The orbital eccentricity of an astronomical object is a dimensionless parameter that determines the amount by which its orbit around another body deviates from a perfect circle. A value of 0 is a circular orbit, values between 0 and 1 form an elliptic orbit, 1 is a parabolic escape orbit, and greater than 1 is a hyperbola. The term derives its name from the parameters of conic sections, as every Kepler orbit is a conic section. It is normally used for the isolated twobody problem, but extensions exist for objects following a Klemperer rosette orbit through the galaxy.
Definition
In a twobody problem with inversesquarelaw force, every orbit is a Kepler orbit. The eccentricity of this Kepler orbit is a nonnegative number that defines its shape.
The eccentricity may take the following values:
 circular orbit: e = 0
 elliptic orbit: 0 < e < 1 (see ellipse)
 parabolic trajectory: e = 1 (see parabola)
 hyperbolic trajectory: e > 1 (see hyperbola)
The eccentricity e is given by
where E is the total orbital energy, L is the angular momentum, m_{red} is the reduced mass, and α the coefficient of the inversesquare law central force such as gravity or electrostatics in classical physics:

 (α is negative for an attractive force, positive for a repulsive one; see also Kepler problem)
or in the case of a gravitational force:
where ε is the specific orbital energy (total energy divided by the reduced mass), μ the standard gravitational parameter based on the total mass, and h the specific relative angular momentum (angular momentum divided by the reduced mass).
For values of e from 0 to 1 the orbit's shape is an increasingly elongated (or flatter) ellipse; for values of e from 1 to infinity the orbit is a hyperbola branch making a total turn of 2 arccsc e, decreasing from 180 to 0 degrees. The limit case between an ellipse and a hyperbola, when e equals 1, is parabola.
Radial trajectories are classified as elliptic, parabolic, or hyperbolic based on the energy of the orbit, not the eccentricity. Radial orbits have zero angular momentum and hence eccentricity equal to one. Keeping the energy constant and reducing the angular momentum, elliptic, parabolic, and hyperbolic orbits each tend to the corresponding type of radial trajectory while e tends to 1 (or in the parabolic case, remains 1).
For a repulsive force only the hyperbolic trajectory, including the radial version, is applicable.
For elliptical orbits, a simple proof shows that arcsin() yields the projection angle of a perfect circle to an ellipse of eccentricity e. For example, to view the eccentricity of the planet Mercury (e = 0.2056), one must simply calculate the inverse sine to find the projection angle of 11.86 degrees. Next, tilt any circular object (such as a coffee mug viewed from the top) by that angle and the apparent ellipse projected to your eye will be of that same eccentricity.
Etymology
The word "eccentricity" comes from Medieval Latin eccentricus, derived from Greek ἔκκεντρος ekkentros "out of the center", from ἐκ ek, "out of" + κέντρον kentron "center". "Eccentric" first appeared in English in 1551, with the definition "...a circle in which the earth, sun. etc. deviates from its center".^{[citation needed]} By five years later, in 1556, an adjectival form of the word had developed.
Calculation
The eccentricity of an orbit can be calculated from the orbital state vectors as the magnitude of the eccentricity vector:
where:
 e is the eccentricity vector.
For elliptical orbits it can also be calculated from the periapsis and apoapsis since r_{p} = a(1 − e) and r_{a} = a(1 + e), where a is the semimajor axis.
where:
 r_{a} is the radius at apoapsis (i.e., the farthest distance of the orbit to the center of mass of the system, which is a focus of the ellipse).
 r_{p} is the radius at periapsis (the closest distance).
The eccentricity of an elliptical orbit can also be used to obtain the ratio of the periapsis to the apoapsis:
For Earth, orbital eccentricity ≈ 0.0167, apoapsis is aphelion, and periapsis is perihelion relative to sun.
For Earth's annual orbit path, r_{a}/r_{p} ratio = longest_radius / shortest_radius ≈ 1.034 relative to center point of path.
Examples
Object  eccentricity 

Triton  0.00002 
Venus  0.0068 
Neptune  0.0086 
Earth  0.0167 
Titan  0.0288 
Uranus  0.0472 
Jupiter  0.0484 
Saturn  0.0541 
Moon  0.0549 
1 Ceres  0.0758 
4 Vesta  0.0887 
Mars  0.0934 
10 Hygiea  0.1146 
Makemake  0.1559 
Haumea  0.1887 
Mercury  0.2056 
2 Pallas  0.2313 
Pluto  0.2488 
3 Juno  0.2555 
324 Bamberga  0.3400 
Eris  0.4407 
Nereid  0.7507 
Sedna  0.8549 
Halley's Comet  0.9671 
Comet HaleBopp  0.9951 
Comet IkeyaSeki  0.9999 
C/1980 E1  1.057 
ʻOumuamua  1.20^{[a]} 
C/2019 Q4 (Borisov)  3.5^{[b]} 
The eccentricity of the Earth's orbit is currently about 0.0167; the Earth's orbit is nearly circular. Venus and Neptune have even lower eccentricities. Over hundreds of thousands of years, the eccentricity of the Earth's orbit varies from nearly 0.0034 to almost 0.058 as a result of gravitational attractions among the planets (see graph).^{[1]}
The table lists the values for all planets and dwarf planets, and selected asteroids, comets, and moons. Mercury has the greatest orbital eccentricity of any planet in the Solar System (e = 0.2056). Such eccentricity is sufficient for Mercury to receive twice as much solar irradiation at perihelion compared to aphelion. Before its demotion from planet status in 2006, Pluto was considered to be the planet with the most eccentric orbit (e = 0.248). Other TransNeptunian objects have significant eccentricity, notably the dwarf planet Eris (0.44). Even further out, Sedna, has an extremely high eccentricity of 0.855 due to its estimated aphelion of 937 AU and perihelion of about 76 AU.
Most of the Solar System's asteroids have orbital eccentricities between 0 and 0.35 with an average value of 0.17.^{[2]} Their comparatively high eccentricities are probably due to the influence of Jupiter and to past collisions.
The Moon's value is 0.0549, the most eccentric of the large moons of the Solar System. The four Galilean moons have eccentricity < 0.01. Neptune's largest moon Triton has an eccentricity of 1.6×10^{−5} (0.000016),^{[3]} the smallest eccentricity of any known moon in the Solar System;^{[citation needed]} its orbit is as close to a perfect circle as can be currently^{[when?]} measured. However, smaller moons, particularly irregular moons, can have significant eccentricity, such as Neptune's third largest moon Nereid (0.75).
Comets have very different values of eccentricity. Periodic comets have eccentricities mostly between 0.2 and 0.7,^{[4]} but some of them have highly eccentric elliptical orbits with eccentricities just below 1, for example, Halley's Comet has a value of 0.967. Nonperiodic comets follow nearparabolic orbits and thus have eccentricities even closer to 1. Examples include Comet Hale–Bopp with a value of 0.995^{[5]} and comet C/2006 P1 (McNaught) with a value of 1.000019.^{[6]} As Hale–Bopp's value is less than 1, its orbit is elliptical and it will return.^{[5]} Comet McNaught has a hyperbolic orbit while within the influence of the planets,^{[6]} but is still bound to the Sun with an orbital period of about 10^{5} years.^{[7]} As of a 2010 Epoch, Comet C/1980 E1 has the largest eccentricity of any known hyperbolic comet with an eccentricity of 1.057,^{[8]} and will leave the Solar System eventually.
ʻOumuamua is the first interstellar object found passing through the Solar System. Its orbital eccentricity of 1.20 indicates that ʻOumuamua has never been gravitationally bound to our sun. It was discovered 0.2 AU (30,000,000 km; 19,000,000 mi) from Earth and is roughly 200 meters in diameter. It has an interstellar speed (velocity at infinity) of 26.33 km/s (58,900 mph).
Mean eccentricity
The mean eccentricity of an object is the average eccentricity as a result of perturbations over a given time period. Neptune currently has an instant (current epoch) eccentricity of 0.0113,^{[9]} but from 1800 to 2050 has a mean eccentricity of 0.00859.^{[10]}
Climatic effect
Orbital mechanics require that the duration of the seasons be proportional to the area of the Earth's orbit swept between the solstices and equinoxes, so when the orbital eccentricity is extreme, the seasons that occur on the far side of the orbit (aphelion) can be substantially longer in duration. Today, northern hemisphere fall and winter occur at closest approach (perihelion), when the earth is moving at its maximum velocity—while the opposite occurs in the southern hemisphere. As a result, in the northern hemisphere, fall and winter are slightly shorter than spring and summer—but in global terms this is balanced with them being longer below the equator. In 2006, the northern hemisphere summer was 4.66 days longer than winter, and spring was 2.9 days longer than fall due to the Milankovitch cycles.^{[11]}^{[12]}
Apsidal precession also slowly changes the place in the Earth's orbit where the solstices and equinoxes occur. Note that this is a slow change in the orbit of the Earth, not the axis of rotation, which is referred to as axial precession (see Precession § Astronomy). Over the next 10,000 years, the northern hemisphere winters will become gradually longer and summers will become shorter. However, any cooling effect in one hemisphere is balanced by warming in the other, and any overall change will be counteracted by the fact that the eccentricity of Earth's orbit will be almost halved.^{[13]} This will reduce the mean orbital radius and raise temperatures in both hemispheres closer to the midinterglacial peak.
Exoplanets
Of the many exoplanets discovered, most have a higher orbital eccentricity than planets in our planetary system. Exoplanets found with low orbital eccentricity (nearcircular orbits) are very close to their star and are tidally locked to the star. All eight planets in the Solar System have nearcircular orbits. The exoplanets discovered show that the solar system, with its unusually low eccentricity, is rare and unique.^{[14]} One theory attributes this low eccentricity to the high number of planets in the Solar System; another suggests it arose because of its unique asteroid belts. A few other multiplanetary systems have been found, but none resemble the Solar System. The Solar System has unique planetesimal systems, which led the planets to have nearcircular orbits. Solar planetesimal systems include the asteroid belt, Hilda family, Kuiper belt, Hills cloud, and the Oort cloud. The exoplanet systems discovered have either no planetesimal systems or one very large one. Low eccentricity is needed for habitability, especially advanced life.^{[15]} High multiplicity planet systems are much more likely to have habitable exoplanets.^{[16]}^{[17]} The grand tack hypothesis of the Solar System also helps understand its nearcircular orbits and other unique features.^{[18]}^{[19]}^{[20]}^{[21]}^{[22]}^{[23]}^{[24]}^{[25]}
See also
Footnotes
References
 ^ A. Berger & M.F. Loutre (1991). "Graph of the eccentricity of the Earth's orbit". Illinois State Museum (Insolation values for the climate of the last 10 million years). Archived from the original on 6 January 2018.
 ^ Asteroids Archived 4 March 2007 at the Wayback Machine
 ^ David R. Williams (22 January 2008). "Neptunian Satellite Fact Sheet". NASA.
 ^ Lewis, John (2 December 2012). Physics and Chemistry of the Solar System. Academic Press. ISBN 9780323145848.
 ^ ^{a} ^{b} "JPL SmallBody Database Browser: C/1995 O1 (HaleBopp)" (20071022 last obs). Retrieved 5 December 2008.
 ^ ^{a} ^{b} "JPL SmallBody Database Browser: C/2006 P1 (McNaught)" (20070711 last obs). Retrieved 17 December 2009.
 ^ "Comet C/2006 P1 (McNaught) – facts and figures". Perth Observatory in Australia. 22 January 2007. Archived from the original on 18 February 2011.
 ^ "JPL SmallBody Database Browser: C/1980 E1 (Bowell)" (19861202 last obs). Retrieved 22 March 2010.
 ^ Williams, David R. (29 November 2007). "Neptune Fact Sheet". NASA.
 ^ "Keplerian elements for 1800 A.D. to 2050 A.D." JPL Solar System Dynamics. Retrieved 17 December 2009.
 ^ Data from United States Naval Observatory
 ^ Berger A.; Loutre M.F.; Mélice J.L. (2006). "Equatorial insolation: from precession harmonics to eccentricity frequencies" (PDF). Clim. Past Discuss. 2 (4): 519–533. doi:10.5194/cpd25192006.
 ^ Arizona U., Long Term Climate
 ^ exoplanets.org, ORBITAL ECCENTRICITES, by G.Marcy, P.Butler, D.Fischer, S.Vogt, 20 Sept 2003
 ^ Ward, Peter; Brownlee, Donald (2000). Rare Earth: Why Complex Life is Uncommon in the Universe. Springer. pp. 122–123. ISBN 0387987010.
 ^ Limbach, MA; Turner, EL (2015). "Exoplanet orbital eccentricity: multiplicity relation and the Solar System". Proc Natl Acad Sci U S A. 112 (1): 20–4. arXiv:1404.2552. Bibcode:2015PNAS..112...20L. doi:10.1073/pnas.1406545111. PMC 4291657. PMID 25512527.
 ^ Steward Observatory, University of Arizona, Tucson, Planetesimals in Debris Disks, by Andrew N. Youdin and George H. Rieke, 2015
 ^ Zubritsky, Elizabeth. "Jupiter's Youthful Travels Redefined Solar System". NASA. Retrieved 4 November 2015.
 ^ Sanders, Ray. "How Did Jupiter Shape Our Solar System?". Universe Today. Retrieved 4 November 2015.
 ^ Choi, Charles Q. "Jupiter's 'Smashing' Migration May Explain Our Oddball Solar System". Space.com. Retrieved 4 November 2015.
 ^ Davidsson, Dr. Björn J. R. "Mysteries of the asteroid belt". The History of the Solar System. Retrieved 7 November 2015.
 ^ Raymond, Sean. "The Grand Tack". PlanetPlanet. Retrieved 7 November 2015.
 ^ O'Brien, David P.; Walsh, Kevin J.; Morbidelli, Alessandro; Raymond, Sean N.; Mandell, Avi M. (2014). "Water delivery and giant impacts in the 'Grand Tack' scenario". Icarus. 239: 74–84. arXiv:1407.3290. Bibcode:2014Icar..239...74O. doi:10.1016/j.icarus.2014.05.009.
 ^ Loeb, Abraham; Batista, Rafael; Sloan, David (August 2016). "Relative Likelihood for Life as a Function of Cosmic Time". Journal of Cosmology and Astroparticle Physics. 2016 (8): 040. arXiv:1606.08448. Bibcode:2016JCAP...08..040L. doi:10.1088/14757516/2016/08/040.
 ^ "Is Earthly Life Premature from a Cosmic Perspective?". HarvardSmithsonian Center for Astrophysics. 1 August 2016.
Further reading
 Prussing, John E.; Conway, Bruce A. (1993). Orbital Mechanics. New York: Oxford University Press. ISBN 0195078349.
External links
 World of Physics: Eccentricity
 The NOAA page on Climate Forcing Data includes (calculated) data from Berger (1978), Berger and Loutre (1991)^{[permanent dead link]}. Laskar et al. (2004) on Earth orbital variations, Includes eccentricity over the last 50 million years and for the coming 20 million years.
 The orbital simulations by Varadi, Ghil and Runnegar (2003) provides series for Earth orbital eccentricity and orbital inclination.
 Kepler's Second law's simulation