5

5.4 Factor and Solve Polynomial Equations

Goal Factor and solve other polynomial equations.



Your Notes



VOCABULARY

Prime polynomial

A polynomial with two or more terms that cannot be written as a product of polynomials

of lesser degree using only integer coefficients and constants and the only common

factors of its terms are 1 and 1



Factored completely

A polynomial is factored completely if it is written as a monomial or the product of a

monomial and one or more prime polynomials.



Factor by grouping

A method used to factor some polynomials with pairs of terms that have a common

monomial factor



Quadratic form

An expression of the form au2 + bu + c, where u is any expression in x



FACTORING POLYNOMIALS

Definition A polynomial with two or more terms is a prime polynomial if it _cannot_ be

written as a product of polynomials of lesser degree using only integer coefficients and

constants and if the only common factors of its terms are _1_ and _1_.



Example 16x2  4x + 8 _is not_ a prime polynomial because _4_ is a common factor of

all its terms.



Definition A polynomial is factored completely if it is written as a monomial or the

product of a monomial and one or more _prime_ polynomials.



Example (x + 2)(x2  5x + 6) is not factored completely because

x2  5x + 6 = _(x  2) (x  3)_ .

Your Notes



SPECIAL FACTORING PATTERNS



Sum of Two Cubes

a3 + b3 = (a + b)(a2  ab + b2)



Example

x3 + 8 = (x + 2)(_x2  2x + 4_)



Difference of Two Cubes

a3  b3 = (a  b)(a2 + ab + b2)



Example

8x3  1 = (2x  1)(_4x2 + 2x + 1_)



Example 1

Factor the sum or difference of two cubes



Factor the polynomial completely.



a. z3  125 = z3  _53 _ Difference of

two cubes

= (z  _5_ )(_ z2 + 5z + 25_ )

4

b. 81y + 192y = 3y(_27y3 + 64_) Factor common

monomial.

3 3

= 3y[_(3y) _ + _4 _] Sum of two

cubes

= 3y(_3y + 4_)(_9y  12y + 16_)

2







Checkpoint Factor the polynomial completely.



1. 8x3 + 64

8(x + 2){x2  2x+ 4)



Example 2

Factor by grouping



Factor the polynomial x3  2x2  9x + 18 completely.

x3  2x2  9x + 18

= x2(_x  2_)  9(_x  2_) Factor by grouping.

= _(x  9)(x  2)_

2

Distributive property

= _(x + 3)(x  3)(x  2)_ Difference of two

squares

Your Notes



Example 3

Factor polynomials in quadratic form



Factor completely: (a) 16x4  256 and (b) 3y7 - 15y5 + 18y3.



a. 16x4  256 = (_4x2_)2  _16 2_

= _(4x2 + 16)(4x2  16)_

= _(4x2 + 16)(2x + 4)(2x  4)_

b. 3y  15y + 18y3 = 3y3(_ y4  5y2 + 6 _)

7 5



= _3y3(y2  3)(y2  2)_



Checkpoint Factor each polynomial completely.



2. x3 + 2x2  25x  50

(x + 5)(x  5)(x + 2)



3. x4  14x2 + 45

(x2  5)(x + 3)(x  3)



Example 4

Solve a polynomial equation



What are the real-number solutions of the equation x4 + 9 = 10x2?



x4 + 9 = 10x2 Write original

equation.

_x4  10x2 + 9 = 0 Write in standard

form.

_(x2  9)(x2  1) = 0 Factor trinomial.

_(x + 3)(x  3)(x + 1)(x  1)_ = 0 Difference of two

squares

x = _3_ , x = _3_, x = _1_ , x = _1_ Zero product

property

The solutions are _3, 3, 1, and 1_ .

Checkpoint Find the real-number solutions.



4. 2x5 + 24x = 14x3

0, , 3 , 3 , 2, 2



Homework

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