【答案】(1)證明見(jiàn)解析(2)證明見(jiàn)解析
【解析】試題分析:(1)通過(guò)證明△ABF∽△CBD�����,由相似三角形對(duì)應(yīng)邊成比例即可得出結(jié)論�����;
(2)先證明△ABF≌△GBF��,得到AF=FG���,BA=BG��,再證明△ABD≌△GBD�,得到∠BAD=∠BGD�,進(jìn)而得到AF∥DG,從而有四邊形ADGF是平行四邊形��,根據(jù)鄰邊相等的平行四邊形是菱形即可得到結(jié)論.
試題解析:證明:(1)∵AE平分∠BAC���,∴∠BAC=2∠BAF=2∠EAC.
∵∠BAC=2∠C��,∴∠BAF=∠C=∠EAC.又∵BD平分∠ABC��,∴∠ABD=∠DBC.
∵∠ABF=∠C���,∠ABD=∠DBC,∴△ABF∽△CBD�����,∴
�,∴BFBC=ABBD.
(2)∵FG∥AC,∴∠C=∠FGB�,∴∠FGB=∠FAB.
∵∠BAF=∠BGF����,∠ABD=∠GBD����,BF=BF�,∴△ABF≌△GBF,∴AF=FG�,BA=BG.
∵BA=BG,∠ABD=∠GBD�,BD=BD,∴△ABD≌△GBD��,∴∠BAD=∠BGD.
∵∠BAD=2∠C�����,∴∠BGD=2∠C��,∴∠GDC=∠C���,∴∠GDC=∠EAC��,∴AF∥DG.
又∵FG∥AC���,∴四邊形ADGF是平行四邊形��,∴AF=FG����,∴四邊形ADGF是菱形.
