Derivatives of Logarithmic Functions
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Derivatives of Logarithmic Functions. Objective: Obtain derivative formulas for logs. Review Laws of Logs. Algebraic Properties of Logarithms Product Property Quotient Property Power Property Change of base. Definitions to Remember. Example 1.
Derivatives of Logarithmic Functions
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Presentation Transcript
Derivatives of Logarithmic Functions Objective: Obtain derivative formulas for logs.
Review Laws of Logs • Algebraic Properties of Logarithms • Product Property • Quotient Property • Power Property • Change of base
Example 1 • Does the graph of y = lnx have any horizontal tangents?
Example 1 • Does the graph of y = lnx have any horizontal tangents? • The answer is no. 1/x will never equal zero, so there are no horizontal tangent lines.
Example 2 • Find
Example 3 • Find
Absolute Value • Lets look at • If x > 0, |x| = x, so we have • If x < 0, |x|= -x, so we have • So we can say that
Example 4 • Find
Example 5 • Find
Example 5 • Find • We will use our rules of logs to make this a much easier problem.
Example 5 • Now, we solve.
Logarithmic Differentiation • This is another method that makes finding the derivative of complicated problems much easier. • Find the derivative of
Logarithmic Differentiation • Find the derivative of • First, take the natural log of both sides and treat it like example 3.
Logarithmic Differentiation • Find the derivative of • First, take the natural log of both sides and treat it like example 3.
Logarithmic Differentiation • Find the derivative of
Homework • Pages 247-248 • 1-33 odd
