Lesson 1
1. Lesson 1
1.4. Discover
Module 3: Quadratic Functions
Discover
The vertex form of a quadratic function was introduced in Focus. In this Discover section you will investigate the effects of changing the values of a, q, and p in the equation y = a(x − p)2 + q.
Try This 1
Open Quadratic Function (Vertex Form).
Part A: Investigation of a
- Use the a-slider to explore how the value of a in y = ax2 changes the shape of the graph. Make sure the parameters p and q are set to 0. You may use a chart similar to the one shown to record your observations.
a y = ax2 Observations or Sketch 9 y = 9x2 2 y = 2x2 1 y = 1x2 0.5 y = 0.5x2 0.2 y = 0.2x2 −0.2 y = −0.2x2 −0.5 y = −0.5x2 −1 y = −1x2 −2 y = −2x2 −9 y = −9x2
- Use the q-slider to explore how the value of q in y = x2 + q changes the position of the graph. Make sure the parameter a is set to 1 and p is set to 0. You may use a chart similar to the one shown to record your observations.
q y = x2 + q Observations or Sketch 6 y = x2 + 6 3 y = x2 + 3 0.5 y = x2 + 0.5 0 y = x2 −0.5 y = x2 − 0.5 −3 y = x2 − 3 −6 y = x2 − 6
- Use the p-slider to explore how the value of p in y = (x − p)2 changes the position of the graph. Make sure the parameter a is set to 1 and q is set to 0. You may use a chart similar to the one shown to record your observations.
p y = (x − p)2 Observations or Sketch 6 y = (x − 6)2 3 y = (x − 3)2 0 y = x2 −3 y = (x + 3)2 −6 y = (x + 6)2
Save your responses in your course folder.