euclidean space การใช้

• It is true, however, that every locally Euclidean space is T 1.
• A three-dimensional Euclidean space is a special case of a Euclidean space.
• This article is about vectors strictly defined as arrows in Euclidean space.
• In the case of Cartesian coordinates in Euclidean space, one can write
• Similarly, Euclidean space is given coordinates where every point has three coordinates.
• The original space investigated by Euclid is now called three-dimensional Euclidean space.
• Because the simple roots span a Euclidean space, S is positive definite.
• A three-dimensional Euclidean space is a special case of a Euclidean space.
• Let be a Euclidean space and a reduced crystallographic root system in.
• Several notations specific to the case of three-dimensional Euclidean space are common.
• For Euclidean spaces, the inner product is equivalent to the dot product.
• A prominent instance is the depiction of spacetime as a pseudo-Euclidean space.
• Although a manifold locally resembles Euclidean space, globally it may not.
• Polytopes also began to be studied in non-Euclidean spaces such as hyperbolic space.
• Euclidean space itself is not compact since it is not bounded.
• A similar approach should work in any number of dimensions of Euclidean space.
• Some of these can be smoothly modeled in Euclidean space, and others cannot.
• Unlike Euclidean space, Minkowski space has an inner product with an indefinite signature.
• In this sense we have " the " three-dimensional Euclidean space.
• See also fixed points of isometry groups in Euclidean space.