Chapter 1: Exploring Data
Post on 24-Feb-2016
51 Views
Preview:
DESCRIPTION
Transcript
+
Chapter 1: Exploring DataSection 1.1Analyzing Categorical Data
The Practice of Statistics, 4th edition - For AP*STARNES, YATES, MOORE
+ Chapter 1Exploring Data
Introduction: Data Analysis: Making Sense of Data
1.1 Analyzing Categorical Data
1.2 Displaying Quantitative Data with Graphs
1.3 Describing Quantitative Data with Numbers
+ Section 1.1Analyzing Categorical Data
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
Learning Objectives
+Individuals vs Variables
Individuals: the objects described by a set of data
Individuals can be people, animals or things
Variables: any characteristic of an individual
Variables can take different values for different individuals
+Analyzing C
ategorical 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.
Frequency Table
Format Count of Stations
Adult Contemporary 1556
Adult Standards 1196
Contemporary Hit 569
Country 2066
News/Talk 2179
Oldies 1060
Religious 2014
Rock 869
Spanish Language 750
Other Formats 1579
Total 13838
Relative Frequency Table
Format Percent of Stations
Adult Contemporary 11.2
Adult Standards 8.6
Contemporary Hit 4.1
Country 14.9
News/Talk 15.7
Oldies 7.7
Religious 14.6
Rock 6.3
Spanish Language 5.4
Other Formats 11.4
Total 99.9
Example, page 8
Count
Percent
Variable
Values
+Analyzing Q
uantitative Data
Quantitative Variables: take on numerical values
What’s the difference between categorical and quantitative variables?
“who” is being measured vs. “what” is being measured
Do we ever use numbers to describe the values of a categorical variable?
+Distribution
The distribution of a variable tells us what values the variable takes and how often it takes these values.
+Exam
ple
Here is information about 10 randomly selected US residents from the 2000 census.
Who are the individuals in the data set?
What variables are measured? Identify each as categorical or quantitative. In what units were the quantitative variables measured?
Describe the individual in the first row.
+Answ
ers Individuals: the 10 randomly selected U.S.
residents from the 2000 census.
Categorical: state, gender, marital status Quantitative: number of family members, age in
years, total income in dollars, travel time to work in mins.
This person is a 61 year old married female from Kentucky who drives 20 minutes to work and has a total income of $21,000. She has 2 family members in her household.
+Analyzing C
ategorical Data
Displaying categorical data
Frequency tables: displays the counts of each category
Relative Frequency table: shows the percents of each category
Frequency Table
Format Count of Stations
Adult Contemporary 1556
Adult Standards 1196
Contemporary Hit 569
Country 2066
News/Talk 2179
Oldies 1060
Religious 2014
Rock 869
Spanish Language 750
Other Formats 1579
Total 13838
Relative Frequency Table
Format Percent of Stations
Adult Contemporary 11.2
Adult Standards 8.6
Contemporary Hit 4.1
Country 14.9
News/Talk 15.7
Oldies 7.7
Religious 14.6
Rock 6.3
Spanish Language 5.4
Other Formats 11.4
Total 99.9
+Analyzing C
ategorical Data
What is the difference between a frequency table and a relative frequency table? When is it better to use relative frequency tables?
+Analyzing C
ategorical 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.
+Analyzing C
ategorical Data
What is the most important thing to remember when making pie charts and bar graphs? Why do statisticians prefer bar graphs?
When is it inappropriate to use a pie chart?
Hint: categorical vs. quantitative
What are some common ways to make a misleading graph?
+Analyzing C
ategorical 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!
Graphs: Good and Bad
Alternate Example
This ad for DIRECTV has multiple problems. How many can you point out?
+Classw
ork: Frequency Tables 1. Choose or generate a question that will result in a range
of categorical data. Examples: What is your favorite ice cream flavor?, If you could be
a superhero, what would your super power be?, etc.
2. Survey at least 25 people to gather data to answer your question. Record your responses.
3. Organize your data into a frequency table.
4. Create a relative frequency table of the results.
5. Create a bar graph of your data. (Don’t forget labels!)
6. Write a brief explanation as to why or why not a pie chart would be appropriate for your data.
+Analyzing C
ategorical Data
In the past, we have looked at data with one categorical variable. Now we will look at data with more than one categorical variable.
Reminder:
Explanatory Variable:Any variable that explains the response variable. Often called an independent variable or predictor variable.
Response Variable: The outcome of a study. A variable you would be interested in predicting or forecasting. Often called a dependent variable or predicted variable.
+Analyzing C
ategorical 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.
Young adults by gender and chance of getting rich
Female Male Total
Almost no chance 96 98 194
Some chance, but probably not 426 286 712
A 50-50 chance 696 720 1416
A good chance 663 758 1421
Almost certain 486 597 1083
Total 2367 2459 4826
Example, p. 12 What are the variables described by this two-way table?
How many young adults were surveyed?How many females were surveyed?
+Analyzing C
ategorical 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.
Why use the marginal distribution?: Percents are often more informative than counts, especially when comparing groups of different sizes.
To examine a marginal distribution,1)Use the data in the table to calculate the marginal distribution (in percents) of the row or column totals.2)Make a graph to display the marginal distribution.
+
Young adults by gender and chance of getting rich
Female Male Total
Almost no chance 96 98 194
Some chance, but probably not 426 286 712
A 50-50 chance 696 720 1416
A good chance 663 758 1421
Almost certain 486 597 1083
Total 2367 2459 4826
Analyzing C
ategorical Data
Two-Way Tables and Marginal Distributions
Response PercentAlmost no chance 194/4826 =
4.0%Some chance 712/4826 =
14.8%A 50-50 chance 1416/4826 =
29.3%A good chance 1421/4826 =
29.4%Almost certain 1083/4826 =
22.4%
Example, p. 13 Examine the marginal distribution of chance of getting rich.
Hint: Marginal distributions are calculated in the margins! If there is no “total” row or column, make one!
+Analyzing C
ategorical Data
Relationships Between Categorical Variables Problem: 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,1)Select the row(s) or column(s) of interest.2)Use the data in the table to calculate the conditional distribution (in percents) of the row(s) or column(s).3)Make a graph to display the conditional distribution.
• Use a side-by-side bar graph or segmented bar graph to compare distributions.
+
Young adults by gender and chance of getting rich
Female Male Total
Almost no chance 96 98 194
Some chance, but probably not 426 286 712
A 50-50 chance 696 720 1416
A good chance 663 758 1421
Almost certain 486 597 1083
Total 2367 2459 4826
Analyzing C
ategorical Data
Two-Way Tables and Conditional Distributions
Response MaleAlmost no chance 98/2459 =
4.0% Some chance 286/2459 =
11.6%A 50-50 chance 720/2459 =
29.3%A good chance 758/2459 =
30.8%Almost certain 597/2459 =
24.3%
Example, p. 15
Calculate the conditional distribution of opinion among males.
Examine the relationship between gender and opinion.
Female
96/2367 = 4.1%
426/2367 = 18.0%
696/2367 = 29.4%
663/2367 = 28.0%
486/2367 = 20.5%
+Segm
ented Bar G
raph Segmented Bar Graph: For each category of one variable,
there is a single bar divided into categories of the other variable.
Why are they good to use?
They are easy to compare!
Forces you to use percents
+Association
The whole point of analyzing more than one categorical variable at the same time is to see if they are associated.
What does it mean for two variables to have an association?
Knowing the value of one variable helps you predict the value of the other variable. (Think about explanatory and response)
+
Example: A sample of 200 children from the United Kingdom ages 9–17 was selected from the CensusAtSchool website. The gender of each student was recorded along with which super power they would most like to have: invisibility, super strength, telepathy (ability to read minds), ability to fly, or ability to freeze time.
Female Male Total
Invisibilty 17 13 30
Super Strength
3 17 20
Telepathy 39 5 44
Fly 36 18 54
Freeze Time
20 32 52
Total 115 85 200
Would you say there is association between the variables by looking at the two-way table? In other words, does gender explain super power preference?
+ Let’s create the conditional distribution:
a) Explain what it would mean if there was no association between gender and superpower preference?
(b) Based on this data, can we conclude there is an association between gender and super power preference? Justify.
FemaleInvisibility .15
Super Strength .03
Telepathy .34
Fly .31
Freeze Time .17
MaleInvisibility .15
Super Strength .20
Telepathy .06
Fly .21
Freeze Time .38
+ Section 1.1Analyzing Categorical Data
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.
Summary
+ Section 1.1Analyzing Categorical Data
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.
Summary, continued
+ Looking Ahead…
We’ll learn how to display quantitative data.DotplotsStemplotsHistograms
We’ll also learn how to describe and compare distributions of quantitative data.
In the next Section…
top related