A rigid rod of mass m and lengths l, is being rotated in horizontal plane about a vertical axis, passing through one end A. If `T_(A), T_(B) and T_(C)` are the tensions in rod at point A, mid point B and point C of rod repsectively, then

A uniform rod of mass m and length l rotates in a horizontal plane with an angular velocity omega about a vertical axis passing through one end. The tension in the rod at a distance x from the axis is

A uniform rod of length l is being rotated in a horizontal plane with a constant angular speed about an axis passing through one of its ends. If the tension generated in the rod due to rotation is T(x) at a distance x from the axis. Then which of the following graphs depicts it most closely?

A uniform rod of mass m and length L is free to rotate in the vertical plane about a horizontal axis passing through its end. The rod initially in horizontal position is released. The initial angular acceleration of the rod is:

A thin uniform copper rod of length l and mass m rotates uniformly with an angular velocity omega in a horizontal plane about a vertical axis passing through one of its ends. Determine the tension in the rod as a function of the distance r from the rotation axis. Find the elongation of the rod.

A uniform rod of mass m and length L lies radialy on a disc rotating with angular speed omega in a horizontal plane about vertical axis passing thorugh centre of disc. The rod does not slip on the disc and the centre of the rod is at a distance 2L from the centre of the disc. them the kinetic energy of the rod is

A uniform rod of length l , mass m , cross-sectional area A and Young's modulus Y is rotated in horizontal plane about a fixed vertical axis passing through one end, with a constant angular velocity omega . Find the total extension in the rod due to the tension produced in the rod.

AB is a mass less rigid rod of length 2l. It is free to rotate in vertical plane about a horizontal axis passing through its end A. Equal point masses (m each) are stuck at the centre C and end Bof the rod. The rod is released from horizontal position. Write the tension in the rod when it becomes vertical.

A uniform rod of mass m and length l_(0) is rotating with a constant angular speed omega about a vertical axis passing through its point of suspension. Find the moment of inertia of the rod about the axis of rotation if it make an angle theta to the vertical (axis of rotation).

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) ?

A thin uniform rod of mass M and length L. Find the radius of gyration for rotation about an axis passing through a point at a distance of (L )/(4 ) from centre and perpendicular to rod.