Graphing Polynomials

Zeros & Multiplicity

End Behavior

Polynomial Degree & Orientation

Graph Match-up

Equations & Sketching

100

What is the definition of a zero in a polynomial?

A value of x that makes the function equal to 0.

100

What determines the end behavior of a polynomial?

The degree and leading coefficient.

100

What is the degree of

f(x)=(x-2)^2(x+3)^3

Degree = 5

100

A graph bounces off the x-axis at x=−2 and crosses at x=3. Write one possible equation.

f(x)=(x+2)^2 (x−3).

100

Explain how to tell if a graph “bounces” or “crosses” at a zero.

Even multiplicity → bounces; odd → crosses.

200

If f(x)= (x - 2)³(x + 4)², what are the zeros and their multiplicities?

Zeros: x=2 (mult. 3), x=−4 (mult. 2).

200

Describe the end behavior of

f(x)=-x^3 +4x^2 -x.

-/odd

x -> infty, f(x) ->-infty

x-> -infty, f(x)-> infty

200

If the degree is odd and leading coefficient is negative, what does the graph look like?

right-down, left-up

200

Which has the steeper end growth:

x^3 or x^5 ?

x^5

200

Sketch the rough shape of

f(x)=(x+1)^2 (x−3).

Bounces at −1, crosses at 3, right-up and left down.

300

What happens to the graph at a zero with even multiplicity?

It bounces off the x-axis.

300

True or False

A polynomial with an even degree always has opposite end behaviors.

False. Even degree = same end direction.

300

Find the leading term of

f(x)=-3(x-1)^2(x+4)

Leading term:

-3x^3

300

The graph falls left and rises right. What’s the degree and sign of the leading coefficient?

Odd degree, positive leading coefficient.

300

What are the x-intercepts of

f(x)=(x−4)(x+5)^2 ?

x=4,−5.

400

Find all zeros and multiplicities for

f(x)=x^2(x−5)^4.

x=0

(mult. 2),

x=5

(mult. 4).

400

If degree is 5 and leading coefficient is positive, describe the end behavior.

x->infty,f(x)->infty

x->-infty,f(x)->-infty

400

For

f(x)=−2(x+3)^2(x−4)^3

identify the degree and describe its end behavior.

Degree = 5 (odd), negative leading coefficient → left-up, right-down.

400

Describe a graph with 3 real zeros.

A cubic polynomial.

400

Write a polynomial in factored form with zeros at −1,2,4.

f(x)=(x+1)(x−2)(x−4).

500

Create a polynomial with zeros at −3,0, and 5 where −3 has the multiplicity of 2.

f(x)=x(x+3)^2(x−5).

500

Explain how to determine end behavior without graphing.

Use the leading term’s sign and degree.

500

Determine degree and orientation of

f(x)=2(x-1)(x+2)^3(x-5)^2

Degree = 6, orientation = right-up, left up.

500

Describe the shape of

f(x)=−x^4 +3x^2 .

Opens downward on both ends, symmetric about y-axis.

500

For

f(x)=(x−1)^3(x+2)^2

sketch and label intercepts

x=1 (cross), x=−2(bounce).