MathDB

Vmo 2006 a4

Source:

February 28, 2006

functioncalculusderivativelimitalgebra unsolvedalgebra

Problem Statement

Given is the function

f(x)=-x+\sqrt{(x+a)(x+b)}

, where

a

b

are distinct given positive real numbers. Prove that for all real numbers

s\in (0,1)

there exist only one positive real number

\alpha

such that

f(\alpha)=\sqrt {\frac{a^s+b^s}{2}} .