A uniform disc of mass m and radius R=8023π2 is pivoted smoothly at point P. If another uniform ring of mass m and radius R is welded at the lowest point of the disc, the time period (in seconds) of the SHM of the system is
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Solution
COM of the and ring are at A and B respectively.
Hence, centre of mass of system lies at C. [∵ycm=m(R)+m(3R)m+m=2R]
The whole system behaves as a physical pendulum.
So, T=2π√Imgd
where d=2R I=IP= moment of inertia about hinged point
& d= distance of COM from hinge point.
So, IP=(Idisc)P+(Iring)P IP=(32mR2)+(mR2+m×(3R)2)=232mR2 ⇒T=2π
⎷232mR2(2m)g(2R)=2π√23R8g ⇒T=2π√238×10.8023π2=2sec