A uniform metallic rod rotates about its perpendicular bisector with constant angular speed. If it is heated uniformly to raise its temperature slightly

A uniform metallic rod rotates about its perpendicular bisector with constant angualr speed. If it is heated uniformly to raise its temperature slightly, then

A uniform metallic rod rotates about its perpendicular bisector with constant angualr speed. If it is heated uniformly to raise its temperature slightly, then a) its speed of rotation increases b) its speed of rotation decreases c) its speed of rotation remains same d) its speed increases because its moment of inertia increases

A very long metallic hollow pipe of length l and radius r (ltltl) is carrying charge Q , uniformly distributed upon it . The pipe is rotated about its axis with constant angular speed omega . The energy stored in the pipe of length l/100 is

A stell rod of length 2l corss sectional area A and mass M is set rotating in a horizotnal plane about an axis passing through its cnetre and perpendicular to its length with constant angular velcoty omega. If Y is the Young's modulus for steel, find the extension in the lenght of the rod. (Assume the rod is uniform.)

The moment of inertia of a rod about its perpendicular bisector is l, when temperature of rod is increased by Delta T, the increase in the moment of inertia of the rod about same axis ( gamma = temperature coefficient of volume expansion)

The moment of inertia of a rod about its perpendicular bisector is I . When the temperature of the rod is increased by Delta T , the increase in the moment of inertia of the rod about the same axis is (Here , alpha is the coefficient of linear expansion of the rod )

Two small balls A and B each of mass m, are attached tightly to the ends of a light rod of length d. The structure rotates about the perpendicular bisector of the rod at an angular speed omega . Calculate the angular momentum of the individual balls and of the system about the axis of rotation.

A rod of length l rotates with a small but uniform angular velocity omega about its perpendicular bisector. A uniform magnetic field B exists parallel to the axis of rotation. The potential difference between the centre of the rod and an end is

A rod of length l rotates with a uniform angular velocity omega about its perpendicular bisector. A uniform magnetic field B exists parallel to the axis of rotation. The potential difference between the two ends of the lrod is

A rod of length l rotates with a uniform angular velocity omega about its perpendicular bisector. A uniform magnetic field B exists parallel to the axis of rotation. The potential difference between the two ends of the lrod is