Letter F is formed from three identical rods of length l. Find coordinates of its centre of mass.

A uniform wire is bent into the form of a rectangle of length L and width W . The coordinates of its centre of mass from a corner are

A rod of length 2l is bent as shown in figure. Coordinates of centre of mass are

A rigid rod of mass m & length l is pivoted at one of its ends. If it is released from its horizontal position, find the speed of the centre of mass of the rod when it becomes vertical.

You are supplied with three identical rods of same length and mass. If the length of each rod is 2pi . Two of them are converted into rings and then placed over the third rod as shown in figure. If point A is considered as origin of the coordinate system the coordinate of the center of mass will be (you may assume AB as x-axis of the coordinate system).

A rigid body is made of three identical thin rods, each of length L fastened together in the form of the letter H. The moment of inertia of this body about an axis that runs along the length of one of the legs of H is

Infinite rods of uniform mass density and length L,L/2,L/4….. Are placed one upon another upto infinite as shown in figure. Find the x-coordinate of centre of mass.

The moment of inertia of a rod of length l about an axis passing through its centre of mass and perpendicular to rod is I . The moment of inertia of hexagonal shape formed by six such rods, about an axis passing through its centre of mass and perpendicular to its plane will be

Three rods of the same mass are placed as shown in the figure. Calculate the coordinates of the centre of mass of the system.