Homework Answers
Add Answer to:
A rectangular box, open at the top, is to have a volume of 1,728 cubic inches. Find the dimension...
19. (13.9) An open rectangular box is to be con- structed with a volume of 8 cubic feet. If the m...
19. (13.9) An open rectangular box is to be con- structed with a volume of 8 cubic feet. If the material for the bottom of the box costs twice as much as the material for the sides, what dimensions should the box have so as to minimize the cost?
19. (13.9) An open rectangular box is to be con- structed with a volume of 8 cubic feet. If the material for the bottom of the box costs twice as much...
A rectangular box with a volume of 320 cubic feet is to be constructed with a...
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?
3) You are constructing a 12 cubic feet box that is open at the top. The...
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.
(1 point) Find the most economical dimensions of a closed rectangular box of volume 9 cubic units if the cost of the ma...
(1 point) Find the most economical dimensions of a closed rectangular box of volume 9 cubic units if the cost of the material per square unit for () the top and bottom is 7, (ii) the front and back is 3 and (ii) the other two sides is 8 Vertical edge length - Horizontal front and back edge length- Horizontal side edge length
(1 point) Find the most economical dimensions of a closed rectangular box of volume 9 cubic units...
A trash company is designing an open-top, rectangular container that will have a volume of 320...
A trash company is designing an open-top, rectangular container that will have a volume of 320 ft cubed. The cost of making the bottom of the container is $5 per square foot, and the cost of the sides is $4 per square foot. Find the dimensions of the container that will minimize total cost. Find LxWxH.
A trash company is designing an open-top, rectangular container that will have a volume of 1715...
A trash company is designing an open-top, rectangular container that will have a volume of 1715 ft. The cost of making the bottom of the container is $5 per square foot, and the cost of the sides is $4 per square foot. Find the dimensions of the container that will minimize total cost. LxWxH=ftxfxft
A rectangular box is to have a volume of 20 cubic metres. The mate-rial used for...
A rectangular box is to have a volume of 20 cubic metres. The mate-rial used for the sides costs $1 per square metre, the material for thebottom costs $2 per square metre, and the material for the top costs$3 per square metre. What are the dimensions of the cheapest box? Using Multivariable Calculus/Second Derivative Test/Hessian Matrix xyz=20
A rectangular storage container with an open top is to have a volume of 10 m3....
A rectangular storage container with an open top is to have a volume of 10 m3. The length of this base is twice the width. Material for the base costs $15 per square meter. Material for the sides costs $9 per square meter. Find the cost of materials for the cheapest such container. (Round your answer to the nearest cent.)
Question 10 A closed rectangular box with a volume of 108ft 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 cylinder shaped can needs to be constructed to hold 600 cubic centimeters of soup. The...
A cylinder shaped can needs to be constructed to hold 600 cubic centimeters of soup. The material for the sides of the can costs 0.04 cents per square centimeter. The material for the top and bottom of the can need to be thicker, and costs 0.06 cents per square centimeter. Find the dimensions for the can that will minimize production cost. Helpful information: h : height of can, r : radius of can Volume of a cylinder: V = arh...
19. (13.9) An open rectangular box is to be con- structed with a volume of 8 cubic feet. If the material for the bottom of the box costs twice as much as the material for the sides, what dimensions should the box have so as to minimize the cost?
19. (13.9) An open rectangular box is to be con- structed with a volume of 8 cubic feet. If the material for the bottom of the box costs twice as much...
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.
(1 point) Find the most economical dimensions of a closed rectangular box of volume 9 cubic units if the cost of the material per square unit for () the top and bottom is 7, (ii) the front and back is 3 and (ii) the other two sides is 8 Vertical edge length - Horizontal front and back edge length- Horizontal side edge length
(1 point) Find the most economical dimensions of a closed rectangular box of volume 9 cubic units...
A trash company is designing an open-top, rectangular container that will have a volume of 1715 ft. The cost of making the bottom of the container is $5 per square foot, and the cost of the sides is $4 per square foot. Find the dimensions of the container that will minimize total cost. LxWxH=ftxfxft
A rectangular storage container with an open top is to have a volume of 10 m3. The length of this base is twice the width. Material for the base costs $15 per square meter. Material for the sides costs $9 per square meter. Find the cost of materials for the cheapest such container. (Round your answer to the nearest cent.)
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 cylinder shaped can needs to be constructed to hold 600 cubic centimeters of soup. The material for the sides of the can costs 0.04 cents per square centimeter. The material for the top and bottom of the can need to be thicker, and costs 0.06 cents per square centimeter. Find the dimensions for the can that will minimize production cost. Helpful information: h : height of can, r : radius of can Volume of a cylinder: V = arh...
Most questions answered within 3 hours.
-
An short-seller in Tesla is worried the latest management
earnings forecast is too aggressive and the...
asked 38 minutes ago -
Question 3 (1 point)
Fill in the blank. Speed Car Rental company found that the tire...
asked 38 minutes ago -
1. A copper wire is 26.61 cm long and weighs 1.265 g. The
density of copper...
asked 15 minutes ago -
Remember that a concept sketch consists of a sketch (or
series of sketches), labels, and complete...
asked 18 minutes ago -
on a newly discovered planet, the period of a pendulum with a
length of 2 m...
asked 20 minutes ago -
Why [M(CN)6] is not organometallic even it has metal
to carbon bond too
asked 26 minutes ago -
mstar electric has a bond issue outstanding that has a 20 year
life, a $1,000 par...
asked 34 minutes ago -
This is a Business Writing Question:
Common Types of Faulty Sentence Logic:
A. Mixed constructions
B....
asked 35 minutes ago -
Skinner asserts that science, and the common view of science, has
been tarnished. Explain his evidence...
asked 37 minutes ago -
A grocery store's receipts show that Sunday customer purchases
have a skewed distribution with a mean...
asked 44 minutes ago -
A 0.035 mol sample of a weak acid, HA, is dissolved in 437 mL of
water...
asked 55 minutes ago -
a sample of Ar gas has a volume of 6.30 L with an unknown
pressure. the...
asked 56 minutes ago