题目内容
4.已知O为△ABC的外心,AB=3,AC=4,$\overrightarrow{AO}$=x$\overrightarrow{AB}$+y$\overrightarrow{AC}$,且2x+y=1(x,y≠0),则cos∠BAC=( )| A. | $\frac{3}{8}$ | B. | $\frac{3}{4}$ | C. | $\frac{2}{3}$ | D. | $\frac{1}{2}$ |
分析 由$\overrightarrow{AO}$=x$\overrightarrow{AB}$+y$\overrightarrow{AC}$得,${\left\{\begin{array}{l}{\overrightarrow{AO}•\overrightarrow{AB}=x{\overrightarrow{AB}}^{2}+y\overrightarrow{AB}•\overrightarrow{AC}}\\{\overrightarrow{AO}•\overrightarrow{AC}=x\overrightarrow{AB}•\overrightarrow{AC}+y{\overrightarrow{AC}}^{2}}\end{array}\right.}^{\;}$⇒$\overrightarrow{AO}•\overrightarrow{AB}=\frac{9}{2},\overrightarrow{AO}•\overrightarrow{AC}=8$$\left\{\begin{array}{l}{\frac{9}{2}=9x+12cos∠BAC}\\{8=12xcos∠BAC+16y}\end{array}\right.$联立2x+y=1解得cos∠BAC
解答 
解:如图,由$\overrightarrow{AO}$=x$\overrightarrow{AB}$+y$\overrightarrow{AC}$得,${\left\{\begin{array}{l}{\overrightarrow{AO}•\overrightarrow{AB}=x{\overrightarrow{AB}}^{2}+y\overrightarrow{AB}•\overrightarrow{AC}}\\{\overrightarrow{AO}•\overrightarrow{AC}=x\overrightarrow{AB}•\overrightarrow{AC}+y{\overrightarrow{AC}}^{2}}\end{array}\right.}^{\;}$
∵O为△ABC的外心,由向量数量积的几何意义可知:$\overrightarrow{AO}•\overrightarrow{AB}=\frac{9}{2},\overrightarrow{AO}•\overrightarrow{AC}=8$
$\left\{\begin{array}{l}{\frac{9}{2}=9x+12cos∠BAC}\\{8=12xcos∠BAC+16y}\end{array}\right.$联立2x+y=1解得cos∠BAC=$\frac{3}{8}$.
故选:A.
点评 考查向量数量积的运算及其计算公式,三角形外接圆圆心的概念,由向量数量积的几何意义,属于难题.
如图,四边形ABCD中,AB=AD=CD=1,BD=$\sqrt{2}$,BD⊥CD,将四边形ABCD沿对角线BD折成四面体A1-BCD,则四面体A1-BCD的体积的最大值为$\frac{1}{6}$,此时A1C与平面A1BD所成的角为45°.| A. | (-1,2) | B. | [-1,+∞) | C. | (-∞,2] | D. | [-1,2] |
| A. | 7π | B. | 14π | C. | 28π | D. | 36π |
| A. | $\frac{{\sqrt{2}}}{2}$ | B. | $\sqrt{2}$ | C. | $\frac{{\sqrt{6}+\sqrt{2}}}{4}$ | D. | 1 |