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A ring of mass m and radius r rolls with...

A ring of mass m and radius r rolls without slipping on a fixed hemispherical surface of radius R as shown. The time period of small oscillations of ring is `2pisqrt((n(R-r))/(3g))` then find the value of n.

Text Solution

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The correct Answer is:
6
`mv^(2)+mg(R-r)(1-cos theta)=`constant
`=2mv(dv)/(dt)+mg(R-r)sin theta(d theta)/(dt)=0`
`(dv)/(dt)=(-d^(2)theta)/(dt^(2)(R-r)`
`2m(d theta)/(dt)(R-r)(d^(2)theta)/(dt^(2))(R-r)+mg(R-r)sin theta(d theta)/(dt)=0`
`implies(d^(2)theta)/(dt^(2))=(-g theta)/(2(R-r))` (for small `theta, sin theta~~theta`)
`=T=2pisqrt((2(R_r))/g)`
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