Hyperbolas: Hyperbolas vs. Ellipse

Hyperbolas

Hyperbolas

Hyperbolas vs. Ellipse

Similarities between Hyperbolas and Ellipses:

The formula is identical, except for the replacement of a "+" with a "-".

The definition of a is very similar. In a horizontal ellipse, you move horizontally a units from the center to the edges of the ellipse (This defines the major axis). In a horizontal hyperbola, you move horizontally a units from the center to the vertices of the hyperbola (This defines the transverse axis). b defines a different, perpendicular axis.

The definition of c is identical: the distance from center to focus.

Differences between Hyperbolas and Ellipses:

The biggest difference is that for an ellipse, a is always the biggest of the three variables; for a hyperbola, c is always the biggest. This should be evident from looking at the drawings (the foci are inside an ellipse, outside a hyperbola). However, this difference leads to several other key distinctions.

For ellipses, c²= a²-b². For hyperbolas, c²=a²+b².

For ellipses, you tell whether it is horizontal or vertical by looking at which denominator is greater, since a must always be bigger than b. For hyperbolas, you tell whether it is horizontal or vertical by looking at which variable has a positive sign, the x² or the y². The relative sizes of a and b do not distinguish horizontal from vertical.