(a) Show that, if I⊂R is a closed bounded interval, and f:I→R is a non-constant monic polynomial function such that maxx∈I∣f(x)∣<2, then there exists a non-constant monic polynomial function g:I→R such that maxx∈I∣g(x)∣<1.
(b) Show that there exists a closed bounded interval I⊂R such that maxx∈I∣f(x)∣≥2 for every non-constant monic polynomial function f:I→R. functionintervalpolynomialmonicanalysisreal analysisalgebra