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Discover Linear Algebra

Jeremy Sylvestre

IndexPrev Up Next

Front Matter
I Systems of Equations and Matrices
1 Systems of linear equations
2 Solving systems using matrices
3 Using systems of equations
4 Matrices and matrix operations
5 Matrix inverses
6 Elementary matrices
7 Special forms of square matrices
8 Determinants
9 Determinants versus row operations
10 Determinants, the adjoint, and inverses
11 Complex systems and matrices
II Vector Spaces
12 Introduction to vectors
13 Geometry of vectors
14 Orthogonal vectors
15 Geometry of linear systems
16 Abstract vector spaces
17 Subspaces
18 Linear independence
19 Basis and Coordinates
20 Dimension
21 Column, row, and null spaces
22 Change of basis
23 Complex vector spaces
III Introduction to Matrix Forms
24 Eigenvalues and eigenvectors
25 Diagonalization
26 Similarity
27 Application to systems of differential equations
28 Block-diagonal form
29 Scalar-triangular form
30 Triangular block form
31 Consequences of triangular block form
32 Elementary nilpotent form
33 Triangular-block nilpotent form
34 Jordan normal form
35 Summary of matrix forms
IV Inner Product Spaces
36 Abstract inner product spaces
37 Orthgonality
38 Orthogonal projection and best approximation
39 Matrix adjoints
40 Orthogonal/unitary diagonalization
41 Quadratic forms
V Linear Transformations
42 Matrix and linear transformations
43 Kernel and image
44 Compositions and isomorphisms
45 The matrix of a linear transformation
46 Similarity of linear operators
Back Matter
A Complex numbers
B Sage Tutorials
C GNU Free Documentation License
Bibliography
Index
Colophon

Authored in PreTeXt

Section 6.2 Terminology and notation

elementary matrix: a matrix obtained from the identity matrix by a single elementary row operation