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Table of Contents Graphing Quadratic Functions Converting General Form To Standard Form The standard form and general form of quadratic functions are given.

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Presentation on theme: "Table of Contents Graphing Quadratic Functions Converting General Form To Standard Form The standard form and general form of quadratic functions are given."— Presentation transcript:

1 Table of Contents Graphing Quadratic Functions Converting General Form To Standard Form The standard form and general form of quadratic functions are given below. General Form Standard Form

2 Table of Contents One way to graph the general form of a quadratic function is to manipulate it into the standard form, and then simply graph the standard form, as in the previous module. It is assumed that you have already viewed the previous slide show titled Graphing Quadratic Functions – Standard Form The method used to do the conversion from general to standard form is completing the square.

3 Table of Contents Example 1: Convert the function from general form to standard form. Use the process of completing the square on the right hand side of the function. Note - since this is not an equation, but a function, the process is slightly different than the completing the square method used to solve quadratic equations.

4 Table of Contents Separate the quadratic and linear terms from the constant. Factor out the leading coefficient.

5 Table of Contents Complete the square. The next step is where things are different from completing the square in equations.

6 Table of Contents Add the 9 inside the parentheses. Notice the coefficient out in front of the parentheses. We have actually added 3 times 9, or 27 to the right hand side of the function. To balance this out, we must also subtract 27 from the right hand side.

7 Table of Contents Factor the trinomial inside the parentheses, and simplify outside. The original function that was in general form is now in standard form. This is the same function, but now in a different form.

8 Table of Contents Example 2: Convert the function from general form to standard form. Use the process of completing the square on the right hand side of the function.

9 Table of Contents Separate the quadratic and linear terms from the constant. Factor out the leading coefficient.

10 Table of Contents Complete the square.

11 Table of Contents Add the quantity inside the parenthesis We have actually added a times the quantity to the right side of the function.

12 Table of Contents The product is … To balance out the function, subtract this last amount from the right side.

13 Table of Contents Factor the trinomial inside the parentheses, and simplify outside.

14 Table of Contents The original function that was in general form is now in standard form.

15 Table of Contents An advantage of having the function in standard form is that the vertex is easily determined.

16 Table of Contents Important Fact Given the general form of a quadratic function … …the x-value of the vertex is given by

17 Table of Contents

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