这里需要做个小小的变换:
sinx=2cos(x/2)sin(x/2)
=2^2cos(x/2)cos(x/4)sin(x/4)
=···
=2^ncos(x/2)cos(x/4)cos(x/8)···(x/2^n)sin(x/2^n)
所以lim(cos(x/2)cos(x/4)···cos(x/2^n))=lim(sinx/2^n * 1/sin(x/2^n))
=lim(x/2^n/sin(x/2^n) * sinx/x)
=sinx/x
(变量时n吧?)
sinx=2cos(x/2)sin(x/2)
=2^2cos(x/2)cos(x/4)sin(x/4)
=···
=2^ncos(x/2)cos(x/4)cos(x/8)···(x/2^n)sin(x/2^n)
所以lim(cos(x/2)cos(x/4)···cos(x/2^n))=lim(sinx/2^n * 1/sin(x/2^n))
=lim(x/2^n/sin(x/2^n) * sinx/x)
=sinx/x
(变量时n吧?)
温馨提示:内容为网友见解,仅供参考
无其他回答
相似回答
