A visual binary is a gravitationally bound binary star system that can be resolved into two stars. These stars are estimated, via Kepler's third law, to have periods ranging from a few years to thousands of years. A visual binary consists of two stars, usually of a different brightness. Because of this, the brighter star is called the primary and the fainter one is called the companion. If the primary is too bright, relative to the companion, this can cause a glare making it difficult to resolve the two components.[1] However, it is possible to resolve the system if observations of the brighter star show it to wobble about a centre of mass.[2] In general, a visual binary can be resolved into two stars with a telescope if their centres are separated by a value greater than or equal to one arcsecond, but with modern professional telescopes, interferometry, or space-based equipment, stars can be resolved at closer distances.
For a visual binary system, measurements taken need to specify, in arc-seconds, the apparent angular separation on the sky and the position angle which is the angle measured eastward from North in degrees of the companion star relative to the primary star. Taken over a period of time, the apparent relative orbit of the visual binary system will appear on the celestial sphere. The study of visual binaries reveals useful stellar characteristics: masses, densities, surface temperatures, luminosity, and rotation rates.[3]
In order to work out the masses of the components of a visual binary system, the distance to the system must first be determined, since from this astronomers can estimate the period of revolution and the separation between the two stars. The trigonometric parallax provides a direct method of calculating a star's mass. This will not apply to the visual binary systems, but it does form the basis of an indirect method called the dynamical parallax.
In order to use this method of calculating distance, two measurements are made of a star, one each at opposite sides of the Earth's orbit about the Sun. The star's position relative to the more distant background stars will appear displaced. The parallax value is considered to be the displacement in each direction from the mean position, equivalent to the angular displacement from observations one astronomical unit apart. The distance
d
d=
| 1 | |
| \tan(p) |
p
This method is used solely for binary systems. The mass of the binary system is assumed to be twice that of the Sun. Kepler's Laws are then applied and the separation between the stars is determined. Once this distance is found, the distance away can be found via the arc subtended in the sky, providing a temporary distance measurement. From this measurement and the apparent magnitudes of both stars, the luminosities can be found, and by using the mass–luminosity relationship, the masses of each star. These masses are used to re-calculate the separation distance, and the process is repeated a number of times, with accuracies as high as 5% being achieved. A more sophisticated calculation factors in a star's loss of mass over time.[5]
Spectroscopic parallax is another commonly used method for determining the distance to a binary system. No parallax is measured, the word is simply used to place emphasis on the fact that the distance is being estimated. In this method, the luminosity of a star is estimated from its spectrum. It is important to note that the spectra from distant stars of a given type are assumed to be the same as the spectra of nearby stars of the same type. The star is then assigned a position on the Hertzsprung-Russel diagram based on where it is in its life-cycle. The star's luminosity can be estimated by comparison of the spectrum of a nearby star. The distance is then determined via the following inverse square law:
b=
| L | |
| 4\pid2 |
where
b
L
Using the Sun as a reference we can write
| L | |
| L\odot |
=(
| )( | |||||||
| b |
| d2 | |
| b\odot |
)
where the subscript
\odot
Rearranging for
d2
d2=(
| L | )( | |
| L\odot |
| b\odot | |
| b |
)
The two stars orbiting each other, as well as their centre of mass, must obey Kepler's laws. This means that the orbit is an ellipse with the centre of mass at one of the two foci (Kepler's 1st law) and the orbital motion satisfies the fact that a line joining the star to the centre of mass sweeps out equal areas over equal time intervals (Kepler's 2nd law). The orbital motion must also satisfy Kepler's 3rd law.
Kepler's 3rd Law can be stated as follows: "The square of the orbital period of a planet is directly proportional to the cube of its semi-major axis." Mathematically, this translates as
T2\proptoa3
T
a
Consider a binary star system. This consists of two objects, of mass
m1
m2
m1
r1
v1
m2
r2
v2
r
To arrive at Newton's version of Kepler's 3rd law we can start by considering Newton's 2nd law which states: "The net force acting on an object is proportional to the objects mass and resultant acceleration."
Fnet=\sumFi=ma
Fnet
m
a
Applying the definition of centripetal acceleration to Newton's second law gives a force of
F=
| mv2 | |
| r |
v=
| 2\pir | |
| T |
F1=
| 4\pi2m1r1 | |
| T2 |
F2=
| 4\pi2m2r2 | |
| T2 |
If we apply Newton's 3rd law- "For every action there is an equal and opposite reaction"
F12=-F21
| 4\pi2m1r1 | |
| T2 |
=
| 4\pi2m2r2 | |
| T2 |
r1m1=r2m2
The separation
r
r=r1+r2
r1
r2
Now we can substitute this expression into one of the equations describing the force on the stars and rearrange for
r1
r2
r1=
| m2a | |
| (m1+m2) |
Substituting this equation into the equation for the force on one of the stars, setting it equal to Newton's Universal Law of Gravitation (namely,
F=Gm1m2/a2
T2=
| 4\pi2a3 | |
| G(m1+m2) |
G
Binary systems are particularly important here because they are orbiting each other, their gravitational interaction can be studied by observing parameters of their orbit around each other and the centre of mass. Before applying Kepler's 3rd Law, the inclination of the orbit of the visual binary must be taken into account. Relative to an observer on Earth, the orbital plane will usually be tilted. If it is at 0° the planes will be seen to coincide and if at 90° they will be seen edge on. Due to this inclination, the elliptical true orbit will project an elliptical apparent orbit onto the plane of the sky. Kepler's 3rd law still holds but with a constant of proportionality that changes with respect to the elliptical apparent orbit.[11] The inclination of the orbit can be determined by measuring the separation between the primary star and the apparent focus. Once this information is known the true eccentricity and the true semi-major axis can be calculated since the apparent orbit will be shorter than the true orbit, assuming an inclination greater than 0°, and this effect can be corrected for using simple geometry
| a= | a'' |
| p'' |
Where
a''
p''
Once the true orbit is known, Kepler's 3rd law can be applied. We re-write it in terms of the observable quantities such that
(m1+m2)T2=
| 4\pi2(a''/p'')3 | |
| G |
From this equation we obtain the sum of the masses involved in the binary system. Remembering a previous equation we derived,
r1m1=r2m2
where
r1+r2=r
we can solve the ratio of the semi-major axis and therefore a ratio for the two masses since
| a1'' | |
| a2'' |
=
| a1 | |
| a2 |
and
| a1 | |
| a2 |
=
| m2 | |
| m1 |
The individual masses of the stars follow from these ratios and knowing the separation between each star and the centre of mass of the system.
In order to find the luminosity of the stars, the rate of flow of radiant energy, otherwise known as radiant flux, must be observed. When the observed luminosities and masses are graphed, the mass–luminosity relation is obtained. This relationship was found by Arthur Eddington in 1924.
| L | |
| L\odot |
=\left(
| M | |
| M\odot |
\right)\alpha
Where L is the luminosity of the star and M is its mass. L⊙ and M⊙ are the luminosity and mass of the Sun.[12] The value
\alpha
| L | |
| L\odot |
≈ .23\left(
| M | |
| M\odot |
\right)2.3 (M<.43M\odot)
| L | |
| L\odot |
=\left(
| M | |
| M\odot |
\right)4 (.43M\odot<M<2M\odot)
| L | |
| L\odot |
≈ 1.5\left(
| M | |
| M\odot |
\right)3.5 (2M\odot<M<20M\odot)
| L | |
| L\odot |
\varpropto
| M | |
| M\odot |
(M>20M\odot)
The greater a star's luminosity, the greater its mass will be. The absolute magnitude or luminosity of a star can be found by knowing the distance to it and its apparent magnitude. The stars bolometric magnitude is plotted against its mass, in units of the Sun's mass. This is determined through observation and then the mass of the star is read of the plot. Giants and main sequence stars tend to agree with this, but super giants do not and neither do white dwarfs. The Mass–Luminosity Relation is very useful because, due to the observation of binaries, particularly the visual binaries since the masses of many stars have been found this way, astronomers have gained insight into the evolution of stars, including how they are born.[5] [12] [14]
Generally speaking, there are three classes of binary systems. These can be determined by considering the colours of the two components.
"1. Systems consisting of a red or reddish primary star and a blueish secondary star, usually a magnitude or more fainter...2. Systems in which the differences in magnitude and colour are both small...3. Systems in which the fainter star is the redder of the two..."
The luminosity of class 1. binaries is greater than that of class 3. binaries. There is a relationship between the colour difference of binaries and their reduced proper motions. In 1921, Frederick C. Leonard, at the Lick Observatory, wrote "1. The spectrum of the secondary component of a dwarf star is generally redder than that of the primary, whereas the spectrum of the fainter component of a giant star is usually bluer than that of the brighter one. In both cases, the absolute difference in spectral class seems ordinarily to be related to the disparity between the components...2. With some exceptions, the spectra of the components of double stars are so related to each other that they conform to the Hertzsprung-Russell configuration of the stars..."
An interesting case for visual binaries occurs when one or both components are located above or below the Main-Sequence. If a star is more luminous than a Main-Sequence star, it is either very young, and therefore contracting due to gravity, or is at the post Main-Sequence stage of its evolution. The study of binaries is useful here because, unlike with single stars, it is possible to determine which reason is the case. If the primary is gravitationally contracting, then the companion will be further away from the Main-Sequence than the primary since the more massive star becomes a Main-Sequence star much faster than the less massive star.[15]