To prove the relation for system.

Question

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Answer 1

Question

Chapter 16, Problem 82PQ

To determine

To prove the relation for system.

Expert Solution & Answer

Answer to Problem 82PQ

The solution to the equation is Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky_.

Explanation of Solution

Write the expression for the given solution of the equation.

y(t)=Adrvcos(ωdrvt+ϕdrv) (I)

Here, y(t) is the instantaneous displacement, Adrv is the amplitude, ωdrv is the angular frequency, t is the time and ϕdrv is the phase angle.

Write the expression for the equation.

Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky (II)

Here, Fmax is the maximum force, (d2y/dt2) is the second derivative and (dy/dt) is the first derivative.

Write the expression for the angular frequency.

ωdrv=km (III)

Here, k is wave vector and m is mass.

Conclusion:

Taking first and second derivative from equation (I).

dydt=−ωdrvAdrvsin(ωdrvt+ϕdrv) (IV)

d2ydt2=−ωdrv2Adrvcos(ωdrvt+ϕdrv) (V)

Substitute −ωdrvAdrvsin(ωdrvt+ϕdrv) for dydt, −ωdrv2Adrvcos(ωdrvt+ϕdrv) for d2ydt2 and Adrvcos(ωdrvt+ϕdrv) for y(t) in Equation (II) to find Fmaxcos(ωdrvt).

Fmaxcos(ωdrvt)=(m[−ωdrv2Adrvcos(ωdrvt+ϕdrv)]+b[−ωdrvAdrvsin(ωdrvt+ϕdrv)]+k[Adrvcos(ωdrvt+ϕdrv)]) (VI)

Using trigonometric identity and comparing both side the components of sine and cosine terms.

Fmax=Adrv[(k−mωdrv2)cos(ϕdrv)−bωdrvsinϕdrv] (VII)

0=Adrv[−(k−mωdrv2)sin(ϕdrv)−bωdrvcosϕdrv] (VIII)

Write the expression for the trigonometric identities by using equation (VIII).

tan(ϕdrv)=−bωdrvk−mωdrv2 (IX)

sin(ϕdrv)=−bωdrv(bωdrv)2+(k−mωdrv2)2 (X)

cos(ϕdrv)=(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 (XI)

Substitute −bωdrv(bωdrv)2+(k−mωdrv2)2 for sin(ϕdrv) and (k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 for cos(ϕdrv) in equation (VII) to find Adrv.

Fmax=Adrv[(k−mωdrv2)[(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2]−bωdrv[−bωdrv(bωdrv)2+(k−mωdrv2)2]]=Adrv(bωdrv)2+m2(ω2−ωdrv2)Adrv=Fmax(bωdrv)2+m2(ω2−ωdrv2)

Thus, the solution is satisfying both side of the equation.

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Answer 2

Question

Chapter 16, Problem 82PQ

To determine

To prove the relation for system.

Expert Solution & Answer

Answer to Problem 82PQ

The solution to the equation is Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky_.

Explanation of Solution

Write the expression for the given solution of the equation.

y(t)=Adrvcos(ωdrvt+ϕdrv) (I)

Here, y(t) is the instantaneous displacement, Adrv is the amplitude, ωdrv is the angular frequency, t is the time and ϕdrv is the phase angle.

Write the expression for the equation.

Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky (II)

Here, Fmax is the maximum force, (d2y/dt2) is the second derivative and (dy/dt) is the first derivative.

Write the expression for the angular frequency.

ωdrv=km (III)

Here, k is wave vector and m is mass.

Conclusion:

Taking first and second derivative from equation (I).

dydt=−ωdrvAdrvsin(ωdrvt+ϕdrv) (IV)

d2ydt2=−ωdrv2Adrvcos(ωdrvt+ϕdrv) (V)

Substitute −ωdrvAdrvsin(ωdrvt+ϕdrv) for dydt, −ωdrv2Adrvcos(ωdrvt+ϕdrv) for d2ydt2 and Adrvcos(ωdrvt+ϕdrv) for y(t) in Equation (II) to find Fmaxcos(ωdrvt).

Fmaxcos(ωdrvt)=(m[−ωdrv2Adrvcos(ωdrvt+ϕdrv)]+b[−ωdrvAdrvsin(ωdrvt+ϕdrv)]+k[Adrvcos(ωdrvt+ϕdrv)]) (VI)

Using trigonometric identity and comparing both side the components of sine and cosine terms.

Fmax=Adrv[(k−mωdrv2)cos(ϕdrv)−bωdrvsinϕdrv] (VII)

0=Adrv[−(k−mωdrv2)sin(ϕdrv)−bωdrvcosϕdrv] (VIII)

Write the expression for the trigonometric identities by using equation (VIII).

tan(ϕdrv)=−bωdrvk−mωdrv2 (IX)

sin(ϕdrv)=−bωdrv(bωdrv)2+(k−mωdrv2)2 (X)

cos(ϕdrv)=(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 (XI)

Substitute −bωdrv(bωdrv)2+(k−mωdrv2)2 for sin(ϕdrv) and (k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 for cos(ϕdrv) in equation (VII) to find Adrv.

Fmax=Adrv[(k−mωdrv2)[(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2]−bωdrv[−bωdrv(bωdrv)2+(k−mωdrv2)2]]=Adrv(bωdrv)2+m2(ω2−ωdrv2)Adrv=Fmax(bωdrv)2+m2(ω2−ωdrv2)

Thus, the solution is satisfying both side of the equation.

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Answer 3

Question

Chapter 16, Problem 82PQ

To determine

To prove the relation for system.

Expert Solution & Answer

Answer to Problem 82PQ

The solution to the equation is Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky_.

Explanation of Solution

Write the expression for the given solution of the equation.

y(t)=Adrvcos(ωdrvt+ϕdrv) (I)

Here, y(t) is the instantaneous displacement, Adrv is the amplitude, ωdrv is the angular frequency, t is the time and ϕdrv is the phase angle.

Write the expression for the equation.

Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky (II)

Here, Fmax is the maximum force, (d2y/dt2) is the second derivative and (dy/dt) is the first derivative.

Write the expression for the angular frequency.

ωdrv=km (III)

Here, k is wave vector and m is mass.

Conclusion:

Taking first and second derivative from equation (I).

dydt=−ωdrvAdrvsin(ωdrvt+ϕdrv) (IV)

d2ydt2=−ωdrv2Adrvcos(ωdrvt+ϕdrv) (V)

Substitute −ωdrvAdrvsin(ωdrvt+ϕdrv) for dydt, −ωdrv2Adrvcos(ωdrvt+ϕdrv) for d2ydt2 and Adrvcos(ωdrvt+ϕdrv) for y(t) in Equation (II) to find Fmaxcos(ωdrvt).

Fmaxcos(ωdrvt)=(m[−ωdrv2Adrvcos(ωdrvt+ϕdrv)]+b[−ωdrvAdrvsin(ωdrvt+ϕdrv)]+k[Adrvcos(ωdrvt+ϕdrv)]) (VI)

Using trigonometric identity and comparing both side the components of sine and cosine terms.

Fmax=Adrv[(k−mωdrv2)cos(ϕdrv)−bωdrvsinϕdrv] (VII)

0=Adrv[−(k−mωdrv2)sin(ϕdrv)−bωdrvcosϕdrv] (VIII)

Write the expression for the trigonometric identities by using equation (VIII).

tan(ϕdrv)=−bωdrvk−mωdrv2 (IX)

sin(ϕdrv)=−bωdrv(bωdrv)2+(k−mωdrv2)2 (X)

cos(ϕdrv)=(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 (XI)

Substitute −bωdrv(bωdrv)2+(k−mωdrv2)2 for sin(ϕdrv) and (k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 for cos(ϕdrv) in equation (VII) to find Adrv.

Fmax=Adrv[(k−mωdrv2)[(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2]−bωdrv[−bωdrv(bωdrv)2+(k−mωdrv2)2]]=Adrv(bωdrv)2+m2(ω2−ωdrv2)Adrv=Fmax(bωdrv)2+m2(ω2−ωdrv2)

Thus, the solution is satisfying both side of the equation.

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Answer 4

Question

Chapter 16, Problem 82PQ

To determine

To prove the relation for system.

Expert Solution & Answer

Answer to Problem 82PQ

The solution to the equation is Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky_.

Explanation of Solution

Write the expression for the given solution of the equation.

y(t)=Adrvcos(ωdrvt+ϕdrv) (I)

Here, y(t) is the instantaneous displacement, Adrv is the amplitude, ωdrv is the angular frequency, t is the time and ϕdrv is the phase angle.

Write the expression for the equation.

Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky (II)

Here, Fmax is the maximum force, (d2y/dt2) is the second derivative and (dy/dt) is the first derivative.

Write the expression for the angular frequency.

ωdrv=km (III)

Here, k is wave vector and m is mass.

Conclusion:

Taking first and second derivative from equation (I).

dydt=−ωdrvAdrvsin(ωdrvt+ϕdrv) (IV)

d2ydt2=−ωdrv2Adrvcos(ωdrvt+ϕdrv) (V)

Substitute −ωdrvAdrvsin(ωdrvt+ϕdrv) for dydt, −ωdrv2Adrvcos(ωdrvt+ϕdrv) for d2ydt2 and Adrvcos(ωdrvt+ϕdrv) for y(t) in Equation (II) to find Fmaxcos(ωdrvt).

Fmaxcos(ωdrvt)=(m[−ωdrv2Adrvcos(ωdrvt+ϕdrv)]+b[−ωdrvAdrvsin(ωdrvt+ϕdrv)]+k[Adrvcos(ωdrvt+ϕdrv)]) (VI)

Using trigonometric identity and comparing both side the components of sine and cosine terms.

Fmax=Adrv[(k−mωdrv2)cos(ϕdrv)−bωdrvsinϕdrv] (VII)

0=Adrv[−(k−mωdrv2)sin(ϕdrv)−bωdrvcosϕdrv] (VIII)

Write the expression for the trigonometric identities by using equation (VIII).

tan(ϕdrv)=−bωdrvk−mωdrv2 (IX)

sin(ϕdrv)=−bωdrv(bωdrv)2+(k−mωdrv2)2 (X)

cos(ϕdrv)=(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 (XI)

Substitute −bωdrv(bωdrv)2+(k−mωdrv2)2 for sin(ϕdrv) and (k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 for cos(ϕdrv) in equation (VII) to find Adrv.

Fmax=Adrv[(k−mωdrv2)[(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2]−bωdrv[−bωdrv(bωdrv)2+(k−mωdrv2)2]]=Adrv(bωdrv)2+m2(ω2−ωdrv2)Adrv=Fmax(bωdrv)2+m2(ω2−ωdrv2)

Thus, the solution is satisfying both side of the equation.

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Answer 5

Chapter 16, Problem 82PQ

To determine

To prove the relation for system.

Expert Solution & Answer

Answer to Problem 82PQ

The solution to the equation is Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky_.

Explanation of Solution

Write the expression for the given solution of the equation.

y(t)=Adrvcos(ωdrvt+ϕdrv) (I)

Here, y(t) is the instantaneous displacement, Adrv is the amplitude, ωdrv is the angular frequency, t is the time and ϕdrv is the phase angle.

Write the expression for the equation.

Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky (II)

Here, Fmax is the maximum force, (d2y/dt2) is the second derivative and (dy/dt) is the first derivative.

Write the expression for the angular frequency.

ωdrv=km (III)

Here, k is wave vector and m is mass.

Conclusion:

Taking first and second derivative from equation (I).

dydt=−ωdrvAdrvsin(ωdrvt+ϕdrv) (IV)

d2ydt2=−ωdrv2Adrvcos(ωdrvt+ϕdrv) (V)

Substitute −ωdrvAdrvsin(ωdrvt+ϕdrv) for dydt, −ωdrv2Adrvcos(ωdrvt+ϕdrv) for d2ydt2 and Adrvcos(ωdrvt+ϕdrv) for y(t) in Equation (II) to find Fmaxcos(ωdrvt).

Fmaxcos(ωdrvt)=(m[−ωdrv2Adrvcos(ωdrvt+ϕdrv)]+b[−ωdrvAdrvsin(ωdrvt+ϕdrv)]+k[Adrvcos(ωdrvt+ϕdrv)]) (VI)

Using trigonometric identity and comparing both side the components of sine and cosine terms.

Fmax=Adrv[(k−mωdrv2)cos(ϕdrv)−bωdrvsinϕdrv] (VII)

0=Adrv[−(k−mωdrv2)sin(ϕdrv)−bωdrvcosϕdrv] (VIII)

Write the expression for the trigonometric identities by using equation (VIII).

tan(ϕdrv)=−bωdrvk−mωdrv2 (IX)

sin(ϕdrv)=−bωdrv(bωdrv)2+(k−mωdrv2)2 (X)

cos(ϕdrv)=(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 (XI)

Substitute −bωdrv(bωdrv)2+(k−mωdrv2)2 for sin(ϕdrv) and (k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 for cos(ϕdrv) in equation (VII) to find Adrv.

Fmax=Adrv[(k−mωdrv2)[(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2]−bωdrv[−bωdrv(bωdrv)2+(k−mωdrv2)2]]=Adrv(bωdrv)2+m2(ω2−ωdrv2)Adrv=Fmax(bωdrv)2+m2(ω2−ωdrv2)

Thus, the solution is satisfying both side of the equation.

Answer 6

Chapter 16, Problem 82PQ

To determine

To prove the relation for system.

Expert Solution & Answer

Answer to Problem 82PQ

The solution to the equation is Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky_.

Explanation of Solution

Write the expression for the given solution of the equation.

y(t)=Adrvcos(ωdrvt+ϕdrv) (I)

Here, y(t) is the instantaneous displacement, Adrv is the amplitude, ωdrv is the angular frequency, t is the time and ϕdrv is the phase angle.

Write the expression for the equation.

Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky (II)

Here, Fmax is the maximum force, (d2y/dt2) is the second derivative and (dy/dt) is the first derivative.

Write the expression for the angular frequency.

ωdrv=km (III)

Here, k is wave vector and m is mass.

Conclusion:

Taking first and second derivative from equation (I).

dydt=−ωdrvAdrvsin(ωdrvt+ϕdrv) (IV)

d2ydt2=−ωdrv2Adrvcos(ωdrvt+ϕdrv) (V)

Substitute −ωdrvAdrvsin(ωdrvt+ϕdrv) for dydt, −ωdrv2Adrvcos(ωdrvt+ϕdrv) for d2ydt2 and Adrvcos(ωdrvt+ϕdrv) for y(t) in Equation (II) to find Fmaxcos(ωdrvt).

Fmaxcos(ωdrvt)=(m[−ωdrv2Adrvcos(ωdrvt+ϕdrv)]+b[−ωdrvAdrvsin(ωdrvt+ϕdrv)]+k[Adrvcos(ωdrvt+ϕdrv)]) (VI)

Using trigonometric identity and comparing both side the components of sine and cosine terms.

Fmax=Adrv[(k−mωdrv2)cos(ϕdrv)−bωdrvsinϕdrv] (VII)

0=Adrv[−(k−mωdrv2)sin(ϕdrv)−bωdrvcosϕdrv] (VIII)

Write the expression for the trigonometric identities by using equation (VIII).

tan(ϕdrv)=−bωdrvk−mωdrv2 (IX)

sin(ϕdrv)=−bωdrv(bωdrv)2+(k−mωdrv2)2 (X)

cos(ϕdrv)=(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 (XI)

Substitute −bωdrv(bωdrv)2+(k−mωdrv2)2 for sin(ϕdrv) and (k−mωdrv2)(bωdrv)2+(k−mωdrv2)2 for cos(ϕdrv) in equation (VII) to find Adrv.

Fmax=Adrv[(k−mωdrv2)[(k−mωdrv2)(bωdrv)2+(k−mωdrv2)2]−bωdrv[−bωdrv(bωdrv)2+(k−mωdrv2)2]]=Adrv(bωdrv)2+m2(ω2−ωdrv2)Adrv=Fmax(bωdrv)2+m2(ω2−ωdrv2)

Thus, the solution is satisfying both side of the equation.

Answer 7

Chapter 16, Problem 82PQ

To determine

To prove the relation for system.

Answer 8

Expert Solution & Answer

Answer to Problem 82PQ

The solution to the equation is Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky_.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Write the expression for the given solution of the equation.

y(t)=Adrvcos(ωdrvt+ϕdrv) (I)

Here, y(t) is the instantaneous displacement, Adrv is the amplitude, ωdrv is the angular frequency, t is the time and ϕdrv is the phase angle.

Write the expression for the equation.

Fmaxcos(ωdrvt)=m(d2y/dt2)+b(dy/dt)+ky (II)

Here, Fmax is the maximum force, (d2y/dt2) is the second derivative and (dy/dt) is the first derivative.

Write the expression for the angular frequency.

ωdrv=km (III)

Here, k is wave vector and m is mass.

Conclusion:

Taking first and second derivative from equation (I).

dydt=−ωdrvAdrvsin(ωdrvt+ϕdrv) (IV)

d2ydt2=−ωdrv2Adrvcos(ωdrvt+ϕdrv) (V)

Substitute −ωdrvAdrvsin(ωdrvt+ϕdrv) for dydt, −ωdrv2Adrvcos(ωdrvt+ϕdrv) for d2ydt2 and Adrvcos(ωdrvt+ϕdrv) for y(t) in Equation (II) to find Fmaxcos(ωdrvt).