A balloon of mass M with a light rope having monkey on the rope is in equilibrium. If the monkey starts moving up with acceleration a w.r.t. rope . Then the acceleration of cenre of mass of the system is

If a monkey moves upward with respect to the rope with acceleration g/2 then acceleration of block, if masses of block and monkey are same

Two ladders are hanging from ands of a light rope passing over a light and smooth pulley. A monkey of mass 2m hangs near the bottom of one ladder whose mass is M-2m. Another monkey of mass m hangs near the bottom of the other ladder whose mass is M-m. The monkey of mass 2m moves up a distance l with respect to the ladder. The monkey of mass m moves up a distance l/2 with respect to the ladder. The displacement of centre of mass of the system is (kml)/(4M) . Find the value of k.

In figure shown a monkey of mass m is standing on a ladder of mass ( M -m ) . On the other side of th elight pulley hangs a counter weight of mass M as shown. The whole system is stationary. Now the monkey starts moving up the ladder. In the process, The center of mass of the shole system : A. moves down B. moves up C. remain stationary D. nothing can be concluded in genral

The ballon the light rope and the monkey shown in figure are at rest in the air. If the monkey reaches the top of the rope, by what distnce does the ballon descend? Mass of the ballon =M mass of the monkey =m and the length of the rope ascended by the monkey =L

A balloon of mass m is descending down with an acceleration How much mass should be g/2 removed from it so that it starts moving up with same acceleration?

STATEMENT-1: A block is pulled along a horizontal frictionless surface by a thick rope. The tension in the rope will not always be the same at all points on it. because STATEMENT-2: the tension in the rope depends on the acceleration of the block rope system and the mass of the rope.

Two monkey of masses 10 kg and 8 kg are moving along a verticle rope as shown in fig. the former climbing up with an acceleration of 2 ms^(-2) , while the later coming down with a uniform velocity of 2 ms^(-2) . Find the tension in the rope at the fixed support.

A rope thrown over a pulley has a ladder with a man of mass m on one of its ends and a counter balancing mass M on its other end. The man climbs with a velocity v_r relative to ladder. Ignoring the masses of the pulley and the rope as well as the friction on the pulley axis, the velocity of the centre of mass of this system is:

A monkey of mass m clings a rope to a slung over a fixed pulley .The opposite end of the rope is tried to a weight of mass M tying on a horizontal table is mu Find the acceleration of weight and the tension of the rope for two cases .The monkey move downward with respect to the rope with an acceleration b. The tension of rope is

A monkey of mass m clings a rope to a slung over a fixed pulley .The opposite end of the rope is tried to a weight of mass M tying on a horizontal table is mu Find the acceleration of weight .The monkey move downward with respect to the rope with an acceleration b. The acceleration of weight is