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Question

From a uniform circular disc of radius R and mass 9M, a small disc of radius R/3 is removed as shown in the figure. The moment of inertia of the remaining disc about an axis perpendicular to the plane of the disc and passing through centre of disc is:


A

10MR2

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B

379MR2

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C

4MR2

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D

409MR2

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Solution

The correct option is C

4MR2


Step 1. Given data

Mass of circular disc is, 9M

Radius of disc is, R

Radius of small disc removed is, R/3

Step 2: Calculating mass of small disc

Mass per unit area of disc is, 9MπR2

Mass of small disc is

9MπR2×areaofsmalldisc=9MπR2×πR32=M

Step 3: Finding the moment of inertia

According to parallel axis theorem the moment of inertia about a point at a distance is, Ih=I+Mh2,

Where I is the moment of inertia about centre andh is the distance between the two axis.

The moment of inertia of a small disc about the centre of original disc is MR322+M2R32

Moment of inertia of remaining disc is the difference between moment of inertia of original disc about centre and Moment of inertia of small disc about the centre of original disc is

I=9MR22-MR322+M2R32I=9MR22-MR218+4M9R2I=MR229-19-89I=MR228=4MR2

Hence, option C is correct.


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