解:cosx的各阶导数在x=π/4处的值为:
根2/2 n=0
-根2/2 n=1
-根2/2 n=2
根2/2 n=3
根2/2 n=4
n为求导阶数
根据泰勒级数展开:
cosx=根2/2- 根2/2(x-4)-根2/2(x-4)^2+根2/2(x-4)^3+
根2/2(x-4)^4+...
反正符号的规律就是每4位为1周期
n=4k+1 or 4k+2时 为负
n=4k+3 or 4k时 为正 k取非负整数
cosx=cos(π/4+x-π/4)
=cosπ/4cos(x-π/4)-sinπ/4sin(x-π/4)
=√2/2 [cos(x-π/4)-sin(x-π/4)]
=√2/2× 【1-(x-π/4)^2/2!+(x-π/4)^4/4!-......-[(x-π/4)-(x-π/4)^3/3!+(x-π/4)^5/5!+......]】
x∈R
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