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According to the principle of conservation of linear momentum if the external force acting on the system is zero, the linear momentum of the system will remain conserved. It means if the centre of mass of a system is initially at rest, it will remain at rest in the absence of external force, that is, the displacement of centre of mass will be zero.

A plank of mass \( M \) is placed on a smooth horizontal surface. Two light identical springs, each of stiffness \( K \), are rigidly connected to struts at the end of the plank as shown in figure. When the springs are in their unextended position, the distance between their free ends is \( 3 \mathrm{l} \). A block of mass \( m \) is placed on the plank and pressed against one of the springs so that it is compressed to \( l \). To keep the block at rest it is connected to the strut by means of a light string. Initially, the system is at rest. Now the string is burnt.
The maximum velocity of the plank is
(1) \( \sqrt{\frac{k m}{(M+m)}} l \)
(2) \( \sqrt{\frac{k}{(M+m)}} l \)
(3) \( \sqrt{\frac{k m}{M(M+m)}} l \)
(4) \( \sqrt{\frac{k M}{m(M+m)}} l \)
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