Then, since none of these are outliers, we will draw a line from 7, which is the smallest data value to 65, which is the largest data value. So starting the scale at 5 and counting by 5 up to 65 or 70 would probably give a nice picture. In this data set, the smallest is 7 and the largest is 65. As a general example:Īdditionally, if you are drawing your box plot by hand you must think of scale. \(\text\) with a line in the middle for the median. The lower fence is defined by the following formula: The lower fenceĪny data value smaller than the lwoer fence will be considered an outlier. Instead it will be marked with a asterisk or other symbol. The idea is that anything outside the fences is a potential outlier and shouldn’t be included in the main group that we graph. With boxplots, this is done using something called “fences”. As you study statistics, you will see that different settings will use different techniques to flag or mark a potential outlier. Other than “a unique value”, there is not ONE definition across statistics that is used to find an outlier. The video below shows you how to get to that menu on the TI84:įor this data set, you will get the following output: While these numbers can also be calculated by hand (here is how to calculate the median by hand for instance), they can quickly be found on a TI83 or 84 calculator under 1-varstats. The five number summary consists of the minimum value, the first quartile, the median, the third quartile, and the maximum value. Steps to Making Your Box plot Step 1: Calculate the five number summary for your data set Let’s suppose this data set represents the salaries (in thousands) of a random sample of employees at a small company. To review the steps, we will use the data set below. Like a histogram, box plots ignore information about each individual data value and instead show the overall pattern. One of the more common options is the histogram, but there are also dotplots, stem and leaf plots, and as we are reviewing here – boxplots (which are sometimes called box and whisker plots). There are many possible graphs that one can use to do this. Remember, the goal of any graph is to summarize a data set. ![]() In the following lesson, we will look at the steps needed to sketch boxplots from a given data set. This way, you will be very comfortable with understanding the output from a computer or your calculator. However, when you are first learning about box plots, it can be helpful to learn how to sketch them by hand. Typically, statisticians are going to use software to help them look at data using a box plot.
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