How do you identify the following equation xy=4 as that of a line, a circle, an ellipse, a parabola, or a hyperbola.?

1 Answer
Jul 1, 2016

It is a hyperbola.

Explanation:

The general second degree equation can be written as
Ax2+Bxy+Cy2+Dx+Ey+F=0

To identify the graph by inspection of equation complete any squares if necessary so that the variables are on one side and the constant is on the right hand side of the equation. Check against the following:

  1. Line
    Squared term of neither variable is present.
  2. Circle
    Squared terms of both variables are present, both are positive and both have the same coefficient. The right hand side is positive.
  3. Ellipse
    Squared terms of both variables are present, both are positive and both have different coefficients. The right hand side is positive.
  4. Parabola
    Both variables are present but only one is squared.
  5. Hyperbola
    Squared terms of both variables are present, but one is positive and the other is negative. The coefficients may or may not be the same. The right hand side is not zero.

For 3, 4, and 5.
The general equation reduces to Ax2+Bxy+Cy2=1
which is a hyperbola if B2>4AC and an ellipse if B2<4AC.
A parabola has B2=4AC.
For the given equation xy=4, we observe that B2>4AC. Hence it is a hyperbola.

graph{xy=4 [-10, 10, -5, 5]}