A disc is rolling the velocity of its centre of mass is `V_"cm"` then which one will be correct : -

A disc is rolling on an inclined plane without slipping. The velocity of centre of mass is V . These other point on the disc lie on a circular are having same speed as centre of mass. When a disc is rolling on an inclined plane. The magnitude of velocities of all the point from the contact point is same, having distance equal to radius r .

A disc of mass 4 kg and of radius 1 m rolls on a horizontal surface without slipping such that the velocity of its centre of mass is 10" cm sec"^(-1) , Its rotatonal kinetic energy is

A solid cylinder is rolling without slipping with velocity of its centre of mass v and angular velocity about its centre of mass omega on a horizontal frictionless surface as shown in figure. If it collides with a frictionless vertical wall X , then after collision its velocity and angular velocity respectively become

A disc rolls on ground without slipping . Velocity of centre of mass is v. There is a point P on circumference of disc at angle theta . Suppose v_(p) is the speed of this point. Then, match the following the following table.

In each situation of Table-1, a uniform disc of mass m and radius R rolls on a rough fixed horizontal surface as shown. At, t=0 (initially) the angular velocity of disc is omega_(0) and velocity of centre of mass of disc is v_(0) (in horizontal direction). The relation between v_(0) and omega_(0) for each situation and also initial sense of rotation is given in Table-1 . Then match the statements in Table-1 with the corresponding results in Table-2.

A disc rolls on ground without slipping. Velocity of centre of mass is v . There is a point P on circumference of disc at angle theta . Suppose, v_(P) is the speed of this point. Then, match the following columns {:(,"Column-I",,"Column-II"),("(A)","If" theta=60^(@),"(p)",v_(P)=sqrt(2)v),("(B)","If" theta=90^(@),"(q)",v_(P)=v),("(C)","If" theta=120^(@),"(r)",v_(P)=2v),("D)","If" theta=180^(@),"(s)",v_(P)=sqrt(3)v):}

A wheel of bicycle is rolling without slipping on a level road. The velocity of the centre of mass is v_(CM) , then true statement is

A wheel of bicycle is rolling without slipping on a level road. The velocity of the centre of mass is v_(CM) , then true statement is

A disc of radius r rolls without slipping on a rough horizontal floor. If veloocity of its centre of mass is v_(0) , then velocity of point P, as shown in the figure (OP=r // 2 and angleQOP=60^(@) )is

If there is a moth sitting at point C of rolling sphere, where velocity of the centre of mass =v , calculate the velocity of the moth as seen by an oberver sitting at point D at this instant