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Absolute magnitude

In astronomy, absolute magnitude (M) is a measure of the luminosity of a celestial object on an inverse logarithmic astronomical magnitude scale. An object's absolute magnitude is defined to be equal to the apparent magnitude that the object would have if it were viewed from a distance of exactly 10 parsecs (32.6 light-years), without extinction (or dimming) of its light due to absorption by interstellar matter and cosmic dust. By hypothetically placing all objects at a standard reference distance from the observer, their luminosities can be directly compared among each other on a magnitude scale. For Solar System bodies that shine in reflected light, a different definition of absolute magnitude (H) is used, based on a standard reference distance of one astronomical unit.

This article is about the brightness of stars. For the science fiction magazine, see Absolute Magnitude (magazine).

Absolute magnitudes of stars generally range from approximately −10 to +20. The absolute magnitudes of galaxies can be much lower (brighter).


The more luminous an object, the smaller the numerical value of its absolute magnitude. A difference of 5 magnitudes between the absolute magnitudes of two objects corresponds to a ratio of 100 in their luminosities, and a difference of n magnitudes in absolute magnitude corresponds to a luminosity ratio of 100n/5. For example, a star of absolute magnitude MV = 3.0 would be 100 times as luminous as a star of absolute magnitude MV = 8.0 as measured in the V filter band. The Sun has absolute magnitude MV = +4.83.[1] Highly luminous objects can have negative absolute magnitudes: for example, the Milky Way galaxy has an absolute B magnitude of about −20.8.[2]


As with all astronomical magnitudes, the absolute magnitude can be specified for different wavelength ranges corresponding to specified filter bands or passbands; for stars a commonly quoted absolute magnitude is the absolute visual magnitude, which uses the visual (V) band of the spectrum (in the UBV photometric system). Absolute magnitudes are denoted by a capital M, with a subscript representing the filter band used for measurement, such as MV for absolute magnitude in the V band.


An object's absolute bolometric magnitude (Mbol) represents its total luminosity over all wavelengths, rather than in a single filter band, as expressed on a logarithmic magnitude scale. To convert from an absolute magnitude in a specific filter band to absolute bolometric magnitude, a bolometric correction (BC) is applied.[3]

L is the Sun's luminosity (bolometric luminosity)

L is the star's luminosity (bolometric luminosity)

Mbol,⊙ is the bolometric magnitude of the Sun

Mbol,★ is the bolometric magnitude of the star.

dBO is the distance between the body and the observer

dBS is the distance between the body and the Sun

dOS is the distance between the observer and the Sun

d0, a factor, is the constant 1 AU, the average distance between the Earth and the Sun

unit conversion

Meteors[edit]

For a meteor, the standard distance for measurement of magnitudes is at an altitude of 100 km (62 mi) at the observer's zenith.[44][45]

Araucaria Project

– relates absolute magnitude or luminosity versus spectral color or surface temperature.

Hertzsprung–Russell diagram

radio astronomer's preferred unit – linear in power/unit area

Jansky

List of most luminous stars

Photographic magnitude

– the magnitude for extended objects

Surface brightness

– the typical calibration point for star flux

Zero point (photometry)

Archived 22 February 2003 at the Wayback Machine

Reference zero-magnitude fluxes

International Astronomical Union

Absolute Magnitude of a Star calculator

The Magnitude system

Archived 27 October 2021 at the Wayback Machine

About stellar magnitudes

SIMBAD

Obtain the magnitude of any star

Converting magnitude of minor planets to diameter

Another table for converting asteroid magnitude to estimated diameter