Wolfe duality: Difference between revisions

The Thiele modulus was developed by E.W. Thiele in his paper 'Relation between catalytic activity and size of particle' in 1939. ^[1] Thiele reasoned that with a large enough particle, the reaction rate is so rapid that diffusion forces are only able to carry product away from the surface of the catalyst particle. Therefore, only the surface of the catalyst would be experiencing any reaction. The Thiele Modulus was then developed to describe the relationship between diffusion and reaction rate in porous catalyst pellets with no mass transfer limitations. This value is generally used in determining the effectiveness factor for catalyst pellets.

The Thiele modulus is represented by different symbols in different texts, but is defined in Hill^[2] as h_T.

${\displaystyle h_T={\displaystyle \frac{\text{diffusion time}}{\text{reaction time}}}}$

Overview

The derivation of the Thiele Modulus (from Hill) begins with a material balance on the catalyst pore. For a first-order irreversible reaction in a straight cylindrical pore at steady state:

${\displaystyle \pi }{r}^2{(-D_c\frac{dC}{dx})}_x=\pi r^2{(-D_c\frac{dC}{dx})}_{x+\mathrm{\Delta }x}+\left(2\pi r\mathrm{\Delta }x\right)\left(k_{1}C\right)$

where ${\displaystyle D_c}$ is a diffusivity constant, and ${\displaystyle k_1}$ is the rate constant.

Then, turning the equation into a differential by dividing by ${\displaystyle \mathrm{\Delta }}x$ and taking the limit as ${\displaystyle \mathrm{\Delta }}x$ approaches 0,

${\displaystyle D_c\left(\frac{d^{2}C}{d{x}^2}\right)=\frac{2k_{1}C}{r}}$

This differential equation with the following boundary conditions:

${\displaystyle C=C_o\text{ at }x=0}$

and

${\displaystyle \frac{dC}{dx}=0\text{ at }x=L}$

where the first boundary condition indicates a constant external concentration on one end of the pore and the second boundary condition indicates that there is no flow out of the other end of the pore.

Plugging in these boundary conditions, we have

${\displaystyle \frac{d^{2}C}{d(x/L{)}^2}=\left(\frac{2k_1{L}^2}{r{D}_c}\right)C}$

The term on the right side multiplied by C represents the square of the Thiele Modulus, which we now see rises naturally out of the material balance. Then the Thiele modulus for a first order reaction is:

${\displaystyle h_T^2=\frac{2k_1{L}^2}{r{D}_c}}$

From this relation it is evident that with large values of ${\displaystyle h_T}$, the rate term dominates, and the reaction is fast while slow diffusion limits the overall rate. Smaller values of the Thiele modulus represent slow reactions with fast diffusion.

Other Forms

Other order reactions may be solved in a similar manner as above. The results are listed below for irreversible reactions in straight cylindrical pores.

Second Order Reaction

${\displaystyle h_2^2=\frac{2L^2{k}_2{C}_o}{r{D}_c}}$

Zeroth Order Reaction

${\displaystyle h_o^2=\frac{2L^2{k}_o}{r{D}_c{C}_o}}$

Effectiveness Factor

The effectiveness factor η relates the diffusive reaction rate with the rate of reaction in the bulk stream.

For a first order reaction in a cylindrical pore, this is:

${\displaystyle \eta }=\frac{\tanh h_T}{h_T}$

References

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