【答案】C
【解析】
①先證明△ABD為等邊三角形�,根據(jù)“SAS”證明△AED≌△DFB,利用全等三角形的性質(zhì)解答即可�����;
②先證明△ABD為等邊三角形�����,根據(jù)“SAS”證明△AED≌△DFB;
③過點(diǎn)F作FP∥AE于P點(diǎn)���,根據(jù)題意有FP:AE=DF:DA=1:3���,則FP:BE=1:6=FG:BG,即BG=6GF����;
④因?yàn)辄c(diǎn)E、F分別是AB�、AD上任意的點(diǎn)(不與端點(diǎn)重合),且AE=DF����,當(dāng)點(diǎn)E�,F分別是AB,AD中點(diǎn)時(shí)����,CG⊥BD;
⑤∠BGE=∠BDG+∠DBF=∠BDG+∠GDF=60°
①∵ABCD為菱形�����,∴AB=AD.
∵AB=BD,∴△ABD為等邊三角形����,∴∠A=∠BDF=60°.
又∵AE=DF,AD=BD���,∴△AED≌△DFB�,∴∠ADE=∠DBF����,故本選項(xiàng)正確;
②∵ABCD為菱形����,∴AB=AD.
∵AB=BD,∴△ABD為等邊三角形�,∴∠A=∠BDF=60°.
又∵AE=DF,AD=BD�,∴△AED≌△DFB,故本選項(xiàng)錯(cuò)誤��;
③過點(diǎn)F作FP∥AE交DE于P點(diǎn)(如圖2).
∵AF=2FD,∴FP:AE=DF:DA=1:3.
∵AE=DF����,AB=AD,∴BE=2AE����,∴FP:BE=FP:2AE=1:6.
∵FP∥AE,∴PF∥BE���,∴FG:BG=FP:BE=1:6���,即BG=6GF,故本選項(xiàng)正確�����;
④當(dāng)點(diǎn)E�����,F分別是AB����,AD中點(diǎn)時(shí)(如圖3)���,由(1)知��,△ABD��,△BDC為等邊三角形.
∵點(diǎn)E�,F分別是AB,AD中點(diǎn)���,∴∠BDE=∠DBG=30°��,∴DG=BG.在△GDC與△BGC中���,∵
,∴△GDC≌△BGC��,∴∠DCG=∠BCG��,∴CH⊥BD��,即CG⊥BD�,故本選項(xiàng)錯(cuò)誤;
⑤∵∠BGE=∠BDG+∠DBF=∠BDG+∠GDF=60°��,為定值,故本選項(xiàng)正確����;
綜上所述:正確的結(jié)論有①③⑤,共3個(gè).
故選C.
