Question

How do you graph the parabola `x = 1/3y^2 + 10` using vertex, intercepts and additional points?

Answer 1

The axis of symmetry is the x-axis

x-intercept is at `(x,y)=(10,0)`

Explanation:

This is a quadratic in `y` instead of in `x`

The `1/3y^2` term is positive so the graph is of general shape `sub`

Consider the general form of: `x=at^2+by+c`

`b=0` so the axis of symmetry is the x-axis

At `y=0; x=10` so the x-intercept is at `(x,y)=(10,0)`

There is no y-intercept as the shape is `sub` and `x_("intercept")=10`