(1)
依Cauchy不等式得
1/x+1/y+1/z
=1²/x+1²/y+1²/z
≥(1+1+1)²/(x+y+z)
=9/3
=3.
故x=y=z=1时,
所求最小值为3.
(2)
x²+y²+z²
=x²/1+y²/1+z²/1
≥(x+y+z)²/(1+1+1)
=9/3
=3,
x²+y²+z²
=(x+y+z)²-2(xy+yz+zx)
<(x+y+z)²
=9,
∴3≤x²+y²+z²<9。
1x+1y+1z=1
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