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(1 point) A gas station stores its gasoline in a tank...
(1 point) A gas station stores its gasoline in a tank under the ground. The tank...
(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...
The answer above is NOT correct. (1 point) A gas station stores its gasoline in a...
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...
Previous Problem List Next (1 point) A cone is to be built from stone so that...
Previous Problem List Next (1 point) A cone is to be built from stone so that it has height 10 feet and a base with radius 3. (The base of the cone will lie on the floor.) Suppose the density of the stone used to make the cone is 70 lb/ft?. Calculate the work required to build the cone from the ground up. Work = (include units) Preview My Answers Submit Answers Previous Problem List Next (1 point) Suppose the...
HW7: Problem 14 Previous Problem Problem List Next Problem (1 point) A gas station stores its...
HW7: Problem 14 Previous Problem Problem List Next Problem (1 point) A gas station stores its gasoline in a tank under the ground. The tank is a cylinderlying horizontally on its side. (In other words, the tank is not standing vertically on one of its flat ends.) If the radius of the cyinder is 0.5 meters, its length is 8 meters, and its top is 1 meter under the ground, find the total amount of work needed to pump the...
the top of a cylindrical tank for gasoline is set below ground level. The axis of...
the top of a cylindrical tank for gasoline is set below ground level. The axis of the tank is horizontal and its crainter is 8 ft and its length is 15 Rt. Let e denste the density of gasoline (approx 42 lb/sts) i) Find a definite integred for the work done to purs the entire entents of a fall tank to a height of 4 ft above ground level. (Dout evelunte integrad) ii) Find a definite integred for the total...
(1 point) A tank in the shape of an inverted right circular cone has height 5...
(1 point) A tank in the shape of an inverted right circular cone has height 5 meters and radius 2 meters. It is filled with 4 meters of hot chocolate. Find the work required to empty the tank by pumping the hot chocolate over the top of the tank. The density of hot chocolate is 8 = 1010 kg/m3. Your answer must include the correct units. Work =
A tank containing oil is in the shape of a downward-pointing cone with its vertical axis perpendicular to ground level (See a picture of the tank ). Assume that the height of the tank is ℎ=8 feet, the...
A tank containing oil is in the shape of a downward-pointing cone with its vertical axis perpendicular to ground level (See a picture of the tank ). Assume that the height of the tank is ℎ=8 feet, the circular top of the tank has radius r=4 feet, and that the oil inside the tank weighs 30 pounds per cubic foot. How much work,
Problem 4. A cylindrical tank laying on its side is buried under the ground so that...
Problem 4. A cylindrical tank laying on its side is buried under the ground so that the top of it is 15 feet below ground. The tank is 12 feet long and has a radius of 5 feet. The tank is filled with gasoline which has a density of 42 pounds per cubic foot. Write a Riemann sum to approximate the work required to empty the tank. Then pass to a limit and find the work that would be required.
The conical tank (inverted – think of an ice cream cone) with height of 5 ft...
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).
(10 pts) 2. The conical tank (inverted – think of an ice cream cone) with height...
(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).
(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...
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...
Previous Problem List Next (1 point) A cone is to be built from stone so that it has height 10 feet and a base with radius 3. (The base of the cone will lie on the floor.) Suppose the density of the stone used to make the cone is 70 lb/ft?. Calculate the work required to build the cone from the ground up. Work = (include units) Preview My Answers Submit Answers Previous Problem List Next (1 point) Suppose the...
HW7: Problem 14 Previous Problem Problem List Next Problem (1 point) A gas station stores its gasoline in a tank under the ground. The tank is a cylinderlying horizontally on its side. (In other words, the tank is not standing vertically on one of its flat ends.) If the radius of the cyinder is 0.5 meters, its length is 8 meters, and its top is 1 meter under the ground, find the total amount of work needed to pump the...
the top of a cylindrical tank for gasoline is set below ground level. The axis of the tank is horizontal and its crainter is 8 ft and its length is 15 Rt. Let e denste the density of gasoline (approx 42 lb/sts) i) Find a definite integred for the work done to purs the entire entents of a fall tank to a height of 4 ft above ground level. (Dout evelunte integrad) ii) Find a definite integred for the total...
(1 point) A tank in the shape of an inverted right circular cone has height 5 meters and radius 2 meters. It is filled with 4 meters of hot chocolate. Find the work required to empty the tank by pumping the hot chocolate over the top of the tank. The density of hot chocolate is 8 = 1010 kg/m3. Your answer must include the correct units. Work =
Problem 4. A cylindrical tank laying on its side is buried under the ground so that the top of it is 15 feet below ground. The tank is 12 feet long and has a radius of 5 feet. The tank is filled with gasoline which has a density of 42 pounds per cubic foot. Write a Riemann sum to approximate the work required to empty the tank. Then pass to a limit and find the work that would be required.
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).
(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).
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