I'm desperately trying to find the solution of this simple ODE: $\frac{dx}{dt}= C +\frac{x-a_1}{b_1} + \frac{x-a_2}{b_2} $
Where C is a constant. Someone has a clue?
Thanks for the feedback already: Ok some more info: I think I can solve this by substituting $x$ by $e^{t}$. In that case I get:
$ e^t = C+\frac{e^t-a_1}{b_1} + \frac{e^t-a_2}{b_2}$ But now I'm stuck. Does it mean x is just: $ x (1-1/b_1 -1/b_2)= (C-a_1/b_a -a_2/b_2) $ But then it is no longer depending on t... Iḿ doing something wrong here