Unit 4 Test Review

Polynomial Operations

Polynomial Operations pt.2

Graphing Polynomials

Binomial Theorem Pt.1

Binomial Theorem pt.2

100

When subtracting polynomials, we must first "______" the negative sign to all the terms before combining "____" terms.

"distribute" and "like"

100

When multiplying variables, we "___" the exponents.

add

100

#16 on Review

Identify the Degree and Sign of the leading term.

f(x) = x³(x-4)²(x+2)³

Degree: 8 (even); Leading term: 1 (positive)

100

#10 on Review

Find each coefficient described.

Coefficient of 4th term of (2y+1)⁵

100

The Binomial Theorem hinges on "________" triangle.

Pascal's

200

#1 on the review

⁽9n⁴-3-2n²) + (14n⁴-3n⁵+13n²)

-3n⁵+24n⁴+11n²-3

200

We are going to use the "________ __________" when multiplying polynomials.

distributive property

200

#18 on Review

Identify each zero and their multiplicity. (And what they do on the graph: cross, bounce, or flex)

f(x) = x³(x-4)²(x+2)³

cross at (0,0), bounce at (4,0), and cross at (-2,0)

200

#11 on Review

Find each coefficient described.

Coefficient of 2nd term of (1+2n)⁵

200

#13 on Review

Find the term described.

4th term in expansion of (2a+1)⁶

160a³

300

#2 on Review

(-4x⁴+7x-2x⁵) - (4x⁴+9x-12x²)

-2x⁵-8x⁴+12x²-2x

300

What is the method used to divide polynomials called?

Polynomial Long Division

300

#20 on Review.

Identify the end behavior.

f(x) = x³(x-4)²(x+2)³

As x -> infinity, y -> infinity

As x -> negative infinity, y -> infinity

300

#12 on Review

Find each coefficient described.

Coefficient of 3rd term of (3n+1)⁵

270

300

#14 on Review

Find the term described.

3rd term in expansion of (2x+1)⁶

240x⁴

400

#3 on Review

(-5k+5)(-2k-6)

10k²+20k-30

400

#5 from Review

Divide. (m⁴-m³-40m²+6m-28) / (m+6)

m³-7m²+2m-6 r.8

400

#17 on Review

Identify the Degree and Sign of the leading term.

f(x) = -4x²(x-1)⁶(x+8)⁷

Degree: 15 (odd); Leading Term: -4 (negative)

400

Set up the expansion.

(2a-b)⁴

1(2a)⁴(-b)⁰ + 4(2a)³(-b)¹ + 6(2a)²(-b)²

+ 4(2a)¹(-b)³ + 1(2a)⁰(-b)⁴

400

#15 on Review

Find the term described.

3rd term in expansion of (1+2x)⁶

60x²

500

#4 on Review

(7x²-4x+6)(-2x²-5x+7)

-14x⁴-27x³+57x²-58x+42

500

#6 from Review

Divide. (5n⁴+11n³+2n²-5n-1) / (n+1)

5n³+6n²-4n-1

500

#19 on Review.

Identify each zero and their multiplicity. (And what they do on the graph: bounce, cross, or flex)

f(x) = -4x²(x-1)⁶(x+8)⁷

bounce at (0,0), bounce at (1,0), and cross at (-8,0)

500

Set up the expansion for

(x-3y)⁴

1(x)⁴(-3y)⁰ + 4(x)³(-3y)¹ + 6(x)²(-3y)²

+ 4(x)¹(-3y)³ + 1(x)⁰(-3y)⁴

500

Set up the expansion for (2x+y)⁶

1(2x)⁶(y)⁰ + 6(2x)⁵(y)¹ + 15(x)⁴(y)² + 20(2x)³(y)³ + 15(2x)²(y)² + 6(2x)¹(y)⁵ + 1(2x)⁰(y)⁶