AC

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Activity 3.6.2.

A soup can in the shape of a right circular cylinder is to be made from two materials. The material for the side of the can costs $0.015 per square inch and the material for the lids costs $$0.027$ per square inch. Suppose that we desire to construct a can that has a volume of 16 cubic inches. What dimensions minimize the cost of the can?

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(a)

Draw a picture of the can and label its dimensions with appropriate variables.

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(b)

Use your variables to determine expressions for the volume, surface area, and cost of the can.

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(c)

Determine the total cost function as a function of a single variable. What is the domain on which you should consider this function?

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(d)

Find the absolute minimum cost and the dimensions that produce this value.