题目内容
3.已知函数$f(α)=2sin(α-\frac{π}{6})$.(1)当$f(α)=1,(0<α<\frac{π}{2})$时,求α的值;
(2)当$f(α)=\frac{6}{5},(0<α<\frac{π}{2})$时,求$f(2α+\frac{π}{12})$的值.
分析 (1)由f(α)=1得sin($α-\frac{π}{6}$)=$\frac{1}{2}$,根据α的范围判断α-$\frac{π}{6}$的范围,得出α-$\frac{π}{6}$的值;
(2)由f(α)的值得出sin(α-$\frac{π}{6}$)的值,根据α-$\frac{π}{6}$的范围求出cos(α-$\frac{π}{6}$),使用二倍角公式求出sin(2$α-\frac{π}{3}$)的值,在利用和角公式的正弦三角公式得出f(2$α+\frac{π}{12}$).
解答 解:(1)∵f(α)=2sin($α-\frac{π}{6}$)=1,∴sin($α-\frac{π}{6}$)=$\frac{1}{2}$,∵0$<α<\frac{π}{2}$,∴-$\frac{π}{6}$<α-$\frac{π}{6}$<$\frac{π}{3}$,∴$α-\frac{π}{6}$=$\frac{π}{6}$,∴α=$\frac{π}{3}$.
(2)由$f(α)=\frac{6}{5}$,得$sin(α-\frac{π}{6})=\frac{3}{5}$.∵$0<α<\frac{π}{2}$,∴$cos(α-\frac{π}{6})=\frac{4}{5}$.
∴$sin(2α-\frac{π}{3})=2sin(α-\frac{π}{6})cos(α-\frac{π}{6})=\frac{24}{25}$.$cos(2α-\frac{π}{3})={cos^2}(α-\frac{π}{6})-{sin^2}(α-\frac{π}{6})=\frac{7}{25}$.
∴$f(2α+\frac{π}{12})=2sin(2α-\frac{π}{12})=2sin(2α-\frac{π}{3}+\frac{π}{4})$=$2sin(2α-\frac{π}{3})cos\frac{π}{4}+2cos(2α-\frac{π}{3})sin\frac{π}{4}=\frac{{31\sqrt{2}}}{25}$.
点评 本题考查了三角函数的恒等变换和求值,熟练掌握三角公式,发现角的关系是解题关键.
| A. | $f(ln\frac{3}{2})sin(ln\frac{3}{2})$一定小于$0.6f(ln\frac{5}{2})sin(ln\frac{5}{2})$ | |
| B. | $f(ln\frac{3}{2})sin(ln\frac{3}{2})$一定大于$0.6f(ln\frac{5}{2})sin(ln\frac{5}{2})$ | |
| C. | $f(ln\frac{3}{2})sin(ln\frac{3}{2})$可能大于$0.6f(ln\frac{5}{2})sin(ln\frac{5}{2})$ | |
| D. | $f(ln\frac{3}{2})sin(ln\frac{3}{2})$可能等于$0.6f(ln\frac{5}{2})sin(ln\frac{5}{2})$ |