Orbital period
The orbital period is the time it takes a planet (or another object) to make one full orbit.
There are two main kinds of orbital periods of objects orbiting the sun:
- The sidereal period is the time that it takes the object to make one full orbit around the sun, relative to the stars. This is considered to be an object's true orbital period.
- The synodic period is the time that it takes for the object to reappear at the same spot in the sky, relative to the sun, as observed from Earth. This is the time that elapses between two successive conjunctions with the sun and is the object's apparent orbital period. The synodic period differs from the sidereal period since Earth itself revolves around the sun.
Relation between sidereal and synodic period
Copernicus devised a mathematical formula to calculate a planet's sidereal period from its synodic period.
Using the abbreviations
- E = the sidereal period of Earth (a sidereal year, not the same as a tropical year)
- P = the sidereal period of the other planet
- S = the synodic period of the other planet (wrt Earth)
Let us consider the case of an inferior planet, i.e. a planet that will complete one orbit more than Earth before the two return to the same position relative to the sun.
| Sid. P. (yr) | Syn. P. (yr) | Syn. P. (day) | |
| Mercury | 0.241 | 0.317 | 115.9 |
| Venus | 0.615 | 1.596 | 582.9 |
| Earth | 1 | — | — |
| Mars | 1.881 | 2.135 | 779.9 |
| Ceres | 4.603 | 1.278 | 466.6 |
| Jupiter | 11.87 | 1.092 | 398.9 |
| Saturn | 29.47 | 1.035 | 378.1 |
| Uranus | 84.00 | 1.012 | 369.7 |
| Neptune | 164.9 | 1.006 | 367.5 |
| Pluto | 247.7 | 1.004 | 366.7 |