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## Chapter 1: Exploring Data

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**Chapter 1: Exploring Data**Section 1.1 Analyzing Categorical Data The Practice of Statistics, 4th edition - For AP* STARNES, YATES, MOORE**Section 1.1Analyzing Categorical Data**Learning Objectives After this section, you should be able to… • CONSTRUCT and INTERPRET bar graphs and pie charts • RECOGNIZE “good” and “bad” graphs • CONSTRUCT and INTERPRET two-way tables • DESCRIBE relationships between two categorical variables • ORGANIZE statistical problems**Analyzing Categorical Data**• Categorical Variables place individuals into one of several groups or categories • The values of a categorical variable are labels for the different categories • The distribution of a categorical variable lists the count or percent of individuals who fall into each category. Example, page 8 Variable Values Count Percent**Analyzing Categorical Data**• Displaying categorical data Frequency tables can be difficult to read. Sometimes is is easier to analyze a distribution by displaying it with a bar graph or pie chart.**Graphs: Good and Bad**Analyzing Categorical Data Bar graphs compare several quantities by comparing the heights of bars that represent those quantities. Our eyes react to the area of the bars as well as height. Be sure to make your bars equally wide. Avoid the temptation to replace the bars with pictures for greater appeal…this can be misleading! Alternate Example This ad for DIRECTV has multiple problems. How many can you point out?**Your turn………**• Here are the percents of 15 to 18 year olds who own the following personal media devices according to the Kaiser Family Foundation. • Make a bar chart. • Would it be appropriate to make a pie chart? • Device Percent who own • Cell phone 85 • MP3 player 83 • Handheld video 41 • Laptop 38 • Portable CD player 20**Constructing Bar Graphs**• You try:**Analyzing Categorical Data**• Two-Way Tables and Marginal Distributions When a dataset involves two categorical variables, we begin by examining the counts or percents in various categories for one of the variables. Definition: Two-way Table – describes two categorical variables, organizing counts according to a row variable and a column variable. Example, p. 12 What are the variables described by this two-way table? How many young adults were surveyed?**Analyzing Categorical Data**• Two-Way Tables and Marginal Distributions Definition: The Marginal Distribution of one of the categorical variables in a two-way table of counts is the distribution of values of that variable among all individuals described by the table. • Note: Percents are often more informative than counts, especially when comparing groups of different sizes. • To examine a marginal distribution, • Use the data in the table to calculate the marginal distribution (in percents) of the row or column totals. • Make a graph to display the marginal distribution.**Analyzing Categorical Data**• Two-Way Tables and Marginal Distributions Example, p. 13 Examine the marginal distribution of chance of getting rich.**Analyzing Categorical Data**• Two-Way Tables and Conditional Distributions Example, p. 15 Calculate the conditional distribution of opinion among males. Examine the relationship between gender and opinion.**Conditional Distribution Bar Graph of Women in all**categories**Your turn……..**• Use the data from • “I’m gonna be rich” table to: • Calculate the marginal distributions comparing genders. • Construct a bar graph showing your calculations**Analyzing Categorical Data**• Relationships Between Categorical Variables • Marginal distributions tell us nothing about the relationship between two variables. Definition: A Conditional Distribution of a variable describes the values of that variable among individuals who have a specific value of another variable. • To examine or compare conditional distributions, • Select the row(s) or column(s) of interest. • Use the data in the table to calculate the conditional distribution (in percents) of the row(s) or column(s). • Make a graph to display the conditional distribution. • Use a side-by-side bar graph or segmented bar graph to compare distributions.**Analyzing Categorical Data**• Organizing a Statistical Problem • As you learn more about statistics, you will be asked to solve more complex problems. • Here is a four-step process you can follow. How to Organize a Statistical Problem: A Four-Step Process State: What’s the question that you’re trying to answer? Plan: How will you go about answering the question? What statistical techniques does this problem call for? Do: Make graphs and carry out needed calculations. Conclude: Give your practical conclusion in the setting of the real-world problem.**Based on the survey results, can we conclude that young men**and women differ in their opinions about likelihood of future wealth?**State, Plan, Do, Conclude**State: What is the relationship between gender and responses to the question, “what do you think are the chances you will have much more than a middle class income by age 30? Plan: We will compare the conditional distributions of response for women and men separately. Do: Make a bar graph to compare. Conclude: Based on the sample data, men seem somewhat more optimistic about their future income than women. Men were less likely to say that they have “some chance but probably not” than women (11.6% vs. 18%). Men were more likely to say that they have a “good chance” (30.8%) to have much more than a middle class income by age 30.**Section 1.1Analyzing Categorical Data**Summary In this section, we learned that… • The distribution of a categorical variable lists the categories and gives the count or percent of individuals that fall into each category. • Pie charts and bar graphs display the distribution of a categorical variable. • A two-way table of counts organizes data about two categorical variables. • The row-totals and column-totals in a two-way table give the marginal distributions of the two individual variables. • There are two sets of conditional distributions for a two-way table.**Section 1.1Analyzing Categorical Data**Summary, continued In this section, we learned that… • We can use a side-by-side bar graph or a segmented bar graph to display conditional distributions. • To describe the association between the row and column variables, compare an appropriate set of conditional distributions. • Even a strong association between two categorical variables can be influenced by other variables lurking in the background. • You can organize many problems using the four steps state, plan, do, and conclude.**Looking Ahead…**In the next Section… • We’ll learn how to display quantitative data. • Dotplots • Stemplots • Histograms • We’ll also learn how to describe and compare distributions of quantitative data.