Question #35634

1 Answer
Fleur
Sep 3, 2017

#x=10#

Explanation:

I think you meant to write #y = 3(x-10)^2 - 9#.

The equation of this parabola is in vertex form: #y = a(x-h)^2 + k#, where #(h,k)# is the vertex. In this case, #(10, -9)# is the vertex.

The axis of symmetry of a parabola is the line that divides the parabola in two and runs through the vertex. The axis of symmetry is represented by the line #x=h#. So, the axis of symmetry here is #x=10#.

graph{y=3(x-10)^2 - 9 [-10, 30, -12, 12]}

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