Thank you for these amazing lectures, really helped me understand the concepts. I love the fact how the professor is interacting and making us think through and doubt the concepts instead of straightaway accepting the theories.
this guy is an example to be followed, please just go on... beautiful concepts and ways to understand things... you give me many insights about Physics (teaching math).. ... this is evolution... Thanks...Nice lecture.
Sublime lecture. Such illuminating examples. 🪩 I also smiled and appreciated your dislike of ∈. I'm not against it (it's e for element at least) but it's true that I always feel a bit unnecessarily pompous when I use it.
Go to LEM.MA/LA for videos, exercises, and to ask us questions directly.
this linear algebra youtube playlist is a generous gift to humankind
That's very nice of you to say and it's deeply appreciated.
💯
Haha, TH-cam chose this thumbnail! To find it in the right context, start watching at 15:55.
Thank you for these amazing lectures, really helped me understand the concepts. I love the fact how the professor is interacting and making us think through and doubt the concepts instead of straightaway accepting the theories.
this guy is an example to be followed, please just go on... beautiful concepts and ways to understand things... you give me many insights about Physics (teaching math).. ... this is evolution... Thanks...Nice lecture.
Thank you for the LA series!
Good stuff. Made me think while watching.
Thanks so much for all your videos. This one is great!
Great lectures! I'm enjoying then very much! Thanks!
Thanks, glad to hear it!
This guys sense of humor cracks me up. Yes 9 + 46 is 57
Hello,
Thanks for the video. I skimmed the video (having already taken linear algebra), but where/what was the Abba reference?
Thanks.
Have a commutative look at 16:05 (-: :-) .
Ah, yes. Thanks.
I'll be honest, I only clicked on the video because of ABBA. In fact, I was listening to an ABBA song when I saw the thumbnail!
Hopefully, you will now associate ABBA with the commutative law.
How is the distributivity obvious at 03:00?
If you just look at the first term, notice that (a, b+c) = 3a1(b1+c1) + ... = 3a1*b1 + 3a1*c1 + ... = (a, b) + (a, c) thus distributive.
@7:18 I'm not sure about 9+46=57
7:18 That's (not) Right! Despite what you said and wrote, you mean 48 where you have 46. In both cases.
was a joke
you can also think as the dot product as the special case of the more general inner product
Hilarious thumbnail!
You sound like a dancing queen who just wants money money money
Sublime lecture. Such illuminating examples. 🪩
I also smiled and appreciated your dislike of ∈. I'm not against it (it's e for element at least) but it's true that I always feel a bit unnecessarily pompous when I use it.