OBJECTIVE 1 Graph quadratic equations of the form
Every equation of the formwith has a graph that is a parabola. The vertex is an important point to locate
when graphing a quadratic equation.aZ0,y=ax^2 +bx+c,1 a 02.yax^2 bxcSECTION 9.5 More on Graphing Quadratic Equations; Quadratic Functions 581y- 2
- 1
0
1
2
3
4- 3
- 4
5
0- 3
- 4
- 3
0
5
x3150(1, –4)
- 2 x
yx 1y x^2 – 2 x – 3
x-interceptx-intercepty-intercept
vertexFIGURE 3Graphing a Parabola by Finding the Vertex and Intercepts
Graph
We must find the vertex of the graph. Because of its symmetry, if a parabola has
two x-intercepts, the x-value of the vertex is exactly halfway between them.There-
fore, we begin by finding the x-intercepts. Let in the equation and solve for x.Interchange sides.
Factor.
or Zero-factor property
or Solve each equation.
There are two x-intercepts, and
Since the x-value of the vertex is halfway between the x-values of the two
x-intercepts, it is half their sum.x-value of the vertexFind the corresponding y-value by substituting 1 for xin.
y-value of the vertex
The vertex is The axis is the line
To find the y-intercept, substitute in the equation.The y-intercept is
Plot the three intercepts and the vertex. Find additional ordered pairs as needed.
For example, if thenleading to the ordered pair A table with all these ordered pairs is shown with
the graph in FIGURE 3.1 2, - 32.
y= 22 - 2122 - 3 = - 3 ,x=2,10 , - 32.
y= 02 - 2102 - 3 =- 3x= 011 , - 42. x=1.y= 12 - 2112 - 3 = - 4y=x^2 - 2 x- 3x=1
2
1 - 1 + 32 = 1
1 - 1, 0 2 1 3, 0 2.
x=- 1 x= 3x+ 1 = 0 x - 3 = 01 x+ 121 x- 32 = 0x^2 - 2 x- 3 = 00 =x^2 - 2 x- 3y= 0y=x^2 - 2 x-3.EXAMPLE 1NOW TRYNOW TRY
EXERCISE 1
Graph y=x^2 - x-2.
NOW TRY ANSWER
0 x
, –^1294 y–1–2 2
y = x^2 – x – 2