Question

Graph each function. Give the domain and range. ƒ(x) = (log1/2 x) - 2

Accepted Answer

Identify the base of the logarithm function. Here, the function is $$f(x) = \log_{\frac{1}{2}} x - 2$$, where the base is $$\frac{1}{2}$$, which is between 0 and 1, indicating a decreasing logarithmic function. Determine the domain of the function. Since logarithms are only defined for positive arguments, set the inside of the log greater than zero: $$x \u003e 0. $$Thus, the domain is $$(0, \infty). $$Analyze the vertical shift caused by the $$-2$$ outside the logarithm. This shifts the entire graph down by 2 units, affecting the range but not the domain. Find the range of the function. The logarithmic function $$\log_{\frac{1}{2}} x$$ can take any real value from $$-\infty to$$ $$\infty$$, so after shifting down by 2, the range remains $$(-\infty, \infty). $$Sketch the graph by plotting key points such as when $$x=1 ($$since $$\log_{b} 1 = 0$$ for any base $$b$$), which gives $$f(1) = 0 - 2 = -2. $$Also, note the behavior as $$x$$ approaches 0 from the right (function goes to $$\infty) $$and as $$x$$ approaches infinity (function goes to $$-\infty) $$due to the base being less than 1.

Graph each function. Give the domain and range. ƒ(x) = (log_1/2 x) - 2

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Key Concepts

Logarithmic Functions

Domain and Range of Logarithmic Functions

Transformations of Functions