题目内容
已知函数f(x)=| 3 |
(I)求f(x)的最小正周期及单调递减区间;
(II)在△ABC中,a,b,c分别是角A,B,C的对边,若f(A)=2,b=1,△ABC的面积为
| ||
| 2 |
分析:(I) 利用两角和正弦公式化简f(x)=sin(2x+
)+3,最小正周期 T=
=π,令2kπ+
≤2x+
≤2kπ+
,k∈z,解出x的范围,即得单调递减区间.
(II)由f(A)=2 求出sin(2A+
)=
,由
<2A+
<
,求得A 值,余弦定理求得 a 值.
| π |
| 6 |
| 2π |
| 2 |
| π |
| 2 |
| π |
| 6 |
| 3π |
| 2 |
(II)由f(A)=2 求出sin(2A+
| π |
| 6 |
| 1 |
| 2 |
| π |
| 6 |
| π |
| 6 |
| 13π |
| 6 |
解答:解:(I) 函数f(x)=
sinxcosx+cos2x+1=
sin2x +
cos2x +
=sin(2x+
)+
.
故最小正周期 T=
=π,令 2kπ+
≤2x+
≤2kπ+
,k∈z,解得
kπ+
≤x≤kπ+
,故函数的减区间为[kπ+
,kπ+
],k∈z.
(II)由f(A)=2,可得 sin(2A+
)+
=2,∴sin(2A+
)=
,
又 0<A<π,∴
<2A+
<
,∴2A+
=
,A=
.
∵b=1,△ABC的面积为
=
bcsinA,∴c=2.
又 a2=b2+c2-2bc•cosA=3,∴a=
.
| 3 |
| ||
| 2 |
| 1 |
| 2 |
| 3 |
| 2 |
| π |
| 6 |
| 3 |
| 2 |
故最小正周期 T=
| 2π |
| 2 |
| π |
| 2 |
| π |
| 6 |
| 3π |
| 2 |
kπ+
| π |
| 6 |
| 2π |
| 3 |
| π |
| 6 |
| 2π |
| 3 |
(II)由f(A)=2,可得 sin(2A+
| π |
| 6 |
| 3 |
| 2 |
| π |
| 6 |
| 1 |
| 2 |
又 0<A<π,∴
| π |
| 6 |
| π |
| 6 |
| 13π |
| 6 |
| π |
| 6 |
| 5π |
| 6 |
| π |
| 3 |
∵b=1,△ABC的面积为
| ||
| 2 |
| 1 |
| 2 |
又 a2=b2+c2-2bc•cosA=3,∴a=
| 3 |
点评:本题考查两角和正弦公式,正弦函数的单调性,奇偶性,根据三角函数的值求角,求出角A的值是解题的难点.
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