2001 IMO Shortlist Problems/A6
Problem
Prove that for all positive real numbers ,

Generalization
The leader of the Bulgarian team had come up with the following generalization to the inequality:

Solution
We will use the Jenson's inequality.
Now, normalize the inequality by assuming
Consider the function . Note that this function is convex and monotonically decreasing which implies that if
, then
.
Thus, we have
Thus, we only need to show that i.e.
Which is true since
The last part follows by the AM-GM inequality.
Equality holds if
Alternative Solution
By Carlson's Inequality, we can know that
Then,
On the other hand, and
Then,
Therefore,
Thus,
-- Haozhe Yang