I will answer only the main part of the question. If $ m\geq 3 $ then $ |2^m-3^n|=2017\implies 8|3^n+1 $ which is not possible for any integer $ n $ , and can be easily checked by modular arithmetic. since, $ 8|3^{2k}+7 $ and $ 8|3^{2k+1}+5 $ . So, just check $ m=1,2 $

1- a) K=5 :$|2^3-3|$ b) K=11 : $|2^3+3|$ b) K=19 : $|2^3-3^3|$ 2- by mod 8 : if $ m\geq 3 $ then $ 8|3^n+1 $ but $3^n\cong 1,3(mod 8)$ if $m=1$ or $m=2$ in both cases it does not work. 3- Case 1: $2^m-3^n=41$ if $m\geq3$ in mod 8$\implies$ $-3^n\cong1(mod 8)$ but $3^n\cong 1,3(mod 8)$ if $m=1$ or $m=2$ in both cases it does not work Case 2: $3^n-2^m=41=2^5+3^2\implies 3^n-3^2=2^m+2^5>0\implies n>2\implies 2^m+2^5\cong0(mod 9)\implies2^m\cong4(mod 9)$ $\implies$ $m=6k+2$ for some $k$ Now in mod $13$: $3^n\cong3^2+2^5+2^m(mod 13)\implies 3^n\cong6(mod13 )$ or $3^n\cong11(mod13)$ in both cases it does not work. Therefore $41$ does not work