Find the period of small oscillations of a uniform rod with length l , pivoted at one end.

A massless rod rigidly fixed at O. A sting carrying a mass m at one end is attached to point A on the rod so that OA = a . At another point B(OB = b) of the rod, a horizontal spring of force constant k is attached as shown. Find the period of small vertical oscillations of mass m around its euqilibrium position.

Time period of a simple pendulum of length L is T_(1) and time period of a uniform rod of the same length L pivoted about an end and oscillating in a vertical plane is T_(2) . Amplitude of osciallations in both the cases is small. Then T_(1)/T_(2) is

A long uniform rod of length L and mass M is free to rotate in a horizontal plane about a vertical axis through its one end 'O'. A spring of force constant k is connected between one end of the rod and PQ . When the rod is in equilibrium it is parallel to PQ . (a)What is the period of small oscillation that result when the rod is rotated slightly and released ? (b) What will be the maximum speed of the displacement end of the rod, if the amplitude of motion is theta_(0) ?

If the angular frequency of small oscillations of a thin uniform vertical rod of mass m and length l hinged at the point O (Fig.) is sqrt((n)/(l)) , then find n . The force constant for each spring is K//2 and take K = (2mg)/(l) . The springs are of negiligible mass. (g = 10 m//s^(2))

A disc of radius R is pivoted at its rim. The period for small oscillations about an axis perpendicular to the plane of disc is

A solid cylinder of mass m length L and radius R is suspended by means of two ropes of length l each as shown. Find the time period of small angular oscillations of the cylinder about its axis AA'

A uniform meter stick is suspended through a small pin hole at the 10 cm mark. Find the time period of small oscillation about the point of suspension.

The radius of gyration of an uniform rod of length l about an axis passing through one of its ends and perpendicular to its length is.

Two particle of mass m each are fixed to a massless rod of length 2l . The rod is hinged at one end about a smooth hinge and it performs oscillations of small angle in vertical plane. The length of the equivalent simple pendulum is:

A light rigid rod of mass M, and length L is pivoted at one of its end. The rod can swing freely in the vertical plane through a horizontal axis passing through the pivot. Show that the time period of the rod about the pivot is T = pi sqrt((2L)/(3g))