No matter how difficult differentiation gets, integration is always worse (u-sustitution, integration by parts, partial fractions, trig substitution, improper integrals, etc.).

bro you really makes me feel maths!!!

I wanna add a suggestion. In chapter two for the power rule derivation, I suggest using x^n for generalizing instead of finite trials. The idea is to use a binomial expansion for (x+h)^n while just blanking the infinite amount of middle terms (just write the first, second, and end terms). This will be x^n + nx^(n-1)h + nC2 x^(n-2) h^2 + ... + h^n. Later on, x^n will cancel and all the numerator expression will be divided by h. This will be nx^(n-1) + nC2 x^(n-2) h + ... + h^(n-1). When the limit h -> 0 is applied, the third to last terms disappear (which is why I said to just ignore the infinite number of middle terms) and the result will be nx^(n-1). This is to prove that the pattern works for all n ∈ R and not just some specific and coincidental values of n.

this was super helpful, thanks

Wonderful explanation and intuition behind the concept sir👍 wish your videos reach to more target audience

dy/dx if y is a function of x: 😊 dω/dt if ω is a function of x, y, and z and the independent variables are defined parametrically as functions of t: 💀

Excellent 😊 Did you ever read Sylvanus P Thompson?

"now remember dx/dy is just a fraction" ahhhhh there it is, i see so you're a physicist/engineer after all. i know math majors in the replies starting a riot right now, don't worry bro i got your back fuck those elitist snobs, "it's not a fraction" BOOHOOO

I think it would be productive to talk about discrete differentiation (forward difference of a sequence) before talking about continuous differentiation.

Ok now do one for integration as well please.........

Bro how do u make such videos? Like i am taking how u make equation transition?

It's very basic but I like your explanation. Make videos which gives intuition about higher order derivatives and partial differential equations

Naw man, you can't use the derivative as a fraction >:((((

There are a lot of things wrong with this.