What is the the vertex of #x = (y -3)^2 - 9 #?

1 Answer
Nov 25, 2015

The vertex coordinates are (3, -9).

Explanation:

Let us consider that the variables were inverted on purpose. That way, y is the horizontal axis and x is the vertical one.

First of all, solve the Mathematical Identitiy:
#(y-3)^2=(y-3)*(y-3)=y^2-3y-3y+9#
Then simplify the function:
#x=y^2-3y-3y-9+9=y^2-6y#

From this point on, there are many ways to find the vertex. I prefer the one that doesn't use formulas. Every quadratic formula takes the shape of a parabola, and every parabola has a symmetry axis. That means points that have the same height have the same distance from the center. Therefore, let's calculate the roots:

#y(y-6)=0#
#y'=0#
#y''->y-6=0#
#y''=6#

Find the point that is between the roots: #(0+6)/2=3#. Therefore, #yv=3#. Now, to find the x value corresponding, just solve the function for 3:
#x(3)=(3)^2-6*(3)=9-18=-9#.

Therefore, the axis is located at (3, -9).
graph{(x-3)^2-9 [-2, 8, -10, 10]}