问题描述:
设f(x)是一次函数,f(1)=1,且f(2),f(3)+1,f(5)成等差数列,若an=f(n),n属于非零自然数
1.求证集合an是等差数列
2.在集合an没相邻两项之间插入2个数,构成一个新的等差数列{bn},求数列{bn}的钱n项和Bn
3.设cn=2^(3bn-1),n属于非零自然数,求数列{cn}的前n项和Cn
问题解答:
我来补答
1.设 f (x) = ax + b; f(1) = a+b = 1
由题意:f (2) + f(5) = 2 x (f (3) + 1)
故 (2a+b) + (5a+b) = 2 x (3a + b + 1),7a + 2b = 6a + 2b + 2,a = 2,b = -1
所以 f(x) = 2x - 1
对于任何一个 N (正整数),有 2f(N) = 4 N - 2 = (2(N-1)-1) + (2(N+1)-1) = f(N-1) + f(N+1)
所以an = f(N) 为等差数列
2.f(x) = 2x-1,f(x+1) = 2x + 1,
中间插入两个数字并保持等差,所以差值d为 2/3,
设bn = g(n) = 2/3 n + x,由 a(1) = b(1) = 1,有 x = 1/3
所以构造成 bn = g(n) = 2/3 n +1/3,
Bn = b1 + b2 + ...+ bn
= (b1 + bn)*n/2 = (1 + 2/3 n + 1/3) * n /2 = 1/3 n^2 + 2/3 n
3.3bn-1 = 3*(2/3n+1/3) = 2n+1
cn = 2^(2n+1)
Cn = c1 + c2 + ...+ cn
= (2^2 - 1) * (cn + ...+ c1) / (2^2 -1)
= c(n+1) - cn + cn - c(n-1) + ...+ c2 - c1)
= (c(n+1) - c1) / 3
= (2^ (2n+3) - 8) / 3
