# Fluid dynamics

(Difference between revisions)
 Revision as of 02:50, 10 June 2006 (view source)← Older edit Revision as of 10:53, 16 June 2012 (view source)Shreyasr (Talk | contribs) (→Related Pages)Newer edit → (4 intermediate revisions not shown) Line 1: Line 1: Fluid Dynamics is the study of fluids in motion. The basic equations governing [[fluid]] motion have been known for more than 150 years and are called the [[Navier-Stokes equations]] which govern the motion of a viscous, heat conducting fluid. Various simplifications of these equations exist depending on which effects are insignificant. There are several dimensionless parameters which characterize the relative importance of various effects. Some of these are [[Mach number]], [[Reynolds number]] and [[Prandtl number]]. Fluid Dynamics is the study of fluids in motion. The basic equations governing [[fluid]] motion have been known for more than 150 years and are called the [[Navier-Stokes equations]] which govern the motion of a viscous, heat conducting fluid. Various simplifications of these equations exist depending on which effects are insignificant. There are several dimensionless parameters which characterize the relative importance of various effects. Some of these are [[Mach number]], [[Reynolds number]] and [[Prandtl number]]. - http://www.lda-corporate.com == Simplified flow models == == Simplified flow models == Line 16: Line 15: *[[Turbulence]] *[[Turbulence]] *[[Turbulence DNS database | Turbulence DNS database]] *[[Turbulence DNS database | Turbulence DNS database]] + *[http://www.cfd-online.com/Links/education.html#onlinecourses CFD-online References] - Course Material and Videos == External Links == == External Links ==

## Revision as of 10:53, 16 June 2012

Fluid Dynamics is the study of fluids in motion. The basic equations governing fluid motion have been known for more than 150 years and are called the Navier-Stokes equations which govern the motion of a viscous, heat conducting fluid. Various simplifications of these equations exist depending on which effects are insignificant. There are several dimensionless parameters which characterize the relative importance of various effects. Some of these are Mach number, Reynolds number and Prandtl number.