Lesson 11

Generate Equivalent Fractions

Warm-up: Number Talk: Something Times 8 (10 minutes)

Narrative

This Number Talk encourages students to look for structure in multiplication expressions and rely on properties of operations to mentally solve problems. Reasoning about products of whole numbers helps to develop students’ fluency.

Launch

  • Display one expression.
  • “Give me a signal when you have an answer and can explain how you got it.”
  • 1 minute: quiet think time

Activity

  • Record answers and strategy. 
  • Keep expressions and work displayed. 
  • Repeat with each expression.

Student Facing

Find the value of each expression mentally.

  • \(2 \times 8\)
  • \(6 \times 8\)
  • \(10 \times 8\)
  • \(12 \times 8\)

Student Response

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Activity Synthesis

  • “How did the earlier expressions help you find the value of the last expression?”
  • Consider asking:
    • “Did anyone have the same strategy but would explain it differently?”
    • “Did anyone approach the problem in a different way?”

Activity 1: Show Equivalence (20 minutes)

Narrative

The purpose of this activity is for students to use diagrams to reason about equivalence and reinforce their awareness of the relationship between fractions that are equivalent.

Students show that a shaded diagram can represent two fractions, such as \(\frac{1}{2}\) and \(\frac{4}{8}\), by further partitioning given parts or composing larger parts from the given parts. Unlike with the fraction strips, where different fractional parts are shown in rows and students could point out where and how they see equivalence, here students need to make additional marks or annotations to show equivalence.

In upcoming lessons, students will extend similar strategies to reason about equivalence on a number line—by partitioning the given intervals on a number lines into smaller intervals or by composing larger intervals from the given intervals.

In the first problem, students construct a viable argument in order to convince Tyler that \(\frac{4}{8}\) of the rectangle is shaded (MP3).

Action and Expression: Develop Expression and Communication. Synthesis: Identify connections between strategies that result in the same outcomes but use differing approaches.
Supports accessibility for: Memory, Visual-Spatial Processing

Launch

  • Groups of 2

Activity

  • “Work with your partner on the first problem. Discuss whether you agree with Jada and show your reasoning.”
  • 3–4 minutes: partner work time
  • Pause for a brief discussion. Invite students to share their responses and reasoning.
  • “Now, work independently on the rest of the activity.”
  • 5 minutes: independent work time
  • Monitor for the different strategies students use to show equivalence, such as:
    • drawing circles or brackets to show composing larger parts from the given parts
    • drawing lines to show new partitions
    • labeling parts of the fractions with two names
    • drawing a new diagram with different partitions but the same shaded amount
  • Identify students using different strategies to share during synthesis.

Student Facing

  1. The diagram represents 1.​​​​​​

    Diagram. Rectangle partitioned into 4 equal parts, 2 shaded.
    1. What fraction does the shaded part of the diagram represent?
    2. Jada says it represents \(\frac{4}{8}\). Tyler is not so sure.

      Do you agree with Jada? If so, explain or show how you would convince Tyler that Jada is correct. If not, explain or show your reasoning.

  2. Each diagram represents 1.

    1. Show that the shaded part of this diagram represents both \(\frac{1}{3}\) and \(\frac{2}{6}\).

      Diagram. Rectangle partitioned into 3 equal parts, 1 shaded.
    2. Show that the shaded part represents both \(\frac{6}{8}\) and \(\frac{3}{4}\).

      Diagram. Rectangle partitioned into 8 equal parts, 6 parts shaded.
    3. Show that the shaded part represents both \(\frac{6}{6}\) and \(\frac{2}{2}\).

      Diagram. Shaded rectangle.

Student Response

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Advancing Student Thinking

If students don’t explain how the pairs of fractions are equivalent, consider asking:

  • “What does it mean for fractions to be equivalent?”
  • “How could we show both fractions to determine if they are equivalent?”

Activity Synthesis

  • Select previously identified students to share their responses and reasoning. Display their work for all to see.
  • As students explain, describe the strategies students use to show equivalence. Ask if others in the class showed equivalence the same way.

Activity 2: More Than One Name (15 minutes)

Narrative

The purpose of this activity is for students to generate equivalent fractions, including for fractions greater than 1, given partially shaded diagrams. Student may use strategies from an earlier activity—partitioning a diagram into smaller equal parts, or making larger equal parts out of existing parts—or patterns they observed in the numerators and denominators of equivalent fractions (MP7).

MLR8 Discussion Supports. Students should take turns naming the equivalent fractions they came up with and explaining their reasoning to their partner. Display the following sentence frames for all to see: “I noticed _____ , so I thought . . . .” Encourage students to challenge each other when they disagree.
Advances: Speaking, Representing

Launch

  • Groups of 2
  • Display or draw a diagram with 2 fourths shaded:
    Diagram.
  • “Notice there's a 1 below the diagram. This is another way to show which part of the diagram represents 1.”
  • “What fractions can the shaded parts of the diagram represent?” (\(\frac{1}{2}, \frac{2}{4}, \frac{3}{6}, \frac{4}{8}\))

Activity

  • “Now write two fractions that you think represent the shaded parts of each diagram.”
  • 3–5 minutes: independent work time
  • “Discuss the names you came up with for each fraction with your partner. Be sure to share your reasoning for each fraction.”
  • 2–3 minutes: partner discussion
  • Monitor for students who make statements like:
    • The first diagram is \(\frac{4}{6}\), because 4 of the 6 equal parts are shaded. It's also \(\frac{2}{3}\) because every 2 sixths is 1 third and there are 3 thirds. Two of the 3 thirds are shaded.
    • The second diagram is \(\frac{2}{8}\) because 2 of the 8 equal parts are shaded. It's also \(\frac{1}{4}\) because every 2 eighths is 1 fourth, and 1 of the 4 fourths is shaded.

Student Facing

  1. Each diagram represents 1. Write two fractions to represent the shaded part of each diagram.

    1.  
      Diagram. Rectangle partitioned into 6 equal parts, 4 shaded.
    2.  
      Diagram. Rectangle partitioned into 8 equal parts, 2 of them shaded.
    3.  
      Diagram. Rectangle partitioned into 4 equal parts, all shaded.
  2. Here’s another diagram.

    Diagram. 2 rectangles partitioned into 2 equal parts. Total for each, 1. 3 of 4 parts shaded.
    1. What fraction does the shaded part of the diagram represent?
    2. Write another fraction that it represents.

Student Response

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Advancing Student Thinking

If students name a fraction, based only on the given partitions, consider asking:

  • “Tell me about how you named the fraction.”
  • “How could you use the diagram to find another way you could name the fraction?”

Activity Synthesis

  • Select students to share their strategies for writing multiple fractions for each diagram. Display the diagrams they marked or annotated.
  • “In what ways was the last diagram different than the first three?” (It shows 2 wholes. The shades parts were greater than 1.)
  • “Was your strategy for finding fractions for this diagram different from the first three? Why or why not?” (No, it still involved making smaller equal parts. Yes, I partitioned the first 1 whole and the second 1 whole separately.)
  • If no students mention \(\frac{12}{8}\) for the last diagram, ask, “Can you name another fraction other than \(\frac{3}{2}\) and \(\frac{6}{4}\)?”

Lesson Synthesis

Lesson Synthesis

“Today, we saw that the shaded parts of a diagram can be represented by multiple equivalent fractions.”

Display a diagram of labeled fraction strips from an earlier activity, and a couple of shaded diagrams that show equivalent fractions from this activity.

“How did we use the fraction strips to help us see and name equivalent fractions?” (We could see if some number of parts in one row is the same size as the parts in another row. The labels on the strips help us name the fractions that are equivalent.)

“How did the shaded diagrams in this activity help us see and name equivalent fractions?” (We could either partition the diagram into smaller equal parts, or put the parts together to make larger equal parts.)

Cool-down: Two Fraction Names for Each Diagram (5 minutes)

Cool-Down

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