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2. Stereographic projection - Wikipedia

   en.wikipedia.org/wiki/Stereographic_projection

   Specifically, stereographic projection from the north pole (0,1) onto the x-axis gives a one-to-one correspondence between the rational number points (x, y) on the unit circle (with y ≠ 1) and the rational points of the x-axis. If (⁠ m / n ⁠, 0) is a rational point on the x-axis, then its inverse stereographic projection is the point

3. Peirce quincuncial projection - Wikipedia

   en.wikipedia.org/wiki/Peirce_quincuncial_projection

   The maturation of complex analysis led to general techniques for conformal mapping, where points of a flat surface are handled as numbers on the complex plane.While working at the United States Coast and Geodetic Survey, the American philosopher Charles Sanders Peirce published his projection in 1879, [2] having been inspired by H. A. Schwarz's 1869 conformal transformation of a circle onto a ...

4. Spherical circle - Wikipedia

   en.wikipedia.org/wiki/Spherical_circle

   A circle with non-zero geodesic curvature is called a small circle, and is analogous to a circle in the plane. A small circle separates the sphere into two spherical disks or spherical caps, each with the circle as its boundary. For any triple of distinct non-antipodal points a unique small circle passes through all three.

5. Orthographic map projection - Wikipedia

   en.wikipedia.org/wiki/Orthographic_map_projection

   They are written in terms of longitude (λ) and latitude (φ) on the sphere. Define the radius of the sphere R and the center point (and origin) of the projection (λ 0, φ 0). The equations for the orthographic projection onto the (x, y) tangent plane reduce to the following: [1]

6. Map projection - Wikipedia

   en.wikipedia.org/wiki/Map_projection

   For example, a small circle of fixed radius (e.g., 15 degrees angular radius). [14] Sometimes spherical triangles are used. [citation needed] In the first half of the 20th century, projecting a human head onto different projections was common to show how distortion varies across one projection as compared to another. [15]

7. List of map projections - Wikipedia

   en.wikipedia.org/wiki/List_of_map_projections

   Projects the globe onto eight octants (Reuleaux triangles) with no meridians and no parallels. 1909 Cahill's butterfly map: Polyhedral Compromise Bernard Joseph Stanislaus Cahill: Projects the globe onto an octahedron with symmetrical components and contiguous landmasses that may be displayed in various arrangements. 1975 Cahill–Keyes projection

8. Spherical geometry - Wikipedia

   en.wikipedia.org/wiki/Spherical_geometry

   There is a natural unit of angle measurement (based on a revolution), a natural unit of length (based on the circumference of a great circle) and a natural unit of area (based on the area of the sphere). Each great circle is associated with a pair of antipodal points, called its poles which are the common intersections of the set of great ...

9. Gauss map - Wikipedia

   en.wikipedia.org/wiki/Gauss_Map

   The Gauss map provides a mapping from every point on a curve or a surface to a corresponding point on a unit sphere. In this example, the curvature of a 2D-surface is mapped onto a 1D unit circle. In differential geometry , the Gauss map of a surface is a function that maps each point in the surface to a unit vector that is orthogonal to the ...