A body of mass 2 kg slides down with an acceleration of 3 `m//s^(2)` on a rough inclined plane having a slope of `30^(@)` The external force required to take the same body up the plane with the same acceleration will be : `(g=10 m//s^(2))`

The acceleration of a moving body down a rough inclined plane is

Derive an expression for acceleration of a body down a rough inclined plane .

A body of mass 1.0 kg is falling with an acceleration of 10 m//s^(2) . Its apparent weight will be (g=10m//sec^(2))

Obtain an expression for the acceleration of a body sliding down a rough inclined plane.

A body of mass 10 kg is lying on a rough inclined plane of inclination 37^(@) and mu = 1//2 , the minimum force required to pull the body up the plane is

A body of mass 10 kg is lying on a rough plane inclined at an angle of 30^(@) to the horizontal and the coefficient of friction is 0.5. the minimum force required to pull the body up the plane is

A body of mass m slides down an inclined plane making an angle of 45^(@) with the horizontal. If the coefficient of friction between the body and the plane be 0.3, the acceleration of the body is approximately equal to :

A solid cylinder of mass 3 kg is placed on a rough inclined plane of inclination 30^@ . If g = 10 ms^(2) , then the minimum frictional force required for it to roll without slipping down the plane is

A block of mass 0.5 kg is kept on a rough inclined plane making an angle of 30^(@) with horizontal. What power will be required to move the block up the plane (along the plane) with a velocity of 5m/s ? (Take m = 0.2 between block and plane)

A body of mass 10kg is placed on a smooth inclined plane making an angle of 30^(@) with the horizontal, the component of the force of gravity trying to move the body down the inclined plane is [g=9.8m//s^(2)]