Ch. 4 - Exponential and Logarithmic Functions

Blitzer8th EditionCollege AlgebraISBN: 9780136970514Not the one you use?Change textbook

Blitzer 8th Edition

Ch. 4 - Exponential and Logarithmic Functions

Problem 39

Chapter 5, Problem 39

In Exercises 39–40, graph f and g in the same rectangular coordinate system. Use transformations of the graph of f to obtain the graph of g. Graph and give equations of all asymptotes. Use the graphs to determine each function's domain and range. f(x) = log x and g(x) = - log (x+3)

Verified step by step guidance

Identify the base function f(x) = $\log$ x, which is the logarithmic function with vertical asymptote at x = 0 and domain (0, $\infty$). Its range is all real numbers (-$\infty$, $\infty$).

Analyze the function g(x) = -$\log$(x+3). Notice that the argument of the logarithm is (x + 3), which means the graph of f(x) is shifted horizontally to the left by 3 units. This changes the vertical asymptote from x = 0 to x = -3.

The negative sign in front of the logarithm reflects the graph of f(x) across the x-axis. So, after shifting the graph of f(x) left by 3 units, reflect it over the x-axis to get g(x).

Write the equation of the vertical asymptote for g(x) as x = -3, since the logarithm is undefined when its argument is zero, i.e., x + 3 = 0.

Determine the domain and range of g(x): the domain is all x such that x + 3 > 0, or x > -3, and the range remains all real numbers (-$\infty$, $\infty$) because reflection and horizontal shifts do not restrict the range of the logarithmic function.

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Logarithmic Functions and Their Graphs

A logarithmic function, such as f(x) = log x, is the inverse of an exponential function. Its graph passes through (1,0) and has a vertical asymptote at x = 0. The function is defined only for positive x-values, and its range is all real numbers.

Transformations of Functions

Transformations include shifts, reflections, and stretches/compressions of a graph. For g(x) = -log(x+3), the graph of f(x) = log x is shifted left by 3 units and reflected across the x-axis. Understanding these helps in sketching g(x) from f(x) and identifying changes in domain and range.

Asymptotes and Domain/Range of Logarithmic Functions

Logarithmic functions have vertical asymptotes where the argument equals zero. For f(x) = log x, the asymptote is x = 0; for g(x) = -log(x+3), it is x = -3. The domain excludes these values, while the range remains all real numbers. Recognizing asymptotes is key to understanding function behavior.

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Graphs of Logarithmic Functions

Related Practice

Textbook Question

Use properties of logarithms to expand each logarithmic expression as much as possible. Where possible, evaluate logarithmic expressions without using a calculator. $$\log$ $\left$( $\frac{10x^2 \sqrt[3]{1 - x}$}{7(x + 1)^2} $\right$)$

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Evaluate each expression without using a calculator. log₅ 5⁷

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Evaluate each expression without using a calculator. $8^{$\log$_8 19}$

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Textbook Question

In Exercises 39–40, graph f and g in the same rectangular coordinate system. Use transformations of the graph of f to obtain the graph of g. Graph and give equations of all asymptotes. Use the graphs to determine each function's domain and range. f(x) = ln x and g(x) = - ln (2x)

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Textbook Question

Solve each exponential equation in Exercises 23–48. Express the solution set in terms of natural logarithms or common logarithms. Then use a calculator to obtain a decimal approximation, correct to two decimal places, for the solution. 7^0.3x=813