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Formula Individa

On July 14th, 2014 Anonymous says:

It was necessary to write the solution in a more General form: $$\frac{t}{q}=\frac{1}{x}+\frac{1}{y}+\frac{1}{z}$$ $ t,q $ - integers. Decomposing on the factors as follows: $ p^2-s^2=(p-s)(p+s)=2qL $ The solutions have the form: $$x=\frac{p(p-s)}{tL-q}$$ $$y=\frac{p(p+s)}{tL-q}$$ $$z=L$$ Decomposing on the factors as follows: $ p^2-s^2=(p-s)(p+s)=qL $ The solutions have the form: $$x=\frac{2p(p-s)}{tL-q}$$ $$y=\frac{2p(p+s)}{tL-q}$$ $$z=L$$

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