The conical tank (inverted – think of an ice cream cone) with height of 5 ft...
(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).
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...
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...
Suppose a conical tank (think of an ice cream cone, point down) has a capacity of 7 gallons, and that 3 gallons of water are in it already. Water is added at a rate of 6 gallons per minute, but the cone springs a leak near its tip after 10 seconds. Water exits the tank at a rate determined by Torricelli's Law, v2gh (where v is the linear velocity of the water, g the acceleration due to gravity, and h...
A tank in the shape of an inverted right circular cone has height 5 meters and radius 3 meters. It is filled with 2 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 δ=1040 kg/m^3. Your answer must include the correct units.
Explanantion for 7 and 8. 8 An inverted conical tank has height 4 m and radius 1 m at the top. When the d oil flows in at the rate 2 m/min. How fast is the level rising? 9 A 6-ft man walks away from a 15-ft lamp post. When he is 21 ft from the post.
(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 =
Water flows out of an inverted conical tank with circular orifice Solve using MATLAB. Thank you!! Water flows out of an inverted conical talk with circular orifice at the rate of 4. vy A(y) where r is the orifice radius, y is the height of the water above the orifice, and Avy) is the area of the cross section of the tank at the water level. Suppose r - .1 ft g =-32.17 ft/s, and the tank has an initial...
i dont understand this question :/ Name: Math 185 Exam 1 Spring 19 10. A tank has the shape of an inverted right circular cone with a base radius of 3 m and a height of 10 m. If the tank is Date: filled to a height of 6 m, find the work required to empty the tank by pumping the water over the top of the tank. (The mass of water is 1000 kg/m3 and the force of gravity...