Post on 30-Jun-2018
PIPE FLOW
Laminar Flow in Pipes
�Fluid is incompressible and Newtonian.
�Flow is steady, fully developed, parallel and,
symmetric with respect to pipe axis.
�Pipe is straight pipe and has a constant diameter.
Laminar Flow in Pipes
• Momentum Equation
z1 z2
x
dxθθθθ
τr
Datum
p+(dp/dx)dx
p
r0
+
γ=
γ
τ+=
γ
γ+−=−
τ=
γ+−
π=
=πτ−γ−−
=πτ−θγ−
+−
zp
h since r
2
dx
)zp(d
dx
dh
r
2
dx
)zp(d
)r Aby sidesboth (Divide
0rdx2Adx
dzdxdxA
dx
dp
0rdx2sinAdxAdxdx
dpppA
2
z
1
z
2
x
dx
θθθθ
τ
rp+(dp/dx)dx
pr0
(Constant velocity thus a=0)
Boundary Conditions
when r = 0 , τ = 0
r = ro , τ = τw o
w
r
2
r
2
dx
dh
γ
τ=
γ
τ=−
r
2
dx
)zp(d
dx
dh
γ
τ+=
γ
γ+−=−
ττττ = ττττw (1- r / r0)
τw.....wall shear stress
equations are equally applicable to both laminar
and turbulent flow in pipes
Laminar Flow
(2) 2
r
dx
)zp(d
(1) dr
du
dy
du
γ+−=τ
µ−=µ+=τ
µ
γ++=
2
r
dx
)zp(d
dr
du
τy
r
τw
CL
Boundary Conditions
µ
γ++=
2
r
dx
)zp(d
dr
du
C4
r
dx
)zp(d)r(u
2
+µ
γ+=
u = u(r) may be solved by integration
r = 0 , u = umax
( )
−
µ
γ+−=
2
o
2
o
r
r1
4
r
dx
zpdu Parabolic profile
Poiseuille Flow
r = ro ; u = 0
• Velocity:
• Average velocity:
• Maximum velocity:
• Wall shear stress:
• Shear stress:
• Flow rate:
• Head loss:
( )µ
γ+−=
4
r
dx
zpdu
2o
max
ow
r
V4µ=τ
ow
r
r
dr
duτ=µ−=τ
( )dx
zpd
8
rAVQ
4o γ+
µ
π−==
dx
)zp(d
dx
dh
L
hf
γ
γ+−=−=
( )µ
γ+−==∫==
8
r
dx
zpd
2
u
A
dau
A
QV
2omax
( )
−
µ
γ+−=
−=
2
o
2o
2
omax
r
r1
4
r
dx
zpd
r
r1uu
Turbulent Flow : Re ≥ 4000
R = D /2
V i s c o u s s u b l a y e r
V e l o c it y
p ro fi le , u = u (y )
y
x
δ s
Smooth wall
εδs
Rough wall
εε δs
(a) Smooth wall (b) Transitional flow (c) Rough wall
Velocity very small near wall
Thus flow must be laminar!!
This region is called
Viscous sub-layer
(a) smooth wall and (b) a rough wall.
Shear velocity
Average velocity in laminar flow
Viscous sublayer thickness
Smooth wall
Rough wall
Laminar and Turbulent
slope
slope
Laminar Turbulent
τwτw
τw,turb > τw,lam
Comparison of laminar and turbulent flow
Laminar
• Can solve exactly Flow is steady
• Velocity profile is parabolic
• Pipe roughness not important
Turbulent• Cannot solve exactly (too complex)
• Flow is unsteady , but it is steady in the mean
• Mean velocity profile is fuller (shape more like a top-hat profile, with very sharp slope at the wall)
• Vavg 85% of Umax (depends on Re a bit)
• Pipe roughness is very important
• No analytical solution, but there are some good semi-empirical expressions that approximate the velocity profile shape. Instantaneous
profiles
Darcy Weisbach Equation
• Consider a steady fully developed flow in a prismatic pipe
(A = constant along centerline)
R
W
z1 z2
CV
p2A2p1A1
Ff
1
2
Wsinθθθθ
θ
V2 x
L
V1
Wcosθθθθsθθθθ
Relation between wall shear stress and head loss
)zz(AsinAL
sinALsinW
21 −γ=θγ
θγ=θPLF wf τ=
0PL)zz(AApAp w212211 =τ−−γ+−
Constant VA AV AV Q 2221 ====
)VV(QFsinWApAp 1122f2211 β−βρ=−θ+−
A
LPpz
pz w2
21
1γ
τ=
γ−−
γ+
12 VV =
)A/(1 γ12 AAA ==
0
Relation between wall shear stress and head loss
4
D
P
AR h ==
A
LPpz
pz w2
21
1γ
τ=
γ−−
γ+
H
ww
R
L
A
LP
γ
τ=
γ
τ
H
w22
11
R
Lpz
pz
γ
τ=
γ−−
γ+
2D4
Aπ
= DP π=
Hydraulic Radius
Relation between wall
shear stress and head loss
H
w22
11
R
Lpz
pz
γ
τ=
γ−−
γ+ f
22
11 h
pz
pz =
γ−−
γ+
D
L4h w
fγ
τ=
Energy equation
between section 1 and 2
D
L4
R
L2
R
Lh ww
H
wf
γ
τ=
γ
τ=
γ
τ=
Darcy – Weisbach Friction Factor
Laminar Flow: Re ≤ 2000
u(r)
umax
r
g2
V
D
L
R
64
D
VL32
2V
2V
D
VL32
r
VL8h
2
e222
o
avf =
γ
µ=
γ
µ=
γ
µ=
g2D
LVfh
2
f =
R
64f
e
=
Darcy Weisbach Equation
D
L4h w
fγ
τ=
ow
r
V4µ=τ
Friction factor for Turbulent Flows
For hydraulically smooth pipe,
f=f(Re) only
For frictionally transition zone:
f=f(Re, ε/D)
For fully rough pipe:
f=f(ε/D) only.
Formula for friction factors in Turbulent flows
−=
fR
51.2log2
f
1
e
ε+−=
D7.3fR
51.2log2
f
1
e
ε=
D,Rfuncf e
Smooth Pipe and Hydraulically Smooth Flow
Colebrook - White – Transitional Flow
ε−=
D7.3log2
f
1
ε=
Dfuncf
Rough Pipe-
Hydraulically Rough Flow
( )eRfuncf =
Swamee – Jain Formula (Explicit)
2
9.0eR
74.5
D7.3ln
325.1f
+
ε
=
8e
26 10R5000and10D/10 <<<ε< −−for the range of
Moody’s Diagram
Moody diagram. (From L.F. Moody, Trans. ASME, Vol.66,1944.) (Note: If e/D = 0.01
and Re = 104, the dot locates ƒ = 0.043.)
Determination of Friction Loss (hf):
• Darcy - Weisbach Equation
• Hazen-Williams Equation
22
25
2
f KQg2
Q16
D
Lf
g2
V
D
Lfh =
π==
85.185.1
87.485.1
85.1
165.185.1f KQQD
L
C
6.10V
D
L
C
8.6h ===
85.1
165.185.1f VD
L
C
8.6h =
g2
V
D
Lfh
2
f =
Roughness Coefficients
Material Hazen-Williams
C
Manning’sCoefficient
n
Darcy-WeisbachRoughness
Height
εεεε (mm)
Asbestos cementBrassBrick Cast-iron, newConcrete:
Steel formsWooden formsCentrifugally spun
CopperCorrugated metalGalvanized ironGlassLeadPlasticSteel:
Coal-tar enamelNew unlinedRiverted
Wood stave
140135100130140120135135---
120140135150148145110120
0.0110.0110.0150.0120.0110.0150.0130.0110.0220.0160.0110.0110.0090.0100.0110.0190.012
0.00150.0015
0.60.260.180.6
0.360.0015
450.15
0.00150.00150.00150.00480.0450.9
0.18
,
Total Head Loss
hf – Friction (Viscous, Major) loss
hm – Local (Minor) loss
h= hf + hm
COMPUTATION OF FLOW IN SINGLE PIPES
VariableType of the problem
Type I Type II Type III
Fluid DensityViscosity
GG
GG
GG
Pipe DiameterLengthRoughness
GGG
GGG
D or GG
G or D
Flow Flowrate, or Average velocity G D G
Pressure Pressure Drop, or Head loss D G G
G- Given D- to be determined
1) Determination of Head Loss (Type I)
• Given : Q (or V), L, D, νννν, εεεεFind : hf
1)
2)
3) εεεε/D
4) f(Re,εεεε/D) is determined (from Moody Chart or Eqs.)
5) hf is computed
)4
DV Q(or
4 2
2
π
π==
D
QV
0hcesinhh and hHH mf21 ==+= λλ
HHh 21f −=
g2
VpzH
2
+γ
+= 2
52f
2
f QDg
fL8hthenA/QVcesin
g2
V
D
Lfh
π===
νπ=
ν D
Q4VD = Re
Example 1 (Type-I problem):
• A galvanized iron pipe with a roughness height of 5x10-6 m with a diameter of 0.05 m and a length of 100 m carries a discharge of 0.003 m3/s. Calculate the head loss.
• Cross section area A = 3.14159 * (0.025) * (0.025) = 0.001963 m2
• Velocity V = 0.003 / 0.001963 = 1.528 m/s
• Reynolds Number = 1.528 * 0.05 * 106 = 76,394
• Iron Pipe =====� Relative roughness = 5x10-6 / 0.05 = 0.0001
• f = 0.0195 from the Chart
νπ=
ν D
Q4VD = Re
Moody diagram. (From L.F. Moody, Trans. ASME, Vol.66,1944.) (Note: If e/D = 0.01
and Re = 104, the dot locates ƒ = 0.043.)
Example 1
π - 3.141592
EXAMPLE g m/s29.81
for water ρ kg/m31000
for water µ kg/m.s 0.001
for water ν m2 /s 0.000001
A galvanized iron pipe with a roughness height of 0.000005 m
with a diameter of 0.05 m
and a length of 100 m
carries a discharge of 0.003 m3 /s
its x-section is 0.001963 m2
and water flows with a velocity of 1.528 m/s
Flow Reynolds number is 76394
and the relative roughness is 0.0001
using S-J formula the friction factor is obtained as 0.01941
The head loss in the pipe is found to be 4.620 m
2) Determination of average velocity (Type II)
Given: hf, L, D, υυυυ, εεεε
Find : V
Since f depends on V through Re, and V is unknown a priori, iteration is needed
g2
V
D
Lfhh , hHH
2
f21 ==+= λλ
( ) fL
gD2h
fL
gD2HHV f21 =−=
(hm ≈ 0)
Re=VD/ν
ε/D
V,D,ν
Moody Chart or Eqs.
νπ=
ν D
Q4VD = Re
Solution procedure (Type II):
1. Calculate relative roughness
2. Select friction factor,
(assume completely rough turbulent
flow); f(i) = f(0)
3. Calculate velocity;
4. Calculate Reynolds number;
5. Determine f by using data from
Step1 and 4; f(i+1) (use Moody
Chart, or Equation)
6. Check if f(i+1) = f(i);?
7. no, go to step 3 with f(i+1)
8. yes, continue
9. Calculate Q or V
D
ε
fL
g2DhV f=
4
DVQ
2π=
f(i) = f(0)
ν=
VDRe
Given: hf, L, D, υυυυ, εεεε Find : V
Iteration Table
f (i) V Re f (i+1)*
f(0) Assumed calculated calculated f (1)-determined
f (1) calculated calculated f (2) -determined
f (2) calculated calculated f (3) -determined
.
. iteration is
.
.
. stopped
.
.
. when
.
.
. f(i)=f(i+1)
.
f (i) f (i+1)
* obtained from Moody Chart, or determined using equations.
fL
g2DhV f=
ν=
VDRe
• Given: hf, L, D, υυυυ, εεεε.• Find : V
Example 2 (Type-II problem):
• Example 2.2 (Type-II problem): A galvanized iron pipe with a roughness height of 5x10-6 m with a diameter of 0.05 m and a length of 100 m has experienced head loss of 10 m. Calculate the flow rate.
EXAMPLE
e - 2.718282
π - 3.141592
g m/s29.81
for water ρ kg/m31000
for water µ kg/m.s 0.001
for water ν m2 /s 0.000001
A galvanized iron pipe with a roughness height of ε 0.000005 m
with a diameter of D 0.05 m
and a length of L 100 m
has experienced head loss of hf 10 m
its x-section is A 0.00196 m2
and the relative roughness is ε/D 0.0001
carrying out an iterative solution procedure i fi V Re fi+1 ∆f
0 0.02 2.215 110736.2 0.018105 -0.00189
1 0.01811 2.328 116387.2 0.017944 -0.00016
2 0.01794 2.338 116909.4 0.017929 -1.4E-05
3 0.01793 2.339 116956.2 0.017928 -1.3E-064 0.01793 2.339 116960.4 0.017928 -1.1E-07
one obtains the friction factor and velocity (m/s) 5 0.01793 2.339 116960.8 0.017928 -1E-08
hence the discharge is obtained as Q 0.00459 m3 /s
Example 2 (Type-II problem):
• Example 2.2 (Type-II problem): A galvanized iron pipe with a roughness height of 5x10-6 m with a diameter of 0.05 m and a length of 100 m has experienced head loss of 10 m. Calculate the flow rate.
D = 0.05 mg = 9.81 m/s2
L = 100mhf = 10m
= 5 * 10-6
fL
g2DhV f=
ν=
VDRe
εεεε
D
ε= 5*10-6 / 0.05 = 0.0001
f = 0.012 assuming fully rough flow
V2 = [ (10*0.05*2*9.81) / (0.012*100) ] = 8.175 V= 2.8592 m/s
Re = 2.8592 * 0.05 / 10-6 = 1.43 * 105
f = 0.0165 Since not the same with the previous continue iteration
Initial f V (m/s) Re (106) Final f Del f
0.012 2.8592 0.143 0.0165 0.0045
0.0165 2.4383 0.122 0.017 0.0005
0.017 2.4022 0.120 0.017 0
Moody diagram. (From L.F. Moody, Trans. ASME, Vol.66,1944.) (Note: If e/D = 0.01
and Re = 104, the dot locates ƒ = 0.043.)
........................................................................................................
3) Determination of Diameter (Type III)
• Given: hf, L, Q, νννν, εεεε. Find : D
1. Assume f(i) = f(0) (arbitrarily 0.02)
2. Calculate pipe diameter
3. Calculate Reynolds number
4. Calculate relative roughness
5. Determine friction factor, f(i+1) use Moody Chart or Equations
6. Check if f(I+1) = f(i) ; ?
7. if no, go to step 2 with f(i+1)
8. if yes, stop. Diameter Calculated at Step 2 is the result.
9. Select the next larger commercially available pipe diameter size
5/1
5/1
2
2
52
2
fgh
LQ8
gh
LQ8fD
π=
π=
λλ
νπ=
ν=
D
Q4VDRe
D
ε
Iteration Table
f (i) D Re εεεε/D f (i+1)*
f(0)
Assumed
calculated calculated calculated f (1)-determined
f (1) calculated calculated calculated f (2)-determined
f (2) calculated calculated calculated f (3) -determined
..
.
.
. iteration is
.
.
. stopped
.
.
. when
.
.
. f(i)=f(i+1)
.
f (i) calculated calculated calculated f (i+1)- determined
5/1
5/1
2
2
52
2
fgh
LQ8
gh
LQ8fD
π=
π=
λλνπ
=ν
=D
Q4VDRe
D
ε
Example 2.3 (Type-III problem):
A galvanized iron pipe with a roughness height of 0.00005 m and a length of 100 m under the head loss of 10 m delivers discharge of 0.003 m3/s. Calculate pipe diameter.
EXAMPLE
e - 2.71828
π - 3.14159
g m/s2 9.81
ρ kg/m3 1000
µ kg/m.s 0.001
ν m2 /s 1E-06
A galvanized iron pipe with a roughness height of ε m 0.00005
with a length of L m 100under the head loss of hf m 10
delivers discharge of Q m3 /s 0.003
carrying out an iterative solution procedure i fi D A V Re ε/D fi+1 ∆f
0 0.02 0.0431 0.00146 2.05624 88624.3 0.00116 0.02312 0.00312
1 0.02312 0.0444 0.00155 1.94025 86088.5 0.00113 0.02308 -4E-05
2 0.02308 0.0444 0.00155 1.94169 86120.4 0.00113 0.02308 5.2E-07
3 0.02308 0.0444 0.00155 1.94168 86120 0.00113 0.02308 -6E-094 0.02308 0.0444 0.00155 1.94168 86120.1 0.00113 0.02308 7.7E-11
one obtains the friction factor and velocity (m/s) 5 0.02308 0.0444 0.00155 1.94168 86120.1 0.00113 0.02308 -9E-13
hence the discharge is obtained as D 0.0444 m