A thin uniform squar plate of side 60cm suspended by pivoting at a point on it's periphery and made to oscillate in the vertical plane coinciding the plane of square plate. Which of the following cannot be the time period of small angular oscillations of the plate? take `g=pi^(2)m/s^(2)`

A uniform rod of length 2.0 m is suspended through its endpoint about which it performs small angular oscillations in the vertical plane, its time period is nearly

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 thin uniform square plate ABCD of side a and mass m is suspended in a vertical plane as shown in the figure. AE and BF are two massless inextensible strings. The line AB is horizontal. The tension in AE just after BF is cut will be

Consider a uniform square plate of of side and mass m . The moment of inertia of this plate about an axis perpendicular to its plane and passing through one of its corners is -

A uniform semicircular ring of mass m and radius r is hinged at end A so that it can rotate freely about end A in the vertical plane as shown in the figure. Calculate angle made by line AB with vertical in equilibrium position and time period of small oscillation of ring.

A thin uniform rod of length l is pivoted at its upper end. It is free to swing in a vertical plane. Its time period for oscillation of small amplitude is

A small block oscillates back and forth on a smooth concave surface of radius 1 m . Find the time period of small oscillations.(Take g=π^2ms^(-2) )

A wire frame in the shape of an equilateral triangle is hinged at one vertex so that it can swing freely in a vertical plane, with the plane of the Delta always remaining vertical. The side of the frame is 1//sqrt(3)m . The time period in seconds of small oscillations of the frame will be-

A simple pendulum is taken at a place where its separation from the earth's surface is equal to the radius of the earth. Calculate the time period of small oscillation if the length of the string is 1.0m . Take g = pi^(2) m//s^(2) at the surface of the earth.

A small bar magnet A oscillates in a horizontal plane with a period T at a place where the angle of dip is 60^(@) . When the same needle is made to oscillate in a vertical plane coinciding with the magnetic merdian, its period will be