mmme2047 lecture notes dimensional analysis 2023-02-06
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@ -3,9 +3,12 @@ author: Akbar Rahman
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date: \today
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title: MMME2047 // Dimensional Analysis
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tags: [ mmme2047, uni, fluid_dynamics, dimensional_analysis ]
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uuid:
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uuid: 483f818f-3f67-4cde-bbd6-d9f93c89ca47
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---
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[Lecture slides](./lecture_slides/T4 - Dimensional analysis - with solutions.pdf)
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[Lecture notes](./lecture_notes/dimensional analysis 2018-2019.pdf)
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In lab tests it is not always possible to use the actual scale of the prototype,
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actual flow speed, or actual fluid.
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In these cases a model is used.
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@ -25,12 +28,19 @@ How to make sure a prototype and a scale model are physically similar
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linear scale ratioi.
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This includes surface roughness (e.g. a 10x smaller model have 10x smaller roughness)
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- Kinematic similarity ---velocities at corresponding points in the two flows are in the same direction and related by a constant scale factor in magnitude
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- Kinematic similarity ---velocities at corresponding points in the two flows are in the same direction and related by a constant scale factor in magnitude. Flow regimes (laminar, turbulent, compressible, etc.) must be the same.
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- Dynamic similarity --- requires that the magnitude ratio of any two forces in one system must be the same as the magnitude ratio of the corresponding forces in the other system
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Kinematic and Dynamic similarity are ensued by equality of the governing
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nondimensional parameters.
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As a general rule, dynamic and kinematic similarity are ensured if:
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- for compressible flow, prototype and model Reynolds and Mach number, and specific heat ratio, are correspondingly equal
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- For incompressible flow with no free surface, prototype and model Reynolds numbers are equal
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- For incompressible flow with a free surface, Reynolds and Froude numbers are equal (may also require equality
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of Weber and cabiation number as well)
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# Dimensions and Units
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There are four basic dimensions for fluid dynamics:
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@ -142,7 +152,7 @@ Important in flows with interfaces (e.g. gas-liquid).
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$$\text{We} = \frac{rho U^2 L}{\sigma}$$
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where $\sigma$ is the surface tension coeffecient.
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where $\sigma$ is the surface tension coefficient.
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Represents ratio of inertial to capillary forces.
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Important to flows with strong surface tension effects (e.g. droplets,
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@ -155,9 +165,74 @@ $$\text{St} = \frac{fL}{U}$$
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where $f$ is frequency.
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Important in flows with velocity oscillations.
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$\text{St} \approx 0.21$ for $200 < \text{Re} < 10^5$.
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## Mach Number
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$$\text{Ma} = \frac U a$$
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When $\text{Ma} > 0.3$, the flow should be considered compressible.
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# Nondimensional Momentum Equation (From Navier-Stokes)
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$$\frac{\del \pmb{V*}}{\del t*} + \pmb{V*} \cdot (\Del* \pmb{V*} = -\Del* p* + \frac{1}{\text{Re}}\Del*^2\pmb{V*}$$
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Therefore for large values of Reynolds number, the viscous forces become negligible.
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# Kinematic Similarity
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An airfoil model and prototype are geometrically similar, with $1:\alpha$ length ratio:
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- $x_m = \frac{x_p}{\alpha}$, $y_m = \frac{y_p}{\alpha}$
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- $u_m$ at $(x_m, y_m)$ must have the same direction at $u_p$ at $(x_p, y_p)$
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- $\frac{u_p}{u_m} = \Beta$ is constant at homologous points
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# Dynamic Similarity
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Dynamic similarity is similarity of forces.
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Two systems have dynamic similarity when:
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- they are geometrically similar
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- identical kind of forces are parallel and related by a constant scale factor at corresponding homologous point
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#### Example
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Consider two homologous points around two geometrically similar airfoils:
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Assume there are 3 forces acting: inertia, friction, and pressure.
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These forces must form a closed polygon: $\pmb{F_i} = \pmb{F_f} + \pmb{F_p}$.
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$F_{f,p}$ and $F_{f,m}$ must be parallel and the same applies for the other two forces.
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The force magnitude ratios must be related by a constant scale factor, therefore
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this means the triangles must be geometrically similar.
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We can estimate $F_i$ and $F_f$ (lecture slides p54-55):
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$$F_i ~ \rho L^2U^2$$
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$$F_f ~ \mu U L$$
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Therefore:
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$$\frac{F_i}{F_f} ~ \frac{\rho U L}{\mu} = \text{Re}$$
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This means that at homologous points, the magnitude ratio of inertia/viscosity in one system is the
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same as that in the other system if the Reynolds number is the same.
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# Consequences of Incomplete Similarity
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In example 7 (lecture slides p57), it is not possible to achieve complete dynamic similarity.
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- In the case of the example, tests are usually run with water, due to its convenience
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- This violates Reynolds number similarity, but this does not matter much as Froude number is
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dominant parameter in free surface flows.
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- Reynolds number of the model will be smaller and the model's data will be extrapolated to the desired
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Reynolds number:
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- Extrapolation increases uncertainty and it is left to the engineer to judge the validity of the data
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