Question

How do you identify if the equation `y^2-6y=x^2-8` is a parabola, circle, ellipse, or hyperbola and how do you graph it?

Answer 1

Write the equation in the General Cartesian form for a conic section, `Ax^2+Bxy+Cy^2+Dx+Ey+F =0`:

Compute the discriminant, `Delta = B^2-4AC`

Explanation:

Write the in the General Cartesian form:

`x^2-y^2+6y-8 = 0`

Compute the discriminant:

`Delta = 0^2-4(1)(-1)`

`Delta = 4`

If `Delta < 0` then the conic section is an ellipse. The special case where the ellipse is a circle is identified by `A = C` and `B=0`.

If `Delta = 0` then the conic section is a parabola

If `Delta > 0` then the conic section is a hyperbola.

Here is the graph:

`graph{x^2-y^2+6y-8 = 0 [-9.87, 10.13, -2.44, 7.56]}`