Euler number (physics)

From Wikipedia, the free encyclopedia

The Euler number or cavitation number is a dimensionless number used in flow calculations. It expresses the relationship between a flow's pressure and kinetic energy, and is used to characterize the potential of the flow to cavitate. It is named for Leonhard Euler.

It is defined as

$\mathit{Ca}=\frac{p-p_v}{\frac{1}{2}\rho V^2}$

where

$ρ$ is the density of the fluid.
$p$ is the local pressure.
$p v$ is the vapor pressure of the fluid.
$V$ is a characteristic velocity of the flow.

[edit] See also

Reynolds number for use in flow analysis and similarity of flows
List of topics named after Leonhard Euler

[edit] Reference

Batchelor, G.K. (1967). An Introduction to Fluid Dynamics. Cambridge University Press. ISBN 0-521-09817-3

v • d • e Dimensionless numbers in fluid dynamics

Archimedes • Bagnold • Bond • Brinkman • Capillary • Damköhler • Deborah • Eckert • Ekman • Euler • Froude • Galilei • Grashof • Hagen • Knudsen • Laplace • Lewis • Mach • Marangoni • Nusselt • Ohnesorge • Péclet • Prandtl • Rayleigh • Reynolds • Richardson • Rossby • Schmidt • Sherwood • Stanton • Stokes • Strouhal • Weber • Weissenberg • Womersley

Retrieved from "http://en.wikipedia.org../../../e/u/l/Euler_number_%28physics%29.html"

Categories: Dimensionless numbers | Fluid dynamics

Views

interaction

Search