Write an equation for a rational function with: Vertical asymptotes at x = 5 and x = -4 x intercepts at x = -6 and x = 4 Horizontal asymptote at y = 9?

1 Answer
Shwetank Mauria
Feb 13, 2018

Rational function is #(9x^2+18x-216)/(x^2-x-20)#

Explanation:

(1) As we have vertical asymptotes at #x=5# and #x=-4#, we have in denominator #(x-5)# and #(x+4)# as factors

(2) As we have #x#-intercepts at #x=-6# and #x=4#, we have #(x+6)# and #(x-4)# in numerator as factors

(3) As we have horizontal asymptote at #y=9#, the highest power of numerator and denominator are same and coefficient of numerator is #9# times that of denominator

Hence, rational function is #(9(x+6)(x-4))/((x-5)(x+4))# or #(9x^2+18x-216)/(x^2-x-20)#

graph{(9x^2+18x-216)/(x^2-x-20) [-41.83, 38.17, -10.08, 29.92]}

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