1. Consider the function f(x)= 2x2 + 8x – 7.
DO NOW
Consider the function f(x)= 2x2 + 8x – 7.
1. Determine whether the graph opens upward or downward.
2. Find the axis of symmetry.
3. Find the vertex.
4. Identify the maximum or minimum value of the function.
5. Find the y-intercept.
6. Graph the function.
7. Find the domain and Range of the function.

2. 5-1 Solving Quadratic Equations by Graphing and Factoring SWBAT
Solve quadratic equations by graphing or factoring.
Determine a quadratic function from its roots.
Holt Algebra 2

3. Example 1: Factor by taking out the GCF
a. 6m3 – 18m
b x4 - 20x2
c. 4x3 + 20x2 + 24x
d. 3xy3 + 9x2y

4. Example 2: Factor by Grouping
x3 + 2x2 + 3x + 6
x3y - 2x2y - 9x + 18

5. Steps to Factor: ax 2 + bx + c
Step 1: Multiply a and c together.
Step 2: Find all possible factors of this number.
Step 3: Find the factor that adds up to b (the middle
term)
Step 4: Write (the first term) + ___ + ___ + (the last
term).
Step 5: Fill in the blanks with the correct combination of the factors.
Step 6: Group the first & last two terms together.
Step 7: Find the GCF of each set of parentheses.
Step 8: Write the common binomial as one factor and
what is left over as the other.

6. Example 1:
f(x) = 3x x

7. Example 2:
7n 2 – 4n – = 0

8. Homework
1. Pg 256 #16-30 evens. Do not graph

9. Quadratic expressions with two terms are binomials.
Quadratic expressions with three terms are trinomials. Some quadratic expressions with perfect squares have special factoring rules.

10. Example 4A: Find Roots by Using Special Factors
Find the roots of the equation by factoring.
4x2 = 25
4x2 – 25 = 0
Rewrite in standard form.
(2x)2 – (5)2 = 0
Write the left side as a2 – b2.
(2x + 5)(2x – 5) = 0
Factor the difference of squares.
2x + 5 = 0 or 2x – 5 = 0
Apply the Zero Product Property.
x = – or x =
Solve each equation.

12. Do Now– System of Equations
Two plumbers offer competitive services. The first charges $35 house-call fee and $28 per hour. The second plumber charges a $42 house-call fee and $21 per hour. After how many hours do the two plumbers charge the same amount?

13. 5-1 Solving Quadratic Equations by Graphing and Factoring SWBAT
Solve quadratic equations by graphing or factoring.
Determine a quadratic function from its roots.
Holt Algebra 2

14. When a soccer ball is kicked into the air, how long will the ball take to hit the ground? The height h in feet of the ball after t seconds can be modeled by the quadratic function h(t) = –16t2 + 32t. In this situation, the value of the function represents the height of the soccer ball. When the ball hits the ground, the value of the function is zero.

15. A zero of a function is a value of the input x that makes the output f(x) equal zero. The zeros of a function are the x-intercepts.
Unlike linear functions, which have no more than one zero, quadratic functions can have two zeros, as shown at right. These zeros are always symmetric about the axis of symmetry.

16. You can find the roots of some quadratic equations by factoring and applying the Zero Product Property.
Functions have zeros or x-intercepts.
Equations have solutions or roots.
Reading Math

17. Find the zeros of the function by factoring.
f(x) = x2 – 4x – 12
g(x) = x2 – 8x
p(x)= x2 – 5x – 6
r(x) = 3x2 + 18x

18. Any object that is thrown or launched into the air, such as a baseball, basketball, or soccer ball, is a projectile. The general function that approximates the height h in feet of a projectile on Earth after
t seconds is given.
Note that this model has limitations because it does not account for air resistance, wind, and other real-world factors.

19. A golf ball is hit from ground level with an initial vertical velocity of 80 ft/s. After how many seconds will the ball hit the ground?
h(t) = –16t2 + v0t + h0
Write the general projectile function.
h(t) = –16t2 + 80t + 0
Substitute 80 for v0 and 0 for h0.
The golf ball will hit the ground after 5 seconds. Notice that the height is also zero when t = 0, the instant that the golf ball is hit.

20. A football is kicked from ground level with an initial vertical velocity of 48 ft/s. How long is the ball in the air?
h(t) = –16t2 + v0t + h0
Write the general projectile function.
h(t) = –16t2 + 48t + 0
Substitute 48 for v0 and 0 for h0.
The football will hit the ground after 3 sec. Notice that the height is also zero when t = 0, the instant that the football is hit.

21. Find the roots of the equation by factoring.
25x2 = 9

22. If you know the zeros of a function, you can work backward to write a rule for the function
1. Write a quadratic function in standard form with zeros 4 and –7.
2. Write a quadratic function in standard form with zeros 5 and –5.

23. Homework Reading Strategies (worksheet) Pg 256 #13 – 16 all, 47, 50
Finish pg 256 #17-30 all if you did not understand last night. (do not graph)