How to Evaluate the Line Integral of a Vector Field
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- čas přidán 25. 03. 2020
- How to Evaluate the Line Integral of a Vector Field
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/ @themathsorcerer
Thank you:)
I used to watch educational videos and read comments everywhere along the lines of "you explained in 10 minutes what my professor couldn't do in 2 hours" and other generic statements but now that I am in university I find myself commenting the same thing.
Simple, on point, but long enough to follow the steps and get the concept. Great video!
This video is the only video on youtube that could help me with line integrals. Many thanks
best video on line integrals i've ever come across!
Glad it was helpful!
By far the best explained video on Line Integrals!!
Thank you!
I am learning about vectors from a book from the UK would the rules be the same eventhough I am reading a book from England?
@@davidsoto4394Lol the rules of math are the rules of math. The same in England and anywhere else in the world, although many have pondered what the math of aliens might look like.
wish the teachers at LTU was this thoroughly ,with simple explanations and on point.Thanks
this was absolutely fantastic thank you very much, your enthusiasm inspired me!!!
Brilliant explanation! Love your vids! Keep up the good work!
Great teacher! Love your videos
You are really a great teacher wish we could have such a great teacher like u in our school I'm from the most recognised school in India but there too they don't have teachers like you. Great sir.
thank you!!!
Perfect!
Thanks so much !!!!
Great video
This helped so much thanks
Thank you
Very good video sir!
tq quick and easy
i wish my uni professor taught like u
Thank You!
👍
u are my hero❤
You've great experience in math. That's what I came to know. Keep uploading
💜
Thx😀
Thanks
Please do a video on evaluating surface integrals
Will do 👍
thanks
You're welcome!
Is this the same for I,j,k too? 3 dimensional?
your awsome your explenation is wonderful however you forgot to multiply the second terma' the integral with 1/2
I understood💀. You must be a wizard
That's the nice thing about Leibniz notation. It works when you think it should.
r=(x,y) so dr=(dx,dy)
F•dr=(M,N)•(dx,dy)=M dx+N dy
dx=dx dt/dt = dx/dt dt
dy=dy dt/dt = dy/dt dt
WOW
Not hard if you break it down properly. Calculus 3 is the math class that you basically NEED everything you have learned in math along the way to be accessible in your head to solve problems. You WILL find any weaknesses in Geometry, Trig ect. Any weakness in Algebra will definitely come out in Calculus 2 but you can skirt some of the other weaknesses. In a Calc 3 your mind needs to bring them all together. In of itself Calculus 3 is not hard to learn, but if you mindset was I am just to learn enough to pass as you went through each previous math subject this one will blast you.
Btw Beautiful way of teaching this. I have zero skills at teaching people, so it amazes me when I see someone teach this well!