Multiple Choice
Determine if the function is an exponential function.
If so, identify the power & base, then evaluate for .
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6. Exponential & Logarithmic Functions
Introduction to Exponential Functions
4:26 minutesProblem 3
Textbook Question
The graph of an exponential function is given. Select the function for each graph from the following options: f(x) = 4x, g(x) = 4-x, h(x) = -4-x, r(x) = -4-x+3
Verified step by step guidance1
Identify the horizontal asymptote of the graph. Here, the graph approaches the line \(y = 2\) as \(x\) goes to positive infinity.
Recall that the general form of an exponential function with a horizontal asymptote \(y = k\) is \(y = a \cdot b^x + k\), where \(a\) and \(b\) are constants.
Check the given function options and see which one has a vertical shift of +2 to match the asymptote \(y = 2\). None of the options explicitly show +2, but option \(r(x) = -4^{-x} + 3\) has a vertical shift of +3, which is close but not correct.
Analyze the behavior of the graph: it is increasing and approaches \(y=2\) from below, which suggests the function is of the form \(y = a \cdot 4^{-x} + 2\) with \(a > 0\).
Since none of the given options exactly match the asymptote \(y=2\), consider that the closest match is \(g(x) = 4^{-x}\), which has a horizontal asymptote at \(y=0\). To get the asymptote at \(y=2\), the function would need to be shifted up by 2, which is not shown in the options. Therefore, the best match based on growth and asymptote behavior is \(g(x) = 4^{-x}\).
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4mKey Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Exponential Functions and Their Graphs
Exponential functions have the form f(x) = a^x, where the base a is positive and not equal to 1. Their graphs show rapid growth or decay, depending on the exponent's sign. Understanding the shape and behavior of these graphs helps identify the function from its graph.
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Graphs of Exponential Functions
Horizontal Asymptotes
A horizontal asymptote is a horizontal line that the graph of a function approaches but never touches as x approaches infinity or negative infinity. For exponential functions, the horizontal asymptote indicates the limiting value of the function, often shifted vertically by a constant.
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Transformations of Exponential Functions
Transformations include reflections, shifts, and stretches of the basic exponential graph. For example, a negative sign reflects the graph across the x-axis, and adding a constant shifts it vertically. Recognizing these changes helps match a graph to its corresponding function.
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