作业帮(2014•达州二模)设函数f(x)=53sinxcosx+6cos2x+sin2x+32.
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(2014•达州二模)设函数f(x)=5
| 3 |
(Ⅰ)f(x)=5
3sinxcosx+6cos2x+sin2x+
3
2
=5
3sinxcosx+5cos2x+
5
2=
5
2
3sin2x+5•
1+cos2x
2+
5
2
=5sin(2x+
π
6)+5,
由
π
6≤x≤
π
2,得
π
2≤2x+
π
6≤
7π
6,
∴−
1
2≤sin(2x+
π
6)≤1
∴
π
6≤x≤
π
2时,函数f(x)的值域为[
5
2,10];
(Ⅱ)∵sinC=
3
5,f(A)=
15
2,
∴f(A)=5sin(2A+
π
6)+5=
15
2,即sin(2A+
π
6)=
1
2,
∵△ABC为锐角△ABC,∴A=
π
3
3sinxcosx+6cos2x+sin2x+
3
2
=5
3sinxcosx+5cos2x+
5
2=
5
2
3sin2x+5•
1+cos2x
2+
5
2
=5sin(2x+
π
6)+5,
由
π
6≤x≤
π
2,得
π
2≤2x+
π
6≤
7π
6,
∴−
1
2≤sin(2x+
π
6)≤1
∴
π
6≤x≤
π
2时,函数f(x)的值域为[
5
2,10];
(Ⅱ)∵sinC=
3
5,f(A)=
15
2,
∴f(A)=5sin(2A+
π
6)+5=
15
2,即sin(2A+
π
6)=
1
2,
∵△ABC为锐角△ABC,∴A=
π
3
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