Factoring Polynomials and Solving

Question 1

When factoring by grouping, what is the first step?

Answer 1

Split the expression into two parts.

Question 2

Step two: what do the two parenthesis need to do in order to continue factoring?

Answer 2

Match

Question 3

What are the matching parts considered to be?

Answer 3

The GCF

Question 4

If the first term is positive what is the GCF?

Answer 4

The GCF is positive.

Question 5

If the first term is negative what is the GCF?

Answer 5

The GCF is negative.

Question 6

Step two: if the two parentheses don’t match what two things can you do?

Answer 6

1. Look for an error.

2. It cannot factor.

Question 7

What is used to check the factored expressions?

Answer 7

FOIL

Question 8

To be sure that you are done factoring, what do you look for?

Answer 8

Difference of perfect squares

Question 9

When factoring a sum or a difference of cubes, what is the phrase to remember?

Answer 9

Crummy crummy SOPS

Question 10

Crummy crummy SOPS: crummy crummy =

Answer 10

cube root, cube root

Question 11

Crummy crummy SOPS: S =

Answer 11

square

Question 12

Crummy crummy SOPS: OP =

Answer 12

opposite product

Question 13

Crummy crummy SOPS: second S =

Answer 13

square

Question 14

What is this formula used for:
a^3 + b^3 = (a+b) (a^2 - ab + b^2)
OR
a^3 - b^3 = (a-b) (a^2 + ab + b^2)

Answer 14

Factoring a sum or difference of cubes

Question 15

When solving polynomial equations, what tells how many solutions there are?

Answer 15

The biggest exponents.

Question 16

When factoring in quadratic form, what do you do if the exponents are twice as much (for example ax^4 + bx^2 + c)

Answer 16

Nothing, don’t worry.

Question 17

How do you check to see if you are done factoring?

Answer 17

FOIL

and make sure to look for a difference of squares.

Question 18

Check for ____ _____ before circling final answer.

Answer 18

Cube roots

Question 19

If an equation cannot factor or square root, what are the two other options for solving?

Answer 19

Graph or quadratic formula.

Question 20

If it doesn’t hit the x-axis it doesn’t have any ____ _________.

Answer 20

real solutions

Question 21

If there are no real solutions, there are

Answer 21

imaginary solutions

Question 22

Because you can’t graph points that don’t hit the x-axis, to solve a problem with imaginary solutions use

Answer 22

quadratic formula.

Question 23

Polynomial vocabulary: one term; a number or a variable.

Answer 23

Monomial

Question 24

Polynomial vocabulary: the exponent.

Answer 24

Degree of a monomial

Question 25

Polynomial vocabulary: one or more terms connected by plus or minus.

Answer 25

Polynomial

Question 26

Polynomial vocabulary: the greatest exponent.

Answer 26

Degree of a polynomial

Question 27

Polynomial vocabulary: In order with the largest exponent first, then descending.

Answer 27

Standard form of a polynomial

Question 28

Polynomial vocabulary: used to describe and classify polynomials with two terms.

Answer 28

Binomial

Question 29

Polynomial vocabulary: used to describe and classify polynomials with three terms.

Answer 29

Trinomial

Question 30

Polynomial vocabulary: the number before a variable.

Answer 30

Coefficient

Question 31

Polynomial vocabulary: first coefficient in standard order.

Answer 31

Leading coefficient

Question 32

Polynomial vocabulary: the term that doesn’t change with the variable; doesn’t have a variable; always comes last in standard order.

Answer 32

Constant

Question 33

Classifications: degree 0

Answer 33

Constant

Question 34

Classifications: degree 1

Answer 34

Linear

Question 35

Classifications: degree 2

Answer 35

Quadratic

Question 36

Classifications: degree 3

Answer 36

Cubic

Question 37

Classifications: degree 4

Answer 37

Quartic

Question 38

Classifications: degree 5

Answer 38

Quintic

Question 39

Polynomial vocabulary: describes where the graph is going; how the arrows point.

Answer 39

End behavior

Question 40

Polynomial vocabulary: where the graph changes direction.

Answer 40

Turning points

Question 41

Hint: the number of turning points is ___ ____ than the degree of the function.

Answer 41

one less

Question 42

If
Degree: odd
LC: positive
what is the end behavior?

Answer 42

L: falls
R: rises

Question 43

If
Degree: odd
LC: negative
what is the end behavior?

Answer 43

L: rises
R: falls

Question 44

If
Degree: even
LC: positive
what is the end behavior?

Answer 44

L: rises
R: rises

Question 45

If
Degree: even
LC: negative
what is the end behavior?

Answer 45

L: falls
R: falls

Question 46

Given a #z and a polynomial (P) in standard form, x - z is a factor of the polynomial

Answer 46

If one is true then they all are.

Question 47

Given a #z and a polynomial (P) in standard form, z is a zero of the polynomial function

Answer 47

If one is true then they all are.

Question 48

Given a #z and a polynomial (P) in standard form, z is a root/solution of the polynomial equation P(x)=0

Answer 48

If one is true then they all are.

Question 49

Given a #z and a polynomial (P) in standard form, z is an x-intercept of the graph y=P(x)

Answer 49

If one is true then they all are.

Question 50

If there is no number before a factor, then

Answer 50

The leading coefficient is zero.

Question 51

To find the y-intercept from the zeros,

Answer 51

use x=0

Question 52

If it doesn’t factor,

Answer 52

plug it into the calculator.

Question 53

What tools on the calculator do you use to find the relative minimum/maximum

Answer 53

CALC

Question 54

How many relative minimums/maximum can you have?

Answer 54

There is no limit to how many you can have.

Question 55

To divide two polynomials, use

Answer 55

Polynomial long division

Question 56

What is the answer to a division problem called?

Answer 56

Quotient

Question 57

What is the number being divided called?

Answer 57

Dividend

Question 58

What is the number on the outside of the long division symbol called?

Answer 58

Divisor

Question 59

What is the number left over after division called?

Answer 59

Remainder

Question 60

What is another name for synthetic division?

Answer 60

Fake division

Question 61

Synthetic division steps: 1

Answer 61

Standard form and every lower exponent must be there.

Question 62

Synthetic division steps: 2

Answer 62

Coefficients go down below the upside-down division symbol.

Question 63

Synthetic division steps: 3

Answer 63

Add the free zero.

Question 64

Synthetic division steps: 4

Answer 64

Think: add then multiply

Question 65

For synthetic long division, if the problem starts with x^4 the answer will start with

Answer 65

x^3

Question 66

Synthetic long division can only be used for problems with

Answer 66

x + #
and
x - #

Question 67

Name this process: You list the standard-form coefficients (including zeros) of the polynomial, omitting all variables and exponents. You use “a” for the divisor and add instead of subtract throughout the process.

Answer 67

Synthetic division

Question 68

What is it if you divide a polynomial P(x) by x-a, then the remainder = P(a)?

Answer 68

Remainder theorem

Question 69

What can you sometimes use to check a factor and/or help you factor?

Answer 69

Division

Question 70

From factoring by grouping, if the two terms in parentheses don’t match, what can you do?

Answer 70

Use synthetic division (sneaky factoring).

Question 71

After using “sneaky factoring” (synthetic division), what do you do if the problem isn’t factored all the way?

Answer 71

Use the box method to factor further.

Question 72

How do you find the y-intercept from the x’s?

Answer 72

Plug in zero for x and multiply what is left together.

Question 73

When figuring out which regression to use (linear, quadratic, cubic, quartic, etc.), what do you look for?

Answer 73

The R^2 value to be closest to 1.

Question 74

What numbers will always have it’s opposite as a factor?

Answer 74

Radical and imaginary roots.