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{{Unreferenced stub|auto=yes|date=December 2009}} | |||
'''Vector decomposition''' is the decomposition of a [[Vector (geometric)|vector]] of '''R'''<sup>''n''</sup> into several vectors, all [[linearly independent]] (in mutually distinct directions in the ''n''-dimensional space). | |||
==Vector decomposition in two dimensions== | |||
In two dimensions, a vector can be decomposed in many ways. In the [[Cartesian coordinate system]], the vector is decomposed into a portion along the <math>\hat{x}</math> or <math>\hat{i}</math> and the <math>\hat{y}</math> or <math>\hat{j}</math> directions. | |||
One of the most common situations is when given a vector with magnitude and direction (or given in [[polar coordinate system|polar]] form), it can be converted into the [[Vector (geometric)#Addition and subtraction|sum]] of two perpendicular vectors (or converted to a Cartesian coordinate). In order to do this it makes use of trigonometry, such as sine and cosine. | |||
==Application in physics== | |||
Vector decomposition is used in physics to help adding vectors and hence solve many mechanical problems involving [[force]], [[work (physics)|work]], [[momentum]], etc. | |||
==See also== | |||
* [[Coordinate system]] | |||
* [[Helmholtz decomposition]] (decomposition of a [[vector field]]) | |||
[[Category:Vectors]] | |||
{{linear-algebra-stub}} |
Revision as of 19:38, 13 December 2013
Template:Unreferenced stub Vector decomposition is the decomposition of a vector of Rn into several vectors, all linearly independent (in mutually distinct directions in the n-dimensional space).
Vector decomposition in two dimensions
In two dimensions, a vector can be decomposed in many ways. In the Cartesian coordinate system, the vector is decomposed into a portion along the or and the or directions.
One of the most common situations is when given a vector with magnitude and direction (or given in polar form), it can be converted into the sum of two perpendicular vectors (or converted to a Cartesian coordinate). In order to do this it makes use of trigonometry, such as sine and cosine.
Application in physics
Vector decomposition is used in physics to help adding vectors and hence solve many mechanical problems involving force, work, momentum, etc.
See also
- Coordinate system
- Helmholtz decomposition (decomposition of a vector field)