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又E、F是边的中点,
∴AE=CF,——————————————————————————(1分)
∴△ABE≌△CBF———————————————————————(2分) ∴BE=BF. ——————————————————————————(1分)
(2)联结AC、BD,AC交BE、BD于点G、O. ——————————(1分) ∵△BEF是等边三角形, ∴EB=EF,
又∵E、F是两边中点, ∴AO=
1AC=EF=BE.——————————————————————(1分) 2又△ABD中,BE、AO均为中线,则G为△ABD的重心, ∴OG?11AO?BE?GE, 33∴AG=BG,——————————————————————————(1分) 又∠AGE=∠BGO,
∴△AGE≌△BGO,———— ——————————————————(1分)
∴AE=BO,则AD=BD,
∴△ABD是等边三角形,—— —————————————————(1分) 所以∠BAD=60°,则∠ADC=120°,
即∠ADC=2∠BAD. ——— ——————————————————(1分)
金山区
23.(本题满分12分,每小题6分)
如图7,已知AD是△ABC的中线, M是AD的中点, 过A点作AE∥BC,CM的延 长线与AE相交于点E,与AB相交于点F. (1)求证:四边形AEBD是平行四边形; (2)如果AC=3AF,求证四边形AEBD是矩形.
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E F A
M B D
图7
C
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23.证明:(1)∵AE//BC,∴∠AEM=∠DCM,∠EAM=∠CDM,……………………(1分)
又∵AM=DM,∴△AME≌△DMC,∴AE=CD,…………………………(1分) ∵BD=CD,∴AE=BD.……………………………………………………(1分) ∵AE∥BD,∴四边形AEBD是平行四边形.……………………………(2分)
AFAE?.…………………………………………………(1分) FBBCAFAE1??,∴AB=3AF.……………………………(1分) ∵AE=BD=CD,∴
FBBC2(2)∵AE//BC,∴
∵AC=3AF,∴AB=AC,…………………………………………………………(1分) 又∵AD是△ABC的中线,∴AD⊥BC,即∠ADB=90°.……………………(1分) ∴四边形AEBD是矩形.……………………………………………………(1分)
静安区
23.(本题满分12分,第(1)小题满分6分,第(2)小题满分6分) 已知:如图,在平行四边形ABCD中, AC、DB交于点E, 点F在BC的延长线上,联结EF、DF,且∠DEF=∠ADC.
A D EFAB? (1)求证:; BFDB(2)如果BD?2AD?DF,求证:平行四边形ABCD是矩形.
B
23.(本题满分12分,第(1)小题6分,第(2)小题6分) 证明:(1)∵平行四边形ABCD,∴AD//BC ,AB//DC
∴∠BAD+∠ADC=180°,……………………………………(1分) 又∵∠BEF+∠DEF =180°, ∴∠BAD+∠ADC=∠BEF+∠DEF……(1分)
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2E 第23题图
C
F A D E B 第23题图
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∵∠DEF=∠ADC∴∠BAD=∠BEF, …………………………(1分) ∵AB//DC, ∴∠EBF=∠ADB …………………………(1分)
EFAB? ………………………(2分) BFDBADBE?(2) ∵△ADB∽△EBF,∴, ………………………(1分) BDBF1在平行四边形ABCD中,BE=ED=BD
212∴AD?BF?BD?BE?BD
2∴△ADB∽△EBF ∴
∴BD?2AD?BF, ………………………………………(1分) 又∵BD?2AD?DF
∴BF?DF,△DBF是等腰三角形 …………………………(1分) ∵BE?DE∴FE⊥BD, 即∠DEF =90° …………………………(1分) ∴∠ADC =∠DEF =90° …………………………(1分) ∴平行四边形ABCD是矩形 …………………………(1分)
22闵行区
23.(本题满分12分,其中第(1)小题5分,第(2)小题7分)
如图,已知在△ABC中,∠BAC=2∠C,∠BAC的平分线AE与∠ABC的平分线BD相交于点F,FG∥AC,联结DG.
(1)求证:BF?BC?AB?BD; (2)求证:四边形ADGF是菱形.
B E
G
C
(第23题图)
A D
F 23.证明:(1)∵AE平分∠BAC,∴∠BAC=2∠BAF=2∠EAC.
∵∠BAC=2∠C,∴∠BAF=∠C=∠EAC.…………………………(1分) 又∵BD平分∠ABC,∴∠ABD=∠DBC.……………………………(1分) ∵∠ABF=∠C,∠ABD=∠DBC,
∴?ABF∽?CBD.…………………………………………………(1分) ∴
ABBF.………………………………………………………(1分) ?BCBD∴BF?BC?AB?BD.………………………………………………(1分) (2)∵FG∥AC,∴∠C=∠FGB,∴∠FGB=∠FAB.………………(1分)
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∵∠BAF=∠BGF,∠ABD=∠GBD,BF=BF,
∴?ABF≌?GBF.∴AF=FG,BA=BG.…………………………(1分) ∵BA=BG,∠ABD=∠GBD,BD=BD,
∴?ABD≌?GBD.∴∠BAD=∠BGD.……………………………(1分) ∵∠BAD=2∠C,∴∠BGD=2∠C,∴∠GDC=∠C,
∴∠GDC=∠EAC,∴AF∥DG.……………………………………(1分) 又∵FG∥AC,∴四边形ADGF是平行四边形.……………………(1分) ∴AF=FG.……………………………………………………………(1分) ∴四边形ADGF是菱形.……………………………………………(1分)
普陀区
23.(本题满分12分)
已知:如图9,梯形ABCD中,且FG?EF. AD∥BC,DE∥AB,DE与对角线AC交于点F,FG∥AD,(1)求证:四边形ABED是菱形; (2)联结AE,又知AC⊥ED,求证:
B
E 图9
F
C G
A
D
1AE2?EFED. 2
23.证明:
(1)∵ AD∥BC,DE∥AB,∴四边形ABED是平行四边形. ··························· (2分)
∵FG∥AD,∴同理
FGCF?. ·················································································· (1分) ADCAEFCF? . ··································································································· (1分) ABCAFGEF得= ADAB∵FG?EF,∴AD?AB. ···················································································· (1分) ∴四边形ABED是菱形. ························································································· (1分) (2)联结BD,与AE交于点H.
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