Vector (mathematics): Difference between revisions
imported>Jitse Niesen m ({{subpages}} - see CZ:Subpages) |
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A '''vector''' quantity | A '''vector''' is a videly used concept in mathematics, physics and all realted sciences. Intuitively, it may be seen as a quantity which has both a magnitude and a direction. For example in elementary [[physics]], velocity has both a magnitude and a direction, whereas speed is a [[scalar]] quantity with only a magnitude. Typical visualisation of a 2- or 3-dimentional vector is an arrow. More generally, a vector can be described as a n-tuple of numbers that transforms in a specific way by isometries of the frame of reference. | ||
In mathematics, an abstract concept of [[vector space]] has been introduced. It describes in an axiomatic way the detailed properties one expects of objects that can be labelled as 'vectors'. Thus, vector is defined as a member of ''any'' vector space. Typical vector spaces include the real line, the Euclidean plane or space, the set of continuous functions on the line (with the supremum norm taken to be the length of a vector). |
Revision as of 07:58, 20 November 2007
A vector is a videly used concept in mathematics, physics and all realted sciences. Intuitively, it may be seen as a quantity which has both a magnitude and a direction. For example in elementary physics, velocity has both a magnitude and a direction, whereas speed is a scalar quantity with only a magnitude. Typical visualisation of a 2- or 3-dimentional vector is an arrow. More generally, a vector can be described as a n-tuple of numbers that transforms in a specific way by isometries of the frame of reference.
In mathematics, an abstract concept of vector space has been introduced. It describes in an axiomatic way the detailed properties one expects of objects that can be labelled as 'vectors'. Thus, vector is defined as a member of any vector space. Typical vector spaces include the real line, the Euclidean plane or space, the set of continuous functions on the line (with the supremum norm taken to be the length of a vector).