11.已知cos($\frac{π}{4}$+α)=$\frac{3}{5}$����,$\frac{17π}{12}$<α<$\frac{7}{4}$π��,求$\frac{sin2α(1+tanα)}{1-tanα}$的值.
分析 由α的范圍求出$\frac{π}{4}$+α的范圍�,根據(jù)cos($\frac{π}{4}$+α)的值求出sin($\frac{π}{4}$+α)的值���,利用兩角和與差的正弦函數(shù)公式求出sinα與cosα的值����,原式利用同角三角函數(shù)間基本關(guān)系化簡����,將各自的值代入計算即可求出值.
解答 解:∵cos($\frac{π}{4}$+α)=$\frac{3}{5}$�����,$\frac{17π}{12}$<α<$\frac{7}{4}$π�,
∴sin($\frac{π}{4}$+α)=-$\sqrt{1-(\frac{3}{5})^{2}}$=-$\frac{4}{5}$,
∴sinα=sin[($\frac{π}{4}$+α)-$\frac{π}{4}$]=$\frac{\sqrt{2}}{2}$×(-$\frac{4}{5}$-$\frac{3}{5}$)=-$\frac{7\sqrt{2}}{10}$�,cosα=cos[($\frac{π}{4}$+α)-$\frac{π}{4}$]=$\frac{\sqrt{2}}{2}$×(-$\frac{4}{5}$+$\frac{3}{5}$)=-$\frac{\sqrt{2}}{10}$��,
則原式=$\frac{2sinαcosα+2si{n}^{2}α}{1-\frac{sinα}{cosα}}$=$\frac{2×(-\frac{7\sqrt{2}}{10})×(-\frac{\sqrt{2}}{10})}{1-7}$=-$\frac{7}{150}$.
點評 此題考查了同角三角函數(shù)基本關(guān)系的運用,熟練掌握基本關(guān)系是解本題的關(guān)鍵.
