When employing implicit differentiation on a curve represented by the equation $F(x,y)=0$, we can adopt a different perspective by considering both $x$ and $y$ as functions of a third variable, $t$. This approach allows us to leverage multivariable calculus, specifically applying the chain rule. By differentiating both sides with respect...
[Read More]
Today’s class marked the introduction of implicit differentiation, a powerful technique that involves a two-step process to find $\frac{dy}{dx}$. Implicit differentiation is particularly valuable when dealing with equations that do not allow for a straightforward direct differentiation.
[Read More]