5: Linear Transformations

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Learn about linear transformations and their relationship to matrices.

In practice, one is often lead to ask questions about the geometry of a transformation: a function that takes an input and produces an output. This kind of question can be answered by linear algebra if the transformation can be expressed by a matrix.

5.1: Prelude to Linear Transformations and Matrix Algebra
This page explores the non-linear complexities of a robot arm's joint movements and hand positions through the transformation function \(f(\theta,\phi,\psi)\). It discusses the relationship between matrices and transformations, covering how transformations can be expressed with matrices, their properties, and how matrix multiplication relates to composition. The chapter culminates in understanding matrix arithmetic and solving matrix equations.
5.2: Matrix Transformations
This page provides an overview of matrix transformations in linear algebra, emphasizing their geometric interpretation in \(\mathbb{R}^2\) and their applications in robotics and computer graphics. It discusses key concepts such as domain, codomain, range, and the identity transformation while illustrating various transformations like rotation, shear, and projection.
5.3: One-to-one and Onto Transformations
This page discusses the concepts of one-to-one and onto transformations in linear algebra, focusing on matrix transformations. It defines one-to-one as each output having at most one input and outlines examples and theorems related to this property. The text emphasizes that a transformation is onto if every output corresponds to some input.
5.4: Linear Transformations
This page covers linear transformations and their connections to matrix transformations, defining properties necessary for linearity and providing examples of both linear and non-linear transformations. It highlights the importance of the zero vector, standard coordinate vectors, and defines transformations like rotations, dilations, and the identity transformation.
5.5: The Invertible Matrix Theorem
This page explores the Invertible Matrix Theorem, detailing equivalent conditions for a square matrix \(A\) to be invertible, such as having \(n\) pivots and unique solutions for \(Ax=b\). It includes proofs and examples, emphasizes the theorem's importance, and presents a corollary linking inverses to invertibility.

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