On the basis of the simple relation between spherical excess and arc to chord correction, formulas to compute the arc to chord correction for different map projections can be derived. If we know the arc to chord correction, however, the spherical/ellipsoidal excess c,nd thus the area of figures on the surface of the sphere or ellipsoid, which are bounded by orthodromes, can be computed simply. Therefore we do not need to know the datum surface coordinates of a figure determined by its corner points ' coordinates on a conformal' map projection
This work serves as a supplement to the paper titled A Square Equal-area Map Projection with Low Ang...
This site offers descriptions for each of the major map projections now in use. The author treats ea...
In this paper, the core idea of the conversion relationship between the ellipsoidal harmonic coeffic...
On the basis of the simple relation between spherical excess and arc to chord correction, formulas ...
The paper presents a method of construction of cylindrical and azimuthal equalarea map projections o...
We studied the numerical approximation problem of distortion in map projections. Most widely used di...
Ab s t r a c t: The maximally regular net on the unit sphere is adapted for the surface of the rotat...
5. Mapping Regions on the Surface of the Earth. The Differential Geometry of Curves and Surfaces is ...
The spherical Mercator projection on geocentric latitudes is orders of magnitude closer to the ellip...
Fat arcs form bounding boxes for planar curves. An example on approximation by fat arcs, provided by...
Conic map projections are appropriate for mapping regions at medium and large scales with east-west ...
The computation of accurate geoid undulations is usually done combining potential coefficient inform...
In books and textbooks on map projections, cylindrical, conic and azimuthal projections are usually ...
We develop exact algorithms for geometric operations on general circles and circular arcs on the sph...
AbstractWe begin by studying the surface area of an ellipsoid in En as the function of the lengths o...
This work serves as a supplement to the paper titled A Square Equal-area Map Projection with Low Ang...
This site offers descriptions for each of the major map projections now in use. The author treats ea...
In this paper, the core idea of the conversion relationship between the ellipsoidal harmonic coeffic...
On the basis of the simple relation between spherical excess and arc to chord correction, formulas ...
The paper presents a method of construction of cylindrical and azimuthal equalarea map projections o...
We studied the numerical approximation problem of distortion in map projections. Most widely used di...
Ab s t r a c t: The maximally regular net on the unit sphere is adapted for the surface of the rotat...
5. Mapping Regions on the Surface of the Earth. The Differential Geometry of Curves and Surfaces is ...
The spherical Mercator projection on geocentric latitudes is orders of magnitude closer to the ellip...
Fat arcs form bounding boxes for planar curves. An example on approximation by fat arcs, provided by...
Conic map projections are appropriate for mapping regions at medium and large scales with east-west ...
The computation of accurate geoid undulations is usually done combining potential coefficient inform...
In books and textbooks on map projections, cylindrical, conic and azimuthal projections are usually ...
We develop exact algorithms for geometric operations on general circles and circular arcs on the sph...
AbstractWe begin by studying the surface area of an ellipsoid in En as the function of the lengths o...
This work serves as a supplement to the paper titled A Square Equal-area Map Projection with Low Ang...
This site offers descriptions for each of the major map projections now in use. The author treats ea...
In this paper, the core idea of the conversion relationship between the ellipsoidal harmonic coeffic...