A closed rectangular box is to be constructed with a base that is twice as long...

Find the maximum volume that a rectangular box can have if the length is twice the...

Find the maximum volume that a rectangular box can have if the length is twice the width, and the total surface area is 12 square feet. Include diagram. Recall the surface area means the sum of the areas of all the sides, top, and bottom of the box

A closed three dimensional box is to be constructed in such a way that its volume...

A closed three dimensional box is to be constructed in such a way that its volume is 4500 cm cubed. It is also specified that the length of the base is 3 times the width of the base. Find the dimensions of the box that satisfies these conditions and has the minimum possible surface area.

A rectangular box is to have a square base and a volume of 16 ft3. If...

A rectangular box is to have a square base and a volume of 16 ft3. If the material for the base costs $0.14/ft2, the material for the sides costs $0.06/ft2, and the material for the top costs $0.10/ft2, determine the dimensions (in ft) of the box that can be constructed at minimum cost. (Refer to the figure below.) A closed rectangular box has a length of x, a width of x, and a height of y.

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.

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.

Minimizing Packaging Costs A rectangular box is to have a square base and a volume of...

Minimizing Packaging Costs A rectangular box is to have a square base and a volume of 20 ft3. If the material for the base costs $0.28/ft2, the material for the sides costs $0.10/ft2, and the material for the top costs $0.22/ft2, determine the dimensions (in ft) of the box that can be constructed at minimum cost. (Refer to the figure below.) A closed rectangular box has a length of x, a width of x, and a height of y. x...

An open-top rectangular box is being constructed to hold a volume of 300 in3. The base...

An open-top rectangular box is being constructed to hold a volume of 300 in3. The base of the box is made from a material costing 8 cents/in2. The front of the box must be decorated, and will cost 12 cents/in2. The remainder of the sides will cost 2 cents/in2. Find the dimensions that will minimize the cost of constructing this box. Front width: _______ in. Depth: ________ in. Height: ________ in.

rectangular tank with a square​ base, an open​ top, and a volume of 8788 ft^3 is...

rectangular tank with a square​ base, an open​ top, and a volume of 8788 ft^3 is to be constructed of sheet steel. Find the dimensions of the tank that has the minimum surface area.

A large shipping crate is to be constructed in a form of a rectangular box with...

A large shipping crate is to be constructed in a form of a rectangular box with a square base. It is to have a volume of 441 cubic feet. The material for the base of the crate is steel that costs $6 per square foot, the rest of the crate is constructed out of wood. The wood for the top of the crate is less expensive at $3 per square foot and the sides will be constructed from the wood...

A rectangular box is to have a square base and a volume of 20 ft3. If...

A rectangular box is to have a square base and a volume of 20 ft3. If the material for the base costs $0.17/ft2, the material for the sides costs $0.06/ft2, and the material for the top costs $0.13/ft2, (a) determine the dimensions (in ft) of the box that can be constructed at minimum cost. (b) Which theorem did you use to find the answer?