1. Polynomial
Functions

2. A POLYNOMIAL is a monomial or a sum of monomials.
POLYNOMIAL FUNCTIONS
A POLYNOMIAL is a monomial or a sum of monomials.
A POLYNOMIAL IN ONE VARIABLE is a polynomial that contains only one variable.
Example: 5x2 + 3x - 7

3. What is the degree and leading coefficient of 3x5 – 3x + 2 ?
POLYNOMIAL FUNCTIONS
The DEGREE of a polynomial in one variable is the greatest exponent of its variable.
A LEADING COEFFICIENT is the coefficient of the term with the highest degree.
What is the degree and leading coefficient of 3x5 – 3x + 2 ?

4. A polynomial function is a function of the form:
Remember integers are … –2, -1, 0, 1, 2 … (no decimals or fractions) so positive integers would be 0, 1, 2 …
A polynomial function is a function of the form:
n must be a positive integer
All of these coefficients are real numbers
The degree of the polynomial is the largest power on any x term in the polynomial.

5. Polynomial Functions Exponents must be non-negative integer exponents
Can not have variables in the denominator
Can not have radicals
Example: square root or cube root
These are actually fractional exponents

6. Determine which of the following are polynomial functions
Determine which of the following are polynomial functions. If the function is a polynomial, state its degree.
A polynomial of degree 4.
We can write in an x0 since this = 1.
x 0
A polynomial of degree 0.
Not a polynomial because of the square root since the power is NOT an integer
Not a polynomial because of the x in the denominator since the power is negative

7. Graphs of polynomials are smooth and continuous.
No gaps or holes, can be drawn without lifting pencil from paper
No sharp corners or cusps
This IS the graph of a polynomial
This IS NOT the graph of a polynomial

8. POLYNOMIAL FUNCTIONS
A polynomial equation used to represent a function is called a POLYNOMIAL FUNCTION.
Polynomial functions with a degree of 1 are called LINEAR POLYNOMIAL FUNCTIONS
Polynomial functions with a degree of 2 are called QUADRATIC POLYNOMIAL FUNCTIONS
Polynomial functions with a degree of 3 are called CUBIC POLYNOMIAL FUNCTIONS

9. POLYNOMIAL FUNCTIONS f(x) = 3 Constant Function Degree = 0
GENERAL SHAPES OF
POLYNOMIAL FUNCTIONS
f(x) = 3
Constant Function
Degree = 0
Max. Zeros: 0

10. POLYNOMIAL FUNCTIONS f(x) = x + 2 Linear Function Degree = 1
GENERAL SHAPES OF
POLYNOMIAL FUNCTIONS
f(x) = x + 2
Linear
Function
Degree = 1
Max. Zeros: 1

11. POLYNOMIAL FUNCTIONS f(x) = x2 + 3x + 2 Quadratic Function Degree = 2
GENERAL SHAPES OF
POLYNOMIAL FUNCTIONS
f(x) = x2 + 3x + 2
Quadratic
Function
Degree = 2
Max. Zeros: 2

12. POLYNOMIAL FUNCTIONS f(x) = x3 + 4x2 + 2 Cubic Function Degree = 3
GENERAL SHAPES OF
POLYNOMIAL FUNCTIONS
f(x) = x3 + 4x2 + 2
Cubic
Function
Degree = 3
Max. Zeros: 3

13. POLYNOMIAL FUNCTIONS f(x) = x4 + 4x3 – 2x – 1 Quartic Function
GENERAL SHAPES OF
POLYNOMIAL FUNCTIONS
f(x) = x4 + 4x3 – 2x – 1
Quartic
Function
Degree = 4
Max. Zeros: 4

14. HAND BEHAVIOUR OF A GRAPH
RIGHT
LEFT
HAND BEHAVIOUR OF A GRAPH
The degree of the polynomial along with the sign of the coefficient of the term with the highest power will tell us about the left and right hand behaviour of a graph.

15. Even degree polynomials rise on both the left and right hand sides of the graph (like x2) if the coefficient is positive. The additional terms may cause the graph to have some turns near the center but will always have the same left and right hand behaviour determined by the highest powered term.
left hand behaviour: rises
right hand behaviour: rises

16. Even degree polynomials fall on both the left and right hand sides of the graph (like - x2) if the coefficient is negative.
turning points in the middle
left hand behaviour: falls
right hand behaviour: falls

17. Odd degree polynomials fall on the left and rise on the right hand sides of the graph (like x3) if the coefficient is positive.
turning Points in the middle
right hand behaviour: rises
left hand behaviour: falls

18. Odd degree polynomials rise on the left and fall on the right hand sides of the graph (like x3) if the coefficient is negative.
turning points in the middle
left hand behaviour: rises
right hand behaviour: falls

19. How do we determine what it looks like near the middle?
A polynomial of degree n can have at most n-1 turning points (so whatever the degree is, subtract 1 to get the most times the graph could turn).
doesn’t mean it has that many turning points but that’s the most it can have
Let’s determine left and right hand behaviour for the graph of the function:
degree is 4 which is even and the coefficient is positive so the graph will look like x2 looks off to the left and off to the right.
How do we determine what it looks like near the middle?
The graph can have at most 3 turning points

20. Characteristics Maximum number of turns in 1 less than the degree
Odd with positive leading coefficient
Starts down and comes up
Even with positive leading coefficient
Starts up and comes down
Negative leading coefficient changes direction of starting position

21. To find the x intercept we put 0 in for y.
x and y intercepts would be useful and we know how to find those. To find the y intercept we put 0 in for x.
To find the x intercept we put 0 in for y.
Finally we need a smooth curve through the intercepts that has the correct left and right hand behavior. To pass through these points, it will have 3 turns (one less than the degree so that’s okay)
(0,30)