CHEMICAL ENGINEERING

MASS TRANSFER 225

According to the Higbie model, if the element is exposed for a timete, the average
rate of transfer is given by:

NAD

1

te

∫te

0

D∂C/∂z zD 0 dt

From Problem 10.7, the concentrationCis:

CDCAoCCAiCAo

[

1

y L

2

∑^1

nD 0

1

n

expn^2 ^2 Dte/L^2 sinny/L

]

∂C

∂y

DCAiCAo

[

1

L

2

∑^1

nD 0

L

expn^2 ^2 Dte/L^2 cosny/L

]

(

∂C

∂y

)

yD 0

DCAiCAo

[

1

L

2

∑^1

0

L

expn^2 ^2 Dte/L^2

]

NAD

DCAiCAo te

∫te

0

[

1

L

2

∑^1

0

L

expn^2 ^2 Dte/L^2

]

dt

D

DCAiCAo te

[

te L

2

∑^1

0

L

(

L^2

n^2 ^2 D

)

expn^2 ^2 Dte/L^2

]te

0

D

DCAiCAo te [

te L

2

∑^1

0

(

L

n^2 D

)

expn^2 ^2 Dte/L^2 C

2

∑^1

0

L

(

L^2

n^2 ^2 D

)]

NAD

D

L

CAiCAo

{

1 C

2 L^2

^2 Dte

[ 1

∑

0

1

n^2

∑^1

0

1

n^2

]}

∑^1

0

1

n^2

∑^1

0

1

n^2

D

∑^1

0

1

n^2

∑^1

1

1

n^2

∑^1

0

1

n^2

C

∑^1

1

1

n^2

Dexp^2 Dte/L^2 C

∑^1

1

1

n^2

expn^2 ^2 Dte/L^2 C 1 C^2 / 6

D

∑^1

1

[

^2

6

1

n^2

expn^2 ^2 Dte/L^2 C 1 exp^2 Dte/L^2

]

Considering the terms 1exp^2 Dte/L^2 and Dte/L^2 to be very small so that
^2 Dte/L^2 is small and exp^2 Dte/L^2 !1. Therefore, 1exp^2 Dte/L^2 is

CHEMICAL ENGINEERING

MASS TRANSFER 225

NAD

1

[

1

2



∑^1

1

]

∂C

[

1

L

2



∑^1



L

]

(

∂C

)

[

1

L

2



∑^1



L

]

NAD

[

1

L

2



∑^1



L

]

D

[

2



∑^1



L

(

L^2

)

2



∑^1

(

L

)

2



∑^1



L

(

L^2

)]

NAD

D

L

{

1 C

2 L^2

[ 1

∑

1

∑^1

1

]}

∑^1

^2