Two blocks of masses `m_1` and `m_2` connected by a string are placed gently over a fixed inclined plane, such that the tension in the connecting string is initially zero. The coefficient of friction between `m1` and inclined plane is `mu_1`, between `mu_2` and the inclined plane is `mu_2`. The tension in the string shall continue to remain zero if

Two blocks of masses m_1 and m_2 connected by a string are placed gently over a fixed inclined plane, such that the tension in the connecting string is initially zero. The coefficient of friction between m1 and inclined plane is mu_1 , between m2 and the inclined plane is mu_2 . The tension in the string shall continue to remain zero if

Two blocks of masses m_(1) and m_(2) are connected by a string of negligible mass which pass over a frictionless pulley fixed on the top of an inclined plane as shown in figure. The coefficient of friction between m_(1) and plane is mu .

Two blocks of masses m_(1) and m_(2) are connected by a string of negligible mass which pass over a frictionless pulley fixed on the top of an inclined plane as shown in figure. The coefficient of friction between m_(1) and plane is mu .

The coefficient of friction between m_(2) and inclined plane is mu (shown in the figure). If (m_(1))/(m_(2))=sin theta then

The coefficient of friction between m_(2) and inclined plane is mu (shown in the figure). If (m_(1))/(m_(2))=sin theta then

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 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 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.