The function is given in vertex form so we know the vertex is at \left(2, -9\right). We can substitute x=0 to find the y-intercept at \left(0, -5\right). We can find other points on the curve by substituting in other values, and by filling a table of values.

It is important when drawing graphs to clearly show the key features such as the vertex and the intercepts by choosing appropriate scales for the axes.

The solutions to the equation can be found at the x-intercepts of the graph we just drew, as \left(x-2\right)^2-9=0 is an equivalent equation.

The solutions are x=-1 and x=5.

In this case, the equation has integer solutions, which makes solving graphically an effective method. In other cases the answer can be irrational and so solving graphically may only help determine an approximate solution.

In part (b), we noticed that \left(x-2\right)^2-9=0 has solutions which correspond to the x-intercepts of the graph drawn in part (a).

Consider that x-intercepts are the points on the graph where y=0.

The graph in part (a) is for y=\left(x-2\right)^2-9, so the solutions to \left(x-2\right)^2-9=4 will be the points where y=4.

We can see that the line y=4 intersects the parabola at two points, so we can predict that the equation \left(x-2\right)^2-9=4 will have two real solutions, one for each unique point of intersection.

Notice that the function y=\left(x-2\right)^2-9 has a range of y\geq -9.

Since y=4 is in the range, we can predict that \left(x-2\right)^2-9=4 will have real solutions.