Respuesta :
Answer:
A) set of dimensionless parameters is; (Δp•D1)/Vµ = Φ((D2/D1), (ρ•D1•V/µ))
B) Yes, it will be incorrect to include the velocity in the smaller pipe as an additional variable.
Explanation:
First of all, let's write the functional equation that lists all the variables in the question ;
Δp = f(D1, D2, V, ρ, µ)
Now, since the question said we should express as a suitable set of dimensionless parameters, thus, let's write all these terms using the FLT (Force Length Time) system of units expression.
Thus;
Δp = Force/Area = F/L²
D1 = Diameter = L
D2 = Diameter = L
V = Velocity = L/T
ρ = Density = kg/m³ = (F/LT^(-2)) ÷ L³ = FT²/L⁴
µ = viscosity = N.s/m² = FT/L²
From the above, we see that all three basic dimensions F,L & T are required to define the six variables.
Thus, from the Buckingham pi theorem, k - r = 6 - 3 = 3.
Thus, 3 pi terms will be needed.
Let's now try to select 3 repeating variables.
From the derivations we got, it's clear that D1, D2, V and µ are dimensionally independent since each one contains a basic dimension not included in the others. But in this case, let's pick 3 and I'll pick D1, V and µ as the 3 repeating variables.
Thus:
π1 = Δp•D1^(a)•V^(b)•µ^(c)
Now, let's put their respective units in FLT system
π1 = F/L²•L^(a)•(L/T)^(b)•(FT/L²)^(c)
For π1 to be dimensionless,
π1 = F^(0)•L^(0)•T^(0)
Thus;
F/L²•L^(a)•(L/T)^(b)•(FT/L²)^(c) = F^(0)•L^(0)•T^(0)
By inspection,
For F,
1 + c = 0 and c= - 1
For L; -2 + a + b - 2c = 0
For T; -b + c = 0 and since c=-1
-b - 1 = 0 ; b= -1
For L, -2 + a - 1 - 2(-1) = 0 ; a=1
So,a = 1 ; b = -1; c = -1
Thus, plugging in these values, we have;
π1 = Δp•D1^(1)•V^(-1)•µ^(-1)
π1 = (Δp•D1)/Vµ
Let's now repeat the procedure for the second non-repeating variable D2.
π2 = D2•D1^(a)•V^(b)•µ^(c)
Now, let's put their respective units in FLT system
π1 = L•L^(a)•(L/T)^(b)•(FT/L²)^(c)
For π2 to be dimensionless,
π2 = F^(0)•L^(0)•T^(0)
Thus;
L•L^(a)•(L/T)^(b)•(FT/L²)^(c) = F^(0)•L^(0)•T^(0)
By inspection,
For F;
-2c = 0 and so, c=0
For L;
1 + a + b - 2c = 0
For T;
-b + c = 0
Since c =0 then b =0
For, L;
1 + a + 0 - 0 = 0 so, a = -1
Thus, plugging in these values, we have;
π2 = D2•D1^(-1)•V^(0)•µ^(0)
π2 = D2/D1
Let's now repeat the procedure for the third non-repeating variable ρ.
π3 = ρ•D1^(a)•V^(b)•µ^(c)
Now, let's put their respective units in FLT system
π3 = F/T²L⁴•L^(a)•(L/T)^(b)•(FT/L²)^(c)
For π4 to be dimensionless,
π3 = F^(0)•L^(0)•T^(0)
Thus;
FT²/L⁴•L^(a)•(L/T)^(b)•(FT/L²)^(c) = F^(0)•L^(0)•T^(0)
By inspection,
For F;
1 + c = 0 and so, c=-1
For L;
-4 + a + b - 2c = 0
For T;
2 - b + c = 0
Since c =-1 then b = 1
For, L;
-4 + a + 1 +2 = 0 ;so, a = 1
Thus, plugging in these values, we have;
π3 = ρ•D1^(1)•V^(1)•µ^(-1)
π3 = ρ•D1•V/µ
Now, let's express the results of the dimensionless analysis in the form of;
π1 = Φ(π2, π3)
Thus;
(Δp•D1)/Vµ = Φ((D2/D1), (ρ•D1•V/µ))
B) In continuity equation,
Q1 = Q2
Thus,
ρV1A1 = ρV2A2
And so,
V1A1 = V2A2
V2 = (V1A1)/A2
Since area = πD²/4
Thus,V2 = (V1D1)/D2
Now, V2 is the velocity of the smaller and is dependent on V1, D1 and D2.
Thus, it will be incorrect to include the velocity in the smaller pipe as an additional variable.
