Impact Parameter for Nuclear Scattering
The scattering geometry gives One way to obtain an expression for the change in momentum is to use the concept of impulse of force and the symmetry of the scattering geometry. Only the impulse component along the symmetry axis of the hyperbola will produce a net momentum change. Therefore This gives Conservation of angular momentum can be used to advantage in evaluating the impulse integral. Here we have used the expression for the angular momentum of a particle and the fact that it can be expressed as the product of mass, radius, and velocity perpendicular to the radius at any point on the hyperbolic path. Substitution gives Extending the entrance and exit paths of the scattering trajectory to infinity gives the limits on the angle: Using the angle difference identity puts the integral in the form Solving for the impact parameter b gives The two forms above can be shown to be equivalent using the half-angle identities. In this expression k is Coulomb's constant, e the electron charge and KE is the kinetic energy of the projectile particle.
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