Why is the polylogarithm equation for n=1 a logarithm?

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SUMMARY

The polylogarithm equation for n=1 simplifies to a logarithmic function, specifically the Taylor series expansion for ln(x+1). The equation is defined as y = Σ (x^i/i) from i=1 to infinity. This series diverges at x=0, aligning with the properties of logarithmic functions, which are undefined at that point. The discussion clarifies that the reference on the webpage pertains to this specific logarithmic relationship.

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the equation of pl is:
(infinity)
y= sum x^i/i^n
i=1
in here http://www.2dcurves.com/exponential/exponentialpo.html it states in the case n=1 it is a logarithm i want to know why?

for all of my knowledge it should be y=x/1+x^2/2+x^3/3+...
is this the taylor expansion series for a logarithm?
 
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Not exactly. For one thing that series gives y= 0 when x= 0 and log(x) is not defined for x=0.

The series you give is the Taylor's series for ln(x+1).
 
so is this what meant in the webpage?
 

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