Radial elliptic trajectory: an orbit corresponding to the part of a degenerate ellipse from the moment the bodies touch each other and move away from each other until they touch each other again. The relative speed of the two objects is less than the escape velocity. This is an elliptic orbit with semi-minor axis = 0 and eccentricity = 1. Although the eccentricity is 1 this is not a parabolic orbit. If the coefficient of restitution of the two bodies is 1 this orbit is periodic. If the coefficient of restitution is less than 1 this orbit is non-periodic.
Radial parabolic trajectory, a non-periodic orbit where the relative speed of the two objects is always equal to the escape velocity. There are two cases: the bodies move away from each other or towards each other.
Radial hyperbolic trajectory: a non-periodic orbit where the relative speed of the two objects always exceeds the escape velocity. There are two cases: the bodies move away from each other or towards each other. This is a hyperbolic orbit with semi-minor axis = 0 and eccentricity = 1. Although the eccentricity is 1 this is not a parabolic orbit.
For elliptic trajectories, w is positive. It is the inverse of the apoapsis distance.
For parabolic trajectories, w is zero.
For hyperbolic trajectories, w is negative, It is where is the velocity at infinite distance.
Time as a function of distance
Given the separation and velocity at any time, and the total mass, it is possible to determine the position at any other time. The first step is to determine the constant w. Use the sign of w to determine the orbit type. where and are the separation and relative velocity at any time.
Parabolic trajectory
where t is the time from or until the time at which the two masses, if they were point masses, would coincide, and x is the separation. This equation applies only to radial parabolic trajectories, for general parabolic trajectories see Barker's equation.
where t is the time from or until the time at which the two masses, if they were point masses, would coincide, and x is the separation.
Universal form (any trajectory)
The radial Kepler equation can be made "universal" : or by expanding in a power series:
The radial Kepler problem (distance as function of time)
The problem of finding the separation of two bodies at a given time, given their separation and velocity at another time, is known as the Kepler problem. This section solves the Kepler problem for radial orbits. The first step is to determine the constant w. Use the sign of w to determine the orbit type. Where and are the separation and velocity at any time.
Two intermediate quantities are used: w, and the separation at time t the bodies would have if they were on a parabolic trajectory, p. Where t is the time, is the initial position, is the initial velocity, and. The inverse radial Kepler equation is the solution to the radial Kepler problem: Evaluating this yields: Power series can be easily differentiated term by term. Repeated differentiation gives the formulas for the velocity, acceleration, jerk, snap, etc.
The orbit inside a radial shaft in a uniform spherical body would be a simple harmonic motion, because gravity inside such a body is proportional to the distance to the center. If the small body enters and/or exits the large body at its surface the orbit changes from or to one of those discussed above. For example, if the shaft extends from surface to surface a closed orbit is possible consisting of parts of two cycles of simple harmonic motion and parts of two different radial elliptic orbits.
