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Great Circle Navigation with Vectorial Methods

Published online by Cambridge University Press:  28 May 2010

Vincenzo Nastro
Affiliation:
(University of Naples “Parthenope”, Italy)
Urbano Tancredi*
Affiliation:
(University of Naples “Parthenope”, Italy)
*

Abstract

The present paper is concerned with the solution of a series of practical problems relevant to great circle navigation, including the determination of the true course at any point on the great circle route and the determination of the lateral deviation from a desired great circle route. Intersection between two great circles or between a great circle and a parallel is also analyzed. These problems are approached by means of vector analysis, which yields solutions in a very compact form that can be computed numerically in a very straightforward manner. This approach is thus particularly appealing for performing computer-aided great circle navigation.

Type
Research Article
Copyright
Copyright © The Royal Institute of Navigation 2010

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References

REFERENCES

Nastro, V. (2000), Problemi di navigazione ortodromica risolti con notazioni vettoriali, Studi in memoria di Antonino Sposito, 3747.Google Scholar
Earle, M.A. (2005). Vector solutions for great circle navigation. The Journal of Navigation, 58, 451457.CrossRefGoogle Scholar
Tseng, W.K. and Lee, H.S. (2007). The vector function for distance travelled in great circle navigation. The Journal of Navigation, 60, 150164.CrossRefGoogle Scholar