When you set the function equal to zero, the solution is x = 3 and the graph has an x-intercept at x = 3.
Given the following data:
A logarithm function can be defined as a function that represents the inverse of an exponential function. Mathematically, a logarithm function is written as follows:
[tex]y=log_ax[/tex]
The domain of the given logarithm function [tex]y=log_4(x-2)[/tex] is (0, infinity) and its graph wouldn't touch the vertical axis but moves to the right. Also, a real zero on the graph would only occurs at x = 1 because [tex]log_4 1[/tex] is equal to zero (0).
Similarly, the graph of [tex]y=log_4(x-2)[/tex] is equal to [tex]log_4 x[/tex] but it moves 2 units to the right.
In conclusion, the graph has an x-intercept at x = 3 when the function is set to zero (0) and its solution would be x = 3.
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Answer:
B. Since the graph never crosses the x-axis, the function has no real zeros.
Explanation:
