describe end behavior€¦ · it is helpful when you are graphing a polynomial function to know...

Describe End Behavior

We look at the polynomials degree and leading coefficient to determine its end behavior.

It is helpful when you are graphing a polynomial function to know about the end behavior of the function.

End behavior of a graph describes the values of the function as x approaches positive infinity and negative infinity

positive infinity x goes to the right

negative infinity x goes to the left

END BEHAVIOR – be the polynomial

Odd--then the left side and the right side are different

Even--then the left side and the right are the same

The Highest DEGREE is either even or odd

Negative--the right side of the graph will go down

The Leading COEFFICIENT is either positive or negative

Positive--the right side of the graph will go up

Determine the end behavior: 1. 4x4 – 2x3 + 6x – 3 = 0

Leading Coefficient →

Degree →

,As x then P x

,As x then P x

right side up POSITIVE →

EVEN → arms together

Determine the end behavior: 2. 3x7 + 8x2 + 4x – 13 = 0

Leading Coefficient →

Degree →

,As x then P x

,As x then P x

POSITIVE → right side up

arms opposite ODD →

Determine the end behavior: 3. -2x5 + x4 - 6x2 – 8x = 0

Leading Coefficient →

Degree →

,As x then P x

,As x then P x

right arm down NEGATIVE →

ODD → arms apart

Determine the end behavior: 4. -2x2 – 6x + 6 = 0

Leading Coefficient →

Degree →

,As x then P x

,As x then P x

NEGATIVE → right arm down

EVEN → arms together

Identify the leading coefficient, degree, and end behavior.

5. Q(x) = –x4 + 6x3 – x + 9

The leading coefficient is ____, which ___________.

The degree is ________, which ____________.

6. P(x) = 2x5 + 6x4 – x + 4

The leading coefficient is _____, which ____________.

The degree is _________, which ___________.

, ______As x P x , ______As x P x

, ______As x P x , ______As x P x

-1 negative

4 even

2 positive

5 odd

Identify the leading coefficient, degree, and end behavior.

7. P(x) = -2x5 + x4 - 6x2 – 8x

8. S(x) = –2x2 -6x + 6

The leading coefficient is ____, which ___________. -2 negative

The degree is ________, which ____________. 5 odd

, ______As x P x , ______As x P x

The leading coefficient is ____, which ___________. -2 negative

The degree is ________, which ____________. 2 even

, ______As x P x , ______As x P x

Example 9 Using Graphs to Analyze Polynomial Functions

Identify whether the function graphed has an odd or even degree and a positive or negative leading coefficient.

, ______As x P x , ______As x P x

LC_____ degree_____ odd negative

Example 10 Using Graphs to Analyze Polynomial Functions

Identify whether the function graphed has an odd or even degree and a positive or negative leading coefficient.

, ______As x P x , ______As x P x

LC_____ degree_____ positive even

Example 11

Identify whether the function graphed has an odd or even degree and a positive or negative leading coefficient.

, ______As x P x , ______As x P x

LC_____ degree_____ negative odd

Example 12

Identify whether the function graphed has an odd or even degree and a positive or negative leading coefficient.

, ______As x P x , ______As x P x

LC_____ degree_____ positive even