【答案】
(1)
解:如圖1所示�����,
∵點(diǎn)A1(1����,2)在拋物線的解析式為y=ax2上,
∴a=2
(2)
解:如圖2所示����,
AnBn=2x2=2×[( 
)n﹣1]2= 
�����,BnBn+1= 
(3)
解:如圖3所示�����,
由Rt△AnBnBn+1是等腰直角三角形得AnBn=BnBn+1���,則: = ,
2n﹣3=n��,n=3���,
∴當(dāng)n=3時(shí)�,Rt△AnBnBn+1是等腰直角三角形����,
②依題意得,∠AkBkBk+1=∠AmBmBm+1=90°��,
有兩種情況:i)當(dāng)Rt△AkBkBk+1∽R(shí)t△AmBmBm+1時(shí)���,
= 
���, 
= 
����, 
= 
�����,
所以��,k=m(舍去)����,
ii)當(dāng)Rt△AkBkBk+1∽R(shí)t△Bm+1BmAm時(shí),
= 
�����, 
= 
���, 
= 
��,
∴k+m=6,
∵1≤k<m≤n(k,m均為正整數(shù))�,
∴取 
或 
�����;
當(dāng) 時(shí)����,Rt△A1B1B2∽R(shí)t△B6B5A5��,
相似比為: 
= 
=64���,
當(dāng) 時(shí)���,Rt△A2B2B3∽R(shí)t△B5B4A4,
相似比為: 
= 
=8,
所以:存在Rt△AkBkBk+1與Rt△AmBmBm+1相似�,其相似比為64:1或8:1.
【解析】(1)直接把點(diǎn)A1的坐標(biāo)代入y=ax2求出a的值�����;(2)由題意可知:A1B1是點(diǎn)A1的縱坐標(biāo):則A1B1=2×12=2��;A2B2是點(diǎn)A2的縱坐標(biāo):則A2B2=2×( )2= �;…則AnBn=2x2=2×[( )n﹣1]2= ;
B1B2=1﹣ = �,B2B3= ﹣ 
= 
= ����,…���,BnBn+1= ;(3)因?yàn)镽t△AkBkBk+1與Rt△AmBmBm+1是直角三角形���,所以分兩種情況討論:根據(jù)(2)的結(jié)論代入所得的對(duì)應(yīng)邊的比列式��,計(jì)算求出k與m的關(guān)系�,并與1≤k<m≤n(k�,m均為正整數(shù))相結(jié)合�,得出兩種符合條件的值,分別代入兩相似直角三角形計(jì)算相似比.
