Algebra/Chapter 10/Fundamental Theorem

‘For every non-constant polynomial with complex coefficients, there exists at least one complex root.

Furthermore, its degree is also the amount of its roots (with multiplicity).

Proof

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Let there be a non-constant polynomial

 

Then we have  . Since the function   is continuous, there exists a   such that  .

Let us write  , for   and a polynomial   such that  .

Let   be the complex conjugate of  . Then for all   we get:

 

Let   for  :

 

Taking the limit as   yields:

 

Let   and  .

By plugging   into the inequality and by de Moivre's formula, we get:

 

hence   and so  .

Therefore, from   we get  .