Author Topic: TT2B Problem 2  (Read 8416 times)

Victor Ivrii

  • Administrator
  • Elder Member
  • *****
  • Posts: 2607
  • Karma: 0
    • View Profile
    • Personal website of Victor Ivrii
TT2B Problem 2
« on: November 24, 2018, 05:20:09 AM »
(a) Find the decomposition into power series at ${z=0}$ of $$f(z)=(1-z)^{-1}.$$ What is the radius of convergence?

(b) Plugging in $-z^2$ instead of $z$ and integrating, obtain a decomposition at $z=0$ of  $\arctan (z)$.
« Last Edit: November 29, 2018, 07:27:48 AM by Victor Ivrii »

Yifei Wang

  • Jr. Member
  • **
  • Posts: 10
  • Karma: 3
    • View Profile
Re: TT2 Problem 2
« Reply #1 on: November 24, 2018, 05:38:47 AM »
I think the power is -1/2 inside of the -1

Correct V.I.  It was actually Test2B
« Last Edit: November 29, 2018, 07:28:07 AM by Victor Ivrii »

Wanying Zhang

  • Full Member
  • ***
  • Posts: 21
  • Karma: 6
    • View Profile
Re: TT2 Problem 2
« Reply #2 on: November 24, 2018, 12:15:18 PM »
Here is the solution to problem 2.

You need to know decomposition of $(1-z)^{-1}$. The rest is simply wrong. V.I.
« Last Edit: November 29, 2018, 07:19:35 AM by Victor Ivrii »

Huanglei Ln

  • Jr. Member
  • **
  • Posts: 8
  • Karma: 7
    • View Profile
Re: TT2 Problem 2
« Reply #3 on: November 25, 2018, 01:34:47 AM »
$$
   \begin{aligned}   
    a)f(z)&=\frac{1}{1-z}=\sum^{\infty}_{n=0}z^n \\
   \frac{1}{R}&=\lim_{n\rightarrow {\infty} }|\frac{1}{1}|=1\Rightarrow R=1
    \end{aligned}
$$
$$
   \begin{aligned}   
    b)f(-z^2)&=\frac{1}{1+z^2}=\sum^{\infty}_{n=o}{-z^2}^n=\Sigma^{\infty}(-1)^nz^{2n} \\
   \Rightarrow \int f(-z^2)dz&=\sum^{\infty}_{n=o}(-1)^n\int^{2n}dz\\
    \Rightarrow \int \frac{1}{1+z^2}dz&=\sum^{\infty}_(n=0)(-1)^n\int z^{2n}dz\\
    \Rightarrow \arctan(z)+c&=\sum^{\infty}_{n=0}(-1)^n \frac{z^{2n+1}}{2n+1}\\
    \Rightarrow \arctan(z)&=\sum^{\infty}_{n=0}\frac{(-1)^n}{2n+1}z^{2n+1} +c
    \end{aligned}
$$
« Last Edit: November 29, 2018, 07:24:02 AM by Victor Ivrii »

Huanglei Ln

  • Jr. Member
  • **
  • Posts: 8
  • Karma: 7
    • View Profile
Re: TT2 Problem 2
« Reply #4 on: November 25, 2018, 01:39:58 AM »
 \begin{aligned}
    a)f(z)&=\frac{1}{1-z}=\sum^{\infty}_{n=o}z^n \\
 \frac{1}{R}&=lim_{n\rightarrow {\infty} }|\frac{1}{1}|=1\Rightarrow R=1
  \end{aligned}
 \end{displaymath}
\begin{displaymath}
 \begin{aligned}
    b)f(-z^2)&=\frac{1}{1+z^2}=\sum^{\infty}_{n=o}{-z^2}^n=\Sigma^{\infty}(-1)^nz^{2n} \\
 \Rightarrow \int f(-z^2)dz&=\sum^{\infty}_{n=o}(-1)^n\int^{2n}dz\\
    \Rightarrow \int \frac{1}{1+z^2}dz&=\sum^{\infty}_(n=0)(-1)^n\int z^{2n}dz\\
    \Rightarrow artan(z)+c&=\sum^{\infty}_{n=0}(-1)^n \frac{z^{2n+1}}{2n+1}\\
    \Rightarrow artan(z)&=\sum^{\infty}_{n=0}\frac{(-1)^n}{2n+1}z^{2n+1} +c
  \end{aligned}

Victor Ivrii

  • Administrator
  • Elder Member
  • *****
  • Posts: 2607
  • Karma: 0
    • View Profile
    • Personal website of Victor Ivrii
Re: TT2 Problem 2
« Reply #5 on: November 29, 2018, 07:23:37 AM »
Huanglei

I fixed your LaTeX. Don't learn it from crappy sources!

Also as $z=0$ you'll see that $c=0$. In actual test missing this will lead to the mark reduction
« Last Edit: November 29, 2018, 07:25:10 AM by Victor Ivrii »