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问题 填空题
若不等式
x
+
y
≤k
2x+y
对于任意正实数x、y成立,则k的取值范围为 ______.
答案

显然k>0,故k2

x+y+2
xy
2x+y

令t=

x
y
>0,则k2
y(t2+2t+1)
y(2t2+1)
=
1
2
(1+
4t+1
2t2+1
)

令u=4t+1>1,则t=

u-1
4

4t+1
2t2+1
可转化为:s(u)=
8u
u2-2u+9
=
8
u+
9
u
-2
≤2

于是,

1
2
(1+
4t+1
2t2+1
)
1
2
(1+2)=
3
2

∴k2

3
2
,即k≥
6
2
时,不等式恒成立(当x=4y>0时等号成立).

故答案为:[

6
2
,+∞)

填空题

单词填空

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4. ______(不管多么) difficult it was he'd try to help us.

5. Do you know the ______(发言者) at the meeting?

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