There is a tank that is loaded up with water to a stature of H = 86.6 cm. There is a little opening in the tank's wall at a stature of h = 18.5 cm over the base of the tank. The water streams from the little opening and hits the ground at a distance x from the tank. At what speed does the water stream from the little opening?
V = Unit in m/s
Discover the distance from the tank's little opening at which water hits the ground.
x = Unit in cm
What is the all out mass of the water which is in the free fall. Expect ρwater = 1 g/cm3 for the density of the water and 0.5 cm2 for the zone of the opening.
m = Unit in g
There is a hydraulic pressure is loaded up with water (ρwater = 1 g/cm3) and has the pistons of 264 cm2 and 31 cm2 regions each. At first the pistons are offset, at that point a 60‑kg load is set on the bigger piston so it descends until new equilibrium is reached. To what height relative to it's initial level the small piston will rise? h = Unit in cm What mass ought to be set on the little piston...
14. A jet of water squirts out horizontally from a hole near the bottom of the very large tank in the figure. If the height, h, of the water level in the tank is 0.3 m, find the angle that the stream makes with the vertical as it strikes the ground. (The horizontal distance frorm the bottom of the cylindrical stand to the splash point is unknown.) 14. A jet of water squirts out horizontally from a hole near the...
The figure shows a stream of water flowing through a hole at depth h = 9.66 cm in a tank holding water to height H = 31.1 cm. (a) At what distance x does the stream strike the floor? (b) At what depth should a second hole be made to give the same value of x? (c) At what depth should a hole be made to maximize x?
A large tank of water is filled up to a height H = 65 cm and is tapped a distance h = 48 cm below the water surface by a small hole as shown in the figure. Find the distance x reached by the water flowing out of the hole.
The figure shows a stream of water flowing through a hole at depth h = 19.5 cm in a tank holding water to height H = 57.8 cm. (a) At what distance x does the stream strike the floor? (b) At what depth should a second hole be made to give the same value of x? (c) At what depth should a hole be made to maximize x?
3. (3 points) A tank of diameter D is filled with water up to a height h above the bottom of the tank (Figure 3). At the bottom of the tank is a hole of diameter d. Assume that the water flows out of the hole with a laminar flow and that the difference in atmospheric pressure between the top and the bottom of the tank is negligible Figure 3: A lank draining a) What speed will the water have...
Tank 1: Tank 2: Water h(t) h(t) Q1 (70 pts). Suppose experiments have been performed to determine the exit velocity (u) as a function of water height (h) for two different tanks. In Tank I, a smooth rounded nozzle with a diameter of a 2 cm is used whereas a square gate opening with a 2 cm side is utilized in Tank 2. The measured flow rates at different tank heights are given further below; the initial height for both...
The figure shows a cylindrical tank of 80 em in diameter which is fully filled with water. In order to increase the flow from the tank to the exit pipe on the left, an additional pressure is applied to the water surface by an air compressor to supply air to the upper air chamber of the tank. The external walls of the tank are exposed to the atmospheric conditions of the area. You are required to determine the hydrostatic conditions...
Water stands at a depth H = 19.5m in a large open tank whose side walls are vertical. A hole is made in one of the walls at a depth of h = 4.50m, below the top water surface. Part A: At what distance A from the foot at the wall does the emerging stream strike the floor? Part B: If you make a hole at a certain position, R becomes the maximum value. Find maximum value of R.
LEARN MORE REMARKS As the analysis of part (a) shows, the speed of the water emerging from the hole is equal to the speed acquired by an object falling freely through the vertical distance h. This is known as Torricelll's law. QUESTION As time passes what happens to the speed of the water leaving the hole? It remains the same. It first decreases and then increases. It decreases It first increases and then decreases. It increases. PRACTICE IT Use the...