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

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 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...

1 C. A reservoir in the shape of a straight circular cone is filled with water....

1 C. A reservoir in the shape of a straight circular cone is filled with water. If the tank height is 10 feet and the radius at the top is 6 feet, find the job done by pumping the water to the top edge of the tank. Find the work done by bobbing the water to a height of 10 feet above the top edge of the reservoir. Remember that the volume is equal to radio2x height. The density of...

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 gold brick measuring 4.6 ft by 2.4 ft by 8.1 ft is submerged in water....

A gold brick measuring 4.6 ft by 2.4 ft by 8.1 ft is submerged in water. The weight density of gold is 1,170 pounds per cubic foot and the weight density of the water is 64.5 pounds per cubic foo. What is the net force on the gold brick?

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...

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?

In your first project as the newest engineer to your team, you have been tasked with...

In your first project as the newest engineer to your team, you have been tasked with performing calculations related to a recently constructed water tower. The tower consists of a spherical tank the bottom of which is 30 ft above the ground and a pipe attached to the bottom of the tank that transports water from the ground to the tank. If the diameter of the spherical tank is 48 ft and the tank is being filled with freshwater having...

Suppose water is leaking from a tank through a circular hole of area Ah at its...

Suppose water is leaking from a tank through a circular hole of area Ah at its bottom. When water leaks through a hole, friction and contraction of the stream near the hole reduce the volume of water leaving the tank per second to cAh 2gh , where c (0 < c < 1) is an empirical constant. A tank in the form of a right-circular cone standing on end, vertex down, is leaking water through a circular hole in its...

. A conical tank of with radius 5 m and height 10 m is filled with...

. A conical tank of with radius 5 m and height 10 m is filled with water. Calculate the work against gravity required to pump water (with density 1000 kg/m3 ) through a spout of 1 meter in height located at the top of the tank.