A hoop rolls on a horizontal ground without slipping with liner spped v. Speed of a particle P on the circumference of the hoop at angle `theta` is

A hoop rolls on a horizontal ground without slipping with linear speed v . Speed of a particle P on the circumference of the hoop at angle theta is :

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.

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 disc rolls over a horizontal floor without slipping with a linear speed of 5 cm/sec. Then the linear speed of a particle on its rim, with respect to the floor, when it is in its highest position is?

A smooth hoop lie as on a smooth horizontal table and is fixed. A particle is projected on the table form a point A on the inner circumference of the hoop at angle theta with radius vector . If e be the coefficient of restitution and the particle returns to the point of projection after two successive impacts. The final angle theta' made by velocity vector with radius of hoop is

A sphere of mass m and radius r rolls on a horizontal plane without slipping with a speed u . Now it rolls up vertically, then maximum height it would be attain will be

The centre of a wheel rolling without slipping on a plane surface moves with a speed v_(0) . A particle on the rim of the wheel at the same level as the centre of wheel will be moving with speed

A ring of radius R rolls on a horizontal ground with linear speed v and angular speed omega . For what value of theta the velocity of point P is in vertical direction (vltRomega) .

A ring of mass m is rolling without slipping with linear speed v as shown in figure. Four particles each of mass m are also attached at points A, B , C and D find total kinetic energy of the system.

A thin hoop of mass M and radius r is placed on a horizontal plane. At the initial instant, the hoop is at rest. A small washer of mass m with zero initial velocity slides from the upper point of the hoop along a smooth groove in the inner surfaces of the hoop. Determine the velocity u of the centre of the hoop at the moment when the washer is at a certain point A of the hoop, whose radius vector forms an angle phi with the vertical (figure). The friction between the hoop and the plane should be neglected