Quadratic Functions Lesson 3.1
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
Finding Zeros Often with quadratic functions f(x) = a*x2 + bx + c we speak of “finding the zeros” This means we wish to find all possible values of x for which a*x2 + bx + c = 0
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?
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 ==> x = 4 or x + 2 = 0 ==> x = -2
Warning!! Problem ... many (most) quadratic functions are NOT easily factored!! Example:
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 -
Click to view Spreadsheet Solution The Quadratic Formula Try it for the quadratic functions 4x2 - 7x + 3 = 0 6x2 - 2x + 5 = 0 Click to view Spreadsheet Solution
The Quadratic Formula 4x2 - 7x + 3 = 0
The Quadratic Formula Why does the second function give "non-real result?“ 6x2 - 2x + 5 = 0
Concavity and Quadratic Functions Quadratic function graphs as a parabola Will be either concave up Or Concave Down
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)
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 to Y= screen
WindSurfer Curve
Assignment Lesson 3.1 Page 108 Exercises 1 – 35 Odd