Theorem of the real numerical value of a polynomial according to the derivatives of higher order
Abstract
In this paper, we will test the real numerical value of a polynomial
function of the form $y=f(x)$ of degree $n$; by the expression:
$f(x)=\frac{d^n y}{dx^n}$ such that, $x\in\mathbb{R}$ for all $x$
positive and negative. In the present work, the applications of
the real numerical value to simple measurements of the geometry are
studied, making use of the derivatives of higher order.\\
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References
Hernando L. Leal, differential calculus in a real variable,
Universidad Popular de Cesar-UPC, 2008.
J. Stewart, calculus of one variable. Transcendent early,
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Purcell, Edwin J.; Varberg, Dale; Rigdon, Steven E, c'{a}lculo.
Pearson Educaci'{o}n, M'{e}xico, 2007. Disponible en:
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