Question

How to graph a parabola `y=(x-3)^2 +5`?

Answer 1

The equation `y = (x-3)^2+5` is in vertex form, so you can quickly deduce that the vertex is at `(3, 5)` and axis of symmetry is `x=3`

The parabola intercepts the `y` axis at `(0, 14)`.

Explanation:

Vertex form of the equation of a parabola with vertical axis is:

`y = a(x-x_0)^2 + y_0`, where `a != 0` is a constant and `(x_0, y_0)` is the vertex.

The axis of symmetry is `x=x0`.

The intercept with the `y` axis can be found by substituting `x=0` into the equation to get:

`y = a(0-x_0)^2 + y_0 = ax_0^2 + y_0`

In our case `a=1`, `x_0 = 3` and `y_0 = 5`

So the vertex is `(x_0, y_0) = (3, 5)`, the axis of symmetry is `x = x_0 = 3`.

The parabola is U-shaped since `a > 0`. graph{(x-3)^2+5 [-18.58, 21.42, -1.76, 18.24]}

The intercept with the `y` axis is where

`x=0` and

`y = ax_0^2+y_0 = 1*3^2+5 = 9+5 = 14`

that is `(0, 14)`.

The parabola does not intercept the `x` axis, since the minimum value of `y` is `5`.