The empty cubical box shown in the figure has no top face; that is, the box...

A box is contructed out of two different types of metal. The metal for the top...

A box is contructed out of two different types of metal. The metal for the top and bottom, which are both square, costs $2 per square foot and the metal for the sides costs $2 per square foot. Find the dimensions that minimize cost if the box has a volume of 25 cubic feet. Length of base x= Height of side z=?

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 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

A box of volume 36 m3 with square bottom and no top is constructed out of...

A box of volume 36 m3 with square bottom and no top is constructed out of two different materials. The cost of the bottom is $40/m2 and the cost of the sides is $30/m2 . Find the dimensions of the box that minimize total cost. (Let s denote the length of the side of the square bottom of the box and h denote the height of the box.) (s, h) =

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 box with a square base and open top must have a volume of 108000 cm^3....

A box with a square base and open top must have a volume of 108000 cm^3. We wish to find the dimensions of the box that minimize the amount of material used. First, find a formula for the surface area of the box in terms of only x, the length of one side of the square base. [Hint: use the volume formula to express the height of the box in terms of x.] Simplify your formula as much as possible....

A box with a square base and open top must have a volume of 157216 cm3cm3....

A box with a square base and open top must have a volume of 157216 cm3cm3. We wish to find the dimensions of the box that minimize the amount of material used. First, find a formula for the surface area of the box in terms of only xx, the length of one side of the square base. [Hint: use the volume formula to express the height of the box in terms of xx.] Simplify your formula as much as possible....

A cubic box has a volume of 1.0 cubic meters and a mass of 2000 kg....

A cubic box has a volume of 1.0 cubic meters and a mass of 2000 kg. A crane’s cable holds up the box, initially with the box being submerged such that its top is 1.0 m below the surface of a pool of still water. At a constant rate, the box is lifted until its bottom is 1.0 m above the water. Sketch a graph of the force the crane cable exerts on the box versus distance for the center...

A manufacturer sends you 100m2 of material to construct a box (single layer, closed top). The...

A manufacturer sends you 100m2 of material to construct a box (single layer, closed top). The box must have a square base and be of maximum volume. Let sbe side length the base of the box, and hthe height of the box. a) Write an equation for the surface area covered by the material. b) Determine a formula for the volume V as a function of the side of s only. c) Determine the dimensions such that of the box...

We have to build a box that has no top and whose base length is five...

We have to build a box that has no top and whose base length is five times the base width. we have $1000 to buy materials to build this box. if the material for the sides cost $10 per square inch and the material for the bottom cost $15 per square inch determine the dimensions of the box that will have the greatest volume.