Results of Brocard-Ramanujan problem on diophantine equation n!+1=m2

Abstract

The Brocard-Ramanujan problem pertaining to the diophantine equation n!+1=m2, a famously unsolved problem, deals with finding the integer solutions to the equation. Nobody has discovered any new solution of the problem beyond n=4,~5 and 7 although many of us have tried it. Bruce Berndt and William Galway Berndt had not found any new solution in 2000 by extensive computer search for a solution with n up to 109. The purpose of this study is to show that the solutions should satisfy some necessary and/or sufficient conditions. If n!=k+ε,~n>1,~0<ε<1; then it has solution if and only if n!=k(k+2) and ε,~k are strictly monotonic increasing. It has only finitely many solutions which is not based on any conjecture or previous research on the Brocard-Ramanujan problem. For the new solution of Brocard-Ramanujan problem (n 105), the value of ε should be more than 0.999 ·s 905915 (digit 0 is coming after 228287 numbers of 9 digit, which takes more than 66 pages in (LibreOffice Writer) indicating almost impossibility of new solution. If we consider n≥ 109, I am unable to calculate the said numbers of 9 digit in the value of ε in my personal laptop (with 8GB Ram) using MATHEMATICA 8. Finally, it has been claimed to discover that the problem has no further solution.