First, transform your equation: b^2x^2+a^2y^2=a^2b^2 a^2y^2=a^2b^2-b^2x^2 y^2=b^2-\frac{b^2}{a^2}x^2 xy^2=b^2x-\frac{b^2}{a^2}x^3 Next, differentiate and solve to find extrema: b^2-3\frac{b^2}{a^2}x^2=0 ...

Another way, f(x) = e^{3x}+\frac13 e^{-x}+\frac13 e^{-x}+\frac13 e^{-x} \ge \dfrac4{\sqrt[4]{27}} by AM-GM, with equality only when 3e^{4x}=1.

\begin{array}{ll} \text{minimize} & \rm x^T P_1^{-1} x\\ \text{subject to} & \rm x^T P_2^{-1} x = 1\end{array} where \rm P_1, P_2 are symmetric and positive definite. From the symmetry of \rm P_2 ...

You can reduce the problem in the beginning to: \text{optimize} \ xy(x+y-3) \ \text{subject to} \\ \ x^2+y^2+(x+y-3)^2=9. Hence: L(x,y,\lambda)=x^2y+xy^2-3xy+\lambda(9-x^2-y^2-(x+y-3)^2). FOC: ...

There is no difference, because D^{\alpha}(x(t)-x_0)=D^{\alpha}x(t)-D^{\alpha}x_0=D^{\alpha}x(t)

You seem to be assuming that because "1-n^2" doesn't look like 0, then it cannot be zero. That is a common, but often fatal, mistake. Remember that n stands for some integer. Once you get to A = \left(\begin{array}{cc} 1 & n\\ 0 & 1-n^2 \end{array}\right), ...