The velocities of three particles of masses 20g, 30g and 50 g are `10veci,10vecj and 10veck` respectively. Find the velocity of the centre of mass of the three particles?

The velocities of three particles of masses 20 g, 30 g and 50 g are 10hat i, 10hatj and 10hatk respectively. The velocity of the centre of mass of the three particles is

Two identical particles move towards each other with velocity 2v and v, respectively. The velocity of the centre of mass is:

The coordinates of the centre of mass of a system of three particles of mass 1g,2g and 3g are (2,2,2). Where should a fourth particle of mass 4 g be positioned so that the centre of mass of the four particle system is at the origin of the three-dimensional coordinate system ?

Three particles of masses 0.50 kg, 1.0 kg and are placed at the corners of a right angle triangle, as shown in fig. Locate the centre of mass of the system.

Three particles of masses 1.0 kg 2.0 kg and 3.0 kg are placed at the corners A,B and C respectively of an equilateral triangle ABC of edge 1m. Locate the centre of mass of the system.

Three particles of masses 20g , 30g and 40g are initially moving along the positive direction of the three coordinate axes respectively with the same velocity of 20cm//s . When due to their mutual interaction, the first particle comes to rest, the second acquires a velocity (10hati+20hatk)cm//s . What is then the velocity of the third particle?

The uncertainty in position and velocity of the particle are 0.1 nm and 5.27xx10^(-24) ms^(-1) respectively then find the approximate integral mass of the particle (in g ) . (h=6.625xx10^(-34) Js)

A particle of mass 20 g is thrown vertically upwards with a speed of 10 m/s. Find the work done by the force of gravity during the time the particle goes up.

Two particles of masses m and 3m approach each other with different velocities. After collision, the particle of mass m has velocity vec( v) in their centre of mass frame. Velocity of particle of mass 3m in the centre of mass frame is

A Diwali cracker of mass 60 g at rest, explodes into three pieces A, B and C of mass 10 g, 20 g and 30 g respectively. After explosion velocities of A and B are 30 m/s along east and 20 m/s along north respectively. The instantaneous velocity of C will be