3.4 Applied Optimization Activity 3.4.2. 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? a. Draw a picture of the can and label its dimensions with appropriate variables. b. Use your variables to determine expressions for the volume, surface area, and cost of the can. c. Determine the total cost function as a function of a single variable. What is the domain on which you should consider this function? d. Find the absolute minimum cost and the dimensions that produce this value.
3.4 Applied Optimization Activity 3.4.2. 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? a. Draw a picture of the can and label its dimensions with appropriate variables. b. Use your variables to determine expressions for the volume, surface area, and cost of the can. c. Determine the total cost function as a function of a single variable. What is the domain on which you should consider this function? d. Find the absolute minimum cost and the dimensions that produce this value.
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter9: Systems Of Equations And Inequalities
Section9.4: Linear Programming
Problem 23E
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3.4 Applied Optimization
Activity 3.4.2. 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?
a. Draw a picture of the can and label its dimensions with appropriate variables.
b. Use your variables to determine expressions for the volume, surface area, and cost of the can.
c. Determine the total cost function as a function of a single variable. What is the domain on which
you should consider this function?
d. Find the absolute minimum cost and the dimensions that produce this value.
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