Lesson 17Using Box Plots

Learning Goal

Let’s use box plots to make comparisons.

Learning Targets

  • I can use a box plot to answer questions about a data set.

  • I can use medians and IQRs to compare groups.

Lesson Terms

  • box plot
  • interquartile range (IQR)
  • median
  • range

Warm Up: Hours of Slumber

Problem 1

Ten sixth-grade students were asked how much sleep, in hours, they usually get on a school night. Here is the five-number summary of their responses.

  • Minimum: 5 hours

  • First quartile: 7 hours

  • Median: 7.5 hours

  • Third quartile: 8 hours

  • Maximum: 9 hours

  1. On the grid, draw a box plot for this five-number summary.

    A blank grid for “hours of sleep” with the numbers 0 through 14 indicated along the horizontal axis. There are 5 horizontal gridlines.
  2. What questions could be answered by looking at this box plot?

Activity 1: Info Gap: Sea Turtles

Problem 1

Your teacher will give you either a Problem Card or a Data Card about sea turtles that nest on the Outer Banks of North Carolina. Do not show or read your card to your partner.

A photo of a turtle in the ocean.

If your teacher gives you the problem card:

  1. Silently read your card, and think about what information you need to answer the question.

  2. Ask your partner for the specific information that you need.

  3. Explain to your partner how you are using the information to solve the problem.

  4. Solve the problem, and explain your reasoning to your partner.

If your teacher gives you the data card:

  1. Silently read the information on your card.

  2. Ask your partner, “What specific information do you need?” Wait for your partner to ask for information. Only give information that is on your card. (Do not figure out anything for your partner!)

  3. Before telling your partner the information, ask, “Why do you need that information?”

  4. After your partner solves the problem, ask them to explain their reasoning. Listen to their explanation.

Pause here so your teacher can review your work. Ask your teacher for a new set of cards and repeat the activity, trading roles with your partner.

Activity 2: Paper Planes

Problem 1

Andre, Lin, and Noah each designed and built a paper airplane. They launched each plane several times and recorded the distance of each flight in yards.

  • Andre

  • 25

  • 26

  • 27

  • 27

  • 27

  • 28

  • 28

  • 28

  • 29

  • 30

  • 30

  • Lin

  • 20

  • 20

  • 21

  • 24

  • 26

  • 28

  • 28

  • 29

  • 29

  • 30

  • 32

  • Noah

  • 13

  • 14

  • 15

  • 18

  • 19

  • 20

  • 21

  • 23

  • 23

  • 24

  • 25

Work with your group to summarize the data sets with numbers and box plots.

  1. Write the five-number summary for the data for each airplane. Then, calculate the interquartile range for each data set.

    min

    Q1

    median

    Q3

    max

    IQR

    Andre

    Lin

    Noah

  2. Draw three box plots, one for each paper airplane. Label the box plots clearly.

    A blank grid with the horizontal axis labeled "distance in yards". The numbers 10 through 35, in increments of 5, are indicated. There are 4 evenly spaced vertical gridlines between each number indicated.
  3. How are the results for Andre’s and Lin’s planes the same? How are they different?

  4. How are the results for Lin’s and Noah’s planes the same? How are they different?

Are you ready for more?

Problem 1

Priya joined in the paper-plane experiments. She launched her plane eleven times and recorded the lengths of each flight. She found that her maximum and minimum were equal to Lin’s. Her IQR was equal to Andre’s.

  1. Draw a box plot that could represent Priya’s data.

    A grid for a box plot labeled distance in yards with a scale of 10 to 35.
  2. With the information given, can you estimate the median for Priya’s data? Explain your reasoning.

Lesson Summary

Box plots are useful for comparing different groups. Here are two sets of plots that show the weights of some berries and some grapes.

A box plot and dot plot for “berry weights in grams.” The numbers 1 through 8 are indicated. The box plot is above the dot plot.  The five-number summary for the box plot are as follows: Minimum value, 2. Maximum value, 6.5. Q1, 2.5. Q2, 3.5. Q3, 4. The data for the dot plot are as follows: 2 grams, 2 dots.  2.5 grams, 3 dots. 3 grams, 4 dots. 3.5 grams, 4 dots. 4 grams, 2 dots. 4.5 grams, 2 dots. 5.5 grams, 1 dot. 6.5 grams, 1 dot.
A box plot and dot plot for “grape weights in grams.” The numbers 1 through 8 are indicated. The box plot is above the dot plot.  The five-number summary for the box plot is as follows: Minimum value, 3. Maximum value, 9. Q1, 4.5. Q2, 5. Q3, 6. The data for the dot plot are as follows: 3 grams, 1 dot. 3.5 grams, 2 dots. 4 grams, 2 dots. 4.5 grams, 4 dots. 5 grams, 4 dots. 5.5 grams, 4 dots. 6 grams, 3 dots. 6.5 grams, 3 dots. 7 grams, 1 dot.

Notice that the median berry weight is 3.5 grams and the median grape weight is 5 grams. In both cases, the IQR is 1.5 grams. Because the grapes in this group have a higher median weight than the berries, we can say a grape in the group is typically heavier than a berry. Because both groups have the same IQR, we can say that they have a similar variability in their weights.

These box plots represent the length data for a collection ladybugs and a collection of beetles.

Two sets of box plots for "lengths in millimeters". The numbers 4 through 16 are indicated in increments of 2. There are tick marks midway between the indicated numbers. The top box plot is for "ladybugs".  The five-number summary is as follows: Minimum value, 6. Maximum value, 10.5. Q1, 8.5. Q2, 9. Q3, 10. The bottom box plot is for "beetles".  The five-number summary is as follows: Minimum value, 5. Maximum value, 15.5. Q1, 7.5. Q2, 9. Q3, 13.5.

The medians of the two collections are the same, but the IQR of the ladybugs is much smaller. This tells us that a typical ladybug length is similar to a typical beetle length, but the ladybugs are more alike in their length than the beetles are in their length.