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The '''dynamic method''' is a procedure for the determination of the [[mass]]es of [[asteroid]]s. The procedure gets its name from its use of the [[Classical mechanics|Newtonian]] laws of the ''dynamics,'' or motion, of asteroids as they move around the
Because the method relies on detecting the amount of gravitational deflection induced during an interaction, the procedure works best for objects which will produce a large deflection in their interactions with other objects. This means that the procedure works best for large objects, but it can also be effectively applied to objects which have repeated close interactions with each other such as when the two objects are in [[orbital resonance]] with one another. Regardless of the mass of the interacting objects, the amount of deflection will be greater if the objects approach nearer to each other and it will also be greater if the objects pass slowly, allowing more time for gravity to perturb the orbits of the two objects. For large enough asteroids this distance can be as large as ~0.1 AU, for less massive asteroids the conditions of the interaction would need to be correspondingly better.<ref name=Kochetova-2004/>
== Mathematical analysis ==
The simplest way to describe the deflection of the asteroids is in the case where one object is significantly more massive than the other. In this case the equations of motion are the same as for that of [[Rutherford scattering]] between oppositely charged objects (so that the force
:<math>\sin \left( \frac{\Theta}{2} \right) = \frac{1}{\epsilon}</math>
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