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Anatomy of a Quadratic Function. Quadratic Form Any function that can be written in the form Ax 2 +Bx+C where a is not equal to zero. You have already.

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Presentation on theme: "Anatomy of a Quadratic Function. Quadratic Form Any function that can be written in the form Ax 2 +Bx+C where a is not equal to zero. You have already."— Presentation transcript:

1 Anatomy of a Quadratic Function

2 Quadratic Form Any function that can be written in the form Ax 2 +Bx+C where a is not equal to zero. You have already been looking at quadratics Anything with an x 2 term in the equation

3 Creating a quadratic Done by foiling Example (3x+2)(2x-4)

4 To be a quadratic… Must have an x 2 term Must have a constant number not equal to zero. Proper form: Ax 2 + Bx +C Practice identifying

5 Create the quadratic… Foil to get the quadratic, and label a, b, and c (2x-1)(3x+5)

6 Foil to get the quadratic, and label a, b, and c (2x-5)(x-2)

7 Quadratic Function How do I know it’s a function?

8 The parabola Graph of a quadratic function is a parabola It’s the “U” shape Upward opening parabola- the coefficient with the x 2 term is positive

9 Downward opening parabola- The coefficient with the x 2 term is negative

10 Axis of Symmetry Each parabola has an axis of symmetry Axis of symmetry- line that divides a parabola into two parts that are mirror images of one another DO IT

11 The parabola Vertex- lowest point or highest point on a graph

12 Max and Min Values If the parabola opens up, the min value is at the vertex If the parabola opens down, the max value is at the vertex

13 The axis of symmetry passes through the vertex of the parabola

14 Domain and Range Domain of a parabola is all real numbers

15 Range of a parabola Depends on where the parabola sits…

16 Solving Quadratic Functions

17 Square Roots x 2 =a where a is any number greater than or equal to 0 x is called the square root of a The solution, x has two values

18 Properties of Square Roots Positive square root is called the principal root Properties of square roots

19 Solve Solve just like a regular equation Follow order of operations, but leave square root till the end Simplify all other ways first

20 4x 2 +13=253

21 5x 2 -19=231

22 9(x-2) 2 =121

23 4(x+2) 2 =49

24 Warm Up! Complete this problem at the bottom of your sheet Solve 4x 2 +5=20

25 Solving using the Calculator Quadratic formulas can have more than one solution Because a square root of a number can give a positive and negative number They can also have no solutions, or just one

26 So how do I know if I am right? Use your calculator Solve so the entire equation is set equal to 0 Go to y= on your calculator Plug the equation into y1 Look for the x intercepts of the graph Use the Solve key to find values

27 Pythagorean Theorem a 2 + b 2 =c 2 Works only for right triangles What is a right triangle?

28 Homework: page286 #15, 18, 21, 24, 27, 30

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