The chain rule tells us how to find the derivative of a composite function. Brush up on your knowledge of composite functions, and learn how to apply the chain rule correctly.

I'm going to use the chain rule, and the chain rule comes into play every time, any time your function can be used as a composition of more than one function. And as that might not seem obvious right now, …

Let's explore multiple strategies to tackle derivatives involving both the product and chain rules. We start by applying the chain rule first, then the product rule.

Unravel the intricacies of applying the chain rule twice in a single problem. We'll dissect the process of finding the derivative of a function like sin (x^2)^3, demonstrating the power and adaptability of the …

Let's dive into the process of differentiating a composite function, specifically f (x)=sqrt (3x^2-x), using the chain rule. By breaking down the function into its components, sqrt (x) and 3x^2-x, we …

Through a worked example, we explore the Chain rule with a table. Using specific x-values for functions f and g, and their derivatives, we collaboratively evaluate the derivative of a composite function F (x) …

If this business right over here if f of x, so we're essentially taking sine of f of x, then this business right over here is f prime of x, which is a good signal to us that, hey, the reverse chain rule is applicable …

To do the chain rule you first take the derivative of the outside as if you would normally (disregarding the inner parts), then you add the inside back into the derivative of the outside.

It's hard to get, it's hard to get too far in calculus without really grokking, really understanding the chain rule. So what I want to do here is, well if this is true, then can't we go the other way around?

But, it is hard or impossible to split up x and y that we end up differentiating the whole thing and just apply the chain rule. Onto the main point I wanted to talk about. If x and y weren't related, they'd …