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Linea 6: ==In factores resolutio polynomiorum== [[Polynomium]] omne potest in factoribus resolvi (super [[Corpus (mathematica)\|~~corporem~~corpus]] [[numerus complexus\|numerorum complexorum]]). In casu polynomii unius variabilis, pergimus in factores lineares; hoc est [[theorema fundamentale algebrae]]. Exempli gratia: <math> x^3 + 4x^2 - 52x + 80 = (x + 10) \cdot (x - 2) \cdot (x - 4) </math>

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