A tank is full of water. Find the work required to pump the water out of...

Calculate the work (in joules) required to pump all of the water out of a full...

Calculate the work (in joules) required to pump all of the water out of a full tank. The density of water is 1000 kilograms per cubic meter. Assume the tank (b) is shaped like a horizontal cylinder of radius R and height H where the spout is connected directly to the top of the tank.

Calculate the work (in joules) required to pump all of the water out of a full...

Calculate the work (in joules) required to pump all of the water out of a full tank. The density of water is 1000 kilograms per cubic meter. Assume the tank (a) is shaped like an inverted cone of radius 5 meters and height 10 meters where the spout is connected to a 2 meter tube extending vertically above the tank. (b) is shaped like a horizontal cylinder of radius R and height H where the spout is connected directly to...

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 tank is is half full of oil that has a density of 900kg/m3. Find the...

A tank is is half full of oil that has a density of 900kg/m3. Find the work W required to pump the oil out of the spout. (Use 9.8 for g and 3.14 for . Round your answer to three significant digits.) r= 11.4 h= 5.7

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 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.

You have a spherical water tank that is exactly half-full. In order to empty the tank,...

You have a spherical water tank that is exactly half-full. In order to empty the tank, the water must be sent through a spout at the top that extends 2 meters above the top of the tank. The radius of the tank is 9 meters. How much work is required to empty the tank? Include every step and write your solution out very clearly.

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 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 .)

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...