You will notice, however, that the mean is not often one of the actual values that you have observed in your data set. The mean is essentially a model of your data set. To acknowledge that we are calculating the population mean and not the sample mean, we use the Greek lower case letter "mu", denoted as \( \mu \): So, why have we called it a sample mean? This is because, in statistics, samples and populations have very different meanings and these differences are very important, even if, in the case of the mean, they are calculated in the same way. You may have noticed that the above formula refers to the sample mean. This formula is usually written in a slightly different manner using the Greek capitol letter, \( \sum \), pronounced "sigma", which means "sum of.": So, if we have \( n \) values in a data set and they have values \( x_1, x_2, \) …\(, x_n \), the sample mean, usually denoted by \( \overline $$ The mean is equal to the sum of all the values in the data set divided by the number of values in the data set. It can be used with both discrete and continuous data, although its use is most often with continuous data (see our Types of Variable guide for data types). The mean (or average) is the most popular and well known measure of central tendency. In the following sections, we will look at the mean, mode and median, and learn how to calculate them and under what conditions they are most appropriate to be used. The mean, median and mode are all valid measures of central tendency, but under different conditions, some measures of central tendency become more appropriate to use than others. The mean (often called the average) is most likely the measure of central tendency that you are most familiar with, but there are others, such as the median and the mode. They are also classed as summary statistics. As such, measures of central tendency are sometimes called measures of central location. Measures of Central Tendency IntroductionĪ measure of central tendency is a single value that attempts to describe a set of data by identifying the central position within that set of data.
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