Rotation period (Redirected from Sidereal rotation period)

Animated rotation of asteroid 433 Eros

The rotation period of a celestial object (e.g., star, gas giant, planet, moon, asteroid) may refer to its sidereal rotation period, i.e. the time that the object takes to complete a single revolution around its axis of rotation relative to the background stars, measured in sidereal time. The other type of commonly used rotation period is the object's synodic rotation period (or solar day), measured in solar time, which may differ by a fraction of a rotation or more than one rotation to accommodate the portion of the object's orbital period during one day.

Measuring rotation

For solid objects, such as rocky planets and asteroids, the rotation period is a single value. For gaseous or fluid bodies, such as stars and gas giants, the period of rotation varies from the object's equator to its pole due to a phenomenon called differential rotation. Typically, the stated rotation period for a gas giant (such as Jupiter, Saturn, Uranus, Neptune) is its internal rotation period, as determined from the rotation of the planet's magnetic field. For objects that are not spherically symmetrical, the rotation period is, in general, not fixed, even in the absence of gravitational or tidal forces. This is because, although the rotation axis is fixed in space (by the conservation of angular momentum), it is not necessarily fixed in the body of the object itself.[citation needed] As a result of this, the moment of inertia of the object around the rotation axis can vary, and hence the rate of rotation can vary (because the product of the moment of inertia and the rate of rotation is equal to the angular momentum, which is fixed). For example, Hyperion, a moon of Saturn, exhibits this behaviour, and its rotation period is described as chaotic.

Earth

Earth's rotation period relative to the Sun (its mean solar day) consists of 86,400 seconds of mean solar time, by definition. Each of these seconds is slightly longer than an SI second because Earth's solar day is now slightly longer than it was during the 19th century, due to tidal deceleration. The mean solar second between 1750 and 1892 was chosen in 1895 by Simon Newcomb as the independent unit of time in his Tables of the Sun. These tables were used to calculate the world's ephemerides between 1900 and 1983, so this second became known as the ephemeris second. The SI second was made equal to the ephemeris second in 1967.

Earth's rotation period relative to the fixed stars, called its stellar day by the International Earth Rotation and Reference Systems Service (IERS), is 86164.098 903 691 seconds of mean solar time (UT1) (23h 56m 4.098 903 691s). Earth's rotation period relative to the precessing or moving mean vernal equinox, its sidereal day, is 86164.090 530 832 88 seconds of mean solar time (UT1) (23h 56m 4.090 530 832 88s). Thus the sidereal day is shorter than the stellar day by about 8.4 ms. The length of the mean solar day in SI seconds is available from the IERS for the periods 1623–2005 and 1962–2005. Recently (1999–2005) the average annual length of the mean solar day in excess of 86400 SI seconds has varied between 0.3 ms and 1 ms, which must be added to both the stellar and sidereal days given in mean solar time above to obtain their lengths in SI seconds.

Rotation period of selected objects

Comparison of the rotation period (sped up 10 000 times, negative values denoting retrograde), flattening and axial tilt of the planets and the Moon (SVG animation)
Celestial objects Rotation period with respect to distant stars, the sidereal rotation period (compared to Earth's mean Solar days) Synodic rotation period (mean Solar day) Apparent rotational period
viewed from Earth
Sun* 25.379995 days (Carrington rotation)
35 days (high latitude)
25d 9h 7m 11.6s
35d
~28 days (equatorial)
Mercury 58.6462 days 58d 15h 30m 30s 176 days
Venus −243.0226 days −243d 0h 33m −116.75 days
Earth 0.99726968 days 0d 23h 56m 4.0910s 1.00 days (24h 00m 00s)
Moon 27.321661 days (equal to sidereal orbital period due to spin-orbit locking, a sidereal lunar month) 27d 7h 43m 11.5s 29.530588 days (equal to synodic orbital period, due to spin-orbit locking, a synodic lunar month) none (due to spin-orbit locking)
Mars 1.02595675 days 1d 0h 37m 22.663s 1.02749125 days
Ceres 0.37809 days 0d 9h 4m 27.0s 0.37818 days
Jupiter 0.41354 days(average)
0.4135344 days (deep interior)
0.41007 days (equatorial)
0.4136994 days (high latitude)
0d 9h 55m 30s
0d 9h 55m 29.37s
0d 9h 50m 30s
0d 9h 55m 43.63s
0.41358 d (9 h 55 m 33 s) (average)
Saturn 0.44002+0.00130
−0.00091
days (average, deep interior)
0.44401 days (deep interior)
0.4264 days (equatorial)
0.44335 days (high latitude)
10h 33m 38s + 1m 52s
1m 19s

0d 10h 39m 22.4s
0d 10h 14m 00s[circular reference]
0d 10h 38m 25.4s
0.43930 d (10 h 32 m 36 s)
Uranus −0.71833 days −0d 17h 14m 24s −0.71832 d (−17 h 14 m 23 s)
Neptune 0.67125 days 0d 16h 6m 36s 0.67125 d (16 h 6 m 36 s)
Pluto −6.38718 days (synchronous with Charon) –6d 9h 17m 32s −6.38680 d (–6d 9h 17m 0s)
Haumea 0.1631458 ±0.0000042 days 0d 3h 56m 43.80 ±0.36s 0.1631461 ±0.0000042 days
Makemake 0.9511083 ±0.0000042 days 22h 49m 35.76 ±0.36s 0.9511164 ±0.0000042 days
Eris ~1.08 days 25h ~54m ~1.08 days

* See Solar rotation for more detail.

See also


This page was last updated at 2022-09-17 08:37 UTC. Update now. View original page.

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