One inch is around [math]2\frac{11}{20}[/math] centimeters. 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[/img][br][br]How many centimeters long is 3 inches? Show your reasoning using the applet below.

What question can be answered by finding [math]10\div2\frac{11}{20}[/math] in this situation?

[size=150]A zookeeper is [math]6\frac{1}{4}[/math] feet tall. A young giraffe in his care is [math]9\frac{3}{8}[/math] feet tall.[br][/size][br]How many times as tall as the zookeeper is the giraffe?

What fraction of the giraffe’s height is the zookeeper’s height? 

[size=150]A rectangular bathroom floor is covered with square tiles that are [math]1\frac{1}{2}[/math] feet by [math]1\frac{1}{2}[/math] feet. The length of the bathroom floor is [math]10\frac{1}{2}[/math] feet and the width is [math]6\frac{1}{2}[/math] feet.[/size][br][br]How many tiles does it take to cover the length of the floor?

How many tiles does it take to cover the width of the floor?

[size=150]The Food and Drug Administration (FDA) recommends a certain amount of nutrient intake per day called the “daily value.” Food labels usually show percentages of the daily values for several different nutrients—calcium, iron, vitamins, etc.[/size][br][br]Consider the problem: In [math]\frac{3}{4}[/math] cup of oatmeal, there is [math]\frac{1}{10}[/math] of the recommended daily value of iron. What fraction of the daily recommended value of iron is in 1 cup of oatmeal?[br][br]Write a multiplication equation and a division equation to represent the question. Then find the answer and show your reasoning.[br]

What fraction of [math]\frac{1}{2}[/math] is [math]\frac{1}{3}[/math]? Draw a tape diagram to represent and answer the question. Use graph paper if needed.

Noah says, “There are [math]2\frac{1}{2}[/math] groups of [math]\frac{4}{5}[/math] in 2.” Do you agree with him? Draw a tape diagram to show your reasoning. Use graph paper, if needed.