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Water in a vertical cylindrical tank of height 29 it and radius 4 ft is to...
A cylindrical water tank has a radius of 2.8 feet and a height of 5.6 feet
A cylindrical water tank has a radius of 2.8 feet and a height of 5.6 feet. The water tank is filled to the top. If water can be pumped out at a rate o f36 cubic feet per minute, about how long will it take to empty the water tank? A.3 hours B. 2 hours C.4 minutes D. 1 minute
A water tank is shaped like a right, circular cylinder with height 6 ft and radius...
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 cylindrical tank (height h, radius r) is full to the brim of water and its...
A cylindrical tank (height h, radius r) is full to the brim of water and its top is open to the outside air. What expression describes the speed of fluid flowing out of a hole that is opened up at height h′ above the bottom of the tank?
A conical container of radius 6 ft and height 24 ft is filled to a height of 20 ft of a liquid weighing 62.4 lb/ft....
A conical container of radius 6 ft and height 24 ft is filled to a height of 20 ft of a liquid weighing 62.4 lb/ft. How much work will it take to pump the contents to the rim? How much work will it take to pump the liquid to a level of 4 ft above the cone's rim? The amount of work required to pump the liquid to the rim of the tank is ft-lb. (Round to the nearest whole...
3 ft, length L= 14 ft and height h = 4 ft (1 point) The trough...
3 ft, length L= 14 ft and height h = 4 ft (1 point) The trough in the figure below has width w (Click on the graph for a larger version.) If the trough is full of water, find the force of the water on a triangular end. (Use the density of water 62.4 lb/ft'.) Force Don't forget to enter units Find the work to pump all of the water over the top of the trough. Work Don't forget to...
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? Note: The weight-density of water is 9800 N Select the correct answer below: 985 kJ 2,463 kJ 4,926k 9,852 k)
A crude oil storage tank in the shape of a right cylinder of radius 4 ft...
A crude oil storage tank in the shape of a right cylinder of radius 4 ft and length 10 ft is buried in the ground in the horizontal position. If the top of the tank is 5 ft below the surface, find the work required to empty a full tank of oil weighing 50 lb/ft' by pumping it though a pipe that extends to a height of 2 ft above the ground. You only need to set-up the integral. (Assume...
A Cylindrical water tank with height 12 m and diamater 4 m is full of water....
A Cylindrical water tank with height 12 m and diamater 4 m is full of water. Show that the amant of work required to pump the water to the level of the tank and out is 2,822, 4000 joules. Recall that the density or mass of water is approximately 1,000 kg and use the gravity constant 9.8h / 12m 2m. B) Show that the arch longth along the curve Y=2x from x=0 to x=5 is 335 3/2 4 los
A cylindrical shaped gas tank is 12 m tall with base radius to be 3 m....
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...
3) (16p) A storage tank 10 ft height below is placed 5ft underground from the top...
3) (16p) A storage tank 10 ft height below is placed 5ft underground from the top of the tank (see figure below). The diameters of the top and bottom circles are 6ft and 10ft.The tank is full of gasoline that weighs 40 lbs/cubic ft. Find the work to empty the tank. 5ft 10 ft
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 conical container of radius 6 ft and height 24 ft is filled to a height of 20 ft of a liquid weighing 62.4 lb/ft. How much work will it take to pump the contents to the rim? How much work will it take to pump the liquid to a level of 4 ft above the cone's rim? The amount of work required to pump the liquid to the rim of the tank is ft-lb. (Round to the nearest whole...
3 ft, length L= 14 ft and height h = 4 ft (1 point) The trough in the figure below has width w (Click on the graph for a larger version.) If the trough is full of water, find the force of the water on a triangular end. (Use the density of water 62.4 lb/ft'.) Force Don't forget to enter units Find the work to pump all of the water over the top of the trough. Work Don't forget 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? Note: The weight-density of water is 9800 N Select the correct answer below: 985 kJ 2,463 kJ 4,926k 9,852 k)
A crude oil storage tank in the shape of a right cylinder of radius 4 ft and length 10 ft is buried in the ground in the horizontal position. If the top of the tank is 5 ft below the surface, find the work required to empty a full tank of oil weighing 50 lb/ft' by pumping it though a pipe that extends to a height of 2 ft above the ground. You only need to set-up the integral. (Assume...
A Cylindrical water tank with height 12 m and diamater 4 m is full of water. Show that the amant of work required to pump the water to the level of the tank and out is 2,822, 4000 joules. Recall that the density or mass of water is approximately 1,000 kg and use the gravity constant 9.8h / 12m 2m. B) Show that the arch longth along the curve Y=2x from x=0 to x=5 is 335 3/2 4 los
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...
3) (16p) A storage tank 10 ft height below is placed 5ft underground from the top of the tank (see figure below). The diameters of the top and bottom circles are 6ft and 10ft.The tank is full of gasoline that weighs 40 lbs/cubic ft. Find the work to empty the tank. 5ft 10 ft
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