Simple inequality over positive reals – math.stackexchange.com

Simple inequality over positive reals – math.stackexchange.com

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Problem Let $x,y,z$ be real positive numbers with $xyz=1$. Prove: $$ 2(x+y+z) \geq 3xyz + xy+yz+zx$$ Note : I don't know whether the inequality is true or not. I couldn't find a prove in the place ...

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