How do you find a power series representation for $\frac{{(x - 2)}^{n}}{n^{2}}$ $(x-2)^n/(n^2)$ and what is the radius of convergence?

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How do you find a power series representation for $\frac{{(x - 2)}^{n}}{n^{2}}$ $(x-2)^n/(n^2)$ and what is the radius of convergence?

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Answer 1 · 2016-05-27T12:43:41

$x \in (1, 3)$ $x in (1,3)$ and $\infty \sum i = 1 \frac{{(x - 2)}^{i}}{i^{2}} = Polylog (2, x - 2)$ $sum_{i=1}^{infty}(x-2)^i/i^2 = "PolyLog"(2,x-2)$

Explanation:

Suppose that our quest is for $\infty \sum i = 1 \frac{{(x - 2)}^{i}}{i^{2}}$ $sum_{i=1}^{infty}(x-2)^i/i^2$ .
In this case a variable change $y = (x - 2)$ $y = (x-2)$ give
$σ (y) = \infty \sum i = 1 \frac{y^{i}}{i^{2}}$ $sigma(y)=sum_{i=1}^{infty}y^i/i^2$ .
In the next steps we will try to build such a power series.
We begin with $σ_{1} (y) = \infty \sum i = 0 y^{n}$ $sigma_1(y)= sum_{i=0}^{infty}y^n$ .
This power series is convergent for $| y | < 1$ $abs(y) < 1$ and in this interval is equivalent to

$σ_{1}^{a} (y) = \frac{1}{1 - y}$ $sigma_1^a(y)= 1/(1-y)$

now integrating $σ_{1} (y)$ $sigma_1(y)$ we get

$f (y) = \int σ_{1} (y) d y = \infty \sum i = 1 \frac{y^{i}}{i} = y \infty \sum i = 1 \frac{y^{i - 1}}{i} = y σ_{2} (y)$ $f(y) = int sigma_1(y)dy = sum_{i=1}^{infty}y^i/i = y sum_{i=1}^{infty}y^{i-1}/i = y sigma_2(y)$

$σ_{2} (y) = \infty \sum i = 1 \frac{y^{i - 1}}{i}$ $sigma_2(y)=sum_{i=1}^{infty}y^{i-1}/i$ is equivalent to

$σ_{2}^{a} (y) = \frac{\int σ_{1}^{a} (y) d y}{y} = - \frac{{log}_{e} (1 - y)}{y}$ $sigma_2^a(y)=(int sigma_1^a(y)dy)/y = -(log_e(1-y))/y$

The last step is covered by integrating $σ_{2} (y)$ $sigma_2(y)$ .

$\int σ_{2} (y) d y = \infty \sum i = 1 \frac{y^{i}}{i^{2}} = σ (y)$ $int sigma_2(y)dy = sum_{i=1}^{infty}y^i/i^2 = sigma(y)$

or equivalently

$σ^{a} (y) = \int σ_{2}^{a} (y) d y = \int - \frac{{log}_{e} (1 - y)}{y} d y = Polylog (2, y)$ $sigma^a(y) = int sigma_2^a(y)dy = int -(log_e(1-y))/y dy= "PolyLog"(2,y)$

The description of function PolyLog can be found in

https://en.wikipedia.org/wiki/Polylogarithm

The convergence interval in $x$ $x$ is a consequence of $y$ $y$ interval and is $x \in (1, 3)$ $x in (1,3)$ .

The attached figure shows the agreement between $σ (y)$ $sigma(y)$ and $σ^{a} (y)$ $sigma^a(y)$

enter image source here

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How do you find a power series representation for $\frac{{(x - 2)}^{n}}{n^{2}}$ $(x-2)^n/(n^2)$ and what is the radius of convergence?

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