1.4 KiB
1.4 KiB
+++ date = '2025-12-17T17:29:22+08:00' draft = false title = '4 – 数院人的一天' tags = ['数学分析'] categories = 'math' description = '我是数院的,数院的数学应该不差才对。' +++
今天习题来自数学分析I 习题7.3 Taylor展开式。
题目描述
设函数$y=f(x)$在$x=0$处有五阶导数,其满足x=y-3y^3+5y^5+o(y^5)(y\to0),f(0)=0.求$f(x)$带Peano型余项的五阶Maclaurin展开式.
解答(待定系数法)
由 ( x = f^{-1}(y) = y - 3y^3 + 5y^5 + o(y^5) )得:
[
x = f(x) - 3f(x)^3 + 5f(x)^5 + o(f(x)^5)
]
在 ( x \to 0 ) 时 ( f(x) \to 0 ),则$o(f(x)^5)=o(x^5)$。
待定系数法设:
[
f(x) = a_0 + a_1 x + a_2 x^2 + a_3 x^3 + a_4 x^4 + a_5 x^5 + o(x^5), \ a_0 = 0, a_1 = f'(0) = \frac{1}{f'^{-1}(0)}=1
]
所以:
\begin{align}
f(x) &= x + a_2 x^2 + a_3 x^3 + a_4 x^4 + a_5 x^5 + o(x^5)\\
f^3(x)&=x^3+3a_2x^4+3(a_2+a_3)x^5+o(x^5)\\
f^5(x)&=x^5+o(x^5)
\end{align}
代入方程$x = f(x) - 3f^3(x) + 5f^5(x) + o(x^5)$:
\begin{align}
x&=x + a_2 x^2 + a_3 x^3 + a_4 x^4 + a_5 x^5-3(x^3+3a_2x^4+3(a_2+a_3)x^5+)+5x^5+o(x^5)\\
0&=a_2 x^2+(a_3-3)x^3+(a_4-9a_2)x^4+(a_5-9(a_2+a_3)+5)x^5+o(x^5)
\end{align}
也就是:
\begin{cases}
a_2=0\\
a_3-3=0\\
a_4-9a_2=0\\
a_5-9(a_2+a_3)+5=0
\end{cases}
因此: [ a_2 = 0, \quad a_3 = 3, \quad a_4 = 0, \quad a_5 = 22 ] 所以: [ f(x) = x + 3x^3 + 22x^5 + o(x^5) ]
注
反函数求导只有一阶导有公式。