Calculating Rotational Inertia for a Section of a Right Circular Cylinder

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Homework Help Overview

The discussion revolves around calculating the rotational inertia of a section of a right circular cylinder, specifically focusing on a segment defined by a radius R and an angle 'theta knot' at the origin. The reference axis is positioned at the origin and is perpendicular to the section in question.

Discussion Character

  • Exploratory, Mathematical reasoning, Assumption checking

Approaches and Questions Raised

  • The original poster attempts to apply the formula for rotational inertia using an integral approach, questioning if their direction is correct. Some participants discuss the notation of 'theta knot' versus 'theta naught' and suggest using cylindrical coordinates for the calculations. Others express confusion and seek further suggestions.

Discussion Status

The discussion is ongoing, with participants providing various insights and suggestions regarding the approach to the problem. There is an indication of differing interpretations of the notation and the setup of the problem, but no consensus has been reached yet.

Contextual Notes

Participants are navigating through the complexities of the problem, including the appropriate use of coordinates and the correct interpretation of the variables involved. There is a request for more guidance, indicating potential gaps in understanding or clarity.

brad sue
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Hi,
Please take a look at this:

Calculate the rotational inertia of a section of a right circular cylinder of radius R that subtends an angle of 'theta knot' at the origin when the reference axis is at the origin and perpendicular to the section.

I tried to draw the picture in the attachment.
I tried to use the formula I=Integral(R2*dm), with dm =density*dV
where V is the volume. I would like to know if I am in the good direction

Thank you for your help

B
 

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brad sue said:
Calculate the rotational inertia of a section of a right circular cylinder of radius R that subtends an angle of 'theta knot' at the origin when the reference axis is at the origin and perpendicular to the section.
Lol, isn't it 'theta naught'? As in [itex]\theta_0[/itex]?

[tex]I=\int_V R^2\rho dV[/tex]
is always correct. You should go to cilindrical coordinates for this problem.
 
Help

Hi I am still stuck with with problem of inertia . please can someone help me.
Can you give me more suggestions
Brad
 
If I understand the question correctly, maybe this will help
[tex]\int_V R^2\rho dV =\rho \int_V r^2 r dr d\phi dz[/tex]
 

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