The expression for velocity component u θ .

Question

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Answer 1

Question

Chapter 9, Problem 94P

To determine

The expression for velocity component uθ.

Expert Solution & Answer

Answer to Problem 94P

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Explanation of Solution

Given information:

The flow is steady, laminar, two-dimensional and incompressible. The flow is rotationally symmetric means nothing is function of coordinate θ and the flow is circular means velocity component ur is 0.

The inner cylinder is fixed and angular speed of outer cylinder is ωo, radius of outer cylinder is Ro and radius of inner cylinder is Ri.

Write the expression for continuity equation.

1r∂(rur)∂r+1r∂(uθ)∂θ=0 ....... (I)

Here, velocity components are ur and uθ, radius is r and angle is θ.

Write the expression for the θ -component of Navier-Stokes equation.

[ρ(ur∂ u θ∂r+ u θr∂ u θ∂θ+ u r u θr)]=[−1r∂P∂θ+μ(1r∂∂r(r ∂uθ ∂r)− u θ r 2+1 r 2 ∂ 2 u θ∂ θ 2−2 r 2∂ u r∂θ)+ρgθ] ......(II)

Here, density is ρ, time is t, dynamic viscosity is μ and gravitational acceleration in θ -direction is gθ.

Calculation:

Substitute 0 for ur and 0 for ∂(uθ)∂θ in Equation (I).

1r∂(0)∂r+1r(0)=00+0=00=0 ......(IV)

Since both sides of Equation (IV) are equal, therefore continuity equation is verified.

Substitute 0 for ur, 0 for gθ, 0 for ∂P∂θ and 0 for ∂(uθ)∂θ in Equation (II).

[ρ(( 0) ∂uθ ∂r+ uθ r( 0)+ (0 )uθ r)]=[−1r(0)+μ( 1 r ∂ ∂r( r∂ u θ∂r )− uθ r2 + 1 r2 ( 0)− 2 r2 ( 0))+ρ(0)]μ(1r∂∂r(r ∂ u θ ∂r)−uθr2)=0(1r∂∂r(r ∂ u θ ∂r)−uθr2)=01r(r∂2uθ∂r2+∂uθ∂r)−uθr2=0

∂2uθ∂r2+1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂uθ∂r+∂2uθ∂r2−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r(∂uθ∂r+r∂2uθ∂r2)−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂∂r(r( ∂ u θ ∂r))−1r∂uθ∂r−uθr2=0

1r(∂∂r(uθ+r( ∂uθ ∂r )))−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r2(r∂uθ∂r+uθ)=01r∂2∂r2(ruθ)−1r2∂∂r(ruθ)=0

∂∂r(1r∂∂r(ruθ))=0 ....... (V)

Change from partial derivative to total derivative in Equation (V).

ddr(1rddr(ruθ))=0 ....... (VI)

Integrate Equation (VI) with respect to r.

1rddr(ruθ)=C1ddr(ruθ)=C1r ...... (VII)

Here arbitrary constant is C1.

Again, Integrate Equation (VII) with respect to r.

ruθ=C1r22+C2uθ=C1r2+C2r ....... (VIII)

Here, arbitrary constant is C2.

Substitute 0 for uθ and Ri for r in Equation (VIII).

0=C1(Ri)2+C2(Ri)C2(Ri)=−C1(Ri)2C2=−C1Ri22 ...... (IX)

Substitute Roωo for uθ, −C1Ri22 for C2 and Ro for r in Equation (VIII).

Roωo=C1Ro2+( − C 1 R i 2 2)RoRoωo=C1Ro2−C1Ri22RoRoωo=C1(Ro2−Ri22Ro)C1=2Ro2ωoRo2−Ri2

Substitute 2Ro2ωoRo2−Ri2 for C1 in Equation (IX).

C2=−( 2 R o 2 ω o R o 2 − R i 2 )Ri22=−Ri2Ro2ωoRo2−Ri2

Substitute −Ri2Ro2ωoRo2−Ri2 for C2 and 2Ro2ωoRo2−Ri2 for C1 in Equation (VIII).

uθ=( 2 R o 2 ω o R o 2 − R i 2 )r2+( − R i 2 R o 2 ω o R o 2 − R i 2 )r=Ro2rωoRo2−Ri2−Ri2Ro2ωor(Ro2−Ri2)=Ro2ωoRo2−Ri2(r−Ri2r)

Conclusion:

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

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Answer 2

Question

Chapter 9, Problem 94P

To determine

The expression for velocity component uθ.

Expert Solution & Answer

Answer to Problem 94P

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Explanation of Solution

Given information:

The flow is steady, laminar, two-dimensional and incompressible. The flow is rotationally symmetric means nothing is function of coordinate θ and the flow is circular means velocity component ur is 0.

The inner cylinder is fixed and angular speed of outer cylinder is ωo, radius of outer cylinder is Ro and radius of inner cylinder is Ri.

Write the expression for continuity equation.

1r∂(rur)∂r+1r∂(uθ)∂θ=0 ....... (I)

Here, velocity components are ur and uθ, radius is r and angle is θ.

Write the expression for the θ -component of Navier-Stokes equation.

[ρ(ur∂ u θ∂r+ u θr∂ u θ∂θ+ u r u θr)]=[−1r∂P∂θ+μ(1r∂∂r(r ∂uθ ∂r)− u θ r 2+1 r 2 ∂ 2 u θ∂ θ 2−2 r 2∂ u r∂θ)+ρgθ] ......(II)

Here, density is ρ, time is t, dynamic viscosity is μ and gravitational acceleration in θ -direction is gθ.

Calculation:

Substitute 0 for ur and 0 for ∂(uθ)∂θ in Equation (I).

1r∂(0)∂r+1r(0)=00+0=00=0 ......(IV)

Since both sides of Equation (IV) are equal, therefore continuity equation is verified.

Substitute 0 for ur, 0 for gθ, 0 for ∂P∂θ and 0 for ∂(uθ)∂θ in Equation (II).

[ρ(( 0) ∂uθ ∂r+ uθ r( 0)+ (0 )uθ r)]=[−1r(0)+μ( 1 r ∂ ∂r( r∂ u θ∂r )− uθ r2 + 1 r2 ( 0)− 2 r2 ( 0))+ρ(0)]μ(1r∂∂r(r ∂ u θ ∂r)−uθr2)=0(1r∂∂r(r ∂ u θ ∂r)−uθr2)=01r(r∂2uθ∂r2+∂uθ∂r)−uθr2=0

∂2uθ∂r2+1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂uθ∂r+∂2uθ∂r2−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r(∂uθ∂r+r∂2uθ∂r2)−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂∂r(r( ∂ u θ ∂r))−1r∂uθ∂r−uθr2=0

1r(∂∂r(uθ+r( ∂uθ ∂r )))−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r2(r∂uθ∂r+uθ)=01r∂2∂r2(ruθ)−1r2∂∂r(ruθ)=0

∂∂r(1r∂∂r(ruθ))=0 ....... (V)

Change from partial derivative to total derivative in Equation (V).

ddr(1rddr(ruθ))=0 ....... (VI)

Integrate Equation (VI) with respect to r.

1rddr(ruθ)=C1ddr(ruθ)=C1r ...... (VII)

Here arbitrary constant is C1.

Again, Integrate Equation (VII) with respect to r.

ruθ=C1r22+C2uθ=C1r2+C2r ....... (VIII)

Here, arbitrary constant is C2.

Substitute 0 for uθ and Ri for r in Equation (VIII).

0=C1(Ri)2+C2(Ri)C2(Ri)=−C1(Ri)2C2=−C1Ri22 ...... (IX)

Substitute Roωo for uθ, −C1Ri22 for C2 and Ro for r in Equation (VIII).

Roωo=C1Ro2+( − C 1 R i 2 2)RoRoωo=C1Ro2−C1Ri22RoRoωo=C1(Ro2−Ri22Ro)C1=2Ro2ωoRo2−Ri2

Substitute 2Ro2ωoRo2−Ri2 for C1 in Equation (IX).

C2=−( 2 R o 2 ω o R o 2 − R i 2 )Ri22=−Ri2Ro2ωoRo2−Ri2

Substitute −Ri2Ro2ωoRo2−Ri2 for C2 and 2Ro2ωoRo2−Ri2 for C1 in Equation (VIII).

uθ=( 2 R o 2 ω o R o 2 − R i 2 )r2+( − R i 2 R o 2 ω o R o 2 − R i 2 )r=Ro2rωoRo2−Ri2−Ri2Ro2ωor(Ro2−Ri2)=Ro2ωoRo2−Ri2(r−Ri2r)

Conclusion:

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

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Answer 3

Question

Chapter 9, Problem 94P

To determine

The expression for velocity component uθ.

Expert Solution & Answer

Answer to Problem 94P

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Explanation of Solution

Given information:

The flow is steady, laminar, two-dimensional and incompressible. The flow is rotationally symmetric means nothing is function of coordinate θ and the flow is circular means velocity component ur is 0.

The inner cylinder is fixed and angular speed of outer cylinder is ωo, radius of outer cylinder is Ro and radius of inner cylinder is Ri.

Write the expression for continuity equation.

1r∂(rur)∂r+1r∂(uθ)∂θ=0 ....... (I)

Here, velocity components are ur and uθ, radius is r and angle is θ.

Write the expression for the θ -component of Navier-Stokes equation.

[ρ(ur∂ u θ∂r+ u θr∂ u θ∂θ+ u r u θr)]=[−1r∂P∂θ+μ(1r∂∂r(r ∂uθ ∂r)− u θ r 2+1 r 2 ∂ 2 u θ∂ θ 2−2 r 2∂ u r∂θ)+ρgθ] ......(II)

Here, density is ρ, time is t, dynamic viscosity is μ and gravitational acceleration in θ -direction is gθ.

Calculation:

Substitute 0 for ur and 0 for ∂(uθ)∂θ in Equation (I).

1r∂(0)∂r+1r(0)=00+0=00=0 ......(IV)

Since both sides of Equation (IV) are equal, therefore continuity equation is verified.

Substitute 0 for ur, 0 for gθ, 0 for ∂P∂θ and 0 for ∂(uθ)∂θ in Equation (II).

[ρ(( 0) ∂uθ ∂r+ uθ r( 0)+ (0 )uθ r)]=[−1r(0)+μ( 1 r ∂ ∂r( r∂ u θ∂r )− uθ r2 + 1 r2 ( 0)− 2 r2 ( 0))+ρ(0)]μ(1r∂∂r(r ∂ u θ ∂r)−uθr2)=0(1r∂∂r(r ∂ u θ ∂r)−uθr2)=01r(r∂2uθ∂r2+∂uθ∂r)−uθr2=0

∂2uθ∂r2+1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂uθ∂r+∂2uθ∂r2−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r(∂uθ∂r+r∂2uθ∂r2)−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂∂r(r( ∂ u θ ∂r))−1r∂uθ∂r−uθr2=0

1r(∂∂r(uθ+r( ∂uθ ∂r )))−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r2(r∂uθ∂r+uθ)=01r∂2∂r2(ruθ)−1r2∂∂r(ruθ)=0

∂∂r(1r∂∂r(ruθ))=0 ....... (V)

Change from partial derivative to total derivative in Equation (V).

ddr(1rddr(ruθ))=0 ....... (VI)

Integrate Equation (VI) with respect to r.

1rddr(ruθ)=C1ddr(ruθ)=C1r ...... (VII)

Here arbitrary constant is C1.

Again, Integrate Equation (VII) with respect to r.

ruθ=C1r22+C2uθ=C1r2+C2r ....... (VIII)

Here, arbitrary constant is C2.

Substitute 0 for uθ and Ri for r in Equation (VIII).

0=C1(Ri)2+C2(Ri)C2(Ri)=−C1(Ri)2C2=−C1Ri22 ...... (IX)

Substitute Roωo for uθ, −C1Ri22 for C2 and Ro for r in Equation (VIII).

Roωo=C1Ro2+( − C 1 R i 2 2)RoRoωo=C1Ro2−C1Ri22RoRoωo=C1(Ro2−Ri22Ro)C1=2Ro2ωoRo2−Ri2

Substitute 2Ro2ωoRo2−Ri2 for C1 in Equation (IX).

C2=−( 2 R o 2 ω o R o 2 − R i 2 )Ri22=−Ri2Ro2ωoRo2−Ri2

Substitute −Ri2Ro2ωoRo2−Ri2 for C2 and 2Ro2ωoRo2−Ri2 for C1 in Equation (VIII).

uθ=( 2 R o 2 ω o R o 2 − R i 2 )r2+( − R i 2 R o 2 ω o R o 2 − R i 2 )r=Ro2rωoRo2−Ri2−Ri2Ro2ωor(Ro2−Ri2)=Ro2ωoRo2−Ri2(r−Ri2r)

Conclusion:

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

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Answer 4

Question

Chapter 9, Problem 94P

To determine

The expression for velocity component uθ.

Expert Solution & Answer

Answer to Problem 94P

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Explanation of Solution

Given information:

The flow is steady, laminar, two-dimensional and incompressible. The flow is rotationally symmetric means nothing is function of coordinate θ and the flow is circular means velocity component ur is 0.

The inner cylinder is fixed and angular speed of outer cylinder is ωo, radius of outer cylinder is Ro and radius of inner cylinder is Ri.

Write the expression for continuity equation.

1r∂(rur)∂r+1r∂(uθ)∂θ=0 ....... (I)

Here, velocity components are ur and uθ, radius is r and angle is θ.

Write the expression for the θ -component of Navier-Stokes equation.

[ρ(ur∂ u θ∂r+ u θr∂ u θ∂θ+ u r u θr)]=[−1r∂P∂θ+μ(1r∂∂r(r ∂uθ ∂r)− u θ r 2+1 r 2 ∂ 2 u θ∂ θ 2−2 r 2∂ u r∂θ)+ρgθ] ......(II)

Here, density is ρ, time is t, dynamic viscosity is μ and gravitational acceleration in θ -direction is gθ.

Calculation:

Substitute 0 for ur and 0 for ∂(uθ)∂θ in Equation (I).

1r∂(0)∂r+1r(0)=00+0=00=0 ......(IV)

Since both sides of Equation (IV) are equal, therefore continuity equation is verified.

Substitute 0 for ur, 0 for gθ, 0 for ∂P∂θ and 0 for ∂(uθ)∂θ in Equation (II).

[ρ(( 0) ∂uθ ∂r+ uθ r( 0)+ (0 )uθ r)]=[−1r(0)+μ( 1 r ∂ ∂r( r∂ u θ∂r )− uθ r2 + 1 r2 ( 0)− 2 r2 ( 0))+ρ(0)]μ(1r∂∂r(r ∂ u θ ∂r)−uθr2)=0(1r∂∂r(r ∂ u θ ∂r)−uθr2)=01r(r∂2uθ∂r2+∂uθ∂r)−uθr2=0

∂2uθ∂r2+1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂uθ∂r+∂2uθ∂r2−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r(∂uθ∂r+r∂2uθ∂r2)−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂∂r(r( ∂ u θ ∂r))−1r∂uθ∂r−uθr2=0

1r(∂∂r(uθ+r( ∂uθ ∂r )))−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r2(r∂uθ∂r+uθ)=01r∂2∂r2(ruθ)−1r2∂∂r(ruθ)=0

∂∂r(1r∂∂r(ruθ))=0 ....... (V)

Change from partial derivative to total derivative in Equation (V).

ddr(1rddr(ruθ))=0 ....... (VI)

Integrate Equation (VI) with respect to r.

1rddr(ruθ)=C1ddr(ruθ)=C1r ...... (VII)

Here arbitrary constant is C1.

Again, Integrate Equation (VII) with respect to r.

ruθ=C1r22+C2uθ=C1r2+C2r ....... (VIII)

Here, arbitrary constant is C2.

Substitute 0 for uθ and Ri for r in Equation (VIII).

0=C1(Ri)2+C2(Ri)C2(Ri)=−C1(Ri)2C2=−C1Ri22 ...... (IX)

Substitute Roωo for uθ, −C1Ri22 for C2 and Ro for r in Equation (VIII).

Roωo=C1Ro2+( − C 1 R i 2 2)RoRoωo=C1Ro2−C1Ri22RoRoωo=C1(Ro2−Ri22Ro)C1=2Ro2ωoRo2−Ri2

Substitute 2Ro2ωoRo2−Ri2 for C1 in Equation (IX).

C2=−( 2 R o 2 ω o R o 2 − R i 2 )Ri22=−Ri2Ro2ωoRo2−Ri2

Substitute −Ri2Ro2ωoRo2−Ri2 for C2 and 2Ro2ωoRo2−Ri2 for C1 in Equation (VIII).

uθ=( 2 R o 2 ω o R o 2 − R i 2 )r2+( − R i 2 R o 2 ω o R o 2 − R i 2 )r=Ro2rωoRo2−Ri2−Ri2Ro2ωor(Ro2−Ri2)=Ro2ωoRo2−Ri2(r−Ri2r)

Conclusion:

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

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Answer 5

Chapter 9, Problem 94P

To determine

The expression for velocity component uθ.

Expert Solution & Answer

Answer to Problem 94P

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Explanation of Solution

Given information:

The flow is steady, laminar, two-dimensional and incompressible. The flow is rotationally symmetric means nothing is function of coordinate θ and the flow is circular means velocity component ur is 0.

The inner cylinder is fixed and angular speed of outer cylinder is ωo, radius of outer cylinder is Ro and radius of inner cylinder is Ri.

Write the expression for continuity equation.

1r∂(rur)∂r+1r∂(uθ)∂θ=0 ....... (I)

Here, velocity components are ur and uθ, radius is r and angle is θ.

Write the expression for the θ -component of Navier-Stokes equation.

[ρ(ur∂ u θ∂r+ u θr∂ u θ∂θ+ u r u θr)]=[−1r∂P∂θ+μ(1r∂∂r(r ∂uθ ∂r)− u θ r 2+1 r 2 ∂ 2 u θ∂ θ 2−2 r 2∂ u r∂θ)+ρgθ] ......(II)

Here, density is ρ, time is t, dynamic viscosity is μ and gravitational acceleration in θ -direction is gθ.

Calculation:

Substitute 0 for ur and 0 for ∂(uθ)∂θ in Equation (I).

1r∂(0)∂r+1r(0)=00+0=00=0 ......(IV)

Since both sides of Equation (IV) are equal, therefore continuity equation is verified.

Substitute 0 for ur, 0 for gθ, 0 for ∂P∂θ and 0 for ∂(uθ)∂θ in Equation (II).

[ρ(( 0) ∂uθ ∂r+ uθ r( 0)+ (0 )uθ r)]=[−1r(0)+μ( 1 r ∂ ∂r( r∂ u θ∂r )− uθ r2 + 1 r2 ( 0)− 2 r2 ( 0))+ρ(0)]μ(1r∂∂r(r ∂ u θ ∂r)−uθr2)=0(1r∂∂r(r ∂ u θ ∂r)−uθr2)=01r(r∂2uθ∂r2+∂uθ∂r)−uθr2=0

∂2uθ∂r2+1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂uθ∂r+∂2uθ∂r2−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r(∂uθ∂r+r∂2uθ∂r2)−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂∂r(r( ∂ u θ ∂r))−1r∂uθ∂r−uθr2=0

1r(∂∂r(uθ+r( ∂uθ ∂r )))−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r2(r∂uθ∂r+uθ)=01r∂2∂r2(ruθ)−1r2∂∂r(ruθ)=0

∂∂r(1r∂∂r(ruθ))=0 ....... (V)

Change from partial derivative to total derivative in Equation (V).

ddr(1rddr(ruθ))=0 ....... (VI)

Integrate Equation (VI) with respect to r.

1rddr(ruθ)=C1ddr(ruθ)=C1r ...... (VII)

Here arbitrary constant is C1.

Again, Integrate Equation (VII) with respect to r.

ruθ=C1r22+C2uθ=C1r2+C2r ....... (VIII)

Here, arbitrary constant is C2.

Substitute 0 for uθ and Ri for r in Equation (VIII).

0=C1(Ri)2+C2(Ri)C2(Ri)=−C1(Ri)2C2=−C1Ri22 ...... (IX)

Substitute Roωo for uθ, −C1Ri22 for C2 and Ro for r in Equation (VIII).

Roωo=C1Ro2+( − C 1 R i 2 2)RoRoωo=C1Ro2−C1Ri22RoRoωo=C1(Ro2−Ri22Ro)C1=2Ro2ωoRo2−Ri2

Substitute 2Ro2ωoRo2−Ri2 for C1 in Equation (IX).

C2=−( 2 R o 2 ω o R o 2 − R i 2 )Ri22=−Ri2Ro2ωoRo2−Ri2

Substitute −Ri2Ro2ωoRo2−Ri2 for C2 and 2Ro2ωoRo2−Ri2 for C1 in Equation (VIII).

uθ=( 2 R o 2 ω o R o 2 − R i 2 )r2+( − R i 2 R o 2 ω o R o 2 − R i 2 )r=Ro2rωoRo2−Ri2−Ri2Ro2ωor(Ro2−Ri2)=Ro2ωoRo2−Ri2(r−Ri2r)

Conclusion:

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Answer 6

Chapter 9, Problem 94P

To determine

The expression for velocity component uθ.

Expert Solution & Answer

Answer to Problem 94P

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Explanation of Solution

Given information:

The flow is steady, laminar, two-dimensional and incompressible. The flow is rotationally symmetric means nothing is function of coordinate θ and the flow is circular means velocity component ur is 0.

The inner cylinder is fixed and angular speed of outer cylinder is ωo, radius of outer cylinder is Ro and radius of inner cylinder is Ri.

Write the expression for continuity equation.

1r∂(rur)∂r+1r∂(uθ)∂θ=0 ....... (I)

Here, velocity components are ur and uθ, radius is r and angle is θ.

Write the expression for the θ -component of Navier-Stokes equation.

[ρ(ur∂ u θ∂r+ u θr∂ u θ∂θ+ u r u θr)]=[−1r∂P∂θ+μ(1r∂∂r(r ∂uθ ∂r)− u θ r 2+1 r 2 ∂ 2 u θ∂ θ 2−2 r 2∂ u r∂θ)+ρgθ] ......(II)

Here, density is ρ, time is t, dynamic viscosity is μ and gravitational acceleration in θ -direction is gθ.

Calculation:

Substitute 0 for ur and 0 for ∂(uθ)∂θ in Equation (I).

1r∂(0)∂r+1r(0)=00+0=00=0 ......(IV)

Since both sides of Equation (IV) are equal, therefore continuity equation is verified.

Substitute 0 for ur, 0 for gθ, 0 for ∂P∂θ and 0 for ∂(uθ)∂θ in Equation (II).

[ρ(( 0) ∂uθ ∂r+ uθ r( 0)+ (0 )uθ r)]=[−1r(0)+μ( 1 r ∂ ∂r( r∂ u θ∂r )− uθ r2 + 1 r2 ( 0)− 2 r2 ( 0))+ρ(0)]μ(1r∂∂r(r ∂ u θ ∂r)−uθr2)=0(1r∂∂r(r ∂ u θ ∂r)−uθr2)=01r(r∂2uθ∂r2+∂uθ∂r)−uθr2=0

∂2uθ∂r2+1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂uθ∂r+∂2uθ∂r2−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r(∂uθ∂r+r∂2uθ∂r2)−1r∂uθ∂r−uθr2=01r∂uθ∂r+1r∂∂r(r( ∂ u θ ∂r))−1r∂uθ∂r−uθr2=0

1r(∂∂r(uθ+r( ∂uθ ∂r )))−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r∂uθ∂r−uθr2=01r∂2∂r2(ruθ)−1r2(r∂uθ∂r+uθ)=01r∂2∂r2(ruθ)−1r2∂∂r(ruθ)=0

∂∂r(1r∂∂r(ruθ))=0 ....... (V)

Change from partial derivative to total derivative in Equation (V).

ddr(1rddr(ruθ))=0 ....... (VI)

Integrate Equation (VI) with respect to r.

1rddr(ruθ)=C1ddr(ruθ)=C1r ...... (VII)

Here arbitrary constant is C1.

Again, Integrate Equation (VII) with respect to r.

ruθ=C1r22+C2uθ=C1r2+C2r ....... (VIII)

Here, arbitrary constant is C2.

Substitute 0 for uθ and Ri for r in Equation (VIII).

0=C1(Ri)2+C2(Ri)C2(Ri)=−C1(Ri)2C2=−C1Ri22 ...... (IX)

Substitute Roωo for uθ, −C1Ri22 for C2 and Ro for r in Equation (VIII).

Roωo=C1Ro2+( − C 1 R i 2 2)RoRoωo=C1Ro2−C1Ri22RoRoωo=C1(Ro2−Ri22Ro)C1=2Ro2ωoRo2−Ri2

Substitute 2Ro2ωoRo2−Ri2 for C1 in Equation (IX).

C2=−( 2 R o 2 ω o R o 2 − R i 2 )Ri22=−Ri2Ro2ωoRo2−Ri2

Substitute −Ri2Ro2ωoRo2−Ri2 for C2 and 2Ro2ωoRo2−Ri2 for C1 in Equation (VIII).

uθ=( 2 R o 2 ω o R o 2 − R i 2 )r2+( − R i 2 R o 2 ω o R o 2 − R i 2 )r=Ro2rωoRo2−Ri2−Ri2Ro2ωor(Ro2−Ri2)=Ro2ωoRo2−Ri2(r−Ri2r)

Conclusion:

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Answer 7

Chapter 9, Problem 94P

To determine

The expression for velocity component uθ.

Answer 8

Expert Solution & Answer

Answer to Problem 94P

The expression for velocity component uθ is Ro2ωoRo2−Ri2(r−Ri2r).

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Given information:

The flow is steady, laminar, two-dimensional and incompressible. The flow is rotationally symmetric means nothing is function of coordinate θ and the flow is circular means velocity component ur is 0.

The inner cylinder is fixed and angular speed of outer cylinder is ωo, radius of outer cylinder is Ro and radius of inner cylinder is Ri.

Write the expression for continuity equation.

1r∂(rur)∂r+1r∂(uθ)∂θ=0 ....... (I)

Here, velocity components are ur and uθ, radius is r and angle is θ.

Write the expression for the θ -component of Navier-Stokes equation.

[ρ(ur∂ u θ∂r+ u θr∂ u θ∂θ+ u r u θr)]=[−1r∂P∂θ+μ(1r∂∂r(r ∂uθ ∂r)− u θ r 2+1 r 2 ∂ 2 u θ∂ θ 2−2 r 2∂ u r∂θ)+ρgθ] ......(II)

Here, density is ρ, time is t, dynamic viscosity is μ and gravitational acceleration in θ -direction is gθ.

Calculation:

Substitute 0 for ur and 0 for ∂(uθ)∂θ in Equation (I).

1r∂(0)∂r+1r(0)=00+0=00=0 ......(IV)

Since both sides of Equation (IV) are equal, therefore continuity equation is verified.

Substitute 0 for ur, 0 for gθ, 0 for ∂P∂θ and 0 for ∂(uθ)∂θ in Equation (II).

[ρ(( 0) ∂uθ ∂r+ uθ r( 0)+ (0 )uθ r)]=[−1r(0)+μ( 1 r ∂ ∂r( r∂ u θ∂r )− uθ r2 + 1 r2 ( 0)− 2 r2 ( 0))+ρ(0)]μ(1r∂∂r(r ∂ u θ ∂r)−uθr2)=0(1r∂∂r(r ∂ u θ ∂r)−uθr2)=01r(r∂2uθ∂r2+∂uθ∂r)−uθr2=0