1 / 54

Viscous Flow in Pipes

Types of Engineering Problems. How big does the pipe have to be to carry a flow of x m3/s?What will the pressure in the water distribution system be when a fire hydrant is open?. Example Pipe Flow Problem. . . D=20 cmL=500 m. valve. . . . 100 m. Find the discharge, Q.. . . . Describe the process in terms of energy!.

derica
Download Presentation

Viscous Flow in Pipes

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


    1. Viscous Flow in Pipes

    2. Types of Engineering Problems How big does the pipe have to be to carry a flow of x m3/s? What will the pressure in the water distribution system be when a fire hydrant is open?

    3. Example Pipe Flow Problem

    4. Remember dimensional analysis? Two important parameters! R - Laminar or Turbulent e/D - Rough or Smooth Flow geometry internal _______________________________ external _______________________________ Viscous Flow: Dimensional Analysis

    5. Laminar and Turbulent Flows Reynolds apparatus

    6. Boundary layer growth: Transition length

    7. Laminar, Incompressible, Steady, Uniform Flow Between Parallel Plates Through circular tubes Hagen-Poiseuille Equation Approach Because it is laminar flow the shear forces can be easily quantified Velocity profiles can be determined from a force balance Dont need to use dimensional analysis

    8. Laminar Flow through Circular Tubes Different geometry, same equation development (see Streeter, et al. p 268) Apply equation of motion to cylindrical sleeve (use cylindrical coordinates)

    9. Laminar Flow through Circular Tubes: Equations

    10. Laminar Flow through Circular Tubes: Diagram

    11. The Hagen-Poiseuille Equation

    12. Example: Laminar Flow (Team work) Calculate the discharge of 20C water through a long vertical section of 0.5 mm ID hypodermic tube. The inlet and outlet pressures are both atmospheric. You may neglect minor losses. What is the total shear force? What assumption did you make? (Check your assumption!)

    13. Turbulent Pipe and Channel Flow: Overview Velocity distributions Energy Losses Steady Incompressible Flow through Simple Pipes Steady Uniform Flow in Open Channels

    14. Turbulence A characteristic of the flow. How can we characterize turbulence? intensity of the velocity fluctuations size of the fluctuations (length scale)

    15. Turbulence: Size of the Fluctuations or Eddies Eddies must be smaller than the physical dimension of the flow Generally the largest eddies are of similar size to the smallest dimension of the flow Examples of turbulence length scales rivers: ________________ pipes: _________________ lakes: ____________________ Actually a spectrum of eddy sizes

    16. Turbulence: Flow Instability In turbulent flow (high Reynolds number) the force leading to stability (_________) is small relative to the force leading to instability (_______). Any disturbance in the flow results in large scale motions superimposed on the mean flow. Some of the kinetic energy of the flow is transferred to these large scale motions (eddies). Large scale instabilities gradually lose kinetic energy to smaller scale motions. The kinetic energy of the smallest eddies is dissipated by viscous resistance and turned into heat. (=___________)

    17. Velocity Distributions Turbulence causes transfer of momentum from center of pipe to fluid closer to the pipe wall. Mixing of fluid (transfer of momentum) causes the central region of the pipe to have relatively _______velocity (compared to laminar flow) Close to the pipe wall eddies are smaller (size proportional to distance to the boundary)

    18. Turbulent Flow Velocity Profile

    19. Turbulent Flow Velocity Profile

    20. Log Law for Turbulent, Established Flow, Velocity Profiles

    21. Pipe Flow: The Problem We have the control volume energy equation for pipe flow We need to be able to predict the head loss term. We will use the results we obtained using dimensional analysis

    22. Pipe Flow Energy Losses

    23. Friction Factor : Major losses Laminar flow Turbulent (Smooth, Transition, Rough) Colebrook Formula Moody diagram Swamee-Jain

    24. Laminar Flow Friction Factor

    25. Turbulent Pipe Flow Head Loss ___________ to the length of the pipe ___________ to the square of the velocity (almost) ________ with the diameter (almost) ________ with surface roughness Is a function of density and viscosity Is __________ of pressure

    26. Smooth, Transition, Rough Turbulent Flow Hydraulically smooth pipe law (von Karman, 1930) Rough pipe law (von Karman, 1930) Transition function for both smooth and rough pipe laws (Colebrook)

    27. Moody Diagram

    28. Swamee-Jain 1976 limitations ?/D < 2 x 10-2 Re >3 x 103 less than 3% deviation from results obtained with Moody diagram easy to program for computer or calculator use

    29. Pipe roughness

    30. Solution Techniques

    31. Minor Losses We previously obtained losses through an expansion using conservation of energy, momentum, and mass Most minor losses can not be obtained analytically, so they must be measured Minor losses are often expressed as a loss coefficient, K, times the velocity head.

    32. Head Loss due to Gradual Expansion (Diffusor)

    33. Sudden Contraction losses are reduced with a gradual contraction

    34. Sudden Contraction

    35. Entrance Losses Losses can be reduced by accelerating the flow gradually and eliminating the

    36. Head Loss in Bends Head loss is a function of the ratio of the bend radius to the pipe diameter (R/D) Velocity distribution returns to normal several pipe diameters downstream

    37. Head Loss in Valves Function of valve type and valve position The complex flow path through valves can result in high head loss (of course, one of the purposes of a valve is to create head loss when it is not fully open)

    38. Solution Techniques Neglect minor losses Equivalent pipe lengths Iterative Techniques Simultaneous Equations Pipe Network Software

    39. Iterative Techniques for D and Q (given total head loss) Assume all head loss is major head loss. Calculate D or Q using Swamee-Jain equations Calculate minor losses Find new major losses by subtracting minor losses from total head loss

    40. Solution Technique: Head Loss Can be solved directly

    41. Solution Technique: Discharge or Pipe Diameter Iterative technique Set up simultaneous equations in Excel

    42. Example: Minor and Major Losses Find the maximum dependable flow between the reservoirs for a water temperature range of 4C to 20C.

    43. Directions Assume fully turbulent (rough pipe law) find f from Moody (or from von Karman) Find total head loss Solve for Q using symbols (must include minor losses) (no iteration required) Obtain values for minor losses from notes or text

    44. Example (Continued) What are the Reynolds number in the two pipes? Where are we on the Moody Diagram? What value of K would the valve have to produce to reduce the discharge by 50%? What is the effect of temperature? Why is the effect of temperature so small?

    45. Example (Continued) Were the minor losses negligible? Accuracy of head loss calculations? What happens if the roughness increases by a factor of 10? If you needed to increase the flow by 30% what could you do? Suppose I changed 6 pipe, what is minimum diameter needed?

    46. Pipe Flow Summary (1) Shear increases _________ with distance from the center of the pipe (for both laminar and turbulent flow) Laminar flow losses and velocity distributions can be derived based on momentum and energy conservation Turbulent flow losses and velocity distributions require ___________ results

    47. Pipe Flow Summary (2) Energy equation left us with the elusive head loss term Dimensional analysis gave us the form of the head loss term (pressure coefficient) Experiments gave us the relationship between the pressure coefficient and the geometric parameters and the Reynolds number (results summarized on Moody diagram)

    48. Pipe Flow Summary (3) Dimensionally correct equations fit to the empirical results can be incorporated into computer or calculator solution techniques Minor losses are obtained from the pressure coefficient based on the fact that the pressure coefficient is _______ at high Reynolds numbers Solutions for discharge or pipe diameter often require iterative or computer solutions

    49. Columbia Basin Irrigation Project The Feeder Canal is a concrete lined canal which runs from the outlet of the pumping plant discharge tubes to the north end of Banks Lake (see below). The original canal was completed in 1951 but has since been widened to accommodate the extra water available from the six new pump/generators added to the pumping plant. The canal is 1.8 miles in length, 25 feet deep and 80 feet wide at the base. It has the capacity to carry 16,000 cubic feet of water per second.

    50. Pipes are Everywhere!

    51. Pipes are Everywhere! Drainage Pipes

    52. Pipes

    53. Pipes are Everywhere! Water Mains

    54. Glycerin

    55. Example: Hypodermic Tubing Flow

More Related