Since the parabola has its vertex at the origin [Vertex(0,0)], its equation becomes : y = ax², with y-axis as axis of symmetry.
Moreover, since this parabola opens down the coefficient a is negative:
So y = - ax². Let's calculate a:
Let A & B be the intersection of the parabola with the base & let's calculate their respective coordinates:
On the left we have A(-9, -96) & on the right B(+9, -96)
You plug any coordinates of A or B. Let's take B for instance: B(+9, -96)
-96 = a(9)² ↔ -96 = 81.a & a = -96/81 = -32/27.
Finally the equation is : y = (-32/27)x²
