@cesarcoronado747 Yes, I do understand Green's theorem and how it fits into the context here (eg,/watch?v=iwWQIKOLo7o&p=283CA2107AD503A3 ), however, it is not explicitly in the syllabus for the particular course that this video is designed for.
@DrChrisTisdell One more comment, specifically about cesarcoronado747's comment. While it's a bit confrontational, it's a good comment in the sense that the combination of your video with his point (including a little bit of googling on my part) the fact that delM/delx - delL/dely = 1 means that you're finding the area enclosed by the curve (and then understanding that replacing 1 by other functions get's you places...) is a HUGE cognitive leap on my part.
This was a good explanation of the calculation of a line integral. My challenge would be to take this to a higher level and place the calculation side-by-side with a physical analogy, just as you did with the Curl and Divergence examples. Thanks for your good work.
I now understand that this is a line integral of a vector field F(r) = - 9y ihat + 9x jhat through the curve given.
xenofurmi 1 month ago
This is great. Keep up the good work.
xenofurmi 2 months ago
You are fantastic. Thank you for this!
Haroson 3 months ago
Comment removed
FromAppleCity 6 months ago
cheetah
dailydesi 10 months ago
Thank you very much!!!!
taimoortwm1979 1 year ago
Did you not realise that you were using the Green's Theorem area enclosed by a path formulae to calculate the area of half an ellipse?
cesarcoronado747 1 year ago
@cesarcoronado747 Yes, I do understand Green's theorem and how it fits into the context here (eg,/watch?v=iwWQIKOLo7o&p=283CA2107AD503A3 ), however, it is not explicitly in the syllabus for the particular course that this video is designed for.
Best wishes
CT
DrChrisTisdell 1 year ago
@DrChrisTisdell One more comment, specifically about cesarcoronado747's comment. While it's a bit confrontational, it's a good comment in the sense that the combination of your video with his point (including a little bit of googling on my part) the fact that delM/delx - delL/dely = 1 means that you're finding the area enclosed by the curve (and then understanding that replacing 1 by other functions get's you places...) is a HUGE cognitive leap on my part.
xenofurmi 1 month ago
Thanks!! really good!!!
christmc33 1 year ago
U R GREAT MAN THANX
el7omosany 2 years ago
This was a good explanation of the calculation of a line integral. My challenge would be to take this to a higher level and place the calculation side-by-side with a physical analogy, just as you did with the Curl and Divergence examples. Thanks for your good work.
hwyckoffSNV 2 years ago
thanks you, that was very helpful !
God bless you !
khan200h 2 years ago
you are best !!!
u saved my ASS !!!!
khan200h 2 years ago
thank you so much!
this was more useful than digging in the math book for 4 hours
cracknigga 2 years ago
LOL I know that feeling; then at the end you may not even still understand it lol
halcyon321 2 years ago
good stuff!
troponinnutrition 2 years ago
This was very helpful thank you very much!
Suppaduppaflyness 2 years ago
You're welcome!
DrChrisTisdell 2 years ago
شكرا يا حلو
m3alnemer 2 years ago
You're very welcome!
DrChrisTisdell 2 years ago