题目内容
已知正实数x,y,z满足2x(x+
+
)=yz,则(x+
)(x+
)的最小值为______.
| 1 |
| y |
| 1 |
| z |
| 1 |
| y |
| 1 |
| z |
∵x,y,z满足2x(x+
+
)=yz,
∴2x2+
+
=yz,
又∵(x+
)(x+
)=x2+
+
+
∴(x+
)(x+
)=
+
∵x,y,z为正实数,∴
+
≥2
=
即(x+
)(x+
)≥
,当且仅当
=
时等号成立
∴(x+
)(x+
)的最小值为
.
故答案为
| 1 |
| y |
| 1 |
| z |
∴2x2+
| 2x |
| y |
| 2x |
| z |
又∵(x+
| 1 |
| y |
| 1 |
| z |
| x |
| y |
| x |
| z |
| 1 |
| yz |
∴(x+
| 1 |
| y |
| 1 |
| z |
| yz |
| 2 |
| 1 |
| yz |
∵x,y,z为正实数,∴
| yz |
| 2 |
| 1 |
| yz |
|
| 2 |
即(x+
| 1 |
| y |
| 1 |
| z |
| 2 |
| yz |
| 2 |
| 1 |
| yz |
∴(x+
| 1 |
| y |
| 1 |
| z |
| 2 |
故答案为
| 2 |
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