College Physics
College Physics
11th Edition
ISBN: 9781305952300
Author: Raymond A. Serway, Chris Vuille
Publisher: Cengage Learning
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Chapter 8, Problem 50P

Four objects—a hoop, a solid cylinder, a solid sphere, and a thin, spherical shell—each have a mass of 4.80 kg and a radius of 0.230 m. (a) Find the moment of inertia for each object as it rotates about the axes shown in Table 8.1. (b) Suppose each object is rolled down a ramp. Rank the translational speed of each object from highest to lowest, (c) Rank the objects’ rotational kinetic energies from highest to lowest as the objects roll down the ramp.

(a)

Expert Solution
Check Mark
To determine
The moment of inertia of the each of the object it rotates.

Answer to Problem 50P

The moment of inertia of the each of the object it rotates is, hoop is 0.254kgm2 , solid cylinder is 0.127kgm2 , solid sphere is 0.102kgm2 , thin spherical shell is 0.169kgm2 .

Explanation of Solution

Given Info: mass of the hoop mh is 4.80kg   and radius of the hoop rh is 0.230m2

Formula to calculate the moment of inertia of the hoop,

Ih=mhrh2

  • Ih is the moment of inertia of the hoop,
  • mh is the mass of the hoop,
  • rh is the radius of the hoop,

Substitute 4.80kg for mh and 0.230m2 for rh to find Ih ,

Ih=(4.80kg)(0.230m2)2=(4.80kg)(0.0529m2)=0.2539kgm20.254kgm2

The moment of inertia of the hoop is 0.254kgm2

Formula to calculate the moment of inertia of the solid cylinder,

Isc=12mscrsc2

  • Isc is the moment of inertia of the solid cylinder,
  • msc is the mass of the solid cylinder,
  • rsc is the radius of the solid cylinder,

Substitute 4.80kg for msc and 0.230m2 for rsc to find Isc ,

Isc=12[(4.80kg)(0.230m2)2]=12[(4.80kg)(0.0529m2)]=0.1179kgm20.127kgm2

The moment of inertia of the solid cylinder is 0.127kgm2 .

Formula to calculate the moment of inertia of the solid sphere,

Iss=12mssrss2

  • Iss is the moment of inertia of the solid sphere,
  • mss is the mass of the solid sphere,
  • rss is the radius of the solid sphere,

Substitute 4.80kg for mss and 0.230m2 for rss to find Iss ,

Iss=25[(4.80kg)(0.230m2)2]=25[(4.80kg)(0.0529m2)]=0.1015kgm20.102kgm2

Thus, the moment of inertia of the solid sphere is 0.102kgm2

Formula to calculate the moment of inertia of the thin spherical shell,

Itss=12mtssrtss2

  • Itss is the moment of inertia of the thin spherical shell,
  • mtss is the mass of the thin spherical shell,
  • rtss is the radius of the thin spherical shell,

Substitute 4.80kg for mtss and 0.230m for rtss to find Itss ,

Iss=23[(4.80kg)(0.230m2)2]=23[(4.80kg)(0.0529m2)]=0.169kgm2

The moment of inertia of the thin spherical shell is 0.169kgm2

Conclusion:

Therefore, the moment of inertia of the each of the object it rotates is, hoop is 0.254kgm2 , solid cylinder is 0.127kgm2 , solid sphere is 0.102kgm2 , thin spherical shell is 0.169kgm2 .

(b)

Expert Solution
Check Mark
To determine
The translational speed of each of the object from highest to lowest when it rolled down the ramp.

Answer to Problem 50P

The translational speed of each of the object from highest to lowest when it rolled down the ramp is Solid sphere, solid cylinder, thin spherical shell and hoop.

Explanation of Solution

Given Info: M, R, g and θ all have same values for all the objects.

Explanation:

Formula to calculate translational acceleration is,

a=Rα

  • a is the translational acceleration,
  • R is the radius,
  • α is the angular acceleration.

Rearrange in terms of α .

α=aR

The below figure shows the forces acting on the object.

College Physics, Chapter 8, Problem 50P

From Newton’s second law,

ΣFX=Ma

Consider the force diagram,

ΣFX=Mgsinθf

Equate both above force equations,

Ma=Mgsinθf

Formula to calculate the torque is,

τ=Iα

Formula to calculate the torque in terms of f is,

τ=fR

Equate (I) and (II)

fR=Iαf=IαR

Use a/R for α in the above equation to rewrite f.

f=I(a/R)R=IaR2

Substitute Ia/R2 for f in the equation Ma=Mgsinθf to find a,

Ma=MgsinθIaR2a=MgsinθM+I/R2

Since M, R, g and θ all have same values for all the objects.

From the above equation, the translational acceleration increases as the value of the moment of inertia decreases.

Conclusion:

The translational speed of each of the object from highest to lowest when it rolled down the ramp is Solid sphere, solid cylinder, thin spherical shell and hoop.

(c)

Expert Solution
Check Mark
To determine
The rotational kinetic energy of each of the object from highest to lowest when it rolled down the ramp.

Answer to Problem 50P

The rotational kinetic energy of each of the object from highest to lowest when it rolled down the ramp is Hoop, thin spherical shell, solid cylinder , and Solid sphere,

Explanation of Solution

Given Info: M, g and h all have same values for all the objects.

Explanation:

Apply principle of conservation of energy. Potential energy of the object at the top of the incline is equal to the rotational and translational kinetic energy of the object at the bottom of the incline.

KEr+KEt=ΔPEg

  • KEr is the rotational kinetic energy,
  • KEt is the transitional kinetic energy,
  • ΔPEg is the gravitational potential energy.

When the objects roll down frictional force is zero in it and the Transitional kinetic energy is conserved

Use 12Mv2 for KEt and Mgh for ΔPEg in the above equation,

KEr=Mgh12Mv2

  • h is the vertical height of the object from the ground at the top of the ramp
  • v is the translational speed.

M, g and h all have same values for all the objects

From the above equation the rotational kinetic energy decreases as the value of the translational speed increase.

Conclusion:

The rotational kinetic energy of each of the object from highest to lowest when it rolled down the ramp is Hoop, thin spherical shell, solid cylinder , and Solid sphere,

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Chapter 8 Solutions

College Physics

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