Linear Transformations, Part 5

Linear Transformations

Part 5: Summary

Give the definition of a linear transformation.

Explain why any linear transformation from Rⁿ to R^m is completely determined by where it sends the standard unit vectors e₁, ... , e_n of Rⁿ. Be sure to explain how you can find T(x) for any vector x so long as you know T(e₁), ..., T(e_n).

Justify the following statement:
Any linear transformation T from Rⁿ to R^m is a matrix transformation, meaning that there is an m x n matrix A such that T(x) = Ax for all vectors x in Rⁿ.
You should explain how to find the matrix A.

Describe the geometric transformation defined by each of the matrices

and

Challenge question: Explain how each transformation could be seen as a composition of two other transformations.

Find the matrix of a linear transformation that takes the unit square to a trapezoid with vertices (0,0), (-1.5,1), (-0.5,1), and (1,0).

Clearly and concisely explain the relationships between the linear (in)dependence of rows/columns of a matrix and the injectivity/surjectivity of the linear transformation defined by the matrix.

Does every matrix define a linear transformation? Explain your answer.

Is every linear transformation defined by a matrix? Explain your answer.