If n and m are positive integers and m is a factor of $$2^{6}$$, what is the greatest possible number of integers that can be equal to both 3n and $$\frac{2^{6}}{m}$$?
If n and m are positive integers and m is a factor of $$2^{6}$$, what is the greatest possible number of integers that can be equal to both 3n and $$\frac{2^{6}}{m}$$?