Let t_1=\arg(z_1/|z_1|) and t_2=\arg(z_2/|z_2|). If z_1,z_2 are in the same circle, with radius r and center in the origin then, f(t)=re^{it},\ t\in [0,2\pi], is a circular path with f(t_1)=z_1 ...

You should note that your homogeneous solution c_1+c_2e^{-4t} and your attempt at a particular solution y_p=At+B have a term in common, namely the constant. So you should multiply by t and ...

If you look at that matrix right, its determinant is obviously (b-\lambda)(\lambda^2-a^2), which should make it a breeze to find eigenvalues and eigenvectors.

You are missing a condition that guarantees that the W(r,s) function conserves probability: \frac{dP_i}{dt}=\sum_j{W_{ij} P_j} \frac{d}{dt}( \sum_i{ P_i}) = \sum_{ij}{W_{ij} P_j} = \sum_j{P_j (\sum_i{W_{ij}})} ...

Let's leave the amplifying medium out for the time being, and talk about the Fabry-Perot. For partially silvered mirrors, the field at the mirrors must be zero. (The details of a dielectric mirror ...

Hint for 2: If you group the elements of elements in pairs...