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Published byCornelia Houston Modified over 9 years ago
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Sullivan PreCalculus Section 4.4 Logarithmic Functions Objectives of this Section Change Exponential Expressions to Logarithmic Expressions and Visa Versa Evaluate the Domain of a Logarithmic Function Graph Logarithmic Functions Solve Logarithmic Equations
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If a u = a v, then u = v
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The Logarithmic Function is the inverse of the exponential function. Therefore: Domain of logarithmic function = Range of exponential function = (0, ) Range of logarithmic function = Domain of exponential function = (-, )
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The graph of a log function can be obtained using the graph of the corresponding exponential function. The graphs of inverse functions are symmetric about y = x. (1, 0) (0, 1) a > 1
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(0, 1) (1, 0) 0 < a < 1
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1. The x-intercept of the graph is 1. There is no y-intercept. 2. The y-axis is a vertical asymptote of the graph. 3. A logarithmic function is decreasing if 0 1. 4. The graph is smooth and continuous, with no corners or gaps.
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The logarithmic function with base e is called the natural logarithm. This function occurs so frequently it is given its own symbol: ln
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(1, 0) (e, 1)
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(4, 0) (e + 3, 1) x = 3 Domain: x > 3 (since x - 3 > 0) Range: All Real Numbers Vertical Asymptote: x = 3
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To solve logarithmic equations, first rewrite the equation in exponential form. Example: Solve
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