thank you. this is so helpful. we were just told to use integration to find the area under the curve, it's great to get an explanation of why it works.
Very nice video. So, since (dy)/(dx) = f(x), is it safe to say that integration is just a rearrangement; dy = f(x)(dx) where the sum of f(x)dx over the interval [a,b] is equal to delta F(x) over that same interval?
The way he approaches the Fundamental Theorem of Calculus is fascinating.
7 years on and still helping thousands of us. Thank you so much, this video did it for me.
Wonderful way of expressing the FTC. Brilliant.
Mr Woo thank you for your absolutely flawless way of teaching! I would've never understood the Fundamental Theorem of Calculus without your help!
Mr. Woo is just the best! Thank you very much Sir. You've been of soo much help in my understanding of mathematics
thank you. this is so helpful. we were just told to use integration to find the area under the curve, it's great to get an explanation of why it works.
Your explanation is amazing. Sometimes I watch your videos to understand physics. Thank you so much :)
Physics are the same as maths in case of analysis you just change x to t(time) and y to x(distance).
Beautiful introduction of integration.
thank you so much, this really helps!
Very nice video. So, since (dy)/(dx) = f(x), is it safe to say that integration is just a rearrangement; dy = f(x)(dx) where the sum of f(x)dx over the interval [a,b] is equal to delta F(x) over that same interval?
U nailed it!!
Get some water!