the standard deviation of a population. The standard deviation is a measure of the spread of scores within a set of data.
