Question 1204539
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a. If q(x) has a higher degree term than p(x) then the Horizontal Asymptote is y=0
TRUE<br>
b. If the highest degree term in p(x) is greater than the highest degree term in q(x) there will be more than one Horizontal Asymptote
FALSE  (a) There will be no horizontal asymptote; (b) no function has more than one horizontal asymptote<br>
c. 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
FALSE  x=0 is not the equation of a horizontal line; and the asymptote is not y=0 either<br>
d. 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
TRUE<br>
e. The Horizontal Asymptote is a guiding line for the function as the input values increase or decrease without bound
TRUE -- assuming a reasonable meaning of "guiding line"<br>