We first apply the limit definition of the derivative to find the derivative of the constant function, f ( x ) = c. To find derivatives of polynomials and rational functions efficiently without resorting to the limit definition of the derivative, we must first develop formulas for differentiating these basic functions. The functions f ( x ) = c f ( x ) = c and g ( x ) = x n g ( x ) = x n where n n is a positive integer are the building blocks from which all polynomials and rational functions are constructed. In this section, we develop rules for finding derivatives that allow us to bypass this process. The process that we could use to evaluate d d x ( x 3 ) d d x ( x 3 ) using the definition, while similar, is more complicated. For example, previously we found that d d x ( x ) = 1 2 x d d x ( x ) = 1 2 x by using a process that involved multiplying an expression by a conjugate prior to evaluating a limit. 3.3.6 Combine the differentiation rules to find the derivative of a polynomial or rational function.įinding derivatives of functions by using the definition of the derivative can be a lengthy and, for certain functions, a rather challenging process.3.3.5 Extend the power rule to functions with negative exponents.3.3.4 Use the quotient rule for finding the derivative of a quotient of functions.3.3.3 Use the product rule for finding the derivative of a product of functions.3.3.2 Apply the sum and difference rules to combine derivatives.3.3.1 State the constant, constant multiple, and power rules.
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