Now that inductive reasoning has provided a reasonable conjecture for the derivative of a composition of functions, let's use alternate limit definition of the derivative to prove it. Duration: 6:26

Before we tackle explicitly stated equations, let's apply the Chain Rule to set of graphs and a table of values. Duration: 4:57

The Power Rule allows us to play leap frog with individual terms of a polynomial, but the General Power Rule will allow us to do the same thing with functions. Duration: 4:12

On Example 6, we find some common critical points on the graph of a function, where its derivative is zero or undefined. Wonder what the graph looks like at locations such as these? Then on Example 7, we'll see how we can use the Chain Rule to avoid using the Quotient Rule. Duration: 8:47