In a hyperbola, the distances have a constant sum.

In a hyperbola, the distances have a constant difference.

In an ellipse, the distances have a constant product.

In an ellipse, the distances have a constant difference.

The hyperbola equation has a minus sign instead of a plus.

The hyperbola equation has a plus sign instead of a minus.

The hyperbola equation has a multiplication sign instead of a division.

The hyperbola equation has a division sign instead of a multiplication.

3

6

4

5

The transverse axis becomes vertical.

The transverse axis becomes horizontal.

The transverse axis remains unchanged.

The transverse axis disappears.

They are the lines that the branches of the hyperbola approach but never touch.

They are the lines that determine the length of the transverse axis.

They are the lines that the branches of the hyperbola intersect.

They are the lines that define the center of the hyperbola.

y = b * x and y = -b * x

y = a/b * x and y = -a/b * x

y = a * x and y = -a * x

y = b/a * x and y = -b/a * x

By rewriting as x / h and y / k.

By rewriting as x * h and y * k.

By rewriting as x - h and y - k.

By rewriting as x + h and y + k.