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yz<=1/(4a)*y^2+a*z^2
(根号2)xy<=a*x^2+1/(2a)*y^2
so
(根号2)xy+yz<=a*x^2+1/(2a)*y^2+1/(4a)*y^2+a*z^2
=a*x^2+3/(4a)*y^2+a*z^2
令a=3/(4a)
即a=根号3/2
那么(根号2)xy+yz<=a*x^2+1/(2a)*y^2+1/(4a)*y^2+a*z^2
=a*x^2+3/(4a)*y^2+a*z^2=a=根号3/2
(根号2)xy<=a*x^2+1/(2a)*y^2
so
(根号2)xy+yz<=a*x^2+1/(2a)*y^2+1/(4a)*y^2+a*z^2
=a*x^2+3/(4a)*y^2+a*z^2
令a=3/(4a)
即a=根号3/2
那么(根号2)xy+yz<=a*x^2+1/(2a)*y^2+1/(4a)*y^2+a*z^2
=a*x^2+3/(4a)*y^2+a*z^2=a=根号3/2
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