A spherical tank with radius 2m is half full. Set up, but DO NOT evaluate, an...

Consider a hemispherical tank with a radius of 3 meters that is resting upright on its...

Consider a hemispherical tank with a radius of 3 meters that is resting upright on its curved side. Using 9.8 m/s^2 for the acceleration due to gravity and 1,000 kg/m^3 as the density of water, Set up the integral for the work required to pump the water out of the tank if: (a) the tank is full of water and it is being pumped out of a 1-meter long vertical spout at the top of the tank. (b) the tank...

A tank has the shape of a hemisphere (bottom half of the sphere) with radius 6m....

A tank has the shape of a hemisphere (bottom half of the sphere) with radius 6m. It is filled with water to a height of 4m. The spout is located 1m above the tank. Find the work required to pump the water out of the spout.

A tank in the shape of a sphere with radius 4 ft. is half full of...

A tank in the shape of a sphere with radius 4 ft. is half full of a liquid weighing 82 lbs./ft3. Find the work done in pumping the liquid up, then to, then out of a spigot 2 ft. in length located at the very top of the tank.

Compute the work required to drain, from the top, a cylindrical water tank, with height =...

Compute the work required to drain, from the top, a cylindrical water tank, with height = 2m and radius = 1m, which is full of water.

A spherical tank of radius 10 meters is completely full of liquefied petroleum gas. All the...

A spherical tank of radius 10 meters is completely full of liquefied petroleum gas. All the petroleum must be used emptied out of the tank and converted to alkylate. Compute the work needed to push all the petroleum out of the tank and out a 4 meter spout out of the top of the sphere. Liquefied petroleum gas has density 495 kg/m^3

(Integration Application) A water tank is shaped like an inverted cone with a height 2 meters...

(Integration Application) A water tank is shaped like an inverted cone with a height 2 meters and top radius 6 meters is full of water. Set up a Riemann Sum and an Integral to model the work that is required to pump the water to the level of the top of the tank? No need to integrate here. (Note that density of water is 1000 kg/m3 ). RIEMANN SUM ______________________________________________ INTEGRAL____________________________________________________ Provide an explanation as to the difference of the...

A triangular tank with height 3 meters, width 4 meters and length 8 meters is full...

A triangular tank with height 3 meters, width 4 meters and length 8 meters is full of water. How much work is required to pump the water out through a spout 2.5 meter above the top of the tank? (The density of water is approximately 1000 kg m3 .)

A hemispherical bowl with a radius of 6 feet is full of water. If the density...

A hemispherical bowl with a radius of 6 feet is full of water. If the density of water is 62.5 lb/ft^3 , how much work is required to pump all the water out of the outlet at the top of the tank?

A spherical tank of radius 4 ft is being filled with water at the hole in...

A spherical tank of radius 4 ft is being filled with water at the hole in the base. How much work is required to fill the tank with water through a hole in the base when the water source is at the base? (The weight-density of water is 62.4 pounds per cubic foot.)

A cylindrical tank is sitting horizontally. The tank has radius 5 ft and has length 8...

A cylindrical tank is sitting horizontally. The tank has radius 5 ft and has length 8 ft. If the tank is half-filled with water, how much work is required to pump out all the water from the tank? The density of water is 62.4 lb/ft3 . Note: The gravitation constant g should NOT appear in your calculation. The last part is very important, I am not sure how to do this problem in the way it is asking. Please leave...