问题
解答题
已知等差数列{an}的首项a1=1,公差d=1,前n项和为Sn,bn=
(1)求数列{bn}的通项公式; (2)求证:b1+b2+…+bn<2. |
答案
(1)∵等差数列{an}中a1=1,公差d=1
∴Sn=na1+
d=n(n-1) 2 n2+n 2
∴bn=
…(4分)2 n2+n
(2)∵bn=
=2 n2+n
…(6分)2 n(n+1)
∴b1+b2+b3+…+bn=2(
+1 1×2
+1 2×3
+…+1 3×4
)1 n(n+1)
=2(1-
+1 2
-1 2
+1 3
-1 3
+…+1 4
-1 n
)…(8分)1 n+1
=2(1-
)…(11分)1 n+1
∵n>0,
∴0<
<11 n+1
∴0<2(1-
)<21 n+1
∴b1+b2+…+bn<2. …(14分)