If I have an ellipse expressed by: $ax^2 + 2cxy + by^2 = constant$
what does this expression equal to: $1/ \sqrt{ab - c^2}$ with respect to the ellipse ?
Thanks
matlabit
If I have an ellipse expressed by: $ax^2 + 2cxy + by^2 = constant$
what does this expression equal to: $1/ \sqrt{ab - c^2}$ with respect to the ellipse ?
Thanks
matlabit
[Note:] As David pointed out, I'm assuming the constant is $1$; if not, divide through by the constant.
This is the product of the two semi-axes, and thus except for a factor of $\pi$ it is the area of the ellipse.
Write the left-hand side as
$ \pmatrix{x&y}\pmatrix{a&c\\c&b}\pmatrix{x\\y}\;. $
We can diagonalize the matrix to bring this into the form
$ \pmatrix{x'&y'}\pmatrix{\lambda_1&0\\0&\lambda_2}\pmatrix{x'\\y'}\;, $
where $\lambda_1$ and $\lambda_2$ are the eigenvalues of the matrix and the inverse squares of the semi-axes. Their product is the determinant $ab-c^2$.
See also Wikipedia.
Why not divide the equation by ${\rm constant}$ to make it $a x^2+2 c x y + b y^2 = 1$ without any loss of generality.
Then for a rotated ellipse with major radius $r_1$ and minor radius $r_2$ and orientation angle $\theta$ the coefficients are
$ a = (\frac{1}{r_1^2}-\frac{1}{r_2^2}) \cos^2\theta+\frac{1}{r_2^2} $ $ b = (\frac{1}{r_2^2}-\frac{1}{r_1^2}) \cos^2\theta+\frac{1}{r_1^2} $ $ c = (\frac{1}{r_1^2}-\frac{1}{r_2^2}) \sin\theta \cos\theta $
and the said quantity
$ \boxed{ \frac{1}{\sqrt{a b-c^2}} = r_1 r_2 } $
which appears to be the area over $\pi$.
Note the equation of the ellipse is best expressed by the quadratic form of the conic section tensor $C$
$ \boldsymbol{x}^\top C \boldsymbol{x} = 0 $ $ \begin{pmatrix} x & y & 1 \end{pmatrix} \begin{pmatrix} a & c & 0\\c & b & 0\\0 & 0 & \text{-}1 \end{pmatrix} \begin{pmatrix} x\\y\\1 \end{pmatrix} = a x^2+2 c x y + b y^2 -1 = 0$
or in rotated coordinates $x'=x \cos\theta-y\sin\theta$, $y'=x \sin\theta+x\cos\theta$
$ \begin{pmatrix} x' & y' & 1 \end{pmatrix} \begin{pmatrix} \frac{1}{r_1^2} & 0 & 0\\0 & \frac{1}{r_2^2} & 0\\0 & 0 & \text{-}1 \end{pmatrix} \begin{pmatrix} x'\\y'\\1 \end{pmatrix} = \frac{x'^2}{r_1^2}+\frac{y'^2}{r_2^2}-1 = 0$