答案：$\sqrt{2}$

答案：(1) 设$\frac{a}{3}=\frac{b}{2}=\frac{c}{4}=k$，则$a = 3k$，$b = 2k$，$c = 4k$. 因为$a + b + c = 18$，所以$3k+2k + 4k=18$，$9k = 18$，解得$k = 2$. 所以$a=3\times2 = 6$，$b = 2\times2 = 4$，$c = 4\times2 = 8$.
(2) 因为线段$d$是线段$a$和$b$的比例中项，所以$d^{2}=ab$，$d^{2}=6\times4 = 24$，$d = \pm2\sqrt{6}$，又因为线段长度不能为负，所以$d = 2\sqrt{6}$

答案：(1) 因为$AB = AC = 5$，$BC = 6$，$AD\perp BC$，所以$BD=\frac{1}{2}BC = 3$，根据勾股定理$AD=\sqrt{AB^{2}-BD^{2}}=\sqrt{25 - 9}=4$. 因为$PQ\parallel BC$，所以$\triangle PQA\sim\triangle BCA$，设$AE = h$，则$\frac{S_{\triangle PQA}}{S_{\triangle ABC}}=\left(\frac{h}{4}\right)^{2}$，又因为$S_{\triangle PQA}=S_{四边形PBCQ}$，所以$S_{\triangle PQA}=\frac{1}{2}S_{\triangle ABC}$，即$\left(\frac{h}{4}\right)^{2}=\frac{1}{2}$，$h = 2\sqrt{2}$，所以$AE = 2\sqrt{2}$.
(2) 设$AP=x$，因为$\triangle PQA\sim\triangle BCA$，所以$\frac{AP}{AB}=\frac{PQ}{BC}=\frac{AE}{AD}$，$PQ=\frac{6}{5}x$，$AE=\frac{4}{5}x$，$PE=\frac{3}{5}x$，$AQ = x$，$CQ = 5 - x$，$PB = 5 - x$. 因为$\triangle PQA$的周长与四边形$PBCQ$的周长相等，所以$AP + PQ+AQ=PB + BC + CQ+PQ$，$x+\frac{6}{5}x+x=(5 - x)+6+(5 - x)+\frac{6}{5}x$，解得$x=\frac{30}{7}$，所以$AP=\frac{30}{7}$

答案：(1) 因为$DE\parallel BC$，所以$\triangle ADE\sim\triangle ABC$，$\frac{AE}{AC}=\frac{DE}{BC}$，又因为$DE\parallel BC$，$EF = DE$，所以$\triangle EFG\sim\triangle CBG$，$\frac{EG}{CG}=\frac{EF}{BC}$，因为$EF = DE$，所以$\frac{AE}{AC}=\frac{EG}{CG}$.
(2) 因为$CF^{2}=FG\cdot FB$，所以$\frac{CF}{FG}=\frac{FB}{CF}$，又$\angle GFC=\angle CFB$，所以$\triangle FCG\sim\triangle FBC$，$\angle FCG=\angle FBC$，因为$DE\parallel BC$，所以$\angle AED=\angle ACB$，$\angle EDB+\angle DBC = 180^{\circ}$，又因为$\angle FCG=\angle FBC$，$\triangle EFG\sim\triangle CBG$，$\frac{EF}{BC}=\frac{EG}{CG}$，$EF = DE$，所以$\frac{DE}{BC}=\frac{EG}{CG}$，即$CG\cdot CE = BC\cdot DE$