Lesson 13 Fractional Measurements on Line Plots

    • Let’s create line plots and analyze the data.

Warm-up Notice and Wonder: Which Ruler?

What do you notice? What do you wonder?

images of 4 rulers measuring same crayon. Ruler A, scaled by whole inches. Ruler B, scaled by half inches. Ruler C, scaled by fourths of an inch. Ruler D, scaled by eighths of an inch. Crayon almost 2 and 1 half inches.

Activity 1 Measure to the Nearest and Inch

Photograph. Set of colored pencils.

Your teacher will give your group a set of colored pencils.

  1. Work with your group to measure each colored pencil to the nearest inch. Check each other’s measurements. Record each measurement in the table.

    group members

    pencil length (inches)

  2. Create a line plot to represent the data your group collected.

    Blank dot plot titled Colored-Pencil Data from 2 to 8 by 1’s. Hash marks by fourths. Horizontal axis, length of pencil in inches.
  3. Work with your group to measure each colored pencil to the nearest  inch.

    Check one another’s measurements. Record each measurement in the table.

    group members

    pencil length (inches)

  4. Create a line plot to represent your new data.

    Blank dot plot titled Colored-Pencil Data from 2 to 8 by 1’s. Hash marks by fourths. Horizontal axis, length of pencil in inches.
  5. How was measuring to the nearest inch different from measuring to the nearest inch?

Activity 2 Colored-pencil Measurements

Problem 1

photo of color pencils

Andre’s class measured the length of some colored pencils to the nearest inch. The data are shown here:

  1. Plot the colored-pencil data on the line plot.

    Blank dot plot from 1 to 7 by 1’s. Hash marks by fourths. Horizontal axis, length in inches.
  2. Which colored-pencil length is the most common in the data set?

  3. Write 2 new questions that could be answered using the line plot data.

Problem 2

Next, Andre’s class measured their colored pencils to the nearest inch. The data are shown here:

  1. Plot the colored-pencil data on the line plot.

    Blank dot plot from 1 to 7 by 1’s. Hash marks by fourths. Horizontal axis, length in inches.
  2. Which colored-pencil length is the most common in the line plot?

  3. Why did some colored-pencil lengths change on this line plot?

  4. What is the difference between the length of the longest colored pencil and the shortest colored pencil? Show your reasoning.

Activity 3 Noah’s Colored Pencils

Problem 1

The line plot shows the data Noah collected on a set of colored pencils.

Dot plot titled Noah's Colored Pencils from 1 to 7 by 1’s. Hash marks by eighths. Horizontal axis, length, in inches. Beginning at 1 and 6 eighths, the number of X’s above each eighth increment is 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 2, 0, 0, 0, 0, 0, 0, 0, 1, 0, 1, 0, 0, 0, 2, 0, 1, 0, 1, 0, 0, 0, 5, 0, 3.

Use the line plot to tell if each of the following statements is true or false. Be prepared to explain or show how you know. For each false statement, correct it so that it is true.

  1. Noah measured the colored pencils to the nearest inch.

  2. There are five pencils that are inches long.

  3. The shortest pencil is inches long.

  4. The three longest pencils are exactly 5 inches longer than the shortest one.

  5. If Noah removed the shortest pencil from the collection, the difference between the longest and shortest pencils would be 3 inches.

Problem 2

If you have time… Noah wants to create a collection of at least 10 pencils where the difference between the longest and shortest colored pencils is no more than inches.

Is that possible? If so, which pencils should he remove from his collection?