Spherical Trigonometry and Navigational Calculations Badar Abbas MS(CE)-57 College of EME
Outline Background Introduction History Navigational Terminology Spherical Trigonometry Navigational Calculations Conclusion
Background
Introduction Navigation Latin roots: navis (“ship”) and agere (“to move or direct”) Coordinate System for Quantitative Calculations (Latitude and Longitude) Spherical Trigonometry Applications (Navigation, Mapping, INS, GPS and Astronomy)
History “Sphaerica” by Menelaus of Alexandria Islamic Period (8th to 14th Century ) Abu al-Wafa al-Buzjani in 10th century (Angle addition identities and Law of Sines). “The Book of Unknown Arcs of a Sphere” by Al-Jayyani (1060 AD). Nasir al-Din al Tusi and al-Battani in 13th Century. John Napier (Logarithms)
Navigational Terminology Earth (Flattened Sphere or Spheroid) 6336 km at the equator and 6399 km at the poles. Flattening ( (a-b)/a) GPS Calculations (WGS-84) uses:- Flattening = 1/298.257222101 a = 6378.137 km 6370 km radius gives an error of up to about 0.5%.
Navigational Terminology Two Angles Required Degrees in geographic usage, radians in calculations Latitude: The angle at the center of the Earth between the plane of the equator and a line through the center passing through the surface at the point. North Pole: (+90° or 90° N). South Pole: (- 90° or 90° S). Parallels: Lines of constant latitude.
Navigational Terminology Longitude: The angle at the center of the planet between two planes passing through the center and perpendicular to the plane of the Equator. One plane passes through the surface point in question, and the other plane is the prime meridian (0º longitude). Range: -180º(180º W) to + 180º(180º E). Meridians: Lines of constant longitude. All meridians converge at poles.
Navigational Terminology Azimuth/Bearing/True Course: The angle a line makes with a meridian, taken clockwise from north. North=0°, East=90°, South=180°, West=270° Rhumb Line: The curve that crosses each meridian at the same angle. More distance, but is easier to navigate. Complicated calculations.
Spherical Trigonometry Great and Small Circles: A section of a sphere by a plane passing through the center is great circle. Other circles are called small circles. All meridians are great circles All parallels, with the exception of the equator, are small circles Geodesic: The smaller arc of the great circle through two given points. The shortest distance. The “lines” in spherical trigonometry
Spherical Trigonometry Spherical Triangle Vertices Sides (a, b and c) Angles less than π Each side correspond to a geodesic. 1 nm = 1 min of lat Angles (A, B and C) Each less than π. If one point is North Pole, other angles give azimuth.
Spherical Trigonometry Let the sphere be of unit radius. Z-axis = OA X-axis = OB projected into the plane perpendicular to Z-axis From dot product rule: This gives
Spherical Trigonometry The Laws of Cosines The Law of Sines The Law of Tangets
Spherical Trigonometry Girard’s Theorem The sum of the angles is between π and 3π radians (180º and 540º). The spherical excess (E) is:- E = A + B + C – π Then the area (A) with radius R is:- In the Fig all angles are π/2, so E is also π/2. The area (A) is then πR2/2, which is 1/8 of the area of the Sphere (4πR2).
Spherical Trigonometry Spherical geometry is a simplest model of elliptic geometry. Elliptic geometry is one of the two forms of non-Euclidean geometry. It is inconsistent with the famous “parallel postulate” of Euclid. In elliptic geometry two distinct lines are never parallel and triangle sum is always greater than 180. In the other form (hyperbolic) two distinct lines are always parallel and triangle sum is always less than 180.
Navigational Calculations Distance and Bearing: Follows directly from Law of Cosines:- Bearing can be calculated by:- Then using two-argument inverse tan function:-
Navigational Calculations Dead Reckoning Dead reckoning (DR) is the process of estimating one's current position based upon a previously determined position. In studies of animal navigation, dead reckoning is more commonly known as path integration. The algorithm to compute the position of the destination if the distance and azimuth from previous position is known is given in the paper. Some links for software implementations can be found in the paper. The distance, reckon and dreckon function in MATLAB are also helpful.
Conclusion Spherical trigonometry is a prerequisite for good understanding of navigation, astronomy, GPS, INS and GIS. For the most accurate navigation and map projection calculation, ellipsoidal forms of the equations are used. It is much more pertinent to integrate course of spherical trigonometry in the engineering curriculum.
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