6. A closed-top, square based container is to be constructed with a volume of 750 cubic feet. The customer's needs necessitate using materials costing $4 per square foot for the bottom of the container, $2 per square foot for the top, and $4 per square foot for the sides. a) Set up any relations needed and use them to construct a single-variable function for the total cost of the container. b) Use your function and single-variable derivative techniques to find the dimensions of the container and the minimum total cost.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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6. A closed-top, square based container is to be constructed with a volume of 750 cubic feet. The
customer's needs necessitate using materials costing $4 per square foot for the bottom of the container, $2
per square foot for the top, and $4 per square foot for the sides.
a) Set up any relations needed and use them to construct a single-variable function for the total cost of
the container.
b) Use your function and single-variable derivative techniques to find the dimensions of the container and
the minimum total cost.
Transcribed Image Text:6. A closed-top, square based container is to be constructed with a volume of 750 cubic feet. The customer's needs necessitate using materials costing $4 per square foot for the bottom of the container, $2 per square foot for the top, and $4 per square foot for the sides. a) Set up any relations needed and use them to construct a single-variable function for the total cost of the container. b) Use your function and single-variable derivative techniques to find the dimensions of the container and the minimum total cost.
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