(1)证b1=a2-a1=1,
当n≥2时,bn=an+1−an=
an−1+an
2−an=−
1
2(an−an−1)=−
1
2bn−1,
所以{bn}是以1为首项,−
1
2为公比的等比数列.
(2)解由(1)知bn=an+1−an=(−
1
2)n−1,
当n≥2时,an=a1+(a2-a1)+(a3-a2)++(an-an-1)=1+1+(-
1
2)+…+(−
1
2)n−2
=1+
1−(−
1
2)n−1
1−(−
1
2)=1+
2
3[1−(−
1
2)n−2]=
5
3−
2
3(−
1
2)n−1,
当n=1时,
5
3−
2
3(−
1
2)1−1=1=a1.
所以an=
5
3−
2
3(−
1
2)n−1(n∈N*).
