Given the Rational Function f(x): = true? Check all that apply. p(x) q(x) which of the following statements are If f(x) has a HORIZONTAL ASYMPTOTE y = a, then as the input values increase or decrease without bound, the output values will approach a If the highest degree term of p(x) is the same as the highest degree term of q(x), then the Horizontal Asymptote is x = 0 The Horizontal Asymptote is a guiding line for the function as the input values increase or decrease without bound If the highest degree term in p(x) is greater than the highest degree term in q(x), then there will be more than one Horizontal Asymptote If q(x) has a higher degree term than p(x), then the Horizontal Asymptote is y = 0
Given the Rational Function f(x): = true? Check all that apply. p(x) q(x) which of the following statements are If f(x) has a HORIZONTAL ASYMPTOTE y = a, then as the input values increase or decrease without bound, the output values will approach a If the highest degree term of p(x) is the same as the highest degree term of q(x), then the Horizontal Asymptote is x = 0 The Horizontal Asymptote is a guiding line for the function as the input values increase or decrease without bound If the highest degree term in p(x) is greater than the highest degree term in q(x), then there will be more than one Horizontal Asymptote If q(x) has a higher degree term than p(x), then the Horizontal Asymptote is y = 0
Chapter5: Polynomial And Rational Functions
Section: Chapter Questions
Problem 18RE: For the following exercises. based on the given graph, determine the zeros of the function and note...
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Transcribed Image Text:Given the Rational Function f(x):
=
true? Check all that apply.
p(x)
q(x)
which of the following statements are
If f(x) has a HORIZONTAL ASYMPTOTE y = a, then as the input values
increase or decrease without bound, the output values will approach a
If the highest degree term of p(x) is the same as the highest degree term of
q(x), then the Horizontal Asymptote is x = 0
The Horizontal Asymptote is a guiding line for the function as the input values
increase or decrease without bound
If the highest degree term in p(x) is greater than the highest degree term in
q(x), then there will be more than one Horizontal Asymptote
If q(x) has a higher degree term than p(x), then the Horizontal Asymptote is
y = 0
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