The function g\left(x\right) has the same shape and size as f\left(x\right), but has been shifted to the left. Comparing the vertices of the two parabolas, we can see that this is a translation of 6 units to the left.

Remember that vertex form for a quadratic is g\left(x\right) = a\left(x - h\right)^2 + k, where the vertex is at the point \left(h, k\right).

f\left(x\right) = 2x^2 has been translated 6 units to the left to produce g\left(x\right), and we can see that its vertex is at \left(-6, 0\right). So g\left(x\right) has can be written as g\left(x\right) = 2\left(x + 6\right)^2.

A quadratic function in the form A\left(x\right) = a\left(x - h\right)^2 + k has a vertex at \left(h, k\right).

In this case the quadratic is A\left(x\right) = -\left(x - 3\right)^2 + 5, and so the vertex is at \left(3, 5\right).

The axis of symmetry of a parabola is the vertical line x = h, which passes through its vertex.

We found that the vertex is the point \left(3, 5\right), and therefore the axis of symmetry is the line x = 3.

The y-intercept of a function is the point on the function at which x = 0.

Substituting x = 0 into the function, we have y = A\left(0\right) = 5 - \left(0 - 3\right)^2

Evaluating this, we find that y = -4 and so the y-intercept is the point \left(0, -4\right).

We have found the vertex, axis of symmetry, and y-intercept of this parabola. We can use these features to help draw the graph.