Let a,b,c be real numbers. Is a,b,c≥0 the necessary and sufficient condition to show that a³+b³+c³≥3abc? If not, find the condition that is both sufficient and necessary.

I have just seen Sengupta's excellent solution.

However, it has one small problem.

a³+b³+c³- 3abc = (a+b+c) (a^2+b^2+c^2 –ab-bc-ca)   *

It is not true that "(a+b+c)> =0 whenever lhs of (*) is > = 0"
That is because (a^2+b^2+c^2 –ab-bc-ca) might be 0.

This can only happen if a = b = c.

Whenever a < 0 and a =b = c, it is still true that a³+b³+c³≥3abc, even though (a + b + c ) < = 0. 
For example, (a,b,c) = (-2, -2, -2)

SO, THE NECESSARY AND SUFFICIENT CONDITION IS
(a + b + c) >= 0  OR (a = b = c)

The problem would not need this minor modification if it was a strict inequality.

It is true that (a³+b³+c³ > 3abc) if and only if (a + b + c) > 0

Posted by Steve Herman on 2008-02-28 01:29:45