The solution of the following differential equation $$ -kx(t) = m \frac{d^{2}x}{dt^{2}}, $$ with $\omega = \sqrt{k/m}$, is $$ x(t) = C_{1}e^{-i\omega t} + C_{2}e^{i\omega t}.$$ The real part of this, $$ x(t) = x_0 e^{i(-\omega t + \phi)},$$ is the solution of my differential where $x_0$ is the am...