Home | Sign Up | Log In | RSSThursday, 2018-12-13, 7:05 AM


Site menu
Section categories
Education [150]
Videos [1]
Music [0]
Chat Box
learn c language learn c language branching and loop learn c language functions learn c language Pointer Basics how web page works Oracle Solaris 10 Oracle Solaris 10 How Web Pages Work Images How Web Pages Work Adding images&gr How Web Pages Work Introduction to How to Install WAMP How to Host Your Own Website for Fr How to Install the Apache Web Serve Atomic Structure The text provides 000 tons of conversations Introduction to How Radio Works Rad often over millions of miles citizens band radio Introduction to How the Radio Spect Can information travel faster than How F-15s Work by Tom Harris Browse How F/A-18s Work by Robert Valdes B How F/A-18s Work by Robert Valdes B Flying Video Game: In the Cockpit I How F/A-22 Raptors Work by Gary Wol 10 Unidentified Sounds That Scienti 10 Things You Didn't Know About Ein Is glass really a liquid? by Laurie How Radio Works by Marshall Brain B How Radio Works by Marshall Brain B 10 Most Terrifying Vehicle Manufact How a Top Fuel Dragster Works by Ch but can Siri meet our nee How Siri Works by Bernadette Johnso How the Tesla Turbine Works by Will Lecture 1: Inflationary Cosmology: Lecture 2: Inflationary Cosmology: Lecture 4: The Kinematics of the Ho Lecture 5: Cosmological Redshift an Lecture 6: The Dynamics of Homogene Lecture 7: The Dynamics of Homogene Lecture 8: The Dynamics of Homogene Lecture 9: The Dynamics of Homogene Lecture 10: Introduction to Non-Euc IBPS Clerical Cadre Exam Pattern De Institute of Banking Personnel Sele Educational Qualifications: A Degre INTERVIEW Candidates who have been official trailer for Mission Imposs How Relativity Connects Electric an in 1738 Kinetic Theory of Gases: A Brief Re Frames of Reference and Newton’s La attempts to measure the UVa Physics 12/1/07 “Moving Clocks Run Slow” pl More Relativity: The Train and the 12/1/07 The Formula If I walk from Adding Velocities: A Walk on the Tr 3/1/2008 The Story So Far: A Brief Mass and Energy Michael Fowler Energy and Momentum in Lorentz Tran How Relativity Connects Electric an Analyzing Waves on a String Michael by f even earlier than the bra Fermat's Principle of Least Time 9/ Hamilton's Principle and Noether's meaning they have Mechanical Similarity and the Viria Hamilton's Equations 9/10/15 A Dyna A New Way to Write the Action Integ Maupertuis came up with a kind of p Maupertuis' Principle: Minimum Acti Canonical Transformations Point Tra Introduction to Liouville's Theorem Adiabatic Invariants and Action-Ang Hyperbolas Michael Fowler Prelimina Mathematics for Orbits: Ellipses Keplerian Orbits Michael Fowler Pre Newton's equations for particle mot Dynamics of Motion in a Central Pot A Vectorial Approach: Hamilton's Eq Elastic Scattering Michael Fowler B Driven Oscillator Michael Fowler (c Dynamics of a One-Dimensional Cryst I usefor the spring constant (is a a mass on a spring Motion in a Rapidly Oscillating Fie Anharmonic Oscillators Michael Fowl in which the distance betw Motion of a Rigid Body: the Inertia Moments of Inertia: Examples Michae Euler's Angles Michael Fowler Intro or more precisely one our analysis of rotational motion h Euler's Equations Michael Fowler In Motion in a Non-inertial Frame of R Ball Rolling on Tilted Turntable Mi live cricket score roll the ball ba

Total online: 1
Guests: 1
Users: 0
Home » 2017 » September » 1 » Moments of Inertia: Examples
1:47 AM
Moments of Inertia: Examples

 Moments of Inertia: Examples

Michael Fowler


The moment of inertia of the hydrogen molecule was historically important. It's trivial to find: the nuclei (protons) have 99.95% of the mass, so a classical picture of two point masses a fixed distanceapart gives  In the nineteenth century, the mystery was that equipartition of energy, which gave an excellent account of the specific heats of almost all gases, didn't work for hydrogen -- at low temperatures, apparently these diatomic molecules didn't spin around, even though they constantly collided with each other. The resolution was that the moment of inertia was so low that a lot of energy was needed to excite the first quantized angular momentum state, . This was not the case for heavier diatomic gases, since the energy of the lowest angular momentum state  is lower for molecules with bigger moments of inertia .

Here's a simple planar molecule:

https://encrypted-tbn3.gstatic.com/images?q=tbn:ANd9GcSv_zfCqqZNmiAoe42be5Xw_5uXBKmxlQ1OwAtWJo5oAiAoqMnxObviously, one principal axis is through the centroid, perpendicular to the plane. We've also established that any axis of symmetry is a principal axis, so there are evidently three principal axes in the plane, one along each bond! The only interpretation is that there is a degeneracy: there are two equal-value principal axes in the plane, and any two perpendicular axes will be fine. The moment of inertial about either of these axes will be one-half that about the perpendicular-to-the-plane axis.


What about a symmetrical three dimensional molecule?


Here we have four obvious principal axes: only possible if we have spherical degeneracy, meaning all three principal axes have the same moment of inertia.






Various Shapes

A thin rod, linear mass density , length :

A square of mass, side, about an axis in its plane, through the center, perpendicular to a side:  (It's just a row of rods.) in fact, the moment is the same about any line in the plane through the center, from the symmetry, and the moment about a line perpendicular to the plane through the center is twice this -- that formula will then give the moment of inertia of a cube, about any axis through its center.

A disc of mass , radius  and surface density  has

This is also correct for a cylinder (think of it as a stack of discs) about its axis.

A disc about a line through its center in its plane must be  from the perpendicular axis theorem. A solid cylinder about a line through its center perpendicular to its main axis can be regarded as a stack of discs, of radius, height , taking the mass of a disc as , and using the parallel axes theorem,

For a sphere, a stack of discs of varying radii,

An ellipsoid of revolution and a sphere of the same mass and radius clearly have the same motion of inertial about their common axis (shown).


Moments of Inertia of a Cone

Following Landau, we take height , base radius, and semivertical angleso that .

As a preliminary, the volume of the cone is

The center of mass is distancefrom the vertex, where

The moment of inertia about the axis  of the cone is (taking density) that of a stack of discs each having mass  and moment of inertia :

The moment of inertia about the axis  through the vertex, perpendicular to the central axis, can be calculated using the stack-of-discs parallel axis approach, the discs having mass , it is

Analyzing Rolling Motion

Kinetic Energy of a Cone Rolling on a Plane

(This is from Landau.)

The cone rolls without slipping on the horizontal plane. The momentary line of contact with the plane is , at an angle  in the horizontal plane from theaxis.

The important point is that this line of contact, regarded as part of the rolling cone, is momentarily at rest when it's in contact with the plane. This means that, at that moment, the cone is rotating about the stationary line Therefore, the angular velocity vector  points along .

Taking the cone to have semi-vertical angle (meaning this is the angle between  and the central axis of the cone) the center of mass, which is a distance  from the vertex, and on the central line, moves along a circle at height  above the plane, this circle being centered on the  axis, and having radius . The center of mass moves at velocity , so contributes translational kinetic energy  .

Now visualize the rolling cone turning around the momentarily fixed line : the center of mass, at height , moves at , so the angular velocity 

Now define a new set of axes with origin : one, , is the cone's own center line, another, , is perpendicular to that and to , this determines . (For these last two, since they're through the vertex, the moment of inertia is the one worked out in the previous section.)

Since  is along , its components with respect to these axes are .

The total kinetic energy is


Rolling Without Slipping: Two Views

Think of a hoop, mass , radius, rolling along a flat plane at speed . It has translational kinetic energy angular velocity  and moment of inertia  so its angular kinetic energy , and its total kinetic energy is .

But we could also have thought of it as rotating about the point of contact -- remember, that point of the hoop is momentarily at rest. The angular velocity would again be , but now with moment of inertia, from the parallel axes theorem, , giving same total kinetic energy, but now all rotational.

Cylinder Rolling Inside another Cylinder

Now consider a solid cylinder radiusrolling inside a hollow cylinder radius, angular distance from the lowest point , the solid cylinder axis moving at , and therefore having angular velocity (compute about the point of contact) 

The kinetic energy is


The potential energy is .

The Lagrangian , the equation of motion is


so small oscillations are at frequency


Category: Education | Views: 269 | Added by: farrel | Tags: Moments of Inertia: Examples Michae | Rating: 0.0/0
Total comments: 0
Name *:
Email *:
Code *:
Log In
Entries archive

Copyright eduCampus.tk © 2018
Powered by uCoz