[size=150]A cylinder and cone have the same height and radius. The height of each is 5 cm, and the radius is 2 cm. Calculate the volume of the cylinder and the cone.[/size]

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[/img][br]What is the volume of a cylinder that has the same base area and the same height?

What are the values of the height and radius in centimeters?[br]

There are 10 people on the team. Do they save money if they buy an extra shirt? Explain your reasoning.

What is the slope of the graph between 0 and 10? What does it mean in the story?

What is the slope of the graph between 11 and 15? What does it mean in the story?

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[/img]

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[/img]

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