Chapter 1 1/92. Fundamentals

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1 Chapter 1 1/92 Fundamentals

2 Chapter 1 Fundamentals 2/92 Contents 1.1 Scope of Fluid Mechanics 1.2 Historical Perspective 1.3 Physical Characteristics of the Fluid State 1.4 Units and Density 1.5 Compressibility, Elasticity 1.6 Viscosity 1.7 Surface Tension, Capillarity 1.8 Vapor Pressure Objectives - Present concept of fluidity - Introduce fundamental properties of fluid

3 1.1 Scope of Fluid Mechanics 3/92 Problems of water supply flood prevention navigation water power irrigation need to know fluid phenomena

4 1.2 Historical Perspective 4/92 d'alembert (1744) "The theory of fluids must necessarily be based upon experiment" d'alembert paradox theory - ideal, inviscid fluid practice - real fluid (viscous) Two schools theoretical group hydrodynamics practical group hydraulics Navier and Stokes general equations for viscous fluid equation of motion

5 1.2 Historical Perspective 5/92 [Re] Navier-Stokes equation Claude-Louis Navier ( , French engineer) and George Gabriel Stokes ( , UK mathematician & physicist) - one continuity equation + three momentum equations - model the weather, ocean currents, water flow in a pipe, the air's flow around a wing, and motion of stars inside a galaxy - design of aircraft and cars, the study of blood flow, the design of power stations, the analysis of pollution, - exact solution - one of the seven most important open problems in mathematics

6 1.2 Historical Perspective 6/92 New problems in modern times - Dispersion of man's wastes in lakes, rivers, and oceans Environmental Fluid Mechanics (Hydraulics) state: solid liquid increasing spacing increasing inter fluid gaseous and latitude of molecular cohesive plasma particle motion force fluid continuum no voids or holes

7 1.3 Physical Characteristics of the Fluid State 7/92

8 1.3 Physical Characteristics of the Fluid State 8/92 stress solid strain fluid tension unable to support tension (surface tension) compression shear (tangential forces) elastic deformation permanent distortion elastic deformation (compressible fluid) permanent distortion or flo w (change shape) to infini tesimal shear stress

9 1.3 Physical Characteristics of the Fluid State 9/92 dv τ = µ dy

10 1.3 Physical Characteristics of the Fluid State 10/92 stress real fluid (viscous fluid) ideal fluid (non-viscous fluid) in motion at rest at rest and in motion compression (pressure) shear

11 1.3 Physical Characteristics of the Fluid State 11/92 incompressible fluid compressible fluid 1 Compressibility is of small important. 1 Compressibility is predominant. 2 Liquids and gases may be treated similarly. 2 Behavior of liquids and gases is quite dissimilar. 3 Fluid problems may be solved with the principles of mechanics. 3 Thermodynamics and heat transfer concepts must be used as well as principles of mechanics.

12 1.3 Physical Characteristics of the Fluid State 12/92 * Fluid does not resist any small shearing stress "Flow occurs" Properties of pressure (compression) 1 Pressure must be transmitted to solid boundaries normal to those boundaries. 2 At a point, pressure has the same magnitude in all directions. Pressure is a scalar quantity.

13 1.3 Physical Characteristics of the Fluid State 13/92 Weight W Vol. = γ

14 1.3 Physical Characteristics of the Fluid State 14/92 [Pf] F = 0 Apply Newton's law for static equilibrium F = p1dz p3dssinθ = 0 x F = p dx ρgdxdz / 2 p dscosθ = 0 z 2 3 (a) (b) Substitute following relations into Eq. (a) & (b) dx = dscosθ dz = dssinθ ( a) : p dssinθ p dssinθ = 0 p = p

15 1.3 Physical Characteristics of the Fluid State 15/92 dz ( b) : p2dscosθ ρg dscosθ p3dscosθ = p2 = p3+ ρgdz 2 As dz 0 then p2 p3 p1 = p2 = p3 at a point ( dx = dz = 0)

16 1.4 Units and Density 16/92 SI units - SI system metric system - Frequency ( f ): hertz (HZ = s -1 ) Force, F introduce Newton's 2nd law of motion F = ma Force = mass acceleration a= v/ t = L/ t v= L/ t F = 2 Lt 2 Lt 1 2 1kg m/s 1N( Newton) (m/s 2 ) (m/s)

17 1.4 Units and Density 17/92 Dimension SI unit English system (FSS) Length (L) metre (m) feet (ft) Mass (M) kilogram (kg) slug (-) Time (t) second (s) second (s) Temp. (T) kelvin (K) degree Rankine ( R)

18 1.4 Units and Density 18/92 Energy, E (work) E = FL = J Joule 2 2 kg m /s ( ) Power, P P= E/ t J / s= kg m s 2 3 Pressure, p ; Stress,, στ p= F / A N/m = Pa (pascal) = kg/m s 2 2 Temperature, T : degree Celsius ( C)

19 1.4 Units and Density 19/92 Density, ρ = mass per unit volume ~ depends on the number of molecules per unit of volume ~ decreases with increasing temperature ρ = M V 3 kg/m Specific weight (weight density), γ = weight (force) per unit volume W γ= N/m = kg/m s V 3 2 2

20 1.4 Units and Density 20/92 [Re] W g = Mg γ = ρg (Newton s 2 nd law of motion) = acceleration due to gravity (1.1) Specific volume=volume per unit mass= 1/ ρ Specific gravity, s.g., ~ r. d. (relative density) = ratio of density of a substance to the density of water at a specified temperature and pressure ρf γ f sg.. = = ρ γ w w

21 1.4 Units and Density 21/92 [Re] s.g. of sea water = 1.03 s.g. of soil = 2.65 s.g. of mercury = 13.6 Advantage of SI system and English FSS system ( F ) ( M ) 1 It distinguishes between force and mass. 2 It has no ambiguous definitions.

22 1.4 Units and Density 22/92 SI English system ρ 1,000 kg/m slugs/ft 3 γ 9,806 N/m lb/ft 3 g 9.81 m/s ft/s 2

23 1.4 Units and Density 23/92 Greek Alphabet α β γ, Γ δ, ε ζ η θ, Θ ι κ Alpha Beta [beitə] Gamma Delta Epsilon Zeta Eta Theta Iota [aioutə] Kappa [kæpə] angle angle specific weight, circulation thickness of boundary layer eddy viscosity, height of surface roughness

24 1.4 Units and Density 24/92 λ, Λ µ ν ξ ο π ρ Lambda Mu [mju:] Nu Xi [gzai, ksai] Omicron Pi [pai] Rho dynamic viscosity kinematic viscosity vorticity mass density σ, Sigma Sigma Xi, Scientific Research Society, 1886 τ υ, ϒ Tau Upsilon honor society for scientists & engineers shear

25 1.4 Units and Density 25/92 ϕ, Φ χ ψ, Ψ ω, Ω Phi [fai] Chi [kai] Psi [psai, sai] Omega Phi Beta Kappa stream function angular velocity Prefixes E exa P peta T tera G giga 10 9 M mega 10 6

26 1.4 Units and Density 26/92 M mega 10 6 k kilo 10 3 h hecto 10 2 da deca 10 1 d deci 10-1 c centi 10-2 m milli 10-3 µ micro 10-6 n nano 10-9 p pico f femto a atto 10-18

27 1.5 Compressibility, Elasticity 27/92 Elastic behavior to compression Compressibility change in volume due to change in pressure solid - modulus of elasticity, E (N/m 2 ) fluid - bulk modulus

28 1.5 Compressibility, Elasticity 28/92

29 1.5 Compressibility, Elasticity 29/92 Stress-strain curve (E, difficult to compress) dp dv V 1 1 dv dp = E V 1 dp dp E = = V 1 const = fn( p, T ) p E dv dv V 1 dv 1 C = = E V dp 1 Minus means that increase in pressure causes decrease in volume = modulus of compressibility (m 2 /N)

30 1.5 Compressibility, Elasticity 30/92 [Re] large E/small C less compressible incompressible fluid (inelastic): constant density ~ water ρ =const. E =, C 1 compressible fluid changes in density variable density ~ gas

31 1.5 Compressibility, Elasticity 31/92 Pressure 10 6 N/m 2 Temperature, C

32 1.5 Compressibility, Elasticity 32/92 - E increases as pressure increases. - E is maximum at about 50 C. The water has minimum compressibility at about 50 C. For the case of a fixed mass of liquid at constant temperature E = dp V1 dv V V 1 p E V V p p V E

33 1.5 Compressibility, Elasticity 33/92 Compressibility Modulus of Elasticity, E (kpa) steel 1/80 of water water 2,170,500 mercury 1/12.5 of water sea water 2,300,000 nitric acid 6 of water mercury 26,201,000

34 1.5 Compressibility, Elasticity 34/92 [Ex] For water; 6 E = 2, C p 6 2 = p Pa V V p p V E = 1 V = ( ) V 2 1 p = Pa Pa 기압 V 0.3% decrease water is incompressible

35 1.6 Viscosity 35/92 [Re] From Wikipedia Viscosity is a measure of the resistance of a fluid which is being deformed by either shear stress or tensile stress. Viscosity ~ "thickness" or "internal friction" water ~ "thin", having a lower viscosity honey ~ "thick", having a higher viscosity The less viscous the fluid is, the greater its ease of movement (fluidity). Viscosity describes a fluid's internal resistance to flow and may be thought of as a measure of fluid friction. dv τ = µ dy

36 1.6 Viscosity 36/92 For example, high-viscosity felsic magma will create a tall, steep stratovolcano, because it cannot flow far before it cools, while lowviscosity mafic lava will create a wide, shallow-sloped shield volcano. All real fluids (except superfluids) have some resistance to stress and therefore are viscous, but a fluid which has no resistance to shear stress is known as an ideal fluid or inviscid fluid. [Re] super fluid a fluid having frictionless flow, and other unusual properties

37 1.6 Viscosity 37/92 Two types of fluid motion (real fluid) 1) laminar flow: - viscosity plays a dominant role - fluid elements or particles slide over each other in layers (laminar) - molecular diffusion [Ex] flow in a very small tube, a very thin flow over the pavement, flow in the laminar flow table

38 1.6 Viscosity 38/92 2) turbulent flow: - random or chaotic motion, eddies of various sizes are seen - common in nature (streams, rivers, pipes) - large scale mixing between the layers [Ex] flows in the water supply pipe, flows in the storm sewer pipe, flows in the and canals and streams Reynolds number Re = Vd ν Diameter of pipe, Depth of stream where V = flow velocity; d = characteristic length; n = kinematic viscosity

39 1.6 Viscosity 39/92 Reynolds experiments laminar flow: Re < 2,100 transition: 2,100<Re < 4,000 turbulent flow: Re > 4,000 The same fluid with different velocity

40 1.6 Viscosity 40/92 Spiral secondary flow Secondary flow

41 1.6 Viscosity 41/92

42 1.6 Viscosity 42/92 cube streamline sink source

43 1.6 Viscosity 43/92 Smooth surface Eddying motion

44 1.6 Viscosity 44/92

45 1.6 Viscosity 45/92 Symmetric shape, No separation

46 1.6 Viscosity 46/92

47 1.6 Viscosity 47/92 Separation, eddy formation Growth of eddy

48 1.6 Viscosity 48/92

49 1.6 Viscosity 49/92

50 1.6 Viscosity 50/92 laminar flow strain = relative displacement [Cf] solid mechanics d2 d1 dvdt dv dζ = = = dt τ yx = G dy dy dy dy [Re] d = v dt; d = v dt d d = ( v v ) dt total angular displacement

51 1.6 Viscosity 51/92 no velocity at the boundary (no slip)

52 1.6 Viscosity 52/92 Experiment has shown that, in many fluids, shearing (frictional) stress per unit of contact area, strain. τ dv dv τ dt / dt = dy dy is proportional to the time rate of relative (velocity gradient) dv τ = µ Newton s equation of viscosity (1.2) dy where µ = coefficient of viscosity = dynamic (absolute) viscosity Large µ sticky, difficult to flow

53 1.6 Viscosity 53/92 viscosity = measure of fluid's resistance to shear or angular deformation = internal resistance of a fluid to motion (fluidity) [Re] Friction forces result from - cohesion for liquid - momentum interchange between molecules for gas [Re] angular deformation due to tangential stress

54 1.6 Viscosity 54/92 dy x

55 1.6 Viscosity 55/92 rate of angular deformation (i) displacement of AB relative to CD du du = u+ y t u = t y t dy dy (ii) angular displacement of AC = du du y t / y t dy = dy (iii) time rate of angular deformation du du = t / t = dy dy dv τ = µ dy

56 1.6 Viscosity 56/92 dynamic viscosity, µ τ = F / A [ τ ] MLT L ML T = / = kg/(m s ) = Pa dv LT dy L 1 1 = = T dv ML T [ µ ] = τ = = = = = dy T / ML T kg/m s N s / m Pa s 1 = 1 1 poises( Poiseuille) 10 Pa s

57 1.6 Viscosity 57/92 kinematic viscosity, µ ν = ρ [ ν ] ν ML T = = = ML LT m /s 3 (1.3) 1 m 2 /s = 10 4 stokes =10 6 centistokes Remarks on Eq. (1.2) τ, µ 1 are independent of pressure. [Cf] friction between two moving solids τ τ 2 Shear stress (even smallest ) will cause flow (velocity gradient).

58 1.6 Viscosity 58/92 3 Shearing stress in viscous fluids at rest will be zero. dv dy = 0 τ = 0 regardless of µ dv 4 At solid boundary, dy ( τ (no infinite shear)) Infinite shearing stress between fluid and solid is not possible. 5 Eq. 1.2 is limited to laminar (non-turbulent) fluid motion in which viscous action is predominant. [Cf] turbulent flow dv τ = ε dy where ε = eddy viscosity ε µ

59 1.6 Viscosity 59/92 6 Velocity at a solid boundary is zero. No slip condition (continuum assumption) Newtonian and non-newtonian fluids i) Newtonian fluid ~ water ii) Non-Newtonian fluid ~ plastic, blood, suspensions, paints, polymer solutions rheology

60 1.6 Viscosity 60/92

61 1.6 Viscosity 61/92 Non-Newtonian fluid dv 1) τ τ 1 = µ plastic, τ 1 = threshold dy Couette flow: n 2) dv τ = K n >1 dy Shear-thickening fluid n <1 Shear-thinning fluid laminar flow in which the shear stress is constant thin fluid film between two large flat plates thin fluid film between the surfaces of coaxial cylinders dv dy V = h V τ = µ h ~ linear velocity gradient ~ constant

62 1.6 Viscosity 62/92

63 1.6 Viscosity 63/92 Turbulent flow τ = ( µ + ε) dv dy ε = eddy viscosity = viscosity due to turbulent factor

64 1.6 Viscosity 64/92 gas liquid main cause of viscosity exchange of molecule's momentum interchange of molecules between the fluid layers of different velocities intermolecular cohesion effect of temperature variation temp molecular activity viscosity shearing stress temp cohesion viscosity shear stress

65 1.6 Viscosity 65/92 [Re] Exchange of momentum fast-speed layer (FSL) Two layers tend to stick together as if there is so me viscosity be tween two. molecules from FSL speed up molecules in LSL molecules from LSL slow down molecules in FSL low-speed layer (LSL)

66 1.6 Viscosity 66/92 1) exchange of momentum : exchange momentum in either direction from high to low or from low to high momentum due to random motion of molecules 2) transport of momentum : transport of momentum from layers of high mome (high velocity, mv ) to layers of low momentum

67 1.7 Surface Tension, Capillarity 67/92 surface tension - occur when the liquid surfaces are in contact with another fluid (air) or solid f n - (relative sizes of intermolecular cohesive and adhesive forces to another body) - as temp cohesion Table A2.4b, p. 694 σ some important engineering problems related to surface tension - capillary rise of liquids in narrow spaces - mechanics of bubble formation - formation of liquid drops - small models of larger prototype dam, river model

68 1.7 Surface Tension, Capillarity 68/92 surface tension, σ ( F / L, N/m) - force per unit length - force attracting molecules away from liquid Consider static equilibrium F = 0 (forces normal to the element abcd,,, ) ( p p ) dxdy = 2σdysinα + 2σdxsin β i 0 where p i = pressure inside the curvature; p o = pressure inside the curvature dx sin α =, 2R 1 sin 1 1 pi p0 = σ + R R dy 2R β = [ dx = 2( R sin α) ] (1.4)

69 1.7 Surface Tension, Capillarity 69/92

70 1.7 Surface Tension, Capillarity 70/92 Cylindrical capillary tube - due to both cohesion and adhesion cohesion < adhesion rise (water) cohesion > adhesion depression (mercury)

71 1.7 Surface Tension, Capillarity 71/92

72 1.7 Surface Tension, Capillarity 72/92 For a small tube, given conditions are as follows R1 = R2 = R (liquid surface section of sphere) Ch. 2 p0 p i = = γ h 0 2 γh = σ R (hydrostatic pressure) (atmospheric) p i 1 1 p0 = σ + R R Substitute above conditions into Eq. 1.15: (1.4) r = Rcosθ 2 2σcosθ γh = σ = r / cosθ r 2σ cosθ h = γ r By the way, 1 2 (1.5)

73 1.7 Surface Tension, Capillarity 73/92 h r h in which = capillary rise θ r = angle of contact = radius of tube 2.5 mm for spherical form [Ex] water and mercury Fig h If r > 12 mm, is negligible for water.

74 1.7 Surface Tension, Capillarity 74/92 cohesion > adhesion depression

75 1.7 Surface Tension, Capillarity 75/92 Pressure measurement using tubes in hydraulic experiments Ch.2 manometer ~ capillarity problems can be avoided entirely by providing tubes large enough to render the capillarity correction negligible. Fomation of curved surface, droplet - At free liquid surface contacting the air, cohesive forces at the outer layer are not balanced by a layer above. The surface molecules are pulled tightly to the lower layer. Free surface is curved. [Ex] Surface tension force supports small loads (water strider).

76 1.7 Surface Tension, Capillarity 76/92

77 1.7 Surface Tension, Capillarity 77/92 [IP 1.10] For a droplet of water (20 C), find diameter of droplet Given: pi p0 = 1.0 kpa At 20 C, σ = N/m App. 2 [Sol] pi 1 1 2σ p0 = σ + = R1 R2 R N/m 2 = 2(0.0728) R (1.4) R = m = 0.146mm d = mm

78 1.7 Surface Tension, Capillarity 78/92 [IP 1.11] Find height of capillary rise in a clean glass tube of 1 mm diameter if the water temperature is 10 C or 90 C. [Sol] From App. 2 Table A 2.4b; 10 C = N/m, = kn/m 3 90 C = N/m, = kn/m 3 γ γ

79 1.7 Surface Tension, Capillarity 79/92 Use Eq h = 2σ cosθ γ r For water, θ = 0 (1.5) 2(0.0742)(1) h`10 = = 9804(0.0005) 0.030m=30mm 2(0.0608)(1) h 90 = = 9466(0.0005) 0.026m=26mm

80 1.8 Vapor Pressure 80/92 vapor pressure = partial pressure exerted by ejected molecules of liquid Table A2.1 and A2.4b liquids ~ tend to vaporize or evaporate due to molecular thermal vibrations (molecular activity) change from liquid to gaseous phase temperature molecular activity vaporization vapor pressure

81 1.8 Vapor Pressure 81/92 volatile liquids: ~ easy to vaporize high vapor pressure p = v p = 55.2 kpa gasoline: at 20 C v v 2.34 kpa water: at 20 C p = kpa mercury: at 15.6 C mercury : low vapor pressure and high density = difficult to vaporize suitable for pressure-measuring devices

82 1.8 Vapor Pressure 82/92 Cavitation: App. 7 (p. 672) In a flow fluid wherever the local pressure falls to the vapor pressure of the liquid, local vaporization occurs. In the interior and/or boundaries of a liquid system Cavities are formed in the low pressure regions. High velocity region The cavity contains a swirling mass of droplets and vapor. Cavities are swept downstream into a region of high pressure. Then, cavities are collapses suddenly.

83 1.8 Vapor Pressure 83/92 surrounding liquid rush into the void together it causes erosion (pitting) of solid boundary surfaces in machines, and vibration boundary wall receives a blow as from a tiny hammer

84 1.8 Vapor Pressure 84/92

85 1.8 Vapor Pressure 85/92 Prevention of cavitation ~ cavitation is of great importance in the design of high-speed hydraulic machinery such as turbines, pumps, in the overflow and underflow structures of high dams, and in highspeed motion of underwater bodies (submarines, hydrofoils). design improved forms of boundary surfaces predict and control the exact nature of cavitation set limits Body cavitation

86 1.8 Vapor Pressure 86/92

87 1.8 Vapor Pressure 87/92 Boiling: = rapid rate of vaporization caused by an increase in temperature = formation of vapor bubbles throughout the fluid mass ~ occur (whatever the temperature) when the external absolute pressure imposed on the liquid is equal to or less than the vapor pressure of the liquid ~ boiling point = f (imposed pressure, temp.) p atm p v boiling occurs

88 1.8 Vapor Pressure 88/92 Table A 2.4b Table A 2.5b altitude (El. m) Temp. ( C) pv (kpa), absolute patm (kpa), absolute boiling point ( C) remark m.s.l , undercooked

89 1.8 Vapor Pressure 89/92 Evaporation: When the space surrounding the liquid is too large, the liquid continues to p v vaporize until the liquid is gone and only vapor remains at a pressure less than or equal. [IP 1.12] For a vertical cylinder of diameter 300 mm, find min. force that will cause the water boil.

90 1.8 Vapor Pressure 90/92 P atm =100 kpa 70 C

91 1.8 Vapor Pressure 91/92 [Sol] From Table A2.4b; =31.16 kpa at 70 C p v For water to boil; ' p p v =31.16, F A ' p = = 2 π (0.3) F = ( ) = 4.87 kn 4

92 1.8 Vapor Pressure 92/92 Homework Assignment # 1 Due: 1 week from today Prob. 1.2 Prob Prob Prob Prob Prob Prob Prob Prob. 1.82

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