Question

How do you find the vertex and axis of symmetry for a quadratic equation `y = x^2-5`?

Answer 1

The vertex is at (`0,-5`).
The axis of symmetry is `x = 0`.

Explanation:

The standard form for the equation of a parabola is

`y= a^2 + bx +c`

Your equation is

`y = x^2 - 5`

So

`a = 1`, `b = 0`, and `c = -5`.

Vertex

Since `a > 0`, the parabola opens upwards.

The `x`-coordinate of the vertex is at

`x = –b/(2a) = -0/(2×1) = -0/2 = 0`.

Insert this value of `x` back into the equation.

`y = x^2 - 5 = 0^2 - 5 = 0 - 5 = -5`

The vertex is at (`0,-5`).

Axis of symmetry

The axis of symmetry must pass through the vertex, so

The axis of symmetry is `x = 0`.