Algebra Ch. 7

Classifying Polynomials

Adding/Subtracting

Multiplying

Factoring

Perfect Squares/Grouping

100

Find the degree of the monomial: 23x⁴

100

(4r + 3) + (6r + 5) =

10r + 8

100

(y + 6)(y + 4)

y² + 10y + 24

100

x² - 14x + 24

(x - 2) (x- 12)

100

x²- 36

(x + 6)(x - 6)

200

Write in standard form:

5x + 2x³ + 3x⁴

3x⁴ + 2x³ + 5x

200

(6x + 9) - (7x + 1)

-x + 8

200

(5s + 6)(s - 2)

5s² - 4s - 12

200

y² + 2y - 48

(y - 6)( y + 8)

200

m² - 2m + 1

(m - 1)²

300

What is the leading coefficient?

4w¹¹ - w¹²

300

(-3p³ + 5p² - 2p) + (-p³ - 8p² - 15p)

-4p³ - 3p² - 17p

300

(3x + 4)²

9x² + 24x + 16

300

3x² - 14x + 8

(3x - 2)( x - 4)

300

Solve the equation.

2k² - 5k - 18 = 0

-2 and 4.5

400

Classify the polynomial by the number of terms.

7 + 3p²

Binomial

400

(y² - 4y + 9) - (3y² -6y - 9)

-2y²+ 2y + 18

400

(w + 5)(w²+ 3w)

w³ + 8w² + 15w

400

-5m² + 6m - 1

-(m-1)(5m - 1)

400

3x³ + 6x² - 18x

3x(x² + 2x - 6)

500

What is the degree?

8d - 2 - 4d³

500

(k³ - 7k + 2) - (k²- 12)

k³ - k² - 7k + 14

500

(x+4)(x² + 3x + 2)

x³ +7x² + 14x + 8

500

4k² + 28k + 48

4(k + 3)(k + 4)

500

x³ + 3x² + 2x + 6

(x + 3)(x² + 2)

600

The expression below represents the volume of a sphere with a radius, r. Why is this expression a monomial? What is it degree?

(4/3)pir^3

It is only group multiplied by another.

600

You drop a ball from a height of 98 feet. At the same time, your friend throws a ball upward. The polynomials represent the heights(in feet) of the balls after t seconds.

-16t² + 98

-16t²+ 46t + 6

Write a polynomial that represents the distance between your ball and your friend's ball after t seconds.

-46t + 92

600

A rectangular football field with a length of (10x + 10) ft and a width of (4x + 20) ft.

Write a polynomial that represents the area of the football field.

4x² + 240x + 200 ft²

600

The area of the school sign can be represented by 15x² - x - 2.

If the width is (3x + 1), what would be the length?

(5x - 2)

600

2y³ - 12y² + 18y

2y(y - 3)²