10. Basic Theories for Mass Transfer Coefficients
Aim: Connect the mass-transfer correlations (e.g. Tables 8.3-2 and -3 in Cussler’s book) to fundamentals (first part of this class). The MTCs connect complex mass transfer and fluid flow.
GOAL: Predict the mass transfer coefficient k as a function of the diffusion coefficient D and the fluid velocity v.
First, we look at MTC’s for fluid-fluid systems that are VERY important in industrial applications.
Then we investigate models for simple fluid-solid interfaces that can be rather mathematically elegant, elaborate and detailed but have limited application in industry.
Fluid-Fluid Interfaces, e.g.
Falling film Gas bubbles intank
Liquid in packed tower
Source: Büchi Glas, UsterSource: Wikipedia, “Blasensäule”Source: Cussler, Chapter 2.5.2
Falling film Gas bubbles intank
Liquid in packed tower
5.00
Dvz69.0
Dkz
k ~ D0.5, ~v0.5
3131
2
3
D/gd31.0
Dkd
k ~ D2/3
4.05.067.0031
adDav0051.0
g1k
k ~ D0.5, ~v0.67
From Table 8.3-2:
Why is k ~ D1/2 or k ~ D2/3 or k ~ v0.67 ??
Aeration,Gas ab- and desorption,Bioreactors
Extraction,Distillation
Evaporation,Gas scrubbing
9.1.1 The Film Theory (Nernst, 1904)
Assumptions:- All action (fluid flow and mass transfer) occurs in a thin film at the
interface - Bulk fluid (e.g. gas) – FILM – bulk fluid (e.g. liquid)- Steady-state flux across film
1 The Film Theory (Nernst, 1904)
(1)
1 1 1i 1z 0
DN j (c c )
(2)
Comparing equations (1) and (2) givesDk
Or by rewriting gives k 1 ShD
(3)
(4)
This simple theory gives k D1 BUT all fluid characteristics (e.g. fluid velocity due to stirring) are in the unknown film thickness .
This flux can be obtained also in terms of D (for dilute concentrations)
1i110z1 cckNn
This simple theory provides the FRAMEWORK of most MTC’s as follows:
mass transfer characteristic other coefficient lengthSh F system
diffusionvariables
coefficient
Applications:
The film theory is used in some practical cases to determine the .
Example:CO2 is being scrubbed out of a gas by water flowing through a packed bed. Calculate the film thickness if 2.3ꞏ10-6 mol/(cm2∙s) of CO2 are adsorbed when
pCO2= 10 atm, H = 600 atm and DCO2/H2O= 1.9ꞏ10-5 cm2/s.
First find the interfacial concentration c1i :
1i1 1
cp H x Hc
1i3
-4 31i
c10atm 600atm (1 mol)/(18 cm )
c = 9.3 10 mol/cm
Solution:
Calculate k from equation (1):
2.3ꞏ10-6 mol/(cm2 s) = k (9.3ꞏ10-4 mol/cm 3 - 0)
k = 2.5ꞏ10-3 cm/s
Now5 2
23 2
D 1.9 10 cm / s 0.76 10 cmk 2.5 10 cm / s
Typically cm 01 2 VERY IMPORTANT
1 1i 1N k(c c )
Assumptions:
• Same as in “Film-theory” but the filmis VERY thick
• Diffusion is important in z-direction• Convection is important in x-direction
1 1i 1N k(c c ) Equation (1):
The solution to this problem was given before in the context of the semi-infinite slab (Cussler p. 46):
1 1 max 1i 1z 0N j Dv / x (c c )
(5)
where N1 is the flux and vmax is the velocity of the liquid at the interface
2 The Penetration Theory (Higbie, 1935)
Note that this flux at the interface is valid at a specific x. To find the average flux, N1(x) has to be averaged over the entire surface:
L W
1 1 z 00 0
1N n dy dxW L
cxvDL2N
L
0
max1
cLvDL2N max
1
where L is the length of the film in x and W is its width in y. Since n1does not vary in y, inserting eq. 5:
L
0
max1 dx c
xvD
L1N →
max1 1i 1
D vN 2 c cL
LvD2k max
(6)so
The L/vmax is called contact time and is not known a priori in complex situations, as was in the film theory.
Compare:
(film theory)
1/2k D
k D
or
(penetration theory)
These two theories bracket the experimental data (Table 8.3-2) very well, almost too well to be accepted.Equation 6 can be rewritten, assuming that the average velocity is v0 = 2/3 vmax (true for a laminar slit flow of a Newtonian fluid).
12
12
1 2 1 2
Pe
6 Re Sc
21
0212102
1
DLv6
LDv
23
DL2
DLk
212
102
1
DLv6
The success of the penetration theory with data despite its restrictive assumption motivated scientists and engineers to propose alternative and more realistic models leading, however, to the same variable dependencies at the end.
Assumption: The thick film framework is replaced by TWO regions: interface and bulk.
In the interfacial region mass transfer takes place according to penetration theory. Then elements of this region ARE EXCHANGED with the bulk region. This is the so-called surface-renewal process.
3 The Surface Renewal Theory (Dankwerts, 1951)
The issue is how long the fluid elements stay in the interfacial region “exposed to penetration”.
probabilityof asurfaceE(t)dt= element to be at the
surface for time t
E(t) is the residence time distribution, RTD, and0
E(t)dt 1
The transfer of interfacial elements into the bulk is random and any surface element is equally likely to be withdrawn.
By definition the fraction of surface elements at time t is :
exp t /
where is a characteristic constant equivalent to the average residence time of an element in the interfacial (surface) region.
Now the fraction is also the sum of probabilitiest
E(t)dt
Thus the residence time distribution of surface elements is:
)tEdt)t(Edt)t(Edtdtexp1
dtddttE
dtd t
0
1
0t
The mass transfer coefficient at the interfacial region is obtained from the semi-infinite slab model (see eq. 9.1-5 and Cussler p. 46) as:
The semi-infinite slab model is used here even though the interfacial region is not infinite. But if the surface is rapidly renewed and the is small, then the interfacial region appears as infinite.
So,
texp1)t(E
1i110z1 cct
DNn
The average flux (over all surface elements) is:
00z1av,1 dtn)t(EN
dt cct
Dtexp
01i1
dt ttexpccD
0
1i1
0
1i1
1terfccD
As in the penetration theory, here 1/2k D
Again the residence time is as unknown as the in film theory or the L/vmax (contact time) in the penetration theory.
The major contribution of the surface renewal theory is that it gives a more REALISTIC physical situation. This gives a better starting point for development of effective correlations and better models.
k D /
1i1av,1 ccDN
01
1i1av,1 0erferfccDN
Thus,
Summary:
The Film Theory
The Penetration Theory
The Surface-Renewal Theory
LvD2k max
k D /
k 1D
Advantages Disadvantages
Simple;good base for extension
Film thickness is unknown
Simplest including flow
Contact time (L/vmax) usually unkown
Similar math to penetration theory, but better physical picture
Surface-renewal rate () is unknown
These simple models for fluid-fluid interfaces pretend that fluid motion is incorporated in diffusion and everything is treated as a thin film or semi-infinite slab problem.
In principle, these two extreme cases should bracket all possible geometries. Yet, especially the effect of flow (velocity) is usually not well reflected.
One reason is that the simple theories assume a homogeneous system while real systems are heterogeneous with respect to concentration and flow (Schlünder, 1977).
The dependencies of k on D and v, like k ~ D1/2, k ~ D2/3 or k ~ v0.67,observed in the experimentally-based MTCs are typically not well reflected by the simple mass transfer models.
Schlünder E.U., Chem. Eng. Sci. 32, 845-851.