1. Rational Functions…… and their Graphs

2. Find the Vertical Asymptotes Find the Horizontal Asymptotes
Objectives:
Find the Vertical Asymptotes
Find the Horizontal Asymptotes

3. Rational Functions
A rational function f(x) is a function that can be written as
where p(x) and q(x) are polynomial functions and q(x)
A rational function can have more than one vertical asymptote, but it can have at most one horizontal asymptote.

4. Vertical Asymptotes
If p(x) and q(x) have no common factors, then f(x) has vertical asymptote(s) when q(x) = 0. Thus the graph has vertical asymptotes at the zeros of the denominator; that is, we will SET THE DENOMINATOR EQUAL TO ZERO AND SOLVE FOR X.

5. Vertical Asymptotes Find the vertical asymptote of
V.A. is x = a, where a represents real zeros of q(x).
Find the vertical asymptote of
Example 1:
Since the zeros are 1 and -1. Thus the vertical asymptotes are x = 1 and x = -1.

6. Horizontal Asymptotes
A rational function f(x) is a function that can be written as
where p(x) and q(x) are polynomial functions and q(x)
The horizontal asymptote is determined by looking at the degrees of p(x) and q(x).

7. Horizontal Asymptotes
If the degree of p(x) is less than the degree of q(x), then the horizontal asymptote is y = 0.
b. If the degree of p(x) is equal to the degree of
q(x), then the horizontal asymptote is
c. If the degree of p(x) is greater than the degree
of q(x), then there is no horizontal asymptote.

8. Horizontal Asymptotes
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
Example 2:
Find the horizontal asymptote:
Degree of numerator = 1
Degree of denominator = 2
Since the degree of the numerator is less than the degree of the denominator, horizontal asymptote is y = 0.

9. Horizontal Asymptotes
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
Example 3:
Find the horizontal asymptote:
Degree of numerator = 1
Degree of denominator = 1
Since the degree of the numerator is equal to the degree of the denominator, horizontal asymptote is

10. Horizontal Asymptotes
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
Example 4:
Find the horizontal asymptote:
Degree of numerator = 2
Degree of denominator = 1
Since the degree of the numerator is greater than the degree of the denominator, there is no horizontal asymptote.

11. Vertical & Horizontal Asymptotes together
V.A. :
x = a, where a
represents real
zeros of q(x).
H.A. :
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
Practice 5:
Find the vertical and horizontal asymptotes:
Answer Now

12. Vertical & Horizontal Asymptotes together
V.A. :
x = a, where a
represents real
zeros of q(x).
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
H.A. :
Practice 5:
Find the vertical and horizontal asymptotes:
V.A. : x =
H.A.: none

13. Vertical & Horizontal Asymptotes together
V.A. :
x = a, where a
represents real
zeros of q(x).
H.A. :
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
Practice 6:
Find the vertical and horizontal asymptotes:
Answer Now

14. Vertical & Horizontal Asymptotes together
V.A. :
x = a, where a
represents real
zeros of q(x).
H.A. :
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
Practice 6:
Find the vertical and horizontal asymptotes:
V.A. : none
H.A.: y = 0
is not factorable and thus has no real roots.

15. Vertical & Horizontal Asymptotes together
V.A. :
x = a, where a
represents real
zeros of q(x).
H.A. :
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
Practice 7:
Find the vertical and horizontal asymptotes:
Answer Now

16. Vertical & Horizontal Asymptotes together
V.A. :
x = a, where a
represents real
zeros of q(x).
H.A. :
deg of p(x) < deg of q(x), then H.A. is y = 0
deg of p(x) = deg of q(x), then H.A. is
deg of p(x) > deg of q(x), then no H.A.
Practice 7:
Find the vertical and horizontal asymptotes:
V.A. : x = -1
H.A.: y = 2