In Problems 1-5 , find a formal solution to the given boundary value problem. ∂ 2 u ∂ x 2 + ∂ 2 u ∂ y 2 = 0 , 0 < x < π , 0 < y < π , ∂ u ∂ x ( 0 , y ) = ∂ u ∂ x ( π , y ) = 0 , 0 ≤ y ≤ π , u ( x , 0 ) = cos x − 2 cos 4 x , 0 ≤ x ≤ π , u ( x , π ) = 0 , 0 ≤ x ≤ π

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Answer 1

Textbook Question

Chapter 10.7, Problem 2E

In Problems 1-5, find a formal solution to the given boundary value problem.

∂ 2 u ∂ x 2 + ∂ 2 u ∂ y 2 = 0 , 0 < x < π , 0 < y < π , ∂ u ∂ x ( 0 , y ) = ∂ u ∂ x ( π , y ) = 0 , 0 ≤ y ≤ π , u ( x , 0 ) = cos x − 2 cos 4 x , 0 ≤ x ≤ π , u ( x , π ) = 0 , 0 ≤ x ≤ π

Expert Solution & Answer

To determine

The formal solution to the given initial value problem u(x,0)=cosx−2cos4x, 0≤x≤π, u(x,π)=0, 0≤x≤π.

Answer to Problem 2E

Solution:

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Explanation of Solution

It is given that

∂2u∂x2+∂2u∂y2=0, 0<x<π, 0<y<π ...(1)

With boundary conditions,

∂u∂x(0,y)=∂u∂x(π,y)=0,0≤y≤π ...(2)

and initial conditions,

u(x,0)=cosx−2cos4x, 0≤x≤π, ...(3)

u(x,π)=0, 0≤x≤π ...(4)

Consider the solution of the equation be u(x,y)=X(x)Y(y).

Above equation satisfies equation (1), so it becomes,

X″(x)Y(y)+X(x)Y″(y)=0X″(x)X(x)=−Y″(y)Y(y)=−λX″(x)+λX(x)=0 ...(5)

and

Y″(y)−λY(y)=0 ...(6)

Boundary condition in equation (2) becomes,

X′(0)=X′(π)=0

So, equation (5) becomes, X″(x)+λX(x)=0 with boundary conditions X′(0)=X′(π)=0.

The auxiliary equation becomes r2+λ=0.

If λ=0, then

r2=0r=0

Thus r=0 is the repeated root.

So, the general solution becomes X(x)=C1x+C2.

By boundary condition,

X′(0)=C1C1=0

and

X′(π)=C1C1=0

As, C1=0 then C2 can be any constant. Then X(x)=c2.

Now, if λ>0, then the roots becomes,

r2+λ=0r2=−λr=±iλ

The general solution becomes,

X(x)=c1cosλx+c2sinλx

By boundary condition,

X′(0)=−λc1sin0+λc2cos00=c2

and

X′(π)=−λc1sinλπ+λc2cosλπ0=λc1sinλπ

Here λ≠0,c1≠0, then

sinλπ=0sinλπ=sinnπλ=nλ=n2

which is given by

X(x)=c1cosnxXn(x)=cncosnx

Now, put the value of λ in (6),

Y″(y)−n2Y(y)=0

The auxiliary equation will be,

r2−n2=0r=±n

The solution becomes,

Yn(y)=c1eny+c2e−ny

Apply coshz=ez+e−z2 and sinhz=ez−e−z2 in above equation,

Yn(y)=Ancosh(ny)+Bnsinh(ny) ...(7)

Now, the boundary conditions in (4) will be satisfied if Y(π)=0, so let y=π in equation (7).

Yn(π)=Ancosh(nπ)+Bnsinh(nπ)0=Ancosh(nπ)+Bnsinh(nπ)Ancosh(nπ)=−Bnsinh(nπ)An=−Bntanh(nπ)

Put in equation (7),

Yn(y)=(−Bntanh(nπ))cosh(ny)+Bnsinh(ny)Yn(y)=Bn[(−sinh(nπ)cosh(nπ))cosh(ny)+sinh(ny)]Yn(y)=Bncosh(nπ)[−sinh(nπ)cosh(ny)+cosh(nπ)sinh(ny)]Yn(y)=Cnsinhn(y−π)

Put the value Xn and Yn in un(x,y)=Xn(x)Yn(y),

un(x,y)=(cncosnx)(Cnsinhn(y−π))un(x,y)=Encosnxsinhn(y−π)

Then the formal solution obtained is,

u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π)

where,

E0=−1π2∫0π(cosx−2cos4x)dxEn=2πsinh(−nπ)∫0π(cosx−2cos4x)cosnxdx

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

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Answer 2

Textbook Question

Chapter 10.7, Problem 2E

In Problems 1-5, find a formal solution to the given boundary value problem.

∂ 2 u ∂ x 2 + ∂ 2 u ∂ y 2 = 0 , 0 < x < π , 0 < y < π , ∂ u ∂ x ( 0 , y ) = ∂ u ∂ x ( π , y ) = 0 , 0 ≤ y ≤ π , u ( x , 0 ) = cos x − 2 cos 4 x , 0 ≤ x ≤ π , u ( x , π ) = 0 , 0 ≤ x ≤ π

Expert Solution & Answer

To determine

The formal solution to the given initial value problem u(x,0)=cosx−2cos4x, 0≤x≤π, u(x,π)=0, 0≤x≤π.

Answer to Problem 2E

Solution:

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Explanation of Solution

It is given that

∂2u∂x2+∂2u∂y2=0, 0<x<π, 0<y<π ...(1)

With boundary conditions,

∂u∂x(0,y)=∂u∂x(π,y)=0,0≤y≤π ...(2)

and initial conditions,

u(x,0)=cosx−2cos4x, 0≤x≤π, ...(3)

u(x,π)=0, 0≤x≤π ...(4)

Consider the solution of the equation be u(x,y)=X(x)Y(y).

Above equation satisfies equation (1), so it becomes,

X″(x)Y(y)+X(x)Y″(y)=0X″(x)X(x)=−Y″(y)Y(y)=−λX″(x)+λX(x)=0 ...(5)

and

Y″(y)−λY(y)=0 ...(6)

Boundary condition in equation (2) becomes,

X′(0)=X′(π)=0

So, equation (5) becomes, X″(x)+λX(x)=0 with boundary conditions X′(0)=X′(π)=0.

The auxiliary equation becomes r2+λ=0.

If λ=0, then

r2=0r=0

Thus r=0 is the repeated root.

So, the general solution becomes X(x)=C1x+C2.

By boundary condition,

X′(0)=C1C1=0

and

X′(π)=C1C1=0

As, C1=0 then C2 can be any constant. Then X(x)=c2.

Now, if λ>0, then the roots becomes,

r2+λ=0r2=−λr=±iλ

The general solution becomes,

X(x)=c1cosλx+c2sinλx

By boundary condition,

X′(0)=−λc1sin0+λc2cos00=c2

and

X′(π)=−λc1sinλπ+λc2cosλπ0=λc1sinλπ

Here λ≠0,c1≠0, then

sinλπ=0sinλπ=sinnπλ=nλ=n2

which is given by

X(x)=c1cosnxXn(x)=cncosnx

Now, put the value of λ in (6),

Y″(y)−n2Y(y)=0

The auxiliary equation will be,

r2−n2=0r=±n

The solution becomes,

Yn(y)=c1eny+c2e−ny

Apply coshz=ez+e−z2 and sinhz=ez−e−z2 in above equation,

Yn(y)=Ancosh(ny)+Bnsinh(ny) ...(7)

Now, the boundary conditions in (4) will be satisfied if Y(π)=0, so let y=π in equation (7).

Yn(π)=Ancosh(nπ)+Bnsinh(nπ)0=Ancosh(nπ)+Bnsinh(nπ)Ancosh(nπ)=−Bnsinh(nπ)An=−Bntanh(nπ)

Put in equation (7),

Yn(y)=(−Bntanh(nπ))cosh(ny)+Bnsinh(ny)Yn(y)=Bn[(−sinh(nπ)cosh(nπ))cosh(ny)+sinh(ny)]Yn(y)=Bncosh(nπ)[−sinh(nπ)cosh(ny)+cosh(nπ)sinh(ny)]Yn(y)=Cnsinhn(y−π)

Put the value Xn and Yn in un(x,y)=Xn(x)Yn(y),

un(x,y)=(cncosnx)(Cnsinhn(y−π))un(x,y)=Encosnxsinhn(y−π)

Then the formal solution obtained is,

u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π)

where,

E0=−1π2∫0π(cosx−2cos4x)dxEn=2πsinh(−nπ)∫0π(cosx−2cos4x)cosnxdx

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

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Answer 3

Textbook Question

Chapter 10.7, Problem 2E

In Problems 1-5, find a formal solution to the given boundary value problem.

∂ 2 u ∂ x 2 + ∂ 2 u ∂ y 2 = 0 , 0 < x < π , 0 < y < π , ∂ u ∂ x ( 0 , y ) = ∂ u ∂ x ( π , y ) = 0 , 0 ≤ y ≤ π , u ( x , 0 ) = cos x − 2 cos 4 x , 0 ≤ x ≤ π , u ( x , π ) = 0 , 0 ≤ x ≤ π

Expert Solution & Answer

To determine

The formal solution to the given initial value problem u(x,0)=cosx−2cos4x, 0≤x≤π, u(x,π)=0, 0≤x≤π.

Answer to Problem 2E

Solution:

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Explanation of Solution

It is given that

∂2u∂x2+∂2u∂y2=0, 0<x<π, 0<y<π ...(1)

With boundary conditions,

∂u∂x(0,y)=∂u∂x(π,y)=0,0≤y≤π ...(2)

and initial conditions,

u(x,0)=cosx−2cos4x, 0≤x≤π, ...(3)

u(x,π)=0, 0≤x≤π ...(4)

Consider the solution of the equation be u(x,y)=X(x)Y(y).

Above equation satisfies equation (1), so it becomes,

X″(x)Y(y)+X(x)Y″(y)=0X″(x)X(x)=−Y″(y)Y(y)=−λX″(x)+λX(x)=0 ...(5)

and

Y″(y)−λY(y)=0 ...(6)

Boundary condition in equation (2) becomes,

X′(0)=X′(π)=0

So, equation (5) becomes, X″(x)+λX(x)=0 with boundary conditions X′(0)=X′(π)=0.

The auxiliary equation becomes r2+λ=0.

If λ=0, then

r2=0r=0

Thus r=0 is the repeated root.

So, the general solution becomes X(x)=C1x+C2.

By boundary condition,

X′(0)=C1C1=0

and

X′(π)=C1C1=0

As, C1=0 then C2 can be any constant. Then X(x)=c2.

Now, if λ>0, then the roots becomes,

r2+λ=0r2=−λr=±iλ

The general solution becomes,

X(x)=c1cosλx+c2sinλx

By boundary condition,

X′(0)=−λc1sin0+λc2cos00=c2

and

X′(π)=−λc1sinλπ+λc2cosλπ0=λc1sinλπ

Here λ≠0,c1≠0, then

sinλπ=0sinλπ=sinnπλ=nλ=n2

which is given by

X(x)=c1cosnxXn(x)=cncosnx

Now, put the value of λ in (6),

Y″(y)−n2Y(y)=0

The auxiliary equation will be,

r2−n2=0r=±n

The solution becomes,

Yn(y)=c1eny+c2e−ny

Apply coshz=ez+e−z2 and sinhz=ez−e−z2 in above equation,

Yn(y)=Ancosh(ny)+Bnsinh(ny) ...(7)

Now, the boundary conditions in (4) will be satisfied if Y(π)=0, so let y=π in equation (7).

Yn(π)=Ancosh(nπ)+Bnsinh(nπ)0=Ancosh(nπ)+Bnsinh(nπ)Ancosh(nπ)=−Bnsinh(nπ)An=−Bntanh(nπ)

Put in equation (7),

Yn(y)=(−Bntanh(nπ))cosh(ny)+Bnsinh(ny)Yn(y)=Bn[(−sinh(nπ)cosh(nπ))cosh(ny)+sinh(ny)]Yn(y)=Bncosh(nπ)[−sinh(nπ)cosh(ny)+cosh(nπ)sinh(ny)]Yn(y)=Cnsinhn(y−π)

Put the value Xn and Yn in un(x,y)=Xn(x)Yn(y),

un(x,y)=(cncosnx)(Cnsinhn(y−π))un(x,y)=Encosnxsinhn(y−π)

Then the formal solution obtained is,

u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π)

where,

E0=−1π2∫0π(cosx−2cos4x)dxEn=2πsinh(−nπ)∫0π(cosx−2cos4x)cosnxdx

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

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Answer 4

Textbook Question

Chapter 10.7, Problem 2E

In Problems 1-5, find a formal solution to the given boundary value problem.

∂ 2 u ∂ x 2 + ∂ 2 u ∂ y 2 = 0 , 0 < x < π , 0 < y < π , ∂ u ∂ x ( 0 , y ) = ∂ u ∂ x ( π , y ) = 0 , 0 ≤ y ≤ π , u ( x , 0 ) = cos x − 2 cos 4 x , 0 ≤ x ≤ π , u ( x , π ) = 0 , 0 ≤ x ≤ π

Expert Solution & Answer

To determine

The formal solution to the given initial value problem u(x,0)=cosx−2cos4x, 0≤x≤π, u(x,π)=0, 0≤x≤π.

Answer to Problem 2E

Solution:

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Explanation of Solution

It is given that

∂2u∂x2+∂2u∂y2=0, 0<x<π, 0<y<π ...(1)

With boundary conditions,

∂u∂x(0,y)=∂u∂x(π,y)=0,0≤y≤π ...(2)

and initial conditions,

u(x,0)=cosx−2cos4x, 0≤x≤π, ...(3)

u(x,π)=0, 0≤x≤π ...(4)

Consider the solution of the equation be u(x,y)=X(x)Y(y).

Above equation satisfies equation (1), so it becomes,

X″(x)Y(y)+X(x)Y″(y)=0X″(x)X(x)=−Y″(y)Y(y)=−λX″(x)+λX(x)=0 ...(5)

and

Y″(y)−λY(y)=0 ...(6)

Boundary condition in equation (2) becomes,

X′(0)=X′(π)=0

So, equation (5) becomes, X″(x)+λX(x)=0 with boundary conditions X′(0)=X′(π)=0.

The auxiliary equation becomes r2+λ=0.

If λ=0, then

r2=0r=0

Thus r=0 is the repeated root.

So, the general solution becomes X(x)=C1x+C2.

By boundary condition,

X′(0)=C1C1=0

and

X′(π)=C1C1=0

As, C1=0 then C2 can be any constant. Then X(x)=c2.

Now, if λ>0, then the roots becomes,

r2+λ=0r2=−λr=±iλ

The general solution becomes,

X(x)=c1cosλx+c2sinλx

By boundary condition,

X′(0)=−λc1sin0+λc2cos00=c2

and

X′(π)=−λc1sinλπ+λc2cosλπ0=λc1sinλπ

Here λ≠0,c1≠0, then

sinλπ=0sinλπ=sinnπλ=nλ=n2

which is given by

X(x)=c1cosnxXn(x)=cncosnx

Now, put the value of λ in (6),

Y″(y)−n2Y(y)=0

The auxiliary equation will be,

r2−n2=0r=±n

The solution becomes,

Yn(y)=c1eny+c2e−ny

Apply coshz=ez+e−z2 and sinhz=ez−e−z2 in above equation,

Yn(y)=Ancosh(ny)+Bnsinh(ny) ...(7)

Now, the boundary conditions in (4) will be satisfied if Y(π)=0, so let y=π in equation (7).

Yn(π)=Ancosh(nπ)+Bnsinh(nπ)0=Ancosh(nπ)+Bnsinh(nπ)Ancosh(nπ)=−Bnsinh(nπ)An=−Bntanh(nπ)

Put in equation (7),

Yn(y)=(−Bntanh(nπ))cosh(ny)+Bnsinh(ny)Yn(y)=Bn[(−sinh(nπ)cosh(nπ))cosh(ny)+sinh(ny)]Yn(y)=Bncosh(nπ)[−sinh(nπ)cosh(ny)+cosh(nπ)sinh(ny)]Yn(y)=Cnsinhn(y−π)

Put the value Xn and Yn in un(x,y)=Xn(x)Yn(y),

un(x,y)=(cncosnx)(Cnsinhn(y−π))un(x,y)=Encosnxsinhn(y−π)

Then the formal solution obtained is,

u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π)

where,

E0=−1π2∫0π(cosx−2cos4x)dxEn=2πsinh(−nπ)∫0π(cosx−2cos4x)cosnxdx

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

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Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution & Answer

To determine

The formal solution to the given initial value problem u(x,0)=cosx−2cos4x, 0≤x≤π, u(x,π)=0, 0≤x≤π.

Answer to Problem 2E

Solution:

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Explanation of Solution

It is given that

∂2u∂x2+∂2u∂y2=0, 0<x<π, 0<y<π ...(1)

With boundary conditions,

∂u∂x(0,y)=∂u∂x(π,y)=0,0≤y≤π ...(2)

and initial conditions,

u(x,0)=cosx−2cos4x, 0≤x≤π, ...(3)

u(x,π)=0, 0≤x≤π ...(4)

Consider the solution of the equation be u(x,y)=X(x)Y(y).

Above equation satisfies equation (1), so it becomes,

X″(x)Y(y)+X(x)Y″(y)=0X″(x)X(x)=−Y″(y)Y(y)=−λX″(x)+λX(x)=0 ...(5)

and

Y″(y)−λY(y)=0 ...(6)

Boundary condition in equation (2) becomes,

X′(0)=X′(π)=0

So, equation (5) becomes, X″(x)+λX(x)=0 with boundary conditions X′(0)=X′(π)=0.

The auxiliary equation becomes r2+λ=0.

If λ=0, then

r2=0r=0

Thus r=0 is the repeated root.

So, the general solution becomes X(x)=C1x+C2.

By boundary condition,

X′(0)=C1C1=0

and

X′(π)=C1C1=0

As, C1=0 then C2 can be any constant. Then X(x)=c2.

Now, if λ>0, then the roots becomes,

r2+λ=0r2=−λr=±iλ

The general solution becomes,

X(x)=c1cosλx+c2sinλx

By boundary condition,

X′(0)=−λc1sin0+λc2cos00=c2

and

X′(π)=−λc1sinλπ+λc2cosλπ0=λc1sinλπ

Here λ≠0,c1≠0, then

sinλπ=0sinλπ=sinnπλ=nλ=n2

which is given by

X(x)=c1cosnxXn(x)=cncosnx

Now, put the value of λ in (6),

Y″(y)−n2Y(y)=0

The auxiliary equation will be,

r2−n2=0r=±n

The solution becomes,

Yn(y)=c1eny+c2e−ny

Apply coshz=ez+e−z2 and sinhz=ez−e−z2 in above equation,

Yn(y)=Ancosh(ny)+Bnsinh(ny) ...(7)

Now, the boundary conditions in (4) will be satisfied if Y(π)=0, so let y=π in equation (7).

Yn(π)=Ancosh(nπ)+Bnsinh(nπ)0=Ancosh(nπ)+Bnsinh(nπ)Ancosh(nπ)=−Bnsinh(nπ)An=−Bntanh(nπ)

Put in equation (7),

Yn(y)=(−Bntanh(nπ))cosh(ny)+Bnsinh(ny)Yn(y)=Bn[(−sinh(nπ)cosh(nπ))cosh(ny)+sinh(ny)]Yn(y)=Bncosh(nπ)[−sinh(nπ)cosh(ny)+cosh(nπ)sinh(ny)]Yn(y)=Cnsinhn(y−π)

Put the value Xn and Yn in un(x,y)=Xn(x)Yn(y),

un(x,y)=(cncosnx)(Cnsinhn(y−π))un(x,y)=Encosnxsinhn(y−π)

Then the formal solution obtained is,

u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π)

where,

E0=−1π2∫0π(cosx−2cos4x)dxEn=2πsinh(−nπ)∫0π(cosx−2cos4x)cosnxdx

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Answer 8

Expert Solution & Answer

To determine

The formal solution to the given initial value problem u(x,0)=cosx−2cos4x, 0≤x≤π, u(x,π)=0, 0≤x≤π.

Answer to Problem 2E

Solution:

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Explanation of Solution

It is given that

∂2u∂x2+∂2u∂y2=0, 0<x<π, 0<y<π ...(1)

With boundary conditions,

∂u∂x(0,y)=∂u∂x(π,y)=0,0≤y≤π ...(2)

and initial conditions,

u(x,0)=cosx−2cos4x, 0≤x≤π, ...(3)

u(x,π)=0, 0≤x≤π ...(4)

Consider the solution of the equation be u(x,y)=X(x)Y(y).

Above equation satisfies equation (1), so it becomes,

X″(x)Y(y)+X(x)Y″(y)=0X″(x)X(x)=−Y″(y)Y(y)=−λX″(x)+λX(x)=0 ...(5)

and

Y″(y)−λY(y)=0 ...(6)

Boundary condition in equation (2) becomes,

X′(0)=X′(π)=0

So, equation (5) becomes, X″(x)+λX(x)=0 with boundary conditions X′(0)=X′(π)=0.

The auxiliary equation becomes r2+λ=0.

If λ=0, then

r2=0r=0

Thus r=0 is the repeated root.

So, the general solution becomes X(x)=C1x+C2.

By boundary condition,

X′(0)=C1C1=0

and

X′(π)=C1C1=0

As, C1=0 then C2 can be any constant. Then X(x)=c2.

Now, if λ>0, then the roots becomes,

r2+λ=0r2=−λr=±iλ

The general solution becomes,

X(x)=c1cosλx+c2sinλx

By boundary condition,

X′(0)=−λc1sin0+λc2cos00=c2

and

X′(π)=−λc1sinλπ+λc2cosλπ0=λc1sinλπ

Here λ≠0,c1≠0, then

sinλπ=0sinλπ=sinnπλ=nλ=n2

which is given by

X(x)=c1cosnxXn(x)=cncosnx

Now, put the value of λ in (6),

Y″(y)−n2Y(y)=0

The auxiliary equation will be,

r2−n2=0r=±n

The solution becomes,

Yn(y)=c1eny+c2e−ny

Apply coshz=ez+e−z2 and sinhz=ez−e−z2 in above equation,

Yn(y)=Ancosh(ny)+Bnsinh(ny) ...(7)

Now, the boundary conditions in (4) will be satisfied if Y(π)=0, so let y=π in equation (7).

Yn(π)=Ancosh(nπ)+Bnsinh(nπ)0=Ancosh(nπ)+Bnsinh(nπ)Ancosh(nπ)=−Bnsinh(nπ)An=−Bntanh(nπ)

Put in equation (7),

Yn(y)=(−Bntanh(nπ))cosh(ny)+Bnsinh(ny)Yn(y)=Bn[(−sinh(nπ)cosh(nπ))cosh(ny)+sinh(ny)]Yn(y)=Bncosh(nπ)[−sinh(nπ)cosh(ny)+cosh(nπ)sinh(ny)]Yn(y)=Cnsinhn(y−π)

Put the value Xn and Yn in un(x,y)=Xn(x)Yn(y),

un(x,y)=(cncosnx)(Cnsinhn(y−π))un(x,y)=Encosnxsinhn(y−π)

Then the formal solution obtained is,

u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π)

where,

E0=−1π2∫0π(cosx−2cos4x)dxEn=2πsinh(−nπ)∫0π(cosx−2cos4x)cosnxdx

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

To determine

The formal solution to the given initial value problem u(x,0)=cosx−2cos4x, 0≤x≤π, u(x,π)=0, 0≤x≤π.

Answer 12

Answer to Problem 2E

Solution:

The formal solution to the given initial value problem is u(x,y)=E0(y−π)+∑n=1∞Encosnxsinhn(y−π).

Answer 13

Explanation of Solution

It is given that

∂2u∂x2+∂2u∂y2=0, 0<x<π, 0<y<π ...(1)

With boundary conditions,

∂u∂x(0,y)=∂u∂x(π,y)=0,0≤y≤π ...(2)

and initial conditions,

u(x,0)=cosx−2cos4x, 0≤x≤π, ...(3)

u(x,π)=0, 0≤x≤π ...(4)

Consider the solution of the equation be u(x,y)=X(x)Y(y).

Above equation satisfies equation (1), so it becomes,

X″(x)Y(y)+X(x)Y″(y)=0X″(x)X(x)=−Y″(y)Y(y)=−λX″(x)+λX(x)=0 ...(5)

and

Y″(y)−λY(y)=0 ...(6)

Boundary condition in equation (2) becomes,

X′(0)=X′(π)=0

So, equation (5) becomes, X″(x)+λX(x)=0 with boundary conditions X′(0)=X′(π)=0.

The auxiliary equation becomes r2+λ=0.

If λ=0, then

r2=0r=0

Thus r=0 is the repeated root.

So, the general solution becomes X(x)=C1x+C2.

By boundary condition,

X′(0)=C1C1=0

and

X′(π)=C1C1=0

As, C1=0 then C2 can be any constant. Then X(x)=c2.

Now, if λ>0, then the roots becomes,

r2+λ=0r2=−λr=±iλ

The general solution becomes,

X(x)=c1cosλx+c2sinλx

By boundary condition,

X′(0)=−λc1sin0+λc2cos00=c2

and

X′(π)=−λc1sinλπ+λc2cosλπ0=λc1sinλπ

Here λ≠0,c1≠0, then

sinλπ=0sinλπ=sinnπλ=nλ=n2

which is given by

X(x)=c1cosnxXn(x)=cncosnx

Now, put the value of λ in (6),

Y″(y)−n2Y(y)=0

The auxiliary equation will be,

r2−n2=0r=±n

The solution becomes,

Yn(y)=c1eny+c2e−ny

Apply coshz=ez+e−z2 and sinhz=ez−e−z2 in above equation,

Yn(y)=Ancosh(ny)+Bnsinh(ny) ...(7)

Now, the boundary conditions in (4) will be satisfied if Y(π)=0, so let y=π in equation (7).

Yn(π)=Ancosh(nπ)+Bnsinh(nπ)0=Ancosh(nπ)+Bnsinh(nπ)Ancosh(nπ)=−Bnsinh(nπ)An=−Bntanh(nπ)

Put in equation (7),

Yn(y)=(−Bntanh(nπ))cosh(ny)+Bnsinh(ny)Yn(y)=Bn[(−sinh(nπ)cosh(nπ))cosh(ny)+sinh(ny)]Yn(y)=Bncosh(nπ)[−sinh(nπ)cosh(ny)+cosh(nπ)sinh(ny)]Yn(y)=Cnsinhn(y−π)