Question

What is the parametric equation of an ellipse?

Answer 1

Here is one example...

Explanation:

You can have `(nsin(t),mcos(t))` when `n!=m`, and `n` and `m` do not equal to `1`.

This is essentially because:

`=>x=nsin(t)`

`=>x^2=n^2sin^2(t)`

`=>x^2/n^2=sin^2(t)`

`=>y=mcos(t)`

`=>y^2/m^2=cos^2(t)`

`=>x^2/n^2+y^2/m^2=sin^2(t)+cos^2(t)`

Using the fact that `sin^2(x)+cos^2(x)=1`...

`=>x^2/n^2+y^2/m^2=1`

This is essentially an ellipse!

Note that if you want a non-circle ellipse, you have to make sure that `n!=m`