c11 JWBS043-Rogers September 13, 2010 11:26 Printer Name: Yet to Come
SURFACE TENSION 167
liquid surface
f
σ
dσ
l
dh
FIGURE 11.3 Stretching a two-dimensional liquid bimembrane.
Now consider capillary rise caused by surface tension in a tube of radiusR.The
lengthlof the movable edge in Fig. 11.3 is replaced by the circumferencecof the tube
in which the liquid rises,c= 2 πR; but there is only one circular surface, so the factor
2 drops out of 2γdσonly to reappear as 2πR,sodw=γcdh=γ 2 πRdh.Theforce
opposing capillary rise ismgdue to lifting the mass of liquidmin opposition to
gravitational accelerationg(Fig. 11.4). At equilibrium, the forces are in balance:
mg=γ 2 πR
The volume of suspended liquid is that of a cylinder of heighthand densityρ=m/V.
FromV=πR^2 hfor a cylinder, we getm=ρV=ρπR^2 h:
(ρπR^2 h)g=γ 2 πR
and
γ=
ρRhg
2
mg
2 γπR
FIGURE 11.4 Capillary rise in a tube of radiusR. The equilibrium height of the liquid
column is determined by the balance of the capillary force and the gravitational force.