You also might be interested in his other channel in which he discusses his livestreaming setup in more detail - ua-cam.com/video/wIFOqW750CQ/v-deo.html But tl;dr is Notability captured via QuickTime player to a MacBook Pro, which is streamed to UA-cam. Hope that helps! Prof. Woo is the best!
You also need it for polar coordinates in linear algebra and working with imaginary numbers which is needed to create vocoders for example in software for music making
Nope, you've got an extra negative in there. Integral of sinx is -cosx. Then you can either look at the Integral of cosx which is sinx and then subtract it or look at the Integral of -cosx which is -sinx and then add it, either way you get -cosx -sinx which is -(cosx + sinx).
Dr. Woo’s visual representation(sketch-noting skills) is really impressive and neat. Thx for all!
I would like to thank two channels for teaching me calculus in the best way possible: Eddie Woo and 3blue1brown. Thank you so much!!
I just love his calligraphy
Please tell me the name of the application you’re using! Thanks for all your content 🙏
I’m pretty sure he’s using the app Notability on an iPad with an Apple Pencil
You also might be interested in his other channel in which he discusses his livestreaming setup in more detail - ua-cam.com/video/wIFOqW750CQ/v-deo.html
But tl;dr is Notability captured via QuickTime player to a MacBook Pro, which is streamed to UA-cam. Hope that helps! Prof. Woo is the best!
And the award for being the coolest math teacher of all time goes to..........
Nice Eddie woo have you made wootube yet?
Amazing as usual
That was good. Thank you.
Thanks for this video.
this is so clever wow
Is this for mathematics advanced?
It's Calculus I, it's usually last year of highschool math
Here it's 5th class out of 6th and the primitives we had to remember, but it is very long ago, but it's interesting.
You also need it for polar coordinates in linear algebra and working with imaginary numbers which is needed to create vocoders for example in software for music making
Sir could you pls explain me about 0/0
if, by 0/0 you mean 0 devided by 0, the answer to that is undefined
Ask Siri
thank you :)
2:14
2x[-cos - (-sin)]
2x[sin - cos]
Nope, you've got an extra negative in there. Integral of sinx is -cosx. Then you can either look at the Integral of cosx which is sinx and then subtract it or look at the Integral of -cosx which is -sinx and then add it, either way you get -cosx -sinx which is -(cosx + sinx).
EDDIE CAN YOU GIVE ME A HEART
I think it would be better if you cropped yourself out and just leave the solutions and do a voice over, like khan academy.
Here I am again
First