Question #6450923Fill in the Blank
Algebra-2
Question
The functionhas a vertical asymptote atand a horizontal asymptote at.
Answer & Analysis
Analysis
Question Analysis
This problem assesses the understanding of the transformations of reciprocal functions, specifically identifying vertical and horizontal asymptotes.
This problem assesses the understanding of the transformations of reciprocal functions, specifically identifying vertical and horizontal asymptotes.
Key Concept Explanation
For a function of the form , the vertical asymptote is given by and the horizontal asymptote is given by . In this case, the function is .
For a function of the form , the vertical asymptote is given by and the horizontal asymptote is given by . In this case, the function is .
Step-by-step Solution
1. Identify the vertical asymptote: The vertical asymptote is where the denominator is zero, so set , which gives .
2. Identify the horizontal asymptote: The horizontal asymptote is the value that the function approaches as
1. Identify the vertical asymptote: The vertical asymptote is where the denominator is zero, so set , which gives .
2. Identify the horizontal asymptote: The horizontal asymptote is the value that the function approaches as
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