5.3 Graphing General Rational Functions.notebook · 2019-09-05 · 5.3 Graphing General Rational...

5.3 Graphing General Rational Functions.notebook May 11, 2015

Bell Work

Factor the following expressions.

1) 12x2 + 5x 2 2) x2 5x 50

5.3 Graph General Rational FunctionsIn section 5.2 we learned how to graph simple rational functions.

Two Forms:

1. y = ax h + k VA:

2. y = ax + bcx + dVA:

To graph general rational functions we will find 5 things:

* xintercept(s)

* vertical asymptote(s)

* horizontal asymptote

* hole

* point of discontinuity

Points of discontinuity

are moments within a function that are undefined and appear as a break or hole in a graph

created when a function is presented as a fraction and an inputted variable creates a denominator equal to zero

Discontinuities: 1, 3

x intercepts: (0,0), (4,0)

Vertical Asym: x = 1, x=3

Horizontal Asym: y=3

Holes: None

Example

Discontinuities: 1, 3

x intercepts: (0,0), (4,0)

Vertical Asym: x = 1

Horizontal Asym: none

Holes: (3, 1.5)

Example

x intercept(s)Find the xvalues that make the numerator zero.

Example 1: Find the xintercepts of the function.

x2 + 3x 4y = x 2

_________

Vertical Asymptotes*Find the xvalues that make the denominator zero.

Example 2: Find all the vertical asymptotes ofa. f(x) =

xx2 + 5x + 6

b. f(x) = x2 4x 12

x2 11x + 30_____________

Horizontal Asymptotes*Find the degree of the numerator and denominator.

Case 1 m < nThe line y = 0

is a horizontal asymptote.

Case 2 m = nThe line y =

a/c is a horizontal asymptote.

Case 3 m > nThe graph has no

horizontal asymptote.

y = axm

cxn ___

Example 3: Find all the vertical and horizontal asymptotes.

2x2 2x + 1 x2 x 12f(x) =

vertical:

horizontal:

HolesIf x b is a factor of both the numerator and

denominator then there is a hole in the graph when x = b unless it is a vertical asymptote.

3x2 + x3 x2 + 2x 3

f(x) =

Example 4: Identify all the asymptotes and holes

in the graph.

Graph the function.1. Find all the xintercepts, asymptotes and holes, and graph them. 2. Use the graphing calculator tofind some more points.

x + 4y =Example 5

xintercept(s):

Vertical Asymptote:

Horizontal Asymptote:

Holes:

y = 3x 28 + x2

x2 + 12x + 35

Example 6

Holes:

Example 7

Holes:

y = x2 +1 x2 1

Example 8

Holes:

y = 4x2 5x + 4 _________

Assignment: p. 322 # 8, 10, 12, 16, 22

5.3 Graphing General Rational Functions.notebook · 2019-09-05 · 5.3 Graphing General Rational...

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