Linked Questions

1
vote
4answers
531 views

Suggestion for a book on Linear Algebra [duplicate]

Please suggest a Linear Algebra book with an introduction and rigorous theory (description) on Eigenvectors , eigen-values , Cayley-Hamilton theorem , Diagonalisation of matrices ; Quadratic forms ( ...
0
votes
1answer
646 views

Good Linear Algebra Book Suggestion [duplicate]

Can you recommend a good reference for learning linear algebra with an eventual goal of applying tools from matrix theory? I have Axler's Linear Algebra Done Right and Horn&Johnson's Matrix ...
1
vote
2answers
395 views

Reference Request on a good Linear Algebra book [duplicate]

So I'm looking for a linear algebra book with a strong focus on proofs. It would be great if the book also uses concepts from regular abstract algebra like isomorphisms etc instead of dancing around ...
2
votes
0answers
164 views

Linear Algebra Book Recommendation [duplicate]

I am taking an undergraduate course in computer science an is in the first year of my college. I like mathematics and am willing to learn Linear Algebra first and then move on to Abstract Algebra and ...
1
vote
0answers
30 views

Another linear algebra textbook recommendation [duplicate]

Im looking for a linear algebra textbook that meets two criterion: The book should be proof-based. The book should try and motivate most, if not most of the ideas, of the geometry of linear maps and ...
0
votes
1answer
25 views

Book recommendation - Linear Algebra and Affine Geometry [duplicate]

I really need a good book with some solved exercises about Linear Algebra and Affine Geometry (orthonormal basis, rotations, etc.). I want to understand the algorithms to solve that kind of problems ...
8
votes
5answers
1k views

Supplementary Linear Algebra textbook

We are using Elementary Linear Algebra by Howard Anton in the class and I’m not happy with it. At times there is many pages of writing, yet, there is very little information contained. I really like ...
1
vote
2answers
1k views

Good books to learn Linear Algebra? [closed]

I took a course of Linear Algebra, but it was too basic (it only covered some elementary concepts of matrices and vectors). I am planning to purchase one of the three: Axler's Linear Algebra Done ...
5
votes
1answer
199 views

Linear Algebra Text

I am looking for a Linear Algebra text for a beginner that goes about the subject in a mathematically rigorous fashion and at the same time respects the geometric intuitions behind Linear ...
2
votes
1answer
291 views

Recommendation for study of Linear Algebra Through Geometry (Wermer-Banchoff)

I want to self-study Banchoff-Wermer's book over the summer. I will take Analytic Geometry and Linear Algebra course this semester. We will use Wermer-Banchoff's book Linear Algebra Through Geometry. ...
1
vote
1answer
185 views

Learning how to prove

How to learn writing proofs? Could you give me some advice and sources, please? I have to learn how to prove, if I want to continue to study science. For now, the fields I am studying are real ...
2
votes
1answer
162 views

Algebra and calculus's books for master [closed]

I want to prepare myself for entrance master exam for one of the universities in America, I will be grateful if you tell me which books are good to study linear algebra and calculus? Thanks.
1
vote
2answers
35 views

To show $W= \big((x,y,z)| \ \ ax+by+cz=0 ; x,y,z\in F\big) $ is a subspace of $V_3$

Let $a,b,c $ be a fix elements of a field $F$ Show that $$W= \big((x,y,z)| \ \ ax+by+cz=0 ; x,y,z\in F\big) $$ is a subspace of $V_3(F)$ The necessary and sufficient condition for non empty subset $W$...
-3
votes
1answer
41 views

What is the Eigen values λ in the given system? [closed]

As I have just started to revised my maths knowledge after 8 years, I have a question. What is the Eigen values λ in the below given (attached image) system? enter image description here
-2
votes
1answer
31 views

Question on a polynomial formed using a matrix [closed]

If $A = \begin{bmatrix}2&1\\-4&-2\end{bmatrix}$, then $I+2A+3A^2+4A^3+\dots$ is equal to (a) $\begin{bmatrix}4&1\\-4&0\end{bmatrix}$ (b) $\begin{bmatrix}3&1\\-4&-1\...