a rectangular box with no top and six compartments is to be made to hold a...

Show your complete solution. 1. Use Lagrange Multiplier to determine the dimensions of a rectangular box,...

Show your complete solution. 1. Use Lagrange Multiplier to determine the dimensions of a rectangular box, open at the top, having a volume of 32 cubic feet and requiring the least amount of material for its construction.

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.

An open box is to be made from a rectangular piece of paper. The paper measures...

An open box is to be made from a rectangular piece of paper. The paper measures 18 inches by 16 inches. You need to cut the corners out of the paper to make the box. What is the maximum volume of the box (round to the nearest 5? (Hint you will need to use the quadratic formula to solve 360 cubic inches 375 cubic inches 350 cubic inches 200 cubic inches

Let x,y,z denote the dimensions of a rectangular box open at top. If the function V(x,y,z)=a...

Let x,y,z denote the dimensions of a rectangular box open at top. If the function V(x,y,z)=a gives the volume, where a= 24,  find the minimum amount  of material required for its construction.

An open rectangular box (no top) is formed with a square base and rectangular sides so...

An open rectangular box (no top) is formed with a square base and rectangular sides so that the total volume enclosed is 475 cu. ft. What is the smallest amount of material (area) that can form such a box?

A student makes a rectangular box subject to following conditions. i) The top of the box...

A student makes a rectangular box subject to following conditions. i) The top of the box is open, so no material is used for the top. ii) Base of the box is a square and constructed by a material which costs A TL per unit square. iii) The four sides of the box are constructed by a material which costs 3 TL per unit square. iv) The total cost of the box does not exceed C TL. (Hint: Answer does...

a rectangular box with an open top and one partition is to be constructed from 288...

a rectangular box with an open top and one partition is to be constructed from 288 inches of cardboard.Find the dimensions that result in a box with largest possible volume.

A rectangular box with an open top is to be made from a 13 -in.-by- 48...

A rectangular box with an open top is to be made from a 13 -in.-by- 48 -in. piece of cardboard by removing small squares of equal size from the corners and folding up the remaining flaps. What should be the size of the squares cut from the corners so that the box will have the largest possible volume?

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

You have been asked to design a closed rectangular box that holds a volume of 25...

You have been asked to design a closed rectangular box that holds a volume of 25 cubic centimeters while minimizing the cost of materials, given that the material used for the top and bottom of the box cost 4 cents per square centimeter, and the material used for sides cost 9 cents per square centimeter. Find the dimensions of this box in terms of variables L, W, and H.