【答案】
(1)解:如圖1中��,作DH⊥AB于H.
在Rt△ADH中��,∵∠AHD=90°��,AD=5��,cos∠DAH= 
��,
∴AH=3��,DH= 
=4��,
∴S菱形ABCD=ABDH=5×4=20.
(2)解:證明:如圖1中��,BD與AC交于點(diǎn)G.
在Rt△DHB中��,∵DH=4��,BH=2��,
∴BD= 
= 
=2 
��,
∵四邊形ABCD是菱形��,
∴AC⊥BD��,BG=DG= ��,AG= 
= 
=2 ��,
∵∠EAF=∠BAG��,∠AEF=∠AGB=90°��,
∴△AEF∽△AGB,
∴ 
= 
= 
=2��,
∴AE=2EF.
(3)解:①如圖2中��,當(dāng)⊙O與直線DF相切時(shí)��,易知��,∠BFD=90°��,DF=BF.
∵BD=2 ��,
∴BF= 
��,設(shè)EF=x��,則AE=2EF=2x��,
在Rt△BEF中��,∵BF2=EF2+BE2��,
∴10=x2+(5﹣2x)2��,
解得x=1或3��,
∴AE=2或6時(shí)��,⊙O與直線DF相切.
②如圖3中��,當(dāng)⊙O與AC相切時(shí)��,易知點(diǎn)F與G重合��,設(shè)EF=x��,AE=2x��,
在Rt△AFE中��,∵AG2=AE2+GE2��,
∴20=4x2+x2��,
∴x2=4��,
∴x=2��,
∴AE=4時(shí)��,⊙O與直線CF相切.
③如圖4中��,當(dāng)⊙O與CD相切于點(diǎn)M,延長MO交AE與H��,設(shè)EF=x��,則AE=2x��,則OH= 
EF= x��,BF= 
��,
∵HM=4��,
∴OM+OH=4��,
∴ 
+ 
x=4��,
整理得��,4x2﹣4x﹣39=0��,
解得x= 
或 
(舍棄)��,
∴AE=1+2 ��,
綜上所述��,滿足條件的AE的值為2或4或6或1+2 .
【解析】(1)如圖1中��,作DH⊥AB于H.在Rt△ADH中��,由∠AHD=90°��,AD=5��,cos∠DAH= ��,推出AH=3��,DH= =4��,即可解決問題��;(2)如圖1中��,BD與AC交于點(diǎn)G.在Rt△DHB中��,可得BD= = 
=2 ��,由四邊形ABCD是菱形��,推出AC⊥BD��,BG=DG= ,AG= = =2 ��,由△AEF∽△AGB��,推出 = = =2��,即可解決問題��;(3)分三種情形分別求解:①如圖2中��,當(dāng)⊙O與直線DF相切時(shí).②如圖3中��,當(dāng)⊙O與AC相切時(shí).③如圖4中��,當(dāng)⊙O與CD相切于點(diǎn)M.分別求解即可��;
