2016 and factorial
Find the sum of all perfect square that can be expressed as form \(m!+2016\).
If you think that no perfect square satisfies this condition, or there are infinitely many perfect squares that satisfy this condition, submit your answer as 999.
\[\] Notation: \(!\) denotes the factorial notation. For example, \(8! = 1\times2\times3\times\cdots\times8 \).