Grudge Ball !

Algebra Grudge Rules:1. Each team starts with 10 points.

2. Each team gets a question which they solve on the whiteboard.

3. If correct, they can take two points off the board from another team. The team has the option to “shoot a basket”. If they make it, they can take two more points off (total of 4 points). If they miss, they can only remove one point.

Algebra Grudge Rules:4. Teams can remove points from one or more teams.

5. At the end of all rounds, the team with the most points wins.

6. A team can get back into the game by answering the question correct and making a basket. (They can add 4 points).

7. Any team that makes changes to whiteboard after stop loses all points!

Factoring Polynomials

Subtract Polynomials

Factoring Polynomials

Multiply Polynomials

Special Products

Identify Polynomials

Add Polynomials

Multiply Polynomials

#1 #2 #3

#1 #2 #3#1 #2 #3

#1 #2

#1 #2 #3

#1 #2 #3 #1 #2 #3 #1 #2 #3

Solving Poly Eqs

#1 #2 #3

Solving Poly Eqs

#1 #2 #3

Vertical Motion

#1 #2 #3

LifeApplication

#1 #2 #3

Chapter 9Polynomial Review

#3

Identify Polynomials #1

List the degree, leading coefficient and name of this polynomial.

3𝑘5 + 5𝑘3 − 12𝑘2 + 𝑘

Degree: 5 LC: 3 Name: Polynomial

Identify Polynomials #2

Degree: 2 LC: -12 Name: Binomial

List the degree, leading coefficient and name of this polynomial.

−12𝑐2 + 5𝑐

Identify Polynomials #3

Degree: 4 LC: 8 Name: Trinomial

List the degree, leading coefficient and name of this polynomial.

8ℎ4 + 22ℎ − 17

Add Polynomials #1

Find the sum.

−4𝑦2 + 𝑦 + 5 + −𝑦2 − 3𝑦 + 4

−5𝑦2 − 2𝑦 + 9

Add Polynomials #2

Find the sum.

−5𝑥2 + 2𝑥 − 1 + 6𝑥3 + 2𝑥2 − 5

6𝑥3 − 3𝑥2 + 2𝑥 − 6

Add Polynomials #3

Find the sum.

10𝑎2 − 7𝑎 + 3 + −4𝑎3 + 2𝑎2 − 3𝑎 − 5

−4𝑎3 + 12𝑎2 − 10𝑎 − 2

Subtract Polynomials #1

Find the difference.

𝑚2 − 3𝑚 + 4 − −𝑚2 + 5𝑚 + 1

2𝑚2 − 8𝑚 + 3

Subtract Polynomials #2

Find the difference.

−𝑑4 − 2𝑑3 + 5 − −6𝑑2 + 5𝑑 + 5

−𝑑4 − 2𝑑3 + 6𝑑2 − 5𝑑

Subtract Polynomials #3

Find the difference.

−5𝑧3 − 2𝑧2 + 5𝑧 − 1 − 6𝑧3 + 2𝑧2 + 3𝑧 − 5

−11𝑧3 − 4𝑧2 + 2𝑧 + 4

Multiply Polynomials #1

Find the product.

3𝑝4 − 5 2𝑝2 + 4

6𝑝6 + 12𝑝4 − 10𝑝2 − 20

Multiply Polynomials #2

Find the product.

𝑑2 4𝑑2 − 3𝑑 + 2

4𝑑4 − 3𝑑3 + 2𝑑2

Multiply Polynomials #3

Find the product.

𝑤3 + 2 𝑤2 + 2𝑤 + 1

𝑤5 + 2𝑤4 +𝑤3 + 2𝑤2 + 4𝑤 + 2

Multiply Polynomials #1

Find the product.

−𝑠3 3𝑠2 + 3𝑠 − 6

−3𝑠5 − 3𝑠4 + 6𝑠3

Multiply Polynomials #2

Find the product.

8𝑛 − 3 2𝑛2 − 4𝑛 + 5

16𝑛3 − 38𝑛2 + 52𝑛 − 15

Multiply Polynomials #3

Find the product.

2𝑥2 + 5𝑥 − 2 𝑥 + 3

2𝑥3 + 11𝑥2 + 13𝑥 − 6

Special Products #1

Find the product.

4𝑥 − 𝑦 2

16𝑥2 − 8𝑥𝑦 + 𝑦2

Special Products #2

Factor the polynomial.

81𝑐2 − 4

9𝑐 + 2 9𝑐 − 2

Special Products #3

Factor the polynomial.

9𝑡2 − 12𝑡 + 4

3𝑡 − 2 2

Factoring Polynomials #1

Factor the polynomial.

𝑎2 + 5𝑎 − 84

𝑎 + 12 𝑎 − 7

Factoring Polynomials #2

Factor the polynomial.

−12𝑟2 + 5𝑟 + 3

− 3𝑟 + 1 4𝑟 − 3

Factoring Polynomials #3

Factor the polynomial.

2𝑛2 − 11𝑛 + 15

2𝑛 − 5 𝑛 − 3

Factoring Polynomials #1

Factor the polynomial.

18𝑠2 + 12𝑠 − 6

6 3𝑠 − 1 𝑠 + 1

Factoring Polynomials #2

Factor the polynomial.

𝑡2 − 10𝑡 + 21

𝑡 − 7 𝑡 − 3

Factoring Polynomials #3

Factor the polynomial.

2ℎ2 − 9ℎ + 4

2ℎ − 1 ℎ − 4

Solving Polynomial Equations #1

Solve the equation.

3𝑧2 + 𝑧 − 14 = 0

𝑧 = −7

3, 2

Solving Polynomial Equations #2

Solve the equation.

−5𝑏2 + 7𝑏 = 2

𝑏 =2

5, 1

Solving Polynomial Equations #3

Solve the equation.

6𝑦2 − 5𝑦 − 4 = 0

𝑦 = −1

2,4

3

Solving Polynomial Equations #1

Solve the equation.

10𝑥2 − 3𝑥 = 27

𝑥 = −3

2,9

5

Solving Polynomial Equations #2

Solve the equation.

−3𝑝2 − 10𝑝 − 3 = 0

𝑝 = −3 ,−1

3

Solving Polynomial Equations #3

Solve the equation.

−16𝑧2 + 46𝑧 = −6

𝑧 = −1

8, 3

Vertical Motion Model #1

A soccer ball is kicked from the ground with a starting upward velocity of 50 feet per second. After how many seconds will it hit the ground?

The soccer ball will hit the ground 3.13 seconds after it is kicked.

Vertical Motion Model #2

An athlete throws the shot put from an initial height of 6 feet and with an initial vertical velocity of 29 feet per second. After how many seconds does it land on the ground?

The shot put hits on the ground 2 seconds after it is thrown.

Vertical Motion Model #3

An acorn falls off a tree from a height of 16 feet. After how many seconds does it hit on the ground?

The acorn hits the ground 1 second after it falls.

Life Application #1

a.) 4𝑥2 + 38𝑥 + 90b.) 306 ft2

a.) 4𝑥2 + 84𝑥 + 440b.) 840 in2

Life Application #2

a.) 2𝑥2 + 100𝑥 + 800b.) 1350 ft2

Life Application #3

And the Winner Is…