Given a polynomial of real coefficients P(x) , can it be affirmed that for any real value of x is true of one of the following inequalities:
P(x)≤P(x)2;P(x)<1+P(x)2;P(x)≤21+21P(x)2.
Find a simple general procedure (among the many existing ones) that allows, provided we are given two polynomials P(x) and Q(x) , find another M(x) such that for every value of x, at the same time
−M(x)<P(x)<M(x) and −M(x)<Q(x)<M(x). polynomialalgebrainequalities