Find the work it would take to build a limestone pyramid with a square base with...

A Pyramid is 655 ft high (due to erosion, its current height is slightly less) and...

A Pyramid is 655 ft high (due to erosion, its current height is slightly less) and has a square base of side 5895 ft. Find the work needed to build the pyramid if the density of the stone is estimated at 168 lb/ft3.

Find the center of mass of a square base pyramid where the side length of the...

Find the center of mass of a square base pyramid where the side length of the base is 20 m, the height is 9 m, and the pyramid has constant mass density δ kg/m3.

Let W be the work (against gravity) required to build a pyramid with height 4m, a...

Let W be the work (against gravity) required to build a pyramid with height 4m, a square base of side length 4m, density of 600kg/m^3, and gravity 9.8m/s^2. Show that W = 1003520J

A right square pyramid has a height of 50 meters (from the center of the base...

A right square pyramid has a height of 50 meters (from the center of the base to the apex) and a base with sides 50 meters long. (a) Determine the volume of the pyramid. (b) Determine the surface area of the pyramid, not including the base. (a) Determine the volume of the pyramid. (b) Determine the surface area of the pyramid, not including the base.

A heat conductor has a shape of a pyramid. The base is square shaped, with sides...

A heat conductor has a shape of a pyramid. The base is square shaped, with sides 4 mm long, each. The height of the pyramid is 12 mm. The pyramid has been placed on a heating element with constant temperature 300°C. Heat is directed through the top of the pyramid so that the temperature at the height of 10 mm is 100 °C. Assuming the heating power and heat conductivity of the material remaining constant, compute the temperature of the...

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...

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 tank shaped like a cone pointing downward has height 9 feet and base radius 3...

A tank shaped like a cone pointing downward has height 9 feet and base radius 3 feet, and is full of water. The weight density of water is 62.4 lb/ft^3. Find the work required to pump all of the water out over the top of the tank.

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?

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...