设Xn+1=sinxn,其中x0=sint,0≤t≤π,则
(A) 0 (B) 1 (C) -1
(A) 0 (B) 1 (C) -1
【正确答案】
A
【答案解析】
0≤t≤π,x0=sint,0≤sint≤1,0≤x1=sinsint≤1,…,0≤xn≤1,则数列 {xn}有界,又sinxn≤xn,于是xn+1≤xn,{xn}是单调下降数列,则
