Washburn's equation - Alchetron, The Free Social Encyclopedia

In physics, Washburn's equation describes capillary flow in a bundle of parallel cylindrical tubes; it is extended with some issues also to imbibition into porous materials. The equation is named after Edward Wight Washburn; also known as Lucas–Washburn equation, considering that Richard Lucas wrote a similar paper three years earlier, or the Bell-Cameron-Lucas-Washburn equation, considering J.M. Bell and F.K. Cameron's discovery of the form of the equation fifteen years earlier.

Derivation

For wet-out flow, it is

L 2 = γ D t 4 η

where t is the time for a liquid of dynamic viscosity η and surface tension γ to penetrate a distance L into the capillary whose pore diameter is D . In case of a porous materials many issues have been raised both about the physical meaning of the calculated pore diameter D and the real possibility to use this equation for the calculation of the contact angle of the solid. The equation is derived for capillary flow in a cylindrical tube in the absence of a gravitational field, but is sufficiently accurate in many cases when the capillary force is still significantly greater than the gravitational force.

In his paper from 1921 Washburn applies Poiseuille's Law for fluid motion in a circular tube. Inserting the expression for the differential volume in terms of the length l of fluid in the tube d V = π r 2 d l , one obtains

δ l δ t = ∑ P 8 r 2 η l ( r 4 + 4 ϵ r 3 )

where ∑ P is the sum over the participating pressures, such as the atmospheric pressure P A , the hydrostatic pressure P h and the equivalent pressure due to capillary forces P c . η is the viscosity of the liquid, and ϵ is the coefficient of slip, which is assumed to be 0 for wetting materials. r is the radius of the capillary. The pressures in turn can be written as

P h = h g ρ − l g ρ sin ⁡ ψ P c = 2 γ r cos ⁡ ϕ

where ρ is the density of the liquid and γ its surface tension. ψ is the angle of the tube with respect to the horizontal axis. ϕ is the contact angle of the liquid on the capillary material. Substituting these expressions leads to the first-order differential equation for the distance the fluid penetrates into the tube l :

δ l δ t = [ P A + g ρ ( h − l sin ⁡ ψ ) + 2 γ r cos ⁡ ϕ ] ( r 4 + 4 ϵ r 3 ) 8 r 2 η l

Washburn's constant

The Washburn constant may be included in Washburn's equation.

It is calculated as follows:

10 4 [ μ m c m ] [ N m 2 ] 68947.6 [ d y n e s c m 2 ] = 0.1450 ( 38 )

Inkjet printing

The penetration of a liquid into the substrate flowing under its own capillary pressure can be calculated using a simplified version of Washburn's equation:

l = [ r cos ⁡ θ 2 ] 1 2 [ γ η ] 1 2 t 1 2

where the surface tension-to-viscosity ratio [ γ η ] 1 2 represents the speed of ink penetration into the substrate. In reality, the evaporation of solvents limits the extent of liquid penetration in a porous layer and thus, for the meaningful modelling of inkjet printing physics it is appropriate to utilise models which account for evaporation effects in limited capillary penetration.

Food

According to physicist and igNobel prize winner Len Fisher, the Washburn equation can be extremely accurate for more complex materials including biscuits. Following an informal celebration called national biscuit dunking day, some newspaper articles quoted the equation as Fisher's equation.

Novel capillary pump

The flow behaviour in traditional capillary follows the Washburn's equation. Recently, novel capillary pumps with a constant pumping flow rate independent of the liquid viscosity were developed, which have a significant advantage over the traditional capillary pump (of which the flow behaviour is Washburn behaviour, namely the flow rate is not constant). These new concepts of capillary pump are of great potential to improve the performance of lateral flow test.

References

Washburn's equation Wikipedia

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