π’Momentum Conservation Requires Newton's Third Law
The conservation of momentum and Newton's third law of action-reaction forces are shown to be conceptually and mathematically equivalent within a closed system. When no external forces act on a system, the total momentum (pβ) remains conserved. If the system is divided into two parts (pβ1β and pβ2β), the conservation condition, dtdpβ1ββ+dtdpβ2ββ=0, directly yields the relationship F1β=βF2β, which is explicitly defined as Newton's third law. This dynamic relationship means that if one subsystem experiences a net force (F1β), the other must simultaneously experience an equal and opposite net force (βF1β). Furthermore, visualizing a two-body collision demonstrates that the law of conservation of momentum is a direct consequence of Newton's third law. The conservation of total momentum is guaranteed because the internal forces between the objects are consistently equal in magnitude and opposite in direction, ensuring that the net internal force is zero at every instant, which thus maintains a zero total rate of change of momentum.
