Post on 12-Jan-2016
Parabola Unit IntroAlgebra I
Chapter 9
Introduction
Quadratic Functions Non-linear y = ax2 + bx + c Physics Scenarios
Graphs Symmetrical Real-life applications
Topics of Discussion
What parabolas look like Architecture Sports Natural Engineering
Algebraic investigation Graphs Vocabulary
Parabolas in Architecture
Parabolas can be found in architecture They are added for decorative purposes They can also play a part in the support
system for buildings
Here are some examples
This one you know
Chicago PicassoDowntown Chicago
National Theatre Beijing, China
Athens Olympic StadiumAthens, Greece
Qwest FieldSeattle, Washington
Qwest Field, another view.
Sculpture HouseEvergreen, Colorado
Gateway ArchSt. Louis, Missouri
Tenerife Concert HallCanary Islands, Spain
Parabolas in Sports
Objects that are thrown in air naturally follow a parabolic curve
Here are some examples
Falling Ping Pong Ball
Ping Pong ball rolling down a tube
Basketball Free Throw
A Golf Shot
Another Golf Shot
Hammer Throw
Motorcycle Racing
Roller coasters
Parabolas in Nature
Parabolas occur naturally in the world
Here are some examples
Lamp Light bulbs
Rock Formations
Spinning Beaker
Rotates, and water reacts
More Water
Iceberg Arch
Another one
Rock Arch
Snow Thrower
Engineering
Parabolas are used in structures for support
They are found a lot in bridges
Here are a few examples
Bridges…..
Golden Gate BridgeSan Francisco, California
Mackinac BridgeMackinac, Michigan
Ferrari 550 Maranello
Car Headlights
Satellite Dishes….
Satellite Engineering
Algebraic Side of Parabolas
All parabolas are symmetrical around its axis of symmetry
Each parabola has either a maximum point or a minimum point called the vertex
Vertex and Axis of Symmetry
All parabolas can be reflected over its axis of symmetry
The axis of symmetry always passes through the vertex
Remember the spinning blue beaker?
Maximum and Minimums
Maximum or Minimum Left side - leading coefficient is positive Right side - leading coefficient is negative
The max or min always occurs at the vertex We find the vertex by -b/2a where y=ax2+bx+c
Graph of a parabola
Next Steps
We will find the vertex and axis of symmetry of parabolas
We will determine if the parabola opens up or down based on its equation
We will find the roots or zeros of a quadratic equation
Zeros - Where the graph crosses the x-axis