5. (2024 春·邗江期末) 如图,点$D$,$E在\triangle ABC的边BC$上,$AD = AE$,$BD = CE$. 求证:$AB = AC$.
答案:证明:如答图,过点A作AF⊥BC于点F.
∵AD = AE,
∴DF = EF;
∵BD = CE,
∴BD + DF = CE + EF即BF = CF.
∵AF⊥BC,
∴AB = AC;
6. 如图,在$\triangle ABC$中,$AC = 2AB$,$AD平分\angle BAC交BC于点D$,$E是AD$上一点,连接$BE$,$EC$,且$EA = EC$. 求证:$EB \perp AB$.
答案:证明:如答图,作EF⊥AC于点F.
∵EA = EC,
∴AF = FC = $\frac{1}{2}$AC;
∵AC = 2AB,
∴AF = AB.
∵AD平分∠BAC,
∴∠BAD = ∠CAD.
在△BAE和△FAE中,{AB = AF,∠BAE = ∠FAE,AE = AE}
∴△BAE≌△FAE(SAS),
∴∠ABE = ∠AFE = 90°,
∴EB⊥AB.
7. 小明遇到这样一个问题:
如图①,在$\triangle ABC$中,$\angle ACB = 90^{\circ}$,点$D在AB$上,且$BD = BC$,求证:$\angle ABC = 2\angle ACD$.
小明发现,除了直接用角度计算的方法外,还可以用下面的方法:如图②,作$BE \perp CD$,垂足为$E$,证明$\angle ABC = 2\angle ACD$.
请从以上两种方法中任选一种,加以证明.
答案:证明:(方法1)
∵∠ACB = 90°,
∴∠BCD = 90°−∠ACD.又
∵BC = BD,
∴∠BCD = ∠BDC,
∴∠ABC = 180°−2∠BCD = 180°−2(90°−∠ACD)=2∠ACD.
(方法2)
∵∠ACB = 90°,
∴∠ACD + ∠BCE = 90°,∠CBE + ∠BCE = 90°,
∴∠ACD = ∠CBE;
又
∵BC = BD,BE⊥CD,
∴∠ABC = 2∠CBE,
∴∠ABC = 2∠ACD.
