答案： B

答案： $\frac{25}{3}$

答案： 48

答案： 20

答案： 解:在$\mathrm{Rt}\triangle ABC$中,$AB = 2.5m$,$BC = 1.5m$,
$\therefore AC^{2}=AB^{2}-BC^{2}=2.5^{2}-1.5^{2}=4$,$\therefore AC = 2m$.
在$\mathrm{Rt}\triangle ECD$中,$DE = AB = 2.5m$,$CD = 1.5 + 0.5 = 2(m)$,$\therefore EC^{2}=DE^{2}-CD^{2}=2.5^{2}-2^{2}=2.25$,
$\therefore EC = 1.5m$,故$AE = AC - CE = 2 - 1.5 = 0.5(m)$,
即梯子顶端$A$下落了$0.5m$.

答案：

(1) 解:$AB = CE$,$AB\perp CE$.
理由:延长$CE$交$AB$于点$F$,如答图.

$\because\angle ADC = 90^{\circ}$,$\angle DAC = 45^{\circ}$,
$\therefore\angle ACD = \angle DAC = 45^{\circ}$,$\therefore AD = CD$.
在$\triangle ADB$和$\triangle CDE$中,$\begin{cases}AD = CD\\\angle ADB = \angle CDE\\DB = DE\end{cases}$
$\therefore\triangle ADB\cong\triangle CDE(\mathrm{SAS})$,
$\therefore AB = CE$,$\angle BAD = \angle DCE$.
$\because\angle BAD + \angle ABD = 90^{\circ}$,
$\therefore\angle DCE + \angle ABD = 90^{\circ}$,$\therefore\angle BFC = 90^{\circ}$,
$\therefore AB\perp CE$.
(2) 证明:设$EF = x$,
$\because S_{\triangle ABC}=S_{\triangle ABE}+S_{\triangle BDE}+S_{\triangle ACD}$,
$\therefore\frac{1}{2}AB\cdot CF=\frac{1}{2}AB\cdot EF+\frac{1}{2}BD\cdot DE+\frac{1}{2}DC\cdot AD$.
$\because BD = a$,$AB = c$,$AD = b$,$\triangle ADB\cong\triangle CDE$,
$\therefore AB = CE = c$,$BD = DE = a$,$AD = CD = b$,
$\therefore\frac{1}{2}c(c + x)=\frac{1}{2}cx+\frac{1}{2}a^{2}+\frac{1}{2}b^{2}$,
即$c^{2}+cx = cx + a^{2}+b^{2}$,
$\therefore a^{2}+b^{2}=c^{2}$.