Find the magnetic flux density B for the given magnetic vector potential.

Question

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Answer 1

Question

Chapter 7, Problem 43P

(a)

To determine

Find the magnetic flux density B for the given magnetic vector potential.

(a)

Expert Solution

Answer to Problem 43P

The magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Explanation of Solution

Calculation:

Given the magnetic vector potential,

A=(2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m

Write the expression to calculate the magnetic flux density.

B=∇×A (1)

Here,

A is the magnetic vector potential.

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A in Equation (1).

B=∇×A=|axayaz∂∂x∂∂y∂∂z(2x2y+yz)(xy2−xz3)−(6xyz−2x2y2)|=[(∂∂y(−(6xyz−2x2y2))−∂∂z(xy2−xz3))ax−(∂∂x(−(6xyz−2x2y2))−∂∂z(2x2y+yz))ay+(∂∂x(xy2−xz3)−∂∂y(2x2y+yz))az]=[(−(6xz(1)−2x2(2y))−(0−x(3z2)))ax−(−(6yz(1)−2(2x)y2)−(0+y(1)))ay+((y2(1)−z3(1))−(2x2(1)+(1)z))az]

Simplify the above equation.

B=[(−6xz+4x2y+3xz2)ax−(−6yz+4xy2−y)ay+(y2−z3−2x2−z)az]=(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2

Conclusion:

Thus, the magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

(b)

To determine

Find the magnetic flux for the given magnetic vector potential.

(b)

Expert Solution

Answer to Problem 43P

The magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Explanation of Solution

Calculation:

Write the expression to calculate the magnetic flux through a surface.

ψ=∫SB⋅dS

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B in above equation.

ψ=∫S((−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az)⋅dS=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az]⋅dydzax {∵dS=dydzax}=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax⋅dydzax+(y+6yz−4xy2)ay⋅dydzax+(y2−z3−2x2−z)az⋅dydzax]=∫z=02∫y=02[(−6xz+4x2y+3xz2)dydz+0+0] {∵ax⋅ax=1, ay⋅ax=0, az⋅ax=0}

Simplify the above equation.

ψ=∫z=02∫y=02(−6xz+4x2y+3xz2)dydz=∫z=02[−6xzy+4x2(y22)+3xz2y]02dz=∫z=02[−6xyz+2x2y2+3xyz2]02dz=∫z=02[(−6x(2)z+2x2(2)2+3x(2)z2)−(−6x(0)z+2x2(0)2+3x(0)z2)]dz

Simplify the above equation.

ψ=∫z=02[(−12xz+8x2+6xz2)−(0)]dz=∫z=02(−12xz+8x2+6xz2)dz=[−12x(z22)+8x2z+6x(z33)]02=[−6xz2+8x2z+2xz3]02

Simplify the above equation.

ψ=[(−6x(2)2+8x2(2)+2x(2)3)−(−6x(0)2+8x2(0)+2x(0)3)]=[(−24x+16x2+16x)−(0)]=−24(1)+16(1)2+16(1) {∵x=1}=8 Wb

Conclusion:

Thus, the magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

(c)

To determine

Show that the relation ∇⋅A and ∇⋅B is equal to zero.

(c)

Expert Solution

Explanation of Solution

Calculation:

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A to find ∇⋅A.

∇⋅A=∂∂xAx+∂∂yAy+∂∂zAz=∂∂x(2x2y+yz)+∂∂y(xy2−xz3)+∂∂z(−(6xyz−2x2y2))=(2(2x)y+0)+(x(2y)−0)−(6xy(1)−0)=4xy+2xy−6xy

Simplify the above equation.

∇⋅A=6xy−6xy=0

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B to find ∇⋅B.

∇⋅B=∂∂xBx+∂∂yBy+∂∂zBz=∂∂x(−6xz+4x2y+3xz2)+∂∂y(y+6yz−4xy2)+∂∂z(y2−z3−2x2−z)=(−6(1)z+4(2x)y+3(1)z2)+((1)+6(1)z−4x(2y))+(0−3z2−0−1)=(−6z+8xy+3z2)+(1+6z−8xy)+(−3z2−1)

Simplify the above equation.

∇⋅B=−6z+8xy+3z2+1+6z−8xy−3z2−1=0

Conclusion:

Thus, the relation ∇⋅A and ∇⋅B is equal to zero and it is shown.

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Answer 2

Question

Chapter 7, Problem 43P

(a)

To determine

Find the magnetic flux density B for the given magnetic vector potential.

(a)

Expert Solution

Answer to Problem 43P

The magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Explanation of Solution

Calculation:

Given the magnetic vector potential,

A=(2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m

Write the expression to calculate the magnetic flux density.

B=∇×A (1)

Here,

A is the magnetic vector potential.

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A in Equation (1).

B=∇×A=|axayaz∂∂x∂∂y∂∂z(2x2y+yz)(xy2−xz3)−(6xyz−2x2y2)|=[(∂∂y(−(6xyz−2x2y2))−∂∂z(xy2−xz3))ax−(∂∂x(−(6xyz−2x2y2))−∂∂z(2x2y+yz))ay+(∂∂x(xy2−xz3)−∂∂y(2x2y+yz))az]=[(−(6xz(1)−2x2(2y))−(0−x(3z2)))ax−(−(6yz(1)−2(2x)y2)−(0+y(1)))ay+((y2(1)−z3(1))−(2x2(1)+(1)z))az]

Simplify the above equation.

B=[(−6xz+4x2y+3xz2)ax−(−6yz+4xy2−y)ay+(y2−z3−2x2−z)az]=(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2

Conclusion:

Thus, the magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

(b)

To determine

Find the magnetic flux for the given magnetic vector potential.

(b)

Expert Solution

Answer to Problem 43P

The magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Explanation of Solution

Calculation:

Write the expression to calculate the magnetic flux through a surface.

ψ=∫SB⋅dS

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B in above equation.

ψ=∫S((−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az)⋅dS=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az]⋅dydzax {∵dS=dydzax}=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax⋅dydzax+(y+6yz−4xy2)ay⋅dydzax+(y2−z3−2x2−z)az⋅dydzax]=∫z=02∫y=02[(−6xz+4x2y+3xz2)dydz+0+0] {∵ax⋅ax=1, ay⋅ax=0, az⋅ax=0}

Simplify the above equation.

ψ=∫z=02∫y=02(−6xz+4x2y+3xz2)dydz=∫z=02[−6xzy+4x2(y22)+3xz2y]02dz=∫z=02[−6xyz+2x2y2+3xyz2]02dz=∫z=02[(−6x(2)z+2x2(2)2+3x(2)z2)−(−6x(0)z+2x2(0)2+3x(0)z2)]dz

Simplify the above equation.

ψ=∫z=02[(−12xz+8x2+6xz2)−(0)]dz=∫z=02(−12xz+8x2+6xz2)dz=[−12x(z22)+8x2z+6x(z33)]02=[−6xz2+8x2z+2xz3]02

Simplify the above equation.

ψ=[(−6x(2)2+8x2(2)+2x(2)3)−(−6x(0)2+8x2(0)+2x(0)3)]=[(−24x+16x2+16x)−(0)]=−24(1)+16(1)2+16(1) {∵x=1}=8 Wb

Conclusion:

Thus, the magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

(c)

To determine

Show that the relation ∇⋅A and ∇⋅B is equal to zero.

(c)

Expert Solution

Explanation of Solution

Calculation:

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A to find ∇⋅A.

∇⋅A=∂∂xAx+∂∂yAy+∂∂zAz=∂∂x(2x2y+yz)+∂∂y(xy2−xz3)+∂∂z(−(6xyz−2x2y2))=(2(2x)y+0)+(x(2y)−0)−(6xy(1)−0)=4xy+2xy−6xy

Simplify the above equation.

∇⋅A=6xy−6xy=0

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B to find ∇⋅B.

∇⋅B=∂∂xBx+∂∂yBy+∂∂zBz=∂∂x(−6xz+4x2y+3xz2)+∂∂y(y+6yz−4xy2)+∂∂z(y2−z3−2x2−z)=(−6(1)z+4(2x)y+3(1)z2)+((1)+6(1)z−4x(2y))+(0−3z2−0−1)=(−6z+8xy+3z2)+(1+6z−8xy)+(−3z2−1)

Simplify the above equation.

∇⋅B=−6z+8xy+3z2+1+6z−8xy−3z2−1=0

Conclusion:

Thus, the relation ∇⋅A and ∇⋅B is equal to zero and it is shown.

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Answer 3

Question

Chapter 7, Problem 43P

(a)

To determine

Find the magnetic flux density B for the given magnetic vector potential.

(a)

Expert Solution

Answer to Problem 43P

The magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Explanation of Solution

Calculation:

Given the magnetic vector potential,

A=(2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m

Write the expression to calculate the magnetic flux density.

B=∇×A (1)

Here,

A is the magnetic vector potential.

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A in Equation (1).

B=∇×A=|axayaz∂∂x∂∂y∂∂z(2x2y+yz)(xy2−xz3)−(6xyz−2x2y2)|=[(∂∂y(−(6xyz−2x2y2))−∂∂z(xy2−xz3))ax−(∂∂x(−(6xyz−2x2y2))−∂∂z(2x2y+yz))ay+(∂∂x(xy2−xz3)−∂∂y(2x2y+yz))az]=[(−(6xz(1)−2x2(2y))−(0−x(3z2)))ax−(−(6yz(1)−2(2x)y2)−(0+y(1)))ay+((y2(1)−z3(1))−(2x2(1)+(1)z))az]

Simplify the above equation.

B=[(−6xz+4x2y+3xz2)ax−(−6yz+4xy2−y)ay+(y2−z3−2x2−z)az]=(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2

Conclusion:

Thus, the magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

(b)

To determine

Find the magnetic flux for the given magnetic vector potential.

(b)

Expert Solution

Answer to Problem 43P

The magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Explanation of Solution

Calculation:

Write the expression to calculate the magnetic flux through a surface.

ψ=∫SB⋅dS

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B in above equation.

ψ=∫S((−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az)⋅dS=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az]⋅dydzax {∵dS=dydzax}=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax⋅dydzax+(y+6yz−4xy2)ay⋅dydzax+(y2−z3−2x2−z)az⋅dydzax]=∫z=02∫y=02[(−6xz+4x2y+3xz2)dydz+0+0] {∵ax⋅ax=1, ay⋅ax=0, az⋅ax=0}

Simplify the above equation.

ψ=∫z=02∫y=02(−6xz+4x2y+3xz2)dydz=∫z=02[−6xzy+4x2(y22)+3xz2y]02dz=∫z=02[−6xyz+2x2y2+3xyz2]02dz=∫z=02[(−6x(2)z+2x2(2)2+3x(2)z2)−(−6x(0)z+2x2(0)2+3x(0)z2)]dz

Simplify the above equation.

ψ=∫z=02[(−12xz+8x2+6xz2)−(0)]dz=∫z=02(−12xz+8x2+6xz2)dz=[−12x(z22)+8x2z+6x(z33)]02=[−6xz2+8x2z+2xz3]02

Simplify the above equation.

ψ=[(−6x(2)2+8x2(2)+2x(2)3)−(−6x(0)2+8x2(0)+2x(0)3)]=[(−24x+16x2+16x)−(0)]=−24(1)+16(1)2+16(1) {∵x=1}=8 Wb

Conclusion:

Thus, the magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

(c)

To determine

Show that the relation ∇⋅A and ∇⋅B is equal to zero.

(c)

Expert Solution

Explanation of Solution

Calculation:

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A to find ∇⋅A.

∇⋅A=∂∂xAx+∂∂yAy+∂∂zAz=∂∂x(2x2y+yz)+∂∂y(xy2−xz3)+∂∂z(−(6xyz−2x2y2))=(2(2x)y+0)+(x(2y)−0)−(6xy(1)−0)=4xy+2xy−6xy

Simplify the above equation.

∇⋅A=6xy−6xy=0

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B to find ∇⋅B.

∇⋅B=∂∂xBx+∂∂yBy+∂∂zBz=∂∂x(−6xz+4x2y+3xz2)+∂∂y(y+6yz−4xy2)+∂∂z(y2−z3−2x2−z)=(−6(1)z+4(2x)y+3(1)z2)+((1)+6(1)z−4x(2y))+(0−3z2−0−1)=(−6z+8xy+3z2)+(1+6z−8xy)+(−3z2−1)

Simplify the above equation.

∇⋅B=−6z+8xy+3z2+1+6z−8xy−3z2−1=0

Conclusion:

Thus, the relation ∇⋅A and ∇⋅B is equal to zero and it is shown.

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Answer 4

Question

Chapter 7, Problem 43P

(a)

To determine

Find the magnetic flux density B for the given magnetic vector potential.

(a)

Expert Solution

Answer to Problem 43P

The magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Explanation of Solution

Calculation:

Given the magnetic vector potential,

A=(2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m

Write the expression to calculate the magnetic flux density.

B=∇×A (1)

Here,

A is the magnetic vector potential.

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A in Equation (1).

B=∇×A=|axayaz∂∂x∂∂y∂∂z(2x2y+yz)(xy2−xz3)−(6xyz−2x2y2)|=[(∂∂y(−(6xyz−2x2y2))−∂∂z(xy2−xz3))ax−(∂∂x(−(6xyz−2x2y2))−∂∂z(2x2y+yz))ay+(∂∂x(xy2−xz3)−∂∂y(2x2y+yz))az]=[(−(6xz(1)−2x2(2y))−(0−x(3z2)))ax−(−(6yz(1)−2(2x)y2)−(0+y(1)))ay+((y2(1)−z3(1))−(2x2(1)+(1)z))az]

Simplify the above equation.

B=[(−6xz+4x2y+3xz2)ax−(−6yz+4xy2−y)ay+(y2−z3−2x2−z)az]=(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2

Conclusion:

Thus, the magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

(b)

To determine

Find the magnetic flux for the given magnetic vector potential.

(b)

Expert Solution

Answer to Problem 43P

The magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Explanation of Solution

Calculation:

Write the expression to calculate the magnetic flux through a surface.

ψ=∫SB⋅dS

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B in above equation.

ψ=∫S((−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az)⋅dS=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az]⋅dydzax {∵dS=dydzax}=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax⋅dydzax+(y+6yz−4xy2)ay⋅dydzax+(y2−z3−2x2−z)az⋅dydzax]=∫z=02∫y=02[(−6xz+4x2y+3xz2)dydz+0+0] {∵ax⋅ax=1, ay⋅ax=0, az⋅ax=0}

Simplify the above equation.

ψ=∫z=02∫y=02(−6xz+4x2y+3xz2)dydz=∫z=02[−6xzy+4x2(y22)+3xz2y]02dz=∫z=02[−6xyz+2x2y2+3xyz2]02dz=∫z=02[(−6x(2)z+2x2(2)2+3x(2)z2)−(−6x(0)z+2x2(0)2+3x(0)z2)]dz

Simplify the above equation.

ψ=∫z=02[(−12xz+8x2+6xz2)−(0)]dz=∫z=02(−12xz+8x2+6xz2)dz=[−12x(z22)+8x2z+6x(z33)]02=[−6xz2+8x2z+2xz3]02

Simplify the above equation.

ψ=[(−6x(2)2+8x2(2)+2x(2)3)−(−6x(0)2+8x2(0)+2x(0)3)]=[(−24x+16x2+16x)−(0)]=−24(1)+16(1)2+16(1) {∵x=1}=8 Wb

Conclusion:

Thus, the magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

(c)

To determine

Show that the relation ∇⋅A and ∇⋅B is equal to zero.

(c)

Expert Solution

Explanation of Solution

Calculation:

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A to find ∇⋅A.

∇⋅A=∂∂xAx+∂∂yAy+∂∂zAz=∂∂x(2x2y+yz)+∂∂y(xy2−xz3)+∂∂z(−(6xyz−2x2y2))=(2(2x)y+0)+(x(2y)−0)−(6xy(1)−0)=4xy+2xy−6xy

Simplify the above equation.

∇⋅A=6xy−6xy=0

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B to find ∇⋅B.

∇⋅B=∂∂xBx+∂∂yBy+∂∂zBz=∂∂x(−6xz+4x2y+3xz2)+∂∂y(y+6yz−4xy2)+∂∂z(y2−z3−2x2−z)=(−6(1)z+4(2x)y+3(1)z2)+((1)+6(1)z−4x(2y))+(0−3z2−0−1)=(−6z+8xy+3z2)+(1+6z−8xy)+(−3z2−1)

Simplify the above equation.

∇⋅B=−6z+8xy+3z2+1+6z−8xy−3z2−1=0

Conclusion:

Thus, the relation ∇⋅A and ∇⋅B is equal to zero and it is shown.

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Answer 5

Chapter 7, Problem 43P

(a)

To determine

Find the magnetic flux density B for the given magnetic vector potential.

(a)

Expert Solution

Answer to Problem 43P

The magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Explanation of Solution

Calculation:

Given the magnetic vector potential,

A=(2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m

Write the expression to calculate the magnetic flux density.

B=∇×A (1)

Here,

A is the magnetic vector potential.

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A in Equation (1).

B=∇×A=|axayaz∂∂x∂∂y∂∂z(2x2y+yz)(xy2−xz3)−(6xyz−2x2y2)|=[(∂∂y(−(6xyz−2x2y2))−∂∂z(xy2−xz3))ax−(∂∂x(−(6xyz−2x2y2))−∂∂z(2x2y+yz))ay+(∂∂x(xy2−xz3)−∂∂y(2x2y+yz))az]=[(−(6xz(1)−2x2(2y))−(0−x(3z2)))ax−(−(6yz(1)−2(2x)y2)−(0+y(1)))ay+((y2(1)−z3(1))−(2x2(1)+(1)z))az]

Simplify the above equation.

B=[(−6xz+4x2y+3xz2)ax−(−6yz+4xy2−y)ay+(y2−z3−2x2−z)az]=(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2

Conclusion:

Thus, the magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

(b)

To determine

Find the magnetic flux for the given magnetic vector potential.

(b)

Expert Solution

Answer to Problem 43P

The magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Explanation of Solution

Calculation:

Write the expression to calculate the magnetic flux through a surface.

ψ=∫SB⋅dS

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B in above equation.

ψ=∫S((−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az)⋅dS=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az]⋅dydzax {∵dS=dydzax}=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax⋅dydzax+(y+6yz−4xy2)ay⋅dydzax+(y2−z3−2x2−z)az⋅dydzax]=∫z=02∫y=02[(−6xz+4x2y+3xz2)dydz+0+0] {∵ax⋅ax=1, ay⋅ax=0, az⋅ax=0}

Simplify the above equation.

ψ=∫z=02∫y=02(−6xz+4x2y+3xz2)dydz=∫z=02[−6xzy+4x2(y22)+3xz2y]02dz=∫z=02[−6xyz+2x2y2+3xyz2]02dz=∫z=02[(−6x(2)z+2x2(2)2+3x(2)z2)−(−6x(0)z+2x2(0)2+3x(0)z2)]dz

Simplify the above equation.

ψ=∫z=02[(−12xz+8x2+6xz2)−(0)]dz=∫z=02(−12xz+8x2+6xz2)dz=[−12x(z22)+8x2z+6x(z33)]02=[−6xz2+8x2z+2xz3]02

Simplify the above equation.

ψ=[(−6x(2)2+8x2(2)+2x(2)3)−(−6x(0)2+8x2(0)+2x(0)3)]=[(−24x+16x2+16x)−(0)]=−24(1)+16(1)2+16(1) {∵x=1}=8 Wb

Conclusion:

Thus, the magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

(c)

To determine

Show that the relation ∇⋅A and ∇⋅B is equal to zero.

(c)

Expert Solution

Explanation of Solution

Calculation:

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A to find ∇⋅A.

∇⋅A=∂∂xAx+∂∂yAy+∂∂zAz=∂∂x(2x2y+yz)+∂∂y(xy2−xz3)+∂∂z(−(6xyz−2x2y2))=(2(2x)y+0)+(x(2y)−0)−(6xy(1)−0)=4xy+2xy−6xy

Simplify the above equation.

∇⋅A=6xy−6xy=0

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B to find ∇⋅B.

∇⋅B=∂∂xBx+∂∂yBy+∂∂zBz=∂∂x(−6xz+4x2y+3xz2)+∂∂y(y+6yz−4xy2)+∂∂z(y2−z3−2x2−z)=(−6(1)z+4(2x)y+3(1)z2)+((1)+6(1)z−4x(2y))+(0−3z2−0−1)=(−6z+8xy+3z2)+(1+6z−8xy)+(−3z2−1)

Simplify the above equation.

∇⋅B=−6z+8xy+3z2+1+6z−8xy−3z2−1=0

Conclusion:

Thus, the relation ∇⋅A and ∇⋅B is equal to zero and it is shown.

Answer 6

Chapter 7, Problem 43P

(a)

To determine

Find the magnetic flux density B for the given magnetic vector potential.

(a)

Expert Solution

Answer to Problem 43P

The magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Explanation of Solution

Calculation:

Given the magnetic vector potential,

A=(2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m

Write the expression to calculate the magnetic flux density.

B=∇×A (1)

Here,

A is the magnetic vector potential.

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A in Equation (1).

B=∇×A=|axayaz∂∂x∂∂y∂∂z(2x2y+yz)(xy2−xz3)−(6xyz−2x2y2)|=[(∂∂y(−(6xyz−2x2y2))−∂∂z(xy2−xz3))ax−(∂∂x(−(6xyz−2x2y2))−∂∂z(2x2y+yz))ay+(∂∂x(xy2−xz3)−∂∂y(2x2y+yz))az]=[(−(6xz(1)−2x2(2y))−(0−x(3z2)))ax−(−(6yz(1)−2(2x)y2)−(0+y(1)))ay+((y2(1)−z3(1))−(2x2(1)+(1)z))az]

Simplify the above equation.

B=[(−6xz+4x2y+3xz2)ax−(−6yz+4xy2−y)ay+(y2−z3−2x2−z)az]=(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2

Conclusion:

Thus, the magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Answer 7

Chapter 7, Problem 43P

(a)

To determine

Find the magnetic flux density B for the given magnetic vector potential.

Answer 8

(a)

Expert Solution

Answer to Problem 43P

The magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Answer 9

(a)

Expert Solution

Answer 10

(a)

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Calculation:

Given the magnetic vector potential,

A=(2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m

Write the expression to calculate the magnetic flux density.

B=∇×A (1)

Here,

A is the magnetic vector potential.

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A in Equation (1).

B=∇×A=|axayaz∂∂x∂∂y∂∂z(2x2y+yz)(xy2−xz3)−(6xyz−2x2y2)|=[(∂∂y(−(6xyz−2x2y2))−∂∂z(xy2−xz3))ax−(∂∂x(−(6xyz−2x2y2))−∂∂z(2x2y+yz))ay+(∂∂x(xy2−xz3)−∂∂y(2x2y+yz))az]=[(−(6xz(1)−2x2(2y))−(0−x(3z2)))ax−(−(6yz(1)−2(2x)y2)−(0+y(1)))ay+((y2(1)−z3(1))−(2x2(1)+(1)z))az]

Simplify the above equation.

B=[(−6xz+4x2y+3xz2)ax−(−6yz+4xy2−y)ay+(y2−z3−2x2−z)az]=(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2

Conclusion:

Thus, the magnetic flux density B for the given magnetic vector potential is (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2.

Answer 13

(b)

To determine

Find the magnetic flux for the given magnetic vector potential.

(b)

Expert Solution

Answer to Problem 43P

The magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Explanation of Solution

Calculation:

Write the expression to calculate the magnetic flux through a surface.

ψ=∫SB⋅dS

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B in above equation.

ψ=∫S((−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az)⋅dS=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az]⋅dydzax {∵dS=dydzax}=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax⋅dydzax+(y+6yz−4xy2)ay⋅dydzax+(y2−z3−2x2−z)az⋅dydzax]=∫z=02∫y=02[(−6xz+4x2y+3xz2)dydz+0+0] {∵ax⋅ax=1, ay⋅ax=0, az⋅ax=0}

Simplify the above equation.

ψ=∫z=02∫y=02(−6xz+4x2y+3xz2)dydz=∫z=02[−6xzy+4x2(y22)+3xz2y]02dz=∫z=02[−6xyz+2x2y2+3xyz2]02dz=∫z=02[(−6x(2)z+2x2(2)2+3x(2)z2)−(−6x(0)z+2x2(0)2+3x(0)z2)]dz

Simplify the above equation.

ψ=∫z=02[(−12xz+8x2+6xz2)−(0)]dz=∫z=02(−12xz+8x2+6xz2)dz=[−12x(z22)+8x2z+6x(z33)]02=[−6xz2+8x2z+2xz3]02

Simplify the above equation.

ψ=[(−6x(2)2+8x2(2)+2x(2)3)−(−6x(0)2+8x2(0)+2x(0)3)]=[(−24x+16x2+16x)−(0)]=−24(1)+16(1)2+16(1) {∵x=1}=8 Wb

Conclusion:

Thus, the magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Answer 14

(b)

To determine

Find the magnetic flux for the given magnetic vector potential.

Answer 15

(b)

Expert Solution

Answer to Problem 43P

The magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Answer 16

(b)

Expert Solution

Answer 17

(b)

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Calculation:

Write the expression to calculate the magnetic flux through a surface.

ψ=∫SB⋅dS

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B in above equation.

ψ=∫S((−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az)⋅dS=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az]⋅dydzax {∵dS=dydzax}=∫z=02∫y=02[(−6xz+4x2y+3xz2)ax⋅dydzax+(y+6yz−4xy2)ay⋅dydzax+(y2−z3−2x2−z)az⋅dydzax]=∫z=02∫y=02[(−6xz+4x2y+3xz2)dydz+0+0] {∵ax⋅ax=1, ay⋅ax=0, az⋅ax=0}

Simplify the above equation.

ψ=∫z=02∫y=02(−6xz+4x2y+3xz2)dydz=∫z=02[−6xzy+4x2(y22)+3xz2y]02dz=∫z=02[−6xyz+2x2y2+3xyz2]02dz=∫z=02[(−6x(2)z+2x2(2)2+3x(2)z2)−(−6x(0)z+2x2(0)2+3x(0)z2)]dz

Simplify the above equation.

ψ=∫z=02[(−12xz+8x2+6xz2)−(0)]dz=∫z=02(−12xz+8x2+6xz2)dz=[−12x(z22)+8x2z+6x(z33)]02=[−6xz2+8x2z+2xz3]02

Simplify the above equation.

ψ=[(−6x(2)2+8x2(2)+2x(2)3)−(−6x(0)2+8x2(0)+2x(0)3)]=[(−24x+16x2+16x)−(0)]=−24(1)+16(1)2+16(1) {∵x=1}=8 Wb

Conclusion:

Thus, the magnetic flux (ψ) for the given magnetic vector potential is 8 Wb.

Answer 20

(c)

To determine

Show that the relation ∇⋅A and ∇⋅B is equal to zero.

(c)

Expert Solution

Explanation of Solution

Calculation:

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A to find ∇⋅A.

∇⋅A=∂∂xAx+∂∂yAy+∂∂zAz=∂∂x(2x2y+yz)+∂∂y(xy2−xz3)+∂∂z(−(6xyz−2x2y2))=(2(2x)y+0)+(x(2y)−0)−(6xy(1)−0)=4xy+2xy−6xy

Simplify the above equation.

∇⋅A=6xy−6xy=0

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B to find ∇⋅B.

∇⋅B=∂∂xBx+∂∂yBy+∂∂zBz=∂∂x(−6xz+4x2y+3xz2)+∂∂y(y+6yz−4xy2)+∂∂z(y2−z3−2x2−z)=(−6(1)z+4(2x)y+3(1)z2)+((1)+6(1)z−4x(2y))+(0−3z2−0−1)=(−6z+8xy+3z2)+(1+6z−8xy)+(−3z2−1)

Simplify the above equation.

∇⋅B=−6z+8xy+3z2+1+6z−8xy−3z2−1=0

Conclusion:

Thus, the relation ∇⋅A and ∇⋅B is equal to zero and it is shown.

Answer 21

(c)

To determine

Show that the relation ∇⋅A and ∇⋅B is equal to zero.

Answer 22

(c)

Expert Solution

Explanation of Solution

Calculation:

Substitute (2x2y+yz)ax+(xy2−xz3)ay−(6xyz−2x2y2)az Wb/m for A to find ∇⋅A.

∇⋅A=∂∂xAx+∂∂yAy+∂∂zAz=∂∂x(2x2y+yz)+∂∂y(xy2−xz3)+∂∂z(−(6xyz−2x2y2))=(2(2x)y+0)+(x(2y)−0)−(6xy(1)−0)=4xy+2xy−6xy

Simplify the above equation.

∇⋅A=6xy−6xy=0

Substitute (−6xz+4x2y+3xz2)ax+(y+6yz−4xy2)ay+(y2−z3−2x2−z)az Wb/m2 for B to find ∇⋅B.

∇⋅B=∂∂xBx+∂∂yBy+∂∂zBz=∂∂x(−6xz+4x2y+3xz2)+∂∂y(y+6yz−4xy2)+∂∂z(y2−z3−2x2−z)=(−6(1)z+4(2x)y+3(1)z2)+((1)+6(1)z−4x(2y))+(0−3z2−0−1)=(−6z+8xy+3z2)+(1+6z−8xy)+(−3z2−1)