Wize High School Grade 10 Math Textbook > Factoring Polynomials

Factoring Difference of Squares

y=ax^2+bx+c

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Factoring a Difference of Squares
There is a special type of quadratic (degree 2) polynomial called a difference of squares, it has the form a2−b2\large a^2-b^2a2−b2, and it turns out there is a short-cut to factoring these polynomials.

Example
Factor a2−b2a^2-b^2a2−b2.

We can rewrite this as a2+0a−b2a^2+0a-b^2a2+0a−b2.

So, the short-cut for factoring a difference of squares is

 a2−b2=(a−b)(a+b)\Large\boxed{\colorFive{a}^2-\colorFour{b}^2=(\colorFive{a}-\colorFour{b})(\colorFive{a}+\colorFour{b})}a2−b2=(a−b)(a+b)​

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Example: Factoring a Difference of Squares
Factor the following polynomials fully.

a) x2−9x^2-9x2−9

Notice that we have a difference of squares

x2−32=(x−3)(x+3)\begin{aligned}
&x^2-3^2\\
=&(x-3)(x+3)
\end{aligned}=​x2−32(x−3)(x+3)​

b) 16−x216-x^216−x2

Notice that we have a difference of squares

42−x2=(4−x)(4+x)\begin{aligned}
&4^2-x^2\\
=&(4-x)(4+x)
\end{aligned}=​42−x2(4−x)(4+x)​

c) 4y2−254y^2-254y2−25

Notice that we have a difference of squares

(2y)2−52=(2y−5)(2y+5)\begin{aligned}
&(2y)^2-5^2\\
=&(2y-5)(2y+5)
\end{aligned}=​(2y)2−52(2y−5)(2y+5)​

Practice: Factoring a Difference of Squares
Factor these polynomials.

a) x2−100x^2-100x2−100

b) t2−36t^2-36t2−36

I don't know

Practice: Factoring a Difference of Squares
Factor the following polynomials.

a) 9m2−499m^2-499m2−49

b) 4c2−81d24c^2-81d^24c2−81d2

I don't know

Practice: Factoring a Difference of Squares
Factor the following polynomials fully.

a) 3x2−123x^2-123x2−12

b) 45cx2−20cy245cx^2-20cy^245cx2−20cy2

c) 64x4−9y264x^4-9y^264x4−9y2

I don't know

Practice: Factoring a Difference of Squares
Factor the following polynomial fully.

a) x2−25x^2-25x2−25

b) t2−81t^2-81t2−81

c) 18m2−3218m^2-3218m2−32

d) 500c2−5500c^2-5500c2−5

e) 4x2−y24x^2-y^24x2−y2

f) 3m4−27n43m^4-27n^43m4−27n4

I don't know

Extra Practice

Factoring (Review)

Practice: Factoring
Factor 625x4−16y4625x^4-16y^4625x4−16y4

Factoring (Review)

Practice: Factoring
Factor 27x3−y327x^3-y^327x3−y3

Wize High School Grade 10 Math Textbook > Factoring Polynomials

Factoring Difference of Squares

Popular Courses

Factoring a Difference of Squares

$\Large\boxed{\colorFive{a}^2-\colorFour{b}^2=(\colorFive{a}-\colorFour{b})(\colorFive{a}+\colorFour{b})}$

Example: Factoring a Difference of Squares

Practice: Factoring a Difference of Squares

Practice: Factoring a Difference of Squares

Practice: Factoring a Difference of Squares

Practice: Factoring a Difference of Squares

Extra Practice

Factoring (Review)

Factoring (Review)

Wize High School Grade 10 Math Textbook > Factoring Polynomials

Factoring Difference of Squares

Popular Courses

Factoring a Difference of Squares

a2−b2=(a−b)(a+b)\Large\boxed{\colorFive{a}^2-\colorFour{b}^2=(\colorFive{a}-\colorFour{b})(\colorFive{a}+\colorFour{b})}a2−b2=(a−b)(a+b)​

Example: Factoring a Difference of Squares

Practice: Factoring a Difference of Squares

Practice: Factoring a Difference of Squares

Practice: Factoring a Difference of Squares

Practice: Factoring a Difference of Squares

Extra Practice

Factoring (Review)

Factoring (Review)

$\Large\boxed{\colorFive{a}^2-\colorFour{b}^2=(\colorFive{a}-\colorFour{b})(\colorFive{a}+\colorFour{b})}$