What is the Maclaurin series for $(1-x)ln(1-x)$ ?

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What is the Maclaurin series for $(1-x)ln(1-x)$ ?

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Answer 1 · 2017-04-27T11:05:51

$-x + 1/2x^2 + 1/6x^3 + 1/12x^4$

Explanation:

Start with the known Maclaurin series for $ln(1-x)$ , which is:

$ln(1-x) = -x-1/2x^2-1/3x^3-1/4x^4 -1/5x^5- ...$

Then we can just use algebra to multiply this series by $(1-x)$ , hence:

$f(x) = (1-x)ln(1-x)$
$" " = (1-x){-x-1/2x^2-1/3x^3-1/4x^4 - 1/5x^5... }$

$" " = (1){-x-1/2x^2-1/3x^3-1/4x^4 - 1/5x^5 ... }$
$" " - x{-x-1/2x^2-1/3x^3-1/4x^4 - 1/5x^5... }$

$" " = -x-1/2x^2-1/3x^3-1/4x^4 - 1/5x^5... +$
$" " x^2+1/2x^3+1/3x^4+ 1/4x^5...$

$" " = -x + 1/2x^2 + 1/6x^3 + 1/12x^4 + 1/20x^5...$

So the required polynomial of degree $4$ is

$-x + 1/2x^2 + 1/6x^3 + 1/12x^4$

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What is the Maclaurin series for $(1-x)ln(1-x)$ ?

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