17. 解:(1)
;
.
(2)
;
.
證明:①由已知,得
,
,
.
又
,
.
.
在
和
中,
,
,
,
,
.
②如圖2,延長(zhǎng)
交
于點(diǎn)
.
,
.
在中,
,又
,
.
.
.
(3)成立.
證明:①如圖3,
,
.
又,..
在和中,
,,,
..
②如圖4,延長(zhǎng)
交于點(diǎn)
,則
.
,
.
在中,
,
.
.
.
15. 解:(1) 3-
;
(2)30°;
(3)證明:在△AEF和△D′BF中,
∵AE=AC-EC, D’ B=D’ C-BC,
又AC=D’ C,EC=BC,∴AE=D’ B.
又 ∠AEF=∠D’ BF=180°-60°=120°,∠A=∠CD’E=30°,
∴△AEF≌△D’ BF.∴AF=FD’
16. (1)證明:∵AD∥BC
∴∠F=∠DAE
又∵∠FEC=∠AED
CE=DE
∴△FEC≌△AED
∴CF=AD
(2)當(dāng)BC=6時(shí),點(diǎn)B在線段AF的垂直平分線上
其理由是:
∵BC=6 ,AD=2 ,AB=8
∴AB=BC+AD
又∵CF=AD ,BC+CF=BF
∴AB=BF
∴點(diǎn)B在AF的垂直平分線上。
14. 證明:(1)
平分
,
.
在
和
中,
.
(2)連結(jié)
.
,
,
.
,
.
.
,
.
,
.
.
又是公共邊,
.
.
13. 證明: 
四邊形
和四邊形
都是正方形
12.證明:(1)在
和
中
.
(2)
,
.又
,
.
11.
解:(1)如圖1;
(2)如圖2;
(3)4. (8分)
10. 證明:
,
,
.、)
又
,
.
又
,
. (6分
9. 證明: AC∥DE, BC∥EF
,又AC=DE
, ∴AB=DF ∴AF=BD
8. 證明:(1)①
,
·················································································································· 3分
②由
得
,
分別是
的中點(diǎn),
························································· 4分
又
,即
為等腰三角形······································································ 6分
(2)(1)中的兩個(gè)結(jié)論仍然成立.············································································· 8分
(3)在圖②中正確畫出線段
由(1)同理可證
又
,
和都是頂角相等的等腰三角形······································· 10分
,
12分
7. (Ⅰ)證明 將△
沿直線
對(duì)折,得△
,連
,
則△≌△. ························································································· 1分
有
,
,
,
.
又由
,得 
. ········································· 2分
由
,
,
得
. ··································································································· 3分
又
,
∴△
≌△
. ···························································································· 4分
有
,
.
∴
.····························································· 5分
∴在Rt△
中,由勾股定理,
得
.即
. ························································ 6分
(Ⅱ)關(guān)系式仍然成立. ····························································· 7分
證明 將△沿直線對(duì)折,得△
,連
,
則△≌△. ···················································· 8分
有
,
,
,
.
又由,得 
.
由
,
.
得
. ································································································ 9分
又,
∴△
≌△.
有
,
,
,
∴
.
∴在Rt△
中,由勾股定理,
得
.即.························································ 10分
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