The equation of motion for the radius r of a particle of mass m moving in a
central potential V(r) is given by
Lagrange's equations : m\frac{d^2 r}{dt^2} - mr \omega^2 = m\frac{d^2 r}{dt^2} - \frac{L^2}{mr^3} = -\frac{dV}{dr} \omega \equiv \frac{d\theta}{dt} and the
angular momentum L = mr^{2}\omega is conserved. For illustration, the first term on the left-hand side is zero for circular orbits, and the applied inwards force \frac{dV}{dr} equals the
centripetal force requirement mr \omega^{2}, as expected. If
L is not zero the definition of
angular momentum allows a change of independent variable from t to \theta : \frac{d}{dt} = \frac{L}{mr^{2}} \frac{d}{d\theta} giving the new equation of motion that is independent of time : \frac{L}{r^2} \frac{d}{d\theta} \left( \frac{L}{mr^2} \frac{dr}{d\theta} \right)- \frac{L^2}{mr^3} = -\frac{dV}{dr} The expansion of the first term is : \frac{L}{r^2} \frac{d}{d\theta} \left( \frac{L}{mr^2} \frac{dr}{d\theta} \right) = -\frac{2L^2}{mr^5} \left( \frac{dr}{d\theta} \right)^2 + \frac{L^2}{mr^4} \frac{d^2 r}{d\theta^2} This equation becomes quasilinear on making the change of variables u \equiv \frac{1}{r} and multiplying both sides by \frac{mr^2}{L^2} : \frac{du}{d\theta} = \frac{-1}{r^2} \frac{dr}{d\theta} : \frac{d^2 u}{d\theta^2} = \frac{2}{r^3} \left( \frac{dr}{d\theta} \right)^2 - \frac{1}{r^2} \frac{d^2 r}{d\theta^2} After substitution and rearrangement: : \frac{d^2 u}{d\theta^2} + u = -\frac{m}{L^2} \frac{d}{du} V\left(\frac 1 u\right) For an inverse-square force law such as the
gravitational or
electrostatic potential, the
scalar potential can be written : V(\mathbf{r}) = \frac{k}{r} = ku The orbit u(\theta) can be derived from the general equation : \frac{d^2 u}{d\theta^2} + u = -\frac{m}{L^2} \frac{d}{du} V\left( \frac 1 u\right) = -\frac{km}{L^2} whose solution is the constant -\frac{km}{L^2} plus a simple sinusoid : u \equiv \frac{1}{r} = -\frac{km}{L^2} \left[ 1 + e \cos(\theta - \theta_0) \right] where e (the
eccentricity) and \theta_{0} (the
phase offset) are constants of integration. This is the general formula for a
conic section that has one focus at the origin; e=0 corresponds to a
circle, e corresponds to an ellipse, e=1 corresponds to a
parabola, and e>1 corresponds to a
hyperbola. The eccentricity e is related to the total
energy E (cf. the
Laplace–Runge–Lenz vector) : e = \sqrt{1 + \frac{2EL^2}{k^2 m}} Comparing these formulae shows that E corresponds to an ellipse (all solutions which are
closed orbits are ellipses), E=0 corresponds to a
parabola, and E>0 corresponds to a
hyperbola. In particular, E=-\frac{k^2 m}{2L^2} for perfectly
circular orbits (the central force exactly equals the
centripetal force requirement, which determines the required angular velocity for a given circular radius). For a repulsive force (
k > 0) only
e > 1 applies. ==See also==