The laplace equation of velocity potential function in spherical polar coordinate.

Question

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Answer 1

Textbook Question

Chapter 10, Problem 62P

Chapter 10, Problem 62P,

Expert Solution & Answer

To determine

The laplace equation of velocity potential function in spherical polar coordinate.

Answer to Problem 62P

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Explanation of Solution

Given information:

The distance from origin is r and angle of inclination between the radial vector and axis of rotation is θ.

The radial vector about the coordinate axis is shown in Figure (1).

FLUID MECHANICS FUND. (LL)-W/ACCESS, Chapter 10, Problem 62P

Figure-(1)

Write the expression for component of vector r along the x-axis.

x=rcosθ ...... (I)

Write the expression for component of vector r along the y-axis.

y=rsinθ ...... (II)

Write the expression for Laplace equation for the velocity potential function Cartesian coordinate.

∇2ϕ=0∂2ϕ∂x2+∂2ϕ∂y2=0 ...... (III)

Write expression for Laplace equation as function of r and θ.

[( ∂ 2 ϕ ∂ r 2 )( ∂ x 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ x 2 ∂ θ 2 )]+[( ∂ 2 ϕ ∂ r 2 )( ∂ y 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ y 2 ∂ θ 2 )]=0[( ∂ 2 ϕ ∂ r 2 ) ( ∂x ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂x ∂θ ) 2]+[( ∂ 2 ϕ ∂ r 2 ) ( ∂y ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂y ∂θ ) 2]=0 ...... (IV)

Differentiate Equation (I) with respect to r.

∂x∂r=∂∂r(rcosθ)=cosθ ...... (V)

Differentiate Equation (I) with respect to θ.

∂x∂θ=∂∂θ(rcosθ)=−rsinθ ...... (VI)

Differentiate Equation (II) with respect to r.

∂y∂r=∂∂r(rsinθ)=sinθ ...... (VII)

Differentiate Equation (II) with respect to θ.

∂y∂θ=∂∂θ(rsinθ)=rcosθ ...... (VIII)

Substitute cosθ for ∂x∂r, −rsinθ for ∂x∂θ, sinθ for ∂y∂r and rcosθ for ∂y∂θ in Equation (IV).

( ∂ 2 ϕ ∂ r 2 ) ( cosθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( −rsinθ )2+( ∂ 2 ϕ ∂ r 2 ) ( sinθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( rcosθ )2=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ+1 sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ+1 sin 2 θ)=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ sin 2 θ)=0(1 cos 2 θ sin 2 θ)[( ∂ 2 ϕ ∂ r 2 )+1 r 2( ∂ 2 ϕ ∂ r 2 )]=0

Conclusion:

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

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Answer 2

Textbook Question

Chapter 10, Problem 62P

Chapter 10, Problem 62P,

Expert Solution & Answer

To determine

The laplace equation of velocity potential function in spherical polar coordinate.

Answer to Problem 62P

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Explanation of Solution

Given information:

The distance from origin is r and angle of inclination between the radial vector and axis of rotation is θ.

The radial vector about the coordinate axis is shown in Figure (1).

FLUID MECHANICS FUND. (LL)-W/ACCESS, Chapter 10, Problem 62P

Figure-(1)

Write the expression for component of vector r along the x-axis.

x=rcosθ ...... (I)

Write the expression for component of vector r along the y-axis.

y=rsinθ ...... (II)

Write the expression for Laplace equation for the velocity potential function Cartesian coordinate.

∇2ϕ=0∂2ϕ∂x2+∂2ϕ∂y2=0 ...... (III)

Write expression for Laplace equation as function of r and θ.

[( ∂ 2 ϕ ∂ r 2 )( ∂ x 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ x 2 ∂ θ 2 )]+[( ∂ 2 ϕ ∂ r 2 )( ∂ y 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ y 2 ∂ θ 2 )]=0[( ∂ 2 ϕ ∂ r 2 ) ( ∂x ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂x ∂θ ) 2]+[( ∂ 2 ϕ ∂ r 2 ) ( ∂y ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂y ∂θ ) 2]=0 ...... (IV)

Differentiate Equation (I) with respect to r.

∂x∂r=∂∂r(rcosθ)=cosθ ...... (V)

Differentiate Equation (I) with respect to θ.

∂x∂θ=∂∂θ(rcosθ)=−rsinθ ...... (VI)

Differentiate Equation (II) with respect to r.

∂y∂r=∂∂r(rsinθ)=sinθ ...... (VII)

Differentiate Equation (II) with respect to θ.

∂y∂θ=∂∂θ(rsinθ)=rcosθ ...... (VIII)

Substitute cosθ for ∂x∂r, −rsinθ for ∂x∂θ, sinθ for ∂y∂r and rcosθ for ∂y∂θ in Equation (IV).

( ∂ 2 ϕ ∂ r 2 ) ( cosθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( −rsinθ )2+( ∂ 2 ϕ ∂ r 2 ) ( sinθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( rcosθ )2=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ+1 sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ+1 sin 2 θ)=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ sin 2 θ)=0(1 cos 2 θ sin 2 θ)[( ∂ 2 ϕ ∂ r 2 )+1 r 2( ∂ 2 ϕ ∂ r 2 )]=0

Conclusion:

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

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Answer 3

Textbook Question

Chapter 10, Problem 62P

Chapter 10, Problem 62P,

Expert Solution & Answer

To determine

The laplace equation of velocity potential function in spherical polar coordinate.

Answer to Problem 62P

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Explanation of Solution

Given information:

The distance from origin is r and angle of inclination between the radial vector and axis of rotation is θ.

The radial vector about the coordinate axis is shown in Figure (1).

FLUID MECHANICS FUND. (LL)-W/ACCESS, Chapter 10, Problem 62P

Figure-(1)

Write the expression for component of vector r along the x-axis.

x=rcosθ ...... (I)

Write the expression for component of vector r along the y-axis.

y=rsinθ ...... (II)

Write the expression for Laplace equation for the velocity potential function Cartesian coordinate.

∇2ϕ=0∂2ϕ∂x2+∂2ϕ∂y2=0 ...... (III)

Write expression for Laplace equation as function of r and θ.

[( ∂ 2 ϕ ∂ r 2 )( ∂ x 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ x 2 ∂ θ 2 )]+[( ∂ 2 ϕ ∂ r 2 )( ∂ y 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ y 2 ∂ θ 2 )]=0[( ∂ 2 ϕ ∂ r 2 ) ( ∂x ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂x ∂θ ) 2]+[( ∂ 2 ϕ ∂ r 2 ) ( ∂y ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂y ∂θ ) 2]=0 ...... (IV)

Differentiate Equation (I) with respect to r.

∂x∂r=∂∂r(rcosθ)=cosθ ...... (V)

Differentiate Equation (I) with respect to θ.

∂x∂θ=∂∂θ(rcosθ)=−rsinθ ...... (VI)

Differentiate Equation (II) with respect to r.

∂y∂r=∂∂r(rsinθ)=sinθ ...... (VII)

Differentiate Equation (II) with respect to θ.

∂y∂θ=∂∂θ(rsinθ)=rcosθ ...... (VIII)

Substitute cosθ for ∂x∂r, −rsinθ for ∂x∂θ, sinθ for ∂y∂r and rcosθ for ∂y∂θ in Equation (IV).

( ∂ 2 ϕ ∂ r 2 ) ( cosθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( −rsinθ )2+( ∂ 2 ϕ ∂ r 2 ) ( sinθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( rcosθ )2=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ+1 sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ+1 sin 2 θ)=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ sin 2 θ)=0(1 cos 2 θ sin 2 θ)[( ∂ 2 ϕ ∂ r 2 )+1 r 2( ∂ 2 ϕ ∂ r 2 )]=0

Conclusion:

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

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Answer 4

Textbook Question

Chapter 10, Problem 62P

Chapter 10, Problem 62P,

Expert Solution & Answer

To determine

The laplace equation of velocity potential function in spherical polar coordinate.

Answer to Problem 62P

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Explanation of Solution

Given information:

The distance from origin is r and angle of inclination between the radial vector and axis of rotation is θ.

The radial vector about the coordinate axis is shown in Figure (1).

FLUID MECHANICS FUND. (LL)-W/ACCESS, Chapter 10, Problem 62P

Figure-(1)

Write the expression for component of vector r along the x-axis.

x=rcosθ ...... (I)

Write the expression for component of vector r along the y-axis.

y=rsinθ ...... (II)

Write the expression for Laplace equation for the velocity potential function Cartesian coordinate.

∇2ϕ=0∂2ϕ∂x2+∂2ϕ∂y2=0 ...... (III)

Write expression for Laplace equation as function of r and θ.

[( ∂ 2 ϕ ∂ r 2 )( ∂ x 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ x 2 ∂ θ 2 )]+[( ∂ 2 ϕ ∂ r 2 )( ∂ y 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ y 2 ∂ θ 2 )]=0[( ∂ 2 ϕ ∂ r 2 ) ( ∂x ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂x ∂θ ) 2]+[( ∂ 2 ϕ ∂ r 2 ) ( ∂y ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂y ∂θ ) 2]=0 ...... (IV)

Differentiate Equation (I) with respect to r.

∂x∂r=∂∂r(rcosθ)=cosθ ...... (V)

Differentiate Equation (I) with respect to θ.

∂x∂θ=∂∂θ(rcosθ)=−rsinθ ...... (VI)

Differentiate Equation (II) with respect to r.

∂y∂r=∂∂r(rsinθ)=sinθ ...... (VII)

Differentiate Equation (II) with respect to θ.

∂y∂θ=∂∂θ(rsinθ)=rcosθ ...... (VIII)

Substitute cosθ for ∂x∂r, −rsinθ for ∂x∂θ, sinθ for ∂y∂r and rcosθ for ∂y∂θ in Equation (IV).

( ∂ 2 ϕ ∂ r 2 ) ( cosθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( −rsinθ )2+( ∂ 2 ϕ ∂ r 2 ) ( sinθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( rcosθ )2=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ+1 sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ+1 sin 2 θ)=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ sin 2 θ)=0(1 cos 2 θ sin 2 θ)[( ∂ 2 ϕ ∂ r 2 )+1 r 2( ∂ 2 ϕ ∂ r 2 )]=0

Conclusion:

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

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Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution & Answer

To determine

The laplace equation of velocity potential function in spherical polar coordinate.

Answer to Problem 62P

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Explanation of Solution

Given information:

The distance from origin is r and angle of inclination between the radial vector and axis of rotation is θ.

The radial vector about the coordinate axis is shown in Figure (1).

FLUID MECHANICS FUND. (LL)-W/ACCESS, Chapter 10, Problem 62P

Figure-(1)

Write the expression for component of vector r along the x-axis.

x=rcosθ ...... (I)

Write the expression for component of vector r along the y-axis.

y=rsinθ ...... (II)

Write the expression for Laplace equation for the velocity potential function Cartesian coordinate.

∇2ϕ=0∂2ϕ∂x2+∂2ϕ∂y2=0 ...... (III)

Write expression for Laplace equation as function of r and θ.

[( ∂ 2 ϕ ∂ r 2 )( ∂ x 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ x 2 ∂ θ 2 )]+[( ∂ 2 ϕ ∂ r 2 )( ∂ y 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ y 2 ∂ θ 2 )]=0[( ∂ 2 ϕ ∂ r 2 ) ( ∂x ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂x ∂θ ) 2]+[( ∂ 2 ϕ ∂ r 2 ) ( ∂y ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂y ∂θ ) 2]=0 ...... (IV)

Differentiate Equation (I) with respect to r.

∂x∂r=∂∂r(rcosθ)=cosθ ...... (V)

Differentiate Equation (I) with respect to θ.

∂x∂θ=∂∂θ(rcosθ)=−rsinθ ...... (VI)

Differentiate Equation (II) with respect to r.

∂y∂r=∂∂r(rsinθ)=sinθ ...... (VII)

Differentiate Equation (II) with respect to θ.

∂y∂θ=∂∂θ(rsinθ)=rcosθ ...... (VIII)

Substitute cosθ for ∂x∂r, −rsinθ for ∂x∂θ, sinθ for ∂y∂r and rcosθ for ∂y∂θ in Equation (IV).

( ∂ 2 ϕ ∂ r 2 ) ( cosθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( −rsinθ )2+( ∂ 2 ϕ ∂ r 2 ) ( sinθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( rcosθ )2=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ+1 sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ+1 sin 2 θ)=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ sin 2 θ)=0(1 cos 2 θ sin 2 θ)[( ∂ 2 ϕ ∂ r 2 )+1 r 2( ∂ 2 ϕ ∂ r 2 )]=0

Conclusion:

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Answer 8

Expert Solution & Answer

To determine

The laplace equation of velocity potential function in spherical polar coordinate.

Answer to Problem 62P

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Explanation of Solution

Given information:

The distance from origin is r and angle of inclination between the radial vector and axis of rotation is θ.

The radial vector about the coordinate axis is shown in Figure (1).

FLUID MECHANICS FUND. (LL)-W/ACCESS, Chapter 10, Problem 62P

Figure-(1)

Write the expression for component of vector r along the x-axis.

x=rcosθ ...... (I)

Write the expression for component of vector r along the y-axis.

y=rsinθ ...... (II)

Write the expression for Laplace equation for the velocity potential function Cartesian coordinate.

∇2ϕ=0∂2ϕ∂x2+∂2ϕ∂y2=0 ...... (III)

Write expression for Laplace equation as function of r and θ.

[( ∂ 2 ϕ ∂ r 2 )( ∂ x 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ x 2 ∂ θ 2 )]+[( ∂ 2 ϕ ∂ r 2 )( ∂ y 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ y 2 ∂ θ 2 )]=0[( ∂ 2 ϕ ∂ r 2 ) ( ∂x ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂x ∂θ ) 2]+[( ∂ 2 ϕ ∂ r 2 ) ( ∂y ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂y ∂θ ) 2]=0 ...... (IV)

Differentiate Equation (I) with respect to r.

∂x∂r=∂∂r(rcosθ)=cosθ ...... (V)

Differentiate Equation (I) with respect to θ.

∂x∂θ=∂∂θ(rcosθ)=−rsinθ ...... (VI)

Differentiate Equation (II) with respect to r.

∂y∂r=∂∂r(rsinθ)=sinθ ...... (VII)

Differentiate Equation (II) with respect to θ.

∂y∂θ=∂∂θ(rsinθ)=rcosθ ...... (VIII)

Substitute cosθ for ∂x∂r, −rsinθ for ∂x∂θ, sinθ for ∂y∂r and rcosθ for ∂y∂θ in Equation (IV).

( ∂ 2 ϕ ∂ r 2 ) ( cosθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( −rsinθ )2+( ∂ 2 ϕ ∂ r 2 ) ( sinθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( rcosθ )2=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ+1 sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ+1 sin 2 θ)=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ sin 2 θ)=0(1 cos 2 θ sin 2 θ)[( ∂ 2 ϕ ∂ r 2 )+1 r 2( ∂ 2 ϕ ∂ r 2 )]=0

Conclusion:

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

To determine

The laplace equation of velocity potential function in spherical polar coordinate.

Answer 12

Answer to Problem 62P

The laplace equation of velocity potential function in spherical polar coordinate is (1 cos2θ sin2θ)[( ∂ 2ϕ∂ r 2)+1r2( ∂ 2ϕ∂ r 2)]=0.

Answer 13

Explanation of Solution

Given information:

The distance from origin is r and angle of inclination between the radial vector and axis of rotation is θ.

The radial vector about the coordinate axis is shown in Figure (1).

FLUID MECHANICS FUND. (LL)-W/ACCESS, Chapter 10, Problem 62P

Figure-(1)

Write the expression for component of vector r along the x-axis.

x=rcosθ ...... (I)

Write the expression for component of vector r along the y-axis.

y=rsinθ ...... (II)

Write the expression for Laplace equation for the velocity potential function Cartesian coordinate.

∇2ϕ=0∂2ϕ∂x2+∂2ϕ∂y2=0 ...... (III)

Write expression for Laplace equation as function of r and θ.

[( ∂ 2 ϕ ∂ r 2 )( ∂ x 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ x 2 ∂ θ 2 )]+[( ∂ 2 ϕ ∂ r 2 )( ∂ y 2 ∂ r 2 )+( ∂ 2 ϕ ∂ θ 2 )( ∂ y 2 ∂ θ 2 )]=0[( ∂ 2 ϕ ∂ r 2 ) ( ∂x ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂x ∂θ ) 2]+[( ∂ 2 ϕ ∂ r 2 ) ( ∂y ∂r ) 2+( ∂ 2 ϕ ∂ θ 2 ) ( ∂y ∂θ ) 2]=0 ...... (IV)

Differentiate Equation (I) with respect to r.

∂x∂r=∂∂r(rcosθ)=cosθ ...... (V)

Differentiate Equation (I) with respect to θ.

∂x∂θ=∂∂θ(rcosθ)=−rsinθ ...... (VI)

Differentiate Equation (II) with respect to r.

∂y∂r=∂∂r(rsinθ)=sinθ ...... (VII)

Differentiate Equation (II) with respect to θ.

∂y∂θ=∂∂θ(rsinθ)=rcosθ ...... (VIII)

Substitute cosθ for ∂x∂r, −rsinθ for ∂x∂θ, sinθ for ∂y∂r and rcosθ for ∂y∂θ in Equation (IV).

( ∂ 2 ϕ ∂ r 2 ) ( cosθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( −rsinθ )2+( ∂ 2 ϕ ∂ r 2 ) ( sinθ )2+( ∂ 2 ϕ ∂ θ 2 ) ( rcosθ )2=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ+1 sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ+1 sin 2 θ)=0( ∂ 2 ϕ ∂ r 2 )(1 cos 2 θ sin 2 θ)+( ∂ 2 ϕ ∂ r 2 )1r2(1 cos 2 θ sin 2 θ)=0(1 cos 2 θ sin 2 θ)[( ∂ 2 ϕ ∂ r 2 )+1 r 2( ∂ 2 ϕ ∂ r 2 )]=0