Transcript Document

Get out your binders!
Today’s Objectives:
You will be able to solve quadratics by
factoring using GCF.
You will be able to solve quadratics by
factoring when π‘Ž = 1.
Warm Up
Using the given function below…
a)
b)
c)
Find the y-intercept, the axis of
symmetry, and the vertex
Make a table
Graph the function
d)
e)
f)
𝟐
State whether the function has a
minimum or maximum
Find the value of the min/max
Find the roots
𝒇 𝒙 = 𝒙 βˆ’ πŸ‘π’™ + 𝟐
4.3 Solve by Factoring
Factor
A factor is a number that is
multiplied with another number to
get a product.
πŸ” × πŸ‘ = πŸπŸ–
FACTOR
FACTOR
Factor
A factor is a number that is
multiplied with another number to
get a product.
Find the factors of βˆ’20:
Think: which TWO numbers can be multiplied
together to get a product of βˆ’20?
Greatest Common Factor
We’re here!
Greatest Common Factor
Find numbers and variables that can
be factored out of every term in the
expressionβ€”"factoring" means
"dividing out and putting in front of the
parentheses".
Nothing "disappears" when you
factor; things merely get rearranged.
Greatest Common Factor
You will use the GCF to …
1. FACTOR equations, and
2. SOLVE equations
We will begin with FACTORING.
Greatest Common Factor
Factor the following equations.
1. 7π‘₯ βˆ’ 7
2
2. 3π‘₯ + 9
3. βˆ’π‘₯ 5 βˆ’ 5π‘₯ 2
2
4. βˆ’16π‘₯ + 8π‘₯
5. 9π‘₯ 2 𝑦 6 + 3π‘₯ 3 𝑦 4
You Try!
FACTOR the following equations.
4
1. 12π‘₯ + 6π‘₯
2.
2
βˆ’2𝑦
+ 4𝑦
Zero Property
The zero property is used to solve for 𝒙.
If multiple terms multiplied together equal
zero, you can separate each term, set each
equal to 0, and solve.
πŸπ’™ πŸ’π’™ + πŸ– = 𝟎
π’™βˆ’πŸ— π’™βˆ’πŸ“ =𝟎
πŸ“π’™ πŸ’π’™ + 𝟏 𝒙 βˆ’ πŸ” = 𝟎
Solving with GCF
Solve by factoring the GCF
FIRST and then using the zero
property.
𝟐
πŸπŸπ’š βˆ’ πŸπ’š = 𝟎
Solving with GCF
SOLVE the following equations.
2
1. 20π‘₯ + 15π‘₯ = 0
2
2. βˆ’ 9𝑧 βˆ’ 3𝑧 = 0
2
3. 14π‘₯ + 7π‘₯ = 0
You Try!!!
SOLVE the following equations.
2
1. βˆ’2π‘₯ + 4π‘₯ = 0
2
2. 4𝑦 + 16𝑦 = 0
Factoring when a=1
We’re here!
Factoring when a=1
Factoring a trinomial is the
opposite of FOIL.
(𝒙 βˆ’ πŸ’)(𝒙 + πŸ“)
Factoring when a=1
𝟐
1 𝒙 βˆ’ πŸπ’™ βˆ’ πŸπŸ“
Remember that this is where 𝒂 is!
And when you don’t see a number, it is 1!
Factoring when a=1
Factoring when 𝒂 = 𝟏,
1. set up two sets
of parenthesis
with an π‘₯ in
each,
2. find two factors
of c that add up
to equal b, then
3. write each factor
in a parenthesis.
𝟐
𝒙 βˆ’ πŸπ’™ βˆ’ πŸπŸ“
Factoring when a=1
FACTOR the following.
2
1. π‘₯ βˆ’ 15π‘₯ + 36
2.
2
π‘₯
+ 7π‘₯ + 12
3.
2
π‘₯
βˆ’ π‘₯ βˆ’ 30
You Try!
FACTOR the following.
2
1. π‘₯ βˆ’ 8π‘₯ + 15
2
2. π‘₯ βˆ’ 2π‘₯ βˆ’ 35
Solving with a=1
Solve by factoring the equation
FIRST and then using the zero
property.
𝟐
𝒙 + πŸ”π’™ + πŸ– = 𝟎
Solving when a=1
SOLVE the following.
2
1. π‘₯ + 5π‘₯ + 6 = 0
2.
2
π‘₯
2
βˆ’ 9π‘₯ + 20 = 0
3. π‘₯ βˆ’ 4π‘₯ βˆ’ 21 = 0
You Try!
SOLVE the following.
2
1. π‘₯ + 5π‘₯ βˆ’ 24 = 0
2.
2
π‘₯
βˆ’ 11π‘₯ + 30 = 0
QUICK REVIEW
SOLVE the following.
1.
2
9π‘₯
2.
2
π‘₯
+ 3π‘₯ = 0
βˆ’ 4π‘₯ + 4 = 0
2
3. π‘₯ βˆ’ 2π‘₯ βˆ’ 15 = 0
4.
2
9π‘₯
+ 3π‘₯ = 0
Ticket Out The Door
On a 3x5 Card answer the following.
What numbers can replace the ? to
make this trinomial factorable.
𝟐
𝒙
+ ? 𝒙 + 𝟏𝟐 = 𝟎
Solve.
𝟐
πŸ‘π’™
+ πŸπŸπ’™ = 𝟎
Homework
4.3 Worksheetβ€”
Day 1 #’s 1-15