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The isoazimuth is the locus of the points on the Earth's surface whose initial orthodromic course with respect to a fixed point is constant. That is, if the initial orthodromic course Z from the starting point ''S'' to the fixed point ''X'' is 80 degrees, the associated isoazimuth is formed by all points whose initial orthodromic course with respect to point ''X'' is 80° (with respect to true north). The isoazimuth is written using the notation ''isoz(X, Z)'' . The isoazimuth is of use when navigating with respect to an object of known location, such as a radio beacon. A straight line called the ''azimuth line of position'' is drawn on a map, and on most common map projections this is a close enough approximation to the isoazimuth. On the
Littrow projection The Littrow projection is a map projection developed by Joseph Johann von Littrow in 1833. It is the only conformal, retroazimuthal map projection. As a retroazimuthal projection, the Littrow shows directions, or azimuths, correctly from any po ...
, the correspondence is exact. This line is then crossed with an astronomical observation called a Sumner line, and the result gives an estimate of the navigator's position.


Isoazimutal on the spherical Earth

Let ''X'' be a fixed point on the Earth of coordinates latitude: B_2, and longitude: L_2. In a terrestrial spherical model, the equation of isoazimuth curve with initial course ''C'' passing through point S(''B'', ''L'') is: \tan(B_2)\cos(B) = \sin(B) \cos(L_2-L)+\sin(L_2-L)/\tan(C)\;


Isoazimutal of a star

In this case the ''X'' point is the illuminating pole of the observed star, and the angle ''Z'' is its
azimuth An azimuth (; from ) is the horizontal angle from a cardinal direction, most commonly north, in a local or observer-centric spherical coordinate system. Mathematically, the relative position vector from an observer ( origin) to a point ...
. The equation of the ''isoazimuthal'' Le segment capable sphérique. Navigation Nº.116 Vol.XXIX, Institut français de navigation, octubre/1981. curve for a star with coordinates (''Dec, GHA''), -
Declination In astronomy, declination (abbreviated dec; symbol ''δ'') is one of the two angles that locate a point on the celestial sphere in the equatorial coordinate system, the other being hour angle. The declination angle is measured north (positive) or ...
and Greenwich hour angle -, observed under an azimuth ''Z'' is given by: : \cot(Z)/\cos(B) = \tan(Dec)/\sin(LHA)-\tan(B)/\tan(LHA)\; where ''LHA'' is the local hour angle, and all points with latitude ''B'' and longitude ''L'', they define the curve.


See also

*
Great circle In mathematics, a great circle or orthodrome is the circular intersection of a sphere and a plane passing through the sphere's center point. Discussion Any arc of a great circle is a geodesic of the sphere, so that great circles in spher ...
*
Rhumb line In navigation, a rhumb line, rhumb (), or loxodrome is an arc crossing all meridians of longitude at the same angle, that is, a path with constant azimuth ( bearing as measured relative to true north). Navigation on a fixed course (i.e., s ...
*
Cartography Cartography (; from , 'papyrus, sheet of paper, map'; and , 'write') is the study and practice of making and using maps. Combining science, aesthetics and technique, cartography builds on the premise that reality (or an imagined reality) can ...
* Navigational algorithms


References

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External links

* Navigational Algorithms http://sites.google.com/site/navigationalalgorithms/ * Institut français de navigation https://web.archive.org/web/20140103212146/http://www.ifnavigation.org/ Cartography Navigation Celestial navigation