回復 18# XYZ 的帖子
第 9 題
小弟是這樣做
設\(\overline{AC}\)和\(\overline{BD}\)交於O
\(\begin{align}
& \overline{OC}=6,\overline{OP}=\frac{1}{3}\overline{OA}=2 \\
& \overline{CP}=\sqrt{{{\overline{OC}}^{2}}-{{\overline{OP}}^{2}}}=4\sqrt{2} \\
\end{align}\)
作\(\overline{PQ}\)垂直\(\overline{AB}\)於Q
\(\begin{align}
& \overline{PQ}=\frac{2\Delta APB}{\overline{AB}}=\frac{12}{3\sqrt{5}}=\frac{4\sqrt{5}}{5} \\
& \tan \theta =\frac{\overline{CP}}{\overline{PQ}}=\frac{4\sqrt{2}}{\frac{4\sqrt{5}}{5}}=\sqrt{10} \\
\end{align}\)