Which statement about f(x) and its translation, g(x), is true?
2 answers:
Answer:
<h2><em>d. </em><em>The asymptote of g(x) is the asymptote of f(x) shifted six units up.</em></h2>Step-by-step explanation:
The complete question is
<em>f(x) = 7x g(x) = 7x + 6 Which statement about f(x) and its translation, g(x), is true?</em>
<em>a. </em><em>The domain of g(x) is {x | x > 6}, and the domain of f(x) is {x | x > 0}.</em>
<em>b.</em><em> The domain of g(x) is {y | y > 0}, and the domain of f(x) is {y | y > 6}.</em>
<em>c. </em><em>The asymptote of g(x) is the asymptote of f(x) shifted six units down.</em>
<em>d. </em><em>The asymptote of g(x) is the asymptote of f(x) shifted six units up.</em>
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The initial function is
After the translation, the function is
If you compare, you'll notice that the transformation was about adding 6 units to g(x). This means that the function is being translated upwards 6 units, because such change is to g(x) which represents the vertical axis.
Additionally, after this transformation neither the domain or range change, because the range and domain of a linear function is always all real numbers.
Therefore, the right answer is D, because describes the transformation.
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