![]() ![]() For now, we'll focus on general instructions and formulas, which we then apply to a numerical example in the dedicated section. On the plot, it's the bottom dark blue line.Īlright, now that we know what a box plot is and can identify its components, it's time to see how to make a box-and-whisker plot in practice. The opposite of the maximum: it marks the smallest entry of the dataset. On the graph, it's the bottom side of the box. Together with the third quartile, it forms the interquartile range, i.e., the box on the box-and-whisker plot example above, which shows where roughly half of the entries are. Similar to its equivalent from point 2., it marks the end of the range in which one-fourth of the values lie. In the picture, it's the light blue line in the middle. It's not the same as the mean, mind you! Instead, it says that half of the entries are larger and the other half are smaller than the median. ![]() On the plot, it's the top side of the box. Formula-wise, it's the median of the top half of the values. As such, the third quartile marks the end of the range in which three-fourths of the entries lie. On the graph, it's the top dark blue line.Ī quartile is one-fourth of the dataset. Simple enough: it's the largest entry in the dataset. It's time to learn what they are from top to bottom. The bunch is called the five-number summary of a dataset, and sure enough, Omni's box-and-whisker plot maker provides their values together with the graph itself. In essence, the five horizontal lines are all there is to it. ![]()
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