Two blocks `m_(1)=`4 kg and `m_(2)=2` kg connected by a weightless rod on a plane having inclination of `37^(@)` the coefficient of friction of `m_(1)` and `m_(2)` with the inclined plane are `mu=0.25` each. Then the common accleration of the two blocks and the tension in the rod are

Two blocks of masses m_1 = 4 kg and m_2 = 2kg connected by a massless rod slide down on an inclined plane of inclination 37^o as shown in figure. If coefficient of friction of m_1 and m_2 with inclined plane are mu_1 = 0.75 and mu_2 = 0.25 respectively, then tension (T) in the rod is (g = 10 ms^-2 )

Two blocks of masses m_(1)=1 kg and m_(2)=2 kg are connected by a string and side down a plane inclined at an angle theta=45^(@) with the horizontal. The coefficient of sliding friction between m_(1) and plane is mu_(1)=0.4, and that between m_(2) and plane is mu_(2)=0.2. Calculate the common acceleration of the two blocks and the tension in the string.

Two block of masses m_(1) and m_(2) are connected as shown in the figure. The acceleration of the block m_(2) is:

A block of mass m is at rest on a rough inclined plane of angle of inclination theta . If coefficient of friction between the block and the inclined plane is mu , then the minimum value of force along the plane required to move the block on the plane is

A block of mass m slides down an inclined plane of inclination theta with uniform speed. The coefficient of friction between the block and the plane is mu . The contact force between the block and the plane is

Two block of masses m_(1) and m_(2) connected by a light spring rest on a horizontal plane. The coefficient of friction between the block and the surface is equal to mu . What minimum constant force has to be applied in the horizontal direction to the block of mass m_(1) in order to shift the other block?

A block of mass m is projected up with a velocity v_0 along an inclined plane of angle of inclination theta=37^@ . The coefficient of friction between the inclined plane AB and blocks is mu(=tan theta) . Find the values of v_0 so that the block moves in a circular path from B to C.

Two blocks of masses m_(1) and m_(2) are kept touching each other on a rough fixed inclined plane of inclination alpha . Coefficients of kinetic friction between the inclined plane and the block m_(1) is k_(1) and between the inclined plane and block m_(2) is k_(2) . Find the force of interaction between the blocks in the process of motion.

If the coefficient of friction between M and the inclined surfaces is mu = 1//sqrt(3) find the minimum mass m of the rod so that the of mass M = 10 kg remain stationary on the inclined plane

A block of mass m = 2kg is resting on a inclined plane of inclination 30^(@) The coefficient of friction between the block and the plane is mu = 0.5 what minimum force F (in newton) should be applied perpendicular to the plane on the block so that the does not slip on the plane?