What is the axis of symmetry and vertex for the graph #y = x^2 − 4#?

1 Answer
Somebody N.
Sep 5, 2017

Axis of symmetry is #0#
Vertex is #-4#

Explanation:

#y = x^2 - 4 # is just # y = x^2# translated 4 units in the -y direction.

The axis of symmetry of #y = x^2# is 0 so there will be no change in the axis of symmetry when this is translated in the y direction.

When a quadratic equation is arranged in the form #a( x - h )^2 + k#

#a# is the coefficient of #x^2# , #h# is the axis of symmetry and #k# is the maximum or minimum value of the function( this is also the y coordinate of the vertex).

From example;

#y = x^2 -4# would be #( x - 0 )^2 - 4 #

See graph for translation:
enter image source here

Related questions
See all questions in Quadratic Functions and Their Graphs
Impact of this question
3969 views around the world
You can reuse this answer
Creative Commons License