Quadratics Part 1

Factoring Frenzy

Complete the Square Challenge

What's that pattern?

Vertex Vision

Structure Matters

100

Factor:

x^2+5x+6

What is (x+2)(x+3)?

100

What value of c would make this a perfect square trinomial:

x^2+10x+c

100

What is the name of this type of problem:

x^2-36

Difference of Squares

100

Which equation is in vertex form? Identify the vertex

a) (x+8)²+10

b) x²-16x+21

c) (x+11)(x+4)

a) (x+8)²+10 is in vertex form and the vertex is (-8, 10).

100

Which method would you use to solve

x^2+2x-8=0

Either will work, but factoring may be easier.

200

Factor and solve:

x^2-2x-10=-2

What is (x+2)(x-4)=0 and x=-2 and x=4

200

Solve by completing the square:

x^2+6x+9=0

(x+3)^2=0

and x=-3

200

What is the name of this type of problem:

x^2+12x+36

Perfect Square Trinomials

200

Identify the vertex:

y=(x-2)^2-5

Vertex is

(2,-5)

200

2x^2+5x+9

factorable? Explain

No, there are no factors of 18 that add to 5.

300

Factor and Solve:

2 x^2+10x+3=3x

(2x+1)(x+3)=0

x=-1/2, 3

300

Solve by completing the square:

x^2-8x+6=0

x=4+-sqrt10approx7.16,0.84

300

Which of the following is not factorable? Why?

a) x²-16 b) x²-8x+16 c)x²+25 d) 100x²-81

c) is not factorable because it is sum of squares rather than differnece of squares. there are no factors of 25 that add to 0.

300

Solve and identify the vertex:

(x-1)^2+4=0

x=1+-2i Vertex: (1,4)

300

How many solutions are there? What kind of solutions are they?

(x+10)^2=12

There are 2 irrational solutions:

x=-10+-2sqrt3

400

What makes a trinomial prime (not factorable)?

There are no factors of c that add to b.

The solutions are most likely irrational or imaginary.

400

Solve by completing the square:

4x^2+8x+1=0

x=+-1/2

400

Explain the difference between perfect square trinomials and difference of squares.

PST has 3 terms and in factored form it is 2 of the same thing. Ex: x²-4x+4=(x-2)(x-2) or (x-2)².

Difference of squares only has 2 terms. Factored form is almost the same but one is + and the other is -. Ex: x²-49=(x+7)(x-7)

400

Use the process of completing the square to find the vertex form and the vertex:

x^2-8x+10=0

(x-4)^2-6

(4, -6)

400

How many solutions are there? What kind of solutions are they?

x^2+16=0

There are 2 imaginary solutions:

+-4i

500

Factor and Solve:

4x^2-12x+7=x^2-2x

(x-1)(3x-7)=0

x=1, 7/3

500

Why do we find (b/2)² and add it to both sides?

(b/2)² is the value that wil turn x²+bx into a perfect square trinomial. If we add it to the left, we must add it to the right as well to preserve equality.

500

Name the problem type and factor:

9x^2-64

Difference of squares

(3x+8)(3x-8)

500

A student forgot the

what happened to their answer?

They only found one solution when there should be 2.