A cargo container in the shape of a rectangular box must have a volume of 480...

A rectangular box with a square base has a volume of 4 cubic feet. The material...

A rectangular box with a square base has a volume of 4 cubic feet. The material for the bottom of the box costs $3 per square foot, the top costs $2 per square foot, and the four sides cost $5 per square foot Find the critical number of the cost function.

A storage company must design a large rectangular container with a square base. The volume is...

A storage company must design a large rectangular container with a square base. The volume is 24576ft324576⁢ft3. The material for the top costs $12$⁢12 per square foot, the material for the sides costs $2$⁢2 per square foot, and the material for the bottom costs $12$⁢12 per square foot. Find the dimensions of the container that will minimize the total cost of material.

A rectangular box is to have a square base and a volume of 48 ft3. If...

A rectangular box is to have a square base and a volume of 48 ft3. If the material for the base costs 4 cents per square foot, material for the top costs 20 cents per square foot, and the material for the sides costs 16 cents per square foot, determine the dimensions of the square base (in feet) that minimize the total cost of materials used in constructing the rectangular box.

We are tasked with constructing a rectangular box with a volume of 14 cubic feet. The...

We are tasked with constructing a rectangular box with a volume of 14 cubic feet. The material for the top costs 8 dollars per square foot, the material for the 4 sides costs 2 dollars per square foot, and the material for the bottom costs 7 dollars per square foot. To the nearest cent, what is the minimum cost for such a box?

A rectangular box is to have a square base and a volume of 45 ft3. If...

A rectangular box is to have a square base and a volume of 45 ft3. If the material for the base costs 14 cents per square foot, material for the top costs 6 cents per square foot, and the material for the sides costs 6 cents per square foot, determine the dimensions of the square base (in feet) that minimize the total cost of materials used in constructing the rectangular box.

A rectangular box with a square base has a volume of 4 cubic feet. If x...

A rectangular box with a square base has a volume of 4 cubic feet. If x is the side length of the square base, and y is the height of the box, find the total cost of the box as a function of one variable The material for the bottom of the box costs $3 per square foot, the top costs $2 per square foot, and the four sides cost $5 per square foot. If x is the side length...

A rectangular box with a square base has a volume of 4 cubic feet. The material...

A rectangular box with a square base has a volume of 4 cubic feet. The material for the bottom of the box costs $3 per square foot, the top costs $2 per square foot, and the four sides cost $5 per square foot. (a) If x is the side length of the square base, and y is the height of the box, find the total cost of the box as a function of one variable. (b) Find the critical number...

A rectangular storage container with an open top is to have a volume of 28 cubic...

A rectangular storage container with an open top is to have a volume of 28 cubic meters. The length of its base is twice the width. Material for the base costs 14 dollars per square meter. Material for the sides costs 6 dollars per square meter. Find the cost of materials for the cheapest such container.

A rectangular bulk fruit storage container with an open top is to have a volume of...

A rectangular bulk fruit storage container with an open top is to have a volume of 10 cubic meters. The length of its base is twice the width. Material for the base costs $20 per square meter. Material for the sides will cost $9 per square meter. Find the cost of materials for the cheapest such container.

A rectangular box must have a volume of 2 cubic meters. The material for the base...

A rectangular box must have a volume of 2 cubic meters. The material for the base and top costs $ 2 per square meter. The material for the vertical sides costs $ 8 per square meter. (a) Express the total cost of the box in terms of the length (l) and width (w) of the base. C = $ (b) Find the dimensions of the box that costs least. length = meters width = meters height = meters