Kategorien: Alle - equations - balance - boundaries - friction

von Kumar Perumal Vor 4 Jahren

832

Momentum Transport

The text discusses various aspects of fluid dynamics, focusing on flow in different geometries such as pipes, planes, plates, and annular pipes. It delves into the concept of momentum transport, explaining that it comprises both molecular and convective momentum transport.

Momentum Transport

Solving equations of change for the Boundary layer gives friction factor and drag

Examples

Flow through annular pipe

Flow between plates

Flow in planes

Flow through pipe

Momentum Transport

Macroscopic balance

Meachanical energy balance
Momentum balance
Mass balance

Macroscopic Variables

External flow
Drag
Internal flow
Friction

Microscopic Balance

Methods
Equations of Change
Shell balance

Important Concepts

Velocity gradients in a flow are confined to a thin layer near the wall. This layer is called Boundary layer. by solving equations of change for this layer skin frictional loss can be calculated
The three levels of study of TP are related to each other
Momentum Transport = Molecular Momentum Transport +  Convective Momentum Transport
Drag is the frictional force for external flow
Drag Coefficient
Skin friction loss is the frictional force exerted by fluid on the wall of a pipe (Ff-s). This is same as frictional loss calculated from Moody chart

Mechanisms

Convective Transport
Caused by Bulk flow by

Gravity

Pressure gradient

Molecular Transport
Pressure forces
viscous forces due to velocity gradients in flow

Tips for Test & Exam

Tip 10: Practice TP, Never study
Tip 9: For inclined planes and pipes, Learn to determine the component of gravity force acting on the flow
Tip 8: particle Re is Dp*V*rho / mu Dp is particle diameter, whereas rho and mu are fluid properties
Tip 7: Pressure in the macroscopic momentum balance equation should be gauge pressure
Tip 6: checking dimensional consistency of equations will help avoid errors
Tip 5 : If you are taking 40 minutes or less for the microscopic momentum balance problem, the remaining 80 minutes should be enough for the other 3 problems
Tip 4: if pressure not known, do not assume, Check if Bernoulli equation can be used to find it
Tip 3: Always assign r to the radial coordinate and z to the axial coordinate in cylindrical systems
Tip 2: when to use equations of change and when to use shell balance? The answer is: the choice is yours unless the question specifies the method. Given choice, I would prefer using equations of change. of course you need to justify when cancelling terms
Tip 1 : Please approach TP with an open mind. Get rid of all preconceived notions. Please talk to me to solve your problems / misunderstandings. The more you talk to me the more I can help