![]() Contextual Applications of Differentiation-Interpreting derivatives in context, using rates of change in motion and other context, applying related rates, approximating using linearization, and applying L’Hospital’s Rule.Differentiation: Composite, Implicit, and Inverse Functions-Applying the Chain Rule, using implicit differentiation, differentiating inverse functions, and calculating higher order derivatives.Differentiation: Definition and Basic Rules-Defining average and instantaneous rates of change, defining the derivative of a function, estimating derivatives at a point, connecting differentiability and continuity, applying the Power Rule, the Product Rule, and the Quotient Rule, and determining derivatives of constants, sums, differences, and constant multiples, trigonometric functions, e x, and ln x. ![]()
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