For a function in the form $f(x)=(x-h)^2+k$, what point $(h,k)$ does this form give you on the graph?

In $f(x)=(x-2)^2-3$, think about what $h$ and $k$ must be in $(x-h)^2+k$. Pay close attention to the minus sign inside the parentheses and the minus sign on the constant term.

Type y = (x - 2)^2 - 3 into Desmos to graph the quadratic.

Zoom or pan if needed, then move your cursor along the parabola; Desmos will highlight the minimum point (the vertex) and show its coordinates. Those coordinates are the answer.

A quadratic written as $f(x)=(x-h)^2+k$ is in vertex form. For any quadratic in this form, the vertex of its graph is the point $(h,k)$.

The given function is

Compare this to $f(x)=(x-h)^2+k$:

• Inside the parentheses you have $(x-2)$, which matches $(x-h)$, so $h=2$.
• Outside, you have $-3$ added, which matches $k$, so $k=-3$.

Since the vertex of $f(x)=(x-h)^2+k$ is $(h,k)$ and here $h=2$ and $k=-3$, the vertex of the graph of $f$ is $(2,-3)$.