electricpete
Electrical
- May 4, 2001
- 16,774
Let's say you have a vertical pipe of radius R, height h.
It is assumed (for simplicity) open at the top and has a frictionless gate valve at the bottom.
Prior to time t0 the pipe is full and valve is closed.
At time t0 the valve is opened and oil begins to drop out of the bottom (resisted by viscous friction)
Let's make a simplifying assumption that (since the oil tends to stick to the pipe), at a snapshot in time, at any elevation within the pipe the oil forms a "washer" shape which extends from the outer radius of the pipe to some intermediate radius r (0<r<R).
By virtue of the assumption, the problem is axisymmetric and we could characterize the oil distribution in the pipe as
r(y,t) = f(R,rho, mu,h)
where r is the the innner radius of that washer shape volume of oil at that elevation
and time (t).
y is independent variable from 0 to h
t is independent variable from 0 on
The forces acting on the fluid are known (gravity and viscous forces).
I'm thinking maybe this could be analytically evaluated as a partial differential equation, but it's beyond my capability at the moment.
So my questions are:
Does anyone want to take a challenge to try to solve the above problem?
Or maybe familiar with a worked-solution to this problem?
Or aware of any empirical information about expected drain times of oil from pipe?
By the way, here's my motivation. We drained oil out of a piping section drain in order to check for oil inleakage at a remote/ inaccessible location. Oil drained very slowly and rate of drain decreased very slowly. Something like pencil stream initially, then one drip per second after 15 minutes, one drip per 5 seconds after 30 minutes, one drip per minute after 60 minutes. We didn't have the luxury of letting it drip any longer since it must be attended while dripping. It's hard to distinguish what is residual oil and what might be inleakage because I don't know how fast the residual oil should come out. The particular section of piping drained is two vertical sections and one horizontal section (so not identical to the analytical problem, but I figure the simpler analytical problem would be a good starting point to understand this type of problem).
=====================================
(2B)+(2B)' ?
It is assumed (for simplicity) open at the top and has a frictionless gate valve at the bottom.
Prior to time t0 the pipe is full and valve is closed.
At time t0 the valve is opened and oil begins to drop out of the bottom (resisted by viscous friction)
Let's make a simplifying assumption that (since the oil tends to stick to the pipe), at a snapshot in time, at any elevation within the pipe the oil forms a "washer" shape which extends from the outer radius of the pipe to some intermediate radius r (0<r<R).
By virtue of the assumption, the problem is axisymmetric and we could characterize the oil distribution in the pipe as
r(y,t) = f(R,rho, mu,h)
where r is the the innner radius of that washer shape volume of oil at that elevation
and time (t).y is independent variable from 0 to h
t is independent variable from 0 on
The forces acting on the fluid are known (gravity and viscous forces).
I'm thinking maybe this could be analytically evaluated as a partial differential equation, but it's beyond my capability at the moment.
So my questions are:
Does anyone want to take a challenge to try to solve the above problem?
Or maybe familiar with a worked-solution to this problem?
Or aware of any empirical information about expected drain times of oil from pipe?
By the way, here's my motivation. We drained oil out of a piping section drain in order to check for oil inleakage at a remote/ inaccessible location. Oil drained very slowly and rate of drain decreased very slowly. Something like pencil stream initially, then one drip per second after 15 minutes, one drip per 5 seconds after 30 minutes, one drip per minute after 60 minutes. We didn't have the luxury of letting it drip any longer since it must be attended while dripping. It's hard to distinguish what is residual oil and what might be inleakage because I don't know how fast the residual oil should come out. The particular section of piping drained is two vertical sections and one horizontal section (so not identical to the analytical problem, but I figure the simpler analytical problem would be a good starting point to understand this type of problem).
=====================================
(2B)+(2B)' ?
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