Chapter 2.2: Stem-and-Leaf Graphs (Stemplots), Line Graphs, and Bar Graphs
One simple graph, the stem-and-leaf graph or stemplot, comes from the field of exploratory data analysis. It is a good choice when the data sets are small. To create the plot, divide each observation of data into a stem and a leaf. The leaf consists of a final significant digit. For example, 23 has stem two and leaf three. The number 432 has stem 43 and leaf two. Likewise, the number 5,432 has stem 543 and leaf two. The decimal 9.3 has stem nine and leaf three. Write the stems in a vertical line from smallest to largest. Draw a vertical line to the right of the stems. Then write the leaves in increasing order next to their corresponding stem.
For Susan Dean’s spring pre-calculus class, scores for the first exam were as follows (smallest to largest):
33; 42; 49; 49; 53; 55; 55; 61; 63; 67; 68; 68; 69; 69; 72; 73; 74; 78; 80; 83; 88; 88; 88; 90; 92; 94; 94; 94; 94; 96; 100
Stem | Leaf |
---|---|
3 | 3 |
4 | 2 9 9 |
5 | 3 5 5 |
6 | 1 3 7 8 8 9 9 |
7 | 2 3 4 8 |
8 | 0 3 8 8 8 |
9 | 0 2 4 4 4 4 6 |
10 | 0 |
The stemplot shows that most scores fell in the 60s, 70s, 80s, and 90s. Eight out of the 31 scores or approximately 26% (left(frac{8}{31}right)) were in the 90s or 100, a fairly high number of As.
For the Park City basketball team, scores for the last 30 games were as follows (smallest to largest):
32; 32; 33; 34; 38; 40; 42; 42; 43; 44; 46; 47; 47; 48; 48; 48; 49; 50; 50; 51; 52; 52; 52; 53; 54; 56; 57; 57; 60; 61
Construct a stem plot for the data.
The stemplot is a quick way to graph data and gives an exact picture of the data. You want to look for an overall pattern and any outliers. An outlier is an observation of data that does not fit the rest of the data. It is sometimes called an extreme value. When you graph an outlier, it will appear not to fit the pattern of the graph. Some outliers are due to mistakes (for example, writing down 50 instead of 500) while others may indicate that something unusual is happening. It takes some background information to explain outliers, so we will cover them in more detail later.
The data are the distances (in kilometers) from a home to local supermarkets. Create a stemplot using the data:
1.1; 1.5; 2.3; 2.5; 2.7; 3.2; 3.3; 3.3; 3.5; 3.8; 4.0; 4.2; 4.5; 4.5; 4.7; 4.8; 5.5; 5.6; 6.5; 6.7; 12.3
Do the data seem to have any concentration of values?
The leaves are to the right of the decimal.
The value 12.3 may be an outlier. Values appear to concentrate at three and four kilometers.
Stem | Leaf |
---|---|
1 | 1 5 |
2 | 3 5 7 |
3 | 2 3 3 5 8 |
4 | 0 2 5 5 7 8 |
5 | 5 6 |
6 | 5 7 |
7 | |
8 | |
9 | |
10 | |
11 | |
12 | 3 |
The following data show the distances (in miles) from the homes of off-campus statistics students to the college. Create a stem plot using the data and identify any outliers:
0.5; 0.7; 1.1; 1.2; 1.2; 1.3; 1.3; 1.5; 1.5; 1.7; 1.7; 1.8; 1.9; 2.0; 2.2; 2.5; 2.6; 2.8; 2.8; 2.8; 3.5; 3.8; 4.4; 4.8; 4.9; 5.2; 5.5; 5.7; 5.8; 8.0
A side-by-side stem-and-leaf plot allows a comparison of the two data sets in two columns. In a side-by-side stem-and-leaf plot, two sets of leaves share the same stem. The leaves are to the left and the right of the stems. (Figure) and (Figure) show the ages of presidents at their inauguration and at their death. Construct a side-by-side stem-and-leaf plot using this data.
Ages at Inauguration | Ages at Death | |
---|---|---|
9 9 8 7 7 7 6 3 2 | 4 | 6 9 |
8 7 7 7 7 6 6 6 5 5 5 5 4 4 4 4 4 2 2 1 1 1 1 1 0 | 5 | 3 6 6 7 7 8 |
9 8 5 4 4 2 1 1 1 0 | 6 | 0 0 3 3 4 4 5 6 7 7 7 8 |
7 | 0 0 1 1 1 4 7 8 8 9 | |
8 | 0 1 3 5 8 | |
9 | 0 0 3 3 |
President | Age | President | Age | President | Age |
---|---|---|---|---|---|
Washington | 57 | Lincoln | 52 | Hoover | 54 |
J. Adams | 61 | A. Johnson | 56 | F. Roosevelt | 51 |
Jefferson | 57 | Grant | 46 | Truman | 60 |
Madison | 57 | Hayes | 54 | Eisenhower | 62 |
Monroe | 58 | Garfield | 49 | Kennedy | 43 |
J. Q. Adams | 57 | Arthur | 51 | L. Johnson | 55 |
Jackson | 61 | Cleveland | 47 | Nixon | 56 |
Van Buren | 54 | B. Harrison | 55 | Ford | 61 |
W. H. Harrison | 68 | Cleveland | 55 | Carter | 52 |
Tyler | 51 | McKinley | 54 | Reagan | 69 |
Polk | 49 | T. Roosevelt | 42 | G.H.W. Bush | 64 |
Taylor | 64 | Taft | 51 | Clinton | 47 |
Fillmore | 50 | Wilson | 56 | G. W. Bush | 54 |
Pierce | 48 | Harding | 55 | Obama | 47 |
Buchanan | 65 | Coolidge | 51 |
President | Age | President | Age | President | Age |
---|---|---|---|---|---|
Washington | 67 | Lincoln | 56 | Hoover | 90 |
J. Adams | 90 | A. Johnson | 66 | F. Roosevelt | 63 |
Jefferson | 83 | Grant | 63 | Truman | 88 |
Madison | 85 | Hayes | 70 | Eisenhower | 78 |
Monroe | 73 | Garfield | 49 | Kennedy | 46 |
J. Q. Adams | 80 | Arthur | 56 | L. Johnson | 64 |
Jackson | 78 | Cleveland | 71 | Nixon | 81 |
Van Buren | 79 | B. Harrison | 67 | Ford | 93 |
W. H. Harrison | 68 | Cleveland | 71 | Reagan | 93 |
Tyler | 71 | McKinley | 58 | ||
Polk | 53 | T. Roosevelt | 60 | ||
Taylor | 65 | Taft | 72 | ||
Fillmore | 74 | Wilson | 67 | ||
Pierce | 64 | Harding | 57 | ||
Buchanan | 77 | Coolidge | 60 |
The table shows the number of wins and losses the Atlanta Hawks have had in 42 seasons. Create a side-by-side stem-and-leaf plot of these wins and losses.
Losses | Wins | Year | Losses | Wins | Year |
---|---|---|---|---|---|
34 | 48 | 1968–1969 | 41 | 41 | 1989–1990 |
34 | 48 | 1969–1970 | 39 | 43 | 1990–1991 |
46 | 36 | 1970–1971 | 44 | 38 | 1991–1992 |
46 | 36 | 1971–1972 | 39 | 43 | 1992–1993 |
36 | 46 | 1972–1973 | 25 | 57 | 1993–1994 |
47 | 35 | 1973–1974 | 40 | 42 | 1994–1995 |
51 | 31 | 1974–1975 | 36 | 46 | 1995–1996 |
53 | 29 | 1975–1976 | 26 | 56 | 1996–1997 |
51 | 31 | 1976–1977 | 32 | 50 | 1997–1998 |
41 | 41 | 1977–1978 | 19 | 31 | 1998–1999 |
36 | 46 | 1978–1979 | 54 | 28 | 1999–2000 |
32 | 50 | 1979–1980 | 57 | 25 | 2000–2001 |
51 | 31 | 1980–1981 | 49 | 33 | 2001–2002 |
40 | 42 | 1981–1982 | 47 | 35 | 2002–2003 |
39 | 43 | 1982–1983 | 54 | 28 | 2003–2004 |
42 | 40 | 1983–1984 | 69 | 13 | 2004–2005 |
48 | 34 | 1984–1985 | 56 | 26 | 2005–2006 |
32 | 50 | 1985–1986 | 52 | 30 | 2006–2007 |
25 | 57 | 1986–1987 | 45 | 37 | 2007–2008 |
32 | 50 | 1987–1988 | 35 | 47 | 2008–2009 |
30 | 52 | 1988–1989 | 29 | 53 | 2009–2010 |
Another type of graph that is useful for specific data values is a line graph. In the particular line graph shown in (Figure), the x-axis (horizontal axis) consists of data values and the y-axis (vertical axis) consists of frequency points. The frequency points are connected using line segments.
In a survey, 40 mothers were asked how many times per week a teenager must be reminded to do his or her chores. The results are shown in (Figure) and in (Figure).
Number of times teenager is reminded | Frequency |
---|---|
0 | 2 |
1 | 5 |
2 | 8 |
3 | 14 |
4 | 7 |
5 | 4 |
In a survey, 40 people were asked how many times per year they had their car in the shop for repairs. The results are shown in (Figure). Construct a line graph.
Number of times in shop | Frequency |
---|---|
0 | 7 |
1 | 10 |
2 | 14 |
3 | 9 |
Bar graphs consist of bars that are separated from each other. The bars can be rectangles or they can be rectangular boxes (used in three-dimensional plots), and they can be vertical or horizontal. The bar graph shown in (Figure) has age groups represented on the x-axis and proportions on the y-axis.
By the end of 2011, Facebook had over 146 million users in the United States. (Figure) shows three age groups, the number of users in each age group, and the proportion (%) of users in each age group. Construct a bar graph using this data.
Age groups | Number of Facebook users | Proportion (%) of Facebook users |
---|---|---|
13–25 | 65,082,280 | 45% |
26–44 | 53,300,200 | 36% |
45–64 | 27,885,100 | 19% |
The population in Park City is made up of children, working-age adults, and retirees. (Figure) shows the three age groups, the number of people in the town from each age group, and the proportion (%) of people in each age group. Construct a bar graph showing the proportions.
Age groups | Number of people | Proportion of population |
---|---|---|
Children | 67,059 | 19% |
Working-age adults | 152,198 | 43% |
Retirees | 131,662 | 38% |
The columns in (Figure) contain: the race or ethnicity of students in U.S. Public Schools for the class of 2011, percentages for the Advanced Placement examine population for that class, and percentages for the overall student population. Create a bar graph with the student race or ethnicity (qualitative data) on the x-axis, and the Advanced Placement examinee population percentages on the y-axis.
Race/Ethnicity | AP Examinee Population | Overall Student Population |
---|---|---|
1 = Asian, Asian American or Pacific Islander | 10.3% | 5.7% |
2 = Black or African American | 9.0% | 14.7% |
3 = Hispanic or Latino | 17.0% | 17.6% |
4 = American Indian or Alaska Native | 0.6% | 1.1% |
5 = White | 57.1% | 59.2% |
6 = Not reported/other | 6.0% | 1.7% |
Park city is broken down into six voting districts. The table shows the percent of the total registered voter population that lives in each district as well as the percent total of the entire population that lives in each district. Construct a bar graph that shows the registered voter population by district.
District | Registered voter population | Overall city population |
---|---|---|
1 | 15.5% | 19.4% |
2 | 12.2% | 15.6% |
3 | 9.8% | 9.0% |
4 | 17.4% | 18.5% |
5 | 22.8% | 20.7% |
6 | 22.3% | 16.8% |
References
Burbary, Ken. Facebook Demographics Revisited – 2001 Statistics, 2011. Available online at http://www.kenburbary.com/2011/03/facebook-demographics-revisited-2011-statistics-2/ (accessed August 21, 2013).
“9th Annual AP Report to the Nation.” CollegeBoard, 2013. Available online at http://apreport.collegeboard.org/goals-and-findings/promoting-equity (accessed September 13, 2013).
“Overweight and Obesity: Adult Obesity Facts.” Centers for Disease Control and Prevention. Available online at http://www.cdc.gov/obesity/data/adult.html (accessed September 13, 2013).
Chapter Review
A stem-and-leaf plot is a way to plot data and look at the distribution. In a stem-and-leaf plot, all data values within a class are visible. The advantage in a stem-and-leaf plot is that all values are listed, unlike a histogram, which gives classes of data values. A line graph is often used to represent a set of data values in which a quantity varies with time. These graphs are useful for finding trends. That is, finding a general pattern in data sets including temperature, sales, employment, company profit or cost over a period of time. A bar graph is a chart that uses either horizontal or vertical bars to show comparisons among categories. One axis of the chart shows the specific categories being compared, and the other axis represents a discrete value. Some bar graphs present bars clustered in groups of more than one (grouped bar graphs), and others show the bars divided into subparts to show cumulative effect (stacked bar graphs). Bar graphs are especially useful when categorical data is being used.
For each of the following data sets, create a stem plot and identify any outliers.The miles per gallon rating for 30 cars are shown below (lowest to highest).
19, 19, 19, 20, 21, 21, 25, 25, 25, 26, 26, 28, 29, 31, 31, 32, 32, 33, 34, 35, 36, 37, 37, 38, 38, 38, 38, 41, 43, 43
Stem | Leaf |
---|---|
1 | 9 9 9 |
2 | 0 1 1 5 5 5 6 6 8 9 |
3 | 1 1 2 2 3 4 5 6 7 7 8 8 8 8 |
4 | 1 3 3 |
The height in feet of 25 trees is shown below (lowest to highest).
25, 27, 33, 34, 34, 34, 35, 37, 37, 38, 39, 39, 39, 40, 41, 45, 46, 47, 49, 50, 50, 53, 53, 54, 54
The data are the prices of different laptops at an electronics store. Round each value to the nearest ten.
249, 249, 260, 265, 265, 280, 299, 299, 309, 319, 325, 326, 350, 350, 350, 365, 369, 389, 409, 459, 489, 559, 569, 570, 610
Stem | Leaf |
---|---|
2 | 5 5 6 7 7 8 |
3 | 0 0 1 2 3 3 5 5 5 7 7 9 |
4 | 1 6 9 |
5 | 6 7 7 |
6 | 1 |
The data are daily high temperatures in a town for one month.
61, 61, 62, 64, 66, 67, 67, 67, 68, 69, 70, 70, 70, 71, 71, 72, 74, 74, 74, 75, 75, 75, 76, 76, 77, 78, 78, 79, 79, 95
For the next three exercises, use the data to construct a line graph.
In a survey, 40 people were asked how many times they visited a store before making a major purchase. The results are shown in (Figure).
Number of times in store | Frequency |
---|---|
1 | 4 |
2 | 10 |
3 | 16 |
4 | 6 |
5 | 4 |
In a survey, several people were asked how many years it has been since they purchased a mattress. The results are shown in (Figure).
Years since last purchase | Frequency |
---|---|
0 | 2 |
1 | 8 |
2 | 13 |
3 | 22 |
4 | 16 |
5 | 9 |
Several children were asked how many TV shows they watch each day. The results of the survey are shown in (Figure).
Number of TV Shows | Frequency |
---|---|
0 | 12 |
1 | 18 |
2 | 36 |
3 | 7 |
4 | 2 |
The students in Ms. Ramirez’s math class have birthdays in each of the four seasons. (Figure) shows the four seasons, the number of students who have birthdays in each season, and the percentage (%) of students in each group. Construct a bar graph showing the number of students.
Seasons | Number of students | Proportion of population |
---|---|---|
Spring | 8 | 24% |
Summer | 9 | 26% |
Autumn | 11 | 32% |
Winter | 6 | 18% |
Using the data from Mrs. Ramirez’s math class supplied in (Figure), construct a bar graph showing the percentages.
David County has six high schools. Each school sent students to participate in a county-wide science competition. (Figure) shows the percentage breakdown of competitors from each school, and the percentage of the entire student population of the county that goes to each school. Construct a bar graph that shows the population percentage of competitors from each school.
High School | Science competition population | Overall student population |
---|---|---|
Alabaster | 28.9% | 8.6% |
Concordia | 7.6% | 23.2% |
Genoa | 12.1% | 15.0% |
Mocksville | 18.5% | 14.3% |
Tynneson | 24.2% | 10.1% |
West End | 8.7% | 28.8% |
Use the data from the David County science competition supplied in (Figure). Construct a bar graph that shows the county-wide population percentage of students at each school.
Homework
1) Student grades on a chemistry exam were: 77, 78, 76, 81, 86, 51, 79, 82, 84, 99
- Construct a stem-and-leaf plot of the data.
- Are there any potential outliers? If so, which scores are they? Why do you consider them outliers?