【答案】n+3﹣(2n+3)?( 
)n
【解析】解:n的個(gè)位數(shù)為1時(shí)有:an=A(n2)﹣A(n)=0,
n的個(gè)位數(shù)為2時(shí)有:an=A(n2)﹣A(n)=4﹣2=2��,
n的個(gè)位數(shù)為3時(shí)有:an=A(n2)﹣A(n)=9﹣3=6,
n的個(gè)位數(shù)為4時(shí)有:an=A(n2)﹣A(n)=6﹣4=2,
n的個(gè)位數(shù)為5時(shí)有:an=A(n2)﹣A(n)=5﹣5=0����,
n的個(gè)位數(shù)為6時(shí)有:an=A(n2)﹣A(n)=6﹣6=0�����,
n的個(gè)位數(shù)為7時(shí)有:an=A(n2)﹣A(n)=9﹣7=2���,
n的個(gè)位數(shù)為8時(shí)有:an=A(n2)﹣A(n)=4﹣8=﹣4,
n的個(gè)位數(shù)為9時(shí)有:an=A(n2)﹣A(n)=1﹣9=﹣8����,
n的個(gè)位數(shù)為0時(shí)有:an=A(n2)﹣A(n)=0﹣0=0���,
每10個(gè)一循環(huán),這10個(gè)數(shù)的和為:0����,
202÷10=20余2��,余下兩個(gè)數(shù)為:a201=0����,a202=2�,
∴數(shù)列{an}的前202項(xiàng)和等于:a201+a202=0+2=2,
即有A=2.
函數(shù)函數(shù)f(x)=ex﹣e+1為R上的增函數(shù)����,且f(1)=1,
f[g(x)﹣ 
]=1=f(1)�����,
可得g(x)=1+ =1+ 
,
則g(n)=1+(2n﹣1)( 
)n�,
即有bn=g(n)=1+(2n﹣1)( )n,
則數(shù)列{bn}的前n項(xiàng)和為n+[1( )1+3( )2+5( )3++(2n﹣1)( )n]�,
可令S=1( )1+3( )2+5( )3++(2n﹣1)( )n��,
S=1( )2+3( )3+5( )4++(2n﹣1)( )n+1���,
兩式相減可得 S= +2[( )2+( )3+( )4++( )n]﹣(2n﹣1)( )n+1
= +2 
﹣(2n﹣1)( )n+1�,
化簡(jiǎn)可得S=3﹣(2n+3)( )n���,
則數(shù)列{bn}的前n項(xiàng)和為n+3﹣(2n+3)( )n.
故答案為:n+3﹣(2n+3)( )n.
先根據(jù)n的個(gè)位數(shù)的不同取值推導(dǎo)數(shù)列的周期���,由周期可求得A=2����,再由函數(shù)f(x)為R上的增函數(shù)����,求得g(x)的解析式�,即有bn=g(n)=1+(2n﹣1)( )n��,再由數(shù)列的求和方法:分組求和和錯(cuò)位相減法���,化簡(jiǎn)整理即可得到所求和.
