Title: Graphs%20of%20Quadratic%20Function
1Graphs of Quadratic Function
- Introducing the concept Transformation of the
Graph of y x2
2Graph of f(x) ax2 and a(x-h)2
- Objective Graph a function f(x)a(x-h)2, and
determine its characteristics.
Definition A QUADRATIC FUNCTION is a function
that can be described as f(x) ax2 bc c
0.
Graphs of QUADRATIC FUNCTIONS are called
PARABOLAS.
3Now let us see the graphs of quadratic functions
4Graph of QUADRATIC FUNCTION
LINE , OR AXIS OF SYMMETRY
VERTEX
VERTEX
LINE , OR AXIS OF SYMMETRY
5- Thus the y-axis is the LINE SYMMETRY. The point
(0,0) where the graph crosses the line of
symmetry, is called VERTEX OF THE PARABOLA
- Next consider f(x) ax2, we know the following
about its graph. Compared with the graph of f(x)
x2. - If gt 1, the graph is stretched vertically.
- If lt 1, the graph is shrunk vertically.
- If a lt 0, the graph is reflected across the
x-axis.
6EXAMPLEa. Graph f(x) 3x2b. Line of Symmetry?
Vertex?
LINE OF SYMMETRY The y-axis
VERTEX (0,0)
7Exercisea. Graph f(x) -1/4 x2b. Line of
symmetry and Vertex?
- Your answer should be like this
LINE OF SYMMETRY Y-AXIS
VERTEX (0,0)
8In f(x) ax2, let us replace x by x h. if h is
positive, the graph will be translated to the
right. If h is negative the translation will be
to the left. The line, or axis of symmetry and
the vertex will also be translated the same way.
Thus f(x) a(x-h)2, the axis of symmetry is x
h and the vertex is (h, 0).
9Compare the Graph of f(x) 2(x3)2 to the graph
of f(x) 2x2.
LINE OF SYMMETRY, X -3
VERTEX (0,0), SYMMETRY, Y-AXIS
VERTEX (0,3)
10EXAMPLEa. Graph f(x) - 2(x-1)2b. Line of
Symmetry and Vertex?
VERTEX (h, 0) (1,0)
LINE OF SYMMETRY, X1
11EXERCISESa. Graph f(x) 3(x-2)2b. Line of
Symmetry and Vertex?
VERTEX (2,0)
LINE OF SYMMETRY, X2
12Graph of f(x) a(x-h)2k
- Objective Graph a function f(x) a(x-h)2 k,
and determine its characteristics.
In f(x) a(x-h)2, let us replace f(x) by f(x)
k f(x) k a(x-h)2 Adding k on both sides
gives f(x) a(x-h)2 k. The Graph will be
translated UPWARD if k is Positive and DOWNWARD
if k is NEGATIVE. The Vertex will be translated
the same way. The Line of Symmetry will NOT be
AFFECTED
13Guidelines for Graphing Quadratic Functions,
f(x)a(x-h)2 k
- When graphing quadratic function in the form
f(x)a(x-h)2k, - The line of symmetry is x-h0, or x h.
- The vertex is (h,k).
- If a gt 0, then (h,k) is the lowest point of the
graph, and k is the MINIMUM VALUE of the
function. - If a lt 0, then (h,k) is the highest point of the
graph, and k is the MAXIMUM VALUE of the
function.
14Examplea. Graph f(x) 2(x3)2 2b. Line of
Symmetry, Vertex?c. is there a min/max value? If
so, what is it?
LINE OF SYMMETRY, X-3
VERTEX ( -3,-2) MINIMUM -2
15Exercisesfor each of the following, graph the
function, find the vertex, find the line of
symmetry, and find the min/ max value.
- 1. f(x) 3(x-2)2 4
- 2. f(x) -3(x2)2 - 4
16Answer 1
VERTEX (2,4) MIN 4 LINE OF SYMMETRYX 2
17Answer 2
VERTEX (-2,-1) MAX -1 LINE OF SYMMETRYX -2
18ANALYZING f(x) a(x-h)2k
- Objective Determine the characteristics of a
function f(x) a(x-h)2k
19EXAMPLEWithout graphing, find the vertex,line of
symmetry, min/max value.Given1. f(x)
3(x-1/4)242. g(x) -4x5)27
a. What is the Vertex?
b. Line of Symmetry?
c. Is there a Min / Max Value?
d. What is the min / max value?
20Answer in 1 and 2
a. What is the Vertex? 1. (1/4, -2) 2. ( -5, 7)
b. Line of Symmetry? X ¼ X -5
c. Is there a Min / Max Value? Minimum. The graph extends upward since 3gt0 Maximum. The graph extends downward since 4lt0.
d. What is the min / max value? Min.Value is 2 Max.Value is 7