Angular diameter

The angular diameter or apparent size is an angular measurement describing how large a sphere or circle appears from a given point of view. In the vision sciences it is called the visual angle. The angular diameter can alternately be thought of as the angle through which an eye or camera must rotate to look from one side of an apparent circle to the opposite side.

Formula

Diagram for the formula of the angular diameter

The angular diameter of a circle whose plane is perpendicular to the displacement vector between the point of view and the centre of said circle can be calculated using the formula[1]

\delta =  2\arctan \left(\frac{d}{2D}\right),

in which \delta is the angular diameter, and d and D are the actual diameter of and the distance to the object. When D \gg d, we have \delta \approx d / D, and the result obtained is in radians.

For a spherical object whose actual diameter equals d_\mathrm{act}, and where D is the distance to the centre of the sphere, the angular diameter can be found by the formula

\delta =  2\arcsin \left(\frac{d_\mathrm{act}}{2D}\right)

The reason for the difference is that when looking at a sphere, the edges are the tangent points, which are closer to the observer than the centre of the sphere. For practical use, the distinction is only significant for spherical objects that are relatively close, since the small-angle approximation holds for  x \ll 1:[2]

\arcsin x \approx \arctan x \approx x .

Estimating angular diameter using outstretched hand

Approximate angles of 10°, 20°, 5°, and 1° for outstretched hand.

Estimates of angular diameter may be obtained by holding the hand at right angles to a fully extended arm, as shown in the figure.[3][4][5]

Use in astronomy

Angular diameter: the angle subtended by an object

In astronomy the sizes of objects in the sky are often given in terms of their angular diameter as seen from Earth, rather than their actual sizes. Since these angular diameters are typically small, it is common to present them in arcseconds. An arcsecond is 1/3600th of one degree, and a radian is 180/\pi degrees, so one radian equals 3600*180/\pi arcseconds, which is about 206265 arcseconds. Therefore, the angular diameter of an object with physical diameter d at a distance D, expressed in arcseconds, is given by:[6]

\delta = (206265) d / D arcseconds.

The angular diameter of Earth's orbit around the Sun, from a distance of one parsec, is 1″ (one arcsecond).

The angular diameter of the Sun, from a distance of one light-year, is 0.03″, and that of the Earth 0.0003″. The angular diameter 0.03″ of the Sun given above is approximately the same as that of a person at a distance of the diameter of the Earth.

This table shows the angular sizes of noteworthy celestial bodies as seen from the Earth:

Celestial body Angular diameter or size Relative size
Sun 3131 3233 3031 times the maximum value for Venus (orange bar below) / 18911953
Moon 2920 346 2832.5 times the maximum value for Venus (orange bar below) / 17602046
Helix Nebula about 16 by 28
Spire in Eagle Nebula 440 length is 280
Venus 9.67 63.00

Jupiter 29.80 50.59

Saturn 14.50 21.37

Mars 3.49 25.13

Mercury 4.54 13.02

Uranus 3.31 4.08

Neptune 2.17 2.37

Ceres 0.33 0.84

Vesta 0.20 0.64

Pluto 0.065 0.116

R Doradus 0.052 0.062

Betelgeuse 0.049 0.060

Eris 0.034 0.089

Alphard 0.00909
Alpha Centauri A 0.007
Canopus 0.006
Sirius 0.005936
Altair 0.003
Deneb 0.002
Proxima Centauri 0.001
Alnitak 0.0005
A star like Alnitak at a distance where the Hubble space telescope would just be able to see it[7] 6×10−10 arcsec
Comparison of angular diameter of the Sun, Moon and planets. To get a true representation of the sizes, view the image at a distance of 103 times the width of the "Moon: max." circle. For example, if this circle is 10 cm wide on your monitor, view it from 10.3 m away.

The table shows that the angular diameter of Sun, when seen from Earth is approximately 32 arcminutes (1920 arcseconds or 0.53 degrees), as illustrated above.

Thus the angular diameter of the Sun is about 250,000 times that of Sirius (Sirius has twice the diameter and its distance is 500,000 times as much; the Sun is 10^10 times as bright, corresponding to an angular diameter ratio of 10^5, so Sirius is roughly 6 times as bright per unit solid angle).

The angular diameter of the Sun is also about 250,000 times that of Alpha Centauri A (it has about the same diameter and the distance is 250,000 times as much; the Sun is 4×10^10 times as bright, corresponding to an angular diameter ratio of 200,000, so Alpha Centauri A is a little brighter per unit solid angle).

The angular diameter of the Sun is about the same as that of the Moon (the Sun's diameter is 400 times as large and its distance also; the Sun is 200,000 to 500,000 times as bright as the full Moon (figures vary), corresponding to an angular diameter ratio of 450 to 700, so a celestial body with a diameter of 2.5–4″ and the same brightness per unit solid angle would have the same brightness as the full Moon).

Even though Pluto is physically larger than Ceres, when viewed from Earth (e.g., through the Hubble Space Telescope) Ceres has a much larger apparent size.

While angular sizes measured in degrees are useful for larger patches of sky (in the constellation of Orion, for example, the three stars of the belt cover about 4.5 degrees of angular size), we need much finer units when talking about the angular size of galaxies, nebulae or other objects of the night sky.

Degrees, therefore, are subdivided as follows:

To put this in perspective, the full moon viewed from Earth is about 12 degree, or 30 arc minutes (or 1800 arc-seconds). The Moon's motion across the sky can be measured in angular size: approximately 15 degrees every hour, or 15 arc-seconds per second. A one-mile-long line painted on the face of the Moon would appear to us to be about one arc-second in length.

In astronomy, it is typically difficult to directly measure the distance to an object. But the object may have a known physical size (perhaps it is similar to a closer object with known distance) and a measurable angular diameter. In that case, the angular diameter formula can be inverted to yield the Angular diameter distance to distant objects as

d \equiv 2 D \tan \left( \frac{\delta}{2} \right).

In non-Euclidean space, such as our expanding universe, the angular diameter distance is only one of several definitions of distance, so that there can be different "distances" to the same object. See Distance measures (cosmology).

Non-circular objects

Many deep sky objects such as galaxies and nebulas appear as non-circular, and are thus typically given two measures of diameter: Major Diameter and Minor Diameter. For example, the Small Magellanic Cloud has a visual apparent diameter of 5° 20 × 3° 5.

Defect of illumination

Defect of illumination is the maximum angular width of the unilluminated part of a celestial body seen by a given observer. For example, if an object is 40 seconds of arc across and is 75 percent illuminated, the defect of illumination is 10 seconds of arc.

See also

References

  1. This can be derived using the formula for the length of a cord found at http://mathworld.wolfram.com/CircularSegment.html
  2. http://www.mathstat.concordia.ca/faculty/rhall/mc/arctan.pdf
  3. https://dept.astro.lsa.umich.edu/ugactivities/Labs/coords/index.html
  4. https://www.bartbusschots.ie/s/2013/06/08/photographing-satellites/
  5. Wikiversity: Physics and Astronomy Labs/Angular size
  6. Michael A. Seeds; Dana E. Backman (2010). Stars and Galaxies (7 ed.). Brooks Cole. p. 39. ISBN 978-0-538-73317-5.
  7. 800 000 times smaller angular diameter than that of Alnitak as seen from Earth. Alnitak is a blue star so it gives off a lot of light for its size. If it were 800 000 times further away then it would be magnitude 31.5, at the limit of what Hubble can see.

External links

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