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convex cone. In this case, one says that a convex set C in the real vector space R
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Cone
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convex cone. In this case, one says that a convex set C in the real vector space Rn is a cone (with apex at the origin) if for every vector x in C and every nonnegative real number a, the vector ax is in C.[2] In this context, the analogues of circular cones are not usually special; in fact one is often interested in polyhedral cones.
An even more general concept is the topological cone, which is defined in arbitrary topological spaces. See also[edit] Bicone Cone (linear algebra) Cylinder (geometry) Democritus Generalized conic Hyperboloid List of shapes Pyrometric cone Quadric Rotation of axes Ruled surface Translation of axes Notes[edit] ^ Jump up to:a b c James, R. C.; James, Glenn (1992-07-31). The Mathematics Dictionary. Springer Science & Business Media. pp. 74–75. ISBN 9780412990410. ^ Jump up to:a b Grünbaum, Convex Polytopes, second edition, p. 23. ^ Weisstein, Eric W. "Cone". MathWorld. ^ Jump up to:a b Alexander, Daniel C.; Koeberlein, Geralyn M. (2014-01-01). Elementary Geometry for College Students. Cengage Learning. ISBN 9781285965901. ^ Hartshorne, Robin (2013-11-11). Geometry: Euclid and Beyond. Springer Science & Business Media. Chapter 27. ISBN 9780387226767. ^ Download 243.86 Kb. Do'stlaringiz bilan baham: 
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