Using technology, graph each of the given functions and hence answer the following questions:
Does this parabola have a maximum or a minimum value?
Find the minimum/maximum y-value on the graph.
Describe where the axis of symmetry lies.
Using technology, graph each of the given functions and hence answer the following questions:
Does this parabola have a maximum or a minimum value?
Find the minimum/maximum y-value on the graph.
Describe where the axis of symmetry lies.
Use technology to graph y = x^{2} on the same axes. Describe the similarities and differences between this graph and that of the given function in terms of the axis of symmetry and minimum/maximum values.
Using technology, graph y = - x^{2} + 3 and hence answer the following questions:
Does this parabola have a maximum or a minimum value?
Find the minimum/maximum y-value on the graph.
Describe where the axis of symmetry lies.
Use technology to graph y = - x^{2} on the same axes. Describe the similarities and differences between this graph and that of y = - x^{2} + 3 in terms of the axis of symmetry and minimum/maximum values.
Consider the quadratic equations y = \dfrac{1}{2} x^{2} + 2 and y = \dfrac{1}{2} x^{2} - 2.
Using technology, graph the two parabolas on the same set of axes and hence answer the following questions:
Do these parabolas both have a minimum value or a maximum value?
Compare the two values of your answer in part (a). Which quadratic equation has the lower value?
Which parabola crosses the x-axis twice?
Find the x-values of the points where the parabola crosses the x-axis.
Consider the quadratic equations y = x^{2}, y = x^{2} - 4 x and y = x^{2} - 8 x.
Using technology, graph the three parabolas on the same set of axes and hence answer the following questions:
Determine whether the following statements are true or false:
The parabolas all cross the y-axis at different points.
The parabolas all cross the x-axis twice.
The parabolas all cross the y-axis at the same point.
None of the parabolas cross the x-axis.
Compare the axis of symmetry of each parabola. Are they the same or different?
Using technology, graph the given pairs of functions on the same set of axes and hence answer the following questions:
Compare the x-intercepts of the two graphs.
Do the parabolas both have maximum values, minimum values, or one of each?
State the minimum/maximum y-value of the parabolas.
Compare the axis of symmetry of the parabolas. Are they the same or different?