Pictured below is a tank full of water. Derive an expression for the flowrate out of...
A tank, which is open to the atmosphere, is filled with water to a level h and allowed to drain through an orifice at the bottom, as shown in the figure below. The cross-sectional area of the tank is At and the cross-sectional area of the orifice is Ao. Assume that the cross-sectional area of the tank is much greater than the cross-sectional area of the orifice (Ar>>Ao) and that the exit losses are negligible. 4) Use Reynolds Transport Theorem...
Draining of cylindrical tank. You have a cylindrical tank full of water with a diameter =Dtank. The height (htank) is changing with time. You are draining the tank through a hole in the bottom. The hole has a diameter Dhole. The velocity of the water leaving the tank depends on the height of the water and can be given as: v2 = 2 g htank. When the hole is first opened, the height of the water is ho. Draw and...
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 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...
The tank pictured in Figure 2 with height H and diameter D
contains water, which drains through a small round hole with
diameter d. Torricelli’s law states that the average velocity v of
the draining water is , where g
is the acceleration of gravity and h the water level. Derive an expression to
describe the time taken for the tank to drain, if it is initially
full of water. Future interplanetary astronauts could use the tank
as a simple...
15. Consider a two tank system pictured below. Suppose tank A contains 100 gallons of water in which 120 pounds of salt are dissolved initially. Suppose tank B has 100 gallons of water in which zero pounds of salt are dissolved initially. Liquid is pumped into and out of the tanks as indicated in the figure; the mixture exchanged between the two tanks and the liquid pumped out of tank B are assumed to be well mixed. How many pounds...
Needs to be solved by a script in MATLAB. Use of if, else, and
ifelse statements are encouraged. My main issue is figuring out
what order to place if statements in. Please comment if any more
info is needed
Create a script file which prompts the user for the water level of the tank pictured below. The tank has a cylindrical base with a height of 25 ft and a diameter of 40 ft. The top of the tank is...
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...
consider a tank full of water, cylindrical in shape, 3.0 meters high and 1.0 meter in diameter. Suppose there is a hole of area 1.0 cm^2 at the bottom of the tank. Calculate the speed at which water is discharged, then the volume of water discharged each second.
4 Water enters a circular, constant area tank through a horizontal pipe at a volume flowrate of Q- 0.35 ft/sec. Water exits the tank through a 2 inch diameter hole with exit velocity Vexi(2gh) where h is the vertical distance from the exit hole to the water surface a) Draw a neat, detailed control volume directly on the drawing of the water tank below. Carefully identify all control surfaces b) Develop a differential equation that can be solved for h...