Fluid mechanics (流體力學)

Presentation on theme: "Fluid mechanics (流體力學)"— Presentation transcript:

1 Fluid mechanics (流體力學)
Aquacultural Engineering W 2 - 3

2 Fluids Characteristics of fluid Fluid statics (流體靜力學)
Fluid dynamics (流體動力學) Open channel flow (明渠水流) 2019/1/13 AE-5-Fluid Mechanics

3 Fluid statics Units of pressure intensity Pressure measurement
Manometers (壓力計) Burst pressure of cylindrical vessels 2019/1/13 AE-5-Fluid Mechanics

4 Fluid dynamics Type of flow Conservation of mass
Conservation of energy 2019/1/13 AE-5-Fluid Mechanics

5 Definition of fluid a substance that has particles that move easily relative to one another without separation of the mass a substance that deforms continuously when subjected to a shear force shear force is a force having a component tangent to a surface 2019/1/13 AE-5-Fluid Mechanics

6 A fluid : Liquids Gases May be a gas or a liquid.
have a definite volume and when placed into a container, occupy only that volume. nearly incompressible and can be treated as having this property without introducing appreciable error. Gases have no definite volume, and when placed in a container they expand to fill the entire container. compressible and must be treated as such to prevent the introduction of large errors. 2019/1/13 AE-5-Fluid Mechanics

7 Water Water is a liquid at ordinary temperatures and pressures, although it also exists in small quantities as a gas under these conditions. can be treated as an in­compressible fluid 2019/1/13 AE-5-Fluid Mechanics

8 physical properties Density of a liquid (); (kg/m3)
is the mass per unit volume. Specific weight ; (N/m3) is the weight per unit volume.  = g (9.1) g = acceleration of gravity (9.8 m/s2) 2019/1/13 AE-5-Fluid Mechanics

9 Physical properties Absolute viscosity; dynamic viscosity; viscosity; µ; pascal­seconds (Pa-s) Property of a fluid which offers resistance to shear stress. Kinematic viscosity; ; (m2/s) The ratio of the absolute viscosity of a fluid to its density  = µ/ (9.2) 2019/1/13 AE-5-Fluid Mechanics

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12 Fluid statics the study of fluids at rest
important concepts of fluid statics: variation of pressure intensity throughout the fluid, and the force exerted on surfaces by the fluid pressure intensity at any point in a fluid is the pressure per unit area 2019/1/13 AE-5-Fluid Mechanics

13 Fluid pressure average pressure intensity P = F/A (9.3)
whereF = normal force acting on area A (N) A = area over which force is acting (m2) P = pressure (Pa) pressure at a point in a motionless fluid 2019/1/13 AE-5-Fluid Mechanics

14 pressure at the bottom of the container
F = V F = Ah P = Ah/A P = h pressure at point 2 P = (h/2) pressure is the same at all points in the liquid that lie on the same horizontal plane 2019/1/13 AE-5-Fluid Mechanics

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16 Unit of pressure intensity
referenced to two reference planes absolute zero pressure (a complete vacuum) and atmospheric pressure Standard atmospheric pressure is the pressure used when specifying standard conditions for calculations with gases, it is also the pressure used to approximate the difference between a gauge pressure (錶壓) and absolute pressure (絕對壓力). 2019/1/13 AE-5-Fluid Mechanics

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18 = absolute pressure - actual atmospheric pressure
gauge pressure = absolute pressure - actual atmospheric pressure Actual atmospheric pressure may be either above or below standard atmospheric pressure Absolute pressure is always positive Gauge pressure may be either positive or negative. 2019/1/13 AE-5-Fluid Mechanics

19 Pressure measurement Manometers and bourdon tube (栓管) pressure gauges
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20 Manometer (壓力計) Ps + 1h1 + 2h2 = 3h3 + 4h4 2 = 3 = 4 = 
右肢開放至大氣 與大氣接觸點為 零錶壓 或 1  105 Pa 絕對壓力 2019/1/13 AE-5-Fluid Mechanics

21 Example 9.1 計算容器A之錶壓及絕對壓力
h1 = 3 m h2 = h3 = 2 m h4 = 6 m 流体 1: 油 (比重 0.9) and 流体 2: 水 (比重 1.0). 水之單位体積重 9800 N/m3. 2019/1/13 AE-5-Fluid Mechanics

22 PA + water (SGoil) h1 + h2water = h3water + h4water (9.14)
(SG) (water) = oil (9.13) PA + water (SGoil) h1 + h2water = h3water + h4water (9.14) h2 = h3, 管子 h2 及 h3 部分之液体相同, 9.14 式簡化為 PA + water (SGoil) h1 = h4water (9.15) PA + (9800 N/m3)(0.9)(3 m) = (6 m)(9800 N/m3) PA + 26,460 N/m2 = 58,800 N/m2 PA = 32,340 N/m2 錶壓 絕對壓力 = Pg + 標準大氣壓力 絕對壓力 = 32,340 N/m ,000 N/m2 = 132,340 N/m2 2019/1/13 AE-5-Fluid Mechanics

23 Example 9.2 Find the gauge pressure in vessel B (Figure 9.6)
PA = 3  105 Pa SG1 = 1 SG2 = 13.6 h1= 3m h2 = 1 m 2019/1/13 AE-5-Fluid Mechanics

24 PA + h1water (SG1) = h2 water (SG2) + PB
3  105 N/m2 + (3 m)(9800 N/m3)(1) = (1 m)(9800 N/m3) PB 3  105 N/m2 + 29,404 N/m2 = 133,280 N/m2 + PB 196,124 N/m2 gauge pressure = PB 2019/1/13 AE-5-Fluid Mechanics

25 圓筒容器爆破壓力(Burst Pressure)
圓筒容器: 例如圓管及圓槽使用時常受很大內部壓力(internal pressure) 需預測圓管及圓槽可承受之最大壓力 需推導出內部壓力與容器璧應力(stress)之關係 若容許應力(allowable stress )大於計算應力 (calculated stress), 容器可承受預期之壓力 2019/1/13 AE-5-Fluid Mechanics

26 內部壓力與璧應利關係 流體產生之內部壓力 容器璧產生之抵抗力(Resistance force) 求解得知璧應力,
Fp = PDL (9.16) 容器璧產生之抵抗力(Resistance force) Fp = 2Fw (9.17) Fw = wAw (9.18) (張應力) Fw = wttL (9.19) Fp = LDP = 2(wLtt) (9.20) 求解得知璧應力, w = LDP/2Ltt (9.21) w = DP/2tt 2019/1/13 AE-5-Fluid Mechanics

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29 這些因素設計時必須考慮而以安全因子 (safety factor SF)表示 安全因子為 容許應力與設計實際應力之比值
某些無法預測之因素會影響材料應力 這些因素設計時必須考慮而以安全因子 (safety factor SF)表示 安全因子為 容許應力與設計實際應力之比值 大部分管線系統 (plumbing systems) 安全係數為 2. 水槽(tanks)及其他容器安全係數為 w  A/SF (9.22) 2019/1/13 AE-5-Fluid Mechanics

30 容許工作壓力計算 nominal diameter = 5.08 cm; schedule 80 PVC pipe; ID = 4.93 cm; OD = 6.03 cm; SF = 2 tt = (OD - ID)/2 = (6.03 – 4.93)/2 = 0.55 cm allowable stress in PVC is 48 M Pa. w  A/SF w  (48 * 106 Pa)/2 w  24 * 106 Pa w = DP/2tt w = (4.93 cm)P/[2(0.55 cm)] 24 * 106 = ( m)P/[2( m)] P = 24 * 106 Pa (2)( m)/ m P = 5.35 M Pa 2019/1/13 AE-5-Fluid Mechanics

31 流體動力學 Type of flow Conservation of mass Conservation of energy
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32 Type of flow 層流(Laminar flow) and紊流(Turbulent flow)
層流中每一元素(element)以相同方向及相同速度移動 這些元素產生流線(streamlines)流線間以固定的關係移動 層流中不存在流線間內部漩渦(eddies) 及穿越流線之移動 2019/1/13 AE-5-Fluid Mechanics

33 層流在低流速, 小管徑及高黏滯度流體中較易發生. 易於發生紊流之條件剛好相反. 養殖工程應用之水流大部分為紊流
紊流 之特性 穿越流線之移動, 內部漩渦, 元素間其他移動. 紊流中能量損失比層流大, 因內部摩擦阻力大. 層流在低流速, 小管徑及高黏滯度流體中較易發生. 易於發生紊流之條件剛好相反. 養殖工程應用之水流大部分為紊流 2019/1/13 AE-5-Fluid Mechanics

34 質量守恆 密閉導管中, 通過某一段面之流體質量與通過其他段面者相等 質量平衡方程式 不可壓縮流體 1 = 2 (9.24)
v1A11 = v2A22 (9.23)  = 單位體積重 不可壓縮流體 1 = 2 (9.24) v1Al = v2A2 (9.25) 連續方程式(continuity equation) 由密閉管線中之不可壓縮流體推導, 但亦可應用於明渠(open channel flow)之不可壓縮流體 2019/1/13 AE-5-Fluid Mechanics

35 Find the velocity of the flow at section 2
0.5 m3/s flowing past section 1 and the pipe diameter at section 2 is 30 cm. v1A1 = v2A2 v1A1 = Q1 Q2 = 0.5 m3/s = v2A2 v2A2 =  (radius)2 v2 0.5 m3/s = v2  (0.30 m/2)2 0.5 m3/s = v2(0.0707) 7.07 m/s = v2 2019/1/13 AE-5-Fluid Mechanics

36 Conservation of energy
Total energy at any point in a fluid: potential energy due to location, potential energy due to pressure, and kinetic energy due to motion of the fluid. Potential energy due to its elevation (PE)e weight W  distance above the datum plane Z (PE)e1 = WZ (9.26) (PE)e2 = WZ (9.27) 2019/1/13 AE-5-Fluid Mechanics

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38 Pressure energy The pressure energy (PE)p is the weight of an element of fluid times its pressure. The fluid pressure h = P/ (PE)p = (P/)W (9.28) kinetic energy KE = (1/2)mv (9.29) m = W/g (9.30) KE = Wv2/2g (9.31) 2019/1/13 AE-5-Fluid Mechanics

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40 The total energy of an element of fluid Ee
Ee = ZW + (P/)W + (v2/2g) W (9.32) By the law of conservation of energy Z1W + (P1/)W+ (v12/2g)W = Z2W + (P2/)W + (v22/2g)W (9.33) Z1 + (P1/)+ (v12/2g) = Z2 + (P2/) + (v22/2g) (9.34) Bernoulli's equation, is applicable to flow of an idealized fluid that has no energy losses between points 1 and 2. 2019/1/13 AE-5-Fluid Mechanics

41 Real fluid Minor losses due to internal fluid friction
Z1 + (P1/)+ (v12/2g) + external energy input = Z2 + (P2/) + (v22/2g) + minor losses + pipe friction losses (9.35) Minor losses due to internal fluid friction (1) fluid passes through a change in cross-sectional area of the pipe, (2) the fluid changes direction, (3) the fluid enters or leaves a conduit, and (4) other changes occur that increase fluid losses. minor losses = K(v2/2g) (9.36) 2019/1/13 AE-5-Fluid Mechanics

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43 Calculation of head loss
nominal diameter 2.54 cm; 90o elbow; flow 60 liters/min of water; inside diameter 2.43 cm. Q = Av = 60 l/min = 1 liter/s 0.001 m3/s = Av = r2v v = (110-3 m/s)/[3.14((2.43/2)10-2 m)2] v = 2.2 m/s minor losses = K(v2/2g) minor losses = [0.9(2.2 m/s)2]/[2(9.8 m/s)] minor losses = 0.22 m of water 2019/1/13 AE-5-Fluid Mechanics

44 Frictional losses are a function of the fluid velocity, fluid density, diameter of the pipe, fluid viscosity, and pipe roughness. ff = f (v, D, , , ) (9.37) ff = friction factor v = velocity D = pipe diameter  = roughness (absolute)  = fluid density  = fluid viscosity f = function of 2019/1/13 AE-5-Fluid Mechanics

45 ff = f((vD/), (/D)) (9.38)
vD/ is referred to as Reynolds number /D is the relative roughness Nre < 2000 : laminar flow: ff = 64/Re (9.39) Nre > 4000: turbulent flow /D relates the height of irregularities on the internal pipe surface with the pipe diameter values for the dimensionless parameters : Moody's diagram 2019/1/13 AE-5-Fluid Mechanics

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49 Once the friction factor is determined, the head loss due to pipe friction can be computed
h = ff (L/D)(v2/2g) (9.40) h = head loss due to pipe friction (m) ff = friction factor (dimensionless) L = length of pipe (m) D = pipe diameter (m) v = fluid velocity (m/s) g = acceleration of gravity (m/s2) 2019/1/13 AE-5-Fluid Mechanics

50 Head loss in a pipe L = 100 m; nominal diameter 7.62 cm; galvanized pipe; flow 0.6 m3/min of water at 20°C; internal diameter 7.37 cm. Q = Av 0.6 m3/min = ( m/2)2 v 0.64/[3.14(0.0054)] = v 141.5 m/min = v 2.36 m/s = v Reynolds number = Re = vD/ = vD/ Kinectic viscosity of water at 20°C = 1.1  10-2 cm2/s  Re = [2.36 m/s (7.37  10-2 m)]/1.1  10-6 m2/s Re = 15.8  104 2019/1/13 AE-5-Fluid Mechanics

51 From Moody's diagram ff = 0.0194 h = ff (L/D)(v2/2g)
Table 9.3  = cm ; D = 7.37 cm; /D = ; From Moody's diagram ff = h = ff (L/D)(v2/2g) = [ (100 m/ m)][(2.36 m/s)2/(29.8 m/s2)] = 7.48 m head loss 2019/1/13 AE-5-Fluid Mechanics

52 External energy addition by pump
The energy put into a system by a pump Ep is the product of the weight of fluid W times the total head hp, which is being pumped against EP = Whp (9.41) 2019/1/13 AE-5-Fluid Mechanics

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54 galvanized pipe; 10 cm in diameter; 200 m long; h1 20 m; h2 = 30 m.
Discharge from pipe galvanized pipe; 10 cm in diameter; 200 m long; h1 20 m; h2 = 30 m. The valve at the foot is a fully open gate valve. Reynolds number = 1  105 hfit = loss due to square edge entrance + loss due to gate valve hfit = K1(v12/2g) + K2(v22/2g) 2019/1/13 AE-5-Fluid Mechanics

55 head loss due to pipe friction hf = ff(L/D) (v22/2g)
From Table 9.2 K1 = 0.5 and K2 = 0.19 hfit = ( )[v22/(2(9.8))] hfit = v22 head loss due to pipe friction hf = ff(L/D) (v22/2g) relative roughness cm/10 cm = Re = 1  105 ff = 0.024 hf = 0.024(200 m/0.1 m)[v22/2(9.8 m/s2)] h = 2.45 v22 2019/1/13 AE-5-Fluid Mechanics

56 Equation 9.43 gives 50 = v22/[2(9.8 m/s2)] + 0.0352 v22 + 2.45 v22
50 = v v v22 50 = 2.54 v22 19.69 = v22 4.44 m/s = v2 Q = Av Q = R2v Q = 3.14(0.10 m/2)2 (4.44 m/s) Q = m3/s 2019/1/13 AE-5-Fluid Mechanics

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58 Open channel flow A conduit in which the liquid flows with a surface open to the atmosphere. zero gauge pressure at channel water surface Gravitational flow v = CRySx (9.44) v = velocity of flow C = constant R = hydraulic radius (defined below) S = channel slope x and y = exponents (constants) 2019/1/13 AE-5-Fluid Mechanics

59 hydraulic radius (水力半徑) R = A/Pw (9-47)
area of flowing fluid A = hb (9.45) wetted perimeter (潤周) Pw = 2h + b (9.46) hydraulic radius (水力半徑) R = A/Pw (9-47) R for the rectangular channel R = bh/(2h + b) (9.48) channel slope S is the slope of the channel along its length Manning's equation v = 90R2/3S1/2 (9.49) 2019/1/13 AE-5-Fluid Mechanics