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.

If c = 0, then the equation becomes
    a³+b³≥0 ?
In this case, it is necessary and sufficient that (a + b) > 0
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If b = c = 1, then the equation becomes
a³+2 ≥ 3a
A little graphing shows that it is necessary and sufficient that a > -2

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If b = 1, c = 2, then the equation becomes
a³+9 ≥ 6a
A little graphing shows that it is necessary and sufficient that a > -3

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If b = -1, c = -1, then the equation becomes
a³ - 2 ≥ 3a
A little graphing shows that it is necessary and sufficient that a > 2

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A suspicion is that is necessary and sufficient that
 (a+b+c) >= 0.

This seems possible.  Let a = -(b+c)
Then a³+b³+c^{3 =}
-(b+c)³+b³+c³=
-3b*c*b-3b*c*c =
3(-b-c)bc = 3abc

Posted by Steve Herman on 2008-02-27 23:45:35