THE FUNDAMENTAL THEOREM OF ALGEBRA: SIGNIFICANCE AND APPLICATIONS

ABSTRACT

The Fundamental Theorem of Algebra (FTA) is a significant hypothesis in Algebra. This theorem attests that the unpredictable field is mathematically shut. That is if a polynomial of degree n has n-m genuine roots (0 < m < n), then the Fundamental Theorem attests that the polynomial has its outstanding m establishes in the mind-boggling plane. The present paper will incorporate historical research of pieces of evidence of the Fundamental Theorem of Algebra and give data about the principle confirmation given by Gauss of the Theorem and when it was demonstrated. The conclusion of the paper will clarify the likenesses of the three verifications Justas their disparities.

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