Let's say I have complex equation
$ i \frac{dx}{dt} = i x+ (-2ig)^{1/2} $
$i$ is a complex number and $g$ is just some constant
How do I eliminate the $i$?
Let's say I have complex equation
$ i \frac{dx}{dt} = i x+ (-2ig)^{1/2} $
$i$ is a complex number and $g$ is just some constant
How do I eliminate the $i$?
Notice that $\sqrt{-2 i}=\pm(1-i)$. Hence the equation becomes $i \frac{dx}{dt} = i(x\pm \sqrt{g}) \pm \sqrt{g}$
and it becomes clear that there's no way of completely eliminating $i$ from the equation.