Differential Equation of a Loxodrome on a Sphere

Sergio Kos; Duško Vranić; Damir Zec

doi:10.1017/S0373463399008395

Abstract

A curve that cuts all meridians of a rotating surface at the same angle is called a loxodrome. If the shape of the Earth is approximated by a sphere, then the loxodrome is a logarithmic spiral that cuts all meridians at the same angle and asymptotically approaches the Earth's poles but never meets them. Since maritime surface navigation defines the course as the angle between the current meridian and the longitudinal direction of the ship, it may be concluded that the loxodrome is the curve of the constant course, which means that whenever navigating on an unchanging course we are navigating according to a loxodrome.

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Differential Equation of a Loxodrome on a Sphere

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Differential Equation of a Loxodrome on a Sphere

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