find minimum value of F such that `m_(2)` starts its motion on the ground

The coefficient of friction between block A of mass m_(1)=5kg and block B of mass m_(2)=10 kg is mu_(2)=0.5 . There is no friction froce between block B and fixed horizontal surface. A force of 300N acts on block B in horizontal direction and a horizontal force of magnitude F acts on block A as shown , both towards right. Initially there is no relative motion between the blocks. The minimum value of F such that relative motion starts between A and B is :

When force F applied on m_(1) and there is no friction between m_(1) and surface and the coefficient of friction between m_(1)and m_(2) is mu. What should be the minimum value of F so that there is on relative motion between m_(1) and m_(2)

A small block of mass m is projected on a larger block of mass 10 m and length l with a velocity v as shown in the figure. The coefficient of friction between the two block is mu_(2) while that between the lower block and the ground is mu_(1) . Given that mu_(2) gt 11 mu_(1) . (a) Find the minimum value of v , such that the mass m falls off the block of mass 10 m . (b) If v has minimum value, find the time taken by block m to do so.

A spring mass system is held at rest with the spring relaxed at a height (H) above the ground. Determine the minimum value of (H) so that the systen has a tendency to rebound after hitting the ground. Given that the coefficient of restitution between (m_(2)) and ground is zero. .

In the figure the minimum value of a at which the cylinder starts rising up the inclined surface is

If the system shown in the figure is rotated in a horizontal circle with angular velocity omega . Find (g=10m//s^(2)) (a) the minimum value of omega to start relative motion between the two blocks. (b) tension in the string connecting m_(1) and m_(2) when slipping just starts between the blocks The coefficient of frition between the two masses is 0.5 and there is no friction between m_(2) and ground. The dimensions of the masses can be neglected. (Take R=0.5m,m_(1)=2Kg,m_(2)=1Kg)

Initially, both the blocks are at rest on horizontal surface as shown in the figure. Find the minimum value of force F in (N) so that sliding starts between the blocks (g=10ms^(-2))

In Fig. initialy the system is at rest .Find out minimum value of F for which sliding start between the two blocks Given m_(A) = 10 kg and m_(B) = 20 kg

A spring-mass system ( m_1 + massless spring + m_2 ) fall freely from a height h before m_2 colliding inelastically with the ground. Find the minimum value of h so that block m_2 will break off the surface. Assume k=stiffness of the spring.

A ball of mass 1 kg is dropped from 20 m height on ground and it rebounds to height 5m. Find magnitude of change in momentum during its collision with the ground. (Take g=10m//s^(2) )