3: Measures of Central Tendency and Spread

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Page ID: 42006

Linda R. Cote, Rupa G. Gordon, Chrislyn E. Randell, Judy Schmitt, and Helena Marvin
University of Missouri System

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Now that we have visualized our data to understand its shape, we can begin with numerical analyses. The descriptive statistics presented in this chapter serve to describe the distribution of our data objectively and mathematically—our first step into statistical analysis! The topics here will serve as the basis for everything we do in the rest of the course.

3.1: What is Central Tendency?
This page discusses central tendency, focusing on minimizing squared deviations from the mean. It outlines three definitions of central tendency, each providing insights into data distributions. The calculations of squared deviations from target values (10 and 5) reveal significant differences, with a minimum sum of 134.8 identified, highlighting the importance of selecting target numbers for reduced deviations.
3.2: Measures of Central Tendency
This page explains the three key measures of central tendency: mean, median, and mode. It describes how to calculate each measure and their unique advantages, especially in skewed data distributions. Using examples like test scores and baseball salaries, it illustrates how the mean can be heavily influenced by outliers, making the median and mode sometimes more reliable indicators.
3.3: Spread and Variability
This page explains the concept of variability in statistics, emphasizing how it measures the spread of scores. It outlines different methods of measuring variability, including range, interquartile range (IQR), and the sum of squares (SS). The text highlights the importance of SS in calculating variance and standard deviation, which help interpret data dispersion.

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