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A cylindrical tank is being filled with water. The tank is initially empty but then water...
i got the hight correctly but not the time. could you help me finding the time...
i got the hight correctly but not the time.
could you help me finding the time please
Tutorial lesson A cylindrical tank is being filled with water. The tank is initially empty but then water begins to flow into it at a rate of 74.00 kg/min. There is a small hole of radius r = 0.6000 cm at the bottom of the tank where water can escape. Because the flow rate of water leaving the hole is initially at a...
To empty if c 0.6? See Problem 13 in Exercises 1.3. 13. Leaking Conical Tank A tank in the form o...
to empty if c 0.6? See Problem 13 in Exercises 1.3. 13. Leaking Conical Tank A tank in the form of a right-circular cone standing on end, vertex down, is leaking water through a circular hole in its bottom. 16. H 75 (a) Suppose the tank is 6 m high and has radius 3 m and an the circular hole has radius 5 cm. In Problem 14 in Exercises 1.3 you were asked to derive the differential equation governing the...
Draining of cylindrical tank. You have a cylindrical tank full of water with a diameter =Dtank....
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...
The open cylindrical tank in the figure contains water and is being filled as shown. Assume...
The
open cylindrical tank in the figure contains water and is being
filled as shown. Assume incompressible flow with pwater = 1000
kg/m^3.
1. (15 marks): The open cylindrical tank in the figure contains water and is being filled as shown. Assume incompressible flow, with water = 1000 kg/m3. a) Write the mass transport equation and note that the flow may not be steady, which implies that the rate of change of mass in the control volume needs not be...
3. (3 points) A tank of diameter D is filled with water up to a height...
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...
A vertical cylindrical tank is being filled with water, while at the same time water is being drained as shown in Fi...
A vertical cylindrical tank is being filled with water, while at the same time water is being drained as shown in Figure 1 below. Provide: Asketch of the analogous flow network using a capacitor symbol to indicate liquid a. volume storage. b. Let h liquid level height;t time; R 988.1(h)0 V 0.5+0.5cos(0.05t), the inlet flow rate; D 2.5, tank diameter; y 60; liquid specific weight; and ho 10, initial h Assume that the units are consistent and the exit pressure...
A conical tank of radius R and height H, pointed end down, is full of water....
A conical tank of radius R and height H, pointed end down, is
full of water. A small hole of radius r is opened at the bottom of
the tank, with r, much much less than, R so that the tank drains
slowly. Find an expression for the time T it takes to drain the
tank completely.
Hint 1: use Bernoulli’s equation to relate the flow speed from
the hole to the height of the water in the cone.
Hint...
(3 points) A tank of diameter D is filled with water up to a height h...
(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 tank draining (c) If you no longer assume that the...
show all work will thumbs up 5, A certain tank has a circular bottom area A 25 m2. It is drained by a pipe whose linear resistance is R = The tank contains water whose mass density is 1000 kg/m 12...
show all work will thumbs up
5, A certain tank has a circular bottom area A 25 m2. It is drained by a pipe whose linear resistance is R = The tank contains water whose mass density is 1000 kg/m 120 m.s a) How long will it take for the tank to empty if the water height was initially 16 m? b) Suppose we dump water into the tank at a rate of 0.1 m3/s. If the tank is initially...
A large storage tank, open at the top and filled with water, develops a small hole...
A large storage tank, open at the top and filled with water, develops a small hole in its side at a point 15.4 m below the water level. The rate of flow from the leak is found to be 3.00 x 10-3 m3/min. 1 (a) Determine the speed (in m/s) at which the water leaves the hole. 17.38 m/s (b) Determine the diameter of the hole (in mm). How is the flow rate related to the area of the hole...
i got the hight correctly but not the time.
could you help me finding the time please
Tutorial lesson A cylindrical tank is being filled with water. The tank is initially empty but then water begins to flow into it at a rate of 74.00 kg/min. There is a small hole of radius r = 0.6000 cm at the bottom of the tank where water can escape. Because the flow rate of water leaving the hole is initially at a...
to empty if c 0.6? See Problem 13 in Exercises 1.3. 13. Leaking Conical Tank A tank in the form of a right-circular cone standing on end, vertex down, is leaking water through a circular hole in its bottom. 16. H 75 (a) Suppose the tank is 6 m high and has radius 3 m and an the circular hole has radius 5 cm. In Problem 14 in Exercises 1.3 you were asked to derive the differential equation governing the...
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...
The
open cylindrical tank in the figure contains water and is being
filled as shown. Assume incompressible flow with pwater = 1000
kg/m^3.
1. (15 marks): The open cylindrical tank in the figure contains water and is being filled as shown. Assume incompressible flow, with water = 1000 kg/m3. a) Write the mass transport equation and note that the flow may not be steady, which implies that the rate of change of mass in the control volume needs not be...
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...
A vertical cylindrical tank is being filled with water, while at the same time water is being drained as shown in Figure 1 below. Provide: Asketch of the analogous flow network using a capacitor symbol to indicate liquid a. volume storage. b. Let h liquid level height;t time; R 988.1(h)0 V 0.5+0.5cos(0.05t), the inlet flow rate; D 2.5, tank diameter; y 60; liquid specific weight; and ho 10, initial h Assume that the units are consistent and the exit pressure...
A conical tank of radius R and height H, pointed end down, is
full of water. A small hole of radius r is opened at the bottom of
the tank, with r, much much less than, R so that the tank drains
slowly. Find an expression for the time T it takes to drain the
tank completely.
Hint 1: use Bernoulli’s equation to relate the flow speed from
the hole to the height of the water in the cone.
Hint...
(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 tank draining (c) If you no longer assume that the...
show all work will thumbs up
5, A certain tank has a circular bottom area A 25 m2. It is drained by a pipe whose linear resistance is R = The tank contains water whose mass density is 1000 kg/m 120 m.s a) How long will it take for the tank to empty if the water height was initially 16 m? b) Suppose we dump water into the tank at a rate of 0.1 m3/s. If the tank is initially...
A large storage tank, open at the top and filled with water, develops a small hole in its side at a point 15.4 m below the water level. The rate of flow from the leak is found to be 3.00 x 10-3 m3/min. 1 (a) Determine the speed (in m/s) at which the water leaves the hole. 17.38 m/s (b) Determine the diameter of the hole (in mm). How is the flow rate related to the area of the hole...
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