ABSTRACT
Given the polynomial P(X)=aflx
+a,..1x 1 +a1x a0where n >4, there exist many methods of finding zeros of
the polynomial These methods include Direct Methods: Graphical synthetic
division, Homer's Graeffe's iterative t method: fixed point, scant bisection
Bisection, Newton Raphson and false position method. However, our main focus in
this study is restricted mainly on the iterative method of finding real roots
of polynomials; Newton — Raphson method, Bisection and the method of false
position were compared and it was discovered that Newton Raphson gave the best
approximation we also discussed the requisite properties for some of the
method.
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OKORO, A (2021). Zeros Of Polynomials . Mouau.afribary.org: Retrieved Nov 10, 2024, from https://repository.mouau.edu.ng/work/view/zeros-of-polynomials-7-2
A., OKORO. "Zeros Of Polynomials " Mouau.afribary.org. Mouau.afribary.org, 15 Jul. 2021, https://repository.mouau.edu.ng/work/view/zeros-of-polynomials-7-2. Accessed 10 Nov. 2024.
A., OKORO. "Zeros Of Polynomials ". Mouau.afribary.org, Mouau.afribary.org, 15 Jul. 2021. Web. 10 Nov. 2024. < https://repository.mouau.edu.ng/work/view/zeros-of-polynomials-7-2 >.
A., OKORO. "Zeros Of Polynomials " Mouau.afribary.org (2021). Accessed 10 Nov. 2024. https://repository.mouau.edu.ng/work/view/zeros-of-polynomials-7-2