Can your calculator support a number as large as this? $${\frac{\left({\frac{{\mathtt{1\,182}}{!}}{(\left({\mathtt{1\,182}}{\mathtt{\,-\,}}{\mathtt{591}}\right)){!}}}\right)}{{\mathtt{591}}{!}}}$$
Moreover. Using $${\frac{\left({\frac{({\mathtt{T}}){!}}{(\left({\mathtt{T}}{\mathtt{\,-\,}}{\mathtt{N}}\right)){!}}}\right)}{({\mathtt{N}}){!}}}$$ where as T is the Total Iterations and N is the current Iteration, can we find the total sum of every number that formula would output from $${\frac{\left({\frac{{\mathtt{1\,182}}{!}}{(\left({\mathtt{1\,182}}{\mathtt{\,-\,}}{\mathtt{1}}\right)){!}}}\right)}{{\mathtt{1}}{!}}}$$ ...$${\frac{\left({\frac{{\mathtt{1\,182}}{!}}{(\left({\mathtt{1\,182}}{\mathtt{\,-\,}}{\mathtt{1\,182}}\right)){!}}}\right)}{{\mathtt{1\,182}}{!}}}$$
I know the first number and the Second to last number are 1182. The Second and Third to last number are 697971. The last number is 1.
1=1182
2=697971
...
1180=697971
1181=1182
1182=1
