Passage VIII A disc of mass m and radius...

Passage VIII A disc of mass m and radius R is attached with a spring of force contant k at its center as shown in figure. At x-0, spring is unstretched. The disc is moved to x=A and then released. There is no slipping between disc and ground. Let f be the force of friction on the disc from the ground.

f versus t (time) graph will be as

Verified by Experts

The correct Answer is:

`kx -f = ma, fR = ((mR^(2))/(2)) alpha = f = 1/3 kx`
But `x = A cos omegat`
(`:.` the cylinder is starting from `x = A`)
So `f = (kA)/(3) cos omegat`

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A uniform disc of mass m & radius R is pivoted at its centre O with its plane vertical as shown in figure A circular portion of disc of radius (R)/(2) is removed from it. Then choose the correct option(s)

Time period of small oscillations of remaining portion about `O` is `pisqrt((13R)/(g))`

Time period of small oscillations of remaining portion about `O` is `2pisqrt((13R)/(g))`

The centre of mass of the remaining disc is at a distance of `(R)/(6)` from `O`.

The centre of mass of the remaining disc is at a distance of `(R)/(8)` from `O`.

`2pi sqrt((M)/(K))`

`2pi sqrt((3M)/(K))`

`2pi sqrt((M)/(2K))`

`2pi sqrt((3M)/(2K))`

`(F)/(2)`

`(F)/(4)`

`(F)/(3)`

`(2F)/(3)`