Authors: Johnny E. Magee
We identify equivalent restatements of the Brocard-Ramanujan diophantine equation, $(n! + 1) = m^2$; and employing the properties and implications of these equivalencies, prove that for all $n > 7$, there are no values of $n$ for which $(n! + 1)$ can be a perfect square.
Comments: 7 Pages.
[v1] 2019-01-09 00:16:39
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