Difference between revisions of "GFDL:Lagrangian point"
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| − | [[ | + | In [[celestial mechanics]], the '''Lagrangian point'''s, (also '''Lagrange point''', '''L-point''', or '''libration point''') are the five solutions of the restricted three-body problem. I.e. given two massive bodies orbiting around each other, they are the five positions in [[space]] where a third body, of negligible [[mass]], could be placed which would then maintain its position relative to the two massive bodies. As seen in a [[frame of reference]] which rotates with the same period as the two co-orbiting bodies, the [[gravity|gravitational field]]s of two massive bodies combined with the [[centrifugal force]] are in balance at the Lagrangian points, allowing the third body to be stationary relative to the first two bodies. |
| − | + | [[image:lagrangepoint1.png|thumb|350px|A diagram showing the five Lagrangian points in a two-body system]] | |
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The five points are labelled and defined as follows: | The five points are labelled and defined as follows: | ||
== L<sub>1</sub> == | == L<sub>1</sub> == | ||
| − | On the line defined by the two large masses, and between them. | + | On the line defined by the two large masses M<sub>1</sub> and M<sub>2</sub>, and between them. |
| − | '''Example:''' An object which [[orbit]]s the [[Sun]] more closely than the [[Earth]] would normally have a shorter orbital period than the Earth, but that ignores the effect of the Earth's own gravitational pull. If the object is directly between the Earth and the Sun, then the effect of the Earth's gravity is to weaken the force pulling the object towards the Sun, and therefore increase the orbital period of the object. The closer to Earth the object is, the greater this effect is. At the L<sub>1</sub> point, the orbital period of the object becomes exactly equal to the Earth's orbital period. | + | '''Example:''' An object which [[orbit]]s the [[Sun]] more closely than the [[Earth]] would normally have a shorter orbital period than the Earth, but that ignores the effect of the Earth's own gravitational pull. If the object is directly between the Earth and the Sun, then the effect of the Earth's gravity is to weaken the force pulling the object towards the Sun, and therefore increase the orbital period of the object. The closer to Earth the object is, the greater this effect is. At the L<sub>1</sub> point, the orbital period of the object becomes exactly equal to the Earth's orbital period. The [[Solar and Heliospheric Observatory]] (SOHO) ([http://sohowww.nascom.nasa.gov/ NASA's site of SOHO project]), for example, is stationed in a halo orbit around the Sun-Earth L<sub>1</sub> point. |
| − | The [[Solar and Heliospheric Observatory]] (SOHO) ([http://sohowww.nascom.nasa.gov/ NASA's site of SOHO project]), for example, is stationed in a halo orbit around the Sun-Earth L<sub>1</sub> point. | ||
==L<sub>2</sub>== | ==L<sub>2</sub>== | ||
On the line defined by the two large masses, and beyond the smaller of the two. | On the line defined by the two large masses, and beyond the smaller of the two. | ||
| − | '''Example:''' A similar effect occurs on the other side of the Earth, further away from the Sun, where the orbital period of an object would normally be greater than that of the Earth. The extra pull of the Earth's gravity decreases the orbital period of the object, and at the L<sub>2</sub> point that orbital period becomes equal to the Earth's. | + | '''Example:''' A similar effect occurs on the other side of the Earth, further away from the Sun, where the orbital period of an object would normally be greater than that of the Earth. The extra pull of the Earth's gravity decreases the orbital period of the object, and at the L<sub>2</sub> point that orbital period becomes equal to the Earth's. |
| − | The proposed [[James Webb Space Telescope]] will be placed at the Sun-Earth L<sub>2</sub>. | + | |
| + | L2 is a commonly used spot for space based observatories. Because an object around L2 will maintain the same orientation with respect to the Sun and Earth, shielding and calibration are much simpler. | ||
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| + | The [[Wilkinson Microwave Anisotropy Probe]] is already in orbit around the Sun-Earth L<sub>2</sub>. The proposed [[James Webb Space Telescope]] will be placed at the Sun-Earth L<sub>2</sub>. | ||
==L<sub>3</sub>== | ==L<sub>3</sub>== | ||
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L<sub>4</sub> and L<sub>5</sub> are sometimes called ''triangular Lagrange points'' or ''Trojan points''. | L<sub>4</sub> and L<sub>5</sub> are sometimes called ''triangular Lagrange points'' or ''Trojan points''. | ||
| − | '''Example:''' The L<sub>4</sub> and L<sub>5</sub> points lie 60 | + | '''Example:''' The L<sub>4</sub> and L<sub>5</sub> points lie 60° ahead of and 60° behind the Earth in its orbit around the Sun. |
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| − | + | The first three Lagrangian points are stable only in the plane [[perpendicular]] to the line between the two bodies. This can be seen most easily by considering the L<sub>1</sub> point. A test mass displaced perpendicularly from the central line would feel a force pulling it back towards the equilibrium point. This is because the lateral components of the two masses' gravity would add to produce this force, whereas the components along the axis between them would balance out. However, if an object located at the L<sub>1</sub> point drifted closer to one of the masses, the gravitational attraction it felt from that mass would be greater, and it would be pulled closer. (The pattern is very similar to that of [[tidal force|tidal forces]].) | |
| − | + | The L<sub>1</sub> and L<sub>2</sub> points have some practical value since, although a satellite would wander away if left to itself, a relatively modest effort at station-keeping can prevent it from doing so. | |
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| − | + | By contrast, L<sub>4</sub> and L<sub>5</sub> are stable equilibria (cf [[attractor]]), provided the ratio of the masses M<sub>1</sub>/M<sub>2</sub> is > 24.96. When a body at these points is perturbed, it moves away from the point, but the [[Coriolis force]] then acts, and bends the object's path into a stable, [[kidney bean]]-shaped orbit around the point (as seen in the rotating frame of reference). In the Sun-[[Jupiter (planet)|Jupiter]] system several thousand [[asteroid]]s, collectively referred to as [[Trojan asteroid]]s, are in such orbits. Other bodies can be found in the Sun-[[Saturn (planet)|Saturn]], Sun-[[Mars (planet)|Mars]], Jupiter-Jovian [[satellite]], and Saturn-Saturnian satellite systems. There are no known large bodies in the Sun-Earth system's Trojan points, but clouds of dust surrounding the L<sub>4</sub> and L<sub>5</sub> points were discovered in the [[1950s]]. Clouds of dust, even fainter than the notoriously weak [[gegenschein]], are also present in the L<sub>4</sub> and L<sub>5</sub> of the Earth-[[Moon]] system. | |
| − | Other bodies can be found in the Sun-[[Saturn (planet)|Saturn]], Sun-[[Mars (planet)|Mars]], Jupiter- | ||
| − | Clouds of dust, fainter than the notoriously | ||
The Earth's companion object [[3753 Cruithne]] is in a somewhat Trojan-like orbit around the Earth, but not in the same manner as a true Trojan. It has a regular solar orbit that is bumped at times by Earth. When the asteroid approaches Earth, the asteroid takes orbital energy from Earth and moves into a larger, higher energy orbit. When the asteroid (in a larger and slower orbit) is caught up by Earth, Earth takes the energy back and so the asteroid falls into a smaller, faster orbit and eventually catches Earth to begin the cycle anew. [[Epimetheus (moon)|Epimetheus]] and [[Janus (moon)|Janus]], satellites of Saturn, have a similar relationship, though they are of similar masses and so actually exchange orbits periodically. Another similar configuration is known as [[orbital resonance]], in which orbiting bodies tend to have periods of a simple integer [[ratio]], due to their interaction. | The Earth's companion object [[3753 Cruithne]] is in a somewhat Trojan-like orbit around the Earth, but not in the same manner as a true Trojan. It has a regular solar orbit that is bumped at times by Earth. When the asteroid approaches Earth, the asteroid takes orbital energy from Earth and moves into a larger, higher energy orbit. When the asteroid (in a larger and slower orbit) is caught up by Earth, Earth takes the energy back and so the asteroid falls into a smaller, faster orbit and eventually catches Earth to begin the cycle anew. [[Epimetheus (moon)|Epimetheus]] and [[Janus (moon)|Janus]], satellites of Saturn, have a similar relationship, though they are of similar masses and so actually exchange orbits periodically. Another similar configuration is known as [[orbital resonance]], in which orbiting bodies tend to have periods of a simple integer [[ratio]], due to their interaction. | ||
| − | The Saturnian moon [[Tethys (moon)|Tethys]] has two smaller moons in its L<sub>4</sub> and L<sub>5</sub> points, [[Telesto]] and [[Calypso (moon)|Calypso]]. The Saturnian moon [[Dione (moon)|Dione]] has the moon [[Helene (moon)|Helene]] in its L<sub>4</sub> point. | + | The Saturnian moon [[Tethys (moon)|Tethys]] has two smaller moons in its L<sub>4</sub> and L<sub>5</sub> points, [[Telesto (moon)|Telesto]] and [[Calypso (moon)|Calypso]]. The Saturnian moon [[Dione (moon)|Dione]] has the moon [[Helene (moon)|Helene]] in its L<sub>4</sub> point. |
| − | == External | + | == External link == |
*[http://www.physics.montana.edu/faculty/cornish/lagrange.html Explanation of Lagrange Points by Prof. Neil J. Cornish] | *[http://www.physics.montana.edu/faculty/cornish/lagrange.html Explanation of Lagrange Points by Prof. Neil J. Cornish] | ||
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| + | [[de:Lagrange-Punkt]] [[fr:Point de Lagrange]] [[it:Punti di Lagrange]] [[nl:Lagrange punt]] | ||
Revision as of 02:40, 2 July 2004
In celestial mechanics, the Lagrangian points, (also Lagrange point, L-point, or libration point) are the five solutions of the restricted three-body problem. I.e. given two massive bodies orbiting around each other, they are the five positions in space where a third body, of negligible mass, could be placed which would then maintain its position relative to the two massive bodies. As seen in a frame of reference which rotates with the same period as the two co-orbiting bodies, the gravitational fields of two massive bodies combined with the centrifugal force are in balance at the Lagrangian points, allowing the third body to be stationary relative to the first two bodies.
The five points are labelled and defined as follows:
L1
On the line defined by the two large masses M1 and M2, and between them.
Example: An object which orbits the Sun more closely than the Earth would normally have a shorter orbital period than the Earth, but that ignores the effect of the Earth's own gravitational pull. If the object is directly between the Earth and the Sun, then the effect of the Earth's gravity is to weaken the force pulling the object towards the Sun, and therefore increase the orbital period of the object. The closer to Earth the object is, the greater this effect is. At the L1 point, the orbital period of the object becomes exactly equal to the Earth's orbital period. The Solar and Heliospheric Observatory (SOHO) (NASA's site of SOHO project), for example, is stationed in a halo orbit around the Sun-Earth L1 point.
L2
On the line defined by the two large masses, and beyond the smaller of the two.
Example: A similar effect occurs on the other side of the Earth, further away from the Sun, where the orbital period of an object would normally be greater than that of the Earth. The extra pull of the Earth's gravity decreases the orbital period of the object, and at the L2 point that orbital period becomes equal to the Earth's.
L2 is a commonly used spot for space based observatories. Because an object around L2 will maintain the same orientation with respect to the Sun and Earth, shielding and calibration are much simpler.
The Wilkinson Microwave Anisotropy Probe is already in orbit around the Sun-Earth L2. The proposed James Webb Space Telescope will be placed at the Sun-Earth L2.
L3
On the line defined by the two large masses, and beyond the larger of the two.
Example: A third Lagrangian point, L3, exists on the opposite side of the Sun, a little further away from the Sun than the Earth is, where the combined pull of the Earth and Sun again causes the object to orbit with the same period as the Earth. When used with the Sun and the Earth as the two masses, the L3 point was a popular place to put a "Counter-Earth" in pulp science fiction and comic books.
L4
At the third point of an equilateral triangle with the base of the line defined by the two masses, such that the point is ahead of the smaller mass in its orbit around the larger mass.
L5
At the third point of an equilateral triangle with the base of the line defined by the two masses, such that the point is behind the smaller mass in its orbit around the larger mass.
L4 and L5 are sometimes called triangular Lagrange points or Trojan points.
Example: The L4 and L5 points lie 60° ahead of and 60° behind the Earth in its orbit around the Sun.
The first three Lagrangian points are stable only in the plane perpendicular to the line between the two bodies. This can be seen most easily by considering the L1 point. A test mass displaced perpendicularly from the central line would feel a force pulling it back towards the equilibrium point. This is because the lateral components of the two masses' gravity would add to produce this force, whereas the components along the axis between them would balance out. However, if an object located at the L1 point drifted closer to one of the masses, the gravitational attraction it felt from that mass would be greater, and it would be pulled closer. (The pattern is very similar to that of tidal forces.)
The L1 and L2 points have some practical value since, although a satellite would wander away if left to itself, a relatively modest effort at station-keeping can prevent it from doing so.
By contrast, L4 and L5 are stable equilibria (cf attractor), provided the ratio of the masses M1/M2 is > 24.96. When a body at these points is perturbed, it moves away from the point, but the Coriolis force then acts, and bends the object's path into a stable, kidney bean-shaped orbit around the point (as seen in the rotating frame of reference). In the Sun-Jupiter system several thousand asteroids, collectively referred to as Trojan asteroids, are in such orbits. Other bodies can be found in the Sun-Saturn, Sun-Mars, Jupiter-Jovian satellite, and Saturn-Saturnian satellite systems. There are no known large bodies in the Sun-Earth system's Trojan points, but clouds of dust surrounding the L4 and L5 points were discovered in the 1950s. Clouds of dust, even fainter than the notoriously weak gegenschein, are also present in the L4 and L5 of the Earth-Moon system.
The Earth's companion object 3753 Cruithne is in a somewhat Trojan-like orbit around the Earth, but not in the same manner as a true Trojan. It has a regular solar orbit that is bumped at times by Earth. When the asteroid approaches Earth, the asteroid takes orbital energy from Earth and moves into a larger, higher energy orbit. When the asteroid (in a larger and slower orbit) is caught up by Earth, Earth takes the energy back and so the asteroid falls into a smaller, faster orbit and eventually catches Earth to begin the cycle anew. Epimetheus and Janus, satellites of Saturn, have a similar relationship, though they are of similar masses and so actually exchange orbits periodically. Another similar configuration is known as orbital resonance, in which orbiting bodies tend to have periods of a simple integer ratio, due to their interaction.
The Saturnian moon Tethys has two smaller moons in its L4 and L5 points, Telesto and Calypso. The Saturnian moon Dione has the moon Helene in its L4 point.
External link
de:Lagrange-Punkt fr:Point de Lagrange it:Punti di Lagrange nl:Lagrange punt
