Closed Conduit Flow

1. Closed Conduit Flow

2. General Energy Consideration

3. General Energy Consideration • The energy develop in the flow at any point is the sum of the position, pressure and velocity heads • Bernoulli equation: hf = energy or head loss due to resistance

4. Resistance Applications and Friction Losses in Pipe • Chezy Equation • Darcy – Weisbach equation f = Darcy friction factor • Compute energy losses due to resistance in most case of closed conduit flow

5. Resistance Applications and Friction Losses in Pipe Laminar Flow in Pipes • Poiseuille equation • Can be rewritten as where is the Reynolds number of the flow

6. Resistance Applications and Friction Losses in Pipe Turbulent Flow in Pipes • Turbulent Flow in Smooth Pipes • Friction factor, f • Turbulent flow in rough pipes • Transition Region

7. Resistance Applications and Friction Losses in Pipe

8. Empirical Resistance Equations • Blasius Equation generalizing where a and b are coefficient to be determined empirically. It was shown that the exponent b could be determined from where n is the exponent in the power velocity law. If Rn = 105 and n = 7, then b = -0.25

9. Empirical Resistance Equations • Manning Equation

10. Empirical Resistance Equations • Hazen – William Equation Where : R is the hydraulic radius of the pipe Sf is the slope of the energy grade line = friction slope CHW is the resistance coefficient related to pipe material

11. Minor Losses in Pipes • Minor losses are normally expressed in units of velocity head, that is: • In term of the difference between the velocity head

12. Minor Losses in Pipes

13. Water Distribution System • Reservoir Problem

14. Water Distribution System • Pipes in Parallel

15. Water Distribution System • Pipe Networks

16. Water Distribution System • Pipe Networks Assuming that the higher order terms are are much smaller than are the other terms and can be ignored,

17. Example