A uniform rod of mass m and length l is suspended about its end. Time period of small angular oscillations is

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 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 rod of mass m and length l is suspended through a light wire of length l and torsional constant k as shown in figure. Find the time perid iof the system makes a. small oscillations in the vertical plane about the suspension point and b. angular oscillations in the horizontal plane about the centre of the rod.

A uniform rod of mass m and length l is suspended through a light wire of length l and torsional constant k as shown in figure. Find the time perid iof the system makes a. small oscillations in the vertical plane about the suspension point and b. angular oscillations in the horizontal plane about the centre of the rod.

A uniform rod of mass m and length l is suspended through a light wire of length l and torsional constant k as shown in figure. Find the time period of the system makes small oscillations in the vertical plane about the suspension point .

A uniform rod of mass and length l is suspended by two strings at its ends shown. When one of the strings is cut, the rod starts falling with an initial angular acceleration.

A uniform rod of mass and length l is suspended by two strings at its ends shown. When one of the strings is cut, the rod starts falling with an initial angular acceleration.

A uniform rod of length l is suspended by end and is made to undego small oscillations. Find the length of the simple pendulum having the time period equal to that of the rod.

A uniform rod of length l is suspended by end and is made to undego small oscillations. Find the length of the simple pendulum having the time period equal to that of the rod.

A thin rod of mass m and length l is suspended from one of its ends. It is set into oscillation about a horizontal axis. Its angular speed is omega while passing through its mean position. How high will its centre of mass rise from its lowest position ?