The magnitude of the shear strain rate about point P in the x y plane is given by : ε x y = 1 2 ≥ ( ∂ u ∂ y + ∂ v ∂ x ) .

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Answer 1

Question

Chapter 4, Problem 73P

To determine

The magnitude of the shear strain rate about point P in the xy plane is given by : εxy=12≥(∂u∂y+∂v∂x).

Expert Solution & Answer

Explanation of Solution

The shear strain rate is half of the rate of decrease of the angle between two perpendicular lines which intersect at the point. Initially at time t1, line a and b are perpendicular and intersect at point P. The angle between line a and b is αa−b at time t2.

The following figure shows the fluid element at time t2.

Fluid Mechanics: Fundamentals and Applications, Chapter 4, Problem 73P

Figure-(1)

At time t2, the point A moves a distance of (u+∂u∂xdx)dt to right and (v+∂v∂xdx)dt to up and the point B moves a distance of (u+∂u∂ydy)dt to the right and (v+∂v∂ydy)dt up. The point P moves a distance of udt to right and vdt up.

Refer to Figure-(I), to obtain the values of the horizontal distance between point P′ and A′ as dx+∂u∂xdxdt, the vertical distance between point P′ and A′ as ∂v∂xdxdt, the horizontal distance between point P′ and B′ as −∂u∂ydydt and the vertical distance between point P′ and B′ as dy+∂v∂ydydt.

Write the expression for the angle α at point A

tanαa=∂v∂xdxdtdx+∂u∂xdxdtαa=tan−1( ∂v ∂xdxdtdx+ ∂u ∂xdxdt)

The distance dx+∂u∂xdxdt is approximate to dx.

αa=tan−1( ∂v ∂xdxdtdx)=tan−1(∂v∂xdt)≈∂v∂xdt

Write the expression for the angle α at point B

tanαb=−∂u∂ydydtdy+∂v∂ydydtαb=tan−1(− ∂u ∂ydydtdy+ ∂v ∂ydydt)

The distance dy+∂v∂ydydt is approximate to dy.

αb=tan−1(− ∂u ∂ududtdu)=tan−1(−∂u∂ydt)≈−∂u∂ydt

Write the expression for the angle αa−b at time t1.

(αa−b)t1=π2

Refer to figure (I), to obtain the value of (αa−b)t2 as αb+π2−αa at time t2.

(αa−b)t2=αb+π2−αa ...... (I)

Substitute ∂v∂xdt for αa and −∂u∂ydt for αb in Equation (I).

(αa−b)t2=−∂u∂ydt+π2−∂v∂xdt

Write the expression for the shear strain rate.

εxy=−12ddtαa−bεxy=−12ddt(( α a−b ) t 2−( α a−b ) t 1) ...... (II)

Substitute −∂u∂ydt+π2−∂v∂xdt for (αa−b)t2 and π2 for (αa−b)t1 in Equation (II).

εxy=−12ddt(−∂u∂ydt+π2−∂v∂xdt−π2)εxy=−12ddt(−∂u∂ydt−∂v∂xdt)εxy=12ddt(∂u∂ydt+∂v∂xdt)

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Answer 2

Question

Chapter 4, Problem 73P

To determine

The magnitude of the shear strain rate about point P in the xy plane is given by : εxy=12≥(∂u∂y+∂v∂x).

Expert Solution & Answer

Explanation of Solution

The shear strain rate is half of the rate of decrease of the angle between two perpendicular lines which intersect at the point. Initially at time t1, line a and b are perpendicular and intersect at point P. The angle between line a and b is αa−b at time t2.

The following figure shows the fluid element at time t2.

Fluid Mechanics: Fundamentals and Applications, Chapter 4, Problem 73P

Figure-(1)

At time t2, the point A moves a distance of (u+∂u∂xdx)dt to right and (v+∂v∂xdx)dt to up and the point B moves a distance of (u+∂u∂ydy)dt to the right and (v+∂v∂ydy)dt up. The point P moves a distance of udt to right and vdt up.

Refer to Figure-(I), to obtain the values of the horizontal distance between point P′ and A′ as dx+∂u∂xdxdt, the vertical distance between point P′ and A′ as ∂v∂xdxdt, the horizontal distance between point P′ and B′ as −∂u∂ydydt and the vertical distance between point P′ and B′ as dy+∂v∂ydydt.

Write the expression for the angle α at point A

tanαa=∂v∂xdxdtdx+∂u∂xdxdtαa=tan−1( ∂v ∂xdxdtdx+ ∂u ∂xdxdt)

The distance dx+∂u∂xdxdt is approximate to dx.

αa=tan−1( ∂v ∂xdxdtdx)=tan−1(∂v∂xdt)≈∂v∂xdt

Write the expression for the angle α at point B

tanαb=−∂u∂ydydtdy+∂v∂ydydtαb=tan−1(− ∂u ∂ydydtdy+ ∂v ∂ydydt)

The distance dy+∂v∂ydydt is approximate to dy.

αb=tan−1(− ∂u ∂ududtdu)=tan−1(−∂u∂ydt)≈−∂u∂ydt

Write the expression for the angle αa−b at time t1.

(αa−b)t1=π2

Refer to figure (I), to obtain the value of (αa−b)t2 as αb+π2−αa at time t2.

(αa−b)t2=αb+π2−αa ...... (I)

Substitute ∂v∂xdt for αa and −∂u∂ydt for αb in Equation (I).

(αa−b)t2=−∂u∂ydt+π2−∂v∂xdt

Write the expression for the shear strain rate.

εxy=−12ddtαa−bεxy=−12ddt(( α a−b ) t 2−( α a−b ) t 1) ...... (II)

Substitute −∂u∂ydt+π2−∂v∂xdt for (αa−b)t2 and π2 for (αa−b)t1 in Equation (II).

εxy=−12ddt(−∂u∂ydt+π2−∂v∂xdt−π2)εxy=−12ddt(−∂u∂ydt−∂v∂xdt)εxy=12ddt(∂u∂ydt+∂v∂xdt)

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Answer 3

Question

Chapter 4, Problem 73P

To determine

The magnitude of the shear strain rate about point P in the xy plane is given by : εxy=12≥(∂u∂y+∂v∂x).

Expert Solution & Answer

Explanation of Solution

The shear strain rate is half of the rate of decrease of the angle between two perpendicular lines which intersect at the point. Initially at time t1, line a and b are perpendicular and intersect at point P. The angle between line a and b is αa−b at time t2.

The following figure shows the fluid element at time t2.

Fluid Mechanics: Fundamentals and Applications, Chapter 4, Problem 73P

Figure-(1)

At time t2, the point A moves a distance of (u+∂u∂xdx)dt to right and (v+∂v∂xdx)dt to up and the point B moves a distance of (u+∂u∂ydy)dt to the right and (v+∂v∂ydy)dt up. The point P moves a distance of udt to right and vdt up.

Refer to Figure-(I), to obtain the values of the horizontal distance between point P′ and A′ as dx+∂u∂xdxdt, the vertical distance between point P′ and A′ as ∂v∂xdxdt, the horizontal distance between point P′ and B′ as −∂u∂ydydt and the vertical distance between point P′ and B′ as dy+∂v∂ydydt.

Write the expression for the angle α at point A

tanαa=∂v∂xdxdtdx+∂u∂xdxdtαa=tan−1( ∂v ∂xdxdtdx+ ∂u ∂xdxdt)

The distance dx+∂u∂xdxdt is approximate to dx.

αa=tan−1( ∂v ∂xdxdtdx)=tan−1(∂v∂xdt)≈∂v∂xdt

Write the expression for the angle α at point B

tanαb=−∂u∂ydydtdy+∂v∂ydydtαb=tan−1(− ∂u ∂ydydtdy+ ∂v ∂ydydt)

The distance dy+∂v∂ydydt is approximate to dy.

αb=tan−1(− ∂u ∂ududtdu)=tan−1(−∂u∂ydt)≈−∂u∂ydt

Write the expression for the angle αa−b at time t1.

(αa−b)t1=π2

Refer to figure (I), to obtain the value of (αa−b)t2 as αb+π2−αa at time t2.

(αa−b)t2=αb+π2−αa ...... (I)

Substitute ∂v∂xdt for αa and −∂u∂ydt for αb in Equation (I).

(αa−b)t2=−∂u∂ydt+π2−∂v∂xdt

Write the expression for the shear strain rate.

εxy=−12ddtαa−bεxy=−12ddt(( α a−b ) t 2−( α a−b ) t 1) ...... (II)

Substitute −∂u∂ydt+π2−∂v∂xdt for (αa−b)t2 and π2 for (αa−b)t1 in Equation (II).

εxy=−12ddt(−∂u∂ydt+π2−∂v∂xdt−π2)εxy=−12ddt(−∂u∂ydt−∂v∂xdt)εxy=12ddt(∂u∂ydt+∂v∂xdt)

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Answer 4

Question

Chapter 4, Problem 73P

To determine

The magnitude of the shear strain rate about point P in the xy plane is given by : εxy=12≥(∂u∂y+∂v∂x).

Expert Solution & Answer

Explanation of Solution

The shear strain rate is half of the rate of decrease of the angle between two perpendicular lines which intersect at the point. Initially at time t1, line a and b are perpendicular and intersect at point P. The angle between line a and b is αa−b at time t2.

The following figure shows the fluid element at time t2.

Fluid Mechanics: Fundamentals and Applications, Chapter 4, Problem 73P

Figure-(1)

At time t2, the point A moves a distance of (u+∂u∂xdx)dt to right and (v+∂v∂xdx)dt to up and the point B moves a distance of (u+∂u∂ydy)dt to the right and (v+∂v∂ydy)dt up. The point P moves a distance of udt to right and vdt up.

Refer to Figure-(I), to obtain the values of the horizontal distance between point P′ and A′ as dx+∂u∂xdxdt, the vertical distance between point P′ and A′ as ∂v∂xdxdt, the horizontal distance between point P′ and B′ as −∂u∂ydydt and the vertical distance between point P′ and B′ as dy+∂v∂ydydt.

Write the expression for the angle α at point A

tanαa=∂v∂xdxdtdx+∂u∂xdxdtαa=tan−1( ∂v ∂xdxdtdx+ ∂u ∂xdxdt)

The distance dx+∂u∂xdxdt is approximate to dx.

αa=tan−1( ∂v ∂xdxdtdx)=tan−1(∂v∂xdt)≈∂v∂xdt

Write the expression for the angle α at point B

tanαb=−∂u∂ydydtdy+∂v∂ydydtαb=tan−1(− ∂u ∂ydydtdy+ ∂v ∂ydydt)

The distance dy+∂v∂ydydt is approximate to dy.

αb=tan−1(− ∂u ∂ududtdu)=tan−1(−∂u∂ydt)≈−∂u∂ydt

Write the expression for the angle αa−b at time t1.

(αa−b)t1=π2

Refer to figure (I), to obtain the value of (αa−b)t2 as αb+π2−αa at time t2.

(αa−b)t2=αb+π2−αa ...... (I)

Substitute ∂v∂xdt for αa and −∂u∂ydt for αb in Equation (I).

(αa−b)t2=−∂u∂ydt+π2−∂v∂xdt

Write the expression for the shear strain rate.

εxy=−12ddtαa−bεxy=−12ddt(( α a−b ) t 2−( α a−b ) t 1) ...... (II)

Substitute −∂u∂ydt+π2−∂v∂xdt for (αa−b)t2 and π2 for (αa−b)t1 in Equation (II).

εxy=−12ddt(−∂u∂ydt+π2−∂v∂xdt−π2)εxy=−12ddt(−∂u∂ydt−∂v∂xdt)εxy=12ddt(∂u∂ydt+∂v∂xdt)

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Answer 5

Chapter 4, Problem 73P

To determine

The magnitude of the shear strain rate about point P in the xy plane is given by : εxy=12≥(∂u∂y+∂v∂x).

Expert Solution & Answer

Explanation of Solution

The shear strain rate is half of the rate of decrease of the angle between two perpendicular lines which intersect at the point. Initially at time t1, line a and b are perpendicular and intersect at point P. The angle between line a and b is αa−b at time t2.

The following figure shows the fluid element at time t2.

Fluid Mechanics: Fundamentals and Applications, Chapter 4, Problem 73P

Figure-(1)

At time t2, the point A moves a distance of (u+∂u∂xdx)dt to right and (v+∂v∂xdx)dt to up and the point B moves a distance of (u+∂u∂ydy)dt to the right and (v+∂v∂ydy)dt up. The point P moves a distance of udt to right and vdt up.

Refer to Figure-(I), to obtain the values of the horizontal distance between point P′ and A′ as dx+∂u∂xdxdt, the vertical distance between point P′ and A′ as ∂v∂xdxdt, the horizontal distance between point P′ and B′ as −∂u∂ydydt and the vertical distance between point P′ and B′ as dy+∂v∂ydydt.

Write the expression for the angle α at point A

tanαa=∂v∂xdxdtdx+∂u∂xdxdtαa=tan−1( ∂v ∂xdxdtdx+ ∂u ∂xdxdt)

The distance dx+∂u∂xdxdt is approximate to dx.

αa=tan−1( ∂v ∂xdxdtdx)=tan−1(∂v∂xdt)≈∂v∂xdt

Write the expression for the angle α at point B

tanαb=−∂u∂ydydtdy+∂v∂ydydtαb=tan−1(− ∂u ∂ydydtdy+ ∂v ∂ydydt)

The distance dy+∂v∂ydydt is approximate to dy.

αb=tan−1(− ∂u ∂ududtdu)=tan−1(−∂u∂ydt)≈−∂u∂ydt

Write the expression for the angle αa−b at time t1.

(αa−b)t1=π2

Refer to figure (I), to obtain the value of (αa−b)t2 as αb+π2−αa at time t2.

(αa−b)t2=αb+π2−αa ...... (I)

Substitute ∂v∂xdt for αa and −∂u∂ydt for αb in Equation (I).

(αa−b)t2=−∂u∂ydt+π2−∂v∂xdt

Write the expression for the shear strain rate.

εxy=−12ddtαa−bεxy=−12ddt(( α a−b ) t 2−( α a−b ) t 1) ...... (II)

Substitute −∂u∂ydt+π2−∂v∂xdt for (αa−b)t2 and π2 for (αa−b)t1 in Equation (II).

εxy=−12ddt(−∂u∂ydt+π2−∂v∂xdt−π2)εxy=−12ddt(−∂u∂ydt−∂v∂xdt)εxy=12ddt(∂u∂ydt+∂v∂xdt)

Answer 6

Chapter 4, Problem 73P

To determine

The magnitude of the shear strain rate about point P in the xy plane is given by : εxy=12≥(∂u∂y+∂v∂x).

Expert Solution & Answer

Explanation of Solution

The shear strain rate is half of the rate of decrease of the angle between two perpendicular lines which intersect at the point. Initially at time t1, line a and b are perpendicular and intersect at point P. The angle between line a and b is αa−b at time t2.

The following figure shows the fluid element at time t2.

Fluid Mechanics: Fundamentals and Applications, Chapter 4, Problem 73P

Figure-(1)

At time t2, the point A moves a distance of (u+∂u∂xdx)dt to right and (v+∂v∂xdx)dt to up and the point B moves a distance of (u+∂u∂ydy)dt to the right and (v+∂v∂ydy)dt up. The point P moves a distance of udt to right and vdt up.

Refer to Figure-(I), to obtain the values of the horizontal distance between point P′ and A′ as dx+∂u∂xdxdt, the vertical distance between point P′ and A′ as ∂v∂xdxdt, the horizontal distance between point P′ and B′ as −∂u∂ydydt and the vertical distance between point P′ and B′ as dy+∂v∂ydydt.

Write the expression for the angle α at point A

tanαa=∂v∂xdxdtdx+∂u∂xdxdtαa=tan−1( ∂v ∂xdxdtdx+ ∂u ∂xdxdt)

The distance dx+∂u∂xdxdt is approximate to dx.

αa=tan−1( ∂v ∂xdxdtdx)=tan−1(∂v∂xdt)≈∂v∂xdt

Write the expression for the angle α at point B

tanαb=−∂u∂ydydtdy+∂v∂ydydtαb=tan−1(− ∂u ∂ydydtdy+ ∂v ∂ydydt)

The distance dy+∂v∂ydydt is approximate to dy.

αb=tan−1(− ∂u ∂ududtdu)=tan−1(−∂u∂ydt)≈−∂u∂ydt

Write the expression for the angle αa−b at time t1.

(αa−b)t1=π2

Refer to figure (I), to obtain the value of (αa−b)t2 as αb+π2−αa at time t2.

(αa−b)t2=αb+π2−αa ...... (I)

Substitute ∂v∂xdt for αa and −∂u∂ydt for αb in Equation (I).

(αa−b)t2=−∂u∂ydt+π2−∂v∂xdt

Write the expression for the shear strain rate.

εxy=−12ddtαa−bεxy=−12ddt(( α a−b ) t 2−( α a−b ) t 1) ...... (II)

Substitute −∂u∂ydt+π2−∂v∂xdt for (αa−b)t2 and π2 for (αa−b)t1 in Equation (II).

εxy=−12ddt(−∂u∂ydt+π2−∂v∂xdt−π2)εxy=−12ddt(−∂u∂ydt−∂v∂xdt)εxy=12ddt(∂u∂ydt+∂v∂xdt)

Answer 7

Chapter 4, Problem 73P

To determine

The magnitude of the shear strain rate about point P in the xy plane is given by : εxy=12≥(∂u∂y+∂v∂x).

Answer 8

Expert Solution & Answer

Explanation of Solution

The shear strain rate is half of the rate of decrease of the angle between two perpendicular lines which intersect at the point. Initially at time t1, line a and b are perpendicular and intersect at point P. The angle between line a and b is αa−b at time t2.

The following figure shows the fluid element at time t2.

Fluid Mechanics: Fundamentals and Applications, Chapter 4, Problem 73P

Figure-(1)

At time t2, the point A moves a distance of (u+∂u∂xdx)dt to right and (v+∂v∂xdx)dt to up and the point B moves a distance of (u+∂u∂ydy)dt to the right and (v+∂v∂ydy)dt up. The point P moves a distance of udt to right and vdt up.

Refer to Figure-(I), to obtain the values of the horizontal distance between point P′ and A′ as dx+∂u∂xdxdt, the vertical distance between point P′ and A′ as ∂v∂xdxdt, the horizontal distance between point P′ and B′ as −∂u∂ydydt and the vertical distance between point P′ and B′ as dy+∂v∂ydydt.