On the remarkable properties of the pentagonal numbers

Abstract

In this paper Euler considers the properties of the pentagonal numbers, those numbers of the form 3n2 n2. He recalls that the infinite product (1-x)(1-x2)(1-x3)... expands into an infinite series with exponents the pentagonal numbers, and tries substituting the roots of this infinite product into this infinite series. I am not sure what he is doing in some parts: in particular, he does some complicated calculations about the roots of unity and sums of them, their squares, reciprocals, etc., and also sums some divergent series such as 1-1-1+1+1-1-1+1+..., and I would appreciate any suggestions or corrections about these parts.

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