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Lecture # 12
Dimensional Analysis And Similitude & Model Analysis
Dimensional Analysis Introduction: Dimensional analysis is a mathematical
technique making use of study of dimensions. This mathematical technique is used in research work for
design and for conducting model tests. It deals with the dimensions of physical quantities
involved in the phenomenon. All physical quantities are measured by comparison, which is made with respect to an arbitrary fixed value.
In dimensional analysis one first predicts the physical parameters that will influence the flow, and then by, grouping these parameters in dimensionless combinations a better understanding of the flow phenomenon is made possible.
It is particularly helpful in experimental work because it provides a guide to those things that significantly influence the phenomena; thus it indicates the direction in which the experimental work should go.
Types of Dimensions There are two types of dimensions
Fundamental Dimensions or Fundamental Quantities Secondary Dimensions or Derived Quantities
Fundamental Dimensions or Fundamental Quantities: These are basic quantities. For Example; Time, T Distance, L Mass, M
Types of Dimensions Secondary Dimensions or Derived Quantities The are those quantities which possess more than one
fundamental dimension.
For example; Velocity is denoted by distance per unit time L/T Acceleration is denoted by distance per unit time square L/T2
Density is denoted by mass per unit volume M/L3
Since velocity, density and acceleration involve more than one fundamental quantities so these are called derived quantities.
Methodology of Dimensional Analysis The Basic principle is Dimensional Homogeneity, which
means the dimensions of each terms in an equation on both sides are equal.
So such an equation, in which dimensions of each term on both sides of equation are same, is known as Dimensionally Homogeneous equation. Such equations are independent of system of units. For example;
Lets consider the equation V=(2gH)1/2
Dimensions of LHS=V=L/T=LT-1
Dimensions of RHS=(2gH)1/2=(L/T2xL)1/2=LT-1
Dimensions of LHS= Dimensions of RHS So the equation V=(2gH)1/2 is dimensionally
homogeneous equation.
Methods of Dimensional Analysis If the number of variables involved in a physical phenomenon are
known, then the relation among the variables can be determined by the following two methods; Rayleigh’s Method Buckingham’s π-Theorem
Rayleigh’s Method: It is used for determining expression for a variable (dependent)
which depends upon maximum three to four variables (Independent) only.
If the number of independent variables are more than 4 then it is very difficult to obtain expression for dependent variable.
Let X is a dependent variable which depends upon X1, X2, and X3 as independent variables. Then according to Rayleigh’s Method
X=f(X1, X2, X3) which can be written as
X=K X1a, X2
b, X3c
Where K is a constant and a, b, c are arbitrary powers which are obtained by comparing the powers of fundamental dimensions.
Rayleigh’s Method Q. The resisting force R of a supersonic plane during flight can be considered as
dependent upon the length of the aircraft l, velocity V, air viscosity μ, air density ρ, and bulk modulus of air k. Express the functional relationship between the variables and the resisting force.
-2 1 1 1 3 1 2
( , , , , ) , , , , (1)
Where: A = Non dimensional constant
Substituting the powers on both sides of the equation
( ) ( ) ( ) ( )
Equating the powers of MLT on both
a b c d e
a b c d e
R f l V K R Al V K
MLT AL LT ML T ML ML T
sides
Power of M 1
Power of L 1 - -3 -
Power of T 2 - - - 2
c d e
a b c d e
b c e
Solution:Solution:
Rayleigh’s MethodSince the unkown(5) are more than number of equations(3). So expressing
a, b & c in terms of d & e
1- -
2 - - 2
1- 3 1- (2 - - 2 ) 3(1- - )
1- 2 2 3-3 -3 2 -
Substituting the values
d c e
b c e
a b c d e c e c c e e
c e c c e e c
2 2 2 1 2 2 2
2 22
2 22
in (1), we get
( )( )c c e c c e e c c c c e e e
c e
R Al V K Al V l V V K
KR A l V
Vl V
KR A l V
Vl V
Buckingham’s π-Theorem: Buckingham’s π-Theorem: Since Rayleigh’s Method
becomes laborious if variables are more than fundamental dimensions (MLT), so the difficulty is overcome by Buckingham’s π-Theorem which states that
“If there are n variables (Independent and Dependent) in a physical phenomenon and if these variables contain m fundamental dimensions then the variables are arranged into (n-m) dimensionless terms which are called π-terms.”
Let X1, X2, X3,…,X4, Xn are the variables involved in a physical problem. Let X1 be the dependent variable and X2, X3, X4,…,Xn are the independent variables on which X1 depends. Mathematically it can be written as
X1=f(X2 ,X3 ,X4 ,Xn) which can be rewritten as
f1(X1,X2 X3 X4 Xn)=0 Above equation is dimensionally homogenous. It contain n variables
and if there are m fundamental dimensions then it can be written in terms of dimensions groups called π-terms which are equal to (n-m)
Hence f1(π1 π2 π3,… πn-m)=0
Buckingham’s π-Theorem: Properties of π-terms:
Each π-term is dimensionless and is independent of system of units.
Division or multiplication by a constant does not change the character of the π-terms.
Each π-term contains m+1 variables, where m is the number of fundamental dimensions and also called repeating variable.
Let in the above case X2, X3, X4 are repeating variables and if fundamental dimensions m=3 then each π-term is written as
Π1=X2a1. X3
b1. X4a1 .X1
Π2=X2a2. X3
b2. X4a2 .X5
.
.
Πn-m=X2a(n-m). X3
b(n-m). X4a(n-m) .Xn
Each equation is solved by principle of dimensionless homogeneity and values of a1, b1 & c1 etc are obtained. Final result is in the form of
Π1=(Π2, Π3, Π4 ,…, Π(n-m))
Π2=(Π1, Π3, Π4 ,…, Π(n-m))
Methods of Selecting Repeating Variables The number of repeating variables are equal to number
of fundamental dimensions of the problem. The choice of repeating variables is governed by following considerations; As far as possible, dependent variable should’t be selected as repeating
variable The repeating variables should be chosen in such a way that one
variable contains geometric property, other contains flow property and third contains fluid property.
The repeating variables selected should form a dimensionless group The repeating variables together must have the same number of
fundamental dimension. No two repeating variables should have the same dimensions.
Note: In most of fluid mechanics problems, the choice of repeating variables may be (i) d,v ρ, (ii) l,v,ρ or (iii) d, v, μ.
Buckingham’s π-Theorem: Q. The resisting force R of a supersonic plane during flight can be
considered as dependent upon the length of the aircraft l, velocity V, air viscosity μ, air density ρ, and bulk modulus of air k. Express the functional relationship between the variables and the resisting force.
1 2 3
( , , , , ) ( , , , , , ) 0
Total number of variables, n= 6
No. of fundamental dimension, m=3
No. of dimensionless -terms, n-m=3
Thus: ( , , ) 0
No. Repeating variables =m=3
Repeating variables = ,
R f l V K f R l V K
f
l
1 1 11
2 2 22
3 3 33
,
π-terms are written asa b c
a b c
a b c
V
Thus
l V R
l V
l V K
Buckingham’s π-Theorem: Now each Pi-term is solved by the principle of dimensional
homogeneity1 1 1 3 1 2
1
1 1
1 1 1 1
1 1
( ) ( )
Equating the powers of MLT on both sides, we get
Power of M: 0=c +1 c =-1
Power of L: 0=a +b -3c +1 2
Power of T: 0=-b -2 b =-2
o o o a b cterm M L T L LT ML MLT
a
-2 -2 -21 1 2 2
2 1 2 3 2 1 12
2 2
2 2 2 2
( ) ( )
Equating the powers of MLT on both sides, we get
Power of M: 0 1 -1
Power of L: 0 -3 -1 1
Pow
o o o a b c
Rl V R
LV
term M L T L LT ML ML T
c c
a b c a
2 2
-1 -1 -12 2
er of T: 0 - -1 -1
b b
l VlV
Buckingham’s π-Theorem:3 1 3 3 3 1 2
3
3 3
3 3 3 3
3 3
( ) ( )
Equating the powers of MLT on both sides, we get
Power of M: 0 1 -1
Power of L: 0 -3 -1 0
Power of T: 0 - - 2 -2
o o o a b cterm M L T L LT ML ML T
c c
a b c a
b b
0 -2 -13 2 2
1 2 3 2 2 2
2 22 2 2 2
( ) , , 0
, ,
Kl V K
V
Hence
R Kf f or
l V lV V
R K KR l V
l V lV V lV V
Similitude and Model Analysis Similitude is a concept used in testing of Engineering
Models.
Usually, it is impossible to obtain a pure theoretical solution of hydraulic phenomenon.
Therefore experimental investigations are often performed on small scale models, called model analysis.
A few examples, where models may be used are ships in towing basins, air planes in wind tunnel, hydraulic turbines, centrifugal pumps, spillways of dams, river channels etc and to study such phenomenon as the action of waves and tides on beaches, soil erosion, and transportation of sediment etc.
Model Analysis Model: is a small scale replica of the actual structure. Prototype: the actual structure or machine. Note: It is not necessary that the models should be
smaller that the prototype, they may be larger than prototype.
Prototype Model
Lp3
Lp1
Lp2Fp1
Fp3
Fp2
Lm
3
Lm1
Lm2Fm
1
Fm
3
Fm
2
Model Analysis Model Analysis is actually an experimental method of
finding solutions of complex flow problems.
The followings are the advantages of the model analysis The performance of the hydraulic structure can be predicted in
advance from its model. Using dimensional analysis, a relationship between the variables
influencing a flow problem is obtained which help in conducting tests.
The merits of alternative design can be predicted with the help of model analysis to adopt most economical, and safe design.
Note: Test performed on models can be utilized for obtaining, in advance, useful information about the performance of the prototype only if a complete similarity exits between the model and the prototype.
Similitude-Type of Similarities Similitude: is defined as similarity between the model
and prototype in every respect, which mean model and prototype have similar properties or model and prototype are completely similar.
Three types of similarities must exist between model and prototype.
Geometric SimilarityKinematic SimilarityDynamic Similarity
Similitude-Type of Similarities Geometric Similarity: is the similarity of shape. It is said to exist
between model and prototype if ratio of all the corresponding linear dimensions in the model and prototype are equal. E.g.
p p pr
m m m
L B DL
L B D
Where: LWhere: Lpp, B, Bpp and D and Dpp are Length, Breadth, and diameter of are Length, Breadth, and diameter of prototype and Lprototype and Lmm, B, Bmm, D, Dmm are Length, Breadth, and diameter are Length, Breadth, and diameter of model.of model.
Lr= Scale ratioLr= Scale ratio
Note:Note: Models are generally prepared with same scale ratios Models are generally prepared with same scale ratios in every direction. Such a model is called true model. in every direction. Such a model is called true model. However, sometimes it is not possible to do so and different However, sometimes it is not possible to do so and different convenient scales are used in different directions. Such a convenient scales are used in different directions. Such a models is call distorted modelmodels is call distorted model
Similitude-Type of Similarities Kinematic Similarity: is the similarity of motion. It is said to exist
between model and prototype if ratio of velocities and acceleration at the corresponding points in the model and prototype are equal. E.g.
1 2 1 2
1 2 1 2
;p p p pr r
m m m m
V V a aV a
V V a a
Where: VWhere: Vp1p1& V& Vp2p2 and a and ap1p1 & a & ap2p2 are velocity and accelerations are velocity and accelerations at point 1 & 2 in prototype and Vat point 1 & 2 in prototype and Vm1m1& V& Vm2m2 and a and am1m1 & a & am2m2 are are velocity and accelerations at point 1 & 2 in model.velocity and accelerations at point 1 & 2 in model.
VVrr and a and arr are the velocity ratio and acceleration ratio are the velocity ratio and acceleration ratio
Note:Note: Since velocity and acceleration are vector quantities, Since velocity and acceleration are vector quantities, hence not only the ratio of magnitude of velocity and hence not only the ratio of magnitude of velocity and acceleration at the corresponding points in model and acceleration at the corresponding points in model and prototype should be same; but the direction of velocity and prototype should be same; but the direction of velocity and acceleration at the corresponding points in model and acceleration at the corresponding points in model and prototype should also be parallel.prototype should also be parallel.
Similitude-Type of Similarities Dynamic Similarity: is the similarity of forces. It is said to exist
between model and prototype if ratio of forces at the corresponding points in the model and prototype are equal. E.g.
gi vp p pr
i v gm m m
FF FF
F F F
Where: (FWhere: (Fii))pp, (F, (Fvv))pp and (F and (Fgg))pp are inertia, viscous and are inertia, viscous and gravitational forces in prototype and (Fgravitational forces in prototype and (Fii))mm, (F, (Fvv))mm and (F and (Fgg))mm are are inertia, viscous and gravitational forces in model.inertia, viscous and gravitational forces in model.
FFrr is the Force ratio is the Force ratio
Note:Note: The direction of forces at the corresponding points in The direction of forces at the corresponding points in model and prototype should also be parallel.model and prototype should also be parallel.
Types of forces encountered in fluid Phenomenon
Inertia Force, Fi: It is equal to product of mass and acceleration in the flowing fluid.
Viscous Force, Fv: It is equal to the product of shear stress due to viscosity and surface area of flow.
Gravity Force, Fg: It is equal to product of mass and acceleration due to gravity.
Pressure Force, Fp: it is equal to product of pressure intensity and cross-sectional area of flowing fluid.
Surface Tension Force, Fs: It is equal to product of surface tension and length of surface of flowing fluid.
Elastic Force, Fe: It is equal to product of elastic stress and area of flowing fluid.
Dimensionless Numbers These are numbers which are obtained by dividing the
inertia force by viscous force or gravity force or pressure force or surface tension force or elastic force.
As this is ratio of once force to other, it will be a dimensionless number. These are also called non-dimensional parameters.
The following are most important dimensionless
numbers. Reynold’s Number Froude’s Number Euler’s Number Weber’s Number Mach’s Number
Dimensionless Numbers Reynold’s Number, Re: It is the ratio of inertia force to the viscous force of
flowing fluid.
. .Re
. .
. . .
. . .
Velocity VolumeMass VelocityFi Time Time
Fv Shear Stress Area Shear Stress Area
QV AV V AV V VL VLdu VA A Ady L
2
. .
. .
. .
. .
Velocity VolumeMass VelocityFi Time TimeFe
Fg Mass Gavitational Acceleraion Mass Gavitational Acceleraion
QV AV V V V
Volume g AL g gL gL
Froude’s Number, Re:Froude’s Number, Re: It is the ratio of inertia force to the It is the ratio of inertia force to the gravity force of flowing fluid.gravity force of flowing fluid.
Dimensionless Numbers Eulers’s Number, Re: It is the ratio of inertia force to the pressure force of
flowing fluid.
2
. .
Pr . Pr .
. .
. . / /
u
Velocity VolumeMass VelocityFi Time TimeE
Fp essure Area essure Area
QV AV V V V
P A P A P P
2 2
. .
. .
. .
. . .
Velocity VolumeMass VelocityFi Time TimeWe
Fg Surface Tensionper Length Surface Tensionper Length
QV AV V LV V
L L L
L
Weber’s Number, Re:Weber’s Number, Re: It is the ratio of inertia force to the It is the ratio of inertia force to the surface tension force of flowing fluid.surface tension force of flowing fluid.
Dimensionless Numbers Mach’s Number, Re: It is the ratio of inertia force to the elastic force of
flowing fluid.
2 2
2
. .
. .
. .
. . /
: /
Velocity VolumeMass VelocityFi Time TimeM
Fe Elastic Stress Area Elastic Stress Area
QV AV V LV V V
K A K A KL CK
Where C K
Lecture # 13
Model Laws or similarity Laws We have already read that for dynamic similarity ratio of corresponding
forces acting on prototype and model should be equal. i.e
g pv s e Ip p p p p p
v s e Ig pm m m mm m
F FF F F F
F F F FF F
Thus dynamic similarity require that
v g p s e I
v g p s e Ip p
Iv g p s e mm
F F F F F F
F F F F F F
FF F F F F
Force of inertial comes in play when sum of all other forces is Force of inertial comes in play when sum of all other forces is not equal to zero which mean not equal to zero which mean
In case all the forces are equally important, the above two In case all the forces are equally important, the above two equations cannot be satisfied for model analysis equations cannot be satisfied for model analysis
Model Laws or similarity Laws However, for practical problems it is seen that one force
is most significant compared to other and is called predominant force or most significant force.
Thus for practical problem only the most significant force is considered for dynamic similarity. Hence, models are designed on the basis of ratio of force, which is dominating in the phenomenon.
Finally the laws on which models are designed for dynamic similarity are called models laws or laws of similarity. The followings are these laws Reynold’s Model Law Froude’s Model Law Euler’s Model Law Weber’s Model Law mach’s Model Law
Reynold’s Model Law It is based on Reynold’s number and states that Reynold’s number
for model must be equal to the Reynolds number for prototype. Reynolds Model Law is used in problems where viscous forces are
dominant. These problems include: Pipe Flow Resistance experienced by submarines, airplanes, fully immersed bodies
etc.
Re Re
1
: , ,
m mP PP m
P m
P P r r
rPm m
m
P P Pr r r
m m m
V LV Lor
V L V L
V L
V Lwhere V L
V L
Reynold’s Model Law The Various Ratios for Reynolds’s Law are obtained as
rr
r
P P P r
m m m r
P Pr
m m
2r
r
sin /
Velocity Ratio: V =L
T L /V LTime Ratio: Tr=
T L /V V
V / VrAcceleration Ratio: a =
V / Tr
Discharge Ratio: Q
Force Ratio: F =
P m
mP P
m P m
P
m
P Pr r
m m
VL VLce and
LV
V L
a T
a T
A VLV
A V
m
2 2 2
2 2 2 3r r rPower Ratio: P =F .V =
r r r r r r r r r r r r
r r r r r r r
a QV LV V LV
LV V LV
Reynold’s Model Law Q. A pipe of diameter 1.5 m is required to transport an oil of specific
gravity 0.90 and viscosity 3x10-2 poise at the rate of 3000litre/sec. Tests were conducted on a 15 cm diameter pipe using water at 20oC. Find the velocity and rate of flow in the model.
p p p p pm m m
m m
2
2
p 2
For pipe flow,
According to Reynolds' Model Law
V D DV D
D
900 1.5 1 103.0
1000 0.15 3 10
3.0Since V
/ 4(1.5)
1.697 /
3.0 5.091 /
5.
m m
m p p p
m
p
p
p
m p
m m m
V
V
V
V
Q
A
m s
V V m s
and Q V A
2
3
091 / 4(0.15)
0.0899 /m s
Solution: Prototype Data:
Diameter, Dp= 1.5m Viscosity of fluid, μp= 3x10-2 poise Discharge, Qp =3000litre/sec Sp. Gr., Sp=0.9 Density of oil=ρp=0.9x1000 =900kg/m3
Model Data: Diameter, Dm=15cm =0.15 m Viscosity of water, μm =1x10-2
poise Density of water, ρm=1000kg/m3n Velocity of flow Vm=? Discharge Qm=?
Reynold’s Model Law Q. A ship 300m long moves in sea water, whose density is 1030 kg/m3. A
1:100 model of this ship is to be tested in a wind tunnel. The velocity of air in the wind tunnel around the model is 30m/s and the resistance of the model is 60N. Determine the velocity of ship in sea water and also the resistance of ship in sea water. The density of air is given as 1.24kg/m3. Take the kinematic viscosity of sea water and air as 0.012 stokes and 0.018 stokes respectively.
Solution: For Prototype
Length, Lp= 300m Fluid = sea water Density of sea water, ρp= 1030
kg/m3
Kinematic Viscosity, νp=0.018 stokes
=0.018x10-4 m2/s Let Velocity of ship, Vp
Resistance, Fp
For Model Scale ratio = Lp/Lm=100 Length, Lm= Lp/100 = 3m Fluid = air Density of air, ρm= 1.24 kg/m3
Kinematic Viscosity, νm=0.012 stokes
=0.012x10-4 m2/s
Velocity of ship, Vm=30 m/s Resistance, Fm = 60 N
Reynold’s Model Law For dynamic similarity between model and prototype, the Reynolds
number for both of them should be equal.
4
4
2 2
2 2 2 2
2 2
0.012 10 330 0.2 /
0.018 10 300
Resistance= Mass Acceleration= L V
L V 1030 300 0.2369.17
1.24 3 30L V
369.17 60 22150.2
p mp m
p m m p
p p
m m
p
LVL VLV V
L
Vp m s
Since
FThus
F
F N
Froude’s Model Law It is based on Froude’s number and states that Froude’s
number for model must be equal to the Froude’s number for prototype.
Froude’s Model Law is used in problems where gravity forces is only dominant to control flow in addition to inertia force. These problems include: Free surface flows such as flow over spillways, weirs, sluices,
channels etc. Flow of jet from orifice or nozzle Waves on surface of fluid Motion of fluids with different viscosities over one another
e e
/ 1; : ,
m mP PP m
P P m m P m
P P Pr r r r
m mPm
m
V VV VF F or or
g L g L L L
V V LV L where V L
V LLV
L
Froude’s Model Law The Various Ratios for Reynolds’s Law are obtained as
r
P P P r
m m m
P Pr
m m
2 2 5/ 2r
sin
Velocity Ratio: V
T L /V LTime Ratio: Tr=
T L /V
V / VrAcceleration Ratio: a = 1
V / Tr
Discharge Ratio: Q
Force Ratio: Fr=
mP
P m
pPr
m m
r
r
rP
m r
P Pr r r r r
m m
r r
VVce
L L
LVL
V L
LL
La T
a T L
A VLV L L L
A V
m a
2 2 2 2 3
32 2 2 3 2 7 / 2Power Ratio: Pr=Fr.Vr=
r r r r r r r r r r r r r r r
r r r r r r r r r r r r
QV LV V LV L L L
L V V LV L L L
Froude’s Model Law Q. In the model test of a spillway the discharge and velocity of flow
over the model were 2 m3/s and 1.5 m/s respectively. Calculate the velocity and discharge over the prototype which is 36 times the model size.
2.5 2.5p
m
2.5 3
For Discharge
Q36
Q
36 2 15552 / sec
r
p
L
Q m
p
m
For Dynamic Similarity,
Froude Model Law is used
V36 6
V
6 1.5 9 / sec
r
p
L
V m
Solution: Given that
For Model Discharge over model, Qm=2
m3/sec Velocity over model, Vm = 1.5
m/sec Linear Scale ratio, Lr =36
For Prototype Discharge over prototype, Qp =? Velocity over prototype Vp=?
Numerical Problem: Q. The characteristics of the spillway are to be studied by means of a geometrically
similar model constructed to a scale of 1:10. (i) If 28.3 cumecs, is the maximum rate of flow in prototype, what will be the
corresponding flow in model? (i) If 2.4m/sec, 50mm and 3.5 Nm are values of velocity at a point on the spillway, height
of hydraulic jump and energy dissipated per second in model, what will be the corresponding velocity height of hydraulic jump and energy dissipation per second in prototype?
Solution: Given thatFor Model
Discharge over model, Qm=? Velocity over model, Vm = 2.4 m/sec Height of hydraulic jump, Hm =50 mm Energy dissipation per second, Em =3.5 Nm Linear Scale ratio, Lr =10
For Prototype Discharge over model, Qp=28.3 m3/sec Velocity over model, Vp =? Height of hydraulic jump, Hp =? Energy dissipation per second, Ep =?
Froude’s Model Law
p 2.5 2.5
m
2.5 3
p
m
For Discharge:
Q10
Q
28.3 /10 0.0895 / sec
For Velocity:
V10
V
2.4 10 7.589 / sec
r
m
r
p
L
Q m
L
V m
p
m
p 3.5 3.5
m
3.5
For Hydraulic Jump:
H10
H
50 10 500
For Energy Dissipation:
E10
E
3.5 10 11067.9 / sec
r
p
r
p
L
H mm
L
E Nm
Classification of Models Undistorted or True Models: are those which are
geometrically similar to prototype or in other words if the scale ratio for linear dimensions of the model and its prototype is same, the models is called undistorted model. The behavior of prototype can be easily predicted from the results of undistorted or true model.
Undistorted Models: A model is said to be distorted if it is not geometrically similar to its prototype. For distorted models different scale ratios for linear dimension are used.
For example, if for the river, both horizontal and vertical scale ratio are taken to be same, then depth of water in the model of river will be very very small which may not be measured accurately.
The followings are the advantages of distorted models
The vertical dimension of the model can be accurately measured
The cost of the model can be reduced Turbulent flow in the model can be maintained
Though there are some advantage of distorted models, however the results of such models cannot be directly transferred to prototype.
Classification of Models Scale Ratios for Distorted Models
r
r
P
P
Let: L = Scale ratio for horizontal direction
L =Scale ratio for vertical direction
2Scale Ratio for Velocity: Vr=V /
2
Scale Ratio for area of flow: Ar=A /
P PH
m m
PV
m
Pm r V
m
P Pm
m m
L B
L B
h
h
ghV L
gh
B hA
B h
3/ 2
PScale Ratio for discharge: Qr=Q /V
r rH V
P Pm r r r r rH V V H
m m
L L
A VQ L L L L L
A V
Distorted model Q. The discharge through a weir is 1.5 m3/s. Find the discharge through the model of weir if the horizontal dimensions of
the model=1/50 the horizontal dimension of prototype and vertical dimension of model =1/10 the vertical dimension of prototype.
3p
r
r
3/ 2
P
3/ 2
Solution:
Discharge of River= Q =1.5m /s
Scale ratio for horizontal direction= L =50
Scale ratio for vertical direction= L =10
Since Scale Ratio for discharge: Qr=Q /
/ 50 10
V
PH
m
PV
m
m r rH
p m
L
L
h
h
Q L L
Q Q
3
1581.14
1.5 /1581.14 0.000948 /mQ m s
Distorted model Q. A river model is to be constructed to a vertical scale of 1:50 and a
horizontal of 1:200. At the design flood discharge of 450m3/sec, the average width and depth of flow are 60m and 4.2m respectively. Determine the corresponding discharge in model and check the Reynolds’ Number of the model flow.
3
r
r
3/ 2
r P
3/ 2
arg 450 /
60 4.2
Horizontal scale ratio= L =200
Vertical scale ratio= L =50
Since Scale Ratio for discharge: Q =Q /
/ 200 50 7
V
p
p p
PH
m
PV
m
m r rH
p m
Disch e of River Q m s
Width B m and Depth y m
B
B
y
y
Q L L
Q Q
3 3
0710.7
450 /1581.14 6.365 10 /mQ m s
Distorted model
m
VLReynolds Number, Re =
4
/ 60 / 200 0.3
/ 4.2 / 50 0.084
0.3 0.084 0.0252
2 0.3 2 0.084 0.468
0.02520.05385
0.468
Kinematic Viscosity of w
m
m m
m p r H
m p r V
m m m
m m m
m
m
L R
Width B B L m
Depth y y L m
A B y m
P B y m
AR
P
6 2
6
ater = =1 10 / sec
4 4 0.253 0.05385Re 54492.31
1 10
>2000
Flow is in turbulent range
m
m
VR
Recommended