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9.3 Graphing General Rational Functions

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9.3 Graphing General Rational Functions p. 547 Steps to graphing rational functions Find the y-intercept. Find the x-intercepts. Find vertical asymptote(s). – PowerPoint PPT presentation

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Title: 9.3 Graphing General Rational Functions


1
9.3 Graphing General Rational Functions
  • p. 547

2
Steps to graphing rational functions
  1. Find the y-intercept.
  2. Find the x-intercepts.
  3. Find vertical asymptote(s).
  4. Find horizontal asymptote.
  5. Find any holes in the function.
  6. Make a T-chart choose x-values on either side
    between all vertical asymptotes.
  7. Graph asymptotes, pts., and connect with curves.
  8. Check your graph with the calculator.

3
How to find the intercepts
  • y-intercept
  • Set the y-value equal to zero and solve
  • x-intercept
  • Set the x-value equal to zero and solve

4
How to find the vertical asymptotes
  • A vertical asymptote is vertical line that the
    graph can not pass through. Therefore, it is the
    value of x that the graph can not equal. The
    vertical asymptote is the restriction of the
    denominator!
  • Set the denominator equal to zero and solve

5
How to find the Horizontal Asymptotes
  • If degree of top lt degree of bottom, y0
  • If degrees are ,
  • If degree of top gt degree of bottom, no horiz.
    asymp, but there will be a slant asymptote.

6
How to find slant asymptotes
  • Do synthetic division (if possible) if not, do
    long division!
  • The resulting polynomial (ignoring the remainder)
    is the equation of the slant asymptote.

7
How to find the points of discontinuity (holes)
  • When simplifying the function, if you cancel a
    polynomial from the numerator and denominator,
    then you have a hole!
  • Set the cancelled factor equal to zero and solve.

8
Steps to graphing rational functions
  1. Find the y-intercept.
  2. Find the x-intercepts.
  3. Find vertical asymptote(s).
  4. Find horizontal asymptote.
  5. Find any holes in the function.
  6. Make a T-chart choose x-values on either side
    between all vertical asymptotes.
  7. Graph asymptotes, pts., and connect with curves.
  8. Check your graph with the calculator.

9
Ex Graph. State domain range.
5. Function doesnt simplify so NO HOLES!
  • 2. x-intercepts x0
  • 3. vert. asymp. x210
  • x2 -1
  • No vert asymp
  • 4. horiz. asymp
  • 1lt2 (deg. top lt deg. bottom)
  • y0

6. x y -2 -.4 -1 -.5
0 0 1 .5 2 .4
(No real solns.)
10
Domain all real numbers Range
11
Ex Graph then state the
domain and range.
6. x y 4 4 3 5.4 1
-1 0 0 -1 -1 -3
5.4 -4 4
  • 2. x-intercepts
  • 3x20
  • x20
  • x0
  • 3. Vert asymp
  • x2-40
  • x24
  • x2 x-2
  • 4. Horiz asymp
  • (degrees are )
  • y3/1 or y3

On right of x2 asymp.
Between the 2 asymp.
On left of x-2 asymp.
5. Nothing cancels so NO HOLES!
12
Domain all real s except -2 2 Range all
real s except 0ltylt3
13
Ex Graph, then state the domain range.
  • y-intercept -2
  • x-intercepts
  • x2-3x-40
  • (x-4)(x1)0
  • x-40 x10
  • x4 x-1
  • Vert asymp
  • x-20
  • x2
  • Horiz asymp 2gt1
  • (deg. of top gt deg. of bottom)
  • no horizontal asymptotes, but there is a slant!

5. Nothing cancels so no holes.
6. x y -1 0 0
2 1 6 3 -4 4 0
Left of x2 asymp.
Right of x2 asymp.
14
(No Transcript)
15
Slant asymptotes
  • Do synthetic division (if possible) if not, do
    long division!
  • The resulting polynomial (ignoring the remainder)
    is the equation of the slant asymptote.
  • In our example
  • 2 1 -3 -4
  • 1 -1 -6

Ignore the remainder, use what is left for the
equation of the slant asymptote yx-1
2 -2
16
Domain all real s except 2 Range all real
s
17
Assignment Workbook page 611-9Find each
piece of the function.
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