Factors of Mersenne Number M67/Historical Note

Historical Note on Factors of Mersenne Number $M_{67}$
While had demonstrated in $1876$ that $M_{67}$ is composite, he had not established what its divisors are.

The Factors of Mersenne Number $M_{67}$ were demonstrated by in a famously dramatic presentation On The Factorization of Large Numbers to a meeting of the American Mathematical Society in October $1903$.

When called to give his lecture, he walked to the blackboard, and worked out the calculation, longhand, of $2^{67}$. Then he carefully subtracted $1$.

Moving to another area of the board, he then multiplied out $193, 707, 721 \times 761, 838, 257, 287$.

The numbers matched.

returned to his seat to thunderous applause, having delivered the only lecture in history in which not a word was spoken.

When asked how long it had taken him to find these factors, he reportedly replied:
 * Three years of Sundays.

It is noted that had originally listed $M_{67}$ as one of the integers of the form $2^p - 1$ to be prime.