The Ellipse as a Stretched Circle
Let and be positive numbers. To each point in the plane we associate the point .
This association will stretch the first coordinate by and the second coordinate by .
The applet below explores the effect of this mixed dilation on the unit circle .
- Experiment with different values for and .
- Show the foci of the ellipse. Move point P along the ellipse.
Let be a point on the unit circle and let .
Then satisfies .
On the other hand, if satisfies the equation above, we can let
and .
This shows that is the image of under the mixed dilation .
Thus the image of the unit circle is the set of points
satisfying the equation of an ellipse .
Reference
Lang, Serge. (1988). Basic Mathematics. Springer-Verlag.