Good linear algebra reference book?

Grad student here.
I don't remember much about matrices.
I need to go through that stuff again.

Other urls found in this thread:

springer.com/it/book/9780387900933.
twitter.com/SFWRedditGifs

grad student in what?

Mathematics.
There's this one as well:
springer.com/it/book/9780387900933.
I'll have a look at it.

No, Halmos is not what I'm looking for.
I want a badass dry Rudin-like book that does not explain anything. Definition, theorem, proof, corollary. Repeat.

Shilov if you want hardcore soviet era pure approach

Strang if you want something more approachable, but still very good.

I'm so pissed at how easy American's get it. Was doing college math homework for my American friend. Had never heard of matrices, taught myself, completed the sheet. I'm dumb yet their college work is piss easy. It's fucking bolocks

real nigga role call

Nice.

hoffman/kunze is decent

"Linear Algebra and Its Applications" by Strang
"Matrix Analysis and Applied Linear Algebra" by Meyer
"Linear Algebra and Its Applications" by Lax

I'm reading the one in your pic, but here's some relevant info from the amazon reviews.

Duh.

If you don't have a feel of linear algebra like I was, first few chapters of Trefethen are essential. Going through a undergrad text is a waste of time.

Had a look at the book in your picture and it seems really nice.
Quite a lot of good books in this thread.

> real nigga
> nigga
> a math book
> that hair

Yea no

What did you just say to me you fuckin blimey cunt

What language is that version, Russian?

Try "Linear algebra done wrong".

>What language is that version, Russian?
Are you serious?

have you read the Serge Lang book?

lang's algebra also has linear algebra in it, doesnt it?

but maybe not enough for your needs

We call them a reference book. Rudin is not like that.

I think he's making a joke about the reversed letters.