The genuine in the intro was one of the most wholesome things I've seen in awhile! And also, just imagine how many people pay to go to lectures to learn this stuff, while all of Matt's playlists are freely available on RUclips. I feel sorry for people who paid money and didn't know these were here...
Thank you very much Dr. Matt Salomone.. I have been struggling for more than 5 years to understand these concepts in detail... Your presentations are very clear and concise !!!
This substitution of roots was analyzed by Lagrange. He studied the equations of degrees 2, 3, 4, 5 and found there was something "special" about degree 5. Galois studied Lagrange's' large work *Réflexions sur la résolution algébrique des équations* (1770) where Lagrange discusses a "resolvent" and "resolvent equation". It left "the subject in an unfinished condition to invite a young Galois to attempt to carry it further" (quote from Edwards: *Galois Theory* 1984). Also Abel studied Lagrange's "Réflexions" as it was so important. Dear Professor; The video is not complete, it ends in the middle of a sentence, Excited to watch the rest!
After 4+ years I guess there's no "new corrected, full version" for this video... it would be great to have some pointers about where it was going to end though (e.g. some "possible transcript" of the remaining part of the video).
Off topic: could someone explain why the "coffee video" has such a low quality? The problem is due to our new video equipments or our eyes have worsened?
Yeah I was a bit surprised by the low quality too. Maybe Matt just downloaded the first version he found and decided to concentrate on making the rest of the lecture...
Really enjoyed the coffee commercial! Really appreciate the vide and understanding!
The genuine in the intro was one of the most wholesome things I've seen in awhile!
And also, just imagine how many people pay to go to lectures to learn this stuff, while all of Matt's playlists are freely available on RUclips. I feel sorry for people who paid money and didn't know these were here...
Thank you very much Dr. Matt Salomone.. I have been struggling for more than 5 years to understand these concepts in detail... Your presentations are very clear and concise !!!
I hope you continued your study of abstract algebra after this and learned even more over these past nine years!
loved the coffee analogy--these videos are great and your enthusiasm is infectious!
Thank you so much Dr. Salomone. These videos are very helpful.
Thank you so much for these videos!! Your hard work is much appreciated.
Lol I love the coffee analogy
This substitution of roots was analyzed by Lagrange. He studied the equations of degrees 2, 3, 4, 5 and found there was something "special" about degree 5. Galois studied Lagrange's' large work *Réflexions sur la résolution algébrique des équations* (1770) where Lagrange discusses a "resolvent" and "resolvent equation". It left "the subject in an unfinished condition to invite a young Galois to attempt to carry it further" (quote from Edwards: *Galois Theory* 1984). Also Abel studied Lagrange's "Réflexions" as it was so important.
Dear Professor; The video is not complete, it ends in the middle of a sentence, Excited to watch the rest!
After 4+ years I guess there's no "new corrected, full version" for this video... it would be great to have some pointers about where it was going to end though (e.g. some "possible transcript" of the remaining part of the video).
It beaks off. Were does it go further?
Off topic: could someone explain why the "coffee video" has such a low quality? The problem is due to our new video equipments or our eyes have worsened?
Yeah I was a bit surprised by the low quality too. Maybe Matt just downloaded the first version he found and decided to concentrate on making the rest of the lecture...
Another awesome video- thanks!
Again fantastic explanation, thank you so much!
Mr. Bookman would be so happy with this lecture. lol
And are what?
how do we guarantee that no other polynomial will notice the swapping in the last example?
L'idée de Galois not "La Idée du Galois" .
Idea of the Galois
The video gets abruptly cut off at the end!
4:30 quick proof: t^2 + Bt + C = (t - a)(t - b) = t^2 - (a + b)t + ab
Your French is terrible.... Should be: l'idee de Galois with accent aigu on the first e of idee...
Of course because he is not a French native speaker. Let see how would you speak Chinese and see your Chinese accent 🤣
You were very clever to distinguish the bad French accent on him being a native French speaker 🤢