transformation matrix
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English
[edit]Noun
[edit]transformation matrix (plural transformation matrices or transformation matrixes)
- (linear algebra) A matrix (of dimension n×m) that represents some linear transformation from ℝm→ℝn.
- Given a linear transformation T(x) in functional form, its transformation matrix can be constructed by applying T to each vector of the standard basis, then inserting the results into the columns of the new matrix.
- A transformation matrix of dimension n×m operates on a column vector of dimension m×1 to produce a row vector of dimension 1×n.
- 1963 [McGraw-Hill], Lawrence P. Huelsman, Circuits, Matrices and Linear Vector Spaces, 2011, Dover, page 191,
- We would like to make as many as possible of the elements of the transformation matrix equal zero.
- 1968 [McGraw-Hill], Granino A. Korn, Theresa M. Korn, Mathematical Handbook for Scientists and Engineers, 2000, Dover, page 414,
- Refer to Sec. 14.8-6 for a procedure yielding transformation matrices T with the desired properties.
- 2005, Gerard Kim, Designing Virtual Reality Systems: The Structured Approach, Volume 1, Springer, page 47:
- The 4x4 transformation matrices are conveniently used to convert various entities expressed in different coordinate systems into another.
Derived terms
[edit]- wave transformation matrix (electronic engineering)
Translations
[edit]matrix that represents a linear transformation
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Further reading
[edit]- Column vector on Wikipedia.Wikipedia
- Row vector on Wikipedia.Wikipedia
- Change of basis on Wikipedia.Wikipedia
- Image rectification on Wikipedia.Wikipedia
- Transformation (function) on Wikipedia.Wikipedia
- Transformation geometry on Wikipedia.Wikipedia