1 / 17

Graphing Quadratic Functions – Standard Form

Graphing Quadratic Functions – Standard Form. It is assumed that you have already viewed the previous slide show titled Graphing Quadratic Functions – Concept. A quadratic function in what we will call Standard Form is given by:.

lorant
Download Presentation

Graphing Quadratic Functions – Standard Form

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Graphing Quadratic Functions – Standard Form • It is assumed that you have already viewed the previous slide show titled • Graphing Quadratic Functions – Concept. • A quadratic function in what we will call Standard Form is given by: • The summary of the Concept slide show is given again on the next page.

  2. SUMMARY Vertex Face Up Face Down Axis of symmetry Narrow Wide

  3. Narrow • One more thing is needed before sketching the graph of a quadratic function. A point is plotted to know just how narrow or how wide the graph is. • When the graph is narrow, choose an x-value that is only one unit from the vertex. • In the graph on the right, a good choice would be • x = 1

  4. If the value x = 2 were chosen, then the corresponding y-value would be off the graph.

  5. Wide • When the graph is wide, choose an x-value that is more than one unit from the vertex. • In the graph on the right, a good choice would be • x = 2 or x= 3 • Note that x = 1 would not be very helpful in determining just how wide the graph would be.

  6. Wide Narrow SUMMARY Choose a value for x1 unit away from the vertex. Choose a value for xmore than 1 unit away from the vertex

  7. Example 1: Sketch the graph of the following function:

  8. Plot the vertex: • Draw the axis of symmetry:

  9. Since the graph is narrow, find a point that is only 1 unit from the vertex. • Try x = 3.

  10. Draw the right branch of the parabola using the vertex and the point (3,4). • Now use symmetry to draw the left branch. • Label the axis and important points.

  11. Face Down Vertex: Axis: Wide • Example 2: Sketch the graph of the following function:

  12. Plot the vertex: • Draw the axis of symmetry:

  13. Since the graph is wide, find a point that is more than 1 unit from the vertex (-1,-2). • This problem presents another challenge, which is to avoid fractions if possible.

  14. Therefore, we want to meet two goals: • Select an x-value more than one unit to the right of the vertex (-1,-2). • Avoid fractions. • To meet goal #2, all that is needed is for the quantity that is squared to be divisible by 5. • An x-value of 4 meets this condition, and also satisfies goal #1.

  15. Draw the right branch of the parabola using the vertex and the point (4,-7). • Now use symmetry to draw the left branch. • Label the axis and important points.

  16. END OF PRESENTATION

More Related