Think of a situation with a question that can be represented by the equation [math]12\div\frac{2}{3}=?[/math]. Describe the situation and the question.

Trade descriptions with your partner, and answer your partner’s question.

We can write equations and draw a diagram to represent this situation.[br][math]5\cdot?=10[/math][br][math]10\div5=?[/math][br][img]data:image/png;base64,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[/img][br]This helps us see that each batch requires 2 cups of flour.[br][size=150][br][br]Write a multiplication equation and a division equation, draw a diagram, and find the answer.[br][/size][br]To make 4 batches of cupcakes, it takes 6 cups of flour. How many cups of flour are needed for 1 batch?[br]

[size=150]Write a multiplication equation and a division equation, draw a diagram, and find the answer.[br][/size][br]To make [math]\frac{1}{2}[/math] batch of rolls, it takes [math]\frac{5}{4}[/math] cups of flour. How many cups of flour are needed for 1 batch?

[size=150]Write a multiplication equation and a division equation, draw a diagram, and find the answer.[/size][br][br]Two cups of flour make [math]\frac{2}{3}[/math] batch of bread. How many cups of flour make 1 batch?

Tyler poured a total of 15 cups of water into 2 equal-sized bottles and filled each bottle. How much water was in each bottle?[br]Answer the question and write a multiplication equation and a division equation to represent the situation.

Kiran poured a total of 15 cups of water into equal-sized pitchers and filled [math]1\frac{1}{2}[/math] pitchers. How much water was in the full pitcher?[br]Answer the question and write a multiplication equation and a division equation to represent the situation.

It takes 15 cups of water to fill [math]\frac{1}{3}[/math] pail. How much water is needed to fill 1 pail?[br]Answer the question and write a multiplication equation and a division equation to represent the situation.

Priya’s class has adopted two equal sections of a highway to keep clean. The combined length is [math]\frac{3}{4}[/math] of a mile. How long is each section?[br]Answer the question and write a multiplication equation and a division equation to represent the situation.

Lin’s class has also adopted some sections of highway to keep clean. If [math]1\frac{1}{2}[/math] sections are [math]\frac{3}{4}[/math] mile long, how long is each section?[br]Answer the question and write a multiplication equation and a division equation to represent the situation.

A school has adopted a section of highway to keep clean. If [math]\frac{1}{3}[/math] of the section is [math]\frac{3}{4}[/math] mile long, how long is the section?[br]Answer the question and write a multiplication equation and a division equation to represent the situation.

How much of the diagram is colored in after step 2? Step 3? Step 10?

If you continue this process, how much of the tape diagram will you color?

Can you think of a different process that will give you a similar result? For example, color the first fifth instead of the middle third of each strip.