- 数列求证:设数列有A1=2,A(n+1)=An+1/An求证:A?
- 设数列有A1=2,A(n+1)=An+1/An 求证:An>√2n+1对一切正整数n成立
要快.谢谢了
- 证明:(开方即 1/2 次方,用^表示)
n=1时,A_1 = 4^(1/2) = 2 > (2*1 + 1)^(1/2) = 3^(1/2);
假设n=k时,A_k > (2k + 1)^(1/2);
则n=(k+1)时,A_(k+1) = A_k + 1/A_k;
欲证结果,只需证(A_k + 1/A_k)^2 > (2k + 3);而
(A_k + 1/A_k)^2 = (A_k)^2 + 2 + 1/[(A_k)^2] > 2k + 1 + 2 + 1/[(A_k)^2] = (2k + 3) + 1/[(A_k)^2];
易知A_k > 0且单调递增。因而1/[(A_k)^2] > 0;
所以,(A_k + 1/A_k) > (2k + 3)^(1/2)