Write a multiplication equation and a division equation that this diagram could represent.[br][br][img]data:image/png;base64,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[/img]

Write a multiplication equation and a division equation to represent this situation.

Use the multiplication equation to check your answer.

Kiran said that this diagram can show the solution to [math]16\div8=?[/math] or [math]16\div2=?[/math], depending on how we think about the equations and the “?”. Explain or show how Kiran is correct.[br][br][img]data:image/png;base64,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[/img][br]

Write a sentence describing a situation that could be represented by the equation [math]4\div1\frac{1}{3}=?[/math].

Noah said, “When you divide a number by a second number, the result will always be smaller than the first number.”[br][br]Jada said, “I think the result could be larger or smaller, depending on the numbers.”[br][br]Do you agree with either of them? Explain or show your reasoning below.

[list][*]Andre says, “I have $2.00, so I can afford 8 muffins.”[/*][*]Elena says, “I want to get 16 muffins, so I’ll need to pay $4.00."[/*][/list]Do you agree with either of them? Explain your reasoning.

44% is spent on housing.

23% is spent on food.

6% is spent on clothing.

17% is spent on transportation.

The rest is put into savings.