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Quadratic Functions

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Quadratic Functions Lesson 3.1 Applications of Parabolas Solar rays reflect off a parabolic mirror and focus at a point This could make a good solar powered cooker ... – PowerPoint PPT presentation

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Title: Quadratic Functions


1
Quadratic Functions
  • Lesson 3.1

2
Applications of Parabolas
Today we look at functions which describe
parabolas.
  • Solar rays reflect off a parabolic mirror and
    focus at a point
  • This could make a good solar powered cooker
    (also wireless antenna reflector) YouTube view

3
Finding Zeros
  • Often with quadratic functions    
    f(x) ax2 bx c   we speak of finding the
    zeros
  • This means we wish to find all possible values of
    x for which    ax2 bx c 0

4
Finding Zeros
  • Another way to say this is that we are seeking
    the x-axis intercepts
  • This is shown on the graph below
  • Here we see two zeros what other possibilities
    exist?

5
Factoring
  • Given the function   x2 - 2x - 8 0
  •  Factor the left side of the equation   
    (x - 4)(x 2) 0
  • We know that if the product of two numbers  
    a b 0     then either ...
  • a 0     or
  • b 0
  • Thus either
  • x - 4 0    gt x 4     or
  • x 2 0    gt x -2

6
Warning!!
  • Problem ... many (most) quadratic functions
    are NOT easily factored!! 
  •  Example

7
The Quadratic Formula
  •  It is possible to create two functions on your
    calculator to use the quadratic formula.
  • quad1 (a,b,c)           which uses the    -b
    ...
  • quad2 (a,b,c)           which uses the    -b -

8
The Quadratic Formula
  • Try it for the quadratic functions
  • 4x2 - 7x 3 0                          
  • 6x2 - 2x 5 0

Click to view Spreadsheet Solution
9
The Quadratic Formula
  • 4x2 - 7x 3 0  

10
The Quadratic Formula
  • Why does the second function give "non-real
    result?
  • 6x2 - 2x 5 0

11
Concavity and Quadratic Functions
  • Quadratic function graphs as a parabola
  • Will be either concave up
  • Or Concave Down

12
Applications
  • Consider a ball thrown into the air
  • It's height (in feet) given by h(t) 80t 16t
    2
  • Evaluate and interpret h(2)
  • Solve the equation h(t) 80
  • Interpret the solution
  • Illustrate solution on a graph of h(t)

13
Quadratic Regression
  • Our calculators will determine quadratic modeling
    functions
  • Enter numbers into Data Matrix
  • Choose F5, Calc
  • Then choose Quadratic Regression
  • Set x, y as before
  • Send results toY screen

14
WindSurfer Curve
15
Assignment
  • Lesson 3.1
  • Page 108
  • Exercises 1 35 Odd
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