Prandtl number

The Prandtl number $\mathrm{Pr}$ is a dimensionless number; the ratio of momentum diffusivity (kinematic viscosity) to thermal diffusivity. It is named after the German physicist Ludwig Prandtl.

It is defined as:

$\mathrm{Pr} = \frac{\nu}{\alpha} = \frac{\mbox{viscous diffusion rate}}{\mbox{thermal diffusion rate}} = \frac{c_p \mu}{k}$

where:

$\nu$ : kinematic viscosity, $\nu = \mu/\rho$ , (SI units : m²/s)
$\alpha$ : thermal diffusivity, $\alpha = k/(\rho c_p)$ , (SI units : m²/s)
$\mu$ : dynamic viscosity, (SI units : Pa s = (N s)/m²)
$k$ : thermal conductivity, (SI units : W/(m K) )
$c_p$ : specific heat, (SI units : J/(kg K) )
$\rho$ : density, (SI units : kg/m³ ).

Note that whereas the Reynolds number and Grashof number are subscripted with a length scale variable, Prandtl number contains no such length scale in its definition and is dependent only on the fluid and the fluid state. As such, Prandtl number is often found in property tables alongside other properties such as viscosity and thermal conductivity.

Typical values for $\mathrm{Pr}$ are:

(Low $\mathrm{Pr}$ - conductive transfer strong)

around 0.015 for mercury
around 0.16-0.7 for mixtures of noble gases or noble gases with hydrogen
around 0.7-0.8 for air and many other gases,
between 4 and 5 for R-12 refrigerant
around 7 for water (At 20 degrees Celsius)
between 100 and 40,000 for engine oil
around 1×10²⁵ for Earth's mantle.

(High $\mathrm{Pr}$ - convective transfer strong)

For mercury, heat conduction is very effective compared to convection: thermal diffusivity is dominant. For engine oil, convection is very effective in transferring energy from an area, compared to pure conduction: momentum diffusivity is dominant.

In heat transfer problems, the Prandtl number controls the relative thickness of the momentum and thermal boundary layers. When Pr is small, it means that the heat diffuses very quickly compared to the velocity (momentum). This means that for liquid metals the thickness of the thermal boundary layer is much bigger than the velocity boundary layer.

The mass transfer analog of the Prandtl number is the Schmidt number.

References

White, F. M. (2006). Viscous Fluid Flow (3rd. ed.). New York: McGraw-Hill. ISBN 0072402318.

Dimensionless numbers in fluid dynamics

Archimedes · Atwood · Bagnold · Bejan · Biot · Bond · Brinkman · Capillary · Cauchy · Damköhler · Dean · Deborah · Eckert · Ekman · Eötvös · Euler · Froude · Galilei · Graetz · Grashof · ‎Görtler · Hagen · Keulegan–Carpenter · Knudsen · Laplace · Lewis · Mach · Marangoni · Morton · Nusselt · Ohnesorge · Péclet · Prandtl (magnetic · turbulent) · Rayleigh · Reynolds (magnetic) · Richardson · Roshko · Rossby · Rouse · Ruark · Schmidt · Sherwood · Shields · Stanton · Stokes · Strouhal · Suratman · Taylor · Ursell · Weber · Weissenberg · Womersley

Prandtl number

See also

References