Priya is sharing 24 apples equally with some friends. She uses division to determine how many people can have a share if each person gets a particular number of apples. For example, [math]24\div4=6[/math] means that if each person gets 4 apples, then 6 people can have apples. Here are some other calculations:[br][br][math]24\div4=6[/math] [math]24\div2=12[/math] [math]24\div1=24[/math] [math]24\div\frac{1}{2}=?[/math][br][br]Priya thinks the “?” represents a number less than 24. Do you agree? Explain or show your reasoning.[br]
In the case of [math]24\div\frac{1}{2}=?[/math], how many people can have apples?
[img]data:image/png;base64,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[/img][br][br]Use the ruler to find [math]1\div\frac{1}{10}[/math] and [math]4\div10[/math].
What calculation did you do each time?
[br][img]data:image/png;base64,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[/img][br][br]Use this pattern to find [math]18\div\frac{1}{10}[/math].
Explain how you could find [math]4\div\frac{2}{10}[/math] and [math]4\div\frac{8}{10}[/math].
[math]5\div\frac{1}{10}[/math]
[math]5\div\frac{3}{10}[/math]
[math]5\div\frac{9}{10}[/math]
Use the fact that [math]2\frac{1}{2}\div\frac{1}{8}=20[/math] to find [math]2\frac{1}{2}\div\frac{5}{8}[/math]. Explain or show your reasoning.
Consider the problem: It takes one week for a crew of workers to pave kilometer of a road. At that rate, how long will it take to pave 1 kilometer?[br][br]Write a multiplication equation and a division equation to represent the question. Then find the answer and show your reasoning.
A box contains [math]1\frac{3}{4}[/math] pounds of pancake mix. Jada used [math]\frac{7}{8}[/math] pound for a recipe. What fraction of the pancake mix in the box did she use? Explain your reasoning. Draw a diagram, if needed.