No, this isn't possible, basically because the specific energy is bounded below by the centrifugal barrier produced by the specific orbital angular momentum when it combines with the gravitational ...

I'm going to assume that the ellipse has the equation \frac{x^2}{a^2} + \frac{y^2}{b^2} = 1 since that's the more standard assumption. Yours has a and b reversed and I'm not sure if you meant ...

I would use the connection between matrix exponential and ODEs. Namely, for any vector v, the function x(t)=\exp(tA)v is the solution of the ODE x'(t) = Ax, \quad x(0)=v So you'd like to ...

That is a convention that for principal value in general we must use -\pi<\arg z<\pi for other values you can change the branch cut.

By Galois theory we know that there exists an automorphism \sigma with the property \sigma:\alpha_1\mapsto\alpha_2=\frac{\alpha^4+\alpha}2. From this we can deduce that \sigma(a^3)=\left(\frac{a+a^4}2\right)^3=\frac{a^{12}+3a^9+3a^6+a^3}8. ...

Note that \frac{2n^2}{n^3 +3} \lt \frac{2n^2}{n^3} =\frac{2}{n} . Therefore, if \frac{2}{n} \lt \epsilon then \frac{2n^2}{n^3 +3} \lt \epsilon . You don't have to get the best n - a ...