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THERMOFLUIDS, Level5
Lecture 9 – Fluids (Internal & External Flows)
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-Turbulence origins
-Boundary layer
-External flows; Viscous & Turbulent, Drag & Lift coefficient, Stokes Law
-Internal flows; Viscous & Turbulent, Velocity profile, Velocity pressure, Blasius equation,
Friction factors (f), Mean & max velocity, Darcy-Weisbach equation, Moody Chart
Turbulence origins
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Turbulent flow occurs when inertial forces dominate fluid flow, as opposed to viscous forces which dominate laminar
flow.
Turbulent flow – unsteady, disordered. Can be characterised by turbulent length scales.
Laminar flow – highly ordered smooth layers.
Bulk velocity may be same for
laminar & turbulent flow, but
individual particle velocity
unsteady. Greater energy transfer
within fluid, and between fluid and
boundary.
Boundary layer
3
•Boundary layer flow, shear stress and viscosity determine
skin friction.
•In both laminar and turbulent flows, the velocity is not uniform
but varies from zero at the surface to a maximum some
distance away.
•Velocity distribution is dependent upon the Reynolds number
which defines type of flow.
External flows – Viscous flow
4
Two distinct geometrical cases exist for fluids flows, in addition, fluids may flow in 2 regimes; laminar flow (or
viscous flow) and turbulent flow.
External flow – where a body (eg automotive vehicle, ship, aircraft) moves relative to a body of fluid.
Boundaries are infinite.
Internal flow – where fluid moves relative to external geometry (eg pipe or duct).
Stokes Law
(creeping flow)
D=2r V (m/s) Fluid dynamic viscosity
μ (kg/ms)
Using dimensional analysis
(density omitted as for creeping flow, inertial forces negligible),
Force F=const.raμbvc
The constant of proportionality has been shown to be equal to 6π, hence:
Fsphere= 6πrμv
Stokes Law (valid for very low Re, ‘creeping flow’)
External flows – Viscous flow – Cont…
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A sphere has projected area πr2 and the fluid has relative velocity pressure of (ρv2/2). If the drag force is
divided by the projected area to become pressure, and then divided by the relative velocity pressure, a new
dimensionless group is formed:
DIA
D
sphere
vrvr
vC
vr
F
Re
2412
2/
6
)2/)(( 222
Where CD is the drag coefficient
Holds for ReDIA <0.1-2.0 (limit for external viscous flow)
Application – particles falling under gravity, at terminal
velocity where force due to gravity = drag. Terminal
velocity given by:
18
)(2
min
gDv
fluidsolid
alter
(valid for
sphere only,
creeping flow)
External flows – Turbulent flow
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As flow velocity increases, separation occurs and turbulence commenses in whole or in part (diagrams below
relate to simplified case of 2D cylinder – infinitely long).
Re<0.5
103<Re<2x105
Re>2x105
When separation takes place,
streamlines do not recover fully
downstream, nor does the static
pressure. The resulting ∆P gives
another component of drag – form or
profile drag, in addition to surface or
skin drag.
Form drag is dominates at high Re.
At Re>100,000 the boundary layer itself
becomes turbulent, which has the effect
of delaying stagnation and separation,
paradoxically reducing drag.
External flows – Turbulent flow – Cont…
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Strong differences in boundary layer
separation on a 8.5inch ball entering water at
25ft/sec. (a) smooth ball, laminar boundary
layer, (b) turbulent boundary flow induced by
patch of nose roughness.
Boundary
layer transition
DIA
DCRe
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External flows – Drag & Lift
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Drag Coefficient:
Although CFD used increasingly for computation of forces acting on complicated geometries,
traditionally this has been achieved through experimental determination of drag coefficients.
In general, drag coefficient defined as:
AU
FC D
D2
2
1
CD=drag coefficient
FD=Force
ρ=density
U=free-stream velocity
A=projected area
2D shapes – the cylinder (A) and the airfoil (B) have the same frontal area, but the drag on the
cylinder is much greater.
External flows – Drag & Lift – Cont…
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Lift Coefficient:
Defined in a similar way to drag coefficient, but reference area is normally plan area (eg aircraft
wing chord x span):
AU
FC L
L2
2
1
CL=lift coefficient
FL=Lift force
ρ=density
U=free-stream velocity
A=projected area
Effect of ground proximity on the
aerodynamic lift and drag of an
ellipsoid
(width/height=1.25,length/height=
3.6,max thickness is at 1/3length)
External flows – Drag & Lift – Cont…
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Internal flows – Viscous flows
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Examples – airflow in ducts, water flow in pipes
Vmean (m/s)
Fluid dynamic viscosity
μ (kg/ms)
r=D
/2 (
m)
Q (m3/s)
Length, L (m)
Pressure drop, ∆P (Pa)
Variables in system:
Volume flow-rate, Q
Radius of duct, r
Dynamic viscosity, μ
Length, L
Pressure drop, ∆P
Mean velocity, v, and diameter D are not independent
variables as they are calculable from Q,r.
Internal flows – Viscous flows – Cont…
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Dimensions:
[Q]=L3T-1
[μ]=ML-1T-1
[r]=L
[∆P/L]=ML-2T-2
Using dimensional analysis:
Q=k μarb (∆P/L)c
L3T-1= (ML-1T-1) a(L)b (ML-2T-2)c
→a=-1, b=4, c=1.
The constant of proportionality has been
shown =π/8.
L
PrQ
8
4
Poiseuille’s equation (valid for low speed
viscous/Laminar flow only, where viscosity not
turbulence is the mechanism for resistance to
flow)
It may also be expressed:
4 as,
32 22
2
vDvrQ
D
LvP
The pressure-drop ∆P, is related to the shear-
stress at the wall τwall. The force balance is:
2
2 32
D
4 thus,
4 D
LvLDL
DP wallwall
Dividing both sides by velocity pressure, the
reference for moving fluid:
∆P x Area = ShearStress x Area
222 )2/v(
32
)2/v(
4
D
Lv
D
Lwall
The term
2/v2
wall is known as the fanning friction factor f
Re
1616
vDf
(Valid for viscous,
laminar flow)
Internal flows – Viscous flows - Velocity profile
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meany
y
y
y
uu
r
L
Pu
and
r
y
u
u
2
4
)(1
0
2
0
2
2
0
For laminar flow, the velocity profile inside a tube of diameter
2r, distance y from centre-line is:
Internal flows – Turbulent flows – Velocity profile
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Poiseuille’s analysis breaks down as laminar flow ceases to apply. Dimensional analysis is more complex but
states friction factor(f) is a function of Reynolds number(Re) and wall roughness ratio(k/D).
A
Qu
uu
and
r
y
u
u
mean
meany
y
y
817.0
)(1
0
7
1
0
For turbulent flow, the velocity profile inside a duct, diameter D, distance y from the
centre-line is:
Internal flows – Turbulent flows – Dimensional analysis
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Determining friction factor(f)
Variables in system:
Density, ρ
Velocity, u
Diameter, D
Dynamic viscosity, μ
Roughness, k
Wall shear stress, τ
Dimensions: [L], [M], [T]
According to Buckingham,s law, must be 6-3=3
dimensionless groups. These groups are:
Relative roughness = k/D
f/2 = τ/(ρu2)
Reynolds number, Re= ρuD/ μ
The relationship between these groups is complex.
Various engineers have presented solutions applicable to
different ranges of fluid flow (Re).
•Colebrook and White give, for Re>2100
f-0.5=-4log10(0.27k/d+1.255(Re)-1f-0.5)
This equation is not explicit and has to be solved
iteratively.
•Moody gives, approximately for 4000<Re<10,000,000,
k/d<0.01
f=0.001375(1+(20,000(k/d)+1,000,000/Re)0.33)
•Blasius gives, for k/d=0 (smooth pipes) and
4,000<Re<100,000
f=0.079Re-0.25
•Poiseuille gives, for Re<2100
f=16/Re
The results for these
empirical equations are
presented in the Moody chart.
This allows friction factor(f) to
be determined once Re and k/d are known.
2
42u
D
fLP
Pressure loss in a pipe (generated by equating
force due to shear-stress to force due to
pressure-drop) given by Darcy-Weisbach
equation:
∆P=Pressure drop
f=friction factor
L=length of pipe
ρ=density
u=mean velocity
D=diameter of pipe
Internal flows – Moody chart
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Turbulent flow
Blasius, f=0.079/Re0.25
Internal flows – Pipe and Duct pressure losses and flows
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(three methods of
investigating or
sizing pipes)
References
• Fluid Mechanics – Douglas, Gasiorek, Swaffield (Published Longman Scientific & Technical)
• Introduction to Fluid Mechanics – Shaughnessey, Katz, Schaffer (Published Oxford University Press)
• Race Car Aerodynamics, Designing for Speed – Joseph Katz (Published Robert Bently)
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