# Find complex roots from a nonlinear equation

I need to find the roots from the equations as follows (Mathematica):

``````Sqrt[3]/2*x-(I-x*Sqrt[3]/2*c^2)*I/Sqrt[2*Pi]/d^3*Integrate[t*Exp[-t^2/2/d^2]/(Sqrt[3]/2*x+I*(t+b0)),{t,-Inf,Inf}]=0
``````

i.e. as the picture shows:

where c, d, and b0 is given parameters, x is a complex root needs to find. I have tried several methods, including scanning the real and imagine part of x and the iteration approach, but non of them could resolve all the cases.

Are there any general approaches that could solve such kind of equation efficiently, or by MATLAB/Mathematica?

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Maybe differentiate it and use odesolve? –  Jorge Oct 21 '12 at 2:48
Actually, command fsolve in MATLAB can solve some cases for b0 > 0, but failed at b0 < -1. –  Tony Oct 21 '12 at 6:15
You have syntax errors (i->I, pi->Pi); once you fix them the integral can be done analytically and you can use `FindRoot` to solve the equation. –  b.gatessucks Oct 21 '12 at 10:49
Thanks for the tips. However, does anyone know the general approaches besides the FindRoot or fsolve? –  Tony Oct 21 '12 at 13:39
Or just do it by hand –  arshajii Oct 21 '12 at 13:50
did you try Matlab's mupad? it is a powerful symbolic tool, very similar to Maple wich gives really good results in non-numerical mathematics. Try there. declare the equation, give assumptions to the software ,i.e `assume c real positive` (don't copy this, I dont remember the proper syntax) and then `solve`! It will very likely find a solution if it exits (sometimes in some mathematical cases that you even don't know!)