Physics Asked by BoddTaxter on February 10, 2021
In nozzles and diffusers the cross-section area follows the one defined by the pressure gradient. In a nozzle it decreases to keep mass flow rate constant. In a diffuser the opposite happens.
But say you had a regular pipe with air, constant area, and the pressure was greater on one end. In my mind the velocity would have to increase because of the pressure gradient and this would mean one of two things happens:
The density decreases a lot to keep mass flow rate constant. This seems unlikely because density doesn’t change much for subsonic flow.
The density drops a little but mainly the flow pulls away from the walls, forcing an area constriction to keep mass flow rate constant. This also seems unlikely because there would be a vacuum where it pulls away.
So, my question is what really happens in this scenario?
I mean in general the pressure difference drives a flow across the pipe which increases until the "head loss" (energy lost due to friction with the sides) is equal to the pressure difference. The flow speed at the boundary is 0 and it rapidly increases to a maximum at the center; for example with laminar flow in a circular pipe it is I believe parabolic, $u(r) = u_text{max}~(1 - (r/R)^2).$ Then if it gets turbulent I think it flattens out in the center.
Answered by CR Drost on February 10, 2021
For air flow in a uniform pipe, continuity requires that the total mass flow rate must be constant under equilibrium conditions. It should be roughly proportional to the pressure gradient. As the pressure drops, the density decreases and the velocity must increase.
Answered by R.W. Bird on February 10, 2021
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