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.
A spherical tank that has radius 5m with a spout of length 1m at the top...
A tank has a shape of a cone with a radius at the top of 2 m and a height of 5 m. The tank also has a 1 m spout at the top of the tank. The tank is filled with water up to a height of 2 m. Find the work needed to pump all the water out the top of the spout. (Use 9.8 m/s2 for g and the fact that the density of water is 1000...
A spherical tank has a radius of 8 m. If the tank is completely filled with water, compute the work required to pump all of the water to the level of the top of the tank.
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 tank is full of water. Find the work recquired to pump the water out of different tank shapes. Use the fact that water weighs 62.5 lf/ft^3 2.(a) Spherical tank full of water (b) Spherical tank is half-full of oil that has a density of (c) Compare work found in part a and b, take into account different units used for each part. 3 m sphere 2.(a) Spherical tank full of water (b) Spherical tank is half-full of oil that...
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. (22 points) Consider the tank below with a cylindrical middle and hemispherical bottom and top. Assume that the tank is half full of water. Set up, but DO NOT SOLVE an integral (or integrals) that can be used to determine the work required to pump all of the water out of a spout level with the top of the tank. Note: the density of water is 1000 kg/m3. Make sure to indicate an axis, with 0 marked. In your...
A tank is full of water. Find the work w required to pump the water out of the spout. (Use 9.8 m/s for 9. Use 1000 kg/m as the weight density of water. Assume that = 4 m, 4 m, c = 12 m, and d = m.) W- Enhanced Feedback Please try again. Try dividing the tank into thin horizontal slabs of height Ax. Let x be the distance between each slab and the sout. If the top surface...
A tank is full of water. Find the work required to pump the water out of the spout. (Use 9.8 m/s2 for g. Use 1000 kg/m3 as the weight density of water. Assume r = 3 mand h = 1 m.)
A tank is full of water. Find the work required to pump the water out of the spout. Use the fact that water weighs 62.5 (Assumer 6, R-12 it, and h 12 ft.) It-b R. frustum of a cone
0 A spherical tank of radius 8 feet is half full of oil that weighs 50 pounds per cubic foot. Find the work required to pump oil out through a hole in the top of the tank. ② For the differential equation xy-3y=0 verify that y= Cx² is a solution, and find the particular solution determined by the initial condition y=2 when X=-3. find @ Given the initial condition y(0)=1, particular solution of the equation xy dx + e* (y²-1)...