The purpose of this activity is for students to notice structure in a series of diagrams and the expressions that represent them. They investigate how these expressions vary as the number of rows and columns in the diagram change. Students see how the diagram represents the multiplication expression and also how the diagram helps to find the value of the expression (MP7). Through repeated reasoning they also begin to see how to find the value of a product of any two unit fractions (MP8).

• “What do you know about the shaded regions of the diagrams?”
• Write a multiplication expression to represent the shaded region of each diagram. “How does each expression represent the shaded region of the diagram?”

• Display the diagrams from the student book.
• Select previously identified students to share.
• As students explain where they see the multiplication expression in each diagram, record the expressions under the diagram for all to see.
• Refer to the diagram that shows or .
• Display both expressions.
• “How does this diagram represent both of these expressions?” (It shows one half of one fourth shaded in and it also shows one fourth of one half shaded in.)
• Represent student explanations on the diagrams.
• “Why is the area of the shaded region getting smaller in each diagram?” (We are shading a smaller piece of each time.)
• Display:
  
  
  
  
• “These equations represent the diagrams. What patterns do you notice?” (They all have in them. The denominators in the first fractions go 2, 3, 4, 5. The denominators in the middle fractions are multiplication expressions, the denominators in the middle are all multiplied by 4, the denominator in the fraction that shows the value of the shaded piece goes up by 4 each time.)
• “How do the diagrams represent , , , ?” (The numerator tells us that there is 1 piece shaded and the denominator tells us the size of the piece. The denominator also tells us the rows and columns that the whole is divided into.)

The purpose of this activity is for students to use the structure of diagrams to calculate products of unit fractions. They also represent their work using an equation. As students become more familiar with this structure they may not need diagrams as a scaffold to find these products. Drawing their own diagrams, however, will also reinforce student understanding of how to calculate products of unit fractions.

This activity uses MLR1 Stronger and Clearer Each Time. Advances: Reading, Writing.

• Display:  and the corresponding diagram.
• “How does this equation represent the diagram?” (One fourth of one half is shaded which is the same as 1 piece of the whole square that is divided into 2 columns and 4 rows. So, one eighth of the whole square is shaded.)

MLR1 Stronger and Clearer Each Time

• “Share your explanation about how the last diagram represents with your partner. Take turns being the speaker and the listener. If you are the speaker, share your ideas and writing so far. If you are the listener, ask questions and give feedback to help your partner improve their work.”
• 3–5 minutes: structured partner discussion 
• Repeat with 2–3 different partners.
• If needed, display question starters and prompts for feedback.
  • “Can you give an example to help show . . . ?”
  • “Can you use the word _____ in your explanation?”
  • “The part that I understood best was . . . .”
• “Revise your initial draft based on the feedback you got from your partners.”
• 2–3 minutes: independent work time.