I noticed the following pattern in the rows of Pascal's triangle: $$ 1 = 11^0\\ 11 = 11^1\\ 121= 11^2\\ 1331= 11^3\\ 14641=11^4 $$ at this point I thought maybe this pattern would follow indefinitely, but the next row is $15101051=7\times2157293$. The next two rows aren't powers of 11 either, the...