VECTORS AND MATRICES

Vectors. Linear maps. Matrices and linear systems. Eigenvalues and eigenvectors. Quadratic forms.

Vectors and Matrices, by S. Cowley, 2010, University of Cambridge.

Vectors and Matrices, written by D. Chua, based on lectures by N. Peake, 2014, University of Cambridge.

Vectors and Matrices, written by S. Wilshaw, based on lectures by J. M. Evans, 2022, University of Cambridge.

Linear Algebra I, by V. Neale, 2019, University of Oxford.

Linear Algebra II, by A. Lauder and J. Maynard, 2020, University of Oxford.

18.06SC Linear Algebra, taught by G. Strang, 2011, Massachusetts Institute of Technology.

Linear Algebra, by C. Ash, 2003, University of Illinois.

Linear Algebra, by T. Bazett, 2018, University of Victoria.

18.06 Linear Algebra, by G. Strang, 2005, Massachusetts Institute of Technology.

Linear Algebra, Part 1, by J. Hefferon, 2020, Saint Michael’s College, Free Code Camp.

Linear Algebra, Part 2, by J. Hefferon, 2020, Saint Michael’s College, Free Code Camp.

Linear Algebra, by Khan Academy.

Linear Algebra, by J. Hefferon, 4th ed., 2020, Saint Michael’s College.

Linear Algebra with Applications, by W. K. Nicholson, 2021, Lyryx Learning Inc.

A First Course in Linear Algebra, by R. A. Beezer, 2015, University of Puget Sound, Congruent Press.

Algebra and Geometry, by A. F. Beardon, 2005, Cambridge University Press.

Calculus, Vol. 2, by T. Apostol, 2nd ed., 1991, Wiley.

Introduction to Linear Algebra, by G. Strang, 5th ed., 2016, Wellesley-Cambridge Press.

Linear Algebra, by R. Kaye and R. Wilson, 1998, Oxford Science Publications.

Linear Algebra: A Geometric Approach, E. Sernesi, 1993, CRC Press.

Matrices and Linear Algebra, by H. Schneider and G. P. Barker, 2nd ed., 1989, Dover Publications.

Linear Algebra: Step by Step, by K. Singh, 2013, Oxford University Press.

Introduction to Linear Algebra, by S. Lang, 2nd ed., 1985, Springer.

Schaum’s Outline of Linear Algebra, by S. Lipschutz and M. Lipson, 6th ed., 2017, McGraw Hill.