example: y=x 2 +2x-3 a=1b= +2 c= -3 step 1. find and graph the axis of symmetry x=-(b/2a)...
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![Page 1: Example: y=x 2 +2x-3 a=1b= +2 c= -3 Step 1. Find and graph the axis of symmetry x=-(b/2a) x=-(2/2(1)) x=-1 The axis of symmetry is the x-value of the](https://reader035.vdocuments.us/reader035/viewer/2022070418/5697c0221a28abf838cd3a53/html5/thumbnails/1.jpg)
![Page 2: Example: y=x 2 +2x-3 a=1b= +2 c= -3 Step 1. Find and graph the axis of symmetry x=-(b/2a) x=-(2/2(1)) x=-1 The axis of symmetry is the x-value of the](https://reader035.vdocuments.us/reader035/viewer/2022070418/5697c0221a28abf838cd3a53/html5/thumbnails/2.jpg)
Example: y=x2 +2x-3
a=1 b= +2 c= -3
Step 1. Find and graph the axis of symmetry x=-(b/2a) x=-(2/2(1)) x=-1
The axis of symmetry is the x-value of the ordered pair of the vertex and is expressed
as the vertical line x=___
(-1,-4)
x=(-1)
Steps to graph a function of the form
y=ax2 +bx+c
Step 2. Find and graph the vertex
The x-coordinate is –(b/2a); x=(-1) The y-coordinate is found by substi- tuting the value for x back into the original quadratic and solving for y.
y=(-1)2 +2(-1)-3; y= (-4) vertex = (-1, -4)
(0,-3)(-2,-3)
Step 3. Find and graph the y-intercept and its reflectionSince c is the y-intercept, the points are (0,-3) and the reflection is equidistant from the axis of symmetry (-2,-3)
![Page 3: Example: y=x 2 +2x-3 a=1b= +2 c= -3 Step 1. Find and graph the axis of symmetry x=-(b/2a) x=-(2/2(1)) x=-1 The axis of symmetry is the x-value of the](https://reader035.vdocuments.us/reader035/viewer/2022070418/5697c0221a28abf838cd3a53/html5/thumbnails/3.jpg)
Step 4. Evaluate the function for another value of x, such as y=12 +2(1)-3=0. Graph (1,0) and its reflection ( -3, 0)
Step 5. Graph all of the points and construct the parabola.
(-1,-4)
(0,-3)(-2,-3)
x=(-1)