So I managed to locate my math notebook and I figured I would just transcribe it, and since I’ve described the solution in Math Problems already, I’ll give it directly.
If a part of an equation becomes such as x^x=c; where c is a non-zero, complex number, you can determine x with a manipulation to the form x = c^(1/x), x can then be solved by reforming this equation into a method such as :c^(1/x0)=x1, c^(1/x1)=x2, c^(1/x2)=x3…c^(1/(xInfinity-1))=xInfinity
It is determined that, lim n->Infinity c^(1/xn), which can be manipulated to the form c=xn^xn and c=x^x where x=xn. This method works as long as the initial x value, x0 is any non-zero, complex number.
For Example. If x^x=9 => 9^(1/x)=x => 9^(1/x0)=x1, where 2 is assigned x0. 9^(1/2) = 3, 9^(1/3) = 2.08008, lim n->Infinity 9^(1/xn) = 2.450953928 where 2.45…28^2.45…28=9
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