J JennyJ New member Joined Jan 27, 2008 Messages 4 May 1, 2008 #1 Use Euler's Theorem to confirm that, for any integer n greater than equal to 0. 51 I 10[sup:2f6c8irr]32n+9[/sup:2f6c8irr] - 7 There is some info in my text that looks like it could be applied but it doesnt make sense to me. Any help?
Use Euler's Theorem to confirm that, for any integer n greater than equal to 0. 51 I 10[sup:2f6c8irr]32n+9[/sup:2f6c8irr] - 7 There is some info in my text that looks like it could be applied but it doesnt make sense to me. Any help?
D daon Senior Member Joined Jan 27, 2006 Messages 1,284 May 1, 2008 #2 This might be able to help.. By Euler's Theorem: \(\displaystyle 51|(10^{\phi{(51)}}-1)\) And \(\displaystyle \phi(51)=32\). edited to fix phi(51) edited again: which text are you using, just curious.
This might be able to help.. By Euler's Theorem: \(\displaystyle 51|(10^{\phi{(51)}}-1)\) And \(\displaystyle \phi(51)=32\). edited to fix phi(51) edited again: which text are you using, just curious.
