Post on 16-Nov-2014
transcript
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Algebra 2: Section 5.1
Graphing Quadratic
Functions
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Definitions
Quadratic function
– Standard form
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( 0)
y ax bx c
a
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Parabola
–Graph of a quadratic function
–Looks like a “U”
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Definitions
Vertex
–Lowest or highest point of a
parabola
Axis of symmetry
–Vertical line that passes through the
vertex of a parabolic function
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Axis of
Symmetry
Vertex
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Vertex Form of Quadratic
Vertex Form Vertex:
(h, k)
Axis of
Symmetry:
x = h
2( )y a x h k
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Vertex Form of Quadratic
Vertex Form Direction:
– If a > 0, opens up
– If a < 0, opens down
Size:
– If a is a fraction between -1 and 1Wider
– If a is bigger than 1 or smaller than -1Narrower
2( )y a x h k
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Examples
Graph the quadratic function. Label the
vertex and axis of symmetry.
– Vertex: (-1, -4)
– Axis of Symmetry: x = -1
– Direction: Opens Up
– Size: Narrower
21. 2( 1) 4y x
2; 1; 4a h k
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Vertex: (-1, -4) Axis of Symmetry: x = -1
Direction: Opens Up Size: Narrower
21. 2( 1) 4y x
Graphing with Standard Form
Graph the quadratic function. Label the
vertex and axis of symm.
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22. 6 16y x x
29 ( 3) 16y x
2( 3) 7y x
2____ ( 6 ____) 16y x x 99
29 ( 6 9) 16y x x
6b 2
263 9
2c
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2( 3) 7y x
Vertex: ( 3,7)
Opens up
Standard Size
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Examples
23. 2 12 14y x x
218 2( 3) 14y x
22( 3) 4y x
2____ 2( 6 ____) 14y x x 918
218 2( 6 9) 14y x x
6b 2
26( 3) 9
2c
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Vertex: (3, 4)
Opens up
Narrower
22( 3) 4y x
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Using TI-83/84 to graph parabolas
Press Y=
enter equation into Y1
Hit Graph
Adjust window as
necessary
(use Zoom or Window)
Example: (3 7)( 1)y x x
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Using TI-83/84 to graph parabolas
To find vertex– Be sure you can view
the vertex in your current window
– Go to the CALC menu(press 2nd – TRACE)
– Choose MAX or Min
– Place cursor to left of vertex
– press ENTER
– Place cursor to right of vertex
– press ENTER
– Place cursor close to vertex
– press ENTER
Example: (3 7)( 1)y x x
Assignment
p.253
#20-37 all
(18 problems)
Math Journal
Sports
p.254 #52
(explain how you found these values)
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