The minimum velocity of the plate moving upward is to be calculated so that all the fluid moves in upward direction. Concept Introduction: Navier-stokes describes the motion of a fluidhaving constant density and viscosity. In x direction: ρ ( ∂ u ∂ t + u ∂ u ∂ x + v ∂ u ∂ y + w ∂ u ∂ z ) = μ ( ∂ 2 u ∂ x 2 + ∂ 2 u ∂ y 2 + ∂ 2 u ∂ z 2 ) − ∂ p ∂ x + ρ g x ....... (1) In y direction: ρ ( ∂ v ∂ t + u ∂ v ∂ x + v ∂ v ∂ y + w ∂ v ∂ z ) = μ ( ∂ 2 v ∂ x 2 + ∂ 2 v ∂ y 2 + ∂ 2 v ∂ z 2 ) − ∂ p ∂ y + ρ g y ....... (2) In z direction: ρ ( ∂ w ∂ t + u ∂ w ∂ x + v ∂ w ∂ y + w ∂ w ∂ z ) = μ ( ∂ 2 w ∂ x 2 + ∂ 2 w ∂ y 2 + ∂ 2 w ∂ z 2 ) − ∂ p ∂ z + ρ g z ....... (3) Here, ρ = density of the fluid μ = viscosity of the fluid p = pressure of the system u = velocity of fluid in x direction v = velocity of fluid in y direction w = velocity of fluid in z direction t = time g x = acceleration due to gravity in x direction g y = acceleration due to gravity in y direction g z = acceleration due to gravity in z direction

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Answer 1

Question

Chapter 4, Problem 4.2P

(a)

Interpretation Introduction

Interpretation:

The minimum velocity of the plate moving upward is to be calculated so that all the fluid moves in upward direction.

Concept Introduction:

Navier-stokes describes the motion of a fluidhaving constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(b)

Interpretation Introduction

Interpretation:

The fluid velocity at the midway between the plates is to be calculated if v0 is set the minimum velocity calculated in part (a).

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(c)

Interpretation Introduction

Interpretation:

The shear rate in the fluid at the stationary place, at the moving plate, and midway between them are to be calculated.

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

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Answer 2

Question

Chapter 4, Problem 4.2P

(a)

Interpretation Introduction

Interpretation:

The minimum velocity of the plate moving upward is to be calculated so that all the fluid moves in upward direction.

Concept Introduction:

Navier-stokes describes the motion of a fluidhaving constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(b)

Interpretation Introduction

Interpretation:

The fluid velocity at the midway between the plates is to be calculated if v0 is set the minimum velocity calculated in part (a).

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(c)

Interpretation Introduction

Interpretation:

The shear rate in the fluid at the stationary place, at the moving plate, and midway between them are to be calculated.

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

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Answer 3

Question

Chapter 4, Problem 4.2P

(a)

Interpretation Introduction

Interpretation:

The minimum velocity of the plate moving upward is to be calculated so that all the fluid moves in upward direction.

Concept Introduction:

Navier-stokes describes the motion of a fluidhaving constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(b)

Interpretation Introduction

Interpretation:

The fluid velocity at the midway between the plates is to be calculated if v0 is set the minimum velocity calculated in part (a).

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(c)

Interpretation Introduction

Interpretation:

The shear rate in the fluid at the stationary place, at the moving plate, and midway between them are to be calculated.

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Expert Solution & Answer

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Check out a sample textbook solution

See solution

Answer 4

Question

Chapter 4, Problem 4.2P

(a)

Interpretation Introduction

Interpretation:

The minimum velocity of the plate moving upward is to be calculated so that all the fluid moves in upward direction.

Concept Introduction:

Navier-stokes describes the motion of a fluidhaving constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(b)

Interpretation Introduction

Interpretation:

The fluid velocity at the midway between the plates is to be calculated if v0 is set the minimum velocity calculated in part (a).

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(c)

Interpretation Introduction

Interpretation:

The shear rate in the fluid at the stationary place, at the moving plate, and midway between them are to be calculated.

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Expert Solution & Answer

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Check out a sample textbook solution

See solution

Answer 5

Chapter 4, Problem 4.2P

(a)

Interpretation Introduction

Interpretation:

The minimum velocity of the plate moving upward is to be calculated so that all the fluid moves in upward direction.

Concept Introduction:

Navier-stokes describes the motion of a fluidhaving constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(b)

Interpretation Introduction

Interpretation:

The fluid velocity at the midway between the plates is to be calculated if v0 is set the minimum velocity calculated in part (a).

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

(c)

Interpretation Introduction

Interpretation:

The shear rate in the fluid at the stationary place, at the moving plate, and midway between them are to be calculated.

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Answer 6

Chapter 4, Problem 4.2P

(a)

Interpretation Introduction

Interpretation:

The minimum velocity of the plate moving upward is to be calculated so that all the fluid moves in upward direction.

Concept Introduction:

Navier-stokes describes the motion of a fluidhaving constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Answer 7

Chapter 4, Problem 4.2P

(a)

Interpretation Introduction

Interpretation:

The minimum velocity of the plate moving upward is to be calculated so that all the fluid moves in upward direction.

Concept Introduction:

Navier-stokes describes the motion of a fluidhaving constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Answer 8

(b)

Interpretation Introduction

Interpretation:

The fluid velocity at the midway between the plates is to be calculated if v0 is set the minimum velocity calculated in part (a).

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Answer 9

(b)

Interpretation Introduction

Interpretation:

The fluid velocity at the midway between the plates is to be calculated if v0 is set the minimum velocity calculated in part (a).

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Answer 10

(c)

Interpretation Introduction

Interpretation:

The shear rate in the fluid at the stationary place, at the moving plate, and midway between them are to be calculated.

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Answer 11

(c)

Interpretation Introduction

Interpretation:

The shear rate in the fluid at the stationary place, at the moving plate, and midway between them are to be calculated.

Concept Introduction:

Navier-stokes describes the motion of a fluid having constant density and viscosity.

In x direction:

ρ(∂u∂t+u∂u∂x+v∂u∂y+w∂u∂z)=μ(∂2u∂x2+∂2u∂y2+∂2u∂z2)−∂p∂x+ρgx ....... (1)

In y direction:

ρ(∂v∂t+u∂v∂x+v∂v∂y+w∂v∂z)=μ(∂2v∂x2+∂2v∂y2+∂2v∂z2)−∂p∂y+ρgy ....... (2)

In z direction:

ρ(∂w∂t+u∂w∂x+v∂w∂y+w∂w∂z)=μ(∂2w∂x2+∂2w∂y2+∂2w∂z2)−∂p∂z+ρgz ....... (3)

Here,

ρ= density of the fluidμ=viscosity of the fluidp=pressure of the systemu=velocity of fluid in x directionv=velocity of fluid in y directionw=velocity of fluid in z directiont=timegx=acceleration due to gravity in x directiongy=acceleration due to gravity in y directiongz=acceleration due to gravity in z direction

Answer 12

Expert Solution & Answer

Answer 13

Expert Solution & Answer

Answer 14

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Answer 15

Ch. 4 - Prob. 4.1P Ch. 4 - Prob. 4.2P Ch. 4 - Prob. 4.3P Ch. 4 - Prob. 4.4P Ch. 4 - Prob. 4.5P Ch. 4 - Prob. 4.6P Ch. 4 - Prob. 4.7P Ch. 4 - Prob. 4.8P Ch. 4 - Prob. 4.9P

Solution Summary: The author explains how Navier-stokes describes the motion of a fluid having constant density and viscosity.

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Chapter 4 Solutions