MathDB

h (x) = \lambda f_m (x) + (1- \lambda) g_m (x) if g_m (x) <=h (x)<= f_m (x)

Source: 2005 Moldova JBMO TST p8

February 20, 2021

inequalitiestrinomialquadraticsquadratic polynomialfunctionalgebra

Problem Statement

The families of second degree functions

f_m, g_m: R\to R,

are considered ,

f_m (x) = (m^2 + 1) x^2 + 3mx + m^2 - 1

g_m (x) = m^2x^2 + mx - 1

, where

m

is a real nonzero parameter. Show that, for any function

h

of the second degree with the property that

g_m (x) \le h (x) \le f_m (x)

for any real

x

, there exists

\lambda \in [0, 1]

which verifies the condition

h (x) = \lambda f_m (x) + (1- \lambda) g_m (x)

, whatever real

x

is.