a=1
Perfect
Complete Square
100

Identify the b and c values in the trinomial: 

x2+5x+6

b=5, c=6 

100

Check if First & Last Terms are Perfect Squares

9x2 - 30x + 25

Yes

100

Make sure your leading coefficient (a value) is 1. If not, divide the entire equation by the expression. 

Which equations have an A value of 1, or can be MADE 1?

1.) 2x2+7x+3

2.)x2-10x+25

3.)2x2+8x-10

4.)6x2+11x-10

2.) a=1

3.) a=1 after dividing everything by 2

200

To factor, find two numbers that add to b and multiply to c. What are the two factors?
a. 1 and 6

b. 2 and 3

b. 2 and 3

200

Find the Square Roots

3x and 5 

200

Second Step, isolate the variable terms 


Isolate x2+6x-7=0

x2+6x=7

you add 7 to both sides 

300

After finding the magic numbers, write the trinomial as two binomials next to the variable x. Which is the correct factored form?

a. x2+2x+3x+6

b. (x+2)+(x-3)

c. (x+2)(x+3)

c. (x+2)(x+3)

300

Verify the Middle Term

2 x (3x) x (5) = 30x

300

Find the value to complete the square, through the equation (b/2)2

Ex.)  8x is the b term, so 8/2=4, 42=16

Find the value to complete the square with a b value of 6.

The value to complete the square for a b-value of 6 is 9!

400

Is the binomial + or -

(-) Negative, inside the parentheses 

400

The next step is part a.) adding the squared value to both sides of the equation: x2

part b.)  Rewriting the equation as a squared binomial by factoring. Reminder on how to factor, find 2 values that add up to the b value, but also multiply into the c value. Then, separate the equations into two parentheses and simplify. 

part a.) x2+6x+9=16

part b.) (x+3)2=16

500

Box/Circle your Answer

 Factored form is (3x-5)2

500

Lastly, solve the equations using square roots. 


A.) solve (x+3)2=16 using square roots 

x+3=-4

x+3=4

Answer: X= 1 and X=-7