Prove that the flow field specified in Example 2.1 is not incompressible; i.e., it is a compressible flow as stated without proof in Example 2.1.

Question

Want to see more full solutions like this?

Answer 1

Textbook Question

Chapter 3, Problem 3.23P

Prove that the flow field specified in Example 2.1 is not incompressible; i.e., it is a compressible flow as stated without proof in Example 2.1.

Expert Solution & Answer

To determine

To prove:

The flow in example 2.1 is compressible.

Explanation of Solution

Calculation:

Velocity field for the subsonic flow is expressed as follows:

u=V∞(1+hβ2πlcos(2πxl)e−2πβyl) ......(1)v=−V∞h2πlsin(2πxl)e−2πβyl ......(2)

Differentiate the equation (1) with respect to x as follows:

∂u∂x=−V∞hβ(2πl)2sin(2πxl)e−2πβyl

Differentiate the equation (2) with respect toy as follows:

∂v∂x=V∞βh(2πl)2sin(2πxl)e−2πβyl

The divergence of a vector field is calculated as follows:

∇⋅V=−V∞hβ(2πl)2sin(2πxl)e−2πβyl+V∞βh(2πl)2sin(2πxl)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2sin(2πxl)e−2πβyl

Rate of change of volume is calculated as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2e−2πβyl

Substitute the values in the above equation as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=240×0.01(0.714−10.714)(2π1)2e−2π×0.7141∇⋅V=−0.686×2.4×397.47×0.01∇⋅V=−0.7327 s-1

Apply the control volume equation as follows:

1ρ(∂ρ∂t)=−∇⋅V1ρ(∂ρ∂t)=−(−0.7327)1ρ(∂ρ∂t)=0.7327or,1ρ(∂ρ∂t)=73.27%

This shows that the given flow is compressible by 73.37%.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Students have asked these similar questions

The velocity components of a flow field are given by: = 2x² – xy + z², v = x² – 4xy + y², w = 2xy – yz + y² (i) Prove that it is a case of possible steady incompressible fluid flow (ii) Calculate the velocity and acceleration at the point (2,1,3)

55. Derive the relation for angular velocity in terms of the velocity components for fluid rotation in a two-dimensional flow field. [Hint: Use the schematic for ro- tation in Figure IIa.3.5 and find the angular velocity for line oa as @a = doddt. Substitute for da= dl,/dx and for dl, from dl, = (JV,/dx)dxdt. Do the same for line ob to find @p. The z-component of rotation vector is the average of @a and @p. Do the same for x- and y- components].

Suppose the vector field v = (x, y,−z) is the velocity vector for a steady (time independent) fluid flow. Find the streamlines r (t) corresponding to the paths of individual particles.(Show all work with integrals)

Answer 2

Textbook Question

Chapter 3, Problem 3.23P

Prove that the flow field specified in Example 2.1 is not incompressible; i.e., it is a compressible flow as stated without proof in Example 2.1.

Expert Solution & Answer

To determine

To prove:

The flow in example 2.1 is compressible.

Explanation of Solution

Calculation:

Velocity field for the subsonic flow is expressed as follows:

u=V∞(1+hβ2πlcos(2πxl)e−2πβyl) ......(1)v=−V∞h2πlsin(2πxl)e−2πβyl ......(2)

Differentiate the equation (1) with respect to x as follows:

∂u∂x=−V∞hβ(2πl)2sin(2πxl)e−2πβyl

Differentiate the equation (2) with respect toy as follows:

∂v∂x=V∞βh(2πl)2sin(2πxl)e−2πβyl

The divergence of a vector field is calculated as follows:

∇⋅V=−V∞hβ(2πl)2sin(2πxl)e−2πβyl+V∞βh(2πl)2sin(2πxl)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2sin(2πxl)e−2πβyl

Rate of change of volume is calculated as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2e−2πβyl

Substitute the values in the above equation as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=240×0.01(0.714−10.714)(2π1)2e−2π×0.7141∇⋅V=−0.686×2.4×397.47×0.01∇⋅V=−0.7327 s-1

Apply the control volume equation as follows:

1ρ(∂ρ∂t)=−∇⋅V1ρ(∂ρ∂t)=−(−0.7327)1ρ(∂ρ∂t)=0.7327or,1ρ(∂ρ∂t)=73.27%

This shows that the given flow is compressible by 73.37%.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 3

Textbook Question

Chapter 3, Problem 3.23P

Prove that the flow field specified in Example 2.1 is not incompressible; i.e., it is a compressible flow as stated without proof in Example 2.1.

Expert Solution & Answer

To determine

To prove:

The flow in example 2.1 is compressible.

Explanation of Solution

Calculation:

Velocity field for the subsonic flow is expressed as follows:

u=V∞(1+hβ2πlcos(2πxl)e−2πβyl) ......(1)v=−V∞h2πlsin(2πxl)e−2πβyl ......(2)

Differentiate the equation (1) with respect to x as follows:

∂u∂x=−V∞hβ(2πl)2sin(2πxl)e−2πβyl

Differentiate the equation (2) with respect toy as follows:

∂v∂x=V∞βh(2πl)2sin(2πxl)e−2πβyl

The divergence of a vector field is calculated as follows:

∇⋅V=−V∞hβ(2πl)2sin(2πxl)e−2πβyl+V∞βh(2πl)2sin(2πxl)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2sin(2πxl)e−2πβyl

Rate of change of volume is calculated as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2e−2πβyl

Substitute the values in the above equation as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=240×0.01(0.714−10.714)(2π1)2e−2π×0.7141∇⋅V=−0.686×2.4×397.47×0.01∇⋅V=−0.7327 s-1

Apply the control volume equation as follows:

1ρ(∂ρ∂t)=−∇⋅V1ρ(∂ρ∂t)=−(−0.7327)1ρ(∂ρ∂t)=0.7327or,1ρ(∂ρ∂t)=73.27%

This shows that the given flow is compressible by 73.37%.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Textbook Question

Chapter 3, Problem 3.23P

Prove that the flow field specified in Example 2.1 is not incompressible; i.e., it is a compressible flow as stated without proof in Example 2.1.

Expert Solution & Answer

To determine

To prove:

The flow in example 2.1 is compressible.

Explanation of Solution

Calculation:

Velocity field for the subsonic flow is expressed as follows:

u=V∞(1+hβ2πlcos(2πxl)e−2πβyl) ......(1)v=−V∞h2πlsin(2πxl)e−2πβyl ......(2)

Differentiate the equation (1) with respect to x as follows:

∂u∂x=−V∞hβ(2πl)2sin(2πxl)e−2πβyl

Differentiate the equation (2) with respect toy as follows:

∂v∂x=V∞βh(2πl)2sin(2πxl)e−2πβyl

The divergence of a vector field is calculated as follows:

∇⋅V=−V∞hβ(2πl)2sin(2πxl)e−2πβyl+V∞βh(2πl)2sin(2πxl)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2sin(2πxl)e−2πβyl

Rate of change of volume is calculated as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2e−2πβyl

Substitute the values in the above equation as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=240×0.01(0.714−10.714)(2π1)2e−2π×0.7141∇⋅V=−0.686×2.4×397.47×0.01∇⋅V=−0.7327 s-1

Apply the control volume equation as follows:

1ρ(∂ρ∂t)=−∇⋅V1ρ(∂ρ∂t)=−(−0.7327)1ρ(∂ρ∂t)=0.7327or,1ρ(∂ρ∂t)=73.27%

This shows that the given flow is compressible by 73.37%.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution & Answer

To determine

To prove:

The flow in example 2.1 is compressible.

Explanation of Solution

Calculation:

Velocity field for the subsonic flow is expressed as follows:

u=V∞(1+hβ2πlcos(2πxl)e−2πβyl) ......(1)v=−V∞h2πlsin(2πxl)e−2πβyl ......(2)

Differentiate the equation (1) with respect to x as follows:

∂u∂x=−V∞hβ(2πl)2sin(2πxl)e−2πβyl

Differentiate the equation (2) with respect toy as follows:

∂v∂x=V∞βh(2πl)2sin(2πxl)e−2πβyl

The divergence of a vector field is calculated as follows:

∇⋅V=−V∞hβ(2πl)2sin(2πxl)e−2πβyl+V∞βh(2πl)2sin(2πxl)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2sin(2πxl)e−2πβyl

Rate of change of volume is calculated as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2e−2πβyl

Substitute the values in the above equation as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=240×0.01(0.714−10.714)(2π1)2e−2π×0.7141∇⋅V=−0.686×2.4×397.47×0.01∇⋅V=−0.7327 s-1

Apply the control volume equation as follows:

1ρ(∂ρ∂t)=−∇⋅V1ρ(∂ρ∂t)=−(−0.7327)1ρ(∂ρ∂t)=0.7327or,1ρ(∂ρ∂t)=73.27%

This shows that the given flow is compressible by 73.37%.

Answer 8

Expert Solution & Answer

To determine

To prove:

The flow in example 2.1 is compressible.

Explanation of Solution

Calculation:

Velocity field for the subsonic flow is expressed as follows:

u=V∞(1+hβ2πlcos(2πxl)e−2πβyl) ......(1)v=−V∞h2πlsin(2πxl)e−2πβyl ......(2)

Differentiate the equation (1) with respect to x as follows:

∂u∂x=−V∞hβ(2πl)2sin(2πxl)e−2πβyl

Differentiate the equation (2) with respect toy as follows:

∂v∂x=V∞βh(2πl)2sin(2πxl)e−2πβyl

The divergence of a vector field is calculated as follows:

∇⋅V=−V∞hβ(2πl)2sin(2πxl)e−2πβyl+V∞βh(2πl)2sin(2πxl)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2sin(2πxl)e−2πβyl

Rate of change of volume is calculated as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2e−2πβyl

Substitute the values in the above equation as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=240×0.01(0.714−10.714)(2π1)2e−2π×0.7141∇⋅V=−0.686×2.4×397.47×0.01∇⋅V=−0.7327 s-1

Apply the control volume equation as follows:

1ρ(∂ρ∂t)=−∇⋅V1ρ(∂ρ∂t)=−(−0.7327)1ρ(∂ρ∂t)=0.7327or,1ρ(∂ρ∂t)=73.27%

This shows that the given flow is compressible by 73.37%.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

To determine

To prove:

The flow in example 2.1 is compressible.

Answer 12

Explanation of Solution

Calculation:

Velocity field for the subsonic flow is expressed as follows:

u=V∞(1+hβ2πlcos(2πxl)e−2πβyl) ......(1)v=−V∞h2πlsin(2πxl)e−2πβyl ......(2)

Differentiate the equation (1) with respect to x as follows:

∂u∂x=−V∞hβ(2πl)2sin(2πxl)e−2πβyl

Differentiate the equation (2) with respect toy as follows:

∂v∂x=V∞βh(2πl)2sin(2πxl)e−2πβyl

The divergence of a vector field is calculated as follows:

∇⋅V=−V∞hβ(2πl)2sin(2πxl)e−2πβyl+V∞βh(2πl)2sin(2πxl)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2sin(2πxl)e−2πβyl

Rate of change of volume is calculated as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=V∞h(β−1β)(2πl)2e−2πβyl

Substitute the values in the above equation as follows:

∇⋅V=V∞h(β−1β)(2πl)2sin(2π4)e−2πβyl∇⋅V=240×0.01(0.714−10.714)(2π1)2e−2π×0.7141∇⋅V=−0.686×2.4×397.47×0.01∇⋅V=−0.7327 s-1

Apply the control volume equation as follows:

1ρ(∂ρ∂t)=−∇⋅V1ρ(∂ρ∂t)=−(−0.7327)1ρ(∂ρ∂t)=0.7327or,1ρ(∂ρ∂t)=73.27%

This shows that the given flow is compressible by 73.37%.

Answer 13

Ch. 3 - For an irrotational flow. show that Bernoullis...Ch. 3 - Consider a venturi with a throat-to-inlet area...Ch. 3 - Consider a venturi with a small hole drilled in...Ch. 3 - Consider a low-speed open-circuit subsonic wind...Ch. 3 - Assume that a Pitot tube is inserted into the...Ch. 3 - A Pilot tube on an airplane flying at standard sea...Ch. 3 - At a given point on the surface of the wing of the...Ch. 3 - Consider a uniform flow with velocity V. Show that...Ch. 3 - Show that a source flow is a physically possible...Ch. 3 - Prove that the velocity potential and the stream...

Prove that the flow field specified in Example 2.1 is not incompressible; i.e., it is a compressible flow as stated without proof in Example 2.1.

Concept explainers

Videos

Explanation of Solution

Want to see more full solutions like this?

Chapter 3 Solutions

Additional Engineering Textbook Solutions