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

A conical container of radius 6 ft and height 24 ft is filled to a height...

A conical container of radius 6 ft and height 24 ft is filled to a height of 22 ft with a liquid weighing 62.4 lb/ft3. How much work will it take to pump the liquid to a level of 2 ft above the​ cone's rim?

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 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.)

an inverted right circular gasoline tank of radius 2 ft and height 8ft is buried in...

an inverted right circular gasoline tank of radius 2 ft and height 8ft is buried in the ground so that the circular top is 1 f below the ground (parallel to the ground). Howw much work (in ft-lbs) is required to pump the gasoline occupying the top foot of the tank to aheight 2ft above the ground if the tank id full. (ignore the water the ends in the hose from the pumping process aftertop foot is done being pumped...

How do I find the gravitation force, or weight, of a 1-inch thick cylindrical steel tank...

How do I find the gravitation force, or weight, of a 1-inch thick cylindrical steel tank that's submerged underwater given the weight density of steel to be 500 lb/ft^3? The radius is 5 ft and the length is 15 ft.

a cylindrical tank or radius 2 meters and height 7 meters is filled with water to...

a cylindrical tank or radius 2 meters and height 7 meters is filled with water to a depth of 4 meters. how much work does it take to pump all the water over the top edge of the tank?

A hemispherical tank of water (radius 10 ft) is being pumped out. Find the work done...

A hemispherical tank of water (radius 10 ft) is being pumped out. Find the work done in lowering the water level from 2 feet below the top of the tank to 4 feet below the tank given that the pump is placed a) at the top of the tank and b) the pump is placed 3 feet above the top of the tank. Clearly indicate how force and distance are represented and indicate where the 0 position is on the...

A tank of water is 15 feet long and has a cross section in the shape...

A tank of water is 15 feet long and has a cross section in the shape of an equilateral triangle with sides 2 feet long (point of the triangle points directly down). The tank is filled with water to a depth of 9 inches. Determine the amount of work needed to pump all of the water to the top of the tank. Assume that the density of water is 62 lb/ft3.

A reservoir in the shape of an inverted cone is filled to the top with water...

A reservoir in the shape of an inverted cone is filled to the top with water of density 62.4 lb/ft^3. The radius of the reservoir is 35 ft and it is 40 ft deep. What is the work (ft-lb) required in pumping all of the water to a level of 15 ft above the top of the reservoir? Possible Answers: 25480000π 12980931π 22098083π 30982856π PLEASE SHOW DETAILED WORK CLEARLY!

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?