Hola El Pepe2,
I think some of us wish it were closed, but here we go again....
Hi, I don't know if the discussion is closed. Nevertheless it's an impressive subject..., after all these years I realized I got no solid basement in Hydraulics!.
Well I don't think there is much solid about hydraulics and fluid mechanics
.
Jokes aside, and after putting in several example problems in my superduper BigInch simulator, I (think I) can say the following,
Feric posted that velocities should be the same in the main and secondaries branches. I agree with everybody else that velocities in the two branches (downstream) must be a half from the upstream velocity.
That is only true, if there are 2 downstream branches of equal cross-sectional flow area.
If pressures remain the same upstream, inside and downstream of the junction, no compressibility and there is no friction, all as specified in the original post (that means total head upstream = total head downstream, which also given that there is no elevation difference across the junction, it follows that velocity change must account for any differences between the energy from the upstream side to all downstream sides of the junction), flowrate (and mass rate in an incompressible system) must proportion itself according to area ratio and thus also by velocity in each branch, since V = Q/A. If it did not, the fluid would have to be compressible/expandable. Going back to basic physics, it should also be such that ingoing momentum must = outgoing momentum (sum of components in relavent coord directions assuming axial and shear forces in all pipe are balanced... nothing is moving around space), would imply that downstream flowrate in each branch must be proportional to the branch flow area ratio to the total downstream area of all pipes. What other mechanism is there to proportion flow otherwise? None.
Thinking aloud: volumetric rate in the upstream section must be equally divided between the two downstream branches. They can not be equal to the upstream branch because there's no additional source of fluid volume except the upstream branch itself. Am I right? As the volume rate is a half of the upstream branch, and the section is equal to the last, velocity in each downstream branch must be the half of the upstream branch.
I think you mean they must be equal to the upstream branch. So anyway, Volumetric rate in must be equal volumetric rate out. Are you right? Well, flow is divided, however NOT necessarily equally between the two downstream branches. As I said above, that division must be according to area ratio of branch area to total downstream area, so it would only be equal, if the downstream branches had equal areas.
But I cannot get the clue about the mechanical energy involved yet. Think about having a enlargement to the double of section of the same upstream pipe. All the equations and assumtions are the same but one can clearly make a direct correspondance about energy at a point in the upstream part, and another point in the enlarged part. The energy must be conserved. But what happens in the two branch problem?, the energy of the upstream section should be divided between the two downstream branches? Maybe I am lost enough that I missed some basic notion. What do you think about it?
Yes it is divided; however ratioed by flow area to each branch.
Let us know if you are still troubled.
![[elephant2]](/data/assets/smilies/elephant2.gif "[elephant2] [elephant2]")
affects. Thanks for the reminder.
