A solid sphere of mass 3 kg and diameter 0.2 m is suspended from a wire. The torque required to twist the wire is `5xx10^(-2)` Nm/radian. Calculate the period of oscillation

A uniform circular disc of moment of inertia 7.35 xx 10^(-3)kg m^(2) is suspended by a wire of length 1 m and executes torsional oscillations. The couple per unit twist of the wire is 2 xx 10^(-2) N/m. Calculate the period of oscillation ?

A solid sphere is suspended from a wire and is made to execute torsional oscillations with a period of 2 second. The torque required to twist the wire through unit radian is 6 xx10^(-2) N/m. Calculate the moment of inertia of the sphere about the axis of rotation.

A thin uniform rod of mass 1 kg and length 12 cm is suspended by a wire that passes through its centre and is perpendicular to its length.The wire is twisted and the rod is set oscillating. Time period of oscillation is found to be 3 s. When a flat triangular plate is suspended in same way through its centre of mass, the time period is found to be 6 s. The moment of inertia of the tringular plate about this axis is

A circular disc of mass 10kg is suspended by a wire attahced to its centre. The wire is twisted by rotating the disc and released. The period of torsional oscillations is found to be 1.5s. The radius of the disc is 15cm. Determing the torsional spring constant of the wire. (Torsional spring constant alpha is definied by the relation J=-alphatheta , where J is the restoring coubple and theta the angle of twist.

A uniform solid sphere of mass m and radius R is suspended in vertical plane from a point on its periphery. The time period of its oscillation is

A body of mass 3.14 kg is suspended from one end of a wire of length 10 m . The radius of cross-section of the wire is changing uniformly from 5xx10^(-4) m at the top (i.e. point of suspension) to 9.8xx10^(-4) m at the bottom . Young's modulus of elasticity is 2xx10^(11) N//m^(2) . The change in length of the wire is

A disc of mass 1 kg and radius 10 cm is suspended by vertical wire at its centre. If the time period is 3.2 s. Find the modulus of torison.

A uniform wire of length 10m and diameter 0.8 mm stretched 5 mm under a certain force . If the change in diameter is 10 xx 10^(-8) m , calculate the Poissson's ratio.

A sphere of radius 10 cm and mass 25 kg is attached to the lower end of a steel wire of length 5 m and diameter 4 mm which is suspended from the ceiling of a room . The point of support is 521 cm above the floor. When the sphere is set swinging as a simple pendulum, its lowest point just grazes the floor. Calculate the velocity of the ball at its lowest position (Y_(steel) = 2xx10^(11) N//m^(2)) .

A uniform disc of mass m and radius r is suspended through a wire attached to its Centre. If the time period of the torsional oscillations be T, what is the torsional constant of the wire?