HW/Tutorial Week #10 WWWR Chapters 27, ID Chapter 14 Tutorial #10 WWWR # 27.6 & 27.22 To be discussed on March 31, 2015. By either volunteer or class list.

HW/Tutorial Week #10WWWR Chapters 27, ID Chapter 14

• Tutorial #10• WWWR # 27.6 &

27.22• To be discussed on

March 31, 2015.• By either volunteer or

class list.

Unsteady-State Diffusion

• Transient diffusion, when concentration at a given point changes with time

• Partial differential equations, complex processes and solutions

• Solutions for simple geometries and boundary conditions

0

AA

A Rt

cN

• Fick’s second law of diffusion

• 1-dimensional, no bulk contribution, no reaction

• Solution has 2 standard forms, by Laplace transforms or by separation of variables

2

2

z

cD

t

c AAB

A

• Transient diffusion in semi-infinite mediumuniform initial concentration CAo

constant surface concentration CAs

– Initial condition, t = 0, CA(z,0) = CAo for all z

– First boundary condition:

at z = 0, cA(0,t) = CAs for t > 0

– Second boundary condition:

at z = , cA(,t) = CAo for all t

– Using Laplace transform, making the boundary conditions homogeneous

AoA cc

– Thus, the P.D.E. becomes:

– with(z,0) = 0(0,t) = cAs – cAo

(,t) = 0

– Laplace transformation yields

which becomes an O.D.E.

2

2

zD

t AB

2

2

0dz

dDAB

02

2

ABD

s

dz

d

– Transformed boundary conditions:•

•

– General analytical solution:

– With the boundary conditions, reduces to

– The inverse Laplace transform is then

s

ccz AoAs )0(

0)( z

zDszDs ABAB eBeA /1

/1

zDsAoAs ABes

cc /)(

tD

zcc

AB

AoAs2

erfc)(

– As dimensionless concentration change,• With respect to initial concentration

• With respect to surface concentration

– The error function

is generally defined by

tD

z

tD

z

cc

cc

ABABAoAs

AoA

2erf1

2erfc

erf2

erf

tD

z

cc

cc

ABAoAs

AAs

tD

z

AB2

deerf 0

22

– The error is approximated by• If 0.5

• If 1

– For the diffusive flux into semi-infinite medium, differentiating with chain rule to the error function

and finally,

3

2erf

3

211erf

e

tD

cc

dz

dc

AB

AAsz

A

0

0

AoAsAB

zzA cct

DN 0,

• Transient diffusion in a finite medium, with negligible surface resistance– Initial concentration cAo subjected to sudden

change which brings the surface concentration cAs

– For example, diffusion of molecules through a solid slab of uniform thickness

– As diffusion is slow, the concentration profile satisfy the P.D.E.

2

2

z

cD

t

c AAB

A

– Initial and boundary conditions of• cA = cAo at t = 0 for 0 z L

• cA = cAs at z = 0 for t > 0

• cA = cAs at z = L for t > 0

– Simplify by dimensionless concentration change

– Changing the P.D.E. to

Y = Yo at t = 0 for 0 z L

Y = 0 at z = 0 for t > 0

Y = 0 at z = L for t > 0

AsAo

AsA

cc

ccY

2

2

z

YD

t

YAB

– Assuming a product solution,

Y(z,t) = T(t) Z(z)– The partial derivatives will be

– Substitute into P.D.E.

divide by DAB, T, Z to

t

TZ

t

Y

2

2

2

2

z

ZT

z

Y

2

2

z

ZTD

t

TZ AB

2

211

z

Z

Zt

T

TDAB

– Separating the variables to equal -2, the general solutions are

– Thus, the product solution is:

– For n = 1, 2, 3…,

tDABeCtT2

1

zCzCzZ sincos 32

tDABezCzCY2

)sin()cos( '2

'1

L

n

– The complete solution is:

where L = sheet thickness and – If the sheet has uniform initial concentration,

for n = 1, 3, 5…– And the flux at z and t is

dzL

znYe

L

zn

Lcc

ccY

n

L

oXn

AsAo

AsA D

sinsin2

1 0

)2/( 2

21x

tDX ABD

1

)2/( 2

sin14

n

Xn

AsAo

AsA DeL

zn

ncc

cc

DXn

nAoAs

ABzA e

L

zncc

L

DN

2)2/(

1, cos

4

Example 1

Example 2

• Concentration-Time charts

Example 3