## E620 -- Methodus facilis inveniendi integrali huius formulae $$\int \frac{\partial x}{x}\cdot \frac{x^{n+p}-2x^n\cos \zeta + x^{n-p}}{x^{2n}-2x^n \cos \theta + 1}$$ casu quo post integrationem ponitur vel $$x=1$$ vel $$x=\infty$$

(An easy method for finding the integral of the formula $$\displaystyle \int \frac{\partial x}{x}\cdot \frac{x^{n+p}-2x^n\cos \zeta + x^{n-p}}{x^{2n}-2x^n \cos \theta + 1}$$ in the case in which after integration it is put from $$x=1$$ to $$x=\infty$$)

Summary:

Publication:
• Originally published in Nova Acta Academiae Scientarum Imperialis Petropolitinae 3, 1788, pp. 3-24
• Opera Omnia: Series 1, Volume 18, pp. 265 - 290
Documents Available:
• Original Publication: E620