2.2 Polynomials 452.1.7 Other Inequalities........................................
We conclude with a section for the inequalities aficionado. Behind each problem hides a
famous inequality.139.Ifxandyare positive real numbers, show thatxy+yx>1.
140.Prove that for alla, b, c≥0,(a^5 −a^2 + 3 )(b^5 −b^2 + 3 )(c^5 −c^2 + 3 )≥(a+b+c)^3.141.Assume that all the zeros of the polynomialP(x)=xn+a 1 xn−^1 +···+anare real
and positive. Show that if there exist 1≤m<p≤nsuch thatam=(− 1 )m(n
m)
andap=(− 1 )p(n
p)
, thenP(x)=(x− 1 )n.
142.Letn>2 be an integer, and letx 1 ,x 2 ,...,xnbe positive numbers with the sum
equal to 1. Prove that∏ni= 1(
1 +
1
xi)
≥
∏ni= 1(
n−xi
1 −xi)
.
143.Leta 1 ,a 2 ,...,an,b 1 ,b 2 ,...,bnbe real numbers such that(a^21 +a 22 +···+a^2 n− 1 )(b^21 +b 22 +···+b^2 n− 1 )
>(a 1 b 1 +a 2 b 2 +···+anbn− 1 )^2.Prove thata^21 +a 22 +···+a^2 n>1 and b^21 +b^22 +···+bn^2 > 1.
144.Leta, b, c, dbe positive numbers such thatabc=1. Prove that
1
a^3 (b+c)+
1
b^3 (c+a)+
1
c^3 (a+b)≥
3
2
.
2.2 Polynomials
2.2.1 A Warmup
A polynomial is a sum of the form
P(x)=anxn+an− 1 xn−^1 +···+a 0 ,wherexis the variable, andan,an− 1 ,...,a 0 are constant coefficients. Ifan =0, the
numbernis called the degree, denoted by deg(P (x)).Ifan =1, the polynomial is
called monic. The sets, which, in fact, are rings, of polynomials with integer, rational,