A gas tank is a vertical cylinder. It has a radius of 1m, a
height of 4m and is 2m underground. How much work is work is
required to pump all of the gasoline in the tank up through a pump
that is 1m above the ground if gas has a density of 708 kg/m^3?
(Use 9.80 for acceleration)
A gas tank is a vertical cylinder. It has a radius of 1m, a height of...
All these answers are wrong (1 point) A gas station stores its gasoline in a tank under the ground. The tank is a cylinder lying horizontally on its side. (In other words, the tank is not standing vertically on one of its flat ends.) If the radius of the cylinder is 1 meter, its length is 8 meters, and its top is 5 meters under the ground, find the total amount of work needed to pump the gasoline out of...
(1 point) A gas station stores its gasoline in a tank under the ground. The tank is a cylinder lying horizontally on its side. (In other words, the tank is not standing vertically on one of its flat ends.) If the radius of the cylinder is 1 meter, its length is 5 meters, and its top is 3 meters under the ground, find the total amount of work needed to pump the gasoline out of the tank. (The density of...
A cylindrical shaped gas tank is 12 m tall with base radius to be 3 m. There is a spout on top of the tank with height 0.3 m. Suppose the tank is one-third full. Set up the integral for the work required to pump the gasoline out of the spout. Do NOT compute the integral. Suppose the gasoline density is p= 749 kg/m", and you may use the approximation g 10 m/s2 for gravity. (Requirements: You must show your...
The conical tank (inverted – think of an ice cream cone) with height of 5 ft and the top base radius of 3 ft is fully filled with gasoline weighing 42 lb/ft?. How much work does it take to pump the gas to the level 2 ft above the cone's rim? (Imagine the top of the tank is 2 ft below the ground and you want to pump gas to the ground level).
5 points WORK LIFT PROBLEM An inverted conical tank at a chemical plant has a base radius of 4 m and height of 3 m and is completely filled with liquid nitrogen, which has a density of 808.4 kg/m3. The Earth's gravitational constant is -9.8 m/s2. How much work is needed to pump all of the liquid nitrogen up through an outflow pipe that empties 3 meters above the top of the tank? (Note that the conical tank is opening...
(10 pts) 2. The conical tank (inverted – think of an ice cream cone) with height of 5 ft and the top base radius of 3 ft is fully filled with gasoline weighing 42 lb/ft?. How much work does it take to pump the gas to the level 2 ft above the cone's rim? (Imagine the top of the tank is 2 ft below the ground and you want to pump gas to the ground level).
(2) The work required to pump the fluid from a tank (between a units and b units above the bottom of a tank) of constant mass-density p out to a height h above the bottom of the tank is given by W- pg(cross-sectional area at y)(distance fluid at y needs to be lifted) dy where g is the acceleration due to gravity and y is the distance from bottom of the tank. Note: Water has a mass-density of p 10...
A water tank is shaped like a right, circular cylinder with height 6 ft and radius 3 ft. If the tank is filled to 1 ft below the top, find the work required to pump all of the water to the level of the top and let flow over the edge. The density of water is 62.5 lbs per cubic foot.
A spherical tank that has radius 5m with a spout of length 1m at the top of the tank is full of water. Find the work required to pump the water out of the spout.
The answer above is NOT correct. (1 point) A gas station stores its gasoline in a tank under the ground. The tank is a cylinder lying horizontally on its side. (In other words, the tank is not standing vertically on one of its flat ends.) If the radius of the cylinder is 0.5 meters, its length is 8 meters, and its top is 2 meters under the ground, find the total amount of work needed to pump the gasoline out...