Inviscid & Incompressible flow < 3.1. Introduction and Road Map...

Aerodynamics 2017 fall - 1 -

< 3.1. Introduction and Road Map >

Inviscid & Incompressible flow

Basic aspects of inviscid, incompressible flow

Bernoulli’sEquation

Laplaces’sEquation

Some Elementaryflows

Some simpleapplications

1.Venturi2. Low-speedwind tunnel3. Pitot tube

Generalphilosophy anduse in solving

problems

Synthesis ofcomplex flows

from a superpositionof elementary

Uniform flow

Sources and sinks

Doublet

Vortex flow

Flow oversemiinfiniteand oval-

shaped bodies

Nonlifitingflow overa cylinder

Lifitingflow overa cylinder

Kutta-Joukowskitheorem

Generalnonlifting

bodies; source panel numerical

technique

< 3.2. Bernoulli’s Equation >

From the momentum equation

For an inviscid and steady flow without no body force

: x-dir. Momentum equation

Multiply dx

From the equation of streamline

Similarly,

: x-dir.

: y-dir.

: z-dir.

along a streamline

If incompressible,

If irrotational,

along a streamline

everywhere

< 3.3. The Venturi and Low-Speed Wind Tunnel >

Venturi tube

Assume)

• 1. Quasi-one-dimensional flow

(the properties are uniform across the x-section)

• 2. Inviscid flow

• 3. Steady flow

Continuity equation

steady

Venturi tube

at the wall

Venturi tube

Incompressible

Use two equations

1. Continuity eq.

2. Bernoulli’s eq.

Low-speed wind tunnel

How to measure the pressure difference?

Manometer

< 3.4. Pitot Tube >

Dynamic pressure

Static pressure

Total pressure

< 3.5. Pressure Coefficient >

: Over all the range of speed

For incompressible flow

: works for M<0.3 (low subsonic)

* freestream * stagnation point

< 3.6. Condition on Velocity for Incompressible Flow

Continuity equation

Incompressible

< 3.7. Laplace’s Equation >

* In 2D,

Laplace’s equation

Note)1. For irrotational, incompressible flow, and are both solutions of Laplace equation.2. Since Laplace equation is linear, the solution can be superimposed, so that anycomplex flow is expressed by adding elementary.

* In irrotational flow,

< 3.7. Laplace’s Equation >

i) Infinity B.C.

ii) wall B.C.

slope of the streamline

Flow tangency condition

Inviscid & Incompressible flow < 3.1. Introduction and Road Map...

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