Divergence Theorem

Chapeau ! You've honoured Lagrange (1762), Gauss (1813), Green (1825) and Ostrogradski (1831), the introducer, the re-inventors, and the one who proved the theorem.

Galileosays

I love how engaging you are and the expressiveness often helps to keep the focus on the material and not sound monotonous.

bluepurplepink

dear professor, i owe you my analysis 2 exam, i spent a full day watching the vectorial calculus playlist and now i've almost got how to make this things work, thank you very much
i love you so much
thanks from italy!

du-s

I love.. you
You're the best Dr. Peyam you make calc sound so childlike its actually fun watching your videos

bobmike

Good video but could you please explain again how to figure out the parametrization?

sweetyvany

I just binge watched the whole Playlist and now have a much deeper understanding of line and surface integrals and know what each of them means.

So the line integral of a vector field is the sum of the x shadow and the y shadow of the fence produced by the surface of f(x, y) along curve c which is the geometric interpretation of the line integral of a scaler function. I thought they were fundamentally different but it seems that it's not. Nice :)

I have a question though. Our professor introduced us to a completely different method for calculating a surface integral. He said that you can calculate it with this formula : ∫∫f(x, y, z)(||∇g||/|∇g.p|)dA

Where g is the equation of the surface, p is the normal vector of the plane which the surface's shadow is casted on (you can use xy, xz or yz planes for this purpose) and dA is the surface element of the region that shadow makes.

What is its connection to the formal method that you provided? What I understood is that the gradient vector can act as the normal vector. I couldn't find any more connections and it would be nice if you could answer it.

shayanmoosavi

Hey, do you think we could get a series for PDEs similar to what you're doing here for vector calculus?
I know you're mainly making these because you're teaching it atm, but when could we get a PDE series done in a similar way?

XanderGouws

Is vector calculus connected to differential geometry?

jonasdaverio

I don't understand how did u found the bounds of the integral

racimeexe

yea! more E&M! (and other physics :)

dhunt

I´ll never forget the jacobian of cylindricals coordenates and esphericals coordenates until my decease. I promise it for "La horda" xd

okami

I bet that the one who disliked this video believes that the divergence and rotation have swapped formulas and then got the wrong result out of their calculation. xD

Rundas