A cylinder shaped can needs to be constructed to hold 600 cubic centimeters of soup. The material for the sides of the can costs 0.04 cents per square centimeter. The material for the top and bottom of the can need to be thicker, and costs 0.07 cents per square centimeter. Find the dimensions for the can that will minimize production cost. Helpful information: h:height of can, r: radius of can Volume of a cylinder: V = ar?h Area of the sides: A = 2rh Area of the top/bottom: A = ar² To minimize the cost of the can: Radius of the can: Height of the can: Minimum cost: cents

A cylinder shaped can needs to be constructed to hold 600 cubic centimeters of soup. The material for the sides of the can costs 0.04 cents per square centimeter. The material for the top and bottom of the can need to be thicker, and costs 0.07 cents per square centimeter. Find the dimensions for the can that will minimize production cost. Helpful information: h:height of can, r: radius of can Volume of a cylinder: V = ar?h Area of the sides: A = 2rh Area of the top/bottom: A = ar² To minimize the cost of the can: Radius of the can: Height of the can: Minimum cost: cents

Mathematics For Machine Technology

8th Edition

ISBN:9781337798310

Author:Peterson, John.

Publisher:Peterson, John.

Chapter63: Volumes Of Pyramids And Cones

Section: Chapter Questions

Problem 26A: The container is in the shape of a frustum of a right circular cone. The smaller base area is 426...

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