27. 证明:,,
·················································································································· 1分
在与中 ·········································· 2分
································································ 1分
1分
26. (1) 证明:∵∠A=∠A′ AC=A′C ∠ACM=∠A′CN=900-∠MCN
∴
(2)在Rt△ABC中
∵,∴∠A=900-300=600
又∵,∴∠MCN=300,
∴∠ACM=900-∠MCN=600
∴∠EMB′=∠AMC=∠A=∠MCA=600
∵∠B′=∠B=300
所以三角形MEB′是Rt△MEB′且∠B′=300
所以MB′=2ME
25. 证明:(1)∵CF∥BE∴EBD=FCD
又∵∠BDE=∠CDF,BD=CD
∴△BDE≌△CDF
(2)四边形BECF是平行四边形
由△BDE≌△CDF得ED=FD
∵BD=CD
∴四边形BECF是平行四边形
24. (1)(或相等)
(2)(或成立),理由如下
方法一:由,得
在和中
方法二、连接AD,同方法一,,所以AF=DC。
由。可证。
(3)如图,
方法一:由点B与点E重合,得,
所以点B在AD的垂直平分线上,
且
所以OA=OD,点O在AD的垂直平分线上,故。
方法二:延长BO交AD于点G。同方法一OA=OD,可证
则。
23. (1)解:图2中△ABE≌C△ACD
证明如下:
∵△ABC与AED均为等腰直角三角形
∴AB=AC ,AE=AD, ∠BAC=∠EAD=90°………………3分
∴∠BAC+∠CAE=∠EAD+∠CAE
即∠BAE=∠CAD ………………4分
∴△ABE≌△ACD………………6分
(2)证明:由(1)△ABE≌△ACD知
∠ACD=∠ABE=45°………………7分
又∠ACB=45°
∴∠BCD=∠ACB+∠ACD=90°
∴DC⊥BE………………9分
22.
[证](1)过点分别作,,分别是垂足,由题意知,,,,,从而.
(2)过点分别作,,分别是垂足,
由题意知,.在和中,
,,.,
又由知,,.
解:(3)不一定成立.
21. 证明:,.
在和中,..
20. 证明:,(2分)
又,,
.(5分)
. (6分)
19. 证明:∵∠QAP=∠BAC
∴∠QAP+∠PAB=∠PAB+∠BAC
即∠QAB=∠PAC
在△ABQ和△ACP中
AQ=AP
∠QAB=∠PAC
AB=AC
18. 证明:
,
,
·················································································································· 1分
与
中
·········································· 2分
································································ 1分
1分
(1) 证明:∵∠A=∠A′ AC=A′C ∠ACM=∠A′CN=900-∠MCN
,∴∠A=900-300=600
,∴∠MCN=300,
(或相等)
,得
和
中
,所以AF=DC。
。可证
。
点B与点E重合,得
,
。
分别作
,
,
分别是垂足,由题意知,
,
,
,
,从而
. 
和
中,
,
,
,
,
. 
,
.
和
中,
.
.
,
(2分)
,
,
.(5分) 
. (6分)
