Problem #74
Mod It
Let n be the largest positive integer, such that n! can be expressed as the product of \left(n - 2014^{2015}\right) consecutive integers.
Let x be equal to n \bmod {38980715857}. Find x \bmod {8037517}.
Let n be the largest positive integer, such that n! can be expressed as the product of \left(n - 2014^{2015}\right) consecutive integers.
Let x be equal to n \bmod {38980715857}. Find x \bmod {8037517}.