So we are given the following function: [tex]y=-(x + 2)^{2}[/tex].
Before we can solve this problem, we need to know the following:
- Given g (x) = f (x) + k; The graph of g(x) equals f(x) shifted k units vertically. If k > 0, the base graph shifts k units upward, and if k < 0, the base graph shifts k units downward.
- Given g(x) = f (x - k); The graph of g(x) equals f(x) shifted k units horizontally.
If k > 0, the base graph shifts k units to the right, and if k < 0, the base graph shifts k units to the left.
- The reflection of the point (x,y) across the x-axis is the point (x,-y).
- The reflection of the point (x,y) across the y-axis is the point (-x,y).
Know we can solve the problem!
1. [tex]y=-(x + 4)^{2}[/tex]. Translated left by 2 units.
2. [tex]y=-(x + 2)^{2} - 2 [/tex] Translated down by 2 units
3. [tex]y=(x - 2)^{2}[/tex] Reflected across the x-axis and the y-axis
4. [tex]y= 2-(x + 2)^{2}[/tex] Translated up by 2 units
5. [tex]y=-(x)^{2}[/tex] Translated right by 2 units
6. [tex]y=(x + 2)^{2}[/tex] y = (x + 2)2 Reflected across the x-axis
