Putting It Together: Summarizing Data Graphically and Numerically

Let’s Summarize

In Summarizing Data Graphically and Numerically, we focused on describing the distribution of a quantitative variable.

  • To analyze the distribution of a quantitative variable, we describe the overall pattern of the data (shape, center, spread) and any deviations from the pattern (outliers). We use three types of graphs to analyze the distribution of a quantitative variable: dotplots, histograms, and boxplots.
  • We described the shape of a distribution as left-skewed, right-skewed, symmetric with a central peak (bell-shaped), or uniform. Not all distributions have a simple shape that fits into one of these categories.
  • The center of a distribution is a typical value that represents the group. We have two different measurements for determining the center of a distribution: mean and median.
    • The mean is the average. We calculate the mean by adding the data values and dividing by the number of individual data points. The mean is the fair share measure. The mean is also called the balancing point of a distribution. If we measure the distance between each data point and the mean, the distances are balanced on each side of the mean.
    • The median is the physical center of the data when we make an ordered list. It has the same number of values above it as below it.
    • General Guidelines for Choosing a Measure of Center
      • Always plot the data. We need to use a graph to determine the shape of the distribution. By looking at the shape, we can determine which measure of center best describes the data.
      • Use the mean as a measure of center only for distributions that are reasonably symmetric with a central peak. When outliers are present, the mean is not a good choice.
      • Use the median as a measure of center for all other cases.
  • The spread of a distribution is a description of how the data varies. We studied three ways to measure spread: range (max – min), the interquartile range (Q3 – Q1), and the standard deviation. When we use the median, Q1 to Q3 gives a typical range of values associated with the middle 50% of the data. When we use the mean, Mean ± SD gives a typical range of values.
    • The interquartile range (IQR) measures the variability in the middle half of the data.
    • Standard deviation measures roughly the average distance of data from the mean.
  • Outliers are data points that fall outside the overall pattern of the distribution. When using the median and IQR to measure center and spread, we use the 1.5 * IQR interval to identify outliers. Specifically, points outside the interval Q1 – 1.5 * IQR to Q3 + 1.5 * IQR are labeled as outliers.

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