Lesson 6

Locate Unit Fractions on the Number Line

Warm-up: Which One Doesn’t Belong: Fraction Details (10 minutes)

Narrative

This warm-up prompts students to compare four images. It gives students a reason to use language precisely (MP6). It gives the teacher an opportunity to hear how students use terminology and talk about characteristics of the items in comparison to one another. During the synthesis, ask students to explain the meaning of any terminology they use, such as parts, partitions, mark, label, thirds, or fourths.

Launch

  • Groups of 2
  • Display the image.
  • “Pick one that doesn’t belong. Be ready to share why it doesn’t belong.”
  • 1 minute: quiet think time

Activity

  • “Discuss your thinking with your partner.”
  • 2–3 minutes: partner discussion
  • Share and record responses.

Student Facing

Which one doesn’t belong?

ADiagram. Rectangle partitioned into 3 equal parts, 1 part shaded and labeled one third.

BNumber line. Tick marks labeled zero and one with two unlabeled tick marks in between.

CNumber line. Tick marks labeled zero and one. Point plotted at one third.

DNumber line. Evenly spaced tick marks. First tick mark, zero. Last tick mark, one. Three tick marks between zero and one, the first with a point labeled one fourth.

Student Response

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Activity Synthesis

  • “To make your reasoning clear while locating and labeling fractions on a number line, what are some important things to include?” (Partitions of the equal parts, a dot and label at the fraction.)
  • “We learned in a previous lesson that we label fractions on the number line at the tick marks just like we have labeled whole numbers on the number line.”
  • “How is this different from how we labeled our fraction strips like in A?” (In diagrams of fraction strips we labeled the part that has size or length \(\frac{1}{3}\). On the number line we are labeling the number \(\frac{1}{3}\).)

Activity 1: Partition Fourths (15 minutes)

Narrative

The purpose of this activity is for students to make sense of partitioning number lines that extend beyond one. Clare and Diego's work surfaces 2 common misconceptions that students often make while partitioning number lines into fractions. Clare partitions the entire number line into fourths and Diego places 4 tick marks to show fourths. Students analyze these misconceptions (MP3) before they locate and label unit fractions on number lines of various lengths in the next activity.

Launch

  • Groups of 2
  • “Today we are going to partition number lines to locate unit fractions. Take a minute to look at how Clare, Andre, and Diego have partitioned their number lines into fourths.”
  • 1–2 minutes: quiet think time

Activity

  • “Work with your partner to decide whose partitioning makes the most sense to you and why.”
  • 3–5 minutes: partner work time
  • Monitor for students who can explain why Andre’s partitioning makes sense and why the others do not show fourths.

Student Facing

Three students are partitioning a number line into fourths. Their work is shown.

Clare’s number line:

Number line. Evenly spaced tick marks labeled zero, one, two with unlabeled tick marks in between.

Andre’s number line:

Number line. First tick mark, 0. Last tick mark, 2. Three unlabeled tick marks between 0 and 1.

Diego’s number line:

Number line. Evenly spaced tick marks labeled zero, one, and two, with 4 unlabeled tick marks between 0 and 1.

Whose partitioning makes the most sense to you? Explain your reasoning.

Two students talking.

Student Response

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Activity Synthesis

  • Ask students to share why Andre’s partitioning makes sense to them.
  • Consider asking:
    • “Did anyone think of Andre’s reasoning in a different way?”
    • “How do we know that Andre’s number line is partitioned into fourths?”
  • Ask students to explain why Clare and Diego’s partitioning does not show fourths.
  • “We learned that when you partition the number line, you have to pay attention to where 0 and 1 are and make sure to partition that into the right number of equal-length parts.”

Activity 2: Unit Fractions on the Number Line (20 minutes)

Narrative

The purpose of this activity is for students to partition the interval from 0 to 1 into equal parts to locate and label unit fractions. Students see number lines that vary in length, from 1 unit to 4 units, which provides an opportunity for them to practice accurately partitioning the unit on the number line, rather than the entire number line (MP6). Some number lines show numbers greater than one which gives students the opportunity to think about fractions greater than one even though they are not explicitly addressed in this lesson.

MLR8 Discussion Supports. During group work, invite students to take turns sharing their responses. Ask students to restate what they heard using precise mathematical language and their own words. Display the sentence frame: “I heard you say . . . .” Original speakers can agree or clarify for their partner.
Advances: Listening, Speaking
Engagement: Provide Access by Recruiting Interest. Leverage choice around perceived challenge. Invite students to select 6 out of 9 number lines to partition and label.
Supports accessibility for: Organization, Attention, Social-emotional skills

Launch

  • Groups of 2
  • “Now that we’ve thought about some common mistakes about partitioning number lines, you are going to have a chance to partition number lines to locate and label unit fractions.”

Activity

  • “Work independently to partition each number line and locate and label each fraction.”
  • 3–5 minutes: independent work time
  • “Now, share how you partitioned each number line and where you located and labeled each fraction with your partner.”
  • “Be sure to share tips on how you partitioned or ask for tips for any of the partitions that were challenging.”
  • 3–5 minutes: partner discussion
  • Monitor for students who disagree on how to partition one of the number lines.

Student Facing

Partition each number line. Locate and label each fraction.

  1. \(\frac{1}{4}\)

    Number line. Tick marks labeled zero and one.
  2. \(\frac{1}{8}\)

    Number line. 2 tick marks, 0 and 1.
  3. \(\frac{1}{3}\)

    Number line. Tick marks labeled zero and one.
  4. \(\frac{1}{6}\)

    Number line. 0 to 1. First tick mark, 0. Last tick mark, 1.
  5. \(\frac{1}{2}\)

    Number line. 0 to 4 by ones. Evenly spaced tick marks. First tick mark, 0. Last tick mark, 4.
  6. \(\frac{1}{4}\)

    Number line. Evenly spaced tick marks labeled 0, 1, and 2.
  7. \(\frac{1}{8}\)

    Number line. Scale 0 to 4 by ones. Evenly spaced tick marks. First tick mark, 0. Last tick mark, 4.
  8. \(\frac{1}{3}\)

    Number line. Evenly spaced tick marks labeled 0, 1, 2, 3.
  9. \(\frac{1}{6}\)

    Number line. Evenly spaced tick marks labeled 0, 1, and 2.

Student Response

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Advancing Student Thinking

If students create the same number of tick marks as the denominator or partition the entire number line instead of the interval between 0 and 1, consider asking:
  • “Tell me about how you partitioned your number line.”
  • “What did we learn in the last activity about how to partition number lines?”

Activity Synthesis

  • “Were there any number lines that you and your partner were not sure how to partition or disagreed about? How did you resolve your confusion or disagreement?” (We weren’t sure how to partition the number line that goes up to 4 when we were locating \(\frac{1}{2}\). We talked together about partitioning just the space from 0 to 1 into half.)
  • Consider asking: “What was different about partitioning, locating, and labeling fractions on number lines with numbers greater than 1 than on number lines that just go up to 1?” (You have to be careful to just partition the one whole, not the whole number line.)
  • Display the same unit fraction on a number line with length 1 and length 2, such as:
Number line.
Number line.
  • “What do you notice?” (The top number line just has 0 to 1. The bottom number line has the 0 to 2. The number 1 is located in the same place on both number lines. The number \(\frac{1}{6}\) is located in the same place on both number lines.)
  • “The location of any number on the number line doesn’t change just because we extend the number line. The number \(\frac{1}{6}\) is located between 0 and 1 whether the number line goes up to 1 or it goes up to another number.”

Lesson Synthesis

Lesson Synthesis

Display an example of each of the fraction representations used so far, such as:
Diagram.
Diagram. Rectangle partitioned into 4 equal parts labeled one fourth. One part shaded.

Number line.

“Today we used our knowledge of unit fractions and the number line to locate unit fractions on the number line.”

“We have seen unit fractions represented several ways now. How would you describe a unit fraction to a friend? Use examples from these representations if it helps you.” (When you split a whole into equal parts, a unit fraction is one of those parts. Here we see all these representations show that the whole is split into four equal parts. One fourth is one of those parts. For diagrams, you see the size of one part. On the number line you show the number at the end of the first part.)

“What is particularly helpful for you to remember when you are locating unit fractions on the number line?” (I need to partition the whole, which is the whole shape, the strip, or the space between 0 and 1, into the number of equal parts given by the number on the bottom part of the fraction. Then I can label the end of one of those parts at the unit fraction I am looking for.)

Cool-down: Locate and Label (5 minutes)

Cool-Down

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