ECH 141
Problem Set #4 Solution
1.
The figure below shows flow of a layer of Newtonian fluid with viscosity
μ
and constant thickness H
down a plane inclined at an angle
q
.
This gravity-driven flow is steady and unidirectional in the x-
direction.
Calculate the velocity profile v
X
(y), the flow rate Q per unit width and the viscous stress
t
YX
the plane surface y=0.
at

where q(x) is like a constant of integration, but for integration of a partial derivative instead of a total
derivative.
The pressure at y=H is known, so we find
p
=
p
0
+
ρ
gcos
θ
H
−
y
(
)
.
This result shows that
∂
p
∂
x
=
0
and hence
d
2
v
x
dy
2
=
−
ρ
g
μ
sin
θ
.
Integrating twice yields
v
x
y
( )
=
−
ρ
g
2
μ
sin
θ
y
2
+
C
1
y
+
C
2
.
As boundary conditions, we use the no-slip condition at y=0, and assume that the air exerts negligible
shear stress on the liquid, because the viscosity of air is very low compared to any liquid.
Then
v
x
=
0 at y=0
and
μ
dv
x
dy
=
0 at y=H
.
The no-slip condition yields C
2
=0 and the shear stress condition yields the equation
μ
−
ρ
g
μ
sin
θ
y
+
C
1
⎛
⎝
⎜
⎞
⎠
⎟
=
0 at y=H
or
C
1
=
ρ
g
μ
sin
θ
H
.
The velocity profile is therefore
v
x
y
( )
=
ρ
g
μ
sin
θ
Hy
−
y
2
2
⎛
⎝
⎜
⎞
⎠
⎟
.
The flow rate per unit width is

Q
=
v
x
y
( )
0
H
∫
dy
=
ρ
g
μ
sin
θ
Hy
−
y
2
2
⎛
⎝
⎜
⎞
⎠
⎟
dy
0
H
∫
or
Q
=
ρ
g
μ
sin
θ
H
3
2
−
H
3
6
⎛
⎝
⎜
⎞
⎠
⎟
=
ρ
gH
3
3
μ
sin
θ
.
The shear stress at y=0 is
τ
yx
y
=
0
= μ
dv
x
dy
y
=
0
=
ρ
gHsin
θ
.
2.
In the slot-coater shown below, a coating liquid is extruded through a die and onto a solid sheet, the
“web,” moving with velocity U in the x-direction.
The pressure where the slot meets the web is P
1
and
the gap between the web and the die is h.
There is a forward-flow region of length L
1
and also a liquid-
filled region of length L
2
in which the tendency for backflow is balanced by the movement of the web.
The flow is fully developed, steady and unidirectional in most of the slot, and gravitational effects are
negligible.
The coating thickness far from the coater is h
¥
, and any evaporation or cooling that takes
place has a negligible effect on the coating density.
It may be assumed that P
0
, P
1
, U, h and L
1
are
known.
a)
Derive an expression for the velocity profile v
x
(y) in the forward flow region.
b)
Derive an expression for the velocity profile v
x
(y) in the backflow region and find L
2
c)
Determine the coating thickness h
¥
d)
Determine the shear force per unit width (in the z-direction) that the liquid exerts on the sheet.
.
.

0
=
Δ
P
F
L
1
+ μ
d
2