题目内容
已知向量
=(cos
,-1),
=(
sin
,cos2
),设函数f(x)=
•
+
.
(1)若x∈[0,
],f(x)=
,求cosx的值;
(2)在△ABC中,角A,B,C的对边分别是a,b,c,且满足2bcosA≤2c-
a,求f(B)的取值范围.
| m |
| x |
| 2 |
| n |
| 3 |
| x |
| 2 |
| x |
| 2 |
| m |
| n |
| 1 |
| 2 |
(1)若x∈[0,
| π |
| 2 |
| ||
| 3 |
(2)在△ABC中,角A,B,C的对边分别是a,b,c,且满足2bcosA≤2c-
| 3 |
(1)依题意得f(x)=
•
+
=
sin
cos
-cos2
+
=
sinx-
+
=sin(x-
),…(2分)
由 x∈[0,
],得:-
≤x-
≤
,sin(x-
)=
>0,
从而可得 cos(x-
)=
,…(4分)
则cosx=cos[(x-
)+
]=cos(x-
) sin
-sin(x-
) cos
=
-
. …(6分)
(2)在△ABC中,由2bcosA≤2c-
a 得 2sinBcosA≤2sin(A+B)-
sinA,即 2sinAcosB≥
sinA,
由于sinA>0,故有cosB≥
,从而 0<B≤
,…(10分)
故f(B)=sin(B-
),由于 0<B≤
,∴-
<B-
≤0,∴sin(B-
)∈(-
,0],即f(B)∈(-
,0]. …(12分)
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| x |
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| x |
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| x |
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| 1+cosx |
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| π |
| 6 |
由 x∈[0,
| π |
| 2 |
| π |
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| π |
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| π |
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| π |
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| 3 |
从而可得 cos(x-
| π |
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| 3 |
则cosx=cos[(x-
| π |
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| π |
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| π |
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| π |
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| π |
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| π |
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| 6 |
(2)在△ABC中,由2bcosA≤2c-
| 3 |
| 3 |
| 3 |
由于sinA>0,故有cosB≥
| ||
| 2 |
| π |
| 6 |
故f(B)=sin(B-
| π |
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| π |
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| π |
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| π |
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| π |
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