- Solid geometry
In
mathematics , solid geometry was the traditional name for thegeometry of three-dimensionalEuclidean space — for practical purposes the kind ofspace we live in. It was developed following the development ofplane geometry . Stereometry deals with themeasurement s ofvolume s of various solid figures: cylinder, circular cone, truncated cone,sphere , prisms,blade s, wine casks.The
Pythagorean s had dealt with the sphere andregular solid s, but thepyramid , prism, cone and cylinder were not studied until the Platonists. Eudoxus established their measurement, proving the pyramid and cone to have one-third the volume of a prism and cylinder on the same base and of the same height, and was probably the discoverer of a proof that the volume of a sphere is proportional to the cube of itsradius .See also:
Archimedes ,Demiurge ,Johannes Kepler ,planimetry ,Plato ,Timaeus (dialogue) "...paraphrased and taken in part from the
1911 Encyclopædia Britannica "Basic topics of solid geometry
Basic topics are:
* incidence of planes and lines
*dihedral angle andsolid angle
* the cube,cuboid ,parallelepiped
* thetetrahedron and other pyramids
* prisms
*octahedron ,dodecahedron ,icosahedron
* cones and cylinders
* thesphere
* otherquadric s:spheroid ,ellipsoid ,paraboloid andhyperboloid s.Other topics
More advanced are the study of
*
projective geometry of three dimensions leading to
* proof ofDesargues' theorem by using an extra dimension
* furtherpolyhedra
*descriptive geometry .Analytic geometry and vector techniques have a major impact by allowing the systematic use of linear equations and matrix algebra; this becomes more important for higher dimensions. A major reason to study this subject is the application tocomputer graphics , meaning thatalgorithm s become important.
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