Graphing Quadratic Functions using Transformational Form

1. The Transformational Form of the Quadratic Equations is: Graphing Quadratic Functions using Transformational Form

2. Graphing Quadratic Functions using Transformational Form The Transformational Form of this Quadratic Equations is: This also provides the following information: Vertex is (-2, 3) Vertical Stretch is 4 The parabola opens upwards and the Axis of Symmetry is

3. The Transformational Form of this Quadratic Equations is: Vertex is (-2, 3) Vertical Stretch is 4 a> 1, so the graph rises faster than it normally does and appears to be skinny! The parabola opens upwards and the axis of Symmetry is

4. Vertex is (-2, 3) Vertical Stretch is 4 Pattern from the vertex is now: Over 1, up 1X4 Over 2, up 4X4, etc

5. Now you try the following: Name the vertex, vertical stretch and then graph. 1. Vertex is (1, 2) VS is 2 2. Vertex is (-2, 5) VS is 3. Vertex is (5, -4) VS is -3 4. Vertex is (-4, -6) VS is

6. Using Mapping Rules to Graph Quadratics TRANSFORMATIONAL FORM Vertex is Axis of Symmetry is Horizontal Translation is Vertical Translation is Vertical Stretch is MAPPING RULE

7. Using the Mapping Rule to change the Table of Values Graphing Mapping Rule: y= x2 x y x-4 -2y+3 4 1 0 1 4 -2 -1 0 1 2 -6 -5 -4 -3 -2 15 13 11 9 7