Question 10 A dosed rectangular box with a volume of 1626 is made from two kinds...
Question 10 A closed rectangular box with a volume of 108ft is made from two kinds of materials. The top and bottom are made of material costing 56 cents per square foot and the sides from material costing 14 cents per square foot. Use Lagrange multipliers to find the dimensions of the box so that the cost of materials is minimized. Assume that w<l. 1 = ft W = ft h= ft
A closed rectangular box with a volume of 1611 is made from two kinds of materials. The top and bottom are made of material conting 24 cents per square foot and the wes from material conting 12 cents per square foot. Use Lagrange multipliers to find the dimensions of the box so that the cost of materials is minimized Assume that w s1 W= 10
QUESTION 2 p. A closed triangular box with a volume of 16 f' is made from two kinds of materials. The top and bottom are made of material costing RM 10 per square foot and the sides of material costing RM 5 per square foot. Using Second Partial Test, find the dimensions of the box so that the cost of materials is minimized. (8 marks) QUESTION 2 p. A closed triangular box with a volume of 16 f' is made...
A rectangular box, open at the top, is to have a volume of 1,728 cubic inches. Find the dimensions of the box that will minimize the cost of the box if the material of the bottom costs 16 cents per square inch, and the material of the sides costs 1 cent per square inch. A rectangular box, open at the top, is to have a volume of 1,728 cubic inches. Find the dimensions of the box that will minimize the...
A rectangular box with a volume of 320 cubic feet is to be constructed with a square base and top. The cost per square foot for the bottom is 15 cents, for the top is 10 cents and for the sides is 2.5 cents. What dimensions will minimize the cost?
-US Help 1 System Announcements Anton, Calculus! Early Transcendentals, lle Start Time: 10:47 PM / Remaining: 79 min. ES Question 2 Find T() and N(t) at the given point. x = e' cost, y = e' sint, z = e'; t = 0 Enter the vector i as $7, the vector jas 7, and the vector k as T(0) = Edit N(0) = Edit US Anton, Calculus: Early Transcendentals, 11e Help | System Announcements tart Time: 10:47 PM / Remaining:...
A shipping company must design a closed rectangular shipping crate with a square base. The volume is 8748 ft". The material for the top and sides costs $3 per square foot and the material for the bottom costs $6 per square foot. Find the dimensions of the crate that will minimize the total cost of material. Answer 7 Points Keypad Keyboard Shortcuts ft by ft by ft
A rectangular box with a volume of 272 P13 is to be constructed with a square base and top. The cost per square foot for the bottom is 15€, for the top is 104, and for the sides is 2.54. What dimensions will minimize the cost? y What are the dimensions of the box? The length of one side of the base is The height of the box is (Round to one decimal place as needed.)
A shipping company must design a closed rectangular shipping crate with a square base. The volume is 29376 ft. The material for the top and sides costs $4 per square foot and the material for the bottom costs $13 per square foot. Find the dimensions of the crate that will minimize the total cost of material Answer 4 Points Keypad It by It by
3) You are constructing a 12 cubic feet box that is open at the top. The material used to construct the bottom costs $3 per square foot and the material used to construct the sides is $1 per square foot. What dimensions should you use to minimize the cost of the materials? Set up and solve using the LaGrange method.