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....
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).
Pumping a conical tank A right- circular conical tank, point down, with top radius 5 ft and height 10 ft is filled with a liquid whose weight-density is 60 lb/ft^ 3 . How much work does it take to pump the liquid to a point 2 ft above the tank? If the pump is driven by a motor rated at 275 ft-lb/sec (1/2 hp), , how long will it take to empty the tank? Must work the integral out by...
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...
4. A 10 foot conical tank with a radius 5 feet is filled with oil weighing 57 pounds/ft? (a)-(c): Do not integrate. Just set up the integral so that I can see the differences in each expression. (a) Set up the integral to find the work to pump the oil to the top of the tank. (b) Set up the integral to find the work to lift the top 3 feet of olive oil over the top of the tank....
(1 point) Book Problem 9 A heavy rope, 20 ft long, weighs 0.9 lb/ft and hangs over the edge of a building 130 ft high a) How much work is done in pulling the rope to the top of the building? Work ft-lb. a) How much work is done in pulling half the rope to the top of the building? Work ft-lb. (1 point) Book Problem 15 An aquarium 10m long, 5m wide, and 9m deep is full of water....
Water in a vertical cylindrical tank of height 29 it and radius 4 ft is to be pumped out. The density of water is 62.4 lb/R. (6) The tank is full of water and all of the water is to be pumped over the top of the tank. Find the approximate work for the slice as shown. Use Delta or A from the CalcPad. Leave in your answer. 32118.5281 ( 29 - y) Ay Find the endpoints for the integral...
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.
(10 points) A cylindrical tank of radius 2 meters and height 14 meters is filled with water to a depth of 10 meters. How much work is required to pump all the water over the upper rim? The weight density of water is 9810 N/m'.
The truncated conical container shown below is full of a beverage that weighs 0.40 oz/in^3 The container is 7 in. deep, 2.8 in. across at the base, and 3.6 in. across at the top. A straw sticks up 33 in. above the top. Question: How much work does it take to suck up the beverage through the straw (neglecting friction)? How much work is required? Answer: _______ in-oz (Round to the nearest tenth as needed.) The truncated conical container shown...