2.1 Identities and Inequalities 37CABo
o
O abc60
60Figure 12Example.LetP(x)be a polynomial whose coefficients lie in the interval[ 1 , 2 ], and let
Q(x)andR(x)be two nonconstant polynomials such thatP(x)=Q(x)R(x), withQ(x)
having the dominant coefficient equal to 1. Prove that|Q( 3 )|>1.Solution.LetP(x)=anxn+an− 1 xn−^1 +···+a 0. We claim that the zeros ofP(x)lie
in the union of the half-plane Rez≤0 and the disk|z|<2.
Indeed, suppose thatP(x)has a zerozsuch that Rez>0 and|z|≥2. From
P(z)=0, we deduce thatanzn+an− 1 zn−^1 =−an− 2 zn−^2 −an− 3 zn−^3 −···−a 0. Dividing
through byzn, which is not equal to 0, we obtainan+an− 1
z=−
an− 2
z^2−
an− 3
z^3−···−
a 0
zn.
Note that Rez>0 implies that Re^1 z>0. Hence1 ≤an≤Re(
an+an− 1
z)
=Re(
−
an− 2
z^2−
an− 3
z^3−···−
a 0
zn)
≤
∣∣
∣
∣−
an− 2
z^2−
an− 3
z^3−···−
a 0
zn∣∣
∣
∣≤
an− 2
|z|^2+
an− 3
|z|^3+···+
a 0
|z|n,
where for the last inequality we used the triangle inequality. Because theai’s are in the
interval[ 1 , 2 ], this is strictly less than2 |z|−^2 ( 1 +|z|−^1 +|z|−^2 +···)=
2 |z|−^2
1 −|z|−^1.
The last quantity must therefore be greater than 1. But this cannot happen if|z|≥2,
because the inequality reduces to(|^2 z|− 1 )(|^1 z|+ 1 )>0, impossible. This proves the
claim.
Returning to the problem,Q(x)=(x−z 1 )(x−z 2 )···(x−zk), wherez 1 ,z 2 ,...,zk
are some of the zeros ofP(x). Then
|Q( 3 )|=| 3 −z 1 |·| 3 −z 2 |···| 3 −zk|.