Creating your digital product 1. Present your quadratic equation first. 2. You need the following information in your final product: a. Direction of Parabola Section: You need a statement that reads, "The parabola for this equation because opens b. Maximum/Minimum Section: Describe how you determine if the equation has a maximum or minimum value and what is the value. You must include a statement that reads something like, "The maximum value of this quadratic function is c. Axis of Symmetry Section: Include the formula for finding the AOS and the following statement: "The axis of symmetry is d. Vertex Section: Include the work you did in order to find the vertex, as well as a statement that reads, "The vertex is located at ( c. Y-intercept Section: Describe how to find the y-intercept for this equation and include a statement that reads, "The y-intercept for this equation is ( )." f. Roots/Zeros/x-intercepts Section: Find the roots of the function by factoring and by using the quadratic formula. Identify how many roots there are. For example, "The roots of this quadratic equation are(_______ and .)." It is possible to have a quadratic equation with only one root or zero real roots. g. Other Points Section: Show how you found four other points on your parabola. At least one of the points must be found by explaining the symmetry of the parabola. h. Graph: The graph of the parabola must have the vertex, roots, and y-intercept labeled. Your teacher will assist you in this task if you cannot figure out how to do this with a digital graphing utility. i. Real-Life Section: Find at least three examples of parabolas on the internet and include them in your final product.