The logic begins with Newton's third law (see the Know the Law section). In the explosive interaction between Cart A and Cart B, the forces experienced by the carts are equal in magnitude. That is,
FA = - FB
Common sense would tell us that these forces endure for the same amount of time. After all, if the forces result from the interaction between the carts, Cart A cannot be interacting with Cart B for a different amount of time than the Cart B is interacting with Cart A. So
tA = tB
Mathematical logic applied to the two equations above would lead to the conclusion that the product of F and t for Cart A is equal in magnitude (and opposite in direction) to the product of F and t for Cart B. That is,
FA • tA = - FB• tB
The above statement means that each cart encounters the same impulse directed in opposite directions. Finally, the impulse is equal to momentum change. If applied to this interaction, then one can conclude that Cart A and Cart B also experience the same momentum change. That is
mA • ∆vA = - mB • ∆vB
In conclusion: in the explosive interaction between the two carts, the forces exerted on the carts are equal in magnitude, enduring for the same amount of time to produce an equal impulse for each cart and resulting in an equal momentum change for each cart.
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