A particle slides on the surface of a fixed smooth sphere starting from the topmost pont. Find the angle rotated by the radius through the particle, when it leaves contact with the sphere.

A particle of mass m is kept on a fixed, smooth sphere of radius R at a position, where the radius through the particle makes an angle of 30 ∘ with the vertical. The particle is released from this position. (a) What is the force exerted by the sphere on the particle just after the release? (b) Find the distance traveled by the particle before it leaves contact with the sphere.

A particle rests on the top of a smooth hemisphere of radius r . It is imparted a horizontal velocity of sqrt(etagr) . Find the angle made by the radius vector joining the particle with the vertical at the instant the particle losses contact with the sphere.

A particle of mass m is kept on the top of a smooth sphere of radius R. It is given a sharp impulse which imparts it a horizontal speed v. [a]. find the normal force between the sphere and the particle just after the impulse. [B]. What should be the minimum value of v for which the particle does not slip on the sphere?[ c]. Assuming the velocity v to be half the minimum calculated in part, [d]. find the angle made by the radius through the particle with the vertical when it leaves the sphere.

A particle of mass m is projected with speed sqrt(Rg/4) from top of a smooth hemisphere as shown in figure. If the particle starts slipping from the highest point, then the horizontal distance between the point where it leaves contact with sphere and the point at which the body was placed is

A particle of mass m initially at rest starts moving from point A on the surface of a fixed smooth hemisphere of radius r as shown. The particle looses its contact with hemisphere at point B.C is centre of the hemisphere. The equation relating theta and theta' is .

A particle of mass m initially at rest starts moving from point A on the surface of a fixed smooth hemisphere of radius r as shown. The particle looses its contact with hemisphere at point B.C is centre of the hemisphere. The equation relating theta and theta' is .

A particle of mass m starts to slide down from the top of the fixed smooth sphere. What is the tangential acceleration when it break off the sphere ?

A small mass m starts from rest and slides down the surface of a frictionless solid sphere of radius R. Calculate the angle at which the mass flies off the sphere. If there is friction between the mass and the sphere, does the mass of fly off at a greater or lesser angle than the previous one ?

Figure shows a body A at the top of a frictionless hemispherical inverted bowl of radius R. If the body starts slipping from the highest point, then the horizontal distance between the point where it leaves contact with sphere and the point at which the body was placed is

Inside a smooth hemispherical cavity, a particle P can slide freely. The block having this cavity is moving with constant acceleration a = g (where g is acceleration due to gravity). The particle is released from the state of rest from the topmost position of the surface of the cavity as shown. The angle theta with the vertical, when the particle will have maximum velocity with respect to the block is