I'm searching for some material (books or lecture notes) that extensively uses a geometric approach to explain the meaning of the concepts related to vector spaces, matrices, and linear applications presented in an undergraduate course in linear algebra (for instance, the basis of a vector space, the orientation of a vector space, the determinant of a matrix, and so on). Nice pictures and graphics is a plus.
2026-04-07 10:36:33.1775558193
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Linear algebra and geometric insight: a rigorous approach to vector spaces, matrices, and linear applications
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Have a look a Choquet's "Neue Elementargeometrie" from 1970. There seem to be only French and German versions of the book, though.
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Two and a half hints from my side:
All books from Jänich written for undergraduates contain many clarifying pictures (I suppose his book Topology is the most famous of them). Some students may also appreciate his sometimes unconventional style (I was one of them).
Each chapter finishes with a section of exercises to check your understanding. A few sections are explicitly dedicated for mathematicians while other sections are written with focus for physicians.
But be aware, you probably will not find all the topics you need due to the restricted length of the book.
@Christian Blatter entitles this book the mother of modern books about Linear Algebra in the comment section and he's absolutely right. At the end of the Preface section Halmos gave credits to John von Neumann. He designates him as one of the originators of the modern spirit and methods which inspired him to present and teach the way he did in this book.
I deeply appreciate his books written from one of the great in a clear and easy to follow style. In order to get an impression of his writings I recommend his essay How to write mathematics.